mmtheoremsall - Metamath Proof Explorer

List of Theorems

Ref	Description
idi 1	(_Note_: This inference r...
a1ii 2	(_Note_: This inference r...
mp2 9	A double modus ponens infe...
mp2b 10	A double modus ponens infe...
a1i 11	Inference introducing an a...
2a1i 12	Inference introducing two ...
mp1i 13	Inference detaching an ant...
a2i 14	Inference distributing an ...
mpd 15	A modus ponens deduction. ...
imim2i 16	Inference adding common an...
syl 17	An inference version of th...
3syl 18	Inference chaining two syl...
4syl 19	Inference chaining three s...
mpi 20	A nested modus ponens infe...
mpisyl 21	A syllogism combined with ...
id 22	Principle of identity. Th...
idALT 23	Alternate proof of ~ id . ...
idd 24	Principle of identity ~ id...
a1d 25	Deduction introducing an e...
2a1d 26	Deduction introducing two ...
a1i13 27	Add two antecedents to a w...
2a1 28	A double form of ~ ax-1 . ...
a2d 29	Deduction distributing an ...
sylcom 30	Syllogism inference with c...
syl5com 31	Syllogism inference with c...
com12 32	Inference that swaps (comm...
syl11 33	A syllogism inference. Co...
syl5 34	A syllogism rule of infere...
syl6 35	A syllogism rule of infere...
syl56 36	Combine ~ syl5 and ~ syl6 ...
syl6com 37	Syllogism inference with c...
mpcom 38	Modus ponens inference wit...
syli 39	Syllogism inference with c...
syl2im 40	Replace two antecedents. ...
syl2imc 41	A commuted version of ~ sy...
pm2.27 42	This theorem, sometimes ca...
mpdd 43	A nested modus ponens dedu...
mpid 44	A nested modus ponens dedu...
mpdi 45	A nested modus ponens dedu...
mpii 46	A doubly nested modus pone...
syld 47	Syllogism deduction. Dedu...
syldc 48	Syllogism deduction. Comm...
mp2d 49	A double modus ponens dedu...
a1dd 50	Double deduction introduci...
2a1dd 51	Double deduction introduci...
pm2.43i 52	Inference absorbing redund...
pm2.43d 53	Deduction absorbing redund...
pm2.43a 54	Inference absorbing redund...
pm2.43b 55	Inference absorbing redund...
pm2.43 56	Absorption of redundant an...
imim2d 57	Deduction adding nested an...
imim2 58	A closed form of syllogism...
embantd 59	Deduction embedding an ant...
3syld 60	Triple syllogism deduction...
sylsyld 61	A double syllogism inferen...
imim12i 62	Inference joining two impl...
imim1i 63	Inference adding common co...
imim3i 64	Inference adding three nes...
sylc 65	A syllogism inference comb...
syl3c 66	A syllogism inference comb...
syl6mpi 67	A syllogism inference. (C...
mpsyl 68	Modus ponens combined with...
mpsylsyld 69	Modus ponens combined with...
syl6c 70	Inference combining ~ syl6...
syl6ci 71	A syllogism inference comb...
syldd 72	Nested syllogism deduction...
syl5d 73	A nested syllogism deducti...
syl7 74	A syllogism rule of infere...
syl6d 75	A nested syllogism deducti...
syl8 76	A syllogism rule of infere...
syl9 77	A nested syllogism inferen...
syl9r 78	A nested syllogism inferen...
syl10 79	A nested syllogism inferen...
a1ddd 80	Triple deduction introduci...
imim12d 81	Deduction combining antece...
imim1d 82	Deduction adding nested co...
imim1 83	A closed form of syllogism...
pm2.83 84	Theorem *2.83 of [Whitehea...
peirceroll 85	Over minimal implicational...
com23 86	Commutation of antecedents...
com3r 87	Commutation of antecedents...
com13 88	Commutation of antecedents...
com3l 89	Commutation of antecedents...
pm2.04 90	Swap antecedents. Theorem...
com34 91	Commutation of antecedents...
com4l 92	Commutation of antecedents...
com4t 93	Commutation of antecedents...
com4r 94	Commutation of antecedents...
com24 95	Commutation of antecedents...
com14 96	Commutation of antecedents...
com45 97	Commutation of antecedents...
com35 98	Commutation of antecedents...
com25 99	Commutation of antecedents...
com5l 100	Commutation of antecedents...
com15 101	Commutation of antecedents...
com52l 102	Commutation of antecedents...
com52r 103	Commutation of antecedents...
com5r 104	Commutation of antecedents...
imim12 105	Closed form of ~ imim12i a...
jarr 106	Elimination of a nested an...
jarri 107	Inference associated with ...
pm2.86d 108	Deduction associated with ...
pm2.86 109	Converse of Axiom ~ ax-2 ....
pm2.86i 110	Inference associated with ...
loolin 111	The Linearity Axiom of the...
loowoz 112	An alternate for the Linea...
con4 113	Alias for ~ ax-3 to be use...
con4i 114	Inference associated with ...
con4d 115	Deduction associated with ...
mt4 116	The rule of modus tollens....
mt4d 117	Modus tollens deduction. ...
mt4i 118	Modus tollens inference. ...
pm2.21i 119	A contradiction implies an...
pm2.24ii 120	A contradiction implies an...
pm2.21d 121	A contradiction implies an...
pm2.21ddALT 122	Alternate proof of ~ pm2.2...
pm2.21 123	From a wff and its negatio...
pm2.24 124	Theorem *2.24 of [Whitehea...
jarl 125	Elimination of a nested an...
jarli 126	Inference associated with ...
pm2.18d 127	Deduction form of the Clav...
pm2.18 128	Clavius law, or "consequen...
pm2.18i 129	Inference associated with ...
notnotr 130	Double negation eliminatio...
notnotri 131	Inference associated with ...
notnotriALT 132	Alternate proof of ~ notno...
notnotrd 133	Deduction associated with ...
con2d 134	A contraposition deduction...
con2 135	Contraposition. Theorem *...
mt2d 136	Modus tollens deduction. ...
mt2i 137	Modus tollens inference. ...
nsyl3 138	A negated syllogism infere...
con2i 139	A contraposition inference...
nsyl 140	A negated syllogism infere...
nsyl2 141	A negated syllogism infere...
notnot 142	Double negation introducti...
notnoti 143	Inference associated with ...
notnotd 144	Deduction associated with ...
con1d 145	A contraposition deduction...
con1 146	Contraposition. Theorem *...
con1i 147	A contraposition inference...
mt3d 148	Modus tollens deduction. ...
mt3i 149	Modus tollens inference. ...
pm2.24i 150	Inference associated with ...
pm2.24d 151	Deduction form of ~ pm2.24...
con3d 152	A contraposition deduction...
con3 153	Contraposition. Theorem *...
con3i 154	A contraposition inference...
con3rr3 155	Rotate through consequent ...
nsyld 156	A negated syllogism deduct...
nsyli 157	A negated syllogism infere...
nsyl4 158	A negated syllogism infere...
nsyl5 159	A negated syllogism infere...
pm3.2im 160	Theorem *3.2 of [Whitehead...
jc 161	Deduction joining the cons...
jcn 162	Theorem joining the conseq...
jcnd 163	Deduction joining the cons...
impi 164	An importation inference. ...
expi 165	An exportation inference. ...
simprim 166	Simplification. Similar t...
simplim 167	Simplification. Similar t...
pm2.5g 168	General instance of Theore...
pm2.5 169	Theorem *2.5 of [Whitehead...
conax1 170	Contrapositive of ~ ax-1 ....
conax1k 171	Weakening of ~ conax1 . G...
pm2.51 172	Theorem *2.51 of [Whitehea...
pm2.52 173	Theorem *2.52 of [Whitehea...
pm2.521g 174	A general instance of Theo...
pm2.521g2 175	A general instance of Theo...
pm2.521 176	Theorem *2.521 of [Whitehe...
expt 177	Exportation theorem ~ pm3....
impt 178	Importation theorem ~ pm3....
pm2.61d 179	Deduction eliminating an a...
pm2.61d1 180	Inference eliminating an a...
pm2.61d2 181	Inference eliminating an a...
pm2.61i 182	Inference eliminating an a...
pm2.61ii 183	Inference eliminating two ...
pm2.61nii 184	Inference eliminating two ...
pm2.61iii 185	Inference eliminating thre...
ja 186	Inference joining the ante...
jad 187	Deduction form of ~ ja . ...
pm2.01 188	Weak Clavius law. If a fo...
pm2.01i 189	Inference associated with ...
pm2.01d 190	Deduction based on reducti...
pm2.6 191	Theorem *2.6 of [Whitehead...
pm2.61 192	Theorem *2.61 of [Whitehea...
pm2.65 193	Theorem *2.65 of [Whitehea...
pm2.65i 194	Inference for proof by con...
pm2.21dd 195	A contradiction implies an...
pm2.65d 196	Deduction for proof by con...
mto 197	The rule of modus tollens....
mtod 198	Modus tollens deduction. ...
mtoi 199	Modus tollens inference. ...
mt2 200	A rule similar to modus to...
mt3 201	A rule similar to modus to...
peirce 202	Peirce's axiom. A non-int...
looinv 203	The Inversion Axiom of the...
bijust0 204	A self-implication (see ~ ...
bijust 205	Theorem used to justify th...
impbi 208	Property of the biconditio...
impbii 209	Infer an equivalence from ...
impbidd 210	Deduce an equivalence from...
impbid21d 211	Deduce an equivalence from...
impbid 212	Deduce an equivalence from...
dfbi1 213	Relate the biconditional c...
dfbi1ALT 214	Alternate proof of ~ dfbi1...
biimp 215	Property of the biconditio...
biimpi 216	Infer an implication from ...
sylbi 217	A mixed syllogism inferenc...
sylib 218	A mixed syllogism inferenc...
sylbb 219	A mixed syllogism inferenc...
biimpr 220	Property of the biconditio...
bicom1 221	Commutative law for the bi...
bicom 222	Commutative law for the bi...
bicomd 223	Commute two sides of a bic...
bicomi 224	Inference from commutative...
impbid1 225	Infer an equivalence from ...
impbid2 226	Infer an equivalence from ...
impcon4bid 227	A variation on ~ impbid wi...
biimpri 228	Infer a converse implicati...
biimpd 229	Deduce an implication from...
mpbi 230	An inference from a bicond...
mpbir 231	An inference from a bicond...
mpbid 232	A deduction from a bicondi...
mpbii 233	An inference from a nested...
sylibr 234	A mixed syllogism inferenc...
sylbir 235	A mixed syllogism inferenc...
sylbbr 236	A mixed syllogism inferenc...
sylbb1 237	A mixed syllogism inferenc...
sylbb2 238	A mixed syllogism inferenc...
sylibd 239	A syllogism deduction. (C...
sylbid 240	A syllogism deduction. (C...
mpbidi 241	A deduction from a bicondi...
biimtrid 242	A mixed syllogism inferenc...
biimtrrid 243	A mixed syllogism inferenc...
imbitrid 244	A mixed syllogism inferenc...
syl5ibcom 245	A mixed syllogism inferenc...
imbitrrid 246	A mixed syllogism inferenc...
syl5ibrcom 247	A mixed syllogism inferenc...
biimprd 248	Deduce a converse implicat...
biimpcd 249	Deduce a commuted implicat...
biimprcd 250	Deduce a converse commuted...
imbitrdi 251	A mixed syllogism inferenc...
imbitrrdi 252	A mixed syllogism inferenc...
biimtrdi 253	A mixed syllogism inferenc...
biimtrrdi 254	A mixed syllogism inferenc...
syl7bi 255	A mixed syllogism inferenc...
syl8ib 256	A syllogism rule of infere...
mpbird 257	A deduction from a bicondi...
mpbiri 258	An inference from a nested...
sylibrd 259	A syllogism deduction. (C...
sylbird 260	A syllogism deduction. (C...
biid 261	Principle of identity for ...
biidd 262	Principle of identity with...
pm5.1im 263	Two propositions are equiv...
2th 264	Two truths are equivalent....
2thd 265	Two truths are equivalent....
monothetic 266	Two self-implications (see...
ibi 267	Inference that converts a ...
ibir 268	Inference that converts a ...
ibd 269	Deduction that converts a ...
pm5.74 270	Distribution of implicatio...
pm5.74i 271	Distribution of implicatio...
pm5.74ri 272	Distribution of implicatio...
pm5.74d 273	Distribution of implicatio...
pm5.74rd 274	Distribution of implicatio...
bitri 275	An inference from transiti...
bitr2i 276	An inference from transiti...
bitr3i 277	An inference from transiti...
bitr4i 278	An inference from transiti...
bitrd 279	Deduction form of ~ bitri ...
bitr2d 280	Deduction form of ~ bitr2i...
bitr3d 281	Deduction form of ~ bitr3i...
bitr4d 282	Deduction form of ~ bitr4i...
bitrid 283	A syllogism inference from...
bitr2id 284	A syllogism inference from...
bitr3id 285	A syllogism inference from...
bitr3di 286	A syllogism inference from...
bitrdi 287	A syllogism inference from...
bitr2di 288	A syllogism inference from...
bitr4di 289	A syllogism inference from...
bitr4id 290	A syllogism inference from...
3imtr3i 291	A mixed syllogism inferenc...
3imtr4i 292	A mixed syllogism inferenc...
3imtr3d 293	More general version of ~ ...
3imtr4d 294	More general version of ~ ...
3imtr3g 295	More general version of ~ ...
3imtr4g 296	More general version of ~ ...
3bitri 297	A chained inference from t...
3bitrri 298	A chained inference from t...
3bitr2i 299	A chained inference from t...
3bitr2ri 300	A chained inference from t...
3bitr3i 301	A chained inference from t...
3bitr3ri 302	A chained inference from t...
3bitr4i 303	A chained inference from t...
3bitr4ri 304	A chained inference from t...
3bitrd 305	Deduction from transitivit...
3bitrrd 306	Deduction from transitivit...
3bitr2d 307	Deduction from transitivit...
3bitr2rd 308	Deduction from transitivit...
3bitr3d 309	Deduction from transitivit...
3bitr3rd 310	Deduction from transitivit...
3bitr4d 311	Deduction from transitivit...
3bitr4rd 312	Deduction from transitivit...
3bitr3g 313	More general version of ~ ...
3bitr4g 314	More general version of ~ ...
notnotb 315	Double negation. Theorem ...
con34b 316	A biconditional form of co...
con4bid 317	A contraposition deduction...
notbid 318	Deduction negating both si...
notbi 319	Contraposition. Theorem *...
notbii 320	Negate both sides of a log...
con4bii 321	A contraposition inference...
mtbi 322	An inference from a bicond...
mtbir 323	An inference from a bicond...
mtbid 324	A deduction from a bicondi...
mtbird 325	A deduction from a bicondi...
mtbii 326	An inference from a bicond...
mtbiri 327	An inference from a bicond...
sylnib 328	A mixed syllogism inferenc...
sylnibr 329	A mixed syllogism inferenc...
sylnbi 330	A mixed syllogism inferenc...
sylnbir 331	A mixed syllogism inferenc...
xchnxbi 332	Replacement of a subexpres...
xchnxbir 333	Replacement of a subexpres...
xchbinx 334	Replacement of a subexpres...
xchbinxr 335	Replacement of a subexpres...
imbi2i 336	Introduce an antecedent to...
bibi2i 337	Inference adding a bicondi...
bibi1i 338	Inference adding a bicondi...
bibi12i 339	The equivalence of two equ...
imbi2d 340	Deduction adding an antece...
imbi1d 341	Deduction adding a consequ...
bibi2d 342	Deduction adding a bicondi...
bibi1d 343	Deduction adding a bicondi...
imbi12d 344	Deduction joining two equi...
bibi12d 345	Deduction joining two equi...
imbi12 346	Closed form of ~ imbi12i ....
imbi1 347	Theorem *4.84 of [Whitehea...
imbi2 348	Theorem *4.85 of [Whitehea...
imbi1i 349	Introduce a consequent to ...
imbi12i 350	Join two logical equivalen...
bibi1 351	Theorem *4.86 of [Whitehea...
bitr3 352	Closed nested implication ...
con2bi 353	Contraposition. Theorem *...
con2bid 354	A contraposition deduction...
con1bid 355	A contraposition deduction...
con1bii 356	A contraposition inference...
con2bii 357	A contraposition inference...
con1b 358	Contraposition. Bidirecti...
con2b 359	Contraposition. Bidirecti...
biimt 360	A wff is equivalent to its...
pm5.5 361	Theorem *5.5 of [Whitehead...
a1bi 362	Inference introducing a th...
mt2bi 363	A false consequent falsifi...
mtt 364	Modus-tollens-like theorem...
imnot 365	If a proposition is false,...
pm5.501 366	Theorem *5.501 of [Whitehe...
ibib 367	Implication in terms of im...
ibibr 368	Implication in terms of im...
tbt 369	A wff is equivalent to its...
nbn2 370	The negation of a wff is e...
bibif 371	Transfer negation via an e...
nbn 372	The negation of a wff is e...
nbn3 373	Transfer falsehood via equ...
pm5.21im 374	Two propositions are equiv...
2false 375	Two falsehoods are equival...
2falsed 376	Two falsehoods are equival...
pm5.21ni 377	Two propositions implying ...
pm5.21nii 378	Eliminate an antecedent im...
pm5.21ndd 379	Eliminate an antecedent im...
bija 380	Combine antecedents into a...
pm5.18 381	Theorem *5.18 of [Whitehea...
xor3 382	Two ways to express "exclu...
nbbn 383	Move negation outside of b...
biass 384	Associative law for the bi...
biluk 385	Lukasiewicz's shortest axi...
pm5.19 386	Theorem *5.19 of [Whitehea...
bi2.04 387	Logical equivalence of com...
pm5.4 388	Antecedent absorption impl...
imdi 389	Distributive law for impli...
pm5.41 390	Theorem *5.41 of [Whitehea...
imbibi 391	The antecedent of one side...
pm4.8 392	Theorem *4.8 of [Whitehead...
pm4.81 393	A formula is equivalent to...
imim21b 394	Simplify an implication be...
pm4.63 397	Theorem *4.63 of [Whitehea...
pm4.67 398	Theorem *4.67 of [Whitehea...
imnan 399	Express an implication in ...
imnani 400	Infer an implication from ...
iman 401	Implication in terms of co...
pm3.24 402	Law of noncontradiction. ...
annim 403	Express a conjunction in t...
pm4.61 404	Theorem *4.61 of [Whitehea...
pm4.65 405	Theorem *4.65 of [Whitehea...
imp 406	Importation inference. (C...
impcom 407	Importation inference with...
con3dimp 408	Variant of ~ con3d with im...
mpnanrd 409	Eliminate the right side o...
impd 410	Importation deduction. (C...
impcomd 411	Importation deduction with...
ex 412	Exportation inference. (T...
expcom 413	Exportation inference with...
expdcom 414	Commuted form of ~ expd . ...
expd 415	Exportation deduction. (C...
expcomd 416	Deduction form of ~ expcom...
imp31 417	An importation inference. ...
imp32 418	An importation inference. ...
exp31 419	An exportation inference. ...
exp32 420	An exportation inference. ...
imp4b 421	An importation inference. ...
imp4a 422	An importation inference. ...
imp4c 423	An importation inference. ...
imp4d 424	An importation inference. ...
imp41 425	An importation inference. ...
imp42 426	An importation inference. ...
imp43 427	An importation inference. ...
imp44 428	An importation inference. ...
imp45 429	An importation inference. ...
exp4b 430	An exportation inference. ...
exp4a 431	An exportation inference. ...
exp4c 432	An exportation inference. ...
exp4d 433	An exportation inference. ...
exp41 434	An exportation inference. ...
exp42 435	An exportation inference. ...
exp43 436	An exportation inference. ...
exp44 437	An exportation inference. ...
exp45 438	An exportation inference. ...
imp5d 439	An importation inference. ...
imp5a 440	An importation inference. ...
imp5g 441	An importation inference. ...
imp55 442	An importation inference. ...
imp511 443	An importation inference. ...
exp5c 444	An exportation inference. ...
exp5j 445	An exportation inference. ...
exp5l 446	An exportation inference. ...
exp53 447	An exportation inference. ...
pm3.3 448	Theorem *3.3 (Exp) of [Whi...
pm3.31 449	Theorem *3.31 (Imp) of [Wh...
impexp 450	Import-export theorem. Pa...
impancom 451	Mixed importation/commutat...
expdimp 452	A deduction version of exp...
expimpd 453	Exportation followed by a ...
impr 454	Import a wff into a right ...
impl 455	Export a wff from a left c...
expr 456	Export a wff from a right ...
expl 457	Export a wff from a left c...
ancoms 458	Inference commuting conjun...
pm3.22 459	Theorem *3.22 of [Whitehea...
ancom 460	Commutative law for conjun...
ancomd 461	Commutation of conjuncts i...
biancomi 462	Commuting conjunction in a...
biancomd 463	Commuting conjunction in a...
ancomst 464	Closed form of ~ ancoms . ...
ancomsd 465	Deduction commuting conjun...
anasss 466	Associative law for conjun...
anassrs 467	Associative law for conjun...
anass 468	Associative law for conjun...
pm3.2 469	Join antecedents with conj...
pm3.2i 470	Infer conjunction of premi...
pm3.21 471	Join antecedents with conj...
pm3.43i 472	Nested conjunction of ante...
pm3.43 473	Theorem *3.43 (Comp) of [W...
dfbi2 474	A theorem similar to the s...
dfbi 475	Definition ~ df-bi rewritt...
biimpa 476	Importation inference from...
biimpar 477	Importation inference from...
biimpac 478	Importation inference from...
biimparc 479	Importation inference from...
adantr 480	Inference adding a conjunc...
adantl 481	Inference adding a conjunc...
simpl 482	Elimination of a conjunct....
simpli 483	Inference eliminating a co...
simpr 484	Elimination of a conjunct....
simpri 485	Inference eliminating a co...
intnan 486	Introduction of conjunct i...
intnanr 487	Introduction of conjunct i...
intnand 488	Introduction of conjunct i...
intnanrd 489	Introduction of conjunct i...
adantld 490	Deduction adding a conjunc...
adantrd 491	Deduction adding a conjunc...
pm3.41 492	Theorem *3.41 of [Whitehea...
pm3.42 493	Theorem *3.42 of [Whitehea...
simpld 494	Deduction eliminating a co...
simprd 495	Deduction eliminating a co...
simprbi 496	Deduction eliminating a co...
simplbi 497	Deduction eliminating a co...
simprbda 498	Deduction eliminating a co...
simplbda 499	Deduction eliminating a co...
simplbi2 500	Deduction eliminating a co...
simplbi2comt 501	Closed form of ~ simplbi2c...
simplbi2com 502	A deduction eliminating a ...
simpl2im 503	Implication from an elimin...
simplbiim 504	Implication from an elimin...
impel 505	An inference for implicati...
mpan9 506	Modus ponens conjoining di...
sylan9 507	Nested syllogism inference...
sylan9r 508	Nested syllogism inference...
sylan9bb 509	Nested syllogism inference...
sylan9bbr 510	Nested syllogism inference...
jca 511	Deduce conjunction of the ...
jcad 512	Deduction conjoining the c...
jca2 513	Inference conjoining the c...
jca31 514	Join three consequents. (...
jca32 515	Join three consequents. (...
jcai 516	Deduction replacing implic...
jcab 517	Distributive law for impli...
pm4.76 518	Theorem *4.76 of [Whitehea...
jctil 519	Inference conjoining a the...
jctir 520	Inference conjoining a the...
jccir 521	Inference conjoining a con...
jccil 522	Inference conjoining a con...
jctl 523	Inference conjoining a the...
jctr 524	Inference conjoining a the...
jctild 525	Deduction conjoining a the...
jctird 526	Deduction conjoining a the...
iba 527	Introduction of antecedent...
ibar 528	Introduction of antecedent...
biantru 529	A wff is equivalent to its...
biantrur 530	A wff is equivalent to its...
biantrud 531	A wff is equivalent to its...
biantrurd 532	A wff is equivalent to its...
bianfi 533	A wff conjoined with false...
bianfd 534	A wff conjoined with false...
baib 535	Move conjunction outside o...
baibr 536	Move conjunction outside o...
rbaibr 537	Move conjunction outside o...
rbaib 538	Move conjunction outside o...
baibd 539	Move conjunction outside o...
rbaibd 540	Move conjunction outside o...
bianabs 541	Absorb a hypothesis into t...
pm5.44 542	Theorem *5.44 of [Whitehea...
pm5.42 543	Theorem *5.42 of [Whitehea...
ancl 544	Conjoin antecedent to left...
anclb 545	Conjoin antecedent to left...
ancr 546	Conjoin antecedent to righ...
ancrb 547	Conjoin antecedent to righ...
ancli 548	Deduction conjoining antec...
ancri 549	Deduction conjoining antec...
ancld 550	Deduction conjoining antec...
ancrd 551	Deduction conjoining antec...
impac 552	Importation with conjuncti...
anc2l 553	Conjoin antecedent to left...
anc2r 554	Conjoin antecedent to righ...
anc2li 555	Deduction conjoining antec...
anc2ri 556	Deduction conjoining antec...
pm4.71 557	Implication in terms of bi...
pm4.71r 558	Implication in terms of bi...
pm4.71i 559	Inference converting an im...
pm4.71ri 560	Inference converting an im...
pm4.71d 561	Deduction converting an im...
pm4.71rd 562	Deduction converting an im...
pm4.24 563	Theorem *4.24 of [Whitehea...
anidm 564	Idempotent law for conjunc...
anidmdbi 565	Conjunction idempotence wi...
anidms 566	Inference from idempotent ...
imdistan 567	Distribution of implicatio...
imdistani 568	Distribution of implicatio...
imdistanri 569	Distribution of implicatio...
imdistand 570	Distribution of implicatio...
imdistanda 571	Distribution of implicatio...
pm5.3 572	Theorem *5.3 of [Whitehead...
pm5.32 573	Distribution of implicatio...
pm5.32i 574	Distribution of implicatio...
pm5.32ri 575	Distribution of implicatio...
pm5.32d 576	Distribution of implicatio...
pm5.32rd 577	Distribution of implicatio...
pm5.32da 578	Distribution of implicatio...
sylan 579	A syllogism inference. (C...
sylanb 580	A syllogism inference. (C...
sylanbr 581	A syllogism inference. (C...
sylanbrc 582	Syllogism inference. (Con...
syl2anc 583	Syllogism inference combin...
syl2anc2 584	Double syllogism inference...
sylancl 585	Syllogism inference combin...
sylancr 586	Syllogism inference combin...
sylancom 587	Syllogism inference with c...
sylanblc 588	Syllogism inference combin...
sylanblrc 589	Syllogism inference combin...
syldan 590	A syllogism deduction with...
sylbida 591	A syllogism deduction. (C...
sylan2 592	A syllogism inference. (C...
sylan2b 593	A syllogism inference. (C...
sylan2br 594	A syllogism inference. (C...
syl2an 595	A double syllogism inferen...
syl2anr 596	A double syllogism inferen...
syl2anb 597	A double syllogism inferen...
syl2anbr 598	A double syllogism inferen...
sylancb 599	A syllogism inference comb...
sylancbr 600	A syllogism inference comb...
syldanl 601	A syllogism deduction with...
syland 602	A syllogism deduction. (C...
sylani 603	A syllogism inference. (C...
sylan2d 604	A syllogism deduction. (C...
sylan2i 605	A syllogism inference. (C...
syl2ani 606	A syllogism inference. (C...
syl2and 607	A syllogism deduction. (C...
anim12d 608	Conjoin antecedents and co...
anim12d1 609	Variant of ~ anim12d where...
anim1d 610	Add a conjunct to right of...
anim2d 611	Add a conjunct to left of ...
anim12i 612	Conjoin antecedents and co...
anim12ci 613	Variant of ~ anim12i with ...
anim1i 614	Introduce conjunct to both...
anim1ci 615	Introduce conjunct to both...
anim2i 616	Introduce conjunct to both...
anim12ii 617	Conjoin antecedents and co...
anim12dan 618	Conjoin antecedents and co...
im2anan9 619	Deduction joining nested i...
im2anan9r 620	Deduction joining nested i...
pm3.45 621	Theorem *3.45 (Fact) of [W...
anbi2i 622	Introduce a left conjunct ...
anbi1i 623	Introduce a right conjunct...
anbi2ci 624	Variant of ~ anbi2i with c...
anbi1ci 625	Variant of ~ anbi1i with c...
bianbi 626	Exchanging conjunction in ...
anbi12i 627	Conjoin both sides of two ...
anbi12ci 628	Variant of ~ anbi12i with ...
anbi2d 629	Deduction adding a left co...
anbi1d 630	Deduction adding a right c...
anbi12d 631	Deduction joining two equi...
anbi1 632	Introduce a right conjunct...
anbi2 633	Introduce a left conjunct ...
anbi1cd 634	Introduce a proposition as...
an2anr 635	Double commutation in conj...
pm4.38 636	Theorem *4.38 of [Whitehea...
bi2anan9 637	Deduction joining two equi...
bi2anan9r 638	Deduction joining two equi...
bi2bian9 639	Deduction joining two bico...
anbiim 640	Adding biconditional when ...
bianass 641	An inference to merge two ...
bianassc 642	An inference to merge two ...
an21 643	Swap two conjuncts. (Cont...
an12 644	Swap two conjuncts. Note ...
an32 645	A rearrangement of conjunc...
an13 646	A rearrangement of conjunc...
an31 647	A rearrangement of conjunc...
an12s 648	Swap two conjuncts in ante...
ancom2s 649	Inference commuting a nest...
an13s 650	Swap two conjuncts in ante...
an32s 651	Swap two conjuncts in ante...
ancom1s 652	Inference commuting a nest...
an31s 653	Swap two conjuncts in ante...
anass1rs 654	Commutative-associative la...
an4 655	Rearrangement of 4 conjunc...
an42 656	Rearrangement of 4 conjunc...
an43 657	Rearrangement of 4 conjunc...
an3 658	A rearrangement of conjunc...
an4s 659	Inference rearranging 4 co...
an42s 660	Inference rearranging 4 co...
anabs1 661	Absorption into embedded c...
anabs5 662	Absorption into embedded c...
anabs7 663	Absorption into embedded c...
anabsan 664	Absorption of antecedent w...
anabss1 665	Absorption of antecedent i...
anabss4 666	Absorption of antecedent i...
anabss5 667	Absorption of antecedent i...
anabsi5 668	Absorption of antecedent i...
anabsi6 669	Absorption of antecedent i...
anabsi7 670	Absorption of antecedent i...
anabsi8 671	Absorption of antecedent i...
anabss7 672	Absorption of antecedent i...
anabsan2 673	Absorption of antecedent w...
anabss3 674	Absorption of antecedent i...
anandi 675	Distribution of conjunctio...
anandir 676	Distribution of conjunctio...
anandis 677	Inference that undistribut...
anandirs 678	Inference that undistribut...
sylanl1 679	A syllogism inference. (C...
sylanl2 680	A syllogism inference. (C...
sylanr1 681	A syllogism inference. (C...
sylanr2 682	A syllogism inference. (C...
syl6an 683	A syllogism deduction comb...
syl2an2r 684	~ syl2anr with antecedents...
syl2an2 685	~ syl2an with antecedents ...
mpdan 686	An inference based on modu...
mpancom 687	An inference based on modu...
mpidan 688	A deduction which "stacks"...
mpan 689	An inference based on modu...
mpan2 690	An inference based on modu...
mp2an 691	An inference based on modu...
mp4an 692	An inference based on modu...
mpan2d 693	A deduction based on modus...
mpand 694	A deduction based on modus...
mpani 695	An inference based on modu...
mpan2i 696	An inference based on modu...
mp2ani 697	An inference based on modu...
mp2and 698	A deduction based on modus...
mpanl1 699	An inference based on modu...
mpanl2 700	An inference based on modu...
mpanl12 701	An inference based on modu...
mpanr1 702	An inference based on modu...
mpanr2 703	An inference based on modu...
mpanr12 704	An inference based on modu...
mpanlr1 705	An inference based on modu...
mpbirand 706	Detach truth from conjunct...
mpbiran2d 707	Detach truth from conjunct...
mpbiran 708	Detach truth from conjunct...
mpbiran2 709	Detach truth from conjunct...
mpbir2an 710	Detach a conjunction of tr...
mpbi2and 711	Detach a conjunction of tr...
mpbir2and 712	Detach a conjunction of tr...
adantll 713	Deduction adding a conjunc...
adantlr 714	Deduction adding a conjunc...
adantrl 715	Deduction adding a conjunc...
adantrr 716	Deduction adding a conjunc...
adantlll 717	Deduction adding a conjunc...
adantllr 718	Deduction adding a conjunc...
adantlrl 719	Deduction adding a conjunc...
adantlrr 720	Deduction adding a conjunc...
adantrll 721	Deduction adding a conjunc...
adantrlr 722	Deduction adding a conjunc...
adantrrl 723	Deduction adding a conjunc...
adantrrr 724	Deduction adding a conjunc...
ad2antrr 725	Deduction adding two conju...
ad2antlr 726	Deduction adding two conju...
ad2antrl 727	Deduction adding two conju...
ad2antll 728	Deduction adding conjuncts...
ad3antrrr 729	Deduction adding three con...
ad3antlr 730	Deduction adding three con...
ad4antr 731	Deduction adding 4 conjunc...
ad4antlr 732	Deduction adding 4 conjunc...
ad5antr 733	Deduction adding 5 conjunc...
ad5antlr 734	Deduction adding 5 conjunc...
ad6antr 735	Deduction adding 6 conjunc...
ad6antlr 736	Deduction adding 6 conjunc...
ad7antr 737	Deduction adding 7 conjunc...
ad7antlr 738	Deduction adding 7 conjunc...
ad8antr 739	Deduction adding 8 conjunc...
ad8antlr 740	Deduction adding 8 conjunc...
ad9antr 741	Deduction adding 9 conjunc...
ad9antlr 742	Deduction adding 9 conjunc...
ad10antr 743	Deduction adding 10 conjun...
ad10antlr 744	Deduction adding 10 conjun...
ad2ant2l 745	Deduction adding two conju...
ad2ant2r 746	Deduction adding two conju...
ad2ant2lr 747	Deduction adding two conju...
ad2ant2rl 748	Deduction adding two conju...
adantl3r 749	Deduction adding 1 conjunc...
ad4ant13 750	Deduction adding conjuncts...
ad4ant14 751	Deduction adding conjuncts...
ad4ant23 752	Deduction adding conjuncts...
ad4ant24 753	Deduction adding conjuncts...
adantl4r 754	Deduction adding 1 conjunc...
ad5ant12 755	Deduction adding conjuncts...
ad5ant13 756	Deduction adding conjuncts...
ad5ant14 757	Deduction adding conjuncts...
ad5ant15 758	Deduction adding conjuncts...
ad5ant23 759	Deduction adding conjuncts...
ad5ant24 760	Deduction adding conjuncts...
ad5ant25 761	Deduction adding conjuncts...
adantl5r 762	Deduction adding 1 conjunc...
adantl6r 763	Deduction adding 1 conjunc...
pm3.33 764	Theorem *3.33 (Syll) of [W...
pm3.34 765	Theorem *3.34 (Syll) of [W...
simpll 766	Simplification of a conjun...
simplld 767	Deduction form of ~ simpll...
simplr 768	Simplification of a conjun...
simplrd 769	Deduction eliminating a do...
simprl 770	Simplification of a conjun...
simprld 771	Deduction eliminating a do...
simprr 772	Simplification of a conjun...
simprrd 773	Deduction form of ~ simprr...
simplll 774	Simplification of a conjun...
simpllr 775	Simplification of a conjun...
simplrl 776	Simplification of a conjun...
simplrr 777	Simplification of a conjun...
simprll 778	Simplification of a conjun...
simprlr 779	Simplification of a conjun...
simprrl 780	Simplification of a conjun...
simprrr 781	Simplification of a conjun...
simp-4l 782	Simplification of a conjun...
simp-4r 783	Simplification of a conjun...
simp-5l 784	Simplification of a conjun...
simp-5r 785	Simplification of a conjun...
simp-6l 786	Simplification of a conjun...
simp-6r 787	Simplification of a conjun...
simp-7l 788	Simplification of a conjun...
simp-7r 789	Simplification of a conjun...
simp-8l 790	Simplification of a conjun...
simp-8r 791	Simplification of a conjun...
simp-9l 792	Simplification of a conjun...
simp-9r 793	Simplification of a conjun...
simp-10l 794	Simplification of a conjun...
simp-10r 795	Simplification of a conjun...
simp-11l 796	Simplification of a conjun...
simp-11r 797	Simplification of a conjun...
pm2.01da 798	Deduction based on reducti...
pm2.18da 799	Deduction based on reducti...
impbida 800	Deduce an equivalence from...
pm5.21nd 801	Eliminate an antecedent im...
pm3.35 802	Conjunctive detachment. T...
pm5.74da 803	Distribution of implicatio...
bitr 804	Theorem *4.22 of [Whitehea...
biantr 805	A transitive law of equiva...
pm4.14 806	Theorem *4.14 of [Whitehea...
pm3.37 807	Theorem *3.37 (Transp) of ...
anim12 808	Conjoin antecedents and co...
pm3.4 809	Conjunction implies implic...
exbiri 810	Inference form of ~ exbir ...
pm2.61ian 811	Elimination of an antecede...
pm2.61dan 812	Elimination of an antecede...
pm2.61ddan 813	Elimination of two anteced...
pm2.61dda 814	Elimination of two anteced...
mtand 815	A modus tollens deduction....
pm2.65da 816	Deduction for proof by con...
condan 817	Proof by contradiction. (...
biadan 818	An implication is equivale...
biadani 819	Inference associated with ...
biadaniALT 820	Alternate proof of ~ biada...
biadanii 821	Inference associated with ...
biadanid 822	Deduction associated with ...
pm5.1 823	Two propositions are equiv...
pm5.21 824	Two propositions are equiv...
pm5.35 825	Theorem *5.35 of [Whitehea...
abai 826	Introduce one conjunct as ...
pm4.45im 827	Conjunction with implicati...
impimprbi 828	An implication and its rev...
nan 829	Theorem to move a conjunct...
pm5.31 830	Theorem *5.31 of [Whitehea...
pm5.31r 831	Variant of ~ pm5.31 . (Co...
pm4.15 832	Theorem *4.15 of [Whitehea...
pm5.36 833	Theorem *5.36 of [Whitehea...
annotanannot 834	A conjunction with a negat...
pm5.33 835	Theorem *5.33 of [Whitehea...
syl12anc 836	Syllogism combined with co...
syl21anc 837	Syllogism combined with co...
syl22anc 838	Syllogism combined with co...
syl1111anc 839	Four-hypothesis eliminatio...
syldbl2 840	Stacked hypotheseis implie...
mpsyl4anc 841	An elimination deduction. ...
pm4.87 842	Theorem *4.87 of [Whitehea...
bimsc1 843	Removal of conjunct from o...
a2and 844	Deduction distributing a c...
animpimp2impd 845	Deduction deriving nested ...
pm4.64 848	Theorem *4.64 of [Whitehea...
pm4.66 849	Theorem *4.66 of [Whitehea...
pm2.53 850	Theorem *2.53 of [Whitehea...
pm2.54 851	Theorem *2.54 of [Whitehea...
imor 852	Implication in terms of di...
imori 853	Infer disjunction from imp...
imorri 854	Infer implication from dis...
pm4.62 855	Theorem *4.62 of [Whitehea...
jaoi 856	Inference disjoining the a...
jao1i 857	Add a disjunct in the ante...
jaod 858	Deduction disjoining the a...
mpjaod 859	Eliminate a disjunction in...
ori 860	Infer implication from dis...
orri 861	Infer disjunction from imp...
orrd 862	Deduce disjunction from im...
ord 863	Deduce implication from di...
orci 864	Deduction introducing a di...
olci 865	Deduction introducing a di...
orc 866	Introduction of a disjunct...
olc 867	Introduction of a disjunct...
pm1.4 868	Axiom *1.4 of [WhiteheadRu...
orcom 869	Commutative law for disjun...
orcomd 870	Commutation of disjuncts i...
orcoms 871	Commutation of disjuncts i...
orcd 872	Deduction introducing a di...
olcd 873	Deduction introducing a di...
orcs 874	Deduction eliminating disj...
olcs 875	Deduction eliminating disj...
olcnd 876	A lemma for Conjunctive No...
orcnd 877	A lemma for Conjunctive No...
mtord 878	A modus tollens deduction ...
pm3.2ni 879	Infer negated disjunction ...
pm2.45 880	Theorem *2.45 of [Whitehea...
pm2.46 881	Theorem *2.46 of [Whitehea...
pm2.47 882	Theorem *2.47 of [Whitehea...
pm2.48 883	Theorem *2.48 of [Whitehea...
pm2.49 884	Theorem *2.49 of [Whitehea...
norbi 885	If neither of two proposit...
nbior 886	If two propositions are no...
orel1 887	Elimination of disjunction...
pm2.25 888	Theorem *2.25 of [Whitehea...
orel2 889	Elimination of disjunction...
pm2.67-2 890	Slight generalization of T...
pm2.67 891	Theorem *2.67 of [Whitehea...
curryax 892	A non-intuitionistic posit...
exmid 893	Law of excluded middle, al...
exmidd 894	Law of excluded middle in ...
pm2.1 895	Theorem *2.1 of [Whitehead...
pm2.13 896	Theorem *2.13 of [Whitehea...
pm2.621 897	Theorem *2.621 of [Whitehe...
pm2.62 898	Theorem *2.62 of [Whitehea...
pm2.68 899	Theorem *2.68 of [Whitehea...
dfor2 900	Logical 'or' expressed in ...
pm2.07 901	Theorem *2.07 of [Whitehea...
pm1.2 902	Axiom *1.2 of [WhiteheadRu...
oridm 903	Idempotent law for disjunc...
pm4.25 904	Theorem *4.25 of [Whitehea...
pm2.4 905	Theorem *2.4 of [Whitehead...
pm2.41 906	Theorem *2.41 of [Whitehea...
orim12i 907	Disjoin antecedents and co...
orim1i 908	Introduce disjunct to both...
orim2i 909	Introduce disjunct to both...
orim12dALT 910	Alternate proof of ~ orim1...
orbi2i 911	Inference adding a left di...
orbi1i 912	Inference adding a right d...
orbi12i 913	Infer the disjunction of t...
orbi2d 914	Deduction adding a left di...
orbi1d 915	Deduction adding a right d...
orbi1 916	Theorem *4.37 of [Whitehea...
orbi12d 917	Deduction joining two equi...
pm1.5 918	Axiom *1.5 (Assoc) of [Whi...
or12 919	Swap two disjuncts. (Cont...
orass 920	Associative law for disjun...
pm2.31 921	Theorem *2.31 of [Whitehea...
pm2.32 922	Theorem *2.32 of [Whitehea...
pm2.3 923	Theorem *2.3 of [Whitehead...
or32 924	A rearrangement of disjunc...
or4 925	Rearrangement of 4 disjunc...
or42 926	Rearrangement of 4 disjunc...
orordi 927	Distribution of disjunctio...
orordir 928	Distribution of disjunctio...
orimdi 929	Disjunction distributes ov...
pm2.76 930	Theorem *2.76 of [Whitehea...
pm2.85 931	Theorem *2.85 of [Whitehea...
pm2.75 932	Theorem *2.75 of [Whitehea...
pm4.78 933	Implication distributes ov...
biort 934	A disjunction with a true ...
biorf 935	A wff is equivalent to its...
biortn 936	A wff is equivalent to its...
biorfi 937	The dual of ~ biorf is not...
biorfri 938	A wff is equivalent to its...
biorfriOLD 939	Obsolete proof of ~ biorfr...
pm2.26 940	Theorem *2.26 of [Whitehea...
pm2.63 941	Theorem *2.63 of [Whitehea...
pm2.64 942	Theorem *2.64 of [Whitehea...
pm2.42 943	Theorem *2.42 of [Whitehea...
pm5.11g 944	A general instance of Theo...
pm5.11 945	Theorem *5.11 of [Whitehea...
pm5.12 946	Theorem *5.12 of [Whitehea...
pm5.14 947	Theorem *5.14 of [Whitehea...
pm5.13 948	Theorem *5.13 of [Whitehea...
pm5.55 949	Theorem *5.55 of [Whitehea...
pm4.72 950	Implication in terms of bi...
imimorb 951	Simplify an implication be...
oibabs 952	Absorption of disjunction ...
orbidi 953	Disjunction distributes ov...
pm5.7 954	Disjunction distributes ov...
jaao 955	Inference conjoining and d...
jaoa 956	Inference disjoining and c...
jaoian 957	Inference disjoining the a...
jaodan 958	Deduction disjoining the a...
mpjaodan 959	Eliminate a disjunction in...
pm3.44 960	Theorem *3.44 of [Whitehea...
jao 961	Disjunction of antecedents...
jaob 962	Disjunction of antecedents...
pm4.77 963	Theorem *4.77 of [Whitehea...
pm3.48 964	Theorem *3.48 of [Whitehea...
orim12d 965	Disjoin antecedents and co...
orim1d 966	Disjoin antecedents and co...
orim2d 967	Disjoin antecedents and co...
orim2 968	Axiom *1.6 (Sum) of [White...
pm2.38 969	Theorem *2.38 of [Whitehea...
pm2.36 970	Theorem *2.36 of [Whitehea...
pm2.37 971	Theorem *2.37 of [Whitehea...
pm2.81 972	Theorem *2.81 of [Whitehea...
pm2.8 973	Theorem *2.8 of [Whitehead...
pm2.73 974	Theorem *2.73 of [Whitehea...
pm2.74 975	Theorem *2.74 of [Whitehea...
pm2.82 976	Theorem *2.82 of [Whitehea...
pm4.39 977	Theorem *4.39 of [Whitehea...
animorl 978	Conjunction implies disjun...
animorr 979	Conjunction implies disjun...
animorlr 980	Conjunction implies disjun...
animorrl 981	Conjunction implies disjun...
ianor 982	Negated conjunction in ter...
anor 983	Conjunction in terms of di...
ioran 984	Negated disjunction in ter...
pm4.52 985	Theorem *4.52 of [Whitehea...
pm4.53 986	Theorem *4.53 of [Whitehea...
pm4.54 987	Theorem *4.54 of [Whitehea...
pm4.55 988	Theorem *4.55 of [Whitehea...
pm4.56 989	Theorem *4.56 of [Whitehea...
oran 990	Disjunction in terms of co...
pm4.57 991	Theorem *4.57 of [Whitehea...
pm3.1 992	Theorem *3.1 of [Whitehead...
pm3.11 993	Theorem *3.11 of [Whitehea...
pm3.12 994	Theorem *3.12 of [Whitehea...
pm3.13 995	Theorem *3.13 of [Whitehea...
pm3.14 996	Theorem *3.14 of [Whitehea...
pm4.44 997	Theorem *4.44 of [Whitehea...
pm4.45 998	Theorem *4.45 of [Whitehea...
orabs 999	Absorption of redundant in...
oranabs 1000	Absorb a disjunct into a c...
pm5.61 1001	Theorem *5.61 of [Whitehea...
pm5.6 1002	Conjunction in antecedent ...
orcanai 1003	Change disjunction in cons...
pm4.79 1004	Theorem *4.79 of [Whitehea...
pm5.53 1005	Theorem *5.53 of [Whitehea...
ordi 1006	Distributive law for disju...
ordir 1007	Distributive law for disju...
andi 1008	Distributive law for conju...
andir 1009	Distributive law for conju...
orddi 1010	Double distributive law fo...
anddi 1011	Double distributive law fo...
pm5.17 1012	Theorem *5.17 of [Whitehea...
pm5.15 1013	Theorem *5.15 of [Whitehea...
pm5.16 1014	Theorem *5.16 of [Whitehea...
xor 1015	Two ways to express exclus...
nbi2 1016	Two ways to express "exclu...
xordi 1017	Conjunction distributes ov...
pm5.54 1018	Theorem *5.54 of [Whitehea...
pm5.62 1019	Theorem *5.62 of [Whitehea...
pm5.63 1020	Theorem *5.63 of [Whitehea...
niabn 1021	Miscellaneous inference re...
ninba 1022	Miscellaneous inference re...
pm4.43 1023	Theorem *4.43 of [Whitehea...
pm4.82 1024	Theorem *4.82 of [Whitehea...
pm4.83 1025	Theorem *4.83 of [Whitehea...
pclem6 1026	Negation inferred from emb...
bigolden 1027	Dijkstra-Scholten's Golden...
pm5.71 1028	Theorem *5.71 of [Whitehea...
pm5.75 1029	Theorem *5.75 of [Whitehea...
ecase2d 1030	Deduction for elimination ...
ecase2dOLD 1031	Obsolete version of ~ ecas...
ecase3 1032	Inference for elimination ...
ecase 1033	Inference for elimination ...
ecase3d 1034	Deduction for elimination ...
ecased 1035	Deduction for elimination ...
ecase3ad 1036	Deduction for elimination ...
ecase3adOLD 1037	Obsolete version of ~ ecas...
ccase 1038	Inference for combining ca...
ccased 1039	Deduction for combining ca...
ccase2 1040	Inference for combining ca...
4cases 1041	Inference eliminating two ...
4casesdan 1042	Deduction eliminating two ...
cases 1043	Case disjunction according...
dedlem0a 1044	Lemma for an alternate ver...
dedlem0b 1045	Lemma for an alternate ver...
dedlema 1046	Lemma for weak deduction t...
dedlemb 1047	Lemma for weak deduction t...
cases2 1048	Case disjunction according...
cases2ALT 1049	Alternate proof of ~ cases...
dfbi3 1050	An alternate definition of...
pm5.24 1051	Theorem *5.24 of [Whitehea...
4exmid 1052	The disjunction of the fou...
consensus 1053	The consensus theorem. Th...
pm4.42 1054	Theorem *4.42 of [Whitehea...
prlem1 1055	A specialized lemma for se...
prlem2 1056	A specialized lemma for se...
oplem1 1057	A specialized lemma for se...
dn1 1058	A single axiom for Boolean...
bianir 1059	A closed form of ~ mpbir ,...
jaoi2 1060	Inference removing a negat...
jaoi3 1061	Inference separating a dis...
ornld 1062	Selecting one statement fr...
dfifp2 1065	Alternate definition of th...
dfifp3 1066	Alternate definition of th...
dfifp4 1067	Alternate definition of th...
dfifp5 1068	Alternate definition of th...
dfifp6 1069	Alternate definition of th...
dfifp7 1070	Alternate definition of th...
ifpdfbi 1071	Define the biconditional a...
anifp 1072	The conditional operator i...
ifpor 1073	The conditional operator i...
ifpn 1074	Conditional operator for t...
ifptru 1075	Value of the conditional o...
ifpfal 1076	Value of the conditional o...
ifpid 1077	Value of the conditional o...
casesifp 1078	Version of ~ cases express...
ifpbi123d 1079	Equivalence deduction for ...
ifpbi23d 1080	Equivalence deduction for ...
ifpimpda 1081	Separation of the values o...
1fpid3 1082	The value of the condition...
elimh 1083	Hypothesis builder for the...
dedt 1084	The weak deduction theorem...
con3ALT 1085	Proof of ~ con3 from its a...
3orass 1090	Associative law for triple...
3orel1 1091	Partial elimination of a t...
3orrot 1092	Rotation law for triple di...
3orcoma 1093	Commutation law for triple...
3orcomb 1094	Commutation law for triple...
3anass 1095	Associative law for triple...
3anan12 1096	Convert triple conjunction...
3anan32 1097	Convert triple conjunction...
3ancoma 1098	Commutation law for triple...
3ancomb 1099	Commutation law for triple...
3anrot 1100	Rotation law for triple co...
3anrev 1101	Reversal law for triple co...
anandi3 1102	Distribution of triple con...
anandi3r 1103	Distribution of triple con...
3anidm 1104	Idempotent law for conjunc...
3an4anass 1105	Associative law for four c...
3ioran 1106	Negated triple disjunction...
3ianor 1107	Negated triple conjunction...
3anor 1108	Triple conjunction express...
3oran 1109	Triple disjunction in term...
3impa 1110	Importation from double to...
3imp 1111	Importation inference. (C...
3imp31 1112	The importation inference ...
3imp231 1113	Importation inference. (C...
3imp21 1114	The importation inference ...
3impb 1115	Importation from double to...
3impib 1116	Importation to triple conj...
3impia 1117	Importation to triple conj...
3expa 1118	Exportation from triple to...
3exp 1119	Exportation inference. (C...
3expb 1120	Exportation from triple to...
3expia 1121	Exportation from triple co...
3expib 1122	Exportation from triple co...
3com12 1123	Commutation in antecedent....
3com13 1124	Commutation in antecedent....
3comr 1125	Commutation in antecedent....
3com23 1126	Commutation in antecedent....
3coml 1127	Commutation in antecedent....
3jca 1128	Join consequents with conj...
3jcad 1129	Deduction conjoining the c...
3adant1 1130	Deduction adding a conjunc...
3adant2 1131	Deduction adding a conjunc...
3adant3 1132	Deduction adding a conjunc...
3ad2ant1 1133	Deduction adding conjuncts...
3ad2ant2 1134	Deduction adding conjuncts...
3ad2ant3 1135	Deduction adding conjuncts...
simp1 1136	Simplification of triple c...
simp2 1137	Simplification of triple c...
simp3 1138	Simplification of triple c...
simp1i 1139	Infer a conjunct from a tr...
simp2i 1140	Infer a conjunct from a tr...
simp3i 1141	Infer a conjunct from a tr...
simp1d 1142	Deduce a conjunct from a t...
simp2d 1143	Deduce a conjunct from a t...
simp3d 1144	Deduce a conjunct from a t...
simp1bi 1145	Deduce a conjunct from a t...
simp2bi 1146	Deduce a conjunct from a t...
simp3bi 1147	Deduce a conjunct from a t...
3simpa 1148	Simplification of triple c...
3simpb 1149	Simplification of triple c...
3simpc 1150	Simplification of triple c...
3anim123i 1151	Join antecedents and conse...
3anim1i 1152	Add two conjuncts to antec...
3anim2i 1153	Add two conjuncts to antec...
3anim3i 1154	Add two conjuncts to antec...
3anbi123i 1155	Join 3 biconditionals with...
3orbi123i 1156	Join 3 biconditionals with...
3anbi1i 1157	Inference adding two conju...
3anbi2i 1158	Inference adding two conju...
3anbi3i 1159	Inference adding two conju...
syl3an 1160	A triple syllogism inferen...
syl3anb 1161	A triple syllogism inferen...
syl3anbr 1162	A triple syllogism inferen...
syl3an1 1163	A syllogism inference. (C...
syl3an2 1164	A syllogism inference. (C...
syl3an3 1165	A syllogism inference. (C...
3adantl1 1166	Deduction adding a conjunc...
3adantl2 1167	Deduction adding a conjunc...
3adantl3 1168	Deduction adding a conjunc...
3adantr1 1169	Deduction adding a conjunc...
3adantr2 1170	Deduction adding a conjunc...
3adantr3 1171	Deduction adding a conjunc...
ad4ant123 1172	Deduction adding conjuncts...
ad4ant124 1173	Deduction adding conjuncts...
ad4ant134 1174	Deduction adding conjuncts...
ad4ant234 1175	Deduction adding conjuncts...
3adant1l 1176	Deduction adding a conjunc...
3adant1r 1177	Deduction adding a conjunc...
3adant2l 1178	Deduction adding a conjunc...
3adant2r 1179	Deduction adding a conjunc...
3adant3l 1180	Deduction adding a conjunc...
3adant3r 1181	Deduction adding a conjunc...
3adant3r1 1182	Deduction adding a conjunc...
3adant3r2 1183	Deduction adding a conjunc...
3adant3r3 1184	Deduction adding a conjunc...
3ad2antl1 1185	Deduction adding conjuncts...
3ad2antl2 1186	Deduction adding conjuncts...
3ad2antl3 1187	Deduction adding conjuncts...
3ad2antr1 1188	Deduction adding conjuncts...
3ad2antr2 1189	Deduction adding conjuncts...
3ad2antr3 1190	Deduction adding conjuncts...
simpl1 1191	Simplification of conjunct...
simpl2 1192	Simplification of conjunct...
simpl3 1193	Simplification of conjunct...
simpr1 1194	Simplification of conjunct...
simpr2 1195	Simplification of conjunct...
simpr3 1196	Simplification of conjunct...
simp1l 1197	Simplification of triple c...
simp1r 1198	Simplification of triple c...
simp2l 1199	Simplification of triple c...
simp2r 1200	Simplification of triple c...
simp3l 1201	Simplification of triple c...
simp3r 1202	Simplification of triple c...
simp11 1203	Simplification of doubly t...
simp12 1204	Simplification of doubly t...
simp13 1205	Simplification of doubly t...
simp21 1206	Simplification of doubly t...
simp22 1207	Simplification of doubly t...
simp23 1208	Simplification of doubly t...
simp31 1209	Simplification of doubly t...
simp32 1210	Simplification of doubly t...
simp33 1211	Simplification of doubly t...
simpll1 1212	Simplification of conjunct...
simpll2 1213	Simplification of conjunct...
simpll3 1214	Simplification of conjunct...
simplr1 1215	Simplification of conjunct...
simplr2 1216	Simplification of conjunct...
simplr3 1217	Simplification of conjunct...
simprl1 1218	Simplification of conjunct...
simprl2 1219	Simplification of conjunct...
simprl3 1220	Simplification of conjunct...
simprr1 1221	Simplification of conjunct...
simprr2 1222	Simplification of conjunct...
simprr3 1223	Simplification of conjunct...
simpl1l 1224	Simplification of conjunct...
simpl1r 1225	Simplification of conjunct...
simpl2l 1226	Simplification of conjunct...
simpl2r 1227	Simplification of conjunct...
simpl3l 1228	Simplification of conjunct...
simpl3r 1229	Simplification of conjunct...
simpr1l 1230	Simplification of conjunct...
simpr1r 1231	Simplification of conjunct...
simpr2l 1232	Simplification of conjunct...
simpr2r 1233	Simplification of conjunct...
simpr3l 1234	Simplification of conjunct...
simpr3r 1235	Simplification of conjunct...
simp1ll 1236	Simplification of conjunct...
simp1lr 1237	Simplification of conjunct...
simp1rl 1238	Simplification of conjunct...
simp1rr 1239	Simplification of conjunct...
simp2ll 1240	Simplification of conjunct...
simp2lr 1241	Simplification of conjunct...
simp2rl 1242	Simplification of conjunct...
simp2rr 1243	Simplification of conjunct...
simp3ll 1244	Simplification of conjunct...
simp3lr 1245	Simplification of conjunct...
simp3rl 1246	Simplification of conjunct...
simp3rr 1247	Simplification of conjunct...
simpl11 1248	Simplification of conjunct...
simpl12 1249	Simplification of conjunct...
simpl13 1250	Simplification of conjunct...
simpl21 1251	Simplification of conjunct...
simpl22 1252	Simplification of conjunct...
simpl23 1253	Simplification of conjunct...
simpl31 1254	Simplification of conjunct...
simpl32 1255	Simplification of conjunct...
simpl33 1256	Simplification of conjunct...
simpr11 1257	Simplification of conjunct...
simpr12 1258	Simplification of conjunct...
simpr13 1259	Simplification of conjunct...
simpr21 1260	Simplification of conjunct...
simpr22 1261	Simplification of conjunct...
simpr23 1262	Simplification of conjunct...
simpr31 1263	Simplification of conjunct...
simpr32 1264	Simplification of conjunct...
simpr33 1265	Simplification of conjunct...
simp1l1 1266	Simplification of conjunct...
simp1l2 1267	Simplification of conjunct...
simp1l3 1268	Simplification of conjunct...
simp1r1 1269	Simplification of conjunct...
simp1r2 1270	Simplification of conjunct...
simp1r3 1271	Simplification of conjunct...
simp2l1 1272	Simplification of conjunct...
simp2l2 1273	Simplification of conjunct...
simp2l3 1274	Simplification of conjunct...
simp2r1 1275	Simplification of conjunct...
simp2r2 1276	Simplification of conjunct...
simp2r3 1277	Simplification of conjunct...
simp3l1 1278	Simplification of conjunct...
simp3l2 1279	Simplification of conjunct...
simp3l3 1280	Simplification of conjunct...
simp3r1 1281	Simplification of conjunct...
simp3r2 1282	Simplification of conjunct...
simp3r3 1283	Simplification of conjunct...
simp11l 1284	Simplification of conjunct...
simp11r 1285	Simplification of conjunct...
simp12l 1286	Simplification of conjunct...
simp12r 1287	Simplification of conjunct...
simp13l 1288	Simplification of conjunct...
simp13r 1289	Simplification of conjunct...
simp21l 1290	Simplification of conjunct...
simp21r 1291	Simplification of conjunct...
simp22l 1292	Simplification of conjunct...
simp22r 1293	Simplification of conjunct...
simp23l 1294	Simplification of conjunct...
simp23r 1295	Simplification of conjunct...
simp31l 1296	Simplification of conjunct...
simp31r 1297	Simplification of conjunct...
simp32l 1298	Simplification of conjunct...
simp32r 1299	Simplification of conjunct...
simp33l 1300	Simplification of conjunct...
simp33r 1301	Simplification of conjunct...
simp111 1302	Simplification of conjunct...
simp112 1303	Simplification of conjunct...
simp113 1304	Simplification of conjunct...
simp121 1305	Simplification of conjunct...
simp122 1306	Simplification of conjunct...
simp123 1307	Simplification of conjunct...
simp131 1308	Simplification of conjunct...
simp132 1309	Simplification of conjunct...
simp133 1310	Simplification of conjunct...
simp211 1311	Simplification of conjunct...
simp212 1312	Simplification of conjunct...
simp213 1313	Simplification of conjunct...
simp221 1314	Simplification of conjunct...
simp222 1315	Simplification of conjunct...
simp223 1316	Simplification of conjunct...
simp231 1317	Simplification of conjunct...
simp232 1318	Simplification of conjunct...
simp233 1319	Simplification of conjunct...
simp311 1320	Simplification of conjunct...
simp312 1321	Simplification of conjunct...
simp313 1322	Simplification of conjunct...
simp321 1323	Simplification of conjunct...
simp322 1324	Simplification of conjunct...
simp323 1325	Simplification of conjunct...
simp331 1326	Simplification of conjunct...
simp332 1327	Simplification of conjunct...
simp333 1328	Simplification of conjunct...
3anibar 1329	Remove a hypothesis from t...
3mix1 1330	Introduction in triple dis...
3mix2 1331	Introduction in triple dis...
3mix3 1332	Introduction in triple dis...
3mix1i 1333	Introduction in triple dis...
3mix2i 1334	Introduction in triple dis...
3mix3i 1335	Introduction in triple dis...
3mix1d 1336	Deduction introducing trip...
3mix2d 1337	Deduction introducing trip...
3mix3d 1338	Deduction introducing trip...
3pm3.2i 1339	Infer conjunction of premi...
pm3.2an3 1340	Version of ~ pm3.2 for a t...
mpbir3an 1341	Detach a conjunction of tr...
mpbir3and 1342	Detach a conjunction of tr...
syl3anbrc 1343	Syllogism inference. (Con...
syl21anbrc 1344	Syllogism inference. (Con...
3imp3i2an 1345	An elimination deduction. ...
ex3 1346	Apply ~ ex to a hypothesis...
3imp1 1347	Importation to left triple...
3impd 1348	Importation deduction for ...
3imp2 1349	Importation to right tripl...
3impdi 1350	Importation inference (und...
3impdir 1351	Importation inference (und...
3exp1 1352	Exportation from left trip...
3expd 1353	Exportation deduction for ...
3exp2 1354	Exportation from right tri...
exp5o 1355	A triple exportation infer...
exp516 1356	A triple exportation infer...
exp520 1357	A triple exportation infer...
3impexp 1358	Version of ~ impexp for a ...
3an1rs 1359	Swap conjuncts. (Contribu...
3anassrs 1360	Associative law for conjun...
ad5ant245 1361	Deduction adding conjuncts...
ad5ant234 1362	Deduction adding conjuncts...
ad5ant235 1363	Deduction adding conjuncts...
ad5ant123 1364	Deduction adding conjuncts...
ad5ant124 1365	Deduction adding conjuncts...
ad5ant125 1366	Deduction adding conjuncts...
ad5ant134 1367	Deduction adding conjuncts...
ad5ant135 1368	Deduction adding conjuncts...
ad5ant145 1369	Deduction adding conjuncts...
ad5ant2345 1370	Deduction adding conjuncts...
syl3anc 1371	Syllogism combined with co...
syl13anc 1372	Syllogism combined with co...
syl31anc 1373	Syllogism combined with co...
syl112anc 1374	Syllogism combined with co...
syl121anc 1375	Syllogism combined with co...
syl211anc 1376	Syllogism combined with co...
syl23anc 1377	Syllogism combined with co...
syl32anc 1378	Syllogism combined with co...
syl122anc 1379	Syllogism combined with co...
syl212anc 1380	Syllogism combined with co...
syl221anc 1381	Syllogism combined with co...
syl113anc 1382	Syllogism combined with co...
syl131anc 1383	Syllogism combined with co...
syl311anc 1384	Syllogism combined with co...
syl33anc 1385	Syllogism combined with co...
syl222anc 1386	Syllogism combined with co...
syl123anc 1387	Syllogism combined with co...
syl132anc 1388	Syllogism combined with co...
syl213anc 1389	Syllogism combined with co...
syl231anc 1390	Syllogism combined with co...
syl312anc 1391	Syllogism combined with co...
syl321anc 1392	Syllogism combined with co...
syl133anc 1393	Syllogism combined with co...
syl313anc 1394	Syllogism combined with co...
syl331anc 1395	Syllogism combined with co...
syl223anc 1396	Syllogism combined with co...
syl232anc 1397	Syllogism combined with co...
syl322anc 1398	Syllogism combined with co...
syl233anc 1399	Syllogism combined with co...
syl323anc 1400	Syllogism combined with co...
syl332anc 1401	Syllogism combined with co...
syl333anc 1402	A syllogism inference comb...
syl3an1b 1403	A syllogism inference. (C...
syl3an2b 1404	A syllogism inference. (C...
syl3an3b 1405	A syllogism inference. (C...
syl3an1br 1406	A syllogism inference. (C...
syl3an2br 1407	A syllogism inference. (C...
syl3an3br 1408	A syllogism inference. (C...
syld3an3 1409	A syllogism inference. (C...
syld3an1 1410	A syllogism inference. (C...
syld3an2 1411	A syllogism inference. (C...
syl3anl1 1412	A syllogism inference. (C...
syl3anl2 1413	A syllogism inference. (C...
syl3anl3 1414	A syllogism inference. (C...
syl3anl 1415	A triple syllogism inferen...
syl3anr1 1416	A syllogism inference. (C...
syl3anr2 1417	A syllogism inference. (C...
syl3anr3 1418	A syllogism inference. (C...
3anidm12 1419	Inference from idempotent ...
3anidm13 1420	Inference from idempotent ...
3anidm23 1421	Inference from idempotent ...
syl2an3an 1422	~ syl3an with antecedents ...
syl2an23an 1423	Deduction related to ~ syl...
3ori 1424	Infer implication from tri...
3jao 1425	Disjunction of three antec...
3jaob 1426	Disjunction of three antec...
3jaobOLD 1427	Obsolete version of ~ 3jao...
3jaoi 1428	Disjunction of three antec...
3jaod 1429	Disjunction of three antec...
3jaoian 1430	Disjunction of three antec...
3jaodan 1431	Disjunction of three antec...
mpjao3dan 1432	Eliminate a three-way disj...
3jaao 1433	Inference conjoining and d...
syl3an9b 1434	Nested syllogism inference...
3orbi123d 1435	Deduction joining 3 equiva...
3anbi123d 1436	Deduction joining 3 equiva...
3anbi12d 1437	Deduction conjoining and a...
3anbi13d 1438	Deduction conjoining and a...
3anbi23d 1439	Deduction conjoining and a...
3anbi1d 1440	Deduction adding conjuncts...
3anbi2d 1441	Deduction adding conjuncts...
3anbi3d 1442	Deduction adding conjuncts...
3anim123d 1443	Deduction joining 3 implic...
3orim123d 1444	Deduction joining 3 implic...
an6 1445	Rearrangement of 6 conjunc...
3an6 1446	Analogue of ~ an4 for trip...
3or6 1447	Analogue of ~ or4 for trip...
mp3an1 1448	An inference based on modu...
mp3an2 1449	An inference based on modu...
mp3an3 1450	An inference based on modu...
mp3an12 1451	An inference based on modu...
mp3an13 1452	An inference based on modu...
mp3an23 1453	An inference based on modu...
mp3an1i 1454	An inference based on modu...
mp3anl1 1455	An inference based on modu...
mp3anl2 1456	An inference based on modu...
mp3anl3 1457	An inference based on modu...
mp3anr1 1458	An inference based on modu...
mp3anr2 1459	An inference based on modu...
mp3anr3 1460	An inference based on modu...
mp3an 1461	An inference based on modu...
mpd3an3 1462	An inference based on modu...
mpd3an23 1463	An inference based on modu...
mp3and 1464	A deduction based on modus...
mp3an12i 1465	~ mp3an with antecedents i...
mp3an2i 1466	~ mp3an with antecedents i...
mp3an3an 1467	~ mp3an with antecedents i...
mp3an2ani 1468	An elimination deduction. ...
biimp3a 1469	Infer implication from a l...
biimp3ar 1470	Infer implication from a l...
3anandis 1471	Inference that undistribut...
3anandirs 1472	Inference that undistribut...
ecase23d 1473	Deduction for elimination ...
3ecase 1474	Inference for elimination ...
3bior1fd 1475	A disjunction is equivalen...
3bior1fand 1476	A disjunction is equivalen...
3bior2fd 1477	A wff is equivalent to its...
3biant1d 1478	A conjunction is equivalen...
intn3an1d 1479	Introduction of a triple c...
intn3an2d 1480	Introduction of a triple c...
intn3an3d 1481	Introduction of a triple c...
an3andi 1482	Distribution of conjunctio...
an33rean 1483	Rearrange a 9-fold conjunc...
3orel2 1484	Partial elimination of a t...
3orel3 1485	Partial elimination of a t...
3orel13 1486	Elimination of two disjunc...
3pm3.2ni 1487	Triple negated disjunction...
nanan 1490	Conjunction in terms of al...
dfnan2 1491	Alternative denial in term...
nanor 1492	Alternative denial in term...
nancom 1493	Alternative denial is comm...
nannan 1494	Nested alternative denials...
nanim 1495	Implication in terms of al...
nannot 1496	Negation in terms of alter...
nanbi 1497	Biconditional in terms of ...
nanbi1 1498	Introduce a right anti-con...
nanbi2 1499	Introduce a left anti-conj...
nanbi12 1500	Join two logical equivalen...
nanbi1i 1501	Introduce a right anti-con...
nanbi2i 1502	Introduce a left anti-conj...
nanbi12i 1503	Join two logical equivalen...
nanbi1d 1504	Introduce a right anti-con...
nanbi2d 1505	Introduce a left anti-conj...
nanbi12d 1506	Join two logical equivalen...
nanass 1507	A characterization of when...
xnor 1510	Two ways to write XNOR (ex...
xorcom 1511	The connector ` \/_ ` is c...
xorass 1512	The connector ` \/_ ` is a...
excxor 1513	This tautology shows that ...
xor2 1514	Two ways to express "exclu...
xoror 1515	Exclusive disjunction impl...
xornan 1516	Exclusive disjunction impl...
xornan2 1517	XOR implies NAND (written ...
xorneg2 1518	The connector ` \/_ ` is n...
xorneg1 1519	The connector ` \/_ ` is n...
xorneg 1520	The connector ` \/_ ` is u...
xorbi12i 1521	Equality property for excl...
xorbi12d 1522	Equality property for excl...
anxordi 1523	Conjunction distributes ov...
xorexmid 1524	Exclusive-or variant of th...
norcom 1527	The connector ` -\/ ` is c...
nornot 1528	` -. ` is expressible via ...
noran 1529	` /\ ` is expressible via ...
noror 1530	` \/ ` is expressible via ...
norasslem1 1531	This lemma shows the equiv...
norasslem2 1532	This lemma specializes ~ b...
norasslem3 1533	This lemma specializes ~ b...
norass 1534	A characterization of when...
trujust 1539	Soundness justification th...
tru 1541	The truth value ` T. ` is ...
dftru2 1542	An alternate definition of...
trut 1543	A proposition is equivalen...
mptru 1544	Eliminate ` T. ` as an ant...
tbtru 1545	A proposition is equivalen...
bitru 1546	A theorem is equivalent to...
trud 1547	Anything implies ` T. ` . ...
truan 1548	True can be removed from a...
fal 1551	The truth value ` F. ` is ...
nbfal 1552	The negation of a proposit...
bifal 1553	A contradiction is equival...
falim 1554	The truth value ` F. ` imp...
falimd 1555	The truth value ` F. ` imp...
dfnot 1556	Given falsum ` F. ` , we c...
inegd 1557	Negation introduction rule...
efald 1558	Deduction based on reducti...
pm2.21fal 1559	If a wff and its negation ...
truimtru 1560	A ` -> ` identity. (Contr...
truimfal 1561	A ` -> ` identity. (Contr...
falimtru 1562	A ` -> ` identity. (Contr...
falimfal 1563	A ` -> ` identity. (Contr...
nottru 1564	A ` -. ` identity. (Contr...
notfal 1565	A ` -. ` identity. (Contr...
trubitru 1566	A ` <-> ` identity. (Cont...
falbitru 1567	A ` <-> ` identity. (Cont...
trubifal 1568	A ` <-> ` identity. (Cont...
falbifal 1569	A ` <-> ` identity. (Cont...
truantru 1570	A ` /\ ` identity. (Contr...
truanfal 1571	A ` /\ ` identity. (Contr...
falantru 1572	A ` /\ ` identity. (Contr...
falanfal 1573	A ` /\ ` identity. (Contr...
truortru 1574	A ` \/ ` identity. (Contr...
truorfal 1575	A ` \/ ` identity. (Contr...
falortru 1576	A ` \/ ` identity. (Contr...
falorfal 1577	A ` \/ ` identity. (Contr...
trunantru 1578	A ` -/\ ` identity. (Cont...
trunanfal 1579	A ` -/\ ` identity. (Cont...
falnantru 1580	A ` -/\ ` identity. (Cont...
falnanfal 1581	A ` -/\ ` identity. (Cont...
truxortru 1582	A ` \/_ ` identity. (Cont...
truxorfal 1583	A ` \/_ ` identity. (Cont...
falxortru 1584	A ` \/_ ` identity. (Cont...
falxorfal 1585	A ` \/_ ` identity. (Cont...
trunortru 1586	A ` -\/ ` identity. (Cont...
trunorfal 1587	A ` -\/ ` identity. (Cont...
falnortru 1588	A ` -\/ ` identity. (Cont...
falnorfal 1589	A ` -\/ ` identity. (Cont...
hadbi123d 1592	Equality theorem for the a...
hadbi123i 1593	Equality theorem for the a...
hadass 1594	Associative law for the ad...
hadbi 1595	The adder sum is the same ...
hadcoma 1596	Commutative law for the ad...
hadcomb 1597	Commutative law for the ad...
hadrot 1598	Rotation law for the adder...
hadnot 1599	The adder sum distributes ...
had1 1600	If the first input is true...
had0 1601	If the first input is fals...
hadifp 1602	The value of the adder sum...
cador 1605	The adder carry in disjunc...
cadan 1606	The adder carry in conjunc...
cadbi123d 1607	Equality theorem for the a...
cadbi123i 1608	Equality theorem for the a...
cadcoma 1609	Commutative law for the ad...
cadcomb 1610	Commutative law for the ad...
cadrot 1611	Rotation law for the adder...
cadnot 1612	The adder carry distribute...
cad11 1613	If (at least) two inputs a...
cad1 1614	If one input is true, then...
cad0 1615	If one input is false, the...
cad0OLD 1616	Obsolete version of ~ cad0...
cadifp 1617	The value of the carry is,...
cadtru 1618	The adder carry is true as...
minimp 1619	A single axiom for minimal...
minimp-syllsimp 1620	Derivation of Syll-Simp ( ...
minimp-ax1 1621	Derivation of ~ ax-1 from ...
minimp-ax2c 1622	Derivation of a commuted f...
minimp-ax2 1623	Derivation of ~ ax-2 from ...
minimp-pm2.43 1624	Derivation of ~ pm2.43 (al...
impsingle 1625	The shortest single axiom ...
impsingle-step4 1626	Derivation of impsingle-st...
impsingle-step8 1627	Derivation of impsingle-st...
impsingle-ax1 1628	Derivation of impsingle-ax...
impsingle-step15 1629	Derivation of impsingle-st...
impsingle-step18 1630	Derivation of impsingle-st...
impsingle-step19 1631	Derivation of impsingle-st...
impsingle-step20 1632	Derivation of impsingle-st...
impsingle-step21 1633	Derivation of impsingle-st...
impsingle-step22 1634	Derivation of impsingle-st...
impsingle-step25 1635	Derivation of impsingle-st...
impsingle-imim1 1636	Derivation of impsingle-im...
impsingle-peirce 1637	Derivation of impsingle-pe...
tarski-bernays-ax2 1638	Derivation of ~ ax-2 from ...
meredith 1639	Carew Meredith's sole axio...
merlem1 1640	Step 3 of Meredith's proof...
merlem2 1641	Step 4 of Meredith's proof...
merlem3 1642	Step 7 of Meredith's proof...
merlem4 1643	Step 8 of Meredith's proof...
merlem5 1644	Step 11 of Meredith's proo...
merlem6 1645	Step 12 of Meredith's proo...
merlem7 1646	Between steps 14 and 15 of...
merlem8 1647	Step 15 of Meredith's proo...
merlem9 1648	Step 18 of Meredith's proo...
merlem10 1649	Step 19 of Meredith's proo...
merlem11 1650	Step 20 of Meredith's proo...
merlem12 1651	Step 28 of Meredith's proo...
merlem13 1652	Step 35 of Meredith's proo...
luk-1 1653	1 of 3 axioms for proposit...
luk-2 1654	2 of 3 axioms for proposit...
luk-3 1655	3 of 3 axioms for proposit...
luklem1 1656	Used to rederive standard ...
luklem2 1657	Used to rederive standard ...
luklem3 1658	Used to rederive standard ...
luklem4 1659	Used to rederive standard ...
luklem5 1660	Used to rederive standard ...
luklem6 1661	Used to rederive standard ...
luklem7 1662	Used to rederive standard ...
luklem8 1663	Used to rederive standard ...
ax1 1664	Standard propositional axi...
ax2 1665	Standard propositional axi...
ax3 1666	Standard propositional axi...
nic-dfim 1667	This theorem "defines" imp...
nic-dfneg 1668	This theorem "defines" neg...
nic-mp 1669	Derive Nicod's rule of mod...
nic-mpALT 1670	A direct proof of ~ nic-mp...
nic-ax 1671	Nicod's axiom derived from...
nic-axALT 1672	A direct proof of ~ nic-ax...
nic-imp 1673	Inference for ~ nic-mp usi...
nic-idlem1 1674	Lemma for ~ nic-id . (Con...
nic-idlem2 1675	Lemma for ~ nic-id . Infe...
nic-id 1676	Theorem ~ id expressed wit...
nic-swap 1677	The connector ` -/\ ` is s...
nic-isw1 1678	Inference version of ~ nic...
nic-isw2 1679	Inference for swapping nes...
nic-iimp1 1680	Inference version of ~ nic...
nic-iimp2 1681	Inference version of ~ nic...
nic-idel 1682	Inference to remove the tr...
nic-ich 1683	Chained inference. (Contr...
nic-idbl 1684	Double the terms. Since d...
nic-bijust 1685	Biconditional justificatio...
nic-bi1 1686	Inference to extract one s...
nic-bi2 1687	Inference to extract the o...
nic-stdmp 1688	Derive the standard modus ...
nic-luk1 1689	Proof of ~ luk-1 from ~ ni...
nic-luk2 1690	Proof of ~ luk-2 from ~ ni...
nic-luk3 1691	Proof of ~ luk-3 from ~ ni...
lukshef-ax1 1692	This alternative axiom for...
lukshefth1 1693	Lemma for ~ renicax . (Co...
lukshefth2 1694	Lemma for ~ renicax . (Co...
renicax 1695	A rederivation of ~ nic-ax...
tbw-bijust 1696	Justification for ~ tbw-ne...
tbw-negdf 1697	The definition of negation...
tbw-ax1 1698	The first of four axioms i...
tbw-ax2 1699	The second of four axioms ...
tbw-ax3 1700	The third of four axioms i...
tbw-ax4 1701	The fourth of four axioms ...
tbwsyl 1702	Used to rederive the Lukas...
tbwlem1 1703	Used to rederive the Lukas...
tbwlem2 1704	Used to rederive the Lukas...
tbwlem3 1705	Used to rederive the Lukas...
tbwlem4 1706	Used to rederive the Lukas...
tbwlem5 1707	Used to rederive the Lukas...
re1luk1 1708	~ luk-1 derived from the T...
re1luk2 1709	~ luk-2 derived from the T...
re1luk3 1710	~ luk-3 derived from the T...
merco1 1711	A single axiom for proposi...
merco1lem1 1712	Used to rederive the Tarsk...
retbwax4 1713	~ tbw-ax4 rederived from ~...
retbwax2 1714	~ tbw-ax2 rederived from ~...
merco1lem2 1715	Used to rederive the Tarsk...
merco1lem3 1716	Used to rederive the Tarsk...
merco1lem4 1717	Used to rederive the Tarsk...
merco1lem5 1718	Used to rederive the Tarsk...
merco1lem6 1719	Used to rederive the Tarsk...
merco1lem7 1720	Used to rederive the Tarsk...
retbwax3 1721	~ tbw-ax3 rederived from ~...
merco1lem8 1722	Used to rederive the Tarsk...
merco1lem9 1723	Used to rederive the Tarsk...
merco1lem10 1724	Used to rederive the Tarsk...
merco1lem11 1725	Used to rederive the Tarsk...
merco1lem12 1726	Used to rederive the Tarsk...
merco1lem13 1727	Used to rederive the Tarsk...
merco1lem14 1728	Used to rederive the Tarsk...
merco1lem15 1729	Used to rederive the Tarsk...
merco1lem16 1730	Used to rederive the Tarsk...
merco1lem17 1731	Used to rederive the Tarsk...
merco1lem18 1732	Used to rederive the Tarsk...
retbwax1 1733	~ tbw-ax1 rederived from ~...
merco2 1734	A single axiom for proposi...
mercolem1 1735	Used to rederive the Tarsk...
mercolem2 1736	Used to rederive the Tarsk...
mercolem3 1737	Used to rederive the Tarsk...
mercolem4 1738	Used to rederive the Tarsk...
mercolem5 1739	Used to rederive the Tarsk...
mercolem6 1740	Used to rederive the Tarsk...
mercolem7 1741	Used to rederive the Tarsk...
mercolem8 1742	Used to rederive the Tarsk...
re1tbw1 1743	~ tbw-ax1 rederived from ~...
re1tbw2 1744	~ tbw-ax2 rederived from ~...
re1tbw3 1745	~ tbw-ax3 rederived from ~...
re1tbw4 1746	~ tbw-ax4 rederived from ~...
rb-bijust 1747	Justification for ~ rb-imd...
rb-imdf 1748	The definition of implicat...
anmp 1749	Modus ponens for ` { \/ , ...
rb-ax1 1750	The first of four axioms i...
rb-ax2 1751	The second of four axioms ...
rb-ax3 1752	The third of four axioms i...
rb-ax4 1753	The fourth of four axioms ...
rbsyl 1754	Used to rederive the Lukas...
rblem1 1755	Used to rederive the Lukas...
rblem2 1756	Used to rederive the Lukas...
rblem3 1757	Used to rederive the Lukas...
rblem4 1758	Used to rederive the Lukas...
rblem5 1759	Used to rederive the Lukas...
rblem6 1760	Used to rederive the Lukas...
rblem7 1761	Used to rederive the Lukas...
re1axmp 1762	~ ax-mp derived from Russe...
re2luk1 1763	~ luk-1 derived from Russe...
re2luk2 1764	~ luk-2 derived from Russe...
re2luk3 1765	~ luk-3 derived from Russe...
mptnan 1766	Modus ponendo tollens 1, o...
mptxor 1767	Modus ponendo tollens 2, o...
mtpor 1768	Modus tollendo ponens (inc...
mtpxor 1769	Modus tollendo ponens (ori...
stoic1a 1770	Stoic logic Thema 1 (part ...
stoic1b 1771	Stoic logic Thema 1 (part ...
stoic2a 1772	Stoic logic Thema 2 versio...
stoic2b 1773	Stoic logic Thema 2 versio...
stoic3 1774	Stoic logic Thema 3. Stat...
stoic4a 1775	Stoic logic Thema 4 versio...
stoic4b 1776	Stoic logic Thema 4 versio...
alnex 1779	Universal quantification o...
eximal 1780	An equivalence between an ...
nf2 1783	Alternate definition of no...
nf3 1784	Alternate definition of no...
nf4 1785	Alternate definition of no...
nfi 1786	Deduce that ` x ` is not f...
nfri 1787	Consequence of the definit...
nfd 1788	Deduce that ` x ` is not f...
nfrd 1789	Consequence of the definit...
nftht 1790	Closed form of ~ nfth . (...
nfntht 1791	Closed form of ~ nfnth . ...
nfntht2 1792	Closed form of ~ nfnth . ...
gen2 1794	Generalization applied twi...
mpg 1795	Modus ponens combined with...
mpgbi 1796	Modus ponens on biconditio...
mpgbir 1797	Modus ponens on biconditio...
nex 1798	Generalization rule for ne...
nfth 1799	No variable is (effectivel...
nfnth 1800	No variable is (effectivel...
hbth 1801	No variable is (effectivel...
nftru 1802	The true constant has no f...
nffal 1803	The false constant has no ...
sptruw 1804	Version of ~ sp when ` ph ...
altru 1805	For all sets, ` T. ` is tr...
alfal 1806	For all sets, ` -. F. ` is...
alim 1808	Restatement of Axiom ~ ax-...
alimi 1809	Inference quantifying both...
2alimi 1810	Inference doubly quantifyi...
ala1 1811	Add an antecedent in a uni...
al2im 1812	Closed form of ~ al2imi . ...
al2imi 1813	Inference quantifying ante...
alanimi 1814	Variant of ~ al2imi with c...
alimdh 1815	Deduction form of Theorem ...
albi 1816	Theorem 19.15 of [Margaris...
albii 1817	Inference adding universal...
2albii 1818	Inference adding two unive...
3albii 1819	Inference adding three uni...
sylgt 1820	Closed form of ~ sylg . (...
sylg 1821	A syllogism combined with ...
alrimih 1822	Inference form of Theorem ...
hbxfrbi 1823	A utility lemma to transfe...
alex 1824	Universal quantifier in te...
exnal 1825	Existential quantification...
2nalexn 1826	Part of theorem *11.5 in [...
2exnaln 1827	Theorem *11.22 in [Whitehe...
2nexaln 1828	Theorem *11.25 in [Whitehe...
alimex 1829	An equivalence between an ...
aleximi 1830	A variant of ~ al2imi : in...
alexbii 1831	Biconditional form of ~ al...
exim 1832	Theorem 19.22 of [Margaris...
eximi 1833	Inference adding existenti...
2eximi 1834	Inference adding two exist...
eximii 1835	Inference associated with ...
exa1 1836	Add an antecedent in an ex...
19.38 1837	Theorem 19.38 of [Margaris...
19.38a 1838	Under a nonfreeness hypoth...
19.38b 1839	Under a nonfreeness hypoth...
imnang 1840	Quantified implication in ...
alinexa 1841	A transformation of quanti...
exnalimn 1842	Existential quantification...
alexn 1843	A relationship between two...
2exnexn 1844	Theorem *11.51 in [Whitehe...
exbi 1845	Theorem 19.18 of [Margaris...
exbii 1846	Inference adding existenti...
2exbii 1847	Inference adding two exist...
3exbii 1848	Inference adding three exi...
nfbiit 1849	Equivalence theorem for th...
nfbii 1850	Equality theorem for the n...
nfxfr 1851	A utility lemma to transfe...
nfxfrd 1852	A utility lemma to transfe...
nfnbi 1853	A variable is nonfree in a...
nfnbiOLD 1854	Obsolete version of ~ nfnb...
nfnt 1855	If a variable is nonfree i...
nfn 1856	Inference associated with ...
nfnd 1857	Deduction associated with ...
exanali 1858	A transformation of quanti...
2exanali 1859	Theorem *11.521 in [Whiteh...
exancom 1860	Commutation of conjunction...
exan 1861	Place a conjunct in the sc...
alrimdh 1862	Deduction form of Theorem ...
eximdh 1863	Deduction from Theorem 19....
nexdh 1864	Deduction for generalizati...
albidh 1865	Formula-building rule for ...
exbidh 1866	Formula-building rule for ...
exsimpl 1867	Simplification of an exist...
exsimpr 1868	Simplification of an exist...
19.26 1869	Theorem 19.26 of [Margaris...
19.26-2 1870	Theorem ~ 19.26 with two q...
19.26-3an 1871	Theorem ~ 19.26 with tripl...
19.29 1872	Theorem 19.29 of [Margaris...
19.29r 1873	Variation of ~ 19.29 . (C...
19.29r2 1874	Variation of ~ 19.29r with...
19.29x 1875	Variation of ~ 19.29 with ...
19.35 1876	Theorem 19.35 of [Margaris...
19.35i 1877	Inference associated with ...
19.35ri 1878	Inference associated with ...
19.25 1879	Theorem 19.25 of [Margaris...
19.30 1880	Theorem 19.30 of [Margaris...
19.43 1881	Theorem 19.43 of [Margaris...
19.43OLD 1882	Obsolete proof of ~ 19.43 ...
19.33 1883	Theorem 19.33 of [Margaris...
19.33b 1884	The antecedent provides a ...
19.40 1885	Theorem 19.40 of [Margaris...
19.40-2 1886	Theorem *11.42 in [Whitehe...
19.40b 1887	The antecedent provides a ...
albiim 1888	Split a biconditional and ...
2albiim 1889	Split a biconditional and ...
exintrbi 1890	Add/remove a conjunct in t...
exintr 1891	Introduce a conjunct in th...
alsyl 1892	Universally quantified and...
nfimd 1893	If in a context ` x ` is n...
nfimt 1894	Closed form of ~ nfim and ...
nfim 1895	If ` x ` is not free in ` ...
nfand 1896	If in a context ` x ` is n...
nf3and 1897	Deduction form of bound-va...
nfan 1898	If ` x ` is not free in ` ...
nfnan 1899	If ` x ` is not free in ` ...
nf3an 1900	If ` x ` is not free in ` ...
nfbid 1901	If in a context ` x ` is n...
nfbi 1902	If ` x ` is not free in ` ...
nfor 1903	If ` x ` is not free in ` ...
nf3or 1904	If ` x ` is not free in ` ...
empty 1905	Two characterizations of t...
emptyex 1906	On the empty domain, any e...
emptyal 1907	On the empty domain, any u...
emptynf 1908	On the empty domain, any v...
ax5d 1910	Version of ~ ax-5 with ant...
ax5e 1911	A rephrasing of ~ ax-5 usi...
ax5ea 1912	If a formula holds for som...
nfv 1913	If ` x ` is not present in...
nfvd 1914	~ nfv with antecedent. Us...
alimdv 1915	Deduction form of Theorem ...
eximdv 1916	Deduction form of Theorem ...
2alimdv 1917	Deduction form of Theorem ...
2eximdv 1918	Deduction form of Theorem ...
albidv 1919	Formula-building rule for ...
exbidv 1920	Formula-building rule for ...
nfbidv 1921	An equality theorem for no...
2albidv 1922	Formula-building rule for ...
2exbidv 1923	Formula-building rule for ...
3exbidv 1924	Formula-building rule for ...
4exbidv 1925	Formula-building rule for ...
alrimiv 1926	Inference form of Theorem ...
alrimivv 1927	Inference form of Theorem ...
alrimdv 1928	Deduction form of Theorem ...
exlimiv 1929	Inference form of Theorem ...
exlimiiv 1930	Inference (Rule C) associa...
exlimivv 1931	Inference form of Theorem ...
exlimdv 1932	Deduction form of Theorem ...
exlimdvv 1933	Deduction form of Theorem ...
exlimddv 1934	Existential elimination ru...
nexdv 1935	Deduction for generalizati...
2ax5 1936	Quantification of two vari...
stdpc5v 1937	Version of ~ stdpc5 with a...
19.21v 1938	Version of ~ 19.21 with a ...
19.32v 1939	Version of ~ 19.32 with a ...
19.31v 1940	Version of ~ 19.31 with a ...
19.23v 1941	Version of ~ 19.23 with a ...
19.23vv 1942	Theorem ~ 19.23v extended ...
pm11.53v 1943	Version of ~ pm11.53 with ...
19.36imv 1944	One direction of ~ 19.36v ...
19.36imvOLD 1945	Obsolete version of ~ 19.3...
19.36iv 1946	Inference associated with ...
19.37imv 1947	One direction of ~ 19.37v ...
19.37iv 1948	Inference associated with ...
19.41v 1949	Version of ~ 19.41 with a ...
19.41vv 1950	Version of ~ 19.41 with tw...
19.41vvv 1951	Version of ~ 19.41 with th...
19.41vvvv 1952	Version of ~ 19.41 with fo...
19.42v 1953	Version of ~ 19.42 with a ...
exdistr 1954	Distribution of existentia...
exdistrv 1955	Distribute a pair of exist...
4exdistrv 1956	Distribute two pairs of ex...
19.42vv 1957	Version of ~ 19.42 with tw...
exdistr2 1958	Distribution of existentia...
19.42vvv 1959	Version of ~ 19.42 with th...
3exdistr 1960	Distribution of existentia...
4exdistr 1961	Distribution of existentia...
weq 1962	Extend wff definition to i...
speimfw 1963	Specialization, with addit...
speimfwALT 1964	Alternate proof of ~ speim...
spimfw 1965	Specialization, with addit...
ax12i 1966	Inference that has ~ ax-12...
ax6v 1968	Axiom B7 of [Tarski] p. 75...
ax6ev 1969	At least one individual ex...
spimw 1970	Specialization. Lemma 8 o...
spimew 1971	Existential introduction, ...
speiv 1972	Inference from existential...
speivw 1973	Version of ~ spei with a d...
exgen 1974	Rule of existential genera...
extru 1975	There exists a variable su...
19.2 1976	Theorem 19.2 of [Margaris]...
19.2d 1977	Deduction associated with ...
19.8w 1978	Weak version of ~ 19.8a an...
spnfw 1979	Weak version of ~ sp . Us...
spvw 1980	Version of ~ sp when ` x `...
19.3v 1981	Version of ~ 19.3 with a d...
19.8v 1982	Version of ~ 19.8a with a ...
19.9v 1983	Version of ~ 19.9 with a d...
19.39 1984	Theorem 19.39 of [Margaris...
19.24 1985	Theorem 19.24 of [Margaris...
19.34 1986	Theorem 19.34 of [Margaris...
19.36v 1987	Version of ~ 19.36 with a ...
19.12vvv 1988	Version of ~ 19.12vv with ...
19.27v 1989	Version of ~ 19.27 with a ...
19.28v 1990	Version of ~ 19.28 with a ...
19.37v 1991	Version of ~ 19.37 with a ...
19.44v 1992	Version of ~ 19.44 with a ...
19.45v 1993	Version of ~ 19.45 with a ...
spimevw 1994	Existential introduction, ...
spimvw 1995	A weak form of specializat...
spvv 1996	Specialization, using impl...
spfalw 1997	Version of ~ sp when ` ph ...
chvarvv 1998	Implicit substitution of `...
equs4v 1999	Version of ~ equs4 with a ...
alequexv 2000	Version of ~ equs4v with i...
exsbim 2001	One direction of the equiv...
equsv 2002	If a formula does not cont...
equsalvw 2003	Version of ~ equsalv with ...
equsexvw 2004	Version of ~ equsexv with ...
cbvaliw 2005	Change bound variable. Us...
cbvalivw 2006	Change bound variable. Us...
ax7v 2008	Weakened version of ~ ax-7...
ax7v1 2009	First of two weakened vers...
ax7v2 2010	Second of two weakened ver...
equid 2011	Identity law for equality....
nfequid 2012	Bound-variable hypothesis ...
equcomiv 2013	Weaker form of ~ equcomi w...
ax6evr 2014	A commuted form of ~ ax6ev...
ax7 2015	Proof of ~ ax-7 from ~ ax7...
equcomi 2016	Commutative law for equali...
equcom 2017	Commutative law for equali...
equcomd 2018	Deduction form of ~ equcom...
equcoms 2019	An inference commuting equ...
equtr 2020	A transitive law for equal...
equtrr 2021	A transitive law for equal...
equeuclr 2022	Commuted version of ~ eque...
equeucl 2023	Equality is a left-Euclide...
equequ1 2024	An equivalence law for equ...
equequ2 2025	An equivalence law for equ...
equtr2 2026	Equality is a left-Euclide...
stdpc6 2027	One of the two equality ax...
equvinv 2028	A variable introduction la...
equvinva 2029	A modified version of the ...
equvelv 2030	A biconditional form of ~ ...
ax13b 2031	An equivalence between two...
spfw 2032	Weak version of ~ sp . Us...
spw 2033	Weak version of the specia...
cbvalw 2034	Change bound variable. Us...
cbvalvw 2035	Change bound variable. Us...
cbvexvw 2036	Change bound variable. Us...
cbvaldvaw 2037	Rule used to change the bo...
cbvexdvaw 2038	Rule used to change the bo...
cbval2vw 2039	Rule used to change bound ...
cbvex2vw 2040	Rule used to change bound ...
cbvex4vw 2041	Rule used to change bound ...
alcomimw 2042	Weak version of ~ ax-11 . ...
excomimw 2043	Weak version of ~ excomim ...
alcomw 2044	Weak version of ~ alcom an...
hbn1fw 2045	Weak version of ~ ax-10 fr...
hbn1w 2046	Weak version of ~ hbn1 . ...
hba1w 2047	Weak version of ~ hba1 . ...
hbe1w 2048	Weak version of ~ hbe1 . ...
hbalw 2049	Weak version of ~ hbal . ...
19.8aw 2050	If a formula is true, then...
exexw 2051	Existential quantification...
spaev 2052	A special instance of ~ sp...
cbvaev 2053	Change bound variable in a...
aevlem0 2054	Lemma for ~ aevlem . Inst...
aevlem 2055	Lemma for ~ aev and ~ axc1...
aeveq 2056	The antecedent ` A. x x = ...
aev 2057	A "distinctor elimination"...
aev2 2058	A version of ~ aev with tw...
hbaev 2059	All variables are effectiv...
naev 2060	If some set variables can ...
naev2 2061	Generalization of ~ hbnaev...
hbnaev 2062	Any variable is free in ` ...
sbjust 2063	Justification theorem for ...
sbt 2066	A substitution into a theo...
sbtru 2067	The result of substituting...
stdpc4 2068	The specialization axiom o...
sbtALT 2069	Alternate proof of ~ sbt ,...
2stdpc4 2070	A double specialization us...
sbi1 2071	Distribute substitution ov...
spsbim 2072	Distribute substitution ov...
spsbbi 2073	Biconditional property for...
sbimi 2074	Distribute substitution ov...
sb2imi 2075	Distribute substitution ov...
sbbii 2076	Infer substitution into bo...
2sbbii 2077	Infer double substitution ...
sbimdv 2078	Deduction substituting bot...
sbbidv 2079	Deduction substituting bot...
sban 2080	Conjunction inside and out...
sb3an 2081	Threefold conjunction insi...
spsbe 2082	Existential generalization...
sbequ 2083	Equality property for subs...
sbequi 2084	An equality theorem for su...
sb6 2085	Alternate definition of su...
2sb6 2086	Equivalence for double sub...
sb1v 2087	One direction of ~ sb5 , p...
sbv 2088	Substitution for a variabl...
sbcom4 2089	Commutativity law for subs...
pm11.07 2090	Axiom *11.07 in [Whitehead...
sbrimvw 2091	Substitution in an implica...
sbbiiev 2092	An equivalence of substitu...
sbievw 2093	Conversion of implicit sub...
sbievwOLD 2094	Obsolete version of ~ sbie...
sbiedvw 2095	Conversion of implicit sub...
2sbievw 2096	Conversion of double impli...
sbcom3vv 2097	Substituting ` y ` for ` x...
sbievw2 2098	~ sbievw applied twice, av...
sbco2vv 2099	A composition law for subs...
cbvsbv 2100	Change the bound variable ...
sbco4lem 2101	Lemma for ~ sbco4 . It re...
sbco4 2102	Two ways of exchanging two...
equsb3 2103	Substitution in an equalit...
equsb3r 2104	Substitution applied to th...
equsb1v 2105	Substitution applied to an...
nsb 2106	Any substitution in an alw...
sbn1 2107	One direction of ~ sbn , u...
wel 2109	Extend wff definition to i...
ax8v 2111	Weakened version of ~ ax-8...
ax8v1 2112	First of two weakened vers...
ax8v2 2113	Second of two weakened ver...
ax8 2114	Proof of ~ ax-8 from ~ ax8...
elequ1 2115	An identity law for the no...
elsb1 2116	Substitution for the first...
cleljust 2117	When the class variables i...
ax9v 2119	Weakened version of ~ ax-9...
ax9v1 2120	First of two weakened vers...
ax9v2 2121	Second of two weakened ver...
ax9 2122	Proof of ~ ax-9 from ~ ax9...
elequ2 2123	An identity law for the no...
elequ2g 2124	A form of ~ elequ2 with a ...
elsb2 2125	Substitution for the secon...
elequ12 2126	An identity law for the no...
ru0 2127	The FOL statement used in ...
ax6dgen 2128	Tarski's system uses the w...
ax10w 2129	Weak version of ~ ax-10 fr...
ax11w 2130	Weak version of ~ ax-11 fr...
ax11dgen 2131	Degenerate instance of ~ a...
ax12wlem 2132	Lemma for weak version of ...
ax12w 2133	Weak version of ~ ax-12 fr...
ax12dgen 2134	Degenerate instance of ~ a...
ax12wdemo 2135	Example of an application ...
ax13w 2136	Weak version (principal in...
ax13dgen1 2137	Degenerate instance of ~ a...
ax13dgen2 2138	Degenerate instance of ~ a...
ax13dgen3 2139	Degenerate instance of ~ a...
ax13dgen4 2140	Degenerate instance of ~ a...
hbn1 2142	Alias for ~ ax-10 to be us...
hbe1 2143	The setvar ` x ` is not fr...
hbe1a 2144	Dual statement of ~ hbe1 ....
nf5-1 2145	One direction of ~ nf5 can...
nf5i 2146	Deduce that ` x ` is not f...
nf5dh 2147	Deduce that ` x ` is not f...
nf5dv 2148	Apply the definition of no...
nfnaew 2149	All variables are effectiv...
nfnaewOLD 2150	Obsolete version of ~ nfna...
nfe1 2151	The setvar ` x ` is not fr...
nfa1 2152	The setvar ` x ` is not fr...
nfna1 2153	A convenience theorem part...
nfia1 2154	Lemma 23 of [Monk2] p. 114...
nfnf1 2155	The setvar ` x ` is not fr...
modal5 2156	The analogue in our predic...
nfs1v 2157	The setvar ` x ` is not fr...
alcoms 2159	Swap quantifiers in an ant...
alcom 2160	Theorem 19.5 of [Margaris]...
alrot3 2161	Theorem *11.21 in [Whitehe...
alrot4 2162	Rotate four universal quan...
excom 2163	Theorem 19.11 of [Margaris...
excomim 2164	One direction of Theorem 1...
excom13 2165	Swap 1st and 3rd existenti...
exrot3 2166	Rotate existential quantif...
exrot4 2167	Rotate existential quantif...
hbal 2168	If ` x ` is not free in ` ...
hbald 2169	Deduction form of bound-va...
sbal 2170	Move universal quantifier ...
sbalv 2171	Quantify with new variable...
hbsbw 2172	If ` z ` is not free in ` ...
hbsbwOLD 2173	Obsolete version of ~ hbsb...
sbcom2 2174	Commutativity law for subs...
sbco4lemOLD 2175	Obsolete version of ~ sbco...
sbco4OLD 2176	Obsolete version of ~ sbco...
nfa2 2177	Lemma 24 of [Monk2] p. 114...
ax12v 2179	This is essentially Axiom ...
ax12v2 2180	It is possible to remove a...
ax12ev2 2181	Version of ~ ax12v2 rewrit...
19.8a 2182	If a wff is true, it is tr...
19.8ad 2183	If a wff is true, it is tr...
sp 2184	Specialization. A univers...
spi 2185	Inference rule of universa...
sps 2186	Generalization of antecede...
2sp 2187	A double specialization (s...
spsd 2188	Deduction generalizing ant...
19.2g 2189	Theorem 19.2 of [Margaris]...
19.21bi 2190	Inference form of ~ 19.21 ...
19.21bbi 2191	Inference removing two uni...
19.23bi 2192	Inference form of Theorem ...
nexr 2193	Inference associated with ...
qexmid 2194	Quantified excluded middle...
nf5r 2195	Consequence of the definit...
nf5ri 2196	Consequence of the definit...
nf5rd 2197	Consequence of the definit...
spimedv 2198	Deduction version of ~ spi...
spimefv 2199	Version of ~ spime with a ...
nfim1 2200	A closed form of ~ nfim . ...
nfan1 2201	A closed form of ~ nfan . ...
19.3t 2202	Closed form of ~ 19.3 and ...
19.3 2203	A wff may be quantified wi...
19.9d 2204	A deduction version of one...
19.9t 2205	Closed form of ~ 19.9 and ...
19.9 2206	A wff may be existentially...
19.21t 2207	Closed form of Theorem 19....
19.21 2208	Theorem 19.21 of [Margaris...
stdpc5 2209	An axiom scheme of standar...
19.21-2 2210	Version of ~ 19.21 with tw...
19.23t 2211	Closed form of Theorem 19....
19.23 2212	Theorem 19.23 of [Margaris...
alimd 2213	Deduction form of Theorem ...
alrimi 2214	Inference form of Theorem ...
alrimdd 2215	Deduction form of Theorem ...
alrimd 2216	Deduction form of Theorem ...
eximd 2217	Deduction form of Theorem ...
exlimi 2218	Inference associated with ...
exlimd 2219	Deduction form of Theorem ...
exlimimdd 2220	Existential elimination ru...
exlimdd 2221	Existential elimination ru...
nexd 2222	Deduction for generalizati...
albid 2223	Formula-building rule for ...
exbid 2224	Formula-building rule for ...
nfbidf 2225	An equality theorem for ef...
19.16 2226	Theorem 19.16 of [Margaris...
19.17 2227	Theorem 19.17 of [Margaris...
19.27 2228	Theorem 19.27 of [Margaris...
19.28 2229	Theorem 19.28 of [Margaris...
19.19 2230	Theorem 19.19 of [Margaris...
19.36 2231	Theorem 19.36 of [Margaris...
19.36i 2232	Inference associated with ...
19.37 2233	Theorem 19.37 of [Margaris...
19.32 2234	Theorem 19.32 of [Margaris...
19.31 2235	Theorem 19.31 of [Margaris...
19.41 2236	Theorem 19.41 of [Margaris...
19.42 2237	Theorem 19.42 of [Margaris...
19.44 2238	Theorem 19.44 of [Margaris...
19.45 2239	Theorem 19.45 of [Margaris...
spimfv 2240	Specialization, using impl...
chvarfv 2241	Implicit substitution of `...
cbv3v2 2242	Version of ~ cbv3 with two...
sbalex 2243	Equivalence of two ways to...
sbalexOLD 2244	Obsolete version of ~ sbal...
sb4av 2245	Version of ~ sb4a with a d...
sbimd 2246	Deduction substituting bot...
sbbid 2247	Deduction substituting bot...
2sbbid 2248	Deduction doubly substitut...
sbequ1 2249	An equality theorem for su...
sbequ2 2250	An equality theorem for su...
stdpc7 2251	One of the two equality ax...
sbequ12 2252	An equality theorem for su...
sbequ12r 2253	An equality theorem for su...
sbelx 2254	Elimination of substitutio...
sbequ12a 2255	An equality theorem for su...
sbid 2256	An identity theorem for su...
sbcov 2257	A composition law for subs...
sbcovOLD 2258	Obsolete version of ~ sbco...
sb6a 2259	Equivalence for substituti...
sbid2vw 2260	Reverting substitution yie...
axc16g 2261	Generalization of ~ axc16 ...
axc16 2262	Proof of older axiom ~ ax-...
axc16gb 2263	Biconditional strengthenin...
axc16nf 2264	If ~ dtru is false, then t...
axc11v 2265	Version of ~ axc11 with a ...
axc11rv 2266	Version of ~ axc11r with a...
drsb2 2267	Formula-building lemma for...
equsalv 2268	An equivalence related to ...
equsexv 2269	An equivalence related to ...
equsexvOLD 2270	Obsolete version of ~ equs...
sbft 2271	Substitution has no effect...
sbf 2272	Substitution for a variabl...
sbf2 2273	Substitution has no effect...
sbh 2274	Substitution for a variabl...
hbs1 2275	The setvar ` x ` is not fr...
nfs1f 2276	If ` x ` is not free in ` ...
sb5 2277	Alternate definition of su...
sb5OLD 2278	Obsolete version of ~ sb5 ...
sb56OLD 2279	Obsolete version of ~ sbal...
equs5av 2280	A property related to subs...
2sb5 2281	Equivalence for double sub...
sbco4lemOLDOLD 2282	Obsolete version of ~ sbco...
dfsb7 2283	An alternate definition of...
sbn 2284	Negation inside and outsid...
sbex 2285	Move existential quantifie...
nf5 2286	Alternate definition of ~ ...
nf6 2287	An alternate definition of...
nf5d 2288	Deduce that ` x ` is not f...
nf5di 2289	Since the converse holds b...
19.9h 2290	A wff may be existentially...
19.21h 2291	Theorem 19.21 of [Margaris...
19.23h 2292	Theorem 19.23 of [Margaris...
exlimih 2293	Inference associated with ...
exlimdh 2294	Deduction form of Theorem ...
equsalhw 2295	Version of ~ equsalh with ...
equsexhv 2296	An equivalence related to ...
hba1 2297	The setvar ` x ` is not fr...
hbnt 2298	Closed theorem version of ...
hbn 2299	If ` x ` is not free in ` ...
hbnd 2300	Deduction form of bound-va...
hbim1 2301	A closed form of ~ hbim . ...
hbimd 2302	Deduction form of bound-va...
hbim 2303	If ` x ` is not free in ` ...
hban 2304	If ` x ` is not free in ` ...
hb3an 2305	If ` x ` is not free in ` ...
sbi2 2306	Introduction of implicatio...
sbim 2307	Implication inside and out...
sbrim 2308	Substitution in an implica...
sbrimOLD 2309	Obsolete version of ~ sbri...
sblim 2310	Substitution in an implica...
sbor 2311	Disjunction inside and out...
sbbi 2312	Equivalence inside and out...
sblbis 2313	Introduce left bicondition...
sbrbis 2314	Introduce right biconditio...
sbrbif 2315	Introduce right biconditio...
sbnf 2316	Move nonfree predicate in ...
sbnfOLD 2317	Obsolete version of ~ sbnf...
sbiev 2318	Conversion of implicit sub...
sbievOLD 2319	Obsolete version of ~ sbie...
sbiedw 2320	Conversion of implicit sub...
axc7 2321	Show that the original axi...
axc7e 2322	Abbreviated version of ~ a...
modal-b 2323	The analogue in our predic...
19.9ht 2324	A closed version of ~ 19.9...
axc4 2325	Show that the original axi...
axc4i 2326	Inference version of ~ axc...
nfal 2327	If ` x ` is not free in ` ...
nfex 2328	If ` x ` is not free in ` ...
hbex 2329	If ` x ` is not free in ` ...
nfnf 2330	If ` x ` is not free in ` ...
19.12 2331	Theorem 19.12 of [Margaris...
nfald 2332	Deduction form of ~ nfal ....
nfexd 2333	If ` x ` is not free in ` ...
nfsbv 2334	If ` z ` is not free in ` ...
nfsbvOLD 2335	Obsolete version of ~ nfsb...
sbco2v 2336	A composition law for subs...
aaan 2337	Distribute universal quant...
aaanOLD 2338	Obsolete version of ~ aaan...
eeor 2339	Distribute existential qua...
eeorOLD 2340	Obsolete version of ~ eeor...
cbv3v 2341	Rule used to change bound ...
cbv1v 2342	Rule used to change bound ...
cbv2w 2343	Rule used to change bound ...
cbvaldw 2344	Deduction used to change b...
cbvexdw 2345	Deduction used to change b...
cbv3hv 2346	Rule used to change bound ...
cbvalv1 2347	Rule used to change bound ...
cbvexv1 2348	Rule used to change bound ...
cbval2v 2349	Rule used to change bound ...
cbvex2v 2350	Rule used to change bound ...
dvelimhw 2351	Proof of ~ dvelimh without...
pm11.53 2352	Theorem *11.53 in [Whitehe...
19.12vv 2353	Special case of ~ 19.12 wh...
eean 2354	Distribute existential qua...
eeanv 2355	Distribute a pair of exist...
eeeanv 2356	Distribute three existenti...
ee4anv 2357	Distribute two pairs of ex...
sb8v 2358	Substitution of variable i...
sb8f 2359	Substitution of variable i...
sb8fOLD 2360	Obsolete version of ~ sb8f...
sb8ef 2361	Substitution of variable i...
2sb8ef 2362	An equivalent expression f...
sb6rfv 2363	Reversed substitution. Ve...
sbnf2 2364	Two ways of expressing " `...
exsb 2365	An equivalent expression f...
2exsb 2366	An equivalent expression f...
sbbib 2367	Reversal of substitution. ...
sbbibvv 2368	Reversal of substitution. ...
cbvsbvf 2369	Change the bound variable ...
cleljustALT 2370	Alternate proof of ~ clelj...
cleljustALT2 2371	Alternate proof of ~ clelj...
equs5aALT 2372	Alternate proof of ~ equs5...
equs5eALT 2373	Alternate proof of ~ equs5...
axc11r 2374	Same as ~ axc11 but with r...
dral1v 2375	Formula-building lemma for...
dral1vOLD 2376	Obsolete version of ~ dral...
drex1v 2377	Formula-building lemma for...
drnf1v 2378	Formula-building lemma for...
drnf1vOLD 2379	Obsolete version of ~ drnf...
ax13v 2381	A weaker version of ~ ax-1...
ax13lem1 2382	A version of ~ ax13v with ...
ax13 2383	Derive ~ ax-13 from ~ ax13...
ax13lem2 2384	Lemma for ~ nfeqf2 . This...
nfeqf2 2385	An equation between setvar...
dveeq2 2386	Quantifier introduction wh...
nfeqf1 2387	An equation between setvar...
dveeq1 2388	Quantifier introduction wh...
nfeqf 2389	A variable is effectively ...
axc9 2390	Derive set.mm's original ~...
ax6e 2391	At least one individual ex...
ax6 2392	Theorem showing that ~ ax-...
axc10 2393	Show that the original axi...
spimt 2394	Closed theorem form of ~ s...
spim 2395	Specialization, using impl...
spimed 2396	Deduction version of ~ spi...
spime 2397	Existential introduction, ...
spimv 2398	A version of ~ spim with a...
spimvALT 2399	Alternate proof of ~ spimv...
spimev 2400	Distinct-variable version ...
spv 2401	Specialization, using impl...
spei 2402	Inference from existential...
chvar 2403	Implicit substitution of `...
chvarv 2404	Implicit substitution of `...
cbv3 2405	Rule used to change bound ...
cbval 2406	Rule used to change bound ...
cbvex 2407	Rule used to change bound ...
cbvalv 2408	Rule used to change bound ...
cbvexv 2409	Rule used to change bound ...
cbv1 2410	Rule used to change bound ...
cbv2 2411	Rule used to change bound ...
cbv3h 2412	Rule used to change bound ...
cbv1h 2413	Rule used to change bound ...
cbv2h 2414	Rule used to change bound ...
cbvald 2415	Deduction used to change b...
cbvexd 2416	Deduction used to change b...
cbvaldva 2417	Rule used to change the bo...
cbvexdva 2418	Rule used to change the bo...
cbval2 2419	Rule used to change bound ...
cbvex2 2420	Rule used to change bound ...
cbval2vv 2421	Rule used to change bound ...
cbvex2vv 2422	Rule used to change bound ...
cbvex4v 2423	Rule used to change bound ...
equs4 2424	Lemma used in proofs of im...
equsal 2425	An equivalence related to ...
equsex 2426	An equivalence related to ...
equsexALT 2427	Alternate proof of ~ equse...
equsalh 2428	An equivalence related to ...
equsexh 2429	An equivalence related to ...
axc15 2430	Derivation of set.mm's ori...
ax12 2431	Rederivation of Axiom ~ ax...
ax12b 2432	A bidirectional version of...
ax13ALT 2433	Alternate proof of ~ ax13 ...
axc11n 2434	Derive set.mm's original ~...
aecom 2435	Commutation law for identi...
aecoms 2436	A commutation rule for ide...
naecoms 2437	A commutation rule for dis...
axc11 2438	Show that ~ ax-c11 can be ...
hbae 2439	All variables are effectiv...
hbnae 2440	All variables are effectiv...
nfae 2441	All variables are effectiv...
nfnae 2442	All variables are effectiv...
hbnaes 2443	Rule that applies ~ hbnae ...
axc16i 2444	Inference with ~ axc16 as ...
axc16nfALT 2445	Alternate proof of ~ axc16...
dral2 2446	Formula-building lemma for...
dral1 2447	Formula-building lemma for...
dral1ALT 2448	Alternate proof of ~ dral1...
drex1 2449	Formula-building lemma for...
drex2 2450	Formula-building lemma for...
drnf1 2451	Formula-building lemma for...
drnf2 2452	Formula-building lemma for...
nfald2 2453	Variation on ~ nfald which...
nfexd2 2454	Variation on ~ nfexd which...
exdistrf 2455	Distribution of existentia...
dvelimf 2456	Version of ~ dvelimv witho...
dvelimdf 2457	Deduction form of ~ dvelim...
dvelimh 2458	Version of ~ dvelim withou...
dvelim 2459	This theorem can be used t...
dvelimv 2460	Similar to ~ dvelim with f...
dvelimnf 2461	Version of ~ dvelim using ...
dveeq2ALT 2462	Alternate proof of ~ dveeq...
equvini 2463	A variable introduction la...
equvel 2464	A variable elimination law...
equs5a 2465	A property related to subs...
equs5e 2466	A property related to subs...
equs45f 2467	Two ways of expressing sub...
equs5 2468	Lemma used in proofs of su...
dveel1 2469	Quantifier introduction wh...
dveel2 2470	Quantifier introduction wh...
axc14 2471	Axiom ~ ax-c14 is redundan...
sb6x 2472	Equivalence involving subs...
sbequ5 2473	Substitution does not chan...
sbequ6 2474	Substitution does not chan...
sb5rf 2475	Reversed substitution. Us...
sb6rf 2476	Reversed substitution. Fo...
ax12vALT 2477	Alternate proof of ~ ax12v...
2ax6elem 2478	We can always find values ...
2ax6e 2479	We can always find values ...
2sb5rf 2480	Reversed double substituti...
2sb6rf 2481	Reversed double substituti...
sbel2x 2482	Elimination of double subs...
sb4b 2483	Simplified definition of s...
sb3b 2484	Simplified definition of s...
sb3 2485	One direction of a simplif...
sb1 2486	One direction of a simplif...
sb2 2487	One direction of a simplif...
sb4a 2488	A version of one implicati...
dfsb1 2489	Alternate definition of su...
hbsb2 2490	Bound-variable hypothesis ...
nfsb2 2491	Bound-variable hypothesis ...
hbsb2a 2492	Special case of a bound-va...
sb4e 2493	One direction of a simplif...
hbsb2e 2494	Special case of a bound-va...
hbsb3 2495	If ` y ` is not free in ` ...
nfs1 2496	If ` y ` is not free in ` ...
axc16ALT 2497	Alternate proof of ~ axc16...
axc16gALT 2498	Alternate proof of ~ axc16...
equsb1 2499	Substitution applied to an...
equsb2 2500	Substitution applied to an...
dfsb2 2501	An alternate definition of...
dfsb3 2502	An alternate definition of...
drsb1 2503	Formula-building lemma for...
sb2ae 2504	In the case of two success...
sb6f 2505	Equivalence for substituti...
sb5f 2506	Equivalence for substituti...
nfsb4t 2507	A variable not free in a p...
nfsb4 2508	A variable not free in a p...
sbequ8 2509	Elimination of equality fr...
sbie 2510	Conversion of implicit sub...
sbied 2511	Conversion of implicit sub...
sbiedv 2512	Conversion of implicit sub...
2sbiev 2513	Conversion of double impli...
sbcom3 2514	Substituting ` y ` for ` x...
sbco 2515	A composition law for subs...
sbid2 2516	An identity law for substi...
sbid2v 2517	An identity law for substi...
sbidm 2518	An idempotent law for subs...
sbco2 2519	A composition law for subs...
sbco2d 2520	A composition law for subs...
sbco3 2521	A composition law for subs...
sbcom 2522	A commutativity law for su...
sbtrt 2523	Partially closed form of ~...
sbtr 2524	A partial converse to ~ sb...
sb8 2525	Substitution of variable i...
sb8e 2526	Substitution of variable i...
sb9 2527	Commutation of quantificat...
sb9i 2528	Commutation of quantificat...
sbhb 2529	Two ways of expressing " `...
nfsbd 2530	Deduction version of ~ nfs...
nfsb 2531	If ` z ` is not free in ` ...
hbsb 2532	If ` z ` is not free in ` ...
sb7f 2533	This version of ~ dfsb7 do...
sb7h 2534	This version of ~ dfsb7 do...
sb10f 2535	Hao Wang's identity axiom ...
sbal1 2536	Check out ~ sbal for a ver...
sbal2 2537	Move quantifier in and out...
2sb8e 2538	An equivalent expression f...
dfmoeu 2539	An elementary proof of ~ m...
dfeumo 2540	An elementary proof showin...
mojust 2542	Soundness justification th...
nexmo 2544	Nonexistence implies uniqu...
exmo 2545	Any proposition holds for ...
moabs 2546	Absorption of existence co...
moim 2547	The at-most-one quantifier...
moimi 2548	The at-most-one quantifier...
moimdv 2549	The at-most-one quantifier...
mobi 2550	Equivalence theorem for th...
mobii 2551	Formula-building rule for ...
mobidv 2552	Formula-building rule for ...
mobid 2553	Formula-building rule for ...
moa1 2554	If an implication holds fo...
moan 2555	"At most one" is still the...
moani 2556	"At most one" is still tru...
moor 2557	"At most one" is still the...
mooran1 2558	"At most one" imports disj...
mooran2 2559	"At most one" exports disj...
nfmo1 2560	Bound-variable hypothesis ...
nfmod2 2561	Bound-variable hypothesis ...
nfmodv 2562	Bound-variable hypothesis ...
nfmov 2563	Bound-variable hypothesis ...
nfmod 2564	Bound-variable hypothesis ...
nfmo 2565	Bound-variable hypothesis ...
mof 2566	Version of ~ df-mo with di...
mo3 2567	Alternate definition of th...
mo 2568	Equivalent definitions of ...
mo4 2569	At-most-one quantifier exp...
mo4f 2570	At-most-one quantifier exp...
eu3v 2573	An alternate way to expres...
eujust 2574	Soundness justification th...
eujustALT 2575	Alternate proof of ~ eujus...
eu6lem 2576	Lemma of ~ eu6im . A diss...
eu6 2577	Alternate definition of th...
eu6im 2578	One direction of ~ eu6 nee...
euf 2579	Version of ~ eu6 with disj...
euex 2580	Existential uniqueness imp...
eumo 2581	Existential uniqueness imp...
eumoi 2582	Uniqueness inferred from e...
exmoeub 2583	Existence implies that uni...
exmoeu 2584	Existence is equivalent to...
moeuex 2585	Uniqueness implies that ex...
moeu 2586	Uniqueness is equivalent t...
eubi 2587	Equivalence theorem for th...
eubii 2588	Introduce unique existenti...
eubidv 2589	Formula-building rule for ...
eubid 2590	Formula-building rule for ...
nfeu1 2591	Bound-variable hypothesis ...
nfeu1ALT 2592	Alternate proof of ~ nfeu1...
nfeud2 2593	Bound-variable hypothesis ...
nfeudw 2594	Bound-variable hypothesis ...
nfeud 2595	Bound-variable hypothesis ...
nfeuw 2596	Bound-variable hypothesis ...
nfeu 2597	Bound-variable hypothesis ...
dfeu 2598	Rederive ~ df-eu from the ...
dfmo 2599	Rederive ~ df-mo from the ...
euequ 2600	There exists a unique set ...
sb8eulem 2601	Lemma. Factor out the com...
sb8euv 2602	Variable substitution in u...
sb8eu 2603	Variable substitution in u...
sb8mo 2604	Variable substitution for ...
cbvmovw 2605	Change bound variable. Us...
cbvmow 2606	Rule used to change bound ...
cbvmo 2607	Rule used to change bound ...
cbveuvw 2608	Change bound variable. Us...
cbveuw 2609	Version of ~ cbveu with a ...
cbveu 2610	Rule used to change bound ...
cbveuALT 2611	Alternative proof of ~ cbv...
eu2 2612	An alternate way of defini...
eu1 2613	An alternate way to expres...
euor 2614	Introduce a disjunct into ...
euorv 2615	Introduce a disjunct into ...
euor2 2616	Introduce or eliminate a d...
sbmo 2617	Substitution into an at-mo...
eu4 2618	Uniqueness using implicit ...
euimmo 2619	Existential uniqueness imp...
euim 2620	Add unique existential qua...
moanimlem 2621	Factor out the common proo...
moanimv 2622	Introduction of a conjunct...
moanim 2623	Introduction of a conjunct...
euan 2624	Introduction of a conjunct...
moanmo 2625	Nested at-most-one quantif...
moaneu 2626	Nested at-most-one and uni...
euanv 2627	Introduction of a conjunct...
mopick 2628	"At most one" picks a vari...
moexexlem 2629	Factor out the proof skele...
2moexv 2630	Double quantification with...
moexexvw 2631	"At most one" double quant...
2moswapv 2632	A condition allowing to sw...
2euswapv 2633	A condition allowing to sw...
2euexv 2634	Double quantification with...
2exeuv 2635	Double existential uniquen...
eupick 2636	Existential uniqueness "pi...
eupicka 2637	Version of ~ eupick with c...
eupickb 2638	Existential uniqueness "pi...
eupickbi 2639	Theorem *14.26 in [Whitehe...
mopick2 2640	"At most one" can show the...
moexex 2641	"At most one" double quant...
moexexv 2642	"At most one" double quant...
2moex 2643	Double quantification with...
2euex 2644	Double quantification with...
2eumo 2645	Nested unique existential ...
2eu2ex 2646	Double existential uniquen...
2moswap 2647	A condition allowing to sw...
2euswap 2648	A condition allowing to sw...
2exeu 2649	Double existential uniquen...
2mo2 2650	Two ways of expressing "th...
2mo 2651	Two ways of expressing "th...
2mos 2652	Double "there exists at mo...
2mosOLD 2653	Obsolete version of ~ 2mos...
2eu1 2654	Double existential uniquen...
2eu1v 2655	Double existential uniquen...
2eu2 2656	Double existential uniquen...
2eu3 2657	Double existential uniquen...
2eu4 2658	This theorem provides us w...
2eu5 2659	An alternate definition of...
2eu6 2660	Two equivalent expressions...
2eu7 2661	Two equivalent expressions...
2eu8 2662	Two equivalent expressions...
euae 2663	Two ways to express "exact...
exists1 2664	Two ways to express "exact...
exists2 2665	A condition implying that ...
barbara 2666	"Barbara", one of the fund...
celarent 2667	"Celarent", one of the syl...
darii 2668	"Darii", one of the syllog...
dariiALT 2669	Alternate proof of ~ darii...
ferio 2670	"Ferio" ("Ferioque"), one ...
barbarilem 2671	Lemma for ~ barbari and th...
barbari 2672	"Barbari", one of the syll...
barbariALT 2673	Alternate proof of ~ barba...
celaront 2674	"Celaront", one of the syl...
cesare 2675	"Cesare", one of the syllo...
camestres 2676	"Camestres", one of the sy...
festino 2677	"Festino", one of the syll...
festinoALT 2678	Alternate proof of ~ festi...
baroco 2679	"Baroco", one of the syllo...
barocoALT 2680	Alternate proof of ~ festi...
cesaro 2681	"Cesaro", one of the syllo...
camestros 2682	"Camestros", one of the sy...
datisi 2683	"Datisi", one of the syllo...
disamis 2684	"Disamis", one of the syll...
ferison 2685	"Ferison", one of the syll...
bocardo 2686	"Bocardo", one of the syll...
darapti 2687	"Darapti", one of the syll...
daraptiALT 2688	Alternate proof of ~ darap...
felapton 2689	"Felapton", one of the syl...
calemes 2690	"Calemes", one of the syll...
dimatis 2691	"Dimatis", one of the syll...
fresison 2692	"Fresison", one of the syl...
calemos 2693	"Calemos", one of the syll...
fesapo 2694	"Fesapo", one of the syllo...
bamalip 2695	"Bamalip", one of the syll...
axia1 2696	Left 'and' elimination (in...
axia2 2697	Right 'and' elimination (i...
axia3 2698	'And' introduction (intuit...
axin1 2699	'Not' introduction (intuit...
axin2 2700	'Not' elimination (intuiti...
axio 2701	Definition of 'or' (intuit...
axi4 2702	Specialization (intuitioni...
axi5r 2703	Converse of ~ axc4 (intuit...
axial 2704	The setvar ` x ` is not fr...
axie1 2705	The setvar ` x ` is not fr...
axie2 2706	A key property of existent...
axi9 2707	Axiom of existence (intuit...
axi10 2708	Axiom of Quantifier Substi...
axi12 2709	Axiom of Quantifier Introd...
axbnd 2710	Axiom of Bundling (intuiti...
axexte 2712	The axiom of extensionalit...
axextg 2713	A generalization of the ax...
axextb 2714	A bidirectional version of...
axextmo 2715	There exists at most one s...
nulmo 2716	There exists at most one e...
eleq1ab 2719	Extension (in the sense of...
cleljustab 2720	Extension of ~ cleljust fr...
abid 2721	Simplification of class ab...
vexwt 2722	A standard theorem of pred...
vexw 2723	If ` ph ` is a theorem, th...
vextru 2724	Every setvar is a member o...
nfsab1 2725	Bound-variable hypothesis ...
hbab1 2726	Bound-variable hypothesis ...
hbab1OLD 2727	Obsolete version of ~ hbab...
hbab 2728	Bound-variable hypothesis ...
hbabg 2729	Bound-variable hypothesis ...
nfsab 2730	Bound-variable hypothesis ...
nfsabg 2731	Bound-variable hypothesis ...
dfcleq 2733	The defining characterizat...
cvjust 2734	Every set is a class. Pro...
ax9ALT 2735	Proof of ~ ax-9 from Tarsk...
eleq2w2 2736	A weaker version of ~ eleq...
eqriv 2737	Infer equality of classes ...
eqrdv 2738	Deduce equality of classes...
eqrdav 2739	Deduce equality of classes...
eqid 2740	Law of identity (reflexivi...
eqidd 2741	Class identity law with an...
eqeq1d 2742	Deduction from equality to...
eqeq1dALT 2743	Alternate proof of ~ eqeq1...
eqeq1 2744	Equality implies equivalen...
eqeq1i 2745	Inference from equality to...
eqcomd 2746	Deduction from commutative...
eqcom 2747	Commutative law for class ...
eqcoms 2748	Inference applying commuta...
eqcomi 2749	Inference from commutative...
neqcomd 2750	Commute an inequality. (C...
eqeq2d 2751	Deduction from equality to...
eqeq2 2752	Equality implies equivalen...
eqeq2i 2753	Inference from equality to...
eqeqan12d 2754	A useful inference for sub...
eqeqan12rd 2755	A useful inference for sub...
eqeq12d 2756	A useful inference for sub...
eqeq12 2757	Equality relationship amon...
eqeq12i 2758	A useful inference for sub...
eqeq12OLD 2759	Obsolete version of ~ eqeq...
eqeq12dOLD 2760	Obsolete version of ~ eqeq...
eqeqan12dOLD 2761	Obsolete version of ~ eqeq...
eqeqan12dALT 2762	Alternate proof of ~ eqeqa...
eqtr 2763	Transitive law for class e...
eqtr2 2764	A transitive law for class...
eqtr2OLD 2765	Obsolete version of eqtr2 ...
eqtr3 2766	A transitive law for class...
eqtr3OLD 2767	Obsolete version of ~ eqtr...
eqtri 2768	An equality transitivity i...
eqtr2i 2769	An equality transitivity i...
eqtr3i 2770	An equality transitivity i...
eqtr4i 2771	An equality transitivity i...
3eqtri 2772	An inference from three ch...
3eqtrri 2773	An inference from three ch...
3eqtr2i 2774	An inference from three ch...
3eqtr2ri 2775	An inference from three ch...
3eqtr3i 2776	An inference from three ch...
3eqtr3ri 2777	An inference from three ch...
3eqtr4i 2778	An inference from three ch...
3eqtr4ri 2779	An inference from three ch...
eqtrd 2780	An equality transitivity d...
eqtr2d 2781	An equality transitivity d...
eqtr3d 2782	An equality transitivity e...
eqtr4d 2783	An equality transitivity e...
3eqtrd 2784	A deduction from three cha...
3eqtrrd 2785	A deduction from three cha...
3eqtr2d 2786	A deduction from three cha...
3eqtr2rd 2787	A deduction from three cha...
3eqtr3d 2788	A deduction from three cha...
3eqtr3rd 2789	A deduction from three cha...
3eqtr4d 2790	A deduction from three cha...
3eqtr4rd 2791	A deduction from three cha...
eqtrid 2792	An equality transitivity d...
eqtr2id 2793	An equality transitivity d...
eqtr3id 2794	An equality transitivity d...
eqtr3di 2795	An equality transitivity d...
eqtrdi 2796	An equality transitivity d...
eqtr2di 2797	An equality transitivity d...
eqtr4di 2798	An equality transitivity d...
eqtr4id 2799	An equality transitivity d...
sylan9eq 2800	An equality transitivity d...
sylan9req 2801	An equality transitivity d...
sylan9eqr 2802	An equality transitivity d...
3eqtr3g 2803	A chained equality inferen...
3eqtr3a 2804	A chained equality inferen...
3eqtr4g 2805	A chained equality inferen...
3eqtr4a 2806	A chained equality inferen...
eq2tri 2807	A compound transitive infe...
iseqsetvlem 2808	Lemma for ~ iseqsetv-cleq ...
iseqsetv-cleq 2809	Alternate proof of ~ iseqs...
abbi 2810	Equivalent formulas yield ...
abbidv 2811	Equivalent wff's yield equ...
abbii 2812	Equivalent wff's yield equ...
abbid 2813	Equivalent wff's yield equ...
abbib 2814	Equal class abstractions r...
cbvabv 2815	Rule used to change bound ...
cbvabw 2816	Rule used to change bound ...
cbvab 2817	Rule used to change bound ...
eqabbw 2818	Version of ~ eqabb using i...
dfclel 2820	Characterization of the el...
elex2 2821	If a class contains anothe...
issettru 2822	Weak version of ~ isset . ...
iseqsetv-clel 2823	Alternate proof of ~ iseqs...
issetlem 2824	Lemma for ~ elisset and ~ ...
elissetv 2825	An element of a class exis...
elisset 2826	An element of a class exis...
eleq1w 2827	Weaker version of ~ eleq1 ...
eleq2w 2828	Weaker version of ~ eleq2 ...
eleq1d 2829	Deduction from equality to...
eleq2d 2830	Deduction from equality to...
eleq2dALT 2831	Alternate proof of ~ eleq2...
eleq1 2832	Equality implies equivalen...
eleq2 2833	Equality implies equivalen...
eleq12 2834	Equality implies equivalen...
eleq1i 2835	Inference from equality to...
eleq2i 2836	Inference from equality to...
eleq12i 2837	Inference from equality to...
eleq12d 2838	Deduction from equality to...
eleq1a 2839	A transitive-type law rela...
eqeltri 2840	Substitution of equal clas...
eqeltrri 2841	Substitution of equal clas...
eleqtri 2842	Substitution of equal clas...
eleqtrri 2843	Substitution of equal clas...
eqeltrd 2844	Substitution of equal clas...
eqeltrrd 2845	Deduction that substitutes...
eleqtrd 2846	Deduction that substitutes...
eleqtrrd 2847	Deduction that substitutes...
eqeltrid 2848	A membership and equality ...
eqeltrrid 2849	A membership and equality ...
eleqtrid 2850	A membership and equality ...
eleqtrrid 2851	A membership and equality ...
eqeltrdi 2852	A membership and equality ...
eqeltrrdi 2853	A membership and equality ...
eleqtrdi 2854	A membership and equality ...
eleqtrrdi 2855	A membership and equality ...
3eltr3i 2856	Substitution of equal clas...
3eltr4i 2857	Substitution of equal clas...
3eltr3d 2858	Substitution of equal clas...
3eltr4d 2859	Substitution of equal clas...
3eltr3g 2860	Substitution of equal clas...
3eltr4g 2861	Substitution of equal clas...
eleq2s 2862	Substitution of equal clas...
eqneltri 2863	If a class is not an eleme...
eqneltrd 2864	If a class is not an eleme...
eqneltrrd 2865	If a class is not an eleme...
neleqtrd 2866	If a class is not an eleme...
neleqtrrd 2867	If a class is not an eleme...
nelneq 2868	A way of showing two class...
nelneq2 2869	A way of showing two class...
eqsb1 2870	Substitution for the left-...
clelsb1 2871	Substitution for the first...
clelsb2 2872	Substitution for the secon...
clelsb2OLD 2873	Obsolete version of ~ clel...
cleqh 2874	Establish equality between...
hbxfreq 2875	A utility lemma to transfe...
hblem 2876	Change the free variable o...
hblemg 2877	Change the free variable o...
eqabdv 2878	Deduction from a wff to a ...
eqabcdv 2879	Deduction from a wff to a ...
eqabi 2880	Equality of a class variab...
abid1 2881	Every class is equal to a ...
abid2 2882	A simplification of class ...
eqab 2883	One direction of ~ eqabb i...
eqabb 2884	Equality of a class variab...
eqabbOLD 2885	Obsolete version of ~ eqab...
eqabcb 2886	Equality of a class variab...
eqabrd 2887	Equality of a class variab...
eqabri 2888	Equality of a class variab...
eqabcri 2889	Equality of a class variab...
clelab 2890	Membership of a class vari...
clabel 2891	Membership of a class abst...
sbab 2892	The right-hand side of the...
nfcjust 2894	Justification theorem for ...
nfci 2896	Deduce that a class ` A ` ...
nfcii 2897	Deduce that a class ` A ` ...
nfcr 2898	Consequence of the not-fre...
nfcrALT 2899	Alternate version of ~ nfc...
nfcri 2900	Consequence of the not-fre...
nfcd 2901	Deduce that a class ` A ` ...
nfcrd 2902	Consequence of the not-fre...
nfcrii 2903	Consequence of the not-fre...
nfceqdf 2904	An equality theorem for ef...
nfceqi 2905	Equality theorem for class...
nfcxfr 2906	A utility lemma to transfe...
nfcxfrd 2907	A utility lemma to transfe...
nfcv 2908	If ` x ` is disjoint from ...
nfcvd 2909	If ` x ` is disjoint from ...
nfab1 2910	Bound-variable hypothesis ...
nfnfc1 2911	The setvar ` x ` is bound ...
clelsb1fw 2912	Substitution for the first...
clelsb1f 2913	Substitution for the first...
nfab 2914	Bound-variable hypothesis ...
nfabg 2915	Bound-variable hypothesis ...
nfaba1 2916	Bound-variable hypothesis ...
nfaba1OLD 2917	Obsolete version of ~ nfab...
nfaba1g 2918	Bound-variable hypothesis ...
nfeqd 2919	Hypothesis builder for equ...
nfeld 2920	Hypothesis builder for ele...
nfnfc 2921	Hypothesis builder for ` F...
nfeq 2922	Hypothesis builder for equ...
nfel 2923	Hypothesis builder for ele...
nfeq1 2924	Hypothesis builder for equ...
nfel1 2925	Hypothesis builder for ele...
nfeq2 2926	Hypothesis builder for equ...
nfel2 2927	Hypothesis builder for ele...
drnfc1 2928	Formula-building lemma for...
drnfc1OLD 2929	Obsolete version of ~ drnf...
drnfc2 2930	Formula-building lemma for...
drnfc2OLD 2931	Obsolete version of ~ drnf...
nfabdw 2932	Bound-variable hypothesis ...
nfabdwOLD 2933	Obsolete version of ~ nfab...
nfabd 2934	Bound-variable hypothesis ...
nfabd2 2935	Bound-variable hypothesis ...
dvelimdc 2936	Deduction form of ~ dvelim...
dvelimc 2937	Version of ~ dvelim for cl...
nfcvf 2938	If ` x ` and ` y ` are dis...
nfcvf2 2939	If ` x ` and ` y ` are dis...
cleqf 2940	Establish equality between...
eqabf 2941	Equality of a class variab...
abid2f 2942	A simplification of class ...
abid2fOLD 2943	Obsolete version of ~ abid...
sbabel 2944	Theorem to move a substitu...
sbabelOLD 2945	Obsolete version of ~ sbab...
neii 2948	Inference associated with ...
neir 2949	Inference associated with ...
nne 2950	Negation of inequality. (...
neneqd 2951	Deduction eliminating ineq...
neneq 2952	From inequality to non-equ...
neqned 2953	If it is not the case that...
neqne 2954	From non-equality to inequ...
neirr 2955	No class is unequal to its...
exmidne 2956	Excluded middle with equal...
eqneqall 2957	A contradiction concerning...
nonconne 2958	Law of noncontradiction wi...
necon3ad 2959	Contrapositive law deducti...
necon3bd 2960	Contrapositive law deducti...
necon2ad 2961	Contrapositive inference f...
necon2bd 2962	Contrapositive inference f...
necon1ad 2963	Contrapositive deduction f...
necon1bd 2964	Contrapositive deduction f...
necon4ad 2965	Contrapositive inference f...
necon4bd 2966	Contrapositive inference f...
necon3d 2967	Contrapositive law deducti...
necon1d 2968	Contrapositive law deducti...
necon2d 2969	Contrapositive inference f...
necon4d 2970	Contrapositive inference f...
necon3ai 2971	Contrapositive inference f...
necon3aiOLD 2972	Obsolete version of ~ neco...
necon3bi 2973	Contrapositive inference f...
necon1ai 2974	Contrapositive inference f...
necon1bi 2975	Contrapositive inference f...
necon2ai 2976	Contrapositive inference f...
necon2bi 2977	Contrapositive inference f...
necon4ai 2978	Contrapositive inference f...
necon3i 2979	Contrapositive inference f...
necon1i 2980	Contrapositive inference f...
necon2i 2981	Contrapositive inference f...
necon4i 2982	Contrapositive inference f...
necon3abid 2983	Deduction from equality to...
necon3bbid 2984	Deduction from equality to...
necon1abid 2985	Contrapositive deduction f...
necon1bbid 2986	Contrapositive inference f...
necon4abid 2987	Contrapositive law deducti...
necon4bbid 2988	Contrapositive law deducti...
necon2abid 2989	Contrapositive deduction f...
necon2bbid 2990	Contrapositive deduction f...
necon3bid 2991	Deduction from equality to...
necon4bid 2992	Contrapositive law deducti...
necon3abii 2993	Deduction from equality to...
necon3bbii 2994	Deduction from equality to...
necon1abii 2995	Contrapositive inference f...
necon1bbii 2996	Contrapositive inference f...
necon2abii 2997	Contrapositive inference f...
necon2bbii 2998	Contrapositive inference f...
necon3bii 2999	Inference from equality to...
necom 3000	Commutation of inequality....
necomi 3001	Inference from commutative...
necomd 3002	Deduction from commutative...
nesym 3003	Characterization of inequa...
nesymi 3004	Inference associated with ...
nesymir 3005	Inference associated with ...
neeq1d 3006	Deduction for inequality. ...
neeq2d 3007	Deduction for inequality. ...
neeq12d 3008	Deduction for inequality. ...
neeq1 3009	Equality theorem for inequ...
neeq2 3010	Equality theorem for inequ...
neeq1i 3011	Inference for inequality. ...
neeq2i 3012	Inference for inequality. ...
neeq12i 3013	Inference for inequality. ...
eqnetrd 3014	Substitution of equal clas...
eqnetrrd 3015	Substitution of equal clas...
neeqtrd 3016	Substitution of equal clas...
eqnetri 3017	Substitution of equal clas...
eqnetrri 3018	Substitution of equal clas...
neeqtri 3019	Substitution of equal clas...
neeqtrri 3020	Substitution of equal clas...
neeqtrrd 3021	Substitution of equal clas...
eqnetrrid 3022	A chained equality inferen...
3netr3d 3023	Substitution of equality i...
3netr4d 3024	Substitution of equality i...
3netr3g 3025	Substitution of equality i...
3netr4g 3026	Substitution of equality i...
nebi 3027	Contraposition law for ine...
pm13.18 3028	Theorem *13.18 in [Whitehe...
pm13.181 3029	Theorem *13.181 in [Whiteh...
pm13.181OLD 3030	Obsolete version of ~ pm13...
pm2.61ine 3031	Inference eliminating an i...
pm2.21ddne 3032	A contradiction implies an...
pm2.61ne 3033	Deduction eliminating an i...
pm2.61dne 3034	Deduction eliminating an i...
pm2.61dane 3035	Deduction eliminating an i...
pm2.61da2ne 3036	Deduction eliminating two ...
pm2.61da3ne 3037	Deduction eliminating thre...
pm2.61iine 3038	Equality version of ~ pm2....
mteqand 3039	A modus tollens deduction ...
neor 3040	Logical OR with an equalit...
neanior 3041	A De Morgan's law for ineq...
ne3anior 3042	A De Morgan's law for ineq...
neorian 3043	A De Morgan's law for ineq...
nemtbir 3044	An inference from an inequ...
nelne1 3045	Two classes are different ...
nelne2 3046	Two classes are different ...
nelelne 3047	Two classes are different ...
neneor 3048	If two classes are differe...
nfne 3049	Bound-variable hypothesis ...
nfned 3050	Bound-variable hypothesis ...
nabbib 3051	Not equivalent wff's corre...
neli 3054	Inference associated with ...
nelir 3055	Inference associated with ...
nelcon3d 3056	Contrapositive law deducti...
neleq12d 3057	Equality theorem for negat...
neleq1 3058	Equality theorem for negat...
neleq2 3059	Equality theorem for negat...
nfnel 3060	Bound-variable hypothesis ...
nfneld 3061	Bound-variable hypothesis ...
nnel 3062	Negation of negated member...
elnelne1 3063	Two classes are different ...
elnelne2 3064	Two classes are different ...
pm2.24nel 3065	A contradiction concerning...
pm2.61danel 3066	Deduction eliminating an e...
rgen 3069	Generalization rule for re...
ralel 3070	All elements of a class ar...
rgenw 3071	Generalization rule for re...
rgen2w 3072	Generalization rule for re...
mprg 3073	Modus ponens combined with...
mprgbir 3074	Modus ponens on biconditio...
raln 3075	Restricted universally qua...
ralnex 3078	Relationship between restr...
dfrex2 3079	Relationship between restr...
nrex 3080	Inference adding restricte...
alral 3081	Universal quantification i...
rexex 3082	Restricted existence impli...
rextru 3083	Two ways of expressing tha...
ralimi2 3084	Inference quantifying both...
reximi2 3085	Inference quantifying both...
ralimia 3086	Inference quantifying both...
reximia 3087	Inference quantifying both...
ralimiaa 3088	Inference quantifying both...
ralimi 3089	Inference quantifying both...
reximi 3090	Inference quantifying both...
ral2imi 3091	Inference quantifying ante...
ralim 3092	Distribution of restricted...
rexim 3093	Theorem 19.22 of [Margaris...
reximiaOLD 3094	Obsolete version of ~ rexi...
ralbii2 3095	Inference adding different...
rexbii2 3096	Inference adding different...
ralbiia 3097	Inference adding restricte...
rexbiia 3098	Inference adding restricte...
ralbii 3099	Inference adding restricte...
rexbii 3100	Inference adding restricte...
ralanid 3101	Cancellation law for restr...
rexanid 3102	Cancellation law for restr...
ralcom3 3103	A commutation law for rest...
ralcom3OLD 3104	Obsolete version of ~ ralc...
dfral2 3105	Relationship between restr...
rexnal 3106	Relationship between restr...
ralinexa 3107	A transformation of restri...
rexanali 3108	A transformation of restri...
ralbi 3109	Distribute a restricted un...
rexbi 3110	Distribute restricted quan...
rexbiOLD 3111	Obsolete version of ~ rexb...
ralrexbid 3112	Formula-building rule for ...
ralrexbidOLD 3113	Obsolete version of ~ ralr...
r19.35 3114	Restricted quantifier vers...
r19.35OLD 3115	Obsolete version of ~ 19.3...
r19.26m 3116	Version of ~ 19.26 and ~ r...
r19.26 3117	Restricted quantifier vers...
r19.26-3 3118	Version of ~ r19.26 with t...
ralbiim 3119	Split a biconditional and ...
r19.29 3120	Restricted quantifier vers...
r19.29OLD 3121	Obsolete version of ~ r19....
r19.29r 3122	Restricted quantifier vers...
r19.29rOLD 3123	Obsolete version of ~ r19....
r19.29imd 3124	Theorem 19.29 of [Margaris...
r19.40 3125	Restricted quantifier vers...
r19.30 3126	Restricted quantifier vers...
r19.30OLD 3127	Obsolete version of ~ 19.3...
r19.43 3128	Restricted quantifier vers...
2ralimi 3129	Inference quantifying both...
3ralimi 3130	Inference quantifying both...
4ralimi 3131	Inference quantifying both...
5ralimi 3132	Inference quantifying both...
6ralimi 3133	Inference quantifying both...
2ralbii 3134	Inference adding two restr...
2rexbii 3135	Inference adding two restr...
3ralbii 3136	Inference adding three res...
4ralbii 3137	Inference adding four rest...
2ralbiim 3138	Split a biconditional and ...
ralnex2 3139	Relationship between two r...
ralnex3 3140	Relationship between three...
rexnal2 3141	Relationship between two r...
rexnal3 3142	Relationship between three...
nrexralim 3143	Negation of a complex pred...
r19.26-2 3144	Restricted quantifier vers...
2r19.29 3145	Theorem ~ r19.29 with two ...
r19.29d2r 3146	Theorem 19.29 of [Margaris...
r19.29d2rOLD 3147	Obsolete version of ~ r19....
r2allem 3148	Lemma factoring out common...
r2exlem 3149	Lemma factoring out common...
hbralrimi 3150	Inference from Theorem 19....
ralrimiv 3151	Inference from Theorem 19....
ralrimiva 3152	Inference from Theorem 19....
rexlimiva 3153	Inference from Theorem 19....
rexlimiv 3154	Inference from Theorem 19....
nrexdv 3155	Deduction adding restricte...
ralrimivw 3156	Inference from Theorem 19....
rexlimivw 3157	Weaker version of ~ rexlim...
ralrimdv 3158	Inference from Theorem 19....
rexlimdv 3159	Inference from Theorem 19....
ralrimdva 3160	Inference from Theorem 19....
rexlimdva 3161	Inference from Theorem 19....
rexlimdvaa 3162	Inference from Theorem 19....
rexlimdva2 3163	Inference from Theorem 19....
r19.29an 3164	A commonly used pattern in...
rexlimdv3a 3165	Inference from Theorem 19....
rexlimdvw 3166	Inference from Theorem 19....
rexlimddv 3167	Restricted existential eli...
r19.29a 3168	A commonly used pattern in...
ralimdv2 3169	Inference quantifying both...
reximdv2 3170	Deduction quantifying both...
reximdvai 3171	Deduction quantifying both...
reximdvaiOLD 3172	Obsolete version of ~ rexi...
ralimdva 3173	Deduction quantifying both...
reximdva 3174	Deduction quantifying both...
ralimdv 3175	Deduction quantifying both...
reximdv 3176	Deduction from Theorem 19....
reximddv 3177	Deduction from Theorem 19....
reximddv3 3178	Deduction from Theorem 19....
reximssdv 3179	Derivation of a restricted...
ralbidv2 3180	Formula-building rule for ...
rexbidv2 3181	Formula-building rule for ...
ralbidva 3182	Formula-building rule for ...
rexbidva 3183	Formula-building rule for ...
ralbidv 3184	Formula-building rule for ...
rexbidv 3185	Formula-building rule for ...
r19.21v 3186	Restricted quantifier vers...
r19.21vOLD 3187	Obsolete version of ~ r19....
r19.37v 3188	Restricted quantifier vers...
r19.23v 3189	Restricted quantifier vers...
r19.36v 3190	Restricted quantifier vers...
rexlimivOLD 3191	Obsolete version of ~ rexl...
rexlimivaOLD 3192	Obsolete version of ~ rexl...
rexlimivwOLD 3193	Obsolete version of ~ rexl...
r19.27v 3194	Restricted quantitifer ver...
r19.41v 3195	Restricted quantifier vers...
r19.28v 3196	Restricted quantifier vers...
r19.42v 3197	Restricted quantifier vers...
r19.32v 3198	Restricted quantifier vers...
r19.45v 3199	Restricted quantifier vers...
r19.44v 3200	One direction of a restric...
r2al 3201	Double restricted universa...
r2ex 3202	Double restricted existent...
r3al 3203	Triple restricted universa...
r3ex 3204	Triple existential quantif...
rgen2 3205	Generalization rule for re...
ralrimivv 3206	Inference from Theorem 19....
rexlimivv 3207	Inference from Theorem 19....
ralrimivva 3208	Inference from Theorem 19....
ralrimdvv 3209	Inference from Theorem 19....
rgen3 3210	Generalization rule for re...
ralrimivvva 3211	Inference from Theorem 19....
ralimdvva 3212	Deduction doubly quantifyi...
reximdvva 3213	Deduction doubly quantifyi...
ralimdvv 3214	Deduction doubly quantifyi...
ralimd4v 3215	Deduction quadrupally quan...
ralimd6v 3216	Deduction sextupally quant...
ralrimdvva 3217	Inference from Theorem 19....
rexlimdvv 3218	Inference from Theorem 19....
rexlimdvva 3219	Inference from Theorem 19....
rexlimdvvva 3220	Inference from Theorem 19....
reximddv2 3221	Double deduction from Theo...
r19.29vva 3222	A commonly used pattern ba...
r19.29vvaOLD 3223	Obsolete version of ~ r19....
2rexbiia 3224	Inference adding two restr...
2ralbidva 3225	Formula-building rule for ...
2rexbidva 3226	Formula-building rule for ...
2ralbidv 3227	Formula-building rule for ...
2rexbidv 3228	Formula-building rule for ...
rexralbidv 3229	Formula-building rule for ...
3ralbidv 3230	Formula-building rule for ...
4ralbidv 3231	Formula-building rule for ...
6ralbidv 3232	Formula-building rule for ...
r19.41vv 3233	Version of ~ r19.41v with ...
reeanlem 3234	Lemma factoring out common...
reeanv 3235	Rearrange restricted exist...
3reeanv 3236	Rearrange three restricted...
2ralor 3237	Distribute restricted univ...
2ralorOLD 3238	Obsolete version of ~ 2ral...
risset 3239	Two ways to say " ` A ` be...
nelb 3240	A definition of ` -. A e. ...
nelbOLD 3241	Obsolete version of ~ nelb...
rspw 3242	Restricted specialization....
cbvralvw 3243	Change the bound variable ...
cbvrexvw 3244	Change the bound variable ...
cbvraldva 3245	Rule used to change the bo...
cbvrexdva 3246	Rule used to change the bo...
cbvral2vw 3247	Change bound variables of ...
cbvrex2vw 3248	Change bound variables of ...
cbvral3vw 3249	Change bound variables of ...
cbvral4vw 3250	Change bound variables of ...
cbvral6vw 3251	Change bound variables of ...
cbvral8vw 3252	Change bound variables of ...
rsp 3253	Restricted specialization....
rspa 3254	Restricted specialization....
rspe 3255	Restricted specialization....
rspec 3256	Specialization rule for re...
r19.21bi 3257	Inference from Theorem 19....
r19.21be 3258	Inference from Theorem 19....
r19.21t 3259	Restricted quantifier vers...
r19.21 3260	Restricted quantifier vers...
r19.23t 3261	Closed theorem form of ~ r...
r19.23 3262	Restricted quantifier vers...
ralrimi 3263	Inference from Theorem 19....
ralrimia 3264	Inference from Theorem 19....
rexlimi 3265	Restricted quantifier vers...
ralimdaa 3266	Deduction quantifying both...
reximdai 3267	Deduction from Theorem 19....
r19.37 3268	Restricted quantifier vers...
r19.41 3269	Restricted quantifier vers...
ralrimd 3270	Inference from Theorem 19....
rexlimd2 3271	Version of ~ rexlimd with ...
rexlimd 3272	Deduction form of ~ rexlim...
r19.29af2 3273	A commonly used pattern ba...
r19.29af 3274	A commonly used pattern ba...
reximd2a 3275	Deduction quantifying both...
ralbida 3276	Formula-building rule for ...
ralbidaOLD 3277	Obsolete version of ~ ralb...
rexbida 3278	Formula-building rule for ...
ralbid 3279	Formula-building rule for ...
rexbid 3280	Formula-building rule for ...
rexbidvALT 3281	Alternate proof of ~ rexbi...
rexbidvaALT 3282	Alternate proof of ~ rexbi...
rsp2 3283	Restricted specialization,...
rsp2e 3284	Restricted specialization....
rspec2 3285	Specialization rule for re...
rspec3 3286	Specialization rule for re...
r2alf 3287	Double restricted universa...
r2exf 3288	Double restricted existent...
2ralbida 3289	Formula-building rule for ...
nfra1 3290	The setvar ` x ` is not fr...
nfre1 3291	The setvar ` x ` is not fr...
ralcom4 3292	Commutation of restricted ...
ralcom4OLD 3293	Obsolete version of ~ ralc...
rexcom4 3294	Commutation of restricted ...
ralcom 3295	Commutation of restricted ...
rexcom 3296	Commutation of restricted ...
rexcomOLD 3297	Obsolete version of ~ rexc...
rexcom4a 3298	Specialized existential co...
ralrot3 3299	Rotate three restricted un...
ralcom13 3300	Swap first and third restr...
ralcom13OLD 3301	Obsolete version of ~ ralc...
rexcom13 3302	Swap first and third restr...
rexrot4 3303	Rotate four restricted exi...
2ex2rexrot 3304	Rotate two existential qua...
nfra2w 3305	Similar to Lemma 24 of [Mo...
nfra2wOLD 3306	Obsolete version of ~ nfra...
hbra1 3307	The setvar ` x ` is not fr...
ralcomf 3308	Commutation of restricted ...
rexcomf 3309	Commutation of restricted ...
cbvralfw 3310	Rule used to change bound ...
cbvrexfw 3311	Rule used to change bound ...
cbvralw 3312	Rule used to change bound ...
cbvrexw 3313	Rule used to change bound ...
hbral 3314	Bound-variable hypothesis ...
nfraldw 3315	Deduction version of ~ nfr...
nfrexdw 3316	Deduction version of ~ nfr...
nfralw 3317	Bound-variable hypothesis ...
nfralwOLD 3318	Obsolete version of ~ nfra...
nfrexw 3319	Bound-variable hypothesis ...
r19.12 3320	Restricted quantifier vers...
r19.12OLD 3321	Obsolete version of ~ 19.1...
reean 3322	Rearrange restricted exist...
cbvralsvw 3323	Change bound variable by u...
cbvrexsvw 3324	Change bound variable by u...
cbvralsvwOLD 3325	Obsolete version of ~ cbvr...
cbvralsvwOLDOLD 3326	Obsolete version of ~ cbvr...
cbvrexsvwOLD 3327	Obsolete version of ~ cbvr...
nfraldwOLD 3328	Obsolete version of ~ nfra...
nfra2wOLDOLD 3329	Obsolete version of ~ nfra...
rexeq 3330	Equality theorem for restr...
raleq 3331	Equality theorem for restr...
raleqi 3332	Equality inference for res...
rexeqi 3333	Equality inference for res...
raleqdv 3334	Equality deduction for res...
rexeqdv 3335	Equality deduction for res...
raleqtrdv 3336	Substitution of equal clas...
rexeqtrdv 3337	Substitution of equal clas...
raleqtrrdv 3338	Substitution of equal clas...
rexeqtrrdv 3339	Substitution of equal clas...
raleqbidva 3340	Equality deduction for res...
rexeqbidva 3341	Equality deduction for res...
raleqbidvv 3342	Version of ~ raleqbidv wit...
raleqbidvvOLD 3343	Obsolete version of ~ rale...
rexeqbidvv 3344	Version of ~ rexeqbidv wit...
rexeqbidvvOLD 3345	Obsolete version of ~ rexe...
raleqbi1dv 3346	Equality deduction for res...
rexeqbi1dv 3347	Equality deduction for res...
raleqOLD 3348	Obsolete version of ~ rale...
rexeqOLD 3349	Obsolete version of ~ rale...
raleleq 3350	All elements of a class ar...
raleleqOLD 3351	Obsolete version of ~ rale...
raleqbii 3352	Equality deduction for res...
rexeqbii 3353	Equality deduction for res...
raleqbidv 3354	Equality deduction for res...
rexeqbidv 3355	Equality deduction for res...
cbvraldva2 3356	Rule used to change the bo...
cbvrexdva2 3357	Rule used to change the bo...
cbvrexdva2OLD 3358	Obsolete version of ~ cbvr...
cbvraldvaOLD 3359	Obsolete version of ~ cbvr...
cbvrexdvaOLD 3360	Obsolete version of ~ cbvr...
raleqf 3361	Equality theorem for restr...
rexeqf 3362	Equality theorem for restr...
rexeqfOLD 3363	Obsolete version of ~ rexe...
raleqbid 3364	Equality deduction for res...
rexeqbid 3365	Equality deduction for res...
sbralie 3366	Implicit to explicit subst...
sbralieALT 3367	Alternative shorter proof ...
cbvralf 3368	Rule used to change bound ...
cbvrexf 3369	Rule used to change bound ...
cbvral 3370	Rule used to change bound ...
cbvrex 3371	Rule used to change bound ...
cbvralv 3372	Change the bound variable ...
cbvrexv 3373	Change the bound variable ...
cbvralsv 3374	Change bound variable by u...
cbvrexsv 3375	Change bound variable by u...
cbvral2v 3376	Change bound variables of ...
cbvrex2v 3377	Change bound variables of ...
cbvral3v 3378	Change bound variables of ...
rgen2a 3379	Generalization rule for re...
nfrald 3380	Deduction version of ~ nfr...
nfrexd 3381	Deduction version of ~ nfr...
nfral 3382	Bound-variable hypothesis ...
nfrex 3383	Bound-variable hypothesis ...
nfra2 3384	Similar to Lemma 24 of [Mo...
ralcom2 3385	Commutation of restricted ...
reu5 3390	Restricted uniqueness in t...
reurmo 3391	Restricted existential uni...
reurex 3392	Restricted unique existenc...
mormo 3393	Unrestricted "at most one"...
rmobiia 3394	Formula-building rule for ...
reubiia 3395	Formula-building rule for ...
rmobii 3396	Formula-building rule for ...
reubii 3397	Formula-building rule for ...
rmoanid 3398	Cancellation law for restr...
reuanid 3399	Cancellation law for restr...
rmoanidOLD 3400	Obsolete version of ~ rmoa...
reuanidOLD 3401	Obsolete version of ~ reua...
2reu2rex 3402	Double restricted existent...
rmobidva 3403	Formula-building rule for ...
reubidva 3404	Formula-building rule for ...
rmobidv 3405	Formula-building rule for ...
reubidv 3406	Formula-building rule for ...
reueubd 3407	Restricted existential uni...
rmo5 3408	Restricted "at most one" i...
nrexrmo 3409	Nonexistence implies restr...
moel 3410	"At most one" element in a...
cbvrmovw 3411	Change the bound variable ...
cbvreuvw 3412	Change the bound variable ...
moelOLD 3413	Obsolete version of ~ moel...
rmobida 3414	Formula-building rule for ...
reubida 3415	Formula-building rule for ...
rmobidvaOLD 3416	Obsolete version of ~ rmob...
cbvrmow 3417	Change the bound variable ...
cbvreuw 3418	Change the bound variable ...
nfrmo1 3419	The setvar ` x ` is not fr...
nfreu1 3420	The setvar ` x ` is not fr...
nfrmow 3421	Bound-variable hypothesis ...
nfreuw 3422	Bound-variable hypothesis ...
cbvreuwOLD 3423	Obsolete version of ~ cbvr...
cbvreuvwOLD 3424	Obsolete version of ~ cbvr...
rmoeq1 3425	Equality theorem for restr...
reueq1 3426	Equality theorem for restr...
rmoeq1OLD 3427	Obsolete version of ~ rmoe...
reueq1OLD 3428	Obsolete version of ~ reue...
rmoeqd 3429	Equality deduction for res...
reueqd 3430	Equality deduction for res...
rmoeq1f 3431	Equality theorem for restr...
reueq1f 3432	Equality theorem for restr...
nfreuwOLD 3433	Obsolete version of ~ nfre...
nfrmowOLD 3434	Obsolete version of ~ nfrm...
cbvreu 3435	Change the bound variable ...
cbvrmo 3436	Change the bound variable ...
cbvrmov 3437	Change the bound variable ...
cbvreuv 3438	Change the bound variable ...
nfrmod 3439	Deduction version of ~ nfr...
nfreud 3440	Deduction version of ~ nfr...
nfrmo 3441	Bound-variable hypothesis ...
nfreu 3442	Bound-variable hypothesis ...
rabbidva2 3445	Equivalent wff's yield equ...
rabbia2 3446	Equivalent wff's yield equ...
rabbiia 3447	Equivalent formulas yield ...
rabbiiaOLD 3448	Obsolete version of ~ rabb...
rabbii 3449	Equivalent wff's correspon...
rabbidva 3450	Equivalent wff's yield equ...
rabbidv 3451	Equivalent wff's yield equ...
rabbieq 3452	Equivalent wff's correspon...
rabswap 3453	Swap with a membership rel...
cbvrabv 3454	Rule to change the bound v...
rabeqcda 3455	When ` ps ` is always true...
rabeqc 3456	A restricted class abstrac...
rabeqi 3457	Equality theorem for restr...
rabeq 3458	Equality theorem for restr...
rabeqdv 3459	Equality of restricted cla...
rabeqbidva 3460	Equality of restricted cla...
rabeqbidvaOLD 3461	Obsolete version of ~ rabe...
rabeqbidv 3462	Equality of restricted cla...
rabrabi 3463	Abstract builder restricte...
nfrab1 3464	The abstraction variable i...
rabid 3465	An "identity" law of concr...
rabidim1 3466	Membership in a restricted...
reqabi 3467	Inference from equality of...
rabrab 3468	Abstract builder restricte...
rabrabiOLD 3469	Obsolete version of ~ rabr...
rabbida4 3470	Version of ~ rabbidva2 wit...
rabbida 3471	Equivalent wff's yield equ...
rabbid 3472	Version of ~ rabbidv with ...
rabeqd 3473	Deduction form of ~ rabeq ...
rabeqbida 3474	Version of ~ rabeqbidva wi...
rabbi 3475	Equivalent wff's correspon...
rabid2f 3476	An "identity" law for rest...
rabid2im 3477	One direction of ~ rabid2 ...
rabid2 3478	An "identity" law for rest...
rabid2OLD 3479	Obsolete version of ~ rabi...
rabeqf 3480	Equality theorem for restr...
cbvrabw 3481	Rule to change the bound v...
cbvrabwOLD 3482	Obsolete version of ~ cbvr...
nfrabw 3483	A variable not free in a w...
nfrabwOLD 3484	Obsolete version of ~ nfra...
rabbidaOLD 3485	Obsolete version of ~ rabb...
nfrab 3486	A variable not free in a w...
cbvrab 3487	Rule to change the bound v...
vjust 3489	Justification theorem for ...
dfv2 3491	Alternate definition of th...
vex 3492	All setvar variables are s...
elv 3493	If a proposition is implie...
elvd 3494	If a proposition is implie...
el2v 3495	If a proposition is implie...
el3v 3496	If a proposition is implie...
el3v3 3497	If a proposition is implie...
eqv 3498	The universe contains ever...
eqvf 3499	The universe contains ever...
abv 3500	The class of sets verifyin...
abvALT 3501	Alternate proof of ~ abv ,...
isset 3502	Two ways to express that "...
cbvexeqsetf 3503	The expression ` E. x x = ...
issetft 3504	Closed theorem form of ~ i...
issetf 3505	A version of ~ isset that ...
isseti 3506	A way to say " ` A ` is a ...
issetri 3507	A way to say " ` A ` is a ...
eqvisset 3508	A class equal to a variabl...
elex 3509	If a class is a member of ...
elexOLD 3510	Obsolete version of ~ elex...
elexi 3511	If a class is a member of ...
elexd 3512	If a class is a member of ...
elex2OLD 3513	Obsolete version of ~ elex...
elex22 3514	If two classes each contai...
prcnel 3515	A proper class doesn't bel...
ralv 3516	A universal quantifier res...
rexv 3517	An existential quantifier ...
reuv 3518	A unique existential quant...
rmov 3519	An at-most-one quantifier ...
rabab 3520	A class abstraction restri...
rexcom4b 3521	Specialized existential co...
ceqsal1t 3522	One direction of ~ ceqsalt...
ceqsalt 3523	Closed theorem version of ...
ceqsralt 3524	Restricted quantifier vers...
ceqsalg 3525	A representation of explic...
ceqsalgALT 3526	Alternate proof of ~ ceqsa...
ceqsal 3527	A representation of explic...
ceqsalALT 3528	A representation of explic...
ceqsalv 3529	A representation of explic...
ceqsalvOLD 3530	Obsolete version of ~ ceqs...
ceqsralv 3531	Restricted quantifier vers...
ceqsralvOLD 3532	Obsolete version of ~ ceqs...
gencl 3533	Implicit substitution for ...
2gencl 3534	Implicit substitution for ...
3gencl 3535	Implicit substitution for ...
cgsexg 3536	Implicit substitution infe...
cgsex2g 3537	Implicit substitution infe...
cgsex4g 3538	An implicit substitution i...
cgsex4gOLD 3539	Obsolete version of ~ cgse...
ceqsex 3540	Elimination of an existent...
ceqsexOLD 3541	Obsolete version of ~ ceqs...
ceqsexv 3542	Elimination of an existent...
ceqsexvOLD 3543	Obsolete version of ~ ceqs...
ceqsexvOLDOLD 3544	Obsolete version of ~ ceqs...
ceqsexv2d 3545	Elimination of an existent...
ceqsexv2dOLD 3546	Obsolete version of ~ ceqs...
ceqsex2 3547	Elimination of two existen...
ceqsex2v 3548	Elimination of two existen...
ceqsex3v 3549	Elimination of three exist...
ceqsex4v 3550	Elimination of four existe...
ceqsex6v 3551	Elimination of six existen...
ceqsex8v 3552	Elimination of eight exist...
gencbvex 3553	Change of bound variable u...
gencbvex2 3554	Restatement of ~ gencbvex ...
gencbval 3555	Change of bound variable u...
sbhypf 3556	Introduce an explicit subs...
sbhypfOLD 3557	Obsolete version of ~ sbhy...
spcimgft 3558	Closed theorem form of ~ s...
spcimgfi1 3559	A closed version of ~ spci...
spcimgfi1OLD 3560	Obsolete version of ~ spci...
spcgft 3561	A closed version of ~ spcg...
spcimgf 3562	Rule of specialization, us...
spcimegf 3563	Existential specialization...
vtoclgft 3564	Closed theorem form of ~ v...
vtocleg 3565	Implicit substitution of a...
vtoclg 3566	Implicit substitution of a...
vtocle 3567	Implicit substitution of a...
vtocleOLD 3568	Obsolete version of ~ vtoc...
vtoclbg 3569	Implicit substitution of a...
vtocl 3570	Implicit substitution of a...
vtoclOLD 3571	Obsolete version of ~ vtoc...
vtocldf 3572	Implicit substitution of a...
vtocld 3573	Implicit substitution of a...
vtocl2d 3574	Implicit substitution of t...
vtoclef 3575	Implicit substitution of a...
vtoclf 3576	Implicit substitution of a...
vtoclfOLD 3577	Obsolete version of ~ vtoc...
vtocl2 3578	Implicit substitution of c...
vtocl3 3579	Implicit substitution of c...
vtoclb 3580	Implicit substitution of a...
vtoclgf 3581	Implicit substitution of a...
vtoclg1f 3582	Version of ~ vtoclgf with ...
vtoclgOLD 3583	Obsolete version of ~ vtoc...
vtocl2gf 3584	Implicit substitution of a...
vtocl3gf 3585	Implicit substitution of a...
vtocl2g 3586	Implicit substitution of 2...
vtocl3g 3587	Implicit substitution of a...
vtoclgaf 3588	Implicit substitution of a...
vtoclga 3589	Implicit substitution of a...
vtocl2ga 3590	Implicit substitution of 2...
vtocl2gaf 3591	Implicit substitution of 2...
vtocl2gafOLD 3592	Obsolete version of ~ vtoc...
vtocl3gaf 3593	Implicit substitution of 3...
vtocl3gafOLD 3594	Obsolete version of ~ vtoc...
vtocl3ga 3595	Implicit substitution of 3...
vtocl3gaOLD 3596	Obsolete version of ~ vtoc...
vtocl3gaOLDOLD 3597	Obsolete version of ~ vtoc...
vtocl4g 3598	Implicit substitution of 4...
vtocl4ga 3599	Implicit substitution of 4...
vtocl4gaOLD 3600	Obsolete version of ~ vtoc...
vtoclegft 3601	Implicit substitution of a...
vtoclegftOLD 3602	Obsolete version of ~ vtoc...
vtoclri 3603	Implicit substitution of a...
spcgf 3604	Rule of specialization, us...
spcegf 3605	Existential specialization...
spcimdv 3606	Restricted specialization,...
spcdv 3607	Rule of specialization, us...
spcimedv 3608	Restricted existential spe...
spcgv 3609	Rule of specialization, us...
spcegv 3610	Existential specialization...
spcedv 3611	Existential specialization...
spc2egv 3612	Existential specialization...
spc2gv 3613	Specialization with two qu...
spc2ed 3614	Existential specialization...
spc2d 3615	Specialization with 2 quan...
spc3egv 3616	Existential specialization...
spc3gv 3617	Specialization with three ...
spcv 3618	Rule of specialization, us...
spcev 3619	Existential specialization...
spc2ev 3620	Existential specialization...
rspct 3621	A closed version of ~ rspc...
rspcdf 3622	Restricted specialization,...
rspc 3623	Restricted specialization,...
rspce 3624	Restricted existential spe...
rspcimdv 3625	Restricted specialization,...
rspcimedv 3626	Restricted existential spe...
rspcdv 3627	Restricted specialization,...
rspcedv 3628	Restricted existential spe...
rspcebdv 3629	Restricted existential spe...
rspcdv2 3630	Restricted specialization,...
rspcv 3631	Restricted specialization,...
rspccv 3632	Restricted specialization,...
rspcva 3633	Restricted specialization,...
rspccva 3634	Restricted specialization,...
rspcev 3635	Restricted existential spe...
rspcdva 3636	Restricted specialization,...
rspcedvd 3637	Restricted existential spe...
rspcedvdw 3638	Version of ~ rspcedvd wher...
rspceb2dv 3639	Restricted existential spe...
rspcime 3640	Prove a restricted existen...
rspceaimv 3641	Restricted existential spe...
rspcedeq1vd 3642	Restricted existential spe...
rspcedeq2vd 3643	Restricted existential spe...
rspc2 3644	Restricted specialization ...
rspc2gv 3645	Restricted specialization ...
rspc2v 3646	2-variable restricted spec...
rspc2va 3647	2-variable restricted spec...
rspc2ev 3648	2-variable restricted exis...
2rspcedvdw 3649	Double application of ~ rs...
rspc2dv 3650	2-variable restricted spec...
rspc3v 3651	3-variable restricted spec...
rspc3ev 3652	3-variable restricted exis...
3rspcedvdw 3653	Triple application of ~ rs...
rspc3dv 3654	3-variable restricted spec...
rspc4v 3655	4-variable restricted spec...
rspc6v 3656	6-variable restricted spec...
rspc8v 3657	8-variable restricted spec...
rspceeqv 3658	Restricted existential spe...
ralxpxfr2d 3659	Transfer a universal quant...
rexraleqim 3660	Statement following from e...
eqvincg 3661	A variable introduction la...
eqvinc 3662	A variable introduction la...
eqvincf 3663	A variable introduction la...
alexeqg 3664	Two ways to express substi...
ceqex 3665	Equality implies equivalen...
ceqsexg 3666	A representation of explic...
ceqsexgv 3667	Elimination of an existent...
ceqsrexv 3668	Elimination of a restricte...
ceqsrexbv 3669	Elimination of a restricte...
ceqsralbv 3670	Elimination of a restricte...
ceqsrex2v 3671	Elimination of a restricte...
clel2g 3672	Alternate definition of me...
clel2 3673	Alternate definition of me...
clel3g 3674	Alternate definition of me...
clel3 3675	Alternate definition of me...
clel4g 3676	Alternate definition of me...
clel4 3677	Alternate definition of me...
clel5 3678	Alternate definition of cl...
pm13.183 3679	Compare theorem *13.183 in...
rr19.3v 3680	Restricted quantifier vers...
rr19.28v 3681	Restricted quantifier vers...
elab6g 3682	Membership in a class abst...
elabd2 3683	Membership in a class abst...
elabd3 3684	Membership in a class abst...
elabgt 3685	Membership in a class abst...
elabgtOLD 3686	Obsolete version of ~ elab...
elabgtOLDOLD 3687	Obsolete version of ~ elab...
elabgf 3688	Membership in a class abst...
elabf 3689	Membership in a class abst...
elabg 3690	Membership in a class abst...
elabgOLD 3691	Obsolete version of ~ elab...
elabgw 3692	Membership in a class abst...
elab2gw 3693	Membership in a class abst...
elab 3694	Membership in a class abst...
elabOLD 3695	Obsolete version of ~ elab...
elab2g 3696	Membership in a class abst...
elabd 3697	Explicit demonstration the...
elab2 3698	Membership in a class abst...
elab4g 3699	Membership in a class abst...
elab3gf 3700	Membership in a class abst...
elab3g 3701	Membership in a class abst...
elab3 3702	Membership in a class abst...
elrabi 3703	Implication for the member...
elrabf 3704	Membership in a restricted...
rabtru 3705	Abstract builder using the...
rabeqcOLD 3706	Obsolete version of ~ rabe...
elrab3t 3707	Membership in a restricted...
elrab 3708	Membership in a restricted...
elrab3 3709	Membership in a restricted...
elrabd 3710	Membership in a restricted...
elrab2 3711	Membership in a restricted...
elrab2w 3712	Membership in a restricted...
ralab 3713	Universal quantification o...
ralabOLD 3714	Obsolete version of ~ rala...
ralrab 3715	Universal quantification o...
rexab 3716	Existential quantification...
rexabOLD 3717	Obsolete version of ~ rexa...
rexrab 3718	Existential quantification...
ralab2 3719	Universal quantification o...
ralrab2 3720	Universal quantification o...
rexab2 3721	Existential quantification...
rexrab2 3722	Existential quantification...
reurab 3723	Restricted existential uni...
abidnf 3724	Identity used to create cl...
dedhb 3725	A deduction theorem for co...
class2seteq 3726	Writing a set as a class a...
nelrdva 3727	Deduce negative membership...
eqeu 3728	A condition which implies ...
moeq 3729	There exists at most one s...
eueq 3730	A class is a set if and on...
eueqi 3731	There exists a unique set ...
eueq2 3732	Equality has existential u...
eueq3 3733	Equality has existential u...
moeq3 3734	"At most one" property of ...
mosub 3735	"At most one" remains true...
mo2icl 3736	Theorem for inferring "at ...
mob2 3737	Consequence of "at most on...
moi2 3738	Consequence of "at most on...
mob 3739	Equality implied by "at mo...
moi 3740	Equality implied by "at mo...
morex 3741	Derive membership from uni...
euxfr2w 3742	Transfer existential uniqu...
euxfrw 3743	Transfer existential uniqu...
euxfr2 3744	Transfer existential uniqu...
euxfr 3745	Transfer existential uniqu...
euind 3746	Existential uniqueness via...
reu2 3747	A way to express restricte...
reu6 3748	A way to express restricte...
reu3 3749	A way to express restricte...
reu6i 3750	A condition which implies ...
eqreu 3751	A condition which implies ...
rmo4 3752	Restricted "at most one" u...
reu4 3753	Restricted uniqueness usin...
reu7 3754	Restricted uniqueness usin...
reu8 3755	Restricted uniqueness usin...
rmo3f 3756	Restricted "at most one" u...
rmo4f 3757	Restricted "at most one" u...
reu2eqd 3758	Deduce equality from restr...
reueq 3759	Equality has existential u...
rmoeq 3760	Equality's restricted exis...
rmoan 3761	Restricted "at most one" s...
rmoim 3762	Restricted "at most one" i...
rmoimia 3763	Restricted "at most one" i...
rmoimi 3764	Restricted "at most one" i...
rmoimi2 3765	Restricted "at most one" i...
2reu5a 3766	Double restricted existent...
reuimrmo 3767	Restricted uniqueness impl...
2reuswap 3768	A condition allowing swap ...
2reuswap2 3769	A condition allowing swap ...
reuxfrd 3770	Transfer existential uniqu...
reuxfr 3771	Transfer existential uniqu...
reuxfr1d 3772	Transfer existential uniqu...
reuxfr1ds 3773	Transfer existential uniqu...
reuxfr1 3774	Transfer existential uniqu...
reuind 3775	Existential uniqueness via...
2rmorex 3776	Double restricted quantifi...
2reu5lem1 3777	Lemma for ~ 2reu5 . Note ...
2reu5lem2 3778	Lemma for ~ 2reu5 . (Cont...
2reu5lem3 3779	Lemma for ~ 2reu5 . This ...
2reu5 3780	Double restricted existent...
2reurmo 3781	Double restricted quantifi...
2reurex 3782	Double restricted quantifi...
2rmoswap 3783	A condition allowing to sw...
2rexreu 3784	Double restricted existent...
cdeqi 3787	Deduce conditional equalit...
cdeqri 3788	Property of conditional eq...
cdeqth 3789	Deduce conditional equalit...
cdeqnot 3790	Distribute conditional equ...
cdeqal 3791	Distribute conditional equ...
cdeqab 3792	Distribute conditional equ...
cdeqal1 3793	Distribute conditional equ...
cdeqab1 3794	Distribute conditional equ...
cdeqim 3795	Distribute conditional equ...
cdeqcv 3796	Conditional equality for s...
cdeqeq 3797	Distribute conditional equ...
cdeqel 3798	Distribute conditional equ...
nfcdeq 3799	If we have a conditional e...
nfccdeq 3800	Variation of ~ nfcdeq for ...
rru 3801	Relative version of Russel...
ru 3802	Russell's Paradox. Propos...
ruOLD 3803	Obsolete version of ~ ru a...
dfsbcq 3806	Proper substitution of a c...
dfsbcq2 3807	This theorem, which is sim...
sbsbc 3808	Show that ~ df-sb and ~ df...
sbceq1d 3809	Equality theorem for class...
sbceq1dd 3810	Equality theorem for class...
sbceqbid 3811	Equality theorem for class...
sbc8g 3812	This is the closest we can...
sbc2or 3813	The disjunction of two equ...
sbcex 3814	By our definition of prope...
sbceq1a 3815	Equality theorem for class...
sbceq2a 3816	Equality theorem for class...
spsbc 3817	Specialization: if a formu...
spsbcd 3818	Specialization: if a formu...
sbcth 3819	A substitution into a theo...
sbcthdv 3820	Deduction version of ~ sbc...
sbcid 3821	An identity theorem for su...
nfsbc1d 3822	Deduction version of ~ nfs...
nfsbc1 3823	Bound-variable hypothesis ...
nfsbc1v 3824	Bound-variable hypothesis ...
nfsbcdw 3825	Deduction version of ~ nfs...
nfsbcw 3826	Bound-variable hypothesis ...
sbccow 3827	A composition law for clas...
nfsbcd 3828	Deduction version of ~ nfs...
nfsbc 3829	Bound-variable hypothesis ...
sbcco 3830	A composition law for clas...
sbcco2 3831	A composition law for clas...
sbc5 3832	An equivalence for class s...
sbc5ALT 3833	Alternate proof of ~ sbc5 ...
sbc6g 3834	An equivalence for class s...
sbc6gOLD 3835	Obsolete version of ~ sbc6...
sbc6 3836	An equivalence for class s...
sbc7 3837	An equivalence for class s...
cbvsbcw 3838	Change bound variables in ...
cbvsbcvw 3839	Change the bound variable ...
cbvsbc 3840	Change bound variables in ...
cbvsbcv 3841	Change the bound variable ...
sbciegft 3842	Conversion of implicit sub...
sbciegftOLD 3843	Obsolete version of ~ sbci...
sbciegf 3844	Conversion of implicit sub...
sbcieg 3845	Conversion of implicit sub...
sbciegOLD 3846	Obsolete version of ~ sbci...
sbcie2g 3847	Conversion of implicit sub...
sbcie 3848	Conversion of implicit sub...
sbciedf 3849	Conversion of implicit sub...
sbcied 3850	Conversion of implicit sub...
sbciedOLD 3851	Obsolete version of ~ sbci...
sbcied2 3852	Conversion of implicit sub...
elrabsf 3853	Membership in a restricted...
eqsbc1 3854	Substitution for the left-...
sbcng 3855	Move negation in and out o...
sbcimg 3856	Distribution of class subs...
sbcan 3857	Distribution of class subs...
sbcor 3858	Distribution of class subs...
sbcbig 3859	Distribution of class subs...
sbcn1 3860	Move negation in and out o...
sbcim1 3861	Distribution of class subs...
sbcim1OLD 3862	Obsolete version of ~ sbci...
sbcbid 3863	Formula-building deduction...
sbcbidv 3864	Formula-building deduction...
sbcbii 3865	Formula-building inference...
sbcbi1 3866	Distribution of class subs...
sbcbi2 3867	Substituting into equivale...
sbcal 3868	Move universal quantifier ...
sbcex2 3869	Move existential quantifie...
sbceqal 3870	Class version of one impli...
sbceqalOLD 3871	Obsolete version of ~ sbce...
sbeqalb 3872	Theorem *14.121 in [Whiteh...
eqsbc2 3873	Substitution for the right...
sbc3an 3874	Distribution of class subs...
sbcel1v 3875	Class substitution into a ...
sbcel2gv 3876	Class substitution into a ...
sbcel21v 3877	Class substitution into a ...
sbcimdv 3878	Substitution analogue of T...
sbcimdvOLD 3879	Obsolete version of ~ sbci...
sbctt 3880	Substitution for a variabl...
sbcgf 3881	Substitution for a variabl...
sbc19.21g 3882	Substitution for a variabl...
sbcg 3883	Substitution for a variabl...
sbcgOLD 3884	Obsolete version of ~ sbcg...
sbcgfi 3885	Substitution for a variabl...
sbc2iegf 3886	Conversion of implicit sub...
sbc2ie 3887	Conversion of implicit sub...
sbc2ieOLD 3888	Obsolete version of ~ sbc2...
sbc2iedv 3889	Conversion of implicit sub...
sbc3ie 3890	Conversion of implicit sub...
sbccomlem 3891	Lemma for ~ sbccom . (Con...
sbccomlemOLD 3892	Obsolete version of ~ sbcc...
sbccom 3893	Commutative law for double...
sbcralt 3894	Interchange class substitu...
sbcrext 3895	Interchange class substitu...
sbcralg 3896	Interchange class substitu...
sbcrex 3897	Interchange class substitu...
sbcreu 3898	Interchange class substitu...
reu8nf 3899	Restricted uniqueness usin...
sbcabel 3900	Interchange class substitu...
rspsbc 3901	Restricted quantifier vers...
rspsbca 3902	Restricted quantifier vers...
rspesbca 3903	Existence form of ~ rspsbc...
spesbc 3904	Existence form of ~ spsbc ...
spesbcd 3905	form of ~ spsbc . (Contri...
sbcth2 3906	A substitution into a theo...
ra4v 3907	Version of ~ ra4 with a di...
ra4 3908	Restricted quantifier vers...
rmo2 3909	Alternate definition of re...
rmo2i 3910	Condition implying restric...
rmo3 3911	Restricted "at most one" u...
rmob 3912	Consequence of "at most on...
rmoi 3913	Consequence of "at most on...
rmob2 3914	Consequence of "restricted...
rmoi2 3915	Consequence of "restricted...
rmoanim 3916	Introduction of a conjunct...
rmoanimALT 3917	Alternate proof of ~ rmoan...
reuan 3918	Introduction of a conjunct...
2reu1 3919	Double restricted existent...
2reu2 3920	Double restricted existent...
csb2 3923	Alternate expression for t...
csbeq1 3924	Analogue of ~ dfsbcq for p...
csbeq1d 3925	Equality deduction for pro...
csbeq2 3926	Substituting into equivale...
csbeq2d 3927	Formula-building deduction...
csbeq2dv 3928	Formula-building deduction...
csbeq2i 3929	Formula-building inference...
csbeq12dv 3930	Formula-building inference...
cbvcsbw 3931	Change bound variables in ...
cbvcsb 3932	Change bound variables in ...
cbvcsbv 3933	Change the bound variable ...
csbid 3934	Analogue of ~ sbid for pro...
csbeq1a 3935	Equality theorem for prope...
csbcow 3936	Composition law for chaine...
csbco 3937	Composition law for chaine...
csbtt 3938	Substitution doesn't affec...
csbconstgf 3939	Substitution doesn't affec...
csbconstg 3940	Substitution doesn't affec...
csbconstgOLD 3941	Obsolete version of ~ csbc...
csbgfi 3942	Substitution for a variabl...
csbconstgi 3943	The proper substitution of...
nfcsb1d 3944	Bound-variable hypothesis ...
nfcsb1 3945	Bound-variable hypothesis ...
nfcsb1v 3946	Bound-variable hypothesis ...
nfcsbd 3947	Deduction version of ~ nfc...
nfcsbw 3948	Bound-variable hypothesis ...
nfcsb 3949	Bound-variable hypothesis ...
csbhypf 3950	Introduce an explicit subs...
csbiebt 3951	Conversion of implicit sub...
csbiedf 3952	Conversion of implicit sub...
csbieb 3953	Bidirectional conversion b...
csbiebg 3954	Bidirectional conversion b...
csbiegf 3955	Conversion of implicit sub...
csbief 3956	Conversion of implicit sub...
csbie 3957	Conversion of implicit sub...
csbieOLD 3958	Obsolete version of ~ csbi...
csbied 3959	Conversion of implicit sub...
csbiedOLD 3960	Obsolete version of ~ csbi...
csbied2 3961	Conversion of implicit sub...
csbie2t 3962	Conversion of implicit sub...
csbie2 3963	Conversion of implicit sub...
csbie2g 3964	Conversion of implicit sub...
cbvrabcsfw 3965	Version of ~ cbvrabcsf wit...
cbvralcsf 3966	A more general version of ...
cbvrexcsf 3967	A more general version of ...
cbvreucsf 3968	A more general version of ...
cbvrabcsf 3969	A more general version of ...
cbvralv2 3970	Rule used to change the bo...
cbvrexv2 3971	Rule used to change the bo...
rspc2vd 3972	Deduction version of 2-var...
difjust 3978	Soundness justification th...
unjust 3980	Soundness justification th...
injust 3982	Soundness justification th...
dfin5 3984	Alternate definition for t...
dfdif2 3985	Alternate definition of cl...
eldif 3986	Expansion of membership in...
eldifd 3987	If a class is in one class...
eldifad 3988	If a class is in the diffe...
eldifbd 3989	If a class is in the diffe...
elneeldif 3990	The elements of a set diff...
velcomp 3991	Characterization of setvar...
elin 3992	Expansion of membership in...
dfss2 3994	Alternate definition of th...
dfss 3995	Variant of subclass defini...
dfss3 3997	Alternate definition of su...
dfss6 3998	Alternate definition of su...
dfssf 3999	Equivalence for subclass r...
dfss3f 4000	Equivalence for subclass r...
nfss 4001	If ` x ` is not free in ` ...
ssel 4002	Membership relationships f...
ssel2 4003	Membership relationships f...
sseli 4004	Membership implication fro...
sselii 4005	Membership inference from ...
sselid 4006	Membership inference from ...
sseld 4007	Membership deduction from ...
sselda 4008	Membership deduction from ...
sseldd 4009	Membership inference from ...
ssneld 4010	If a class is not in anoth...
ssneldd 4011	If an element is not in a ...
ssriv 4012	Inference based on subclas...
ssrd 4013	Deduction based on subclas...
ssrdv 4014	Deduction based on subclas...
sstr2 4015	Transitivity of subclass r...
sstr2OLD 4016	Obsolete version of ~ sstr...
sstr 4017	Transitivity of subclass r...
sstri 4018	Subclass transitivity infe...
sstrd 4019	Subclass transitivity dedu...
sstrid 4020	Subclass transitivity dedu...
sstrdi 4021	Subclass transitivity dedu...
sylan9ss 4022	A subclass transitivity de...
sylan9ssr 4023	A subclass transitivity de...
eqss 4024	The subclass relationship ...
eqssi 4025	Infer equality from two su...
eqssd 4026	Equality deduction from tw...
sssseq 4027	If a class is a subclass o...
eqrd 4028	Deduce equality of classes...
eqri 4029	Infer equality of classes ...
eqelssd 4030	Equality deduction from su...
ssid 4031	Any class is a subclass of...
ssidd 4032	Weakening of ~ ssid . (Co...
ssv 4033	Any class is a subclass of...
sseq1 4034	Equality theorem for subcl...
sseq2 4035	Equality theorem for the s...
sseq12 4036	Equality theorem for the s...
sseq1i 4037	An equality inference for ...
sseq2i 4038	An equality inference for ...
sseq12i 4039	An equality inference for ...
sseq1d 4040	An equality deduction for ...
sseq2d 4041	An equality deduction for ...
sseq12d 4042	An equality deduction for ...
eqsstri 4043	Substitution of equality i...
eqsstrri 4044	Substitution of equality i...
sseqtri 4045	Substitution of equality i...
sseqtrri 4046	Substitution of equality i...
eqsstrd 4047	Substitution of equality i...
eqsstrrd 4048	Substitution of equality i...
sseqtrd 4049	Substitution of equality i...
sseqtrrd 4050	Substitution of equality i...
3sstr3i 4051	Substitution of equality i...
3sstr4i 4052	Substitution of equality i...
3sstr3g 4053	Substitution of equality i...
3sstr4g 4054	Substitution of equality i...
3sstr3d 4055	Substitution of equality i...
3sstr4d 4056	Substitution of equality i...
eqsstrid 4057	A chained subclass and equ...
eqsstrrid 4058	A chained subclass and equ...
sseqtrdi 4059	A chained subclass and equ...
sseqtrrdi 4060	A chained subclass and equ...
sseqtrid 4061	Subclass transitivity dedu...
sseqtrrid 4062	Subclass transitivity dedu...
eqsstrdi 4063	A chained subclass and equ...
eqsstrrdi 4064	A chained subclass and equ...
eqimssd 4065	Equality implies inclusion...
eqimsscd 4066	Equality implies inclusion...
eqimss 4067	Equality implies inclusion...
eqimss2 4068	Equality implies inclusion...
eqimssi 4069	Infer subclass relationshi...
eqimss2i 4070	Infer subclass relationshi...
nssne1 4071	Two classes are different ...
nssne2 4072	Two classes are different ...
nss 4073	Negation of subclass relat...
nelss 4074	Demonstrate by witnesses t...
ssrexf 4075	Restricted existential qua...
ssrmof 4076	"At most one" existential ...
ssralv 4077	Quantification restricted ...
ssrexv 4078	Existential quantification...
ss2ralv 4079	Two quantifications restri...
ss2rexv 4080	Two existential quantifica...
ssralvOLD 4081	Obsolete version of ~ ssra...
ssrexvOLD 4082	Obsolete version of ~ ssre...
ralss 4083	Restricted universal quant...
rexss 4084	Restricted existential qua...
ss2ab 4085	Class abstractions in a su...
abss 4086	Class abstraction in a sub...
ssab 4087	Subclass of a class abstra...
ssabral 4088	The relation for a subclas...
ss2abdv 4089	Deduction of abstraction s...
ss2abi 4090	Inference of abstraction s...
abssdv 4091	Deduction of abstraction s...
abssdvOLD 4092	Obsolete version of ~ abss...
abssi 4093	Inference of abstraction s...
ss2rab 4094	Restricted abstraction cla...
rabss 4095	Restricted class abstracti...
ssrab 4096	Subclass of a restricted c...
ssrabdv 4097	Subclass of a restricted c...
rabssdv 4098	Subclass of a restricted c...
ss2rabdv 4099	Deduction of restricted ab...
ss2rabi 4100	Inference of restricted ab...
rabss2 4101	Subclass law for restricte...
ssab2 4102	Subclass relation for the ...
ssrab2 4103	Subclass relation for a re...
rabss3d 4104	Subclass law for restricte...
ssrab3 4105	Subclass relation for a re...
rabssrabd 4106	Subclass of a restricted c...
ssrabeq 4107	If the restricting class o...
rabssab 4108	A restricted class is a su...
eqrrabd 4109	Deduce equality with a res...
uniiunlem 4110	A subset relationship usef...
dfpss2 4111	Alternate definition of pr...
dfpss3 4112	Alternate definition of pr...
psseq1 4113	Equality theorem for prope...
psseq2 4114	Equality theorem for prope...
psseq1i 4115	An equality inference for ...
psseq2i 4116	An equality inference for ...
psseq12i 4117	An equality inference for ...
psseq1d 4118	An equality deduction for ...
psseq2d 4119	An equality deduction for ...
psseq12d 4120	An equality deduction for ...
pssss 4121	A proper subclass is a sub...
pssne 4122	Two classes in a proper su...
pssssd 4123	Deduce subclass from prope...
pssned 4124	Proper subclasses are uneq...
sspss 4125	Subclass in terms of prope...
pssirr 4126	Proper subclass is irrefle...
pssn2lp 4127	Proper subclass has no 2-c...
sspsstri 4128	Two ways of stating tricho...
ssnpss 4129	Partial trichotomy law for...
psstr 4130	Transitive law for proper ...
sspsstr 4131	Transitive law for subclas...
psssstr 4132	Transitive law for subclas...
psstrd 4133	Proper subclass inclusion ...
sspsstrd 4134	Transitivity involving sub...
psssstrd 4135	Transitivity involving sub...
npss 4136	A class is not a proper su...
ssnelpss 4137	A subclass missing a membe...
ssnelpssd 4138	Subclass inclusion with on...
ssexnelpss 4139	If there is an element of ...
dfdif3 4140	Alternate definition of cl...
dfdif3OLD 4141	Obsolete version of ~ dfdi...
difeq1 4142	Equality theorem for class...
difeq2 4143	Equality theorem for class...
difeq12 4144	Equality theorem for class...
difeq1i 4145	Inference adding differenc...
difeq2i 4146	Inference adding differenc...
difeq12i 4147	Equality inference for cla...
difeq1d 4148	Deduction adding differenc...
difeq2d 4149	Deduction adding differenc...
difeq12d 4150	Equality deduction for cla...
difeqri 4151	Inference from membership ...
nfdif 4152	Bound-variable hypothesis ...
nfdifOLD 4153	Obsolete version of ~ nfdi...
eldifi 4154	Implication of membership ...
eldifn 4155	Implication of membership ...
elndif 4156	A set does not belong to a...
neldif 4157	Implication of membership ...
difdif 4158	Double class difference. ...
difss 4159	Subclass relationship for ...
difssd 4160	A difference of two classe...
difss2 4161	If a class is contained in...
difss2d 4162	If a class is contained in...
ssdifss 4163	Preservation of a subclass...
ddif 4164	Double complement under un...
ssconb 4165	Contraposition law for sub...
sscon 4166	Contraposition law for sub...
ssdif 4167	Difference law for subsets...
ssdifd 4168	If ` A ` is contained in `...
sscond 4169	If ` A ` is contained in `...
ssdifssd 4170	If ` A ` is contained in `...
ssdif2d 4171	If ` A ` is contained in `...
raldifb 4172	Restricted universal quant...
rexdifi 4173	Restricted existential qua...
complss 4174	Complementation reverses i...
compleq 4175	Two classes are equal if a...
elun 4176	Expansion of membership in...
elunnel1 4177	A member of a union that i...
elunnel2 4178	A member of a union that i...
uneqri 4179	Inference from membership ...
unidm 4180	Idempotent law for union o...
uncom 4181	Commutative law for union ...
equncom 4182	If a class equals the unio...
equncomi 4183	Inference form of ~ equnco...
uneq1 4184	Equality theorem for the u...
uneq2 4185	Equality theorem for the u...
uneq12 4186	Equality theorem for the u...
uneq1i 4187	Inference adding union to ...
uneq2i 4188	Inference adding union to ...
uneq12i 4189	Equality inference for the...
uneq1d 4190	Deduction adding union to ...
uneq2d 4191	Deduction adding union to ...
uneq12d 4192	Equality deduction for the...
nfun 4193	Bound-variable hypothesis ...
nfunOLD 4194	Obsolete version of ~ nfun...
unass 4195	Associative law for union ...
un12 4196	A rearrangement of union. ...
un23 4197	A rearrangement of union. ...
un4 4198	A rearrangement of the uni...
unundi 4199	Union distributes over its...
unundir 4200	Union distributes over its...
ssun1 4201	Subclass relationship for ...
ssun2 4202	Subclass relationship for ...
ssun3 4203	Subclass law for union of ...
ssun4 4204	Subclass law for union of ...
elun1 4205	Membership law for union o...
elun2 4206	Membership law for union o...
elunant 4207	A statement is true for ev...
unss1 4208	Subclass law for union of ...
ssequn1 4209	A relationship between sub...
unss2 4210	Subclass law for union of ...
unss12 4211	Subclass law for union of ...
ssequn2 4212	A relationship between sub...
unss 4213	The union of two subclasse...
unssi 4214	An inference showing the u...
unssd 4215	A deduction showing the un...
unssad 4216	If ` ( A u. B ) ` is conta...
unssbd 4217	If ` ( A u. B ) ` is conta...
ssun 4218	A condition that implies i...
rexun 4219	Restricted existential qua...
ralunb 4220	Restricted quantification ...
ralun 4221	Restricted quantification ...
elini 4222	Membership in an intersect...
elind 4223	Deduce membership in an in...
elinel1 4224	Membership in an intersect...
elinel2 4225	Membership in an intersect...
elin2 4226	Membership in a class defi...
elin1d 4227	Elementhood in the first s...
elin2d 4228	Elementhood in the first s...
elin3 4229	Membership in a class defi...
incom 4230	Commutative law for inters...
ineqcom 4231	Two ways of expressing tha...
ineqcomi 4232	Two ways of expressing tha...
ineqri 4233	Inference from membership ...
ineq1 4234	Equality theorem for inter...
ineq2 4235	Equality theorem for inter...
ineq12 4236	Equality theorem for inter...
ineq1i 4237	Equality inference for int...
ineq2i 4238	Equality inference for int...
ineq12i 4239	Equality inference for int...
ineq1d 4240	Equality deduction for int...
ineq2d 4241	Equality deduction for int...
ineq12d 4242	Equality deduction for int...
ineqan12d 4243	Equality deduction for int...
sseqin2 4244	A relationship between sub...
nfin 4245	Bound-variable hypothesis ...
nfinOLD 4246	Obsolete version of ~ nfin...
rabbi2dva 4247	Deduction from a wff to a ...
inidm 4248	Idempotent law for interse...
inass 4249	Associative law for inters...
in12 4250	A rearrangement of interse...
in32 4251	A rearrangement of interse...
in13 4252	A rearrangement of interse...
in31 4253	A rearrangement of interse...
inrot 4254	Rotate the intersection of...
in4 4255	Rearrangement of intersect...
inindi 4256	Intersection distributes o...
inindir 4257	Intersection distributes o...
inss1 4258	The intersection of two cl...
inss2 4259	The intersection of two cl...
ssin 4260	Subclass of intersection. ...
ssini 4261	An inference showing that ...
ssind 4262	A deduction showing that a...
ssrin 4263	Add right intersection to ...
sslin 4264	Add left intersection to s...
ssrind 4265	Add right intersection to ...
ss2in 4266	Intersection of subclasses...
ssinss1 4267	Intersection preserves sub...
inss 4268	Inclusion of an intersecti...
rexin 4269	Restricted existential qua...
dfss7 4270	Alternate definition of su...
symdifcom 4273	Symmetric difference commu...
symdifeq1 4274	Equality theorem for symme...
symdifeq2 4275	Equality theorem for symme...
nfsymdif 4276	Hypothesis builder for sym...
elsymdif 4277	Membership in a symmetric ...
dfsymdif4 4278	Alternate definition of th...
elsymdifxor 4279	Membership in a symmetric ...
dfsymdif2 4280	Alternate definition of th...
symdifass 4281	Symmetric difference is as...
difsssymdif 4282	The symmetric difference c...
difsymssdifssd 4283	If the symmetric differenc...
unabs 4284	Absorption law for union. ...
inabs 4285	Absorption law for interse...
nssinpss 4286	Negation of subclass expre...
nsspssun 4287	Negation of subclass expre...
dfss4 4288	Subclass defined in terms ...
dfun2 4289	An alternate definition of...
dfin2 4290	An alternate definition of...
difin 4291	Difference with intersecti...
ssdifim 4292	Implication of a class dif...
ssdifsym 4293	Symmetric class difference...
dfss5 4294	Alternate definition of su...
dfun3 4295	Union defined in terms of ...
dfin3 4296	Intersection defined in te...
dfin4 4297	Alternate definition of th...
invdif 4298	Intersection with universa...
indif 4299	Intersection with class di...
indif2 4300	Bring an intersection in a...
indif1 4301	Bring an intersection in a...
indifcom 4302	Commutation law for inters...
indi 4303	Distributive law for inter...
undi 4304	Distributive law for union...
indir 4305	Distributive law for inter...
undir 4306	Distributive law for union...
unineq 4307	Infer equality from equali...
uneqin 4308	Equality of union and inte...
difundi 4309	Distributive law for class...
difundir 4310	Distributive law for class...
difindi 4311	Distributive law for class...
difindir 4312	Distributive law for class...
indifdi 4313	Distribute intersection ov...
indifdir 4314	Distribute intersection ov...
difdif2 4315	Class difference by a clas...
undm 4316	De Morgan's law for union....
indm 4317	De Morgan's law for inters...
difun1 4318	A relationship involving d...
undif3 4319	An equality involving clas...
difin2 4320	Represent a class differen...
dif32 4321	Swap second and third argu...
difabs 4322	Absorption-like law for cl...
sscon34b 4323	Relative complementation r...
rcompleq 4324	Two subclasses are equal i...
dfsymdif3 4325	Alternate definition of th...
unabw 4326	Union of two class abstrac...
unab 4327	Union of two class abstrac...
inab 4328	Intersection of two class ...
difab 4329	Difference of two class ab...
abanssl 4330	A class abstraction with a...
abanssr 4331	A class abstraction with a...
notabw 4332	A class abstraction define...
notab 4333	A class abstraction define...
unrab 4334	Union of two restricted cl...
inrab 4335	Intersection of two restri...
inrab2 4336	Intersection with a restri...
difrab 4337	Difference of two restrict...
dfrab3 4338	Alternate definition of re...
dfrab2 4339	Alternate definition of re...
rabdif 4340	Move difference in and out...
notrab 4341	Complementation of restric...
dfrab3ss 4342	Restricted class abstracti...
rabun2 4343	Abstraction restricted to ...
reuun2 4344	Transfer uniqueness to a s...
reuss2 4345	Transfer uniqueness to a s...
reuss 4346	Transfer uniqueness to a s...
reuun1 4347	Transfer uniqueness to a s...
reupick 4348	Restricted uniqueness "pic...
reupick3 4349	Restricted uniqueness "pic...
reupick2 4350	Restricted uniqueness "pic...
euelss 4351	Transfer uniqueness of an ...
dfnul4 4354	Alternate definition of th...
dfnul2 4355	Alternate definition of th...
dfnul3 4356	Alternate definition of th...
dfnul2OLD 4357	Obsolete version of ~ dfnu...
dfnul3OLD 4358	Obsolete version of ~ dfnu...
dfnul4OLD 4359	Obsolete version of ~ dfnu...
noel 4360	The empty set has no eleme...
noelOLD 4361	Obsolete version of ~ noel...
nel02 4362	The empty set has no eleme...
n0i 4363	If a class has elements, t...
ne0i 4364	If a class has elements, t...
ne0d 4365	Deduction form of ~ ne0i ....
n0ii 4366	If a class has elements, t...
ne0ii 4367	If a class has elements, t...
vn0 4368	The universal class is not...
vn0ALT 4369	Alternate proof of ~ vn0 ....
eq0f 4370	A class is equal to the em...
neq0f 4371	A class is not empty if an...
n0f 4372	A class is nonempty if and...
eq0 4373	A class is equal to the em...
eq0ALT 4374	Alternate proof of ~ eq0 ....
neq0 4375	A class is not empty if an...
n0 4376	A class is nonempty if and...
nel0 4377	From the general negation ...
reximdva0 4378	Restricted existence deduc...
rspn0 4379	Specialization for restric...
n0rex 4380	There is an element in a n...
ssn0rex 4381	There is an element in a c...
n0moeu 4382	A case of equivalence of "...
rex0 4383	Vacuous restricted existen...
reu0 4384	Vacuous restricted uniquen...
rmo0 4385	Vacuous restricted at-most...
0el 4386	Membership of the empty se...
n0el 4387	Negated membership of the ...
eqeuel 4388	A condition which implies ...
ssdif0 4389	Subclass expressed in term...
difn0 4390	If the difference of two s...
pssdifn0 4391	A proper subclass has a no...
pssdif 4392	A proper subclass has a no...
ndisj 4393	Express that an intersecti...
inn0f 4394	A nonempty intersection. ...
inn0 4395	A nonempty intersection. ...
difin0ss 4396	Difference, intersection, ...
inssdif0 4397	Intersection, subclass, an...
difid 4398	The difference between a c...
difidALT 4399	Alternate proof of ~ difid...
dif0 4400	The difference between a c...
ab0w 4401	The class of sets verifyin...
ab0 4402	The class of sets verifyin...
ab0OLD 4403	Obsolete version of ~ ab0 ...
ab0ALT 4404	Alternate proof of ~ ab0 ,...
dfnf5 4405	Characterization of nonfre...
ab0orv 4406	The class abstraction defi...
ab0orvALT 4407	Alternate proof of ~ ab0or...
abn0 4408	Nonempty class abstraction...
rab0 4409	Any restricted class abstr...
rabeq0w 4410	Condition for a restricted...
rabeq0 4411	Condition for a restricted...
rabn0 4412	Nonempty restricted class ...
rabxm 4413	Law of excluded middle, in...
rabnc 4414	Law of noncontradiction, i...
elneldisj 4415	The set of elements ` s ` ...
elnelun 4416	The union of the set of el...
un0 4417	The union of a class with ...
in0 4418	The intersection of a clas...
0un 4419	The union of the empty set...
0in 4420	The intersection of the em...
inv1 4421	The intersection of a clas...
unv 4422	The union of a class with ...
0ss 4423	The null set is a subset o...
ss0b 4424	Any subset of the empty se...
ss0 4425	Any subset of the empty se...
sseq0 4426	A subclass of an empty cla...
ssn0 4427	A class with a nonempty su...
0dif 4428	The difference between the...
abf 4429	A class abstraction determ...
eq0rdv 4430	Deduction for equality to ...
eq0rdvALT 4431	Alternate proof of ~ eq0rd...
csbprc 4432	The proper substitution of...
csb0 4433	The proper substitution of...
sbcel12 4434	Distribute proper substitu...
sbceqg 4435	Distribute proper substitu...
sbceqi 4436	Distribution of class subs...
sbcnel12g 4437	Distribute proper substitu...
sbcne12 4438	Distribute proper substitu...
sbcel1g 4439	Move proper substitution i...
sbceq1g 4440	Move proper substitution t...
sbcel2 4441	Move proper substitution i...
sbceq2g 4442	Move proper substitution t...
csbcom 4443	Commutative law for double...
sbcnestgfw 4444	Nest the composition of tw...
csbnestgfw 4445	Nest the composition of tw...
sbcnestgw 4446	Nest the composition of tw...
csbnestgw 4447	Nest the composition of tw...
sbcco3gw 4448	Composition of two substit...
sbcnestgf 4449	Nest the composition of tw...
csbnestgf 4450	Nest the composition of tw...
sbcnestg 4451	Nest the composition of tw...
csbnestg 4452	Nest the composition of tw...
sbcco3g 4453	Composition of two substit...
csbco3g 4454	Composition of two class s...
csbnest1g 4455	Nest the composition of tw...
csbidm 4456	Idempotent law for class s...
csbvarg 4457	The proper substitution of...
csbvargi 4458	The proper substitution of...
sbccsb 4459	Substitution into a wff ex...
sbccsb2 4460	Substitution into a wff ex...
rspcsbela 4461	Special case related to ~ ...
sbnfc2 4462	Two ways of expressing " `...
csbab 4463	Move substitution into a c...
csbun 4464	Distribution of class subs...
csbin 4465	Distribute proper substitu...
csbie2df 4466	Conversion of implicit sub...
2nreu 4467	If there are two different...
un00 4468	Two classes are empty iff ...
vss 4469	Only the universal class h...
0pss 4470	The null set is a proper s...
npss0 4471	No set is a proper subset ...
pssv 4472	Any non-universal class is...
disj 4473	Two ways of saying that tw...
disjr 4474	Two ways of saying that tw...
disj1 4475	Two ways of saying that tw...
reldisj 4476	Two ways of saying that tw...
disj3 4477	Two ways of saying that tw...
disjne 4478	Members of disjoint sets a...
disjeq0 4479	Two disjoint sets are equa...
disjel 4480	A set can't belong to both...
disj2 4481	Two ways of saying that tw...
disj4 4482	Two ways of saying that tw...
ssdisj 4483	Intersection with a subcla...
disjpss 4484	A class is a proper subset...
undisj1 4485	The union of disjoint clas...
undisj2 4486	The union of disjoint clas...
ssindif0 4487	Subclass expressed in term...
inelcm 4488	The intersection of classe...
minel 4489	A minimum element of a cla...
undif4 4490	Distribute union over diff...
disjssun 4491	Subset relation for disjoi...
vdif0 4492	Universal class equality i...
difrab0eq 4493	If the difference between ...
pssnel 4494	A proper subclass has a me...
disjdif 4495	A class and its relative c...
disjdifr 4496	A class and its relative c...
difin0 4497	The difference of a class ...
unvdif 4498	The union of a class and i...
undif1 4499	Absorption of difference b...
undif2 4500	Absorption of difference b...
undifabs 4501	Absorption of difference b...
inundif 4502	The intersection and class...
disjdif2 4503	The difference of a class ...
difun2 4504	Absorption of union by dif...
undif 4505	Union of complementary par...
undifr 4506	Union of complementary par...
undifrOLD 4507	Obsolete version of ~ undi...
undif5 4508	An equality involving clas...
ssdifin0 4509	A subset of a difference d...
ssdifeq0 4510	A class is a subclass of i...
ssundif 4511	A condition equivalent to ...
difcom 4512	Swap the arguments of a cl...
pssdifcom1 4513	Two ways to express overla...
pssdifcom2 4514	Two ways to express non-co...
difdifdir 4515	Distributive law for class...
uneqdifeq 4516	Two ways to say that ` A `...
raldifeq 4517	Equality theorem for restr...
r19.2z 4518	Theorem 19.2 of [Margaris]...
r19.2zb 4519	A response to the notion t...
r19.3rz 4520	Restricted quantification ...
r19.28z 4521	Restricted quantifier vers...
r19.3rzv 4522	Restricted quantification ...
r19.9rzv 4523	Restricted quantification ...
r19.28zv 4524	Restricted quantifier vers...
r19.37zv 4525	Restricted quantifier vers...
r19.45zv 4526	Restricted version of Theo...
r19.44zv 4527	Restricted version of Theo...
r19.27z 4528	Restricted quantifier vers...
r19.27zv 4529	Restricted quantifier vers...
r19.36zv 4530	Restricted quantifier vers...
ralidmw 4531	Idempotent law for restric...
rzal 4532	Vacuous quantification is ...
rzalALT 4533	Alternate proof of ~ rzal ...
rexn0 4534	Restricted existential qua...
ralidm 4535	Idempotent law for restric...
ral0 4536	Vacuous universal quantifi...
ralf0 4537	The quantification of a fa...
ralnralall 4538	A contradiction concerning...
falseral0 4539	A false statement can only...
raaan 4540	Rearrange restricted quant...
raaanv 4541	Rearrange restricted quant...
sbss 4542	Set substitution into the ...
sbcssg 4543	Distribute proper substitu...
raaan2 4544	Rearrange restricted quant...
2reu4lem 4545	Lemma for ~ 2reu4 . (Cont...
2reu4 4546	Definition of double restr...
csbdif 4547	Distribution of class subs...
dfif2 4550	An alternate definition of...
dfif6 4551	An alternate definition of...
ifeq1 4552	Equality theorem for condi...
ifeq2 4553	Equality theorem for condi...
iftrue 4554	Value of the conditional o...
iftruei 4555	Inference associated with ...
iftrued 4556	Value of the conditional o...
iffalse 4557	Value of the conditional o...
iffalsei 4558	Inference associated with ...
iffalsed 4559	Value of the conditional o...
ifnefalse 4560	When values are unequal, b...
ifsb 4561	Distribute a function over...
dfif3 4562	Alternate definition of th...
dfif4 4563	Alternate definition of th...
dfif5 4564	Alternate definition of th...
ifssun 4565	A conditional class is inc...
ifeq12 4566	Equality theorem for condi...
ifeq1d 4567	Equality deduction for con...
ifeq2d 4568	Equality deduction for con...
ifeq12d 4569	Equality deduction for con...
ifbi 4570	Equivalence theorem for co...
ifbid 4571	Equivalence deduction for ...
ifbieq1d 4572	Equivalence/equality deduc...
ifbieq2i 4573	Equivalence/equality infer...
ifbieq2d 4574	Equivalence/equality deduc...
ifbieq12i 4575	Equivalence deduction for ...
ifbieq12d 4576	Equivalence deduction for ...
nfifd 4577	Deduction form of ~ nfif ....
nfif 4578	Bound-variable hypothesis ...
ifeq1da 4579	Conditional equality. (Co...
ifeq2da 4580	Conditional equality. (Co...
ifeq12da 4581	Equivalence deduction for ...
ifbieq12d2 4582	Equivalence deduction for ...
ifclda 4583	Conditional closure. (Con...
ifeqda 4584	Separation of the values o...
elimif 4585	Elimination of a condition...
ifbothda 4586	A wff ` th ` containing a ...
ifboth 4587	A wff ` th ` containing a ...
ifid 4588	Identical true and false a...
eqif 4589	Expansion of an equality w...
ifval 4590	Another expression of the ...
elif 4591	Membership in a conditiona...
ifel 4592	Membership of a conditiona...
ifcl 4593	Membership (closure) of a ...
ifcld 4594	Membership (closure) of a ...
ifcli 4595	Inference associated with ...
ifexd 4596	Existence of the condition...
ifexg 4597	Existence of the condition...
ifex 4598	Existence of the condition...
ifeqor 4599	The possible values of a c...
ifnot 4600	Negating the first argumen...
ifan 4601	Rewrite a conjunction in a...
ifor 4602	Rewrite a disjunction in a...
2if2 4603	Resolve two nested conditi...
ifcomnan 4604	Commute the conditions in ...
csbif 4605	Distribute proper substitu...
dedth 4606	Weak deduction theorem tha...
dedth2h 4607	Weak deduction theorem eli...
dedth3h 4608	Weak deduction theorem eli...
dedth4h 4609	Weak deduction theorem eli...
dedth2v 4610	Weak deduction theorem for...
dedth3v 4611	Weak deduction theorem for...
dedth4v 4612	Weak deduction theorem for...
elimhyp 4613	Eliminate a hypothesis con...
elimhyp2v 4614	Eliminate a hypothesis con...
elimhyp3v 4615	Eliminate a hypothesis con...
elimhyp4v 4616	Eliminate a hypothesis con...
elimel 4617	Eliminate a membership hyp...
elimdhyp 4618	Version of ~ elimhyp where...
keephyp 4619	Transform a hypothesis ` p...
keephyp2v 4620	Keep a hypothesis containi...
keephyp3v 4621	Keep a hypothesis containi...
pwjust 4623	Soundness justification th...
elpwg 4625	Membership in a power clas...
elpw 4626	Membership in a power clas...
velpw 4627	Setvar variable membership...
elpwd 4628	Membership in a power clas...
elpwi 4629	Subset relation implied by...
elpwb 4630	Characterization of the el...
elpwid 4631	An element of a power clas...
elelpwi 4632	If ` A ` belongs to a part...
sspw 4633	The powerclass preserves i...
sspwi 4634	The powerclass preserves i...
sspwd 4635	The powerclass preserves i...
pweq 4636	Equality theorem for power...
pweqALT 4637	Alternate proof of ~ pweq ...
pweqi 4638	Equality inference for pow...
pweqd 4639	Equality deduction for pow...
pwunss 4640	The power class of the uni...
nfpw 4641	Bound-variable hypothesis ...
pwidg 4642	A set is an element of its...
pwidb 4643	A class is an element of i...
pwid 4644	A set is a member of its p...
pwss 4645	Subclass relationship for ...
pwundif 4646	Break up the power class o...
snjust 4647	Soundness justification th...
sneq 4658	Equality theorem for singl...
sneqi 4659	Equality inference for sin...
sneqd 4660	Equality deduction for sin...
dfsn2 4661	Alternate definition of si...
elsng 4662	There is exactly one eleme...
elsn 4663	There is exactly one eleme...
velsn 4664	There is only one element ...
elsni 4665	There is at most one eleme...
rabsneq 4666	Equality of class abstract...
absn 4667	Condition for a class abst...
dfpr2 4668	Alternate definition of a ...
dfsn2ALT 4669	Alternate definition of si...
elprg 4670	A member of a pair of clas...
elpri 4671	If a class is an element o...
elpr 4672	A member of a pair of clas...
elpr2g 4673	A member of a pair of sets...
elpr2 4674	A member of a pair of sets...
nelpr2 4675	If a class is not an eleme...
nelpr1 4676	If a class is not an eleme...
nelpri 4677	If an element doesn't matc...
prneli 4678	If an element doesn't matc...
nelprd 4679	If an element doesn't matc...
eldifpr 4680	Membership in a set with t...
rexdifpr 4681	Restricted existential qua...
snidg 4682	A set is a member of its s...
snidb 4683	A class is a set iff it is...
snid 4684	A set is a member of its s...
vsnid 4685	A setvar variable is a mem...
elsn2g 4686	There is exactly one eleme...
elsn2 4687	There is exactly one eleme...
nelsn 4688	If a class is not equal to...
rabeqsn 4689	Conditions for a restricte...
rabsssn 4690	Conditions for a restricte...
rabeqsnd 4691	Conditions for a restricte...
ralsnsg 4692	Substitution expressed in ...
rexsns 4693	Restricted existential qua...
rexsngf 4694	Restricted existential qua...
ralsngf 4695	Restricted universal quant...
reusngf 4696	Restricted existential uni...
ralsng 4697	Substitution expressed in ...
rexsng 4698	Restricted existential qua...
reusng 4699	Restricted existential uni...
2ralsng 4700	Substitution expressed in ...
ralsngOLD 4701	Obsolete version of ~ rals...
rexsngOLD 4702	Obsolete version of ~ rexs...
rexreusng 4703	Restricted existential uni...
exsnrex 4704	There is a set being the e...
ralsn 4705	Convert a universal quanti...
rexsn 4706	Convert an existential qua...
elpwunsn 4707	Membership in an extension...
eqoreldif 4708	An element of a set is eit...
eltpg 4709	Members of an unordered tr...
eldiftp 4710	Membership in a set with t...
eltpi 4711	A member of an unordered t...
eltp 4712	A member of an unordered t...
el7g 4713	Members of a set with seve...
dftp2 4714	Alternate definition of un...
nfpr 4715	Bound-variable hypothesis ...
ifpr 4716	Membership of a conditiona...
ralprgf 4717	Convert a restricted unive...
rexprgf 4718	Convert a restricted exist...
ralprg 4719	Convert a restricted unive...
ralprgOLD 4720	Obsolete version of ~ ralp...
rexprg 4721	Convert a restricted exist...
rexprgOLD 4722	Obsolete version of ~ rexp...
raltpg 4723	Convert a restricted unive...
rextpg 4724	Convert a restricted exist...
ralpr 4725	Convert a restricted unive...
rexpr 4726	Convert a restricted exist...
reuprg0 4727	Convert a restricted exist...
reuprg 4728	Convert a restricted exist...
reurexprg 4729	Convert a restricted exist...
raltp 4730	Convert a universal quanti...
rextp 4731	Convert an existential qua...
nfsn 4732	Bound-variable hypothesis ...
csbsng 4733	Distribute proper substitu...
csbprg 4734	Distribute proper substitu...
elinsn 4735	If the intersection of two...
disjsn 4736	Intersection with the sing...
disjsn2 4737	Two distinct singletons ar...
disjpr2 4738	Two completely distinct un...
disjprsn 4739	The disjoint intersection ...
disjtpsn 4740	The disjoint intersection ...
disjtp2 4741	Two completely distinct un...
snprc 4742	The singleton of a proper ...
snnzb 4743	A singleton is nonempty if...
rmosn 4744	A restricted at-most-one q...
r19.12sn 4745	Special case of ~ r19.12 w...
rabsn 4746	Condition where a restrict...
rabsnifsb 4747	A restricted class abstrac...
rabsnif 4748	A restricted class abstrac...
rabrsn 4749	A restricted class abstrac...
euabsn2 4750	Another way to express exi...
euabsn 4751	Another way to express exi...
reusn 4752	A way to express restricte...
absneu 4753	Restricted existential uni...
rabsneu 4754	Restricted existential uni...
eusn 4755	Two ways to express " ` A ...
rabsnt 4756	Truth implied by equality ...
prcom 4757	Commutative law for unorde...
preq1 4758	Equality theorem for unord...
preq2 4759	Equality theorem for unord...
preq12 4760	Equality theorem for unord...
preq1i 4761	Equality inference for uno...
preq2i 4762	Equality inference for uno...
preq12i 4763	Equality inference for uno...
preq1d 4764	Equality deduction for uno...
preq2d 4765	Equality deduction for uno...
preq12d 4766	Equality deduction for uno...
tpeq1 4767	Equality theorem for unord...
tpeq2 4768	Equality theorem for unord...
tpeq3 4769	Equality theorem for unord...
tpeq1d 4770	Equality theorem for unord...
tpeq2d 4771	Equality theorem for unord...
tpeq3d 4772	Equality theorem for unord...
tpeq123d 4773	Equality theorem for unord...
tprot 4774	Rotation of the elements o...
tpcoma 4775	Swap 1st and 2nd members o...
tpcomb 4776	Swap 2nd and 3rd members o...
tpass 4777	Split off the first elemen...
qdass 4778	Two ways to write an unord...
qdassr 4779	Two ways to write an unord...
tpidm12 4780	Unordered triple ` { A , A...
tpidm13 4781	Unordered triple ` { A , B...
tpidm23 4782	Unordered triple ` { A , B...
tpidm 4783	Unordered triple ` { A , A...
tppreq3 4784	An unordered triple is an ...
prid1g 4785	An unordered pair contains...
prid2g 4786	An unordered pair contains...
prid1 4787	An unordered pair contains...
prid2 4788	An unordered pair contains...
ifpprsnss 4789	An unordered pair is a sin...
prprc1 4790	A proper class vanishes in...
prprc2 4791	A proper class vanishes in...
prprc 4792	An unordered pair containi...
tpid1 4793	One of the three elements ...
tpid1g 4794	Closed theorem form of ~ t...
tpid2 4795	One of the three elements ...
tpid2g 4796	Closed theorem form of ~ t...
tpid3g 4797	Closed theorem form of ~ t...
tpid3 4798	One of the three elements ...
snnzg 4799	The singleton of a set is ...
snn0d 4800	The singleton of a set is ...
snnz 4801	The singleton of a set is ...
prnz 4802	A pair containing a set is...
prnzg 4803	A pair containing a set is...
tpnz 4804	An unordered triple contai...
tpnzd 4805	An unordered triple contai...
raltpd 4806	Convert a universal quanti...
snssb 4807	Characterization of the in...
snssg 4808	The singleton formed on a ...
snssgOLD 4809	Obsolete version of ~ snss...
snss 4810	The singleton of an elemen...
eldifsn 4811	Membership in a set with a...
eldifsnd 4812	Membership in a set with a...
ssdifsn 4813	Subset of a set with an el...
elpwdifsn 4814	A subset of a set is an el...
eldifsni 4815	Membership in a set with a...
eldifsnneq 4816	An element of a difference...
neldifsn 4817	The class ` A ` is not in ...
neldifsnd 4818	The class ` A ` is not in ...
rexdifsn 4819	Restricted existential qua...
raldifsni 4820	Rearrangement of a propert...
raldifsnb 4821	Restricted universal quant...
eldifvsn 4822	A set is an element of the...
difsn 4823	An element not in a set ca...
difprsnss 4824	Removal of a singleton fro...
difprsn1 4825	Removal of a singleton fro...
difprsn2 4826	Removal of a singleton fro...
diftpsn3 4827	Removal of a singleton fro...
difpr 4828	Removing two elements as p...
tpprceq3 4829	An unordered triple is an ...
tppreqb 4830	An unordered triple is an ...
difsnb 4831	` ( B \ { A } ) ` equals `...
difsnpss 4832	` ( B \ { A } ) ` is a pro...
snssi 4833	The singleton of an elemen...
snssd 4834	The singleton of an elemen...
difsnid 4835	If we remove a single elem...
eldifeldifsn 4836	An element of a difference...
pw0 4837	Compute the power set of t...
pwpw0 4838	Compute the power set of t...
snsspr1 4839	A singleton is a subset of...
snsspr2 4840	A singleton is a subset of...
snsstp1 4841	A singleton is a subset of...
snsstp2 4842	A singleton is a subset of...
snsstp3 4843	A singleton is a subset of...
prssg 4844	A pair of elements of a cl...
prss 4845	A pair of elements of a cl...
prssi 4846	A pair of elements of a cl...
prssd 4847	Deduction version of ~ prs...
prsspwg 4848	An unordered pair belongs ...
ssprss 4849	A pair as subset of a pair...
ssprsseq 4850	A proper pair is a subset ...
sssn 4851	The subsets of a singleton...
ssunsn2 4852	The property of being sand...
ssunsn 4853	Possible values for a set ...
eqsn 4854	Two ways to express that a...
eqsnd 4855	Deduce that a set is a sin...
eqsndOLD 4856	Obsolete version of ~ eqsn...
issn 4857	A sufficient condition for...
n0snor2el 4858	A nonempty set is either a...
ssunpr 4859	Possible values for a set ...
sspr 4860	The subsets of a pair. (C...
sstp 4861	The subsets of an unordere...
tpss 4862	An unordered triple of ele...
tpssi 4863	An unordered triple of ele...
sneqrg 4864	Closed form of ~ sneqr . ...
sneqr 4865	If the singletons of two s...
snsssn 4866	If a singleton is a subset...
mosneq 4867	There exists at most one s...
sneqbg 4868	Two singletons of sets are...
snsspw 4869	The singleton of a class i...
prsspw 4870	An unordered pair belongs ...
preq1b 4871	Biconditional equality lem...
preq2b 4872	Biconditional equality lem...
preqr1 4873	Reverse equality lemma for...
preqr2 4874	Reverse equality lemma for...
preq12b 4875	Equality relationship for ...
opthpr 4876	An unordered pair has the ...
preqr1g 4877	Reverse equality lemma for...
preq12bg 4878	Closed form of ~ preq12b ....
prneimg 4879	Two pairs are not equal if...
prnebg 4880	A (proper) pair is not equ...
pr1eqbg 4881	A (proper) pair is equal t...
pr1nebg 4882	A (proper) pair is not equ...
preqsnd 4883	Equivalence for a pair equ...
prnesn 4884	A proper unordered pair is...
prneprprc 4885	A proper unordered pair is...
preqsn 4886	Equivalence for a pair equ...
preq12nebg 4887	Equality relationship for ...
prel12g 4888	Equality of two unordered ...
opthprneg 4889	An unordered pair has the ...
elpreqprlem 4890	Lemma for ~ elpreqpr . (C...
elpreqpr 4891	Equality and membership ru...
elpreqprb 4892	A set is an element of an ...
elpr2elpr 4893	For an element ` A ` of an...
dfopif 4894	Rewrite ~ df-op using ` if...
dfopg 4895	Value of the ordered pair ...
dfop 4896	Value of an ordered pair w...
opeq1 4897	Equality theorem for order...
opeq2 4898	Equality theorem for order...
opeq12 4899	Equality theorem for order...
opeq1i 4900	Equality inference for ord...
opeq2i 4901	Equality inference for ord...
opeq12i 4902	Equality inference for ord...
opeq1d 4903	Equality deduction for ord...
opeq2d 4904	Equality deduction for ord...
opeq12d 4905	Equality deduction for ord...
oteq1 4906	Equality theorem for order...
oteq2 4907	Equality theorem for order...
oteq3 4908	Equality theorem for order...
oteq1d 4909	Equality deduction for ord...
oteq2d 4910	Equality deduction for ord...
oteq3d 4911	Equality deduction for ord...
oteq123d 4912	Equality deduction for ord...
nfop 4913	Bound-variable hypothesis ...
nfopd 4914	Deduction version of bound...
csbopg 4915	Distribution of class subs...
opidg 4916	The ordered pair ` <. A , ...
opid 4917	The ordered pair ` <. A , ...
ralunsn 4918	Restricted quantification ...
2ralunsn 4919	Double restricted quantifi...
opprc 4920	Expansion of an ordered pa...
opprc1 4921	Expansion of an ordered pa...
opprc2 4922	Expansion of an ordered pa...
oprcl 4923	If an ordered pair has an ...
pwsn 4924	The power set of a singlet...
pwpr 4925	The power set of an unorde...
pwtp 4926	The power set of an unorde...
pwpwpw0 4927	Compute the power set of t...
pwv 4928	The power class of the uni...
prproe 4929	For an element of a proper...
3elpr2eq 4930	If there are three element...
dfuni2 4933	Alternate definition of cl...
eluni 4934	Membership in class union....
eluni2 4935	Membership in class union....
elunii 4936	Membership in class union....
nfunid 4937	Deduction version of ~ nfu...
nfuni 4938	Bound-variable hypothesis ...
uniss 4939	Subclass relationship for ...
unissi 4940	Subclass relationship for ...
unissd 4941	Subclass relationship for ...
unieq 4942	Equality theorem for class...
unieqi 4943	Inference of equality of t...
unieqd 4944	Deduction of equality of t...
eluniab 4945	Membership in union of a c...
elunirab 4946	Membership in union of a c...
uniprg 4947	The union of a pair is the...
unipr 4948	The union of a pair is the...
unisng 4949	A set equals the union of ...
unisn 4950	A set equals the union of ...
unisnv 4951	A set equals the union of ...
unisn3 4952	Union of a singleton in th...
dfnfc2 4953	An alternative statement o...
uniun 4954	The class union of the uni...
uniin 4955	The class union of the int...
ssuni 4956	Subclass relationship for ...
uni0b 4957	The union of a set is empt...
uni0c 4958	The union of a set is empt...
uni0 4959	The union of the empty set...
csbuni 4960	Distribute proper substitu...
elssuni 4961	An element of a class is a...
unissel 4962	Condition turning a subcla...
unissb 4963	Relationship involving mem...
unissbOLD 4964	Obsolete version of ~ unis...
uniss2 4965	A subclass condition on th...
unidif 4966	If the difference ` A \ B ...
ssunieq 4967	Relationship implying unio...
unimax 4968	Any member of a class is t...
pwuni 4969	A class is a subclass of t...
dfint2 4972	Alternate definition of cl...
inteq 4973	Equality law for intersect...
inteqi 4974	Equality inference for cla...
inteqd 4975	Equality deduction for cla...
elint 4976	Membership in class inters...
elint2 4977	Membership in class inters...
elintg 4978	Membership in class inters...
elinti 4979	Membership in class inters...
nfint 4980	Bound-variable hypothesis ...
elintabg 4981	Two ways of saying a set i...
elintab 4982	Membership in the intersec...
elintabOLD 4983	Obsolete version of ~ elin...
elintrab 4984	Membership in the intersec...
elintrabg 4985	Membership in the intersec...
int0 4986	The intersection of the em...
intss1 4987	An element of a class incl...
ssint 4988	Subclass of a class inters...
ssintab 4989	Subclass of the intersecti...
ssintub 4990	Subclass of the least uppe...
ssmin 4991	Subclass of the minimum va...
intmin 4992	Any member of a class is t...
intss 4993	Intersection of subclasses...
intssuni 4994	The intersection of a none...
ssintrab 4995	Subclass of the intersecti...
unissint 4996	If the union of a class is...
intssuni2 4997	Subclass relationship for ...
intminss 4998	Under subset ordering, the...
intmin2 4999	Any set is the smallest of...
intmin3 5000	Under subset ordering, the...
intmin4 5001	Elimination of a conjunct ...
intab 5002	The intersection of a spec...
int0el 5003	The intersection of a clas...
intun 5004	The class intersection of ...
intprg 5005	The intersection of a pair...
intpr 5006	The intersection of a pair...
intsng 5007	Intersection of a singleto...
intsn 5008	The intersection of a sing...
uniintsn 5009	Two ways to express " ` A ...
uniintab 5010	The union and the intersec...
intunsn 5011	Theorem joining a singleto...
rint0 5012	Relative intersection of a...
elrint 5013	Membership in a restricted...
elrint2 5014	Membership in a restricted...
eliun 5019	Membership in indexed unio...
eliin 5020	Membership in indexed inte...
eliuni 5021	Membership in an indexed u...
iuncom 5022	Commutation of indexed uni...
iuncom4 5023	Commutation of union with ...
iunconst 5024	Indexed union of a constan...
iinconst 5025	Indexed intersection of a ...
iuneqconst 5026	Indexed union of identical...
iuniin 5027	Law combining indexed unio...
iinssiun 5028	An indexed intersection is...
iunss1 5029	Subclass theorem for index...
iinss1 5030	Subclass theorem for index...
iuneq1 5031	Equality theorem for index...
iineq1 5032	Equality theorem for index...
ss2iun 5033	Subclass theorem for index...
iuneq2 5034	Equality theorem for index...
iineq2 5035	Equality theorem for index...
iuneq2i 5036	Equality inference for ind...
iineq2i 5037	Equality inference for ind...
iineq2d 5038	Equality deduction for ind...
iuneq2dv 5039	Equality deduction for ind...
iineq2dv 5040	Equality deduction for ind...
iuneq12df 5041	Equality deduction for ind...
iuneq1d 5042	Equality theorem for index...
iuneq12dOLD 5043	Obsolete version of ~ iune...
iuneq12d 5044	Equality deduction for ind...
iuneq2d 5045	Equality deduction for ind...
nfiun 5046	Bound-variable hypothesis ...
nfiin 5047	Bound-variable hypothesis ...
nfiung 5048	Bound-variable hypothesis ...
nfiing 5049	Bound-variable hypothesis ...
nfiu1 5050	Bound-variable hypothesis ...
nfiu1OLD 5051	Obsolete version of ~ nfiu...
nfii1 5052	Bound-variable hypothesis ...
dfiun2g 5053	Alternate definition of in...
dfiun2gOLD 5054	Obsolete version of ~ dfiu...
dfiin2g 5055	Alternate definition of in...
dfiun2 5056	Alternate definition of in...
dfiin2 5057	Alternate definition of in...
dfiunv2 5058	Define double indexed unio...
cbviun 5059	Rule used to change the bo...
cbviin 5060	Change bound variables in ...
cbviung 5061	Rule used to change the bo...
cbviing 5062	Change bound variables in ...
cbviunv 5063	Rule used to change the bo...
cbviinv 5064	Change bound variables in ...
cbviunvg 5065	Rule used to change the bo...
cbviinvg 5066	Change bound variables in ...
iunssf 5067	Subset theorem for an inde...
iunss 5068	Subset theorem for an inde...
ssiun 5069	Subset implication for an ...
ssiun2 5070	Identity law for subset of...
ssiun2s 5071	Subset relationship for an...
iunss2 5072	A subclass condition on th...
iunssd 5073	Subset theorem for an inde...
iunab 5074	The indexed union of a cla...
iunrab 5075	The indexed union of a res...
iunxdif2 5076	Indexed union with a class...
ssiinf 5077	Subset theorem for an inde...
ssiin 5078	Subset theorem for an inde...
iinss 5079	Subset implication for an ...
iinss2 5080	An indexed intersection is...
uniiun 5081	Class union in terms of in...
intiin 5082	Class intersection in term...
iunid 5083	An indexed union of single...
iunidOLD 5084	Obsolete version of ~ iuni...
iun0 5085	An indexed union of the em...
0iun 5086	An empty indexed union is ...
0iin 5087	An empty indexed intersect...
viin 5088	Indexed intersection with ...
iunsn 5089	Indexed union of a singlet...
iunn0 5090	There is a nonempty class ...
iinab 5091	Indexed intersection of a ...
iinrab 5092	Indexed intersection of a ...
iinrab2 5093	Indexed intersection of a ...
iunin2 5094	Indexed union of intersect...
iunin1 5095	Indexed union of intersect...
iinun2 5096	Indexed intersection of un...
iundif2 5097	Indexed union of class dif...
iindif1 5098	Indexed intersection of cl...
2iunin 5099	Rearrange indexed unions o...
iindif2 5100	Indexed intersection of cl...
iinin2 5101	Indexed intersection of in...
iinin1 5102	Indexed intersection of in...
iinvdif 5103	The indexed intersection o...
elriin 5104	Elementhood in a relative ...
riin0 5105	Relative intersection of a...
riinn0 5106	Relative intersection of a...
riinrab 5107	Relative intersection of a...
symdif0 5108	Symmetric difference with ...
symdifv 5109	The symmetric difference w...
symdifid 5110	The symmetric difference o...
iinxsng 5111	A singleton index picks ou...
iinxprg 5112	Indexed intersection with ...
iunxsng 5113	A singleton index picks ou...
iunxsn 5114	A singleton index picks ou...
iunxsngf 5115	A singleton index picks ou...
iunun 5116	Separate a union in an ind...
iunxun 5117	Separate a union in the in...
iunxdif3 5118	An indexed union where som...
iunxprg 5119	A pair index picks out two...
iunxiun 5120	Separate an indexed union ...
iinuni 5121	A relationship involving u...
iununi 5122	A relationship involving u...
sspwuni 5123	Subclass relationship for ...
pwssb 5124	Two ways to express a coll...
elpwpw 5125	Characterization of the el...
pwpwab 5126	The double power class wri...
pwpwssunieq 5127	The class of sets whose un...
elpwuni 5128	Relationship for power cla...
iinpw 5129	The power class of an inte...
iunpwss 5130	Inclusion of an indexed un...
intss2 5131	A nonempty intersection of...
rintn0 5132	Relative intersection of a...
dfdisj2 5135	Alternate definition for d...
disjss2 5136	If each element of a colle...
disjeq2 5137	Equality theorem for disjo...
disjeq2dv 5138	Equality deduction for dis...
disjss1 5139	A subset of a disjoint col...
disjeq1 5140	Equality theorem for disjo...
disjeq1d 5141	Equality theorem for disjo...
disjeq12d 5142	Equality theorem for disjo...
cbvdisj 5143	Change bound variables in ...
cbvdisjv 5144	Change bound variables in ...
nfdisjw 5145	Bound-variable hypothesis ...
nfdisj 5146	Bound-variable hypothesis ...
nfdisj1 5147	Bound-variable hypothesis ...
disjor 5148	Two ways to say that a col...
disjors 5149	Two ways to say that a col...
disji2 5150	Property of a disjoint col...
disji 5151	Property of a disjoint col...
invdisj 5152	If there is a function ` C...
invdisjrab 5153	The restricted class abstr...
disjiun 5154	A disjoint collection yiel...
disjord 5155	Conditions for a collectio...
disjiunb 5156	Two ways to say that a col...
disjiund 5157	Conditions for a collectio...
sndisj 5158	Any collection of singleto...
0disj 5159	Any collection of empty se...
disjxsn 5160	A singleton collection is ...
disjx0 5161	An empty collection is dis...
disjprg 5162	A pair collection is disjo...
disjxiun 5163	An indexed union of a disj...
disjxun 5164	The union of two disjoint ...
disjss3 5165	Expand a disjoint collecti...
breq 5168	Equality theorem for binar...
breq1 5169	Equality theorem for a bin...
breq2 5170	Equality theorem for a bin...
breq12 5171	Equality theorem for a bin...
breqi 5172	Equality inference for bin...
breq1i 5173	Equality inference for a b...
breq2i 5174	Equality inference for a b...
breq12i 5175	Equality inference for a b...
breq1d 5176	Equality deduction for a b...
breqd 5177	Equality deduction for a b...
breq2d 5178	Equality deduction for a b...
breq12d 5179	Equality deduction for a b...
breq123d 5180	Equality deduction for a b...
breqdi 5181	Equality deduction for a b...
breqan12d 5182	Equality deduction for a b...
breqan12rd 5183	Equality deduction for a b...
eqnbrtrd 5184	Substitution of equal clas...
nbrne1 5185	Two classes are different ...
nbrne2 5186	Two classes are different ...
eqbrtri 5187	Substitution of equal clas...
eqbrtrd 5188	Substitution of equal clas...
eqbrtrri 5189	Substitution of equal clas...
eqbrtrrd 5190	Substitution of equal clas...
breqtri 5191	Substitution of equal clas...
breqtrd 5192	Substitution of equal clas...
breqtrri 5193	Substitution of equal clas...
breqtrrd 5194	Substitution of equal clas...
3brtr3i 5195	Substitution of equality i...
3brtr4i 5196	Substitution of equality i...
3brtr3d 5197	Substitution of equality i...
3brtr4d 5198	Substitution of equality i...
3brtr3g 5199	Substitution of equality i...
3brtr4g 5200	Substitution of equality i...
eqbrtrid 5201	A chained equality inferen...
eqbrtrrid 5202	A chained equality inferen...
breqtrid 5203	A chained equality inferen...
breqtrrid 5204	A chained equality inferen...
eqbrtrdi 5205	A chained equality inferen...
eqbrtrrdi 5206	A chained equality inferen...
breqtrdi 5207	A chained equality inferen...
breqtrrdi 5208	A chained equality inferen...
ssbrd 5209	Deduction from a subclass ...
ssbr 5210	Implication from a subclas...
ssbri 5211	Inference from a subclass ...
nfbrd 5212	Deduction version of bound...
nfbr 5213	Bound-variable hypothesis ...
brab1 5214	Relationship between a bin...
br0 5215	The empty binary relation ...
brne0 5216	If two sets are in a binar...
brun 5217	The union of two binary re...
brin 5218	The intersection of two re...
brdif 5219	The difference of two bina...
sbcbr123 5220	Move substitution in and o...
sbcbr 5221	Move substitution in and o...
sbcbr12g 5222	Move substitution in and o...
sbcbr1g 5223	Move substitution in and o...
sbcbr2g 5224	Move substitution in and o...
brsymdif 5225	Characterization of the sy...
brralrspcev 5226	Restricted existential spe...
brimralrspcev 5227	Restricted existential spe...
opabss 5230	The collection of ordered ...
opabbid 5231	Equivalent wff's yield equ...
opabbidv 5232	Equivalent wff's yield equ...
opabbii 5233	Equivalent wff's yield equ...
nfopabd 5234	Bound-variable hypothesis ...
nfopab 5235	Bound-variable hypothesis ...
nfopab1 5236	The first abstraction vari...
nfopab2 5237	The second abstraction var...
cbvopab 5238	Rule used to change bound ...
cbvopabv 5239	Rule used to change bound ...
cbvopabvOLD 5240	Obsolete version of ~ cbvo...
cbvopab1 5241	Change first bound variabl...
cbvopab1g 5242	Change first bound variabl...
cbvopab2 5243	Change second bound variab...
cbvopab1s 5244	Change first bound variabl...
cbvopab1v 5245	Rule used to change the fi...
cbvopab1vOLD 5246	Obsolete version of ~ cbvo...
cbvopab2v 5247	Rule used to change the se...
unopab 5248	Union of two ordered pair ...
mpteq12da 5251	An equality inference for ...
mpteq12df 5252	An equality inference for ...
mpteq12dfOLD 5253	Obsolete version of ~ mpte...
mpteq12f 5254	An equality theorem for th...
mpteq12dva 5255	An equality inference for ...
mpteq12dvaOLD 5256	Obsolete version of ~ mpte...
mpteq12dv 5257	An equality inference for ...
mpteq12 5258	An equality theorem for th...
mpteq1 5259	An equality theorem for th...
mpteq1OLD 5260	Obsolete version of ~ mpte...
mpteq1d 5261	An equality theorem for th...
mpteq1i 5262	An equality theorem for th...
mpteq1iOLD 5263	Obsolete version of ~ mpte...
mpteq2da 5264	Slightly more general equa...
mpteq2daOLD 5265	Obsolete version of ~ mpte...
mpteq2dva 5266	Slightly more general equa...
mpteq2dvaOLD 5267	Obsolete version of ~ mpte...
mpteq2dv 5268	An equality inference for ...
mpteq2ia 5269	An equality inference for ...
mpteq2iaOLD 5270	Obsolete version of ~ mpte...
mpteq2i 5271	An equality inference for ...
mpteq12i 5272	An equality inference for ...
nfmpt 5273	Bound-variable hypothesis ...
nfmpt1 5274	Bound-variable hypothesis ...
cbvmptf 5275	Rule to change the bound v...
cbvmptfg 5276	Rule to change the bound v...
cbvmpt 5277	Rule to change the bound v...
cbvmptg 5278	Rule to change the bound v...
cbvmptv 5279	Rule to change the bound v...
cbvmptvOLD 5280	Obsolete version of ~ cbvm...
cbvmptvg 5281	Rule to change the bound v...
mptv 5282	Function with universal do...
dftr2 5285	An alternate way of defini...
dftr2c 5286	Variant of ~ dftr2 with co...
dftr5 5287	An alternate way of defini...
dftr5OLD 5288	Obsolete version of ~ dftr...
dftr3 5289	An alternate way of defini...
dftr4 5290	An alternate way of defini...
treq 5291	Equality theorem for the t...
trel 5292	In a transitive class, the...
trel3 5293	In a transitive class, the...
trss 5294	An element of a transitive...
trin 5295	The intersection of transi...
tr0 5296	The empty set is transitiv...
trv 5297	The universe is transitive...
triun 5298	An indexed union of a clas...
truni 5299	The union of a class of tr...
triin 5300	An indexed intersection of...
trint 5301	The intersection of a clas...
trintss 5302	Any nonempty transitive cl...
axrep1 5304	The version of the Axiom o...
axreplem 5305	Lemma for ~ axrep2 and ~ a...
axrep2 5306	Axiom of Replacement expre...
axrep3 5307	Axiom of Replacement sligh...
axrep4 5308	A more traditional version...
axrep5 5309	Axiom of Replacement (simi...
axrep6 5310	A condensed form of ~ ax-r...
axrep6g 5311	~ axrep6 in class notation...
zfrepclf 5312	An inference based on the ...
zfrep3cl 5313	An inference based on the ...
zfrep4 5314	A version of Replacement u...
axsepgfromrep 5315	A more general version ~ a...
axsep 5316	Axiom scheme of separation...
axsepg 5318	A more general version of ...
zfauscl 5319	Separation Scheme (Aussond...
bm1.3ii 5320	Convert implication to equ...
ax6vsep 5321	Derive ~ ax6v (a weakened ...
axnulALT 5322	Alternate proof of ~ axnul...
axnul 5323	The Null Set Axiom of ZF s...
0ex 5325	The Null Set Axiom of ZF s...
al0ssb 5326	The empty set is the uniqu...
sseliALT 5327	Alternate proof of ~ sseli...
csbexg 5328	The existence of proper su...
csbex 5329	The existence of proper su...
unisn2 5330	A version of ~ unisn witho...
nalset 5331	No set contains all sets. ...
vnex 5332	The universal class does n...
vprc 5333	The universal class is not...
nvel 5334	The universal class does n...
inex1 5335	Separation Scheme (Aussond...
inex2 5336	Separation Scheme (Aussond...
inex1g 5337	Closed-form, generalized S...
inex2g 5338	Sufficient condition for a...
ssex 5339	The subset of a set is als...
ssexi 5340	The subset of a set is als...
ssexg 5341	The subset of a set is als...
ssexd 5342	A subclass of a set is a s...
abexd 5343	Conditions for a class abs...
abex 5344	Conditions for a class abs...
prcssprc 5345	The superclass of a proper...
sselpwd 5346	Elementhood to a power set...
difexg 5347	Existence of a difference....
difexi 5348	Existence of a difference,...
difexd 5349	Existence of a difference....
zfausab 5350	Separation Scheme (Aussond...
elpw2g 5351	Membership in a power clas...
elpw2 5352	Membership in a power clas...
elpwi2 5353	Membership in a power clas...
rabelpw 5354	A restricted class abstrac...
rabexg 5355	Separation Scheme in terms...
rabexgOLD 5356	Obsolete proof of ~ rabexg...
rabex 5357	Separation Scheme in terms...
rabexd 5358	Separation Scheme in terms...
rabex2 5359	Separation Scheme in terms...
rab2ex 5360	A class abstraction based ...
elssabg 5361	Membership in a class abst...
intex 5362	The intersection of a none...
intnex 5363	If a class intersection is...
intexab 5364	The intersection of a none...
intexrab 5365	The intersection of a none...
iinexg 5366	The existence of a class i...
intabs 5367	Absorption of a redundant ...
inuni 5368	The intersection of a unio...
axpweq 5369	Two equivalent ways to exp...
pwnss 5370	The power set of a set is ...
pwne 5371	No set equals its power se...
difelpw 5372	A difference is an element...
class2set 5373	The class of elements of `...
0elpw 5374	Every power class contains...
pwne0 5375	A power class is never emp...
0nep0 5376	The empty set and its powe...
0inp0 5377	Something cannot be equal ...
unidif0 5378	The removal of the empty s...
eqsnuniex 5379	If a class is equal to the...
iin0 5380	An indexed intersection of...
notzfaus 5381	In the Separation Scheme ~...
intv 5382	The intersection of the un...
zfpow 5384	Axiom of Power Sets expres...
axpow2 5385	A variant of the Axiom of ...
axpow3 5386	A variant of the Axiom of ...
elALT2 5387	Alternate proof of ~ el us...
dtruALT2 5388	Alternate proof of ~ dtru ...
dtrucor 5389	Corollary of ~ dtru . Thi...
dtrucor2 5390	The theorem form of the de...
dvdemo1 5391	Demonstration of a theorem...
dvdemo2 5392	Demonstration of a theorem...
nfnid 5393	A setvar variable is not f...
nfcvb 5394	The "distinctor" expressio...
vpwex 5395	Power set axiom: the power...
pwexg 5396	Power set axiom expressed ...
pwexd 5397	Deduction version of the p...
pwex 5398	Power set axiom expressed ...
pwel 5399	Quantitative version of ~ ...
abssexg 5400	Existence of a class of su...
snexALT 5401	Alternate proof of ~ snex ...
p0ex 5402	The power set of the empty...
p0exALT 5403	Alternate proof of ~ p0ex ...
pp0ex 5404	The power set of the power...
ord3ex 5405	The ordinal number 3 is a ...
dtruALT 5406	Alternate proof of ~ dtru ...
axc16b 5407	This theorem shows that Ax...
eunex 5408	Existential uniqueness imp...
eusv1 5409	Two ways to express single...
eusvnf 5410	Even if ` x ` is free in `...
eusvnfb 5411	Two ways to say that ` A (...
eusv2i 5412	Two ways to express single...
eusv2nf 5413	Two ways to express single...
eusv2 5414	Two ways to express single...
reusv1 5415	Two ways to express single...
reusv2lem1 5416	Lemma for ~ reusv2 . (Con...
reusv2lem2 5417	Lemma for ~ reusv2 . (Con...
reusv2lem3 5418	Lemma for ~ reusv2 . (Con...
reusv2lem4 5419	Lemma for ~ reusv2 . (Con...
reusv2lem5 5420	Lemma for ~ reusv2 . (Con...
reusv2 5421	Two ways to express single...
reusv3i 5422	Two ways of expressing exi...
reusv3 5423	Two ways to express single...
eusv4 5424	Two ways to express single...
alxfr 5425	Transfer universal quantif...
ralxfrd 5426	Transfer universal quantif...
rexxfrd 5427	Transfer existential quant...
ralxfr2d 5428	Transfer universal quantif...
rexxfr2d 5429	Transfer existential quant...
ralxfrd2 5430	Transfer universal quantif...
rexxfrd2 5431	Transfer existence from a ...
ralxfr 5432	Transfer universal quantif...
ralxfrALT 5433	Alternate proof of ~ ralxf...
rexxfr 5434	Transfer existence from a ...
rabxfrd 5435	Membership in a restricted...
rabxfr 5436	Membership in a restricted...
reuhypd 5437	A theorem useful for elimi...
reuhyp 5438	A theorem useful for elimi...
zfpair 5439	The Axiom of Pairing of Ze...
axprALT 5440	Alternate proof of ~ axpr ...
axprlem1 5441	Lemma for ~ axpr . There ...
axprlem2 5442	Lemma for ~ axpr . There ...
axprlem3 5443	Lemma for ~ axpr . Elimin...
axprlem4 5444	Lemma for ~ axpr . The fi...
axprlem5 5445	Lemma for ~ axpr . The se...
axpr 5446	Unabbreviated version of t...
zfpair2 5448	Derive the abbreviated ver...
vsnex 5449	A singleton built on a set...
snexg 5450	A singleton built on a set...
snex 5451	A singleton is a set. The...
prex 5452	The Axiom of Pairing using...
exel 5453	There exist two sets, one ...
exexneq 5454	There exist two different ...
exneq 5455	Given any set (the " ` y `...
dtru 5456	Given any set (the " ` y `...
el 5457	Any set is an element of s...
sels 5458	If a class is a set, then ...
selsALT 5459	Alternate proof of ~ sels ...
elALT 5460	Alternate proof of ~ el , ...
dtruOLD 5461	Obsolete proof of ~ dtru a...
snelpwg 5462	A singleton of a set is a ...
snelpwi 5463	If a set is a member of a ...
snelpwiOLD 5464	Obsolete version of ~ snel...
snelpw 5465	A singleton of a set is a ...
prelpw 5466	An unordered pair of two s...
prelpwi 5467	If two sets are members of...
rext 5468	A theorem similar to exten...
sspwb 5469	The powerclass constructio...
unipw 5470	A class equals the union o...
univ 5471	The union of the universe ...
pwtr 5472	A class is transitive iff ...
ssextss 5473	An extensionality-like pri...
ssext 5474	An extensionality-like pri...
nssss 5475	Negation of subclass relat...
pweqb 5476	Classes are equal if and o...
intidg 5477	The intersection of all se...
intidOLD 5478	Obsolete version of ~ inti...
moabex 5479	"At most one" existence im...
rmorabex 5480	Restricted "at most one" e...
euabex 5481	The abstraction of a wff w...
nnullss 5482	A nonempty class (even if ...
exss 5483	Restricted existence in a ...
opex 5484	An ordered pair of classes...
otex 5485	An ordered triple of class...
elopg 5486	Characterization of the el...
elop 5487	Characterization of the el...
opi1 5488	One of the two elements in...
opi2 5489	One of the two elements of...
opeluu 5490	Each member of an ordered ...
op1stb 5491	Extract the first member o...
brv 5492	Two classes are always in ...
opnz 5493	An ordered pair is nonempt...
opnzi 5494	An ordered pair is nonempt...
opth1 5495	Equality of the first memb...
opth 5496	The ordered pair theorem. ...
opthg 5497	Ordered pair theorem. ` C ...
opth1g 5498	Equality of the first memb...
opthg2 5499	Ordered pair theorem. (Co...
opth2 5500	Ordered pair theorem. (Co...
opthneg 5501	Two ordered pairs are not ...
opthne 5502	Two ordered pairs are not ...
otth2 5503	Ordered triple theorem, wi...
otth 5504	Ordered triple theorem. (...
otthg 5505	Ordered triple theorem, cl...
otthne 5506	Contrapositive of the orde...
eqvinop 5507	A variable introduction la...
sbcop1 5508	The proper substitution of...
sbcop 5509	The proper substitution of...
copsexgw 5510	Version of ~ copsexg with ...
copsexg 5511	Substitution of class ` A ...
copsex2t 5512	Closed theorem form of ~ c...
copsex2g 5513	Implicit substitution infe...
copsex4g 5514	An implicit substitution i...
0nelop 5515	A property of ordered pair...
opwo0id 5516	An ordered pair is equal t...
opeqex 5517	Equivalence of existence i...
oteqex2 5518	Equivalence of existence i...
oteqex 5519	Equivalence of existence i...
opcom 5520	An ordered pair commutes i...
moop2 5521	"At most one" property of ...
opeqsng 5522	Equivalence for an ordered...
opeqsn 5523	Equivalence for an ordered...
opeqpr 5524	Equivalence for an ordered...
snopeqop 5525	Equivalence for an ordered...
propeqop 5526	Equivalence for an ordered...
propssopi 5527	If a pair of ordered pairs...
snopeqopsnid 5528	Equivalence for an ordered...
mosubopt 5529	"At most one" remains true...
mosubop 5530	"At most one" remains true...
euop2 5531	Transfer existential uniqu...
euotd 5532	Prove existential uniquene...
opthwiener 5533	Justification theorem for ...
uniop 5534	The union of an ordered pa...
uniopel 5535	Ordered pair membership is...
opthhausdorff 5536	Justification theorem for ...
opthhausdorff0 5537	Justification theorem for ...
otsndisj 5538	The singletons consisting ...
otiunsndisj 5539	The union of singletons co...
iunopeqop 5540	Implication of an ordered ...
brsnop 5541	Binary relation for an ord...
brtp 5542	A necessary and sufficient...
opabidw 5543	The law of concretion. Sp...
opabid 5544	The law of concretion. Sp...
elopabw 5545	Membership in a class abst...
elopab 5546	Membership in a class abst...
rexopabb 5547	Restricted existential qua...
vopelopabsb 5548	The law of concretion in t...
opelopabsb 5549	The law of concretion in t...
brabsb 5550	The law of concretion in t...
opelopabt 5551	Closed theorem form of ~ o...
opelopabga 5552	The law of concretion. Th...
brabga 5553	The law of concretion for ...
opelopab2a 5554	Ordered pair membership in...
opelopaba 5555	The law of concretion. Th...
braba 5556	The law of concretion for ...
opelopabg 5557	The law of concretion. Th...
brabg 5558	The law of concretion for ...
opelopabgf 5559	The law of concretion. Th...
opelopab2 5560	Ordered pair membership in...
opelopab 5561	The law of concretion. Th...
brab 5562	The law of concretion for ...
opelopabaf 5563	The law of concretion. Th...
opelopabf 5564	The law of concretion. Th...
ssopab2 5565	Equivalence of ordered pai...
ssopab2bw 5566	Equivalence of ordered pai...
eqopab2bw 5567	Equivalence of ordered pai...
ssopab2b 5568	Equivalence of ordered pai...
ssopab2i 5569	Inference of ordered pair ...
ssopab2dv 5570	Inference of ordered pair ...
eqopab2b 5571	Equivalence of ordered pai...
opabn0 5572	Nonempty ordered pair clas...
opab0 5573	Empty ordered pair class a...
csbopab 5574	Move substitution into a c...
csbopabgALT 5575	Move substitution into a c...
csbmpt12 5576	Move substitution into a m...
csbmpt2 5577	Move substitution into the...
iunopab 5578	Move indexed union inside ...
iunopabOLD 5579	Obsolete version of ~ iuno...
elopabr 5580	Membership in an ordered-p...
elopabran 5581	Membership in an ordered-p...
elopabrOLD 5582	Obsolete version of ~ elop...
rbropapd 5583	Properties of a pair in an...
rbropap 5584	Properties of a pair in a ...
2rbropap 5585	Properties of a pair in a ...
0nelopab 5586	The empty set is never an ...
0nelopabOLD 5587	Obsolete version of ~ 0nel...
brabv 5588	If two classes are in a re...
pwin 5589	The power class of the int...
pwssun 5590	The power class of the uni...
pwun 5591	The power class of the uni...
dfid4 5594	The identity function expr...
dfid2 5595	Alternate definition of th...
dfid3 5596	A stronger version of ~ df...
dfid2OLD 5597	Obsolete version of ~ dfid...
epelg 5600	The membership relation an...
epeli 5601	The membership relation an...
epel 5602	The membership relation an...
0sn0ep 5603	An example for the members...
epn0 5604	The membership relation is...
poss 5609	Subset theorem for the par...
poeq1 5610	Equality theorem for parti...
poeq2 5611	Equality theorem for parti...
poeq12d 5612	Equality deduction for par...
nfpo 5613	Bound-variable hypothesis ...
nfso 5614	Bound-variable hypothesis ...
pocl 5615	Characteristic properties ...
poclOLD 5616	Obsolete version of ~ pocl...
ispod 5617	Sufficient conditions for ...
swopolem 5618	Perform the substitutions ...
swopo 5619	A strict weak order is a p...
poirr 5620	A partial order is irrefle...
potr 5621	A partial order is a trans...
po2nr 5622	A partial order has no 2-c...
po3nr 5623	A partial order has no 3-c...
po2ne 5624	Two sets related by a part...
po0 5625	Any relation is a partial ...
pofun 5626	The inverse image of a par...
sopo 5627	A strict linear order is a...
soss 5628	Subset theorem for the str...
soeq1 5629	Equality theorem for the s...
soeq2 5630	Equality theorem for the s...
soeq12d 5631	Equality deduction for tot...
sonr 5632	A strict order relation is...
sotr 5633	A strict order relation is...
solin 5634	A strict order relation is...
so2nr 5635	A strict order relation ha...
so3nr 5636	A strict order relation ha...
sotric 5637	A strict order relation sa...
sotrieq 5638	Trichotomy law for strict ...
sotrieq2 5639	Trichotomy law for strict ...
soasym 5640	Asymmetry law for strict o...
sotr2 5641	A transitivity relation. ...
issod 5642	An irreflexive, transitive...
issoi 5643	An irreflexive, transitive...
isso2i 5644	Deduce strict ordering fro...
so0 5645	Any relation is a strict o...
somo 5646	A totally ordered set has ...
sotrine 5647	Trichotomy law for strict ...
sotr3 5648	Transitivity law for stric...
dffr6 5655	Alternate definition of ~ ...
frd 5656	A nonempty subset of an ` ...
fri 5657	A nonempty subset of an ` ...
friOLD 5658	Obsolete version of ~ fri ...
seex 5659	The ` R ` -preimage of an ...
exse 5660	Any relation on a set is s...
dffr2 5661	Alternate definition of we...
dffr2ALT 5662	Alternate proof of ~ dffr2...
frc 5663	Property of well-founded r...
frss 5664	Subset theorem for the wel...
sess1 5665	Subset theorem for the set...
sess2 5666	Subset theorem for the set...
freq1 5667	Equality theorem for the w...
freq2 5668	Equality theorem for the w...
freq12d 5669	Equality deduction for wel...
seeq1 5670	Equality theorem for the s...
seeq2 5671	Equality theorem for the s...
seeq12d 5672	Equality deduction for the...
nffr 5673	Bound-variable hypothesis ...
nfse 5674	Bound-variable hypothesis ...
nfwe 5675	Bound-variable hypothesis ...
frirr 5676	A well-founded relation is...
fr2nr 5677	A well-founded relation ha...
fr0 5678	Any relation is well-found...
frminex 5679	If an element of a well-fo...
efrirr 5680	A well-founded class does ...
efrn2lp 5681	A well-founded class conta...
epse 5682	The membership relation is...
tz7.2 5683	Similar to Theorem 7.2 of ...
dfepfr 5684	An alternate way of saying...
epfrc 5685	A subset of a well-founded...
wess 5686	Subset theorem for the wel...
weeq1 5687	Equality theorem for the w...
weeq2 5688	Equality theorem for the w...
weeq12d 5689	Equality deduction for wel...
wefr 5690	A well-ordering is well-fo...
weso 5691	A well-ordering is a stric...
wecmpep 5692	The elements of a class we...
wetrep 5693	On a class well-ordered by...
wefrc 5694	A nonempty subclass of a c...
we0 5695	Any relation is a well-ord...
wereu 5696	A nonempty subset of an ` ...
wereu2 5697	A nonempty subclass of an ...
xpeq1 5714	Equality theorem for Carte...
xpss12 5715	Subset theorem for Cartesi...
xpss 5716	A Cartesian product is inc...
inxpssres 5717	Intersection with a Cartes...
relxp 5718	A Cartesian product is a r...
xpss1 5719	Subset relation for Cartes...
xpss2 5720	Subset relation for Cartes...
xpeq2 5721	Equality theorem for Carte...
elxpi 5722	Membership in a Cartesian ...
elxp 5723	Membership in a Cartesian ...
elxp2 5724	Membership in a Cartesian ...
xpeq12 5725	Equality theorem for Carte...
xpeq1i 5726	Equality inference for Car...
xpeq2i 5727	Equality inference for Car...
xpeq12i 5728	Equality inference for Car...
xpeq1d 5729	Equality deduction for Car...
xpeq2d 5730	Equality deduction for Car...
xpeq12d 5731	Equality deduction for Car...
sqxpeqd 5732	Equality deduction for a C...
nfxp 5733	Bound-variable hypothesis ...
0nelxp 5734	The empty set is not a mem...
0nelelxp 5735	A member of a Cartesian pr...
opelxp 5736	Ordered pair membership in...
opelxpi 5737	Ordered pair membership in...
opelxpii 5738	Ordered pair membership in...
opelxpd 5739	Ordered pair membership in...
opelvv 5740	Ordered pair membership in...
opelvvg 5741	Ordered pair membership in...
opelxp1 5742	The first member of an ord...
opelxp2 5743	The second member of an or...
otelxp 5744	Ordered triple membership ...
otelxp1 5745	The first member of an ord...
otel3xp 5746	An ordered triple is an el...
opabssxpd 5747	An ordered-pair class abst...
rabxp 5748	Class abstraction restrict...
brxp 5749	Binary relation on a Carte...
pwvrel 5750	A set is a binary relation...
pwvabrel 5751	The powerclass of the cart...
brrelex12 5752	Two classes related by a b...
brrelex1 5753	If two classes are related...
brrelex2 5754	If two classes are related...
brrelex12i 5755	Two classes that are relat...
brrelex1i 5756	The first argument of a bi...
brrelex2i 5757	The second argument of a b...
nprrel12 5758	Proper classes are not rel...
nprrel 5759	No proper class is related...
0nelrel0 5760	A binary relation does not...
0nelrel 5761	A binary relation does not...
fconstmpt 5762	Representation of a consta...
vtoclr 5763	Variable to class conversi...
opthprc 5764	Justification theorem for ...
brel 5765	Two things in a binary rel...
elxp3 5766	Membership in a Cartesian ...
opeliunxp 5767	Membership in a union of C...
xpundi 5768	Distributive law for Carte...
xpundir 5769	Distributive law for Carte...
xpiundi 5770	Distributive law for Carte...
xpiundir 5771	Distributive law for Carte...
iunxpconst 5772	Membership in a union of C...
xpun 5773	The Cartesian product of t...
elvv 5774	Membership in universal cl...
elvvv 5775	Membership in universal cl...
elvvuni 5776	An ordered pair contains i...
brinxp2 5777	Intersection of binary rel...
brinxp 5778	Intersection of binary rel...
opelinxp 5779	Ordered pair element in an...
poinxp 5780	Intersection of partial or...
soinxp 5781	Intersection of total orde...
frinxp 5782	Intersection of well-found...
seinxp 5783	Intersection of set-like r...
weinxp 5784	Intersection of well-order...
posn 5785	Partial ordering of a sing...
sosn 5786	Strict ordering on a singl...
frsn 5787	Founded relation on a sing...
wesn 5788	Well-ordering of a singlet...
elopaelxp 5789	Membership in an ordered-p...
elopaelxpOLD 5790	Obsolete version of ~ elop...
bropaex12 5791	Two classes related by an ...
opabssxp 5792	An abstraction relation is...
brab2a 5793	The law of concretion for ...
optocl 5794	Implicit substitution of c...
2optocl 5795	Implicit substitution of c...
3optocl 5796	Implicit substitution of c...
opbrop 5797	Ordered pair membership in...
0xp 5798	The Cartesian product with...
csbxp 5799	Distribute proper substitu...
releq 5800	Equality theorem for the r...
releqi 5801	Equality inference for the...
releqd 5802	Equality deduction for the...
nfrel 5803	Bound-variable hypothesis ...
sbcrel 5804	Distribute proper substitu...
relss 5805	Subclass theorem for relat...
ssrel 5806	A subclass relationship de...
ssrelOLD 5807	Obsolete version of ~ ssre...
eqrel 5808	Extensionality principle f...
ssrel2 5809	A subclass relationship de...
ssrel3 5810	Subclass relation in anoth...
relssi 5811	Inference from subclass pr...
relssdv 5812	Deduction from subclass pr...
eqrelriv 5813	Inference from extensional...
eqrelriiv 5814	Inference from extensional...
eqbrriv 5815	Inference from extensional...
eqrelrdv 5816	Deduce equality of relatio...
eqbrrdv 5817	Deduction from extensional...
eqbrrdiv 5818	Deduction from extensional...
eqrelrdv2 5819	A version of ~ eqrelrdv . ...
ssrelrel 5820	A subclass relationship de...
eqrelrel 5821	Extensionality principle f...
elrel 5822	A member of a relation is ...
rel0 5823	The empty set is a relatio...
nrelv 5824	The universal class is not...
relsng 5825	A singleton is a relation ...
relsnb 5826	An at-most-singleton is a ...
relsnopg 5827	A singleton of an ordered ...
relsn 5828	A singleton is a relation ...
relsnop 5829	A singleton of an ordered ...
copsex2gb 5830	Implicit substitution infe...
copsex2ga 5831	Implicit substitution infe...
elopaba 5832	Membership in an ordered-p...
xpsspw 5833	A Cartesian product is inc...
unixpss 5834	The double class union of ...
relun 5835	The union of two relations...
relin1 5836	The intersection with a re...
relin2 5837	The intersection with a re...
relinxp 5838	Intersection with a Cartes...
reldif 5839	A difference cutting down ...
reliun 5840	An indexed union is a rela...
reliin 5841	An indexed intersection is...
reluni 5842	The union of a class is a ...
relint 5843	The intersection of a clas...
relopabiv 5844	A class of ordered pairs i...
relopabv 5845	A class of ordered pairs i...
relopabi 5846	A class of ordered pairs i...
relopabiALT 5847	Alternate proof of ~ relop...
relopab 5848	A class of ordered pairs i...
mptrel 5849	The maps-to notation alway...
reli 5850	The identity relation is a...
rele 5851	The membership relation is...
opabid2 5852	A relation expressed as an...
inopab 5853	Intersection of two ordere...
difopab 5854	Difference of two ordered-...
difopabOLD 5855	Obsolete version of ~ difo...
inxp 5856	Intersection of two Cartes...
inxpOLD 5857	Obsolete version of ~ inxp...
xpindi 5858	Distributive law for Carte...
xpindir 5859	Distributive law for Carte...
xpiindi 5860	Distributive law for Carte...
xpriindi 5861	Distributive law for Carte...
eliunxp 5862	Membership in a union of C...
opeliunxp2 5863	Membership in a union of C...
raliunxp 5864	Write a double restricted ...
rexiunxp 5865	Write a double restricted ...
ralxp 5866	Universal quantification r...
rexxp 5867	Existential quantification...
exopxfr 5868	Transfer ordered-pair exis...
exopxfr2 5869	Transfer ordered-pair exis...
djussxp 5870	Disjoint union is a subset...
ralxpf 5871	Version of ~ ralxp with bo...
rexxpf 5872	Version of ~ rexxp with bo...
iunxpf 5873	Indexed union on a Cartesi...
opabbi2dv 5874	Deduce equality of a relat...
relop 5875	A necessary and sufficient...
ideqg 5876	For sets, the identity rel...
ideq 5877	For sets, the identity rel...
ididg 5878	A set is identical to itse...
issetid 5879	Two ways of expressing set...
coss1 5880	Subclass theorem for compo...
coss2 5881	Subclass theorem for compo...
coeq1 5882	Equality theorem for compo...
coeq2 5883	Equality theorem for compo...
coeq1i 5884	Equality inference for com...
coeq2i 5885	Equality inference for com...
coeq1d 5886	Equality deduction for com...
coeq2d 5887	Equality deduction for com...
coeq12i 5888	Equality inference for com...
coeq12d 5889	Equality deduction for com...
nfco 5890	Bound-variable hypothesis ...
brcog 5891	Ordered pair membership in...
opelco2g 5892	Ordered pair membership in...
brcogw 5893	Ordered pair membership in...
eqbrrdva 5894	Deduction from extensional...
brco 5895	Binary relation on a compo...
opelco 5896	Ordered pair membership in...
cnvss 5897	Subset theorem for convers...
cnveq 5898	Equality theorem for conve...
cnveqi 5899	Equality inference for con...
cnveqd 5900	Equality deduction for con...
elcnv 5901	Membership in a converse r...
elcnv2 5902	Membership in a converse r...
nfcnv 5903	Bound-variable hypothesis ...
brcnvg 5904	The converse of a binary r...
opelcnvg 5905	Ordered-pair membership in...
opelcnv 5906	Ordered-pair membership in...
brcnv 5907	The converse of a binary r...
csbcnv 5908	Move class substitution in...
csbcnvgALT 5909	Move class substitution in...
cnvco 5910	Distributive law of conver...
cnvuni 5911	The converse of a class un...
dfdm3 5912	Alternate definition of do...
dfrn2 5913	Alternate definition of ra...
dfrn3 5914	Alternate definition of ra...
elrn2g 5915	Membership in a range. (C...
elrng 5916	Membership in a range. (C...
elrn2 5917	Membership in a range. (C...
elrn 5918	Membership in a range. (C...
ssrelrn 5919	If a relation is a subset ...
dfdm4 5920	Alternate definition of do...
dfdmf 5921	Definition of domain, usin...
csbdm 5922	Distribute proper substitu...
eldmg 5923	Domain membership. Theore...
eldm2g 5924	Domain membership. Theore...
eldm 5925	Membership in a domain. T...
eldm2 5926	Membership in a domain. T...
dmss 5927	Subset theorem for domain....
dmeq 5928	Equality theorem for domai...
dmeqi 5929	Equality inference for dom...
dmeqd 5930	Equality deduction for dom...
opeldmd 5931	Membership of first of an ...
opeldm 5932	Membership of first of an ...
breldm 5933	Membership of first of a b...
breldmg 5934	Membership of first of a b...
dmun 5935	The domain of a union is t...
dmin 5936	The domain of an intersect...
breldmd 5937	Membership of first of a b...
dmiun 5938	The domain of an indexed u...
dmuni 5939	The domain of a union. Pa...
dmopab 5940	The domain of a class of o...
dmopabelb 5941	A set is an element of the...
dmopab2rex 5942	The domain of an ordered p...
dmopabss 5943	Upper bound for the domain...
dmopab3 5944	The domain of a restricted...
dm0 5945	The domain of the empty se...
dmi 5946	The domain of the identity...
dmv 5947	The domain of the universe...
dmep 5948	The domain of the membersh...
dm0rn0 5949	An empty domain is equival...
rn0 5950	The range of the empty set...
rnep 5951	The range of the membershi...
reldm0 5952	A relation is empty iff it...
dmxp 5953	The domain of a Cartesian ...
dmxpOLD 5954	Obsolete version of ~ dmxp...
dmxpid 5955	The domain of a Cartesian ...
dmxpin 5956	The domain of the intersec...
xpid11 5957	The Cartesian square is a ...
dmcnvcnv 5958	The domain of the double c...
rncnvcnv 5959	The range of the double co...
elreldm 5960	The first member of an ord...
rneq 5961	Equality theorem for range...
rneqi 5962	Equality inference for ran...
rneqd 5963	Equality deduction for ran...
rnss 5964	Subset theorem for range. ...
rnssi 5965	Subclass inference for ran...
brelrng 5966	The second argument of a b...
brelrn 5967	The second argument of a b...
opelrn 5968	Membership of second membe...
releldm 5969	The first argument of a bi...
relelrn 5970	The second argument of a b...
releldmb 5971	Membership in a domain. (...
relelrnb 5972	Membership in a range. (C...
releldmi 5973	The first argument of a bi...
relelrni 5974	The second argument of a b...
dfrnf 5975	Definition of range, using...
nfdm 5976	Bound-variable hypothesis ...
nfrn 5977	Bound-variable hypothesis ...
dmiin 5978	Domain of an intersection....
rnopab 5979	The range of a class of or...
rnopabss 5980	Upper bound for the range ...
rnopab3 5981	The range of a restricted ...
rnmpt 5982	The range of a function in...
elrnmpt 5983	The range of a function in...
elrnmpt1s 5984	Elementhood in an image se...
elrnmpt1 5985	Elementhood in an image se...
elrnmptg 5986	Membership in the range of...
elrnmpti 5987	Membership in the range of...
elrnmptd 5988	The range of a function in...
elrnmpt1d 5989	Elementhood in an image se...
elrnmptdv 5990	Elementhood in the range o...
elrnmpt2d 5991	Elementhood in the range o...
dfiun3g 5992	Alternate definition of in...
dfiin3g 5993	Alternate definition of in...
dfiun3 5994	Alternate definition of in...
dfiin3 5995	Alternate definition of in...
riinint 5996	Express a relative indexed...
relrn0 5997	A relation is empty iff it...
dmrnssfld 5998	The domain and range of a ...
dmcoss 5999	Domain of a composition. ...
rncoss 6000	Range of a composition. (...
dmcosseq 6001	Domain of a composition. ...
dmcosseqOLD 6002	Obsolete version of ~ dmco...
dmcoeq 6003	Domain of a composition. ...
rncoeq 6004	Range of a composition. (...
reseq1 6005	Equality theorem for restr...
reseq2 6006	Equality theorem for restr...
reseq1i 6007	Equality inference for res...
reseq2i 6008	Equality inference for res...
reseq12i 6009	Equality inference for res...
reseq1d 6010	Equality deduction for res...
reseq2d 6011	Equality deduction for res...
reseq12d 6012	Equality deduction for res...
nfres 6013	Bound-variable hypothesis ...
csbres 6014	Distribute proper substitu...
res0 6015	A restriction to the empty...
dfres3 6016	Alternate definition of re...
opelres 6017	Ordered pair elementhood i...
brres 6018	Binary relation on a restr...
opelresi 6019	Ordered pair membership in...
brresi 6020	Binary relation on a restr...
opres 6021	Ordered pair membership in...
resieq 6022	A restricted identity rela...
opelidres 6023	` <. A , A >. ` belongs to...
resres 6024	The restriction of a restr...
resundi 6025	Distributive law for restr...
resundir 6026	Distributive law for restr...
resindi 6027	Class restriction distribu...
resindir 6028	Class restriction distribu...
inres 6029	Move intersection into cla...
resdifcom 6030	Commutative law for restri...
resiun1 6031	Distribution of restrictio...
resiun2 6032	Distribution of restrictio...
resss 6033	A class includes its restr...
rescom 6034	Commutative law for restri...
ssres 6035	Subclass theorem for restr...
ssres2 6036	Subclass theorem for restr...
relres 6037	A restriction is a relatio...
resabs1 6038	Absorption law for restric...
resabs1d 6039	Absorption law for restric...
resabs2 6040	Absorption law for restric...
residm 6041	Idempotent law for restric...
dmresss 6042	The domain of a restrictio...
dmres 6043	The domain of a restrictio...
ssdmres 6044	A domain restricted to a s...
dmresexg 6045	The domain of a restrictio...
resima 6046	A restriction to an image....
resima2 6047	Image under a restricted c...
rnresss 6048	The range of a restriction...
xpssres 6049	Restriction of a constant ...
elinxp 6050	Membership in an intersect...
elres 6051	Membership in a restrictio...
elsnres 6052	Membership in restriction ...
relssres 6053	Simplification law for res...
dmressnsn 6054	The domain of a restrictio...
eldmressnsn 6055	The element of the domain ...
eldmeldmressn 6056	An element of the domain (...
resdm 6057	A relation restricted to i...
resexg 6058	The restriction of a set i...
resexd 6059	The restriction of a set i...
resex 6060	The restriction of a set i...
resindm 6061	When restricting a relatio...
resdmdfsn 6062	Restricting a relation to ...
reldisjun 6063	Split a relation into two ...
relresdm1 6064	Restriction of a disjoint ...
resopab 6065	Restriction of a class abs...
iss 6066	A subclass of the identity...
resopab2 6067	Restriction of a class abs...
resmpt 6068	Restriction of the mapping...
resmpt3 6069	Unconditional restriction ...
resmptf 6070	Restriction of the mapping...
resmptd 6071	Restriction of the mapping...
dfres2 6072	Alternate definition of th...
mptss 6073	Sufficient condition for i...
elimampt 6074	Membership in the image of...
elidinxp 6075	Characterization of the el...
elidinxpid 6076	Characterization of the el...
elrid 6077	Characterization of the el...
idinxpres 6078	The intersection of the id...
idinxpresid 6079	The intersection of the id...
idssxp 6080	A diagonal set as a subset...
opabresid 6081	The restricted identity re...
mptresid 6082	The restricted identity re...
dmresi 6083	The domain of a restricted...
restidsing 6084	Restriction of the identit...
iresn0n0 6085	The identity function rest...
imaeq1 6086	Equality theorem for image...
imaeq2 6087	Equality theorem for image...
imaeq1i 6088	Equality theorem for image...
imaeq2i 6089	Equality theorem for image...
imaeq1d 6090	Equality theorem for image...
imaeq2d 6091	Equality theorem for image...
imaeq12d 6092	Equality theorem for image...
dfima2 6093	Alternate definition of im...
dfima3 6094	Alternate definition of im...
elimag 6095	Membership in an image. T...
elima 6096	Membership in an image. T...
elima2 6097	Membership in an image. T...
elima3 6098	Membership in an image. T...
nfima 6099	Bound-variable hypothesis ...
nfimad 6100	Deduction version of bound...
imadmrn 6101	The image of the domain of...
imassrn 6102	The image of a class is a ...
mptima 6103	Image of a function in map...
mptimass 6104	Image of a function in map...
imai 6105	Image under the identity r...
rnresi 6106	The range of the restricte...
resiima 6107	The image of a restriction...
ima0 6108	Image of the empty set. T...
0ima 6109	Image under the empty rela...
csbima12 6110	Move class substitution in...
imadisj 6111	A class whose image under ...
imadisjlnd 6112	Deduction form of one nega...
cnvimass 6113	A preimage under any class...
cnvimarndm 6114	The preimage of the range ...
imasng 6115	The image of a singleton. ...
relimasn 6116	The image of a singleton. ...
elrelimasn 6117	Elementhood in the image o...
elimasng1 6118	Membership in an image of ...
elimasn1 6119	Membership in an image of ...
elimasng 6120	Membership in an image of ...
elimasn 6121	Membership in an image of ...
elimasngOLD 6122	Obsolete version of ~ elim...
elimasni 6123	Membership in an image of ...
args 6124	Two ways to express the cl...
elinisegg 6125	Membership in the inverse ...
eliniseg 6126	Membership in the inverse ...
epin 6127	Any set is equal to its pr...
epini 6128	Any set is equal to its pr...
iniseg 6129	An idiom that signifies an...
inisegn0 6130	Nonemptiness of an initial...
dffr3 6131	Alternate definition of we...
dfse2 6132	Alternate definition of se...
imass1 6133	Subset theorem for image. ...
imass2 6134	Subset theorem for image. ...
ndmima 6135	The image of a singleton o...
relcnv 6136	A converse is a relation. ...
relbrcnvg 6137	When ` R ` is a relation, ...
eliniseg2 6138	Eliminate the class existe...
relbrcnv 6139	When ` R ` is a relation, ...
relco 6140	A composition is a relatio...
cotrg 6141	Two ways of saying that th...
cotrgOLD 6142	Obsolete version of ~ cotr...
cotrgOLDOLD 6143	Obsolete version of ~ cotr...
cotr 6144	Two ways of saying a relat...
idrefALT 6145	Alternate proof of ~ idref...
cnvsym 6146	Two ways of saying a relat...
cnvsymOLD 6147	Obsolete proof of ~ cnvsym...
cnvsymOLDOLD 6148	Obsolete proof of ~ cnvsym...
intasym 6149	Two ways of saying a relat...
asymref 6150	Two ways of saying a relat...
asymref2 6151	Two ways of saying a relat...
intirr 6152	Two ways of saying a relat...
brcodir 6153	Two ways of saying that tw...
codir 6154	Two ways of saying a relat...
qfto 6155	A quantifier-free way of e...
xpidtr 6156	A Cartesian square is a tr...
trin2 6157	The intersection of two tr...
poirr2 6158	A partial order is irrefle...
trinxp 6159	The relation induced by a ...
soirri 6160	A strict order relation is...
sotri 6161	A strict order relation is...
son2lpi 6162	A strict order relation ha...
sotri2 6163	A transitivity relation. ...
sotri3 6164	A transitivity relation. ...
poleloe 6165	Express "less than or equa...
poltletr 6166	Transitive law for general...
somin1 6167	Property of a minimum in a...
somincom 6168	Commutativity of minimum i...
somin2 6169	Property of a minimum in a...
soltmin 6170	Being less than a minimum,...
cnvopab 6171	The converse of a class ab...
cnvopabOLD 6172	Obsolete version of ~ cnvo...
mptcnv 6173	The converse of a mapping ...
cnv0 6174	The converse of the empty ...
cnvi 6175	The converse of the identi...
cnvun 6176	The converse of a union is...
cnvdif 6177	Distributive law for conve...
cnvin 6178	Distributive law for conve...
rnun 6179	Distributive law for range...
rnin 6180	The range of an intersecti...
rniun 6181	The range of an indexed un...
rnuni 6182	The range of a union. Par...
imaundi 6183	Distributive law for image...
imaundir 6184	The image of a union. (Co...
cnvimassrndm 6185	The preimage of a superset...
dminss 6186	An upper bound for interse...
imainss 6187	An upper bound for interse...
inimass 6188	The image of an intersecti...
inimasn 6189	The intersection of the im...
cnvxp 6190	The converse of a Cartesia...
xp0 6191	The Cartesian product with...
xpnz 6192	The Cartesian product of n...
xpeq0 6193	At least one member of an ...
xpdisj1 6194	Cartesian products with di...
xpdisj2 6195	Cartesian products with di...
xpsndisj 6196	Cartesian products with tw...
difxp 6197	Difference of Cartesian pr...
difxp1 6198	Difference law for Cartesi...
difxp2 6199	Difference law for Cartesi...
djudisj 6200	Disjoint unions with disjo...
xpdifid 6201	The set of distinct couple...
resdisj 6202	A double restriction to di...
rnxp 6203	The range of a Cartesian p...
dmxpss 6204	The domain of a Cartesian ...
rnxpss 6205	The range of a Cartesian p...
rnxpid 6206	The range of a Cartesian s...
ssxpb 6207	A Cartesian product subcla...
xp11 6208	The Cartesian product of n...
xpcan 6209	Cancellation law for Carte...
xpcan2 6210	Cancellation law for Carte...
ssrnres 6211	Two ways to express surjec...
rninxp 6212	Two ways to express surjec...
dminxp 6213	Two ways to express totali...
imainrect 6214	Image by a restricted and ...
xpima 6215	Direct image by a Cartesia...
xpima1 6216	Direct image by a Cartesia...
xpima2 6217	Direct image by a Cartesia...
xpimasn 6218	Direct image of a singleto...
sossfld 6219	The base set of a strict o...
sofld 6220	The base set of a nonempty...
cnvcnv3 6221	The set of all ordered pai...
dfrel2 6222	Alternate definition of re...
dfrel4v 6223	A relation can be expresse...
dfrel4 6224	A relation can be expresse...
cnvcnv 6225	The double converse of a c...
cnvcnv2 6226	The double converse of a c...
cnvcnvss 6227	The double converse of a c...
cnvrescnv 6228	Two ways to express the co...
cnveqb 6229	Equality theorem for conve...
cnveq0 6230	A relation empty iff its c...
dfrel3 6231	Alternate definition of re...
elid 6232	Characterization of the el...
dmresv 6233	The domain of a universal ...
rnresv 6234	The range of a universal r...
dfrn4 6235	Range defined in terms of ...
csbrn 6236	Distribute proper substitu...
rescnvcnv 6237	The restriction of the dou...
cnvcnvres 6238	The double converse of the...
imacnvcnv 6239	The image of the double co...
dmsnn0 6240	The domain of a singleton ...
rnsnn0 6241	The range of a singleton i...
dmsn0 6242	The domain of the singleto...
cnvsn0 6243	The converse of the single...
dmsn0el 6244	The domain of a singleton ...
relsn2 6245	A singleton is a relation ...
dmsnopg 6246	The domain of a singleton ...
dmsnopss 6247	The domain of a singleton ...
dmpropg 6248	The domain of an unordered...
dmsnop 6249	The domain of a singleton ...
dmprop 6250	The domain of an unordered...
dmtpop 6251	The domain of an unordered...
cnvcnvsn 6252	Double converse of a singl...
dmsnsnsn 6253	The domain of the singleto...
rnsnopg 6254	The range of a singleton o...
rnpropg 6255	The range of a pair of ord...
cnvsng 6256	Converse of a singleton of...
rnsnop 6257	The range of a singleton o...
op1sta 6258	Extract the first member o...
cnvsn 6259	Converse of a singleton of...
op2ndb 6260	Extract the second member ...
op2nda 6261	Extract the second member ...
opswap 6262	Swap the members of an ord...
cnvresima 6263	An image under the convers...
resdm2 6264	A class restricted to its ...
resdmres 6265	Restriction to the domain ...
resresdm 6266	A restriction by an arbitr...
imadmres 6267	The image of the domain of...
resdmss 6268	Subset relationship for th...
resdifdi 6269	Distributive law for restr...
resdifdir 6270	Distributive law for restr...
mptpreima 6271	The preimage of a function...
mptiniseg 6272	Converse singleton image o...
dmmpt 6273	The domain of the mapping ...
dmmptss 6274	The domain of a mapping is...
dmmptg 6275	The domain of the mapping ...
rnmpt0f 6276	The range of a function in...
rnmptn0 6277	The range of a function in...
dfco2 6278	Alternate definition of a ...
dfco2a 6279	Generalization of ~ dfco2 ...
coundi 6280	Class composition distribu...
coundir 6281	Class composition distribu...
cores 6282	Restricted first member of...
resco 6283	Associative law for the re...
imaco 6284	Image of the composition o...
rnco 6285	The range of the compositi...
rnco2 6286	The range of the compositi...
dmco 6287	The domain of a compositio...
coeq0 6288	A composition of two relat...
coiun 6289	Composition with an indexe...
cocnvcnv1 6290	A composition is not affec...
cocnvcnv2 6291	A composition is not affec...
cores2 6292	Absorption of a reverse (p...
co02 6293	Composition with the empty...
co01 6294	Composition with the empty...
coi1 6295	Composition with the ident...
coi2 6296	Composition with the ident...
coires1 6297	Composition with a restric...
coass 6298	Associative law for class ...
relcnvtrg 6299	General form of ~ relcnvtr...
relcnvtr 6300	A relation is transitive i...
relssdmrn 6301	A relation is included in ...
relssdmrnOLD 6302	Obsolete version of ~ rels...
resssxp 6303	If the ` R ` -image of a c...
cnvssrndm 6304	The converse is a subset o...
cossxp 6305	Composition as a subset of...
relrelss 6306	Two ways to describe the s...
unielrel 6307	The membership relation fo...
relfld 6308	The double union of a rela...
relresfld 6309	Restriction of a relation ...
relcoi2 6310	Composition with the ident...
relcoi1 6311	Composition with the ident...
unidmrn 6312	The double union of the co...
relcnvfld 6313	if ` R ` is a relation, it...
dfdm2 6314	Alternate definition of do...
unixp 6315	The double class union of ...
unixp0 6316	A Cartesian product is emp...
unixpid 6317	Field of a Cartesian squar...
ressn 6318	Restriction of a class to ...
cnviin 6319	The converse of an interse...
cnvpo 6320	The converse of a partial ...
cnvso 6321	The converse of a strict o...
xpco 6322	Composition of two Cartesi...
xpcoid 6323	Composition of two Cartesi...
elsnxp 6324	Membership in a Cartesian ...
reu3op 6325	There is a unique ordered ...
reuop 6326	There is a unique ordered ...
opreu2reurex 6327	There is a unique ordered ...
opreu2reu 6328	If there is a unique order...
dfpo2 6329	Quantifier-free definition...
csbcog 6330	Distribute proper substitu...
snres0 6331	Condition for restriction ...
imaindm 6332	The image is unaffected by...
predeq123 6335	Equality theorem for the p...
predeq1 6336	Equality theorem for the p...
predeq2 6337	Equality theorem for the p...
predeq3 6338	Equality theorem for the p...
nfpred 6339	Bound-variable hypothesis ...
csbpredg 6340	Move class substitution in...
predpredss 6341	If ` A ` is a subset of ` ...
predss 6342	The predecessor class of `...
sspred 6343	Another subset/predecessor...
dfpred2 6344	An alternate definition of...
dfpred3 6345	An alternate definition of...
dfpred3g 6346	An alternate definition of...
elpredgg 6347	Membership in a predecesso...
elpredg 6348	Membership in a predecesso...
elpredimg 6349	Membership in a predecesso...
elpredim 6350	Membership in a predecesso...
elpred 6351	Membership in a predecesso...
predexg 6352	The predecessor class exis...
predasetexOLD 6353	Obsolete form of ~ predexg...
dffr4 6354	Alternate definition of we...
predel 6355	Membership in the predeces...
predtrss 6356	If ` R ` is transitive ove...
predpo 6357	Property of the predecesso...
predso 6358	Property of the predecesso...
setlikespec 6359	If ` R ` is set-like in ` ...
predidm 6360	Idempotent law for the pre...
predin 6361	Intersection law for prede...
predun 6362	Union law for predecessor ...
preddif 6363	Difference law for predece...
predep 6364	The predecessor under the ...
trpred 6365	The class of predecessors ...
preddowncl 6366	A property of classes that...
predpoirr 6367	Given a partial ordering, ...
predfrirr 6368	Given a well-founded relat...
pred0 6369	The predecessor class over...
dfse3 6370	Alternate definition of se...
predrelss 6371	Subset carries from relati...
predprc 6372	The predecessor of a prope...
predres 6373	Predecessor class is unaff...
frpomin 6374	Every nonempty (possibly p...
frpomin2 6375	Every nonempty (possibly p...
frpoind 6376	The principle of well-foun...
frpoinsg 6377	Well-Founded Induction Sch...
frpoins2fg 6378	Well-Founded Induction sch...
frpoins2g 6379	Well-Founded Induction sch...
frpoins3g 6380	Well-Founded Induction sch...
tz6.26 6381	All nonempty subclasses of...
tz6.26OLD 6382	Obsolete proof of ~ tz6.26...
tz6.26i 6383	All nonempty subclasses of...
wfi 6384	The Principle of Well-Orde...
wfiOLD 6385	Obsolete proof of ~ wfi as...
wfii 6386	The Principle of Well-Orde...
wfisg 6387	Well-Ordered Induction Sch...
wfisgOLD 6388	Obsolete version of ~ wfis...
wfis 6389	Well-Ordered Induction Sch...
wfis2fg 6390	Well-Ordered Induction Sch...
wfis2fgOLD 6391	Obsolete version of ~ wfis...
wfis2f 6392	Well-Ordered Induction sch...
wfis2g 6393	Well-Ordered Induction Sch...
wfis2 6394	Well-Ordered Induction sch...
wfis3 6395	Well-Ordered Induction sch...
ordeq 6404	Equality theorem for the o...
elong 6405	An ordinal number is an or...
elon 6406	An ordinal number is an or...
eloni 6407	An ordinal number has the ...
elon2 6408	An ordinal number is an or...
limeq 6409	Equality theorem for the l...
ordwe 6410	Membership well-orders eve...
ordtr 6411	An ordinal class is transi...
ordfr 6412	Membership is well-founded...
ordelss 6413	An element of an ordinal c...
trssord 6414	A transitive subclass of a...
ordirr 6415	No ordinal class is a memb...
nordeq 6416	A member of an ordinal cla...
ordn2lp 6417	An ordinal class cannot be...
tz7.5 6418	A nonempty subclass of an ...
ordelord 6419	An element of an ordinal c...
tron 6420	The class of all ordinal n...
ordelon 6421	An element of an ordinal c...
onelon 6422	An element of an ordinal n...
tz7.7 6423	A transitive class belongs...
ordelssne 6424	For ordinal classes, membe...
ordelpss 6425	For ordinal classes, membe...
ordsseleq 6426	For ordinal classes, inclu...
ordin 6427	The intersection of two or...
onin 6428	The intersection of two or...
ordtri3or 6429	A trichotomy law for ordin...
ordtri1 6430	A trichotomy law for ordin...
ontri1 6431	A trichotomy law for ordin...
ordtri2 6432	A trichotomy law for ordin...
ordtri3 6433	A trichotomy law for ordin...
ordtri4 6434	A trichotomy law for ordin...
orddisj 6435	An ordinal class and its s...
onfr 6436	The ordinal class is well-...
onelpss 6437	Relationship between membe...
onsseleq 6438	Relationship between subse...
onelss 6439	An element of an ordinal n...
ordtr1 6440	Transitive law for ordinal...
ordtr2 6441	Transitive law for ordinal...
ordtr3 6442	Transitive law for ordinal...
ontr1 6443	Transitive law for ordinal...
ontr2 6444	Transitive law for ordinal...
onelssex 6445	Ordinal less than is equiv...
ordunidif 6446	The union of an ordinal st...
ordintdif 6447	If ` B ` is smaller than `...
onintss 6448	If a property is true for ...
oneqmini 6449	A way to show that an ordi...
ord0 6450	The empty set is an ordina...
0elon 6451	The empty set is an ordina...
ord0eln0 6452	A nonempty ordinal contain...
on0eln0 6453	An ordinal number contains...
dflim2 6454	An alternate definition of...
inton 6455	The intersection of the cl...
nlim0 6456	The empty set is not a lim...
limord 6457	A limit ordinal is ordinal...
limuni 6458	A limit ordinal is its own...
limuni2 6459	The union of a limit ordin...
0ellim 6460	A limit ordinal contains t...
limelon 6461	A limit ordinal class that...
onn0 6462	The class of all ordinal n...
suceq 6463	Equality of successors. (...
elsuci 6464	Membership in a successor....
elsucg 6465	Membership in a successor....
elsuc2g 6466	Variant of membership in a...
elsuc 6467	Membership in a successor....
elsuc2 6468	Membership in a successor....
nfsuc 6469	Bound-variable hypothesis ...
elelsuc 6470	Membership in a successor....
sucel 6471	Membership of a successor ...
suc0 6472	The successor of the empty...
sucprc 6473	A proper class is its own ...
unisucs 6474	The union of the successor...
unisucg 6475	A transitive class is equa...
unisuc 6476	A transitive class is equa...
sssucid 6477	A class is included in its...
sucidg 6478	Part of Proposition 7.23 o...
sucid 6479	A set belongs to its succe...
nsuceq0 6480	No successor is empty. (C...
eqelsuc 6481	A set belongs to the succe...
iunsuc 6482	Inductive definition for t...
suctr 6483	The successor of a transit...
trsuc 6484	A set whose successor belo...
trsucss 6485	A member of the successor ...
ordsssuc 6486	An ordinal is a subset of ...
onsssuc 6487	A subset of an ordinal num...
ordsssuc2 6488	An ordinal subset of an or...
onmindif 6489	When its successor is subt...
ordnbtwn 6490	There is no set between an...
onnbtwn 6491	There is no set between an...
sucssel 6492	A set whose successor is a...
orddif 6493	Ordinal derived from its s...
orduniss 6494	An ordinal class includes ...
ordtri2or 6495	A trichotomy law for ordin...
ordtri2or2 6496	A trichotomy law for ordin...
ordtri2or3 6497	A consequence of total ord...
ordelinel 6498	The intersection of two or...
ordssun 6499	Property of a subclass of ...
ordequn 6500	The maximum (i.e. union) o...
ordun 6501	The maximum (i.e., union) ...
onunel 6502	The union of two ordinals ...
ordunisssuc 6503	A subclass relationship fo...
suc11 6504	The successor operation be...
onun2 6505	The union of two ordinals ...
ontr 6506	An ordinal number is a tra...
onunisuc 6507	An ordinal number is equal...
onordi 6508	An ordinal number is an or...
ontrciOLD 6509	Obsolete version of ~ ontr...
onirri 6510	An ordinal number is not a...
oneli 6511	A member of an ordinal num...
onelssi 6512	A member of an ordinal num...
onssneli 6513	An ordering law for ordina...
onssnel2i 6514	An ordering law for ordina...
onelini 6515	An element of an ordinal n...
oneluni 6516	An ordinal number equals i...
onunisuci 6517	An ordinal number is equal...
onsseli 6518	Subset is equivalent to me...
onun2i 6519	The union of two ordinal n...
unizlim 6520	An ordinal equal to its ow...
on0eqel 6521	An ordinal number either e...
snsn0non 6522	The singleton of the singl...
onxpdisj 6523	Ordinal numbers and ordere...
onnev 6524	The class of ordinal numbe...
iotajust 6526	Soundness justification th...
dfiota2 6528	Alternate definition for d...
nfiota1 6529	Bound-variable hypothesis ...
nfiotadw 6530	Deduction version of ~ nfi...
nfiotaw 6531	Bound-variable hypothesis ...
nfiotad 6532	Deduction version of ~ nfi...
nfiota 6533	Bound-variable hypothesis ...
cbviotaw 6534	Change bound variables in ...
cbviotavw 6535	Change bound variables in ...
cbviotavwOLD 6536	Obsolete version of ~ cbvi...
cbviota 6537	Change bound variables in ...
cbviotav 6538	Change bound variables in ...
sb8iota 6539	Variable substitution in d...
iotaeq 6540	Equality theorem for descr...
iotabi 6541	Equivalence theorem for de...
uniabio 6542	Part of Theorem 8.17 in [Q...
iotaval2 6543	Version of ~ iotaval using...
iotauni2 6544	Version of ~ iotauni using...
iotanul2 6545	Version of ~ iotanul using...
iotaval 6546	Theorem 8.19 in [Quine] p....
iotassuni 6547	The ` iota ` class is a su...
iotaex 6548	Theorem 8.23 in [Quine] p....
iotavalOLD 6549	Obsolete version of ~ iota...
iotauni 6550	Equivalence between two di...
iotaint 6551	Equivalence between two di...
iota1 6552	Property of iota. (Contri...
iotanul 6553	Theorem 8.22 in [Quine] p....
iotassuniOLD 6554	Obsolete version of ~ iota...
iotaexOLD 6555	Obsolete version of ~ iota...
iota4 6556	Theorem *14.22 in [Whitehe...
iota4an 6557	Theorem *14.23 in [Whitehe...
iota5 6558	A method for computing iot...
iotabidv 6559	Formula-building deduction...
iotabii 6560	Formula-building deduction...
iotacl 6561	Membership law for descrip...
iota2df 6562	A condition that allows to...
iota2d 6563	A condition that allows to...
iota2 6564	The unique element such th...
iotan0 6565	Representation of "the uni...
sniota 6566	A class abstraction with a...
dfiota4 6567	The ` iota ` operation usi...
csbiota 6568	Class substitution within ...
dffun2 6585	Alternate definition of a ...
dffun2OLD 6586	Obsolete version of ~ dffu...
dffun2OLDOLD 6587	Obsolete version of ~ dffu...
dffun6 6588	Alternate definition of a ...
dffun3 6589	Alternate definition of fu...
dffun3OLD 6590	Obsolete version of ~ dffu...
dffun4 6591	Alternate definition of a ...
dffun5 6592	Alternate definition of fu...
dffun6f 6593	Definition of function, us...
dffun6OLD 6594	Obsolete version of ~ dffu...
funmo 6595	A function has at most one...
funmoOLD 6596	Obsolete version of ~ funm...
funrel 6597	A function is a relation. ...
0nelfun 6598	A function does not contai...
funss 6599	Subclass theorem for funct...
funeq 6600	Equality theorem for funct...
funeqi 6601	Equality inference for the...
funeqd 6602	Equality deduction for the...
nffun 6603	Bound-variable hypothesis ...
sbcfung 6604	Distribute proper substitu...
funeu 6605	There is exactly one value...
funeu2 6606	There is exactly one value...
dffun7 6607	Alternate definition of a ...
dffun8 6608	Alternate definition of a ...
dffun9 6609	Alternate definition of a ...
funfn 6610	A class is a function if a...
funfnd 6611	A function is a function o...
funi 6612	The identity relation is a...
nfunv 6613	The universal class is not...
funopg 6614	A Kuratowski ordered pair ...
funopab 6615	A class of ordered pairs i...
funopabeq 6616	A class of ordered pairs o...
funopab4 6617	A class of ordered pairs o...
funmpt 6618	A function in maps-to nota...
funmpt2 6619	Functionality of a class g...
funco 6620	The composition of two fun...
funresfunco 6621	Composition of two functio...
funres 6622	A restriction of a functio...
funresd 6623	A restriction of a functio...
funssres 6624	The restriction of a funct...
fun2ssres 6625	Equality of restrictions o...
funun 6626	The union of functions wit...
fununmo 6627	If the union of classes is...
fununfun 6628	If the union of classes is...
fundif 6629	A function with removed el...
funcnvsn 6630	The converse singleton of ...
funsng 6631	A singleton of an ordered ...
fnsng 6632	Functionality and domain o...
funsn 6633	A singleton of an ordered ...
funprg 6634	A set of two pairs is a fu...
funtpg 6635	A set of three pairs is a ...
funpr 6636	A function with a domain o...
funtp 6637	A function with a domain o...
fnsn 6638	Functionality and domain o...
fnprg 6639	Function with a domain of ...
fntpg 6640	Function with a domain of ...
fntp 6641	A function with a domain o...
funcnvpr 6642	The converse pair of order...
funcnvtp 6643	The converse triple of ord...
funcnvqp 6644	The converse quadruple of ...
fun0 6645	The empty set is a functio...
funcnv0 6646	The converse of the empty ...
funcnvcnv 6647	The double converse of a f...
funcnv2 6648	A simpler equivalence for ...
funcnv 6649	The converse of a class is...
funcnv3 6650	A condition showing a clas...
fun2cnv 6651	The double converse of a c...
svrelfun 6652	A single-valued relation i...
fncnv 6653	Single-rootedness (see ~ f...
fun11 6654	Two ways of stating that `...
fununi 6655	The union of a chain (with...
funin 6656	The intersection with a fu...
funres11 6657	The restriction of a one-t...
funcnvres 6658	The converse of a restrict...
cnvresid 6659	Converse of a restricted i...
funcnvres2 6660	The converse of a restrict...
funimacnv 6661	The image of the preimage ...
funimass1 6662	A kind of contraposition l...
funimass2 6663	A kind of contraposition l...
imadif 6664	The image of a difference ...
imain 6665	The image of an intersecti...
funimaexg 6666	Axiom of Replacement using...
funimaexgOLD 6667	Obsolete version of ~ funi...
funimaex 6668	The image of a set under a...
isarep1 6669	Part of a study of the Axi...
isarep1OLD 6670	Obsolete version of ~ isar...
isarep2 6671	Part of a study of the Axi...
fneq1 6672	Equality theorem for funct...
fneq2 6673	Equality theorem for funct...
fneq1d 6674	Equality deduction for fun...
fneq2d 6675	Equality deduction for fun...
fneq12d 6676	Equality deduction for fun...
fneq12 6677	Equality theorem for funct...
fneq1i 6678	Equality inference for fun...
fneq2i 6679	Equality inference for fun...
nffn 6680	Bound-variable hypothesis ...
fnfun 6681	A function with domain is ...
fnfund 6682	A function with domain is ...
fnrel 6683	A function with domain is ...
fndm 6684	The domain of a function. ...
fndmi 6685	The domain of a function. ...
fndmd 6686	The domain of a function. ...
funfni 6687	Inference to convert a fun...
fndmu 6688	A function has a unique do...
fnbr 6689	The first argument of bina...
fnop 6690	The first argument of an o...
fneu 6691	There is exactly one value...
fneu2 6692	There is exactly one value...
fnunres1 6693	Restriction of a disjoint ...
fnunres2 6694	Restriction of a disjoint ...
fnun 6695	The union of two functions...
fnund 6696	The union of two functions...
fnunop 6697	Extension of a function wi...
fncofn 6698	Composition of a function ...
fnco 6699	Composition of two functio...
fncoOLD 6700	Obsolete version of ~ fnco...
fnresdm 6701	A function does not change...
fnresdisj 6702	A function restricted to a...
2elresin 6703	Membership in two function...
fnssresb 6704	Restriction of a function ...
fnssres 6705	Restriction of a function ...
fnssresd 6706	Restriction of a function ...
fnresin1 6707	Restriction of a function'...
fnresin2 6708	Restriction of a function'...
fnres 6709	An equivalence for functio...
idfn 6710	The identity relation is a...
fnresi 6711	The restricted identity re...
fnima 6712	The image of a function's ...
fn0 6713	A function with empty doma...
fnimadisj 6714	A class that is disjoint w...
fnimaeq0 6715	Images under a function ne...
dfmpt3 6716	Alternate definition for t...
mptfnf 6717	The maps-to notation defin...
fnmptf 6718	The maps-to notation defin...
fnopabg 6719	Functionality and domain o...
fnopab 6720	Functionality and domain o...
mptfng 6721	The maps-to notation defin...
fnmpt 6722	The maps-to notation defin...
fnmptd 6723	The maps-to notation defin...
mpt0 6724	A mapping operation with e...
fnmpti 6725	Functionality and domain o...
dmmpti 6726	Domain of the mapping oper...
dmmptd 6727	The domain of the mapping ...
mptun 6728	Union of mappings which ar...
partfun 6729	Rewrite a function defined...
feq1 6730	Equality theorem for funct...
feq2 6731	Equality theorem for funct...
feq3 6732	Equality theorem for funct...
feq23 6733	Equality theorem for funct...
feq1d 6734	Equality deduction for fun...
feq2d 6735	Equality deduction for fun...
feq3d 6736	Equality deduction for fun...
feq12d 6737	Equality deduction for fun...
feq123d 6738	Equality deduction for fun...
feq123 6739	Equality theorem for funct...
feq1i 6740	Equality inference for fun...
feq2i 6741	Equality inference for fun...
feq12i 6742	Equality inference for fun...
feq23i 6743	Equality inference for fun...
feq23d 6744	Equality deduction for fun...
nff 6745	Bound-variable hypothesis ...
sbcfng 6746	Distribute proper substitu...
sbcfg 6747	Distribute proper substitu...
elimf 6748	Eliminate a mapping hypoth...
ffn 6749	A mapping is a function wi...
ffnd 6750	A mapping is a function wi...
dffn2 6751	Any function is a mapping ...
ffun 6752	A mapping is a function. ...
ffund 6753	A mapping is a function, d...
frel 6754	A mapping is a relation. ...
freld 6755	A mapping is a relation. ...
frn 6756	The range of a mapping. (...
frnd 6757	Deduction form of ~ frn . ...
fdm 6758	The domain of a mapping. ...
fdmd 6759	Deduction form of ~ fdm . ...
fdmi 6760	Inference associated with ...
dffn3 6761	A function maps to its ran...
ffrn 6762	A function maps to its ran...
ffrnb 6763	Characterization of a func...
ffrnbd 6764	A function maps to its ran...
fss 6765	Expanding the codomain of ...
fssd 6766	Expanding the codomain of ...
fssdmd 6767	Expressing that a class is...
fssdm 6768	Expressing that a class is...
fimass 6769	The image of a class under...
fimassd 6770	The image of a class is a ...
fimacnv 6771	The preimage of the codoma...
fcof 6772	Composition of a function ...
fco 6773	Composition of two functio...
fcoOLD 6774	Obsolete version of ~ fco ...
fcod 6775	Composition of two mapping...
fco2 6776	Functionality of a composi...
fssxp 6777	A mapping is a class of or...
funssxp 6778	Two ways of specifying a p...
ffdm 6779	A mapping is a partial fun...
ffdmd 6780	The domain of a function. ...
fdmrn 6781	A different way to write `...
funcofd 6782	Composition of two functio...
fco3OLD 6783	Obsolete version of ~ func...
opelf 6784	The members of an ordered ...
fun 6785	The union of two functions...
fun2 6786	The union of two functions...
fun2d 6787	The union of functions wit...
fnfco 6788	Composition of two functio...
fssres 6789	Restriction of a function ...
fssresd 6790	Restriction of a function ...
fssres2 6791	Restriction of a restricte...
fresin 6792	An identity for the mappin...
resasplit 6793	If two functions agree on ...
fresaun 6794	The union of two functions...
fresaunres2 6795	From the union of two func...
fresaunres1 6796	From the union of two func...
fcoi1 6797	Composition of a mapping a...
fcoi2 6798	Composition of restricted ...
feu 6799	There is exactly one value...
fcnvres 6800	The converse of a restrict...
fimacnvdisj 6801	The preimage of a class di...
fint 6802	Function into an intersect...
fin 6803	Mapping into an intersecti...
f0 6804	The empty function. (Cont...
f00 6805	A class is a function with...
f0bi 6806	A function with empty doma...
f0dom0 6807	A function is empty iff it...
f0rn0 6808	If there is no element in ...
fconst 6809	A Cartesian product with a...
fconstg 6810	A Cartesian product with a...
fnconstg 6811	A Cartesian product with a...
fconst6g 6812	Constant function with loo...
fconst6 6813	A constant function as a m...
f1eq1 6814	Equality theorem for one-t...
f1eq2 6815	Equality theorem for one-t...
f1eq3 6816	Equality theorem for one-t...
nff1 6817	Bound-variable hypothesis ...
dff12 6818	Alternate definition of a ...
f1f 6819	A one-to-one mapping is a ...
f1fn 6820	A one-to-one mapping is a ...
f1fun 6821	A one-to-one mapping is a ...
f1rel 6822	A one-to-one onto mapping ...
f1dm 6823	The domain of a one-to-one...
f1ss 6824	A function that is one-to-...
f1ssr 6825	A function that is one-to-...
f1ssres 6826	A function that is one-to-...
f1resf1 6827	The restriction of an inje...
f1cnvcnv 6828	Two ways to express that a...
f1cof1 6829	Composition of two one-to-...
f1co 6830	Composition of one-to-one ...
f1coOLD 6831	Obsolete version of ~ f1co...
foeq1 6832	Equality theorem for onto ...
foeq2 6833	Equality theorem for onto ...
foeq3 6834	Equality theorem for onto ...
nffo 6835	Bound-variable hypothesis ...
fof 6836	An onto mapping is a mappi...
fofun 6837	An onto mapping is a funct...
fofn 6838	An onto mapping is a funct...
forn 6839	The codomain of an onto fu...
dffo2 6840	Alternate definition of an...
foima 6841	The image of the domain of...
dffn4 6842	A function maps onto its r...
funforn 6843	A function maps its domain...
fodmrnu 6844	An onto function has uniqu...
fimadmfo 6845	A function is a function o...
fores 6846	Restriction of an onto fun...
fimadmfoALT 6847	Alternate proof of ~ fimad...
focnvimacdmdm 6848	The preimage of the codoma...
focofo 6849	Composition of onto functi...
foco 6850	Composition of onto functi...
foconst 6851	A nonzero constant functio...
f1oeq1 6852	Equality theorem for one-t...
f1oeq2 6853	Equality theorem for one-t...
f1oeq3 6854	Equality theorem for one-t...
f1oeq23 6855	Equality theorem for one-t...
f1eq123d 6856	Equality deduction for one...
foeq123d 6857	Equality deduction for ont...
f1oeq123d 6858	Equality deduction for one...
f1oeq1d 6859	Equality deduction for one...
f1oeq2d 6860	Equality deduction for one...
f1oeq3d 6861	Equality deduction for one...
nff1o 6862	Bound-variable hypothesis ...
f1of1 6863	A one-to-one onto mapping ...
f1of 6864	A one-to-one onto mapping ...
f1ofn 6865	A one-to-one onto mapping ...
f1ofun 6866	A one-to-one onto mapping ...
f1orel 6867	A one-to-one onto mapping ...
f1odm 6868	The domain of a one-to-one...
dff1o2 6869	Alternate definition of on...
dff1o3 6870	Alternate definition of on...
f1ofo 6871	A one-to-one onto function...
dff1o4 6872	Alternate definition of on...
dff1o5 6873	Alternate definition of on...
f1orn 6874	A one-to-one function maps...
f1f1orn 6875	A one-to-one function maps...
f1ocnv 6876	The converse of a one-to-o...
f1ocnvb 6877	A relation is a one-to-one...
f1ores 6878	The restriction of a one-t...
f1orescnv 6879	The converse of a one-to-o...
f1imacnv 6880	Preimage of an image. (Co...
foimacnv 6881	A reverse version of ~ f1i...
foun 6882	The union of two onto func...
f1oun 6883	The union of two one-to-on...
f1un 6884	The union of two one-to-on...
resdif 6885	The restriction of a one-t...
resin 6886	The restriction of a one-t...
f1oco 6887	Composition of one-to-one ...
f1cnv 6888	The converse of an injecti...
funcocnv2 6889	Composition with the conve...
fococnv2 6890	The composition of an onto...
f1ococnv2 6891	The composition of a one-t...
f1cocnv2 6892	Composition of an injectiv...
f1ococnv1 6893	The composition of a one-t...
f1cocnv1 6894	Composition of an injectiv...
funcoeqres 6895	Express a constraint on a ...
f1ssf1 6896	A subset of an injective f...
f10 6897	The empty set maps one-to-...
f10d 6898	The empty set maps one-to-...
f1o00 6899	One-to-one onto mapping of...
fo00 6900	Onto mapping of the empty ...
f1o0 6901	One-to-one onto mapping of...
f1oi 6902	A restriction of the ident...
f1ovi 6903	The identity relation is a...
f1osn 6904	A singleton of an ordered ...
f1osng 6905	A singleton of an ordered ...
f1sng 6906	A singleton of an ordered ...
fsnd 6907	A singleton of an ordered ...
f1oprswap 6908	A two-element swap is a bi...
f1oprg 6909	An unordered pair of order...
tz6.12-2 6910	Function value when ` F ` ...
fveu 6911	The value of a function at...
brprcneu 6912	If ` A ` is a proper class...
brprcneuALT 6913	Alternate proof of ~ brprc...
fvprc 6914	A function's value at a pr...
fvprcALT 6915	Alternate proof of ~ fvprc...
rnfvprc 6916	The range of a function va...
fv2 6917	Alternate definition of fu...
dffv3 6918	A definition of function v...
dffv4 6919	The previous definition of...
elfv 6920	Membership in a function v...
fveq1 6921	Equality theorem for funct...
fveq2 6922	Equality theorem for funct...
fveq1i 6923	Equality inference for fun...
fveq1d 6924	Equality deduction for fun...
fveq2i 6925	Equality inference for fun...
fveq2d 6926	Equality deduction for fun...
2fveq3 6927	Equality theorem for neste...
fveq12i 6928	Equality deduction for fun...
fveq12d 6929	Equality deduction for fun...
fveqeq2d 6930	Equality deduction for fun...
fveqeq2 6931	Equality deduction for fun...
nffv 6932	Bound-variable hypothesis ...
nffvmpt1 6933	Bound-variable hypothesis ...
nffvd 6934	Deduction version of bound...
fvex 6935	The value of a class exist...
fvexi 6936	The value of a class exist...
fvexd 6937	The value of a class exist...
fvif 6938	Move a conditional outside...
iffv 6939	Move a conditional outside...
fv3 6940	Alternate definition of th...
fvres 6941	The value of a restricted ...
fvresd 6942	The value of a restricted ...
funssfv 6943	The value of a member of t...
tz6.12c 6944	Corollary of Theorem 6.12(...
tz6.12-1 6945	Function value. Theorem 6...
tz6.12-1OLD 6946	Obsolete version of ~ tz6....
tz6.12 6947	Function value. Theorem 6...
tz6.12f 6948	Function value, using boun...
tz6.12cOLD 6949	Obsolete version of ~ tz6....
tz6.12i 6950	Corollary of Theorem 6.12(...
fvbr0 6951	Two possibilities for the ...
fvrn0 6952	A function value is a memb...
fvn0fvelrn 6953	If the value of a function...
elfvunirn 6954	A function value is a subs...
fvssunirn 6955	The result of a function v...
fvssunirnOLD 6956	Obsolete version of ~ fvss...
ndmfv 6957	The value of a class outsi...
ndmfvrcl 6958	Reverse closure law for fu...
elfvdm 6959	If a function value has a ...
elfvex 6960	If a function value has a ...
elfvexd 6961	If a function value has a ...
eliman0 6962	A nonempty function value ...
nfvres 6963	The value of a non-member ...
nfunsn 6964	If the restriction of a cl...
fvfundmfvn0 6965	If the "value of a class" ...
0fv 6966	Function value of the empt...
fv2prc 6967	A function value of a func...
elfv2ex 6968	If a function value of a f...
fveqres 6969	Equal values imply equal v...
csbfv12 6970	Move class substitution in...
csbfv2g 6971	Move class substitution in...
csbfv 6972	Substitution for a functio...
funbrfv 6973	The second argument of a b...
funopfv 6974	The second element in an o...
fnbrfvb 6975	Equivalence of function va...
fnopfvb 6976	Equivalence of function va...
funbrfvb 6977	Equivalence of function va...
funopfvb 6978	Equivalence of function va...
fnbrfvb2 6979	Version of ~ fnbrfvb for f...
fdmeu 6980	There is exactly one codom...
funbrfv2b 6981	Function value in terms of...
dffn5 6982	Representation of a functi...
fnrnfv 6983	The range of a function ex...
fvelrnb 6984	A member of a function's r...
foelcdmi 6985	A member of a surjective f...
dfimafn 6986	Alternate definition of th...
dfimafn2 6987	Alternate definition of th...
funimass4 6988	Membership relation for th...
fvelima 6989	Function value in an image...
funimassd 6990	Sufficient condition for t...
fvelimad 6991	Function value in an image...
feqmptd 6992	Deduction form of ~ dffn5 ...
feqresmpt 6993	Express a restricted funct...
feqmptdf 6994	Deduction form of ~ dffn5f...
dffn5f 6995	Representation of a functi...
fvelimab 6996	Function value in an image...
fvelimabd 6997	Deduction form of ~ fvelim...
fimarab 6998	Expressing the image of a ...
unima 6999	Image of a union. (Contri...
fvi 7000	The value of the identity ...
fviss 7001	The value of the identity ...
fniinfv 7002	The indexed intersection o...
fnsnfv 7003	Singleton of function valu...
opabiotafun 7004	Define a function whose va...
opabiotadm 7005	Define a function whose va...
opabiota 7006	Define a function whose va...
fnimapr 7007	The image of a pair under ...
fnimatpd 7008	The image of an unordered ...
ssimaex 7009	The existence of a subimag...
ssimaexg 7010	The existence of a subimag...
funfv 7011	A simplified expression fo...
funfv2 7012	The value of a function. ...
funfv2f 7013	The value of a function. ...
fvun 7014	Value of the union of two ...
fvun1 7015	The value of a union when ...
fvun2 7016	The value of a union when ...
fvun1d 7017	The value of a union when ...
fvun2d 7018	The value of a union when ...
dffv2 7019	Alternate definition of fu...
dmfco 7020	Domains of a function comp...
fvco2 7021	Value of a function compos...
fvco 7022	Value of a function compos...
fvco3 7023	Value of a function compos...
fvco3d 7024	Value of a function compos...
fvco4i 7025	Conditions for a compositi...
fvopab3g 7026	Value of a function given ...
fvopab3ig 7027	Value of a function given ...
brfvopabrbr 7028	The binary relation of a f...
fvmptg 7029	Value of a function given ...
fvmpti 7030	Value of a function given ...
fvmpt 7031	Value of a function given ...
fvmpt2f 7032	Value of a function given ...
fvtresfn 7033	Functionality of a tuple-r...
fvmpts 7034	Value of a function given ...
fvmpt3 7035	Value of a function given ...
fvmpt3i 7036	Value of a function given ...
fvmptdf 7037	Deduction version of ~ fvm...
fvmptd 7038	Deduction version of ~ fvm...
fvmptd2 7039	Deduction version of ~ fvm...
mptrcl 7040	Reverse closure for a mapp...
fvmpt2i 7041	Value of a function given ...
fvmpt2 7042	Value of a function given ...
fvmptss 7043	If all the values of the m...
fvmpt2d 7044	Deduction version of ~ fvm...
fvmptex 7045	Express a function ` F ` w...
fvmptd3f 7046	Alternate deduction versio...
fvmptd2f 7047	Alternate deduction versio...
fvmptdv 7048	Alternate deduction versio...
fvmptdv2 7049	Alternate deduction versio...
mpteqb 7050	Bidirectional equality the...
fvmptt 7051	Closed theorem form of ~ f...
fvmptf 7052	Value of a function given ...
fvmptnf 7053	The value of a function gi...
fvmptd3 7054	Deduction version of ~ fvm...
fvmptd4 7055	Deduction version of ~ fvm...
fvmptn 7056	This somewhat non-intuitiv...
fvmptss2 7057	A mapping always evaluates...
elfvmptrab1w 7058	Implications for the value...
elfvmptrab1 7059	Implications for the value...
elfvmptrab 7060	Implications for the value...
fvopab4ndm 7061	Value of a function given ...
fvmptndm 7062	Value of a function given ...
fvmptrabfv 7063	Value of a function mappin...
fvopab5 7064	The value of a function th...
fvopab6 7065	Value of a function given ...
eqfnfv 7066	Equality of functions is d...
eqfnfv2 7067	Equality of functions is d...
eqfnfv3 7068	Derive equality of functio...
eqfnfvd 7069	Deduction for equality of ...
eqfnfv2f 7070	Equality of functions is d...
eqfunfv 7071	Equality of functions is d...
eqfnun 7072	Two functions on ` A u. B ...
fvreseq0 7073	Equality of restricted fun...
fvreseq1 7074	Equality of a function res...
fvreseq 7075	Equality of restricted fun...
fnmptfvd 7076	A function with a given do...
fndmdif 7077	Two ways to express the lo...
fndmdifcom 7078	The difference set between...
fndmdifeq0 7079	The difference set of two ...
fndmin 7080	Two ways to express the lo...
fneqeql 7081	Two functions are equal if...
fneqeql2 7082	Two functions are equal if...
fnreseql 7083	Two functions are equal on...
chfnrn 7084	The range of a choice func...
funfvop 7085	Ordered pair with function...
funfvbrb 7086	Two ways to say that ` A `...
fvimacnvi 7087	A member of a preimage is ...
fvimacnv 7088	The argument of a function...
funimass3 7089	A kind of contraposition l...
funimass5 7090	A subclass of a preimage i...
funconstss 7091	Two ways of specifying tha...
fvimacnvALT 7092	Alternate proof of ~ fvima...
elpreima 7093	Membership in the preimage...
elpreimad 7094	Membership in the preimage...
fniniseg 7095	Membership in the preimage...
fncnvima2 7096	Inverse images under funct...
fniniseg2 7097	Inverse point images under...
unpreima 7098	Preimage of a union. (Con...
inpreima 7099	Preimage of an intersectio...
difpreima 7100	Preimage of a difference. ...
respreima 7101	The preimage of a restrict...
cnvimainrn 7102	The preimage of the inters...
sspreima 7103	The preimage of a subset i...
iinpreima 7104	Preimage of an intersectio...
intpreima 7105	Preimage of an intersectio...
fimacnvOLD 7106	Obsolete version of ~ fima...
fimacnvinrn 7107	Taking the converse image ...
fimacnvinrn2 7108	Taking the converse image ...
rescnvimafod 7109	The restriction of a funct...
fvn0ssdmfun 7110	If a class' function value...
fnopfv 7111	Ordered pair with function...
fvelrn 7112	A function's value belongs...
nelrnfvne 7113	A function value cannot be...
fveqdmss 7114	If the empty set is not co...
fveqressseq 7115	If the empty set is not co...
fnfvelrn 7116	A function's value belongs...
ffvelcdm 7117	A function's value belongs...
fnfvelrnd 7118	A function's value belongs...
ffvelcdmi 7119	A function's value belongs...
ffvelcdmda 7120	A function's value belongs...
ffvelcdmd 7121	A function's value belongs...
feldmfvelcdm 7122	A class is an element of t...
rexrn 7123	Restricted existential qua...
ralrn 7124	Restricted universal quant...
elrnrexdm 7125	For any element in the ran...
elrnrexdmb 7126	For any element in the ran...
eldmrexrn 7127	For any element in the dom...
eldmrexrnb 7128	For any element in the dom...
fvcofneq 7129	The values of two function...
ralrnmptw 7130	A restricted quantifier ov...
rexrnmptw 7131	A restricted quantifier ov...
ralrnmpt 7132	A restricted quantifier ov...
rexrnmpt 7133	A restricted quantifier ov...
f0cli 7134	Unconditional closure of a...
dff2 7135	Alternate definition of a ...
dff3 7136	Alternate definition of a ...
dff4 7137	Alternate definition of a ...
dffo3 7138	An onto mapping expressed ...
dffo4 7139	Alternate definition of an...
dffo5 7140	Alternate definition of an...
exfo 7141	A relation equivalent to t...
dffo3f 7142	An onto mapping expressed ...
foelrn 7143	Property of a surjective f...
foelrnf 7144	Property of a surjective f...
foco2 7145	If a composition of two fu...
fmpt 7146	Functionality of the mappi...
f1ompt 7147	Express bijection for a ma...
fmpti 7148	Functionality of the mappi...
fvmptelcdm 7149	The value of a function at...
fmptd 7150	Domain and codomain of the...
fmpttd 7151	Version of ~ fmptd with in...
fmpt3d 7152	Domain and codomain of the...
fmptdf 7153	A version of ~ fmptd using...
fompt 7154	Express being onto for a m...
ffnfv 7155	A function maps to a class...
ffnfvf 7156	A function maps to a class...
fnfvrnss 7157	An upper bound for range d...
fcdmssb 7158	A function is a function i...
rnmptss 7159	The range of an operation ...
fmpt2d 7160	Domain and codomain of the...
ffvresb 7161	A necessary and sufficient...
fssrescdmd 7162	Restriction of a function ...
f1oresrab 7163	Build a bijection between ...
f1ossf1o 7164	Restricting a bijection, w...
fmptco 7165	Composition of two functio...
fmptcof 7166	Version of ~ fmptco where ...
fmptcos 7167	Composition of two functio...
cofmpt 7168	Express composition of a m...
fcompt 7169	Express composition of two...
fcoconst 7170	Composition with a constan...
fsn 7171	A function maps a singleto...
fsn2 7172	A function that maps a sin...
fsng 7173	A function maps a singleto...
fsn2g 7174	A function that maps a sin...
xpsng 7175	The Cartesian product of t...
xpprsng 7176	The Cartesian product of a...
xpsn 7177	The Cartesian product of t...
f1o2sn 7178	A singleton consisting in ...
residpr 7179	Restriction of the identit...
dfmpt 7180	Alternate definition for t...
fnasrn 7181	A function expressed as th...
idref 7182	Two ways to state that a r...
funiun 7183	A function is a union of s...
funopsn 7184	If a function is an ordere...
funop 7185	An ordered pair is a funct...
funopdmsn 7186	The domain of a function w...
funsndifnop 7187	A singleton of an ordered ...
funsneqopb 7188	A singleton of an ordered ...
ressnop0 7189	If ` A ` is not in ` C ` ,...
fpr 7190	A function with a domain o...
fprg 7191	A function with a domain o...
ftpg 7192	A function with a domain o...
ftp 7193	A function with a domain o...
fnressn 7194	A function restricted to a...
funressn 7195	A function restricted to a...
fressnfv 7196	The value of a function re...
fvrnressn 7197	If the value of a function...
fvressn 7198	The value of a function re...
fvn0fvelrnOLD 7199	Obsolete version of ~ fvn0...
fvconst 7200	The value of a constant fu...
fnsnr 7201	If a class belongs to a fu...
fnsnb 7202	A function whose domain is...
fmptsn 7203	Express a singleton functi...
fmptsng 7204	Express a singleton functi...
fmptsnd 7205	Express a singleton functi...
fmptap 7206	Append an additional value...
fmptapd 7207	Append an additional value...
fmptpr 7208	Express a pair function in...
fvresi 7209	The value of a restricted ...
fninfp 7210	Express the class of fixed...
fnelfp 7211	Property of a fixed point ...
fndifnfp 7212	Express the class of non-f...
fnelnfp 7213	Property of a non-fixed po...
fnnfpeq0 7214	A function is the identity...
fvunsn 7215	Remove an ordered pair not...
fvsng 7216	The value of a singleton o...
fvsn 7217	The value of a singleton o...
fvsnun1 7218	The value of a function wi...
fvsnun2 7219	The value of a function wi...
fnsnsplit 7220	Split a function into a si...
fsnunf 7221	Adjoining a point to a fun...
fsnunf2 7222	Adjoining a point to a pun...
fsnunfv 7223	Recover the added point fr...
fsnunres 7224	Recover the original funct...
funresdfunsn 7225	Restricting a function to ...
fvpr1g 7226	The value of a function wi...
fvpr2g 7227	The value of a function wi...
fvpr2gOLD 7228	Obsolete version of ~ fvpr...
fvpr1 7229	The value of a function wi...
fvpr1OLD 7230	Obsolete version of ~ fvpr...
fvpr2 7231	The value of a function wi...
fvpr2OLD 7232	Obsolete version of ~ fvpr...
fprb 7233	A condition for functionho...
fvtp1 7234	The first value of a funct...
fvtp2 7235	The second value of a func...
fvtp3 7236	The third value of a funct...
fvtp1g 7237	The value of a function wi...
fvtp2g 7238	The value of a function wi...
fvtp3g 7239	The value of a function wi...
tpres 7240	An unordered triple of ord...
fvconst2g 7241	The value of a constant fu...
fconst2g 7242	A constant function expres...
fvconst2 7243	The value of a constant fu...
fconst2 7244	A constant function expres...
fconst5 7245	Two ways to express that a...
rnmptc 7246	Range of a constant functi...
fnprb 7247	A function whose domain ha...
fntpb 7248	A function whose domain ha...
fnpr2g 7249	A function whose domain ha...
fpr2g 7250	A function that maps a pai...
fconstfv 7251	A constant function expres...
fconst3 7252	Two ways to express a cons...
fconst4 7253	Two ways to express a cons...
resfunexg 7254	The restriction of a funct...
resiexd 7255	The restriction of the ide...
fnex 7256	If the domain of a functio...
fnexd 7257	If the domain of a functio...
funex 7258	If the domain of a functio...
opabex 7259	Existence of a function ex...
mptexg 7260	If the domain of a functio...
mptexgf 7261	If the domain of a functio...
mptex 7262	If the domain of a functio...
mptexd 7263	If the domain of a functio...
mptrabex 7264	If the domain of a functio...
fex 7265	If the domain of a mapping...
fexd 7266	If the domain of a mapping...
mptfvmpt 7267	A function in maps-to nota...
eufnfv 7268	A function is uniquely det...
funfvima 7269	A function's value in a pr...
funfvima2 7270	A function's value in an i...
funfvima2d 7271	A function's value in a pr...
fnfvima 7272	The function value of an o...
fnfvimad 7273	A function's value belongs...
resfvresima 7274	The value of the function ...
funfvima3 7275	A class including a functi...
ralima 7276	Universal quantification u...
rexima 7277	Existential quantification...
reximaOLD 7278	Obsolete version of ~ rexi...
ralimaOLD 7279	Obsolete version of ~ rali...
fvclss 7280	Upper bound for the class ...
elabrex 7281	Elementhood in an image se...
elabrexg 7282	Elementhood in an image se...
abrexco 7283	Composition of two image m...
imaiun 7284	The image of an indexed un...
imauni 7285	The image of a union is th...
fniunfv 7286	The indexed union of a fun...
funiunfv 7287	The indexed union of a fun...
funiunfvf 7288	The indexed union of a fun...
eluniima 7289	Membership in the union of...
elunirn 7290	Membership in the union of...
elunirnALT 7291	Alternate proof of ~ eluni...
elunirn2OLD 7292	Obsolete version of ~ elfv...
fnunirn 7293	Membership in a union of s...
dff13 7294	A one-to-one function in t...
dff13f 7295	A one-to-one function in t...
f1veqaeq 7296	If the values of a one-to-...
f1cofveqaeq 7297	If the values of a composi...
f1cofveqaeqALT 7298	Alternate proof of ~ f1cof...
2f1fvneq 7299	If two one-to-one function...
f1mpt 7300	Express injection for a ma...
f1fveq 7301	Equality of function value...
f1elima 7302	Membership in the image of...
f1imass 7303	Taking images under a one-...
f1imaeq 7304	Taking images under a one-...
f1imapss 7305	Taking images under a one-...
fpropnf1 7306	A function, given by an un...
f1dom3fv3dif 7307	The function values for a ...
f1dom3el3dif 7308	The codomain of a 1-1 func...
dff14a 7309	A one-to-one function in t...
dff14b 7310	A one-to-one function in t...
f12dfv 7311	A one-to-one function with...
f13dfv 7312	A one-to-one function with...
dff1o6 7313	A one-to-one onto function...
f1ocnvfv1 7314	The converse value of the ...
f1ocnvfv2 7315	The value of the converse ...
f1ocnvfv 7316	Relationship between the v...
f1ocnvfvb 7317	Relationship between the v...
nvof1o 7318	An involution is a bijecti...
nvocnv 7319	The converse of an involut...
f1cdmsn 7320	If a one-to-one function w...
fsnex 7321	Relate a function with a s...
f1prex 7322	Relate a one-to-one functi...
f1ocnvdm 7323	The value of the converse ...
f1ocnvfvrneq 7324	If the values of a one-to-...
fcof1 7325	An application is injectiv...
fcofo 7326	An application is surjecti...
cbvfo 7327	Change bound variable betw...
cbvexfo 7328	Change bound variable betw...
cocan1 7329	An injection is left-cance...
cocan2 7330	A surjection is right-canc...
fcof1oinvd 7331	Show that a function is th...
fcof1od 7332	A function is bijective if...
2fcoidinvd 7333	Show that a function is th...
fcof1o 7334	Show that two functions ar...
2fvcoidd 7335	Show that the composition ...
2fvidf1od 7336	A function is bijective if...
2fvidinvd 7337	Show that two functions ar...
foeqcnvco 7338	Condition for function equ...
f1eqcocnv 7339	Condition for function equ...
fveqf1o 7340	Given a bijection ` F ` , ...
f1ocoima 7341	The composition of two bij...
nf1const 7342	A constant function from a...
nf1oconst 7343	A constant function from a...
f1ofvswap 7344	Swapping two values in a b...
fvf1pr 7345	Values of a one-to-one fun...
fliftrel 7346	` F ` , a function lift, i...
fliftel 7347	Elementhood in the relatio...
fliftel1 7348	Elementhood in the relatio...
fliftcnv 7349	Converse of the relation `...
fliftfun 7350	The function ` F ` is the ...
fliftfund 7351	The function ` F ` is the ...
fliftfuns 7352	The function ` F ` is the ...
fliftf 7353	The domain and range of th...
fliftval 7354	The value of the function ...
isoeq1 7355	Equality theorem for isomo...
isoeq2 7356	Equality theorem for isomo...
isoeq3 7357	Equality theorem for isomo...
isoeq4 7358	Equality theorem for isomo...
isoeq5 7359	Equality theorem for isomo...
nfiso 7360	Bound-variable hypothesis ...
isof1o 7361	An isomorphism is a one-to...
isof1oidb 7362	A function is a bijection ...
isof1oopb 7363	A function is a bijection ...
isorel 7364	An isomorphism connects bi...
soisores 7365	Express the condition of i...
soisoi 7366	Infer isomorphism from one...
isoid 7367	Identity law for isomorphi...
isocnv 7368	Converse law for isomorphi...
isocnv2 7369	Converse law for isomorphi...
isocnv3 7370	Complementation law for is...
isores2 7371	An isomorphism from one we...
isores1 7372	An isomorphism from one we...
isores3 7373	Induced isomorphism on a s...
isotr 7374	Composition (transitive) l...
isomin 7375	Isomorphisms preserve mini...
isoini 7376	Isomorphisms preserve init...
isoini2 7377	Isomorphisms are isomorphi...
isofrlem 7378	Lemma for ~ isofr . (Cont...
isoselem 7379	Lemma for ~ isose . (Cont...
isofr 7380	An isomorphism preserves w...
isose 7381	An isomorphism preserves s...
isofr2 7382	A weak form of ~ isofr tha...
isopolem 7383	Lemma for ~ isopo . (Cont...
isopo 7384	An isomorphism preserves t...
isosolem 7385	Lemma for ~ isoso . (Cont...
isoso 7386	An isomorphism preserves t...
isowe 7387	An isomorphism preserves t...
isowe2 7388	A weak form of ~ isowe tha...
f1oiso 7389	Any one-to-one onto functi...
f1oiso2 7390	Any one-to-one onto functi...
f1owe 7391	Well-ordering of isomorphi...
weniso 7392	A set-like well-ordering h...
weisoeq 7393	Thus, there is at most one...
weisoeq2 7394	Thus, there is at most one...
knatar 7395	The Knaster-Tarski theorem...
fvresval 7396	The value of a restricted ...
funeldmb 7397	If ` (/) ` is not part of ...
eqfunresadj 7398	Law for adjoining an eleme...
eqfunressuc 7399	Law for equality of restri...
fnssintima 7400	Condition for subset of an...
imaeqsexvOLD 7401	Duplicate version of ~ ral...
imaeqsalvOLD 7402	Duplicate version of ~ ral...
canth 7403	No set ` A ` is equinumero...
ncanth 7404	Cantor's theorem fails for...
riotaeqdv 7407	Formula-building deduction...
riotabidv 7408	Formula-building deduction...
riotaeqbidv 7409	Equality deduction for res...
riotaex 7410	Restricted iota is a set. ...
riotav 7411	An iota restricted to the ...
riotauni 7412	Restricted iota in terms o...
nfriota1 7413	The abstraction variable i...
nfriotadw 7414	Deduction version of ~ nfr...
cbvriotaw 7415	Change bound variable in a...
cbvriotavw 7416	Change bound variable in a...
cbvriotavwOLD 7417	Obsolete version of ~ cbvr...
nfriotad 7418	Deduction version of ~ nfr...
nfriota 7419	A variable not free in a w...
cbvriota 7420	Change bound variable in a...
cbvriotav 7421	Change bound variable in a...
csbriota 7422	Interchange class substitu...
riotacl2 7423	Membership law for "the un...
riotacl 7424	Closure of restricted iota...
riotasbc 7425	Substitution law for descr...
riotabidva 7426	Equivalent wff's yield equ...
riotabiia 7427	Equivalent wff's yield equ...
riota1 7428	Property of restricted iot...
riota1a 7429	Property of iota. (Contri...
riota2df 7430	A deduction version of ~ r...
riota2f 7431	This theorem shows a condi...
riota2 7432	This theorem shows a condi...
riotaeqimp 7433	If two restricted iota des...
riotaprop 7434	Properties of a restricted...
riota5f 7435	A method for computing res...
riota5 7436	A method for computing res...
riotass2 7437	Restriction of a unique el...
riotass 7438	Restriction of a unique el...
moriotass 7439	Restriction of a unique el...
snriota 7440	A restricted class abstrac...
riotaxfrd 7441	Change the variable ` x ` ...
eusvobj2 7442	Specify the same property ...
eusvobj1 7443	Specify the same object in...
f1ofveu 7444	There is one domain elemen...
f1ocnvfv3 7445	Value of the converse of a...
riotaund 7446	Restricted iota equals the...
riotassuni 7447	The restricted iota class ...
riotaclb 7448	Bidirectional closure of r...
riotarab 7449	Restricted iota of a restr...
oveq 7456	Equality theorem for opera...
oveq1 7457	Equality theorem for opera...
oveq2 7458	Equality theorem for opera...
oveq12 7459	Equality theorem for opera...
oveq1i 7460	Equality inference for ope...
oveq2i 7461	Equality inference for ope...
oveq12i 7462	Equality inference for ope...
oveqi 7463	Equality inference for ope...
oveq123i 7464	Equality inference for ope...
oveq1d 7465	Equality deduction for ope...
oveq2d 7466	Equality deduction for ope...
oveqd 7467	Equality deduction for ope...
oveq12d 7468	Equality deduction for ope...
oveqan12d 7469	Equality deduction for ope...
oveqan12rd 7470	Equality deduction for ope...
oveq123d 7471	Equality deduction for ope...
fvoveq1d 7472	Equality deduction for nes...
fvoveq1 7473	Equality theorem for neste...
ovanraleqv 7474	Equality theorem for a con...
imbrov2fvoveq 7475	Equality theorem for neste...
ovrspc2v 7476	If an operation value is e...
oveqrspc2v 7477	Restricted specialization ...
oveqdr 7478	Equality of two operations...
nfovd 7479	Deduction version of bound...
nfov 7480	Bound-variable hypothesis ...
oprabidw 7481	The law of concretion. Sp...
oprabid 7482	The law of concretion. Sp...
ovex 7483	The result of an operation...
ovexi 7484	The result of an operation...
ovexd 7485	The result of an operation...
ovssunirn 7486	The result of an operation...
0ov 7487	Operation value of the emp...
ovprc 7488	The value of an operation ...
ovprc1 7489	The value of an operation ...
ovprc2 7490	The value of an operation ...
ovrcl 7491	Reverse closure for an ope...
elfvov1 7492	Utility theorem: reverse c...
elfvov2 7493	Utility theorem: reverse c...
csbov123 7494	Move class substitution in...
csbov 7495	Move class substitution in...
csbov12g 7496	Move class substitution in...
csbov1g 7497	Move class substitution in...
csbov2g 7498	Move class substitution in...
rspceov 7499	A frequently used special ...
elovimad 7500	Elementhood of the image s...
fnbrovb 7501	Value of a binary operatio...
fnotovb 7502	Equivalence of operation v...
opabbrex 7503	A collection of ordered pa...
opabresex2 7504	Restrictions of a collecti...
opabresex2d 7505	Obsolete version of ~ opab...
fvmptopab 7506	The function value of a ma...
fvmptopabOLD 7507	Obsolete version of ~ fvmp...
f1opr 7508	Condition for an operation...
brfvopab 7509	The classes involved in a ...
dfoprab2 7510	Class abstraction for oper...
reloprab 7511	An operation class abstrac...
oprabv 7512	If a pair and a class are ...
nfoprab1 7513	The abstraction variables ...
nfoprab2 7514	The abstraction variables ...
nfoprab3 7515	The abstraction variables ...
nfoprab 7516	Bound-variable hypothesis ...
oprabbid 7517	Equivalent wff's yield equ...
oprabbidv 7518	Equivalent wff's yield equ...
oprabbii 7519	Equivalent wff's yield equ...
ssoprab2 7520	Equivalence of ordered pai...
ssoprab2b 7521	Equivalence of ordered pai...
eqoprab2bw 7522	Equivalence of ordered pai...
eqoprab2b 7523	Equivalence of ordered pai...
mpoeq123 7524	An equality theorem for th...
mpoeq12 7525	An equality theorem for th...
mpoeq123dva 7526	An equality deduction for ...
mpoeq123dv 7527	An equality deduction for ...
mpoeq123i 7528	An equality inference for ...
mpoeq3dva 7529	Slightly more general equa...
mpoeq3ia 7530	An equality inference for ...
mpoeq3dv 7531	An equality deduction for ...
nfmpo1 7532	Bound-variable hypothesis ...
nfmpo2 7533	Bound-variable hypothesis ...
nfmpo 7534	Bound-variable hypothesis ...
0mpo0 7535	A mapping operation with e...
mpo0v 7536	A mapping operation with e...
mpo0 7537	A mapping operation with e...
oprab4 7538	Two ways to state the doma...
cbvoprab1 7539	Rule used to change first ...
cbvoprab2 7540	Change the second bound va...
cbvoprab12 7541	Rule used to change first ...
cbvoprab12v 7542	Rule used to change first ...
cbvoprab3 7543	Rule used to change the th...
cbvoprab3v 7544	Rule used to change the th...
cbvmpox 7545	Rule to change the bound v...
cbvmpo 7546	Rule to change the bound v...
cbvmpov 7547	Rule to change the bound v...
elimdelov 7548	Eliminate a hypothesis whi...
brif1 7549	Move a relation inside and...
ovif 7550	Move a conditional outside...
ovif2 7551	Move a conditional outside...
ovif12 7552	Move a conditional outside...
ifov 7553	Move a conditional outside...
dmoprab 7554	The domain of an operation...
dmoprabss 7555	The domain of an operation...
rnoprab 7556	The range of an operation ...
rnoprab2 7557	The range of a restricted ...
reldmoprab 7558	The domain of an operation...
oprabss 7559	Structure of an operation ...
eloprabga 7560	The law of concretion for ...
eloprabgaOLD 7561	Obsolete version of ~ elop...
eloprabg 7562	The law of concretion for ...
ssoprab2i 7563	Inference of operation cla...
mpov 7564	Operation with universal d...
mpomptx 7565	Express a two-argument fun...
mpompt 7566	Express a two-argument fun...
mpodifsnif 7567	A mapping with two argumen...
mposnif 7568	A mapping with two argumen...
fconstmpo 7569	Representation of a consta...
resoprab 7570	Restriction of an operatio...
resoprab2 7571	Restriction of an operator...
resmpo 7572	Restriction of the mapping...
funoprabg 7573	"At most one" is a suffici...
funoprab 7574	"At most one" is a suffici...
fnoprabg 7575	Functionality and domain o...
mpofun 7576	The maps-to notation for a...
fnoprab 7577	Functionality and domain o...
ffnov 7578	An operation maps to a cla...
fovcld 7579	Closure law for an operati...
fovcl 7580	Closure law for an operati...
eqfnov 7581	Equality of two operations...
eqfnov2 7582	Two operators with the sam...
fnov 7583	Representation of a functi...
mpo2eqb 7584	Bidirectional equality the...
rnmpo 7585	The range of an operation ...
reldmmpo 7586	The domain of an operation...
elrnmpog 7587	Membership in the range of...
elrnmpo 7588	Membership in the range of...
elimampo 7589	Membership in the image of...
elrnmpores 7590	Membership in the range of...
ralrnmpo 7591	A restricted quantifier ov...
rexrnmpo 7592	A restricted quantifier ov...
ovid 7593	The value of an operation ...
ovidig 7594	The value of an operation ...
ovidi 7595	The value of an operation ...
ov 7596	The value of an operation ...
ovigg 7597	The value of an operation ...
ovig 7598	The value of an operation ...
ovmpt4g 7599	Value of a function given ...
ovmpos 7600	Value of a function given ...
ov2gf 7601	The value of an operation ...
ovmpodxf 7602	Value of an operation give...
ovmpodx 7603	Value of an operation give...
ovmpod 7604	Value of an operation give...
ovmpox 7605	The value of an operation ...
ovmpoga 7606	Value of an operation give...
ovmpoa 7607	Value of an operation give...
ovmpodf 7608	Alternate deduction versio...
ovmpodv 7609	Alternate deduction versio...
ovmpodv2 7610	Alternate deduction versio...
ovmpog 7611	Value of an operation give...
ovmpo 7612	Value of an operation give...
ovmpot 7613	The value of an operation ...
fvmpopr2d 7614	Value of an operation give...
ov3 7615	The value of an operation ...
ov6g 7616	The value of an operation ...
ovg 7617	The value of an operation ...
ovres 7618	The value of a restricted ...
ovresd 7619	Lemma for converting metri...
oprres 7620	The restriction of an oper...
oprssov 7621	The value of a member of t...
fovcdm 7622	An operation's value belon...
fovcdmda 7623	An operation's value belon...
fovcdmd 7624	An operation's value belon...
fnrnov 7625	The range of an operation ...
foov 7626	An onto mapping of an oper...
fnovrn 7627	An operation's value belon...
ovelrn 7628	A member of an operation's...
funimassov 7629	Membership relation for th...
ovelimab 7630	Operation value in an imag...
ovima0 7631	An operation value is a me...
ovconst2 7632	The value of a constant op...
oprssdm 7633	Domain of closure of an op...
nssdmovg 7634	The value of an operation ...
ndmovg 7635	The value of an operation ...
ndmov 7636	The value of an operation ...
ndmovcl 7637	The closure of an operatio...
ndmovrcl 7638	Reverse closure law, when ...
ndmovcom 7639	Any operation is commutati...
ndmovass 7640	Any operation is associati...
ndmovdistr 7641	Any operation is distribut...
ndmovord 7642	Elimination of redundant a...
ndmovordi 7643	Elimination of redundant a...
caovclg 7644	Convert an operation closu...
caovcld 7645	Convert an operation closu...
caovcl 7646	Convert an operation closu...
caovcomg 7647	Convert an operation commu...
caovcomd 7648	Convert an operation commu...
caovcom 7649	Convert an operation commu...
caovassg 7650	Convert an operation assoc...
caovassd 7651	Convert an operation assoc...
caovass 7652	Convert an operation assoc...
caovcang 7653	Convert an operation cance...
caovcand 7654	Convert an operation cance...
caovcanrd 7655	Commute the arguments of a...
caovcan 7656	Convert an operation cance...
caovordig 7657	Convert an operation order...
caovordid 7658	Convert an operation order...
caovordg 7659	Convert an operation order...
caovordd 7660	Convert an operation order...
caovord2d 7661	Operation ordering law wit...
caovord3d 7662	Ordering law. (Contribute...
caovord 7663	Convert an operation order...
caovord2 7664	Operation ordering law wit...
caovord3 7665	Ordering law. (Contribute...
caovdig 7666	Convert an operation distr...
caovdid 7667	Convert an operation distr...
caovdir2d 7668	Convert an operation distr...
caovdirg 7669	Convert an operation rever...
caovdird 7670	Convert an operation distr...
caovdi 7671	Convert an operation distr...
caov32d 7672	Rearrange arguments in a c...
caov12d 7673	Rearrange arguments in a c...
caov31d 7674	Rearrange arguments in a c...
caov13d 7675	Rearrange arguments in a c...
caov4d 7676	Rearrange arguments in a c...
caov411d 7677	Rearrange arguments in a c...
caov42d 7678	Rearrange arguments in a c...
caov32 7679	Rearrange arguments in a c...
caov12 7680	Rearrange arguments in a c...
caov31 7681	Rearrange arguments in a c...
caov13 7682	Rearrange arguments in a c...
caov4 7683	Rearrange arguments in a c...
caov411 7684	Rearrange arguments in a c...
caov42 7685	Rearrange arguments in a c...
caovdir 7686	Reverse distributive law. ...
caovdilem 7687	Lemma used by real number ...
caovlem2 7688	Lemma used in real number ...
caovmo 7689	Uniqueness of inverse elem...
imaeqexov 7690	Substitute an operation va...
imaeqalov 7691	Substitute an operation va...
mpondm0 7692	The value of an operation ...
elmpocl 7693	If a two-parameter class i...
elmpocl1 7694	If a two-parameter class i...
elmpocl2 7695	If a two-parameter class i...
elovmpod 7696	Utility lemma for two-para...
elovmpo 7697	Utility lemma for two-para...
elovmporab 7698	Implications for the value...
elovmporab1w 7699	Implications for the value...
elovmporab1 7700	Implications for the value...
2mpo0 7701	If the operation value of ...
relmptopab 7702	Any function to sets of or...
f1ocnvd 7703	Describe an implicit one-t...
f1od 7704	Describe an implicit one-t...
f1ocnv2d 7705	Describe an implicit one-t...
f1o2d 7706	Describe an implicit one-t...
f1opw2 7707	A one-to-one mapping induc...
f1opw 7708	A one-to-one mapping induc...
elovmpt3imp 7709	If the value of a function...
ovmpt3rab1 7710	The value of an operation ...
ovmpt3rabdm 7711	If the value of a function...
elovmpt3rab1 7712	Implications for the value...
elovmpt3rab 7713	Implications for the value...
ofeqd 7718	Equality theorem for funct...
ofeq 7719	Equality theorem for funct...
ofreq 7720	Equality theorem for funct...
ofexg 7721	A function operation restr...
nfof 7722	Hypothesis builder for fun...
nfofr 7723	Hypothesis builder for fun...
ofrfvalg 7724	Value of a relation applie...
offval 7725	Value of an operation appl...
ofrfval 7726	Value of a relation applie...
ofval 7727	Evaluate a function operat...
ofrval 7728	Exhibit a function relatio...
offn 7729	The function operation pro...
offun 7730	The function operation pro...
offval2f 7731	The function operation exp...
ofmresval 7732	Value of a restriction of ...
fnfvof 7733	Function value of a pointw...
off 7734	The function operation pro...
ofres 7735	Restrict the operands of a...
offval2 7736	The function operation exp...
ofrfval2 7737	The function relation acti...
ofmpteq 7738	Value of a pointwise opera...
coof 7739	The composition of a _homo...
ofco 7740	The composition of a funct...
offveq 7741	Convert an identity of the...
offveqb 7742	Equivalent expressions for...
ofc1 7743	Left operation by a consta...
ofc2 7744	Right operation by a const...
ofc12 7745	Function operation on two ...
caofref 7746	Transfer a reflexive law t...
caofinvl 7747	Transfer a left inverse la...
caofid0l 7748	Transfer a left identity l...
caofid0r 7749	Transfer a right identity ...
caofid1 7750	Transfer a right absorptio...
caofid2 7751	Transfer a right absorptio...
caofcom 7752	Transfer a commutative law...
caofrss 7753	Transfer a relation subset...
caofass 7754	Transfer an associative la...
caoftrn 7755	Transfer a transitivity la...
caofdi 7756	Transfer a distributive la...
caofdir 7757	Transfer a reverse distrib...
caonncan 7758	Transfer ~ nncan -shaped l...
relrpss 7761	The proper subset relation...
brrpssg 7762	The proper subset relation...
brrpss 7763	The proper subset relation...
porpss 7764	Every class is partially o...
sorpss 7765	Express strict ordering un...
sorpssi 7766	Property of a chain of set...
sorpssun 7767	A chain of sets is closed ...
sorpssin 7768	A chain of sets is closed ...
sorpssuni 7769	In a chain of sets, a maxi...
sorpssint 7770	In a chain of sets, a mini...
sorpsscmpl 7771	The componentwise compleme...
zfun 7773	Axiom of Union expressed w...
axun2 7774	A variant of the Axiom of ...
uniex2 7775	The Axiom of Union using t...
vuniex 7776	The union of a setvar is a...
uniexg 7777	The ZF Axiom of Union in c...
uniex 7778	The Axiom of Union in clas...
uniexd 7779	Deduction version of the Z...
unexg 7780	The union of two sets is a...
unex 7781	The union of two sets is a...
unexOLD 7782	Obsolete proof of ~ unex a...
tpex 7783	An unordered triple of cla...
unexb 7784	Existence of union is equi...
unexbOLD 7785	Obsolete proof of ~ unexb ...
unexgOLD 7786	Obsolete proof of ~ unexg ...
xpexg 7787	The Cartesian product of t...
xpexd 7788	The Cartesian product of t...
3xpexg 7789	The Cartesian product of t...
xpex 7790	The Cartesian product of t...
unexd 7791	The union of two sets is a...
sqxpexg 7792	The Cartesian square of a ...
abnexg 7793	Sufficient condition for a...
abnex 7794	Sufficient condition for a...
snnex 7795	The class of all singleton...
pwnex 7796	The class of all power set...
difex2 7797	If the subtrahend of a cla...
difsnexi 7798	If the difference of a cla...
uniuni 7799	Expression for double unio...
uniexr 7800	Converse of the Axiom of U...
uniexb 7801	The Axiom of Union and its...
pwexr 7802	Converse of the Axiom of P...
pwexb 7803	The Axiom of Power Sets an...
elpwpwel 7804	A class belongs to a doubl...
eldifpw 7805	Membership in a power clas...
elpwun 7806	Membership in the power cl...
pwuncl 7807	Power classes are closed u...
iunpw 7808	An indexed union of a powe...
fr3nr 7809	A well-founded relation ha...
epne3 7810	A well-founded class conta...
dfwe2 7811	Alternate definition of we...
epweon 7812	The membership relation we...
epweonALT 7813	Alternate proof of ~ epweo...
ordon 7814	The class of all ordinal n...
onprc 7815	No set contains all ordina...
ssorduni 7816	The union of a class of or...
ssonuni 7817	The union of a set of ordi...
ssonunii 7818	The union of a set of ordi...
ordeleqon 7819	A way to express the ordin...
ordsson 7820	Any ordinal class is a sub...
dford5 7821	A class is ordinal iff it ...
onss 7822	An ordinal number is a sub...
predon 7823	The predecessor of an ordi...
predonOLD 7824	Obsolete version of ~ pred...
ssonprc 7825	Two ways of saying a class...
onuni 7826	The union of an ordinal nu...
orduni 7827	The union of an ordinal cl...
onint 7828	The intersection (infimum)...
onint0 7829	The intersection of a clas...
onssmin 7830	A nonempty class of ordina...
onminesb 7831	If a property is true for ...
onminsb 7832	If a property is true for ...
oninton 7833	The intersection of a none...
onintrab 7834	The intersection of a clas...
onintrab2 7835	An existence condition equ...
onnmin 7836	No member of a set of ordi...
onnminsb 7837	An ordinal number smaller ...
oneqmin 7838	A way to show that an ordi...
uniordint 7839	The union of a set of ordi...
onminex 7840	If a wff is true for an or...
sucon 7841	The class of all ordinal n...
sucexb 7842	A successor exists iff its...
sucexg 7843	The successor of a set is ...
sucex 7844	The successor of a set is ...
onmindif2 7845	The minimum of a class of ...
ordsuci 7846	The successor of an ordina...
sucexeloni 7847	If the successor of an ord...
sucexeloniOLD 7848	Obsolete version of ~ suce...
onsuc 7849	The successor of an ordina...
suceloniOLD 7850	Obsolete version of ~ onsu...
ordsuc 7851	A class is ordinal if and ...
ordsucOLD 7852	Obsolete version of ~ ords...
ordpwsuc 7853	The collection of ordinals...
onpwsuc 7854	The collection of ordinal ...
onsucb 7855	A class is an ordinal numb...
ordsucss 7856	The successor of an elemen...
onpsssuc 7857	An ordinal number is a pro...
ordelsuc 7858	A set belongs to an ordina...
onsucmin 7859	The successor of an ordina...
ordsucelsuc 7860	Membership is inherited by...
ordsucsssuc 7861	The subclass relationship ...
ordsucuniel 7862	Given an element ` A ` of ...
ordsucun 7863	The successor of the maxim...
ordunpr 7864	The maximum of two ordinal...
ordunel 7865	The maximum of two ordinal...
onsucuni 7866	A class of ordinal numbers...
ordsucuni 7867	An ordinal class is a subc...
orduniorsuc 7868	An ordinal class is either...
unon 7869	The class of all ordinal n...
ordunisuc 7870	An ordinal class is equal ...
orduniss2 7871	The union of the ordinal s...
onsucuni2 7872	A successor ordinal is the...
0elsuc 7873	The successor of an ordina...
limon 7874	The class of ordinal numbe...
onuniorsuc 7875	An ordinal number is eithe...
onssi 7876	An ordinal number is a sub...
onsuci 7877	The successor of an ordina...
onuniorsuciOLD 7878	Obsolete version of ~ onun...
onuninsuci 7879	An ordinal is equal to its...
onsucssi 7880	A set belongs to an ordina...
nlimsucg 7881	A successor is not a limit...
orduninsuc 7882	An ordinal class is equal ...
ordunisuc2 7883	An ordinal equal to its un...
ordzsl 7884	An ordinal is zero, a succ...
onzsl 7885	An ordinal number is zero,...
dflim3 7886	An alternate definition of...
dflim4 7887	An alternate definition of...
limsuc 7888	The successor of a member ...
limsssuc 7889	A class includes a limit o...
nlimon 7890	Two ways to express the cl...
limuni3 7891	The union of a nonempty cl...
tfi 7892	The Principle of Transfini...
tfisg 7893	A closed form of ~ tfis . ...
tfis 7894	Transfinite Induction Sche...
tfis2f 7895	Transfinite Induction Sche...
tfis2 7896	Transfinite Induction Sche...
tfis3 7897	Transfinite Induction Sche...
tfisi 7898	A transfinite induction sc...
tfinds 7899	Principle of Transfinite I...
tfindsg 7900	Transfinite Induction (inf...
tfindsg2 7901	Transfinite Induction (inf...
tfindes 7902	Transfinite Induction with...
tfinds2 7903	Transfinite Induction (inf...
tfinds3 7904	Principle of Transfinite I...
dfom2 7907	An alternate definition of...
elom 7908	Membership in omega. The ...
omsson 7909	Omega is a subset of ` On ...
limomss 7910	The class of natural numbe...
nnon 7911	A natural number is an ord...
nnoni 7912	A natural number is an ord...
nnord 7913	A natural number is ordina...
trom 7914	The class of finite ordina...
ordom 7915	The class of finite ordina...
elnn 7916	A member of a natural numb...
omon 7917	The class of natural numbe...
omelon2 7918	Omega is an ordinal number...
nnlim 7919	A natural number is not a ...
omssnlim 7920	The class of natural numbe...
limom 7921	Omega is a limit ordinal. ...
peano2b 7922	A class belongs to omega i...
nnsuc 7923	A nonzero natural number i...
omsucne 7924	A natural number is not th...
ssnlim 7925	An ordinal subclass of non...
omsinds 7926	Strong (or "total") induct...
omsindsOLD 7927	Obsolete version of ~ omsi...
omun 7928	The union of two finite or...
peano1 7929	Zero is a natural number. ...
peano1OLD 7930	Obsolete version of ~ pean...
peano2 7931	The successor of any natur...
peano3 7932	The successor of any natur...
peano4 7933	Two natural numbers are eq...
peano5 7934	The induction postulate: a...
peano5OLD 7935	Obsolete version of ~ pean...
nn0suc 7936	A natural number is either...
find 7937	The Principle of Finite In...
finds 7938	Principle of Finite Induct...
findsg 7939	Principle of Finite Induct...
finds2 7940	Principle of Finite Induct...
finds1 7941	Principle of Finite Induct...
findes 7942	Finite induction with expl...
dmexg 7943	The domain of a set is a s...
rnexg 7944	The range of a set is a se...
dmexd 7945	The domain of a set is a s...
fndmexd 7946	If a function is a set, it...
dmfex 7947	If a mapping is a set, its...
fndmexb 7948	The domain of a function i...
fdmexb 7949	The domain of a function i...
dmfexALT 7950	Alternate proof of ~ dmfex...
dmex 7951	The domain of a set is a s...
rnex 7952	The range of a set is a se...
iprc 7953	The identity function is a...
resiexg 7954	The existence of a restric...
imaexg 7955	The image of a set is a se...
imaex 7956	The image of a set is a se...
rnexd 7957	The range of a set is a se...
imaexd 7958	The image of a set is a se...
exse2 7959	Any set relation is set-li...
xpexr 7960	If a Cartesian product is ...
xpexr2 7961	If a nonempty Cartesian pr...
xpexcnv 7962	A condition where the conv...
soex 7963	If the relation in a stric...
elxp4 7964	Membership in a Cartesian ...
elxp5 7965	Membership in a Cartesian ...
cnvexg 7966	The converse of a set is a...
cnvex 7967	The converse of a set is a...
relcnvexb 7968	A relation is a set iff it...
f1oexrnex 7969	If the range of a 1-1 onto...
f1oexbi 7970	There is a one-to-one onto...
coexg 7971	The composition of two set...
coex 7972	The composition of two set...
coexd 7973	The composition of two set...
funcnvuni 7974	The union of a chain (with...
fun11uni 7975	The union of a chain (with...
fex2 7976	A function with bounded do...
fabexd 7977	Existence of a set of func...
fabexg 7978	Existence of a set of func...
fabexgOLD 7979	Obsolete version of ~ fabe...
fabex 7980	Existence of a set of func...
mapex 7981	The class of all functions...
f1oabexg 7982	The class of all 1-1-onto ...
f1oabexgOLD 7983	Obsolete version of ~ f1oa...
fiunlem 7984	Lemma for ~ fiun and ~ f1i...
fiun 7985	The union of a chain (with...
f1iun 7986	The union of a chain (with...
fviunfun 7987	The function value of an i...
ffoss 7988	Relationship between a map...
f11o 7989	Relationship between one-t...
resfunexgALT 7990	Alternate proof of ~ resfu...
cofunexg 7991	Existence of a composition...
cofunex2g 7992	Existence of a composition...
fnexALT 7993	Alternate proof of ~ fnex ...
funexw 7994	Weak version of ~ funex th...
mptexw 7995	Weak version of ~ mptex th...
funrnex 7996	If the domain of a functio...
zfrep6 7997	A version of the Axiom of ...
focdmex 7998	If the domain of an onto f...
f1dmex 7999	If the codomain of a one-t...
f1ovv 8000	The codomain/range of a 1-...
fvclex 8001	Existence of the class of ...
fvresex 8002	Existence of the class of ...
abrexexg 8003	Existence of a class abstr...
abrexexgOLD 8004	Obsolete version of ~ abre...
abrexex 8005	Existence of a class abstr...
iunexg 8006	The existence of an indexe...
abrexex2g 8007	Existence of an existentia...
opabex3d 8008	Existence of an ordered pa...
opabex3rd 8009	Existence of an ordered pa...
opabex3 8010	Existence of an ordered pa...
iunex 8011	The existence of an indexe...
abrexex2 8012	Existence of an existentia...
abexssex 8013	Existence of a class abstr...
abexex 8014	A condition where a class ...
f1oweALT 8015	Alternate proof of ~ f1owe...
wemoiso 8016	Thus, there is at most one...
wemoiso2 8017	Thus, there is at most one...
oprabexd 8018	Existence of an operator a...
oprabex 8019	Existence of an operation ...
oprabex3 8020	Existence of an operation ...
oprabrexex2 8021	Existence of an existentia...
ab2rexex 8022	Existence of a class abstr...
ab2rexex2 8023	Existence of an existentia...
xpexgALT 8024	Alternate proof of ~ xpexg...
offval3 8025	General value of ` ( F oF ...
offres 8026	Pointwise combination comm...
ofmres 8027	Equivalent expressions for...
ofmresex 8028	Existence of a restriction...
mptcnfimad 8029	The converse of a mapping ...
1stval 8034	The value of the function ...
2ndval 8035	The value of the function ...
1stnpr 8036	Value of the first-member ...
2ndnpr 8037	Value of the second-member...
1st0 8038	The value of the first-mem...
2nd0 8039	The value of the second-me...
op1st 8040	Extract the first member o...
op2nd 8041	Extract the second member ...
op1std 8042	Extract the first member o...
op2ndd 8043	Extract the second member ...
op1stg 8044	Extract the first member o...
op2ndg 8045	Extract the second member ...
ot1stg 8046	Extract the first member o...
ot2ndg 8047	Extract the second member ...
ot3rdg 8048	Extract the third member o...
1stval2 8049	Alternate value of the fun...
2ndval2 8050	Alternate value of the fun...
oteqimp 8051	The components of an order...
fo1st 8052	The ` 1st ` function maps ...
fo2nd 8053	The ` 2nd ` function maps ...
br1steqg 8054	Uniqueness condition for t...
br2ndeqg 8055	Uniqueness condition for t...
f1stres 8056	Mapping of a restriction o...
f2ndres 8057	Mapping of a restriction o...
fo1stres 8058	Onto mapping of a restrict...
fo2ndres 8059	Onto mapping of a restrict...
1st2val 8060	Value of an alternate defi...
2nd2val 8061	Value of an alternate defi...
1stcof 8062	Composition of the first m...
2ndcof 8063	Composition of the second ...
xp1st 8064	Location of the first elem...
xp2nd 8065	Location of the second ele...
elxp6 8066	Membership in a Cartesian ...
elxp7 8067	Membership in a Cartesian ...
eqopi 8068	Equality with an ordered p...
xp2 8069	Representation of Cartesia...
unielxp 8070	The membership relation fo...
1st2nd2 8071	Reconstruction of a member...
1st2ndb 8072	Reconstruction of an order...
xpopth 8073	An ordered pair theorem fo...
eqop 8074	Two ways to express equali...
eqop2 8075	Two ways to express equali...
op1steq 8076	Two ways of expressing tha...
opreuopreu 8077	There is a unique ordered ...
el2xptp 8078	A member of a nested Carte...
el2xptp0 8079	A member of a nested Carte...
el2xpss 8080	Version of ~ elrel for tri...
2nd1st 8081	Swap the members of an ord...
1st2nd 8082	Reconstruction of a member...
1stdm 8083	The first ordered pair com...
2ndrn 8084	The second ordered pair co...
1st2ndbr 8085	Express an element of a re...
releldm2 8086	Two ways of expressing mem...
reldm 8087	An expression for the doma...
releldmdifi 8088	One way of expressing memb...
funfv1st2nd 8089	The function value for the...
funelss 8090	If the first component of ...
funeldmdif 8091	Two ways of expressing mem...
sbcopeq1a 8092	Equality theorem for subst...
csbopeq1a 8093	Equality theorem for subst...
sbcoteq1a 8094	Equality theorem for subst...
dfopab2 8095	A way to define an ordered...
dfoprab3s 8096	A way to define an operati...
dfoprab3 8097	Operation class abstractio...
dfoprab4 8098	Operation class abstractio...
dfoprab4f 8099	Operation class abstractio...
opabex2 8100	Condition for an operation...
opabn1stprc 8101	An ordered-pair class abst...
opiota 8102	The property of a uniquely...
cnvoprab 8103	The converse of a class ab...
dfxp3 8104	Define the Cartesian produ...
elopabi 8105	A consequence of membershi...
eloprabi 8106	A consequence of membershi...
mpomptsx 8107	Express a two-argument fun...
mpompts 8108	Express a two-argument fun...
dmmpossx 8109	The domain of a mapping is...
fmpox 8110	Functionality, domain and ...
fmpo 8111	Functionality, domain and ...
fnmpo 8112	Functionality and domain o...
fnmpoi 8113	Functionality and domain o...
dmmpo 8114	Domain of a class given by...
ovmpoelrn 8115	An operation's value belon...
dmmpoga 8116	Domain of an operation giv...
dmmpog 8117	Domain of an operation giv...
mpoexxg 8118	Existence of an operation ...
mpoexg 8119	Existence of an operation ...
mpoexga 8120	If the domain of an operat...
mpoexw 8121	Weak version of ~ mpoex th...
mpoex 8122	If the domain of an operat...
mptmpoopabbrd 8123	The operation value of a f...
mptmpoopabbrdOLD 8124	Obsolete version of ~ mptm...
mptmpoopabovd 8125	The operation value of a f...
mptmpoopabbrdOLDOLD 8126	Obsolete version of ~ mptm...
mptmpoopabovdOLD 8127	Obsolete version of ~ mptm...
el2mpocsbcl 8128	If the operation value of ...
el2mpocl 8129	If the operation value of ...
fnmpoovd 8130	A function with a Cartesia...
offval22 8131	The function operation exp...
brovpreldm 8132	If a binary relation holds...
bropopvvv 8133	If a binary relation holds...
bropfvvvvlem 8134	Lemma for ~ bropfvvvv . (...
bropfvvvv 8135	If a binary relation holds...
ovmptss 8136	If all the values of the m...
relmpoopab 8137	Any function to sets of or...
fmpoco 8138	Composition of two functio...
oprabco 8139	Composition of a function ...
oprab2co 8140	Composition of operator ab...
df1st2 8141	An alternate possible defi...
df2nd2 8142	An alternate possible defi...
1stconst 8143	The mapping of a restricti...
2ndconst 8144	The mapping of a restricti...
dfmpo 8145	Alternate definition for t...
mposn 8146	An operation (in maps-to n...
curry1 8147	Composition with ` ``' ( 2...
curry1val 8148	The value of a curried fun...
curry1f 8149	Functionality of a curried...
curry2 8150	Composition with ` ``' ( 1...
curry2f 8151	Functionality of a curried...
curry2val 8152	The value of a curried fun...
cnvf1olem 8153	Lemma for ~ cnvf1o . (Con...
cnvf1o 8154	Describe a function that m...
fparlem1 8155	Lemma for ~ fpar . (Contr...
fparlem2 8156	Lemma for ~ fpar . (Contr...
fparlem3 8157	Lemma for ~ fpar . (Contr...
fparlem4 8158	Lemma for ~ fpar . (Contr...
fpar 8159	Merge two functions in par...
fsplit 8160	A function that can be use...
fsplitfpar 8161	Merge two functions with a...
offsplitfpar 8162	Express the function opera...
f2ndf 8163	The ` 2nd ` (second compon...
fo2ndf 8164	The ` 2nd ` (second compon...
f1o2ndf1 8165	The ` 2nd ` (second compon...
opco1 8166	Value of an operation prec...
opco2 8167	Value of an operation prec...
opco1i 8168	Inference form of ~ opco1 ...
frxp 8169	A lexicographical ordering...
xporderlem 8170	Lemma for lexicographical ...
poxp 8171	A lexicographical ordering...
soxp 8172	A lexicographical ordering...
wexp 8173	A lexicographical ordering...
fnwelem 8174	Lemma for ~ fnwe . (Contr...
fnwe 8175	A variant on lexicographic...
fnse 8176	Condition for the well-ord...
fvproj 8177	Value of a function on ord...
fimaproj 8178	Image of a cartesian produ...
ralxpes 8179	A version of ~ ralxp with ...
ralxp3f 8180	Restricted for all over a ...
ralxp3 8181	Restricted for all over a ...
ralxp3es 8182	Restricted for-all over a ...
frpoins3xpg 8183	Special case of founded pa...
frpoins3xp3g 8184	Special case of founded pa...
xpord2lem 8185	Lemma for Cartesian produc...
poxp2 8186	Another way of partially o...
frxp2 8187	Another way of giving a we...
xpord2pred 8188	Calculate the predecessor ...
sexp2 8189	Condition for the relation...
xpord2indlem 8190	Induction over the Cartesi...
xpord2ind 8191	Induction over the Cartesi...
xpord3lem 8192	Lemma for triple ordering....
poxp3 8193	Triple Cartesian product p...
frxp3 8194	Give well-foundedness over...
xpord3pred 8195	Calculate the predecsessor...
sexp3 8196	Show that the triple order...
xpord3inddlem 8197	Induction over the triple ...
xpord3indd 8198	Induction over the triple ...
xpord3ind 8199	Induction over the triple ...
orderseqlem 8200	Lemma for ~ poseq and ~ so...
poseq 8201	A partial ordering of ordi...
soseq 8202	A linear ordering of ordin...
suppval 8205	The value of the operation...
supp0prc 8206	The support of a class is ...
suppvalbr 8207	The value of the operation...
supp0 8208	The support of the empty s...
suppval1 8209	The value of the operation...
suppvalfng 8210	The value of the operation...
suppvalfn 8211	The value of the operation...
elsuppfng 8212	An element of the support ...
elsuppfn 8213	An element of the support ...
fvdifsupp 8214	Function value is zero out...
cnvimadfsn 8215	The support of functions "...
suppimacnvss 8216	The support of functions "...
suppimacnv 8217	Support sets of functions ...
fsuppeq 8218	Two ways of writing the su...
fsuppeqg 8219	Version of ~ fsuppeq avoid...
suppssdm 8220	The support of a function ...
suppsnop 8221	The support of a singleton...
snopsuppss 8222	The support of a singleton...
fvn0elsupp 8223	If the function value for ...
fvn0elsuppb 8224	The function value for a g...
rexsupp 8225	Existential quantification...
ressuppss 8226	The support of the restric...
suppun 8227	The support of a class/fun...
ressuppssdif 8228	The support of the restric...
mptsuppdifd 8229	The support of a function ...
mptsuppd 8230	The support of a function ...
extmptsuppeq 8231	The support of an extended...
suppfnss 8232	The support of a function ...
funsssuppss 8233	The support of a function ...
fnsuppres 8234	Two ways to express restri...
fnsuppeq0 8235	The support of a function ...
fczsupp0 8236	The support of a constant ...
suppss 8237	Show that the support of a...
suppssr 8238	A function is zero outside...
suppssrg 8239	A function is zero outside...
suppssov1 8240	Formula building theorem f...
suppssov2 8241	Formula building theorem f...
suppssof1 8242	Formula building theorem f...
suppss2 8243	Show that the support of a...
suppsssn 8244	Show that the support of a...
suppssfv 8245	Formula building theorem f...
suppofssd 8246	Condition for the support ...
suppofss1d 8247	Condition for the support ...
suppofss2d 8248	Condition for the support ...
suppco 8249	The support of the composi...
suppcoss 8250	The support of the composi...
supp0cosupp0 8251	The support of the composi...
imacosupp 8252	The image of the support o...
opeliunxp2f 8253	Membership in a union of C...
mpoxeldm 8254	If there is an element of ...
mpoxneldm 8255	If the first argument of a...
mpoxopn0yelv 8256	If there is an element of ...
mpoxopynvov0g 8257	If the second argument of ...
mpoxopxnop0 8258	If the first argument of a...
mpoxopx0ov0 8259	If the first argument of a...
mpoxopxprcov0 8260	If the components of the f...
mpoxopynvov0 8261	If the second argument of ...
mpoxopoveq 8262	Value of an operation give...
mpoxopovel 8263	Element of the value of an...
mpoxopoveqd 8264	Value of an operation give...
brovex 8265	A binary relation of the v...
brovmpoex 8266	A binary relation of the v...
sprmpod 8267	The extension of a binary ...
tposss 8270	Subset theorem for transpo...
tposeq 8271	Equality theorem for trans...
tposeqd 8272	Equality theorem for trans...
tposssxp 8273	The transposition is a sub...
reltpos 8274	The transposition is a rel...
brtpos2 8275	Value of the transposition...
brtpos0 8276	The behavior of ` tpos ` w...
reldmtpos 8277	Necessary and sufficient c...
brtpos 8278	The transposition swaps ar...
ottpos 8279	The transposition swaps th...
relbrtpos 8280	The transposition swaps ar...
dmtpos 8281	The domain of ` tpos F ` w...
rntpos 8282	The range of ` tpos F ` wh...
tposexg 8283	The transposition of a set...
ovtpos 8284	The transposition swaps th...
tposfun 8285	The transposition of a fun...
dftpos2 8286	Alternate definition of ` ...
dftpos3 8287	Alternate definition of ` ...
dftpos4 8288	Alternate definition of ` ...
tpostpos 8289	Value of the double transp...
tpostpos2 8290	Value of the double transp...
tposfn2 8291	The domain of a transposit...
tposfo2 8292	Condition for a surjective...
tposf2 8293	The domain and codomain of...
tposf12 8294	Condition for an injective...
tposf1o2 8295	Condition of a bijective t...
tposfo 8296	The domain and codomain/ra...
tposf 8297	The domain and codomain of...
tposfn 8298	Functionality of a transpo...
tpos0 8299	Transposition of the empty...
tposco 8300	Transposition of a composi...
tpossym 8301	Two ways to say a function...
tposeqi 8302	Equality theorem for trans...
tposex 8303	A transposition is a set. ...
nftpos 8304	Hypothesis builder for tra...
tposoprab 8305	Transposition of a class o...
tposmpo 8306	Transposition of a two-arg...
tposconst 8307	The transposition of a con...
mpocurryd 8312	The currying of an operati...
mpocurryvald 8313	The value of a curried ope...
fvmpocurryd 8314	The value of the value of ...
pwuninel2 8317	Proof of ~ pwuninel under ...
pwuninel 8318	The powerclass of the unio...
undefval 8319	Value of the undefined val...
undefnel2 8320	The undefined value genera...
undefnel 8321	The undefined value genera...
undefne0 8322	The undefined value genera...
frecseq123 8325	Equality theorem for the w...
nffrecs 8326	Bound-variable hypothesis ...
csbfrecsg 8327	Move class substitution in...
fpr3g 8328	Functions defined by well-...
frrlem1 8329	Lemma for well-founded rec...
frrlem2 8330	Lemma for well-founded rec...
frrlem3 8331	Lemma for well-founded rec...
frrlem4 8332	Lemma for well-founded rec...
frrlem5 8333	Lemma for well-founded rec...
frrlem6 8334	Lemma for well-founded rec...
frrlem7 8335	Lemma for well-founded rec...
frrlem8 8336	Lemma for well-founded rec...
frrlem9 8337	Lemma for well-founded rec...
frrlem10 8338	Lemma for well-founded rec...
frrlem11 8339	Lemma for well-founded rec...
frrlem12 8340	Lemma for well-founded rec...
frrlem13 8341	Lemma for well-founded rec...
frrlem14 8342	Lemma for well-founded rec...
fprlem1 8343	Lemma for well-founded rec...
fprlem2 8344	Lemma for well-founded rec...
fpr2a 8345	Weak version of ~ fpr2 whi...
fpr1 8346	Law of well-founded recurs...
fpr2 8347	Law of well-founded recurs...
fpr3 8348	Law of well-founded recurs...
frrrel 8349	Show without using the axi...
frrdmss 8350	Show without using the axi...
frrdmcl 8351	Show without using the axi...
fprfung 8352	A "function" defined by we...
fprresex 8353	The restriction of a funct...
dfwrecsOLD 8356	Obsolete definition of the...
wrecseq123 8357	General equality theorem f...
wrecseq123OLD 8358	Obsolete version of ~ wrec...
nfwrecs 8359	Bound-variable hypothesis ...
nfwrecsOLD 8360	Obsolete proof of ~ nfwrec...
wrecseq1 8361	Equality theorem for the w...
wrecseq2 8362	Equality theorem for the w...
wrecseq3 8363	Equality theorem for the w...
csbwrecsg 8364	Move class substitution in...
wfr3g 8365	Functions defined by well-...
wfrlem1OLD 8366	Lemma for well-ordered rec...
wfrlem2OLD 8367	Lemma for well-ordered rec...
wfrlem3OLD 8368	Lemma for well-ordered rec...
wfrlem3OLDa 8369	Lemma for well-ordered rec...
wfrlem4OLD 8370	Lemma for well-ordered rec...
wfrlem5OLD 8371	Lemma for well-ordered rec...
wfrrelOLD 8372	Obsolete proof of ~ wfrrel...
wfrdmssOLD 8373	Obsolete proof of ~ wfrdms...
wfrlem8OLD 8374	Lemma for well-ordered rec...
wfrdmclOLD 8375	Obsolete version of ~ wfrd...
wfrlem10OLD 8376	Lemma for well-ordered rec...
wfrfunOLD 8377	Obsolete proof of ~ wfrfun...
wfrlem12OLD 8378	Lemma for well-ordered rec...
wfrlem13OLD 8379	Lemma for well-ordered rec...
wfrlem14OLD 8380	Lemma for well-ordered rec...
wfrlem15OLD 8381	Lemma for well-ordered rec...
wfrlem16OLD 8382	Lemma for well-ordered rec...
wfrlem17OLD 8383	Without using ~ ax-rep , s...
wfr2aOLD 8384	Obsolete version of ~ wfr2...
wfr1OLD 8385	Obsolete version of ~ wfr1...
wfr2OLD 8386	Obsolete version of ~ wfr2...
wfrrel 8387	The well-ordered recursion...
wfrdmss 8388	The domain of the well-ord...
wfrdmcl 8389	The predecessor class of a...
wfrfun 8390	The "function" generated b...
wfrresex 8391	Show without using the axi...
wfr2a 8392	A weak version of ~ wfr2 w...
wfr1 8393	The Principle of Well-Orde...
wfr2 8394	The Principle of Well-Orde...
wfr3 8395	The principle of Well-Orde...
wfr3OLD 8396	Obsolete form of ~ wfr3 as...
iunon 8397	The indexed union of a set...
iinon 8398	The nonempty indexed inter...
onfununi 8399	A property of functions on...
onovuni 8400	A variant of ~ onfununi fo...
onoviun 8401	A variant of ~ onovuni wit...
onnseq 8402	There are no length ` _om ...
dfsmo2 8405	Alternate definition of a ...
issmo 8406	Conditions for which ` A `...
issmo2 8407	Alternate definition of a ...
smoeq 8408	Equality theorem for stric...
smodm 8409	The domain of a strictly m...
smores 8410	A strictly monotone functi...
smores3 8411	A strictly monotone functi...
smores2 8412	A strictly monotone ordina...
smodm2 8413	The domain of a strictly m...
smofvon2 8414	The function values of a s...
iordsmo 8415	The identity relation rest...
smo0 8416	The null set is a strictly...
smofvon 8417	If ` B ` is a strictly mon...
smoel 8418	If ` x ` is less than ` y ...
smoiun 8419	The value of a strictly mo...
smoiso 8420	If ` F ` is an isomorphism...
smoel2 8421	A strictly monotone ordina...
smo11 8422	A strictly monotone ordina...
smoord 8423	A strictly monotone ordina...
smoword 8424	A strictly monotone ordina...
smogt 8425	A strictly monotone ordina...
smocdmdom 8426	The codomain of a strictly...
smoiso2 8427	The strictly monotone ordi...
dfrecs3 8430	The old definition of tran...
dfrecs3OLD 8431	Obsolete version of ~ dfre...
recseq 8432	Equality theorem for ` rec...
nfrecs 8433	Bound-variable hypothesis ...
tfrlem1 8434	A technical lemma for tran...
tfrlem3a 8435	Lemma for transfinite recu...
tfrlem3 8436	Lemma for transfinite recu...
tfrlem4 8437	Lemma for transfinite recu...
tfrlem5 8438	Lemma for transfinite recu...
recsfval 8439	Lemma for transfinite recu...
tfrlem6 8440	Lemma for transfinite recu...
tfrlem7 8441	Lemma for transfinite recu...
tfrlem8 8442	Lemma for transfinite recu...
tfrlem9 8443	Lemma for transfinite recu...
tfrlem9a 8444	Lemma for transfinite recu...
tfrlem10 8445	Lemma for transfinite recu...
tfrlem11 8446	Lemma for transfinite recu...
tfrlem12 8447	Lemma for transfinite recu...
tfrlem13 8448	Lemma for transfinite recu...
tfrlem14 8449	Lemma for transfinite recu...
tfrlem15 8450	Lemma for transfinite recu...
tfrlem16 8451	Lemma for finite recursion...
tfr1a 8452	A weak version of ~ tfr1 w...
tfr2a 8453	A weak version of ~ tfr2 w...
tfr2b 8454	Without assuming ~ ax-rep ...
tfr1 8455	Principle of Transfinite R...
tfr2 8456	Principle of Transfinite R...
tfr3 8457	Principle of Transfinite R...
tfr1ALT 8458	Alternate proof of ~ tfr1 ...
tfr2ALT 8459	Alternate proof of ~ tfr2 ...
tfr3ALT 8460	Alternate proof of ~ tfr3 ...
recsfnon 8461	Strong transfinite recursi...
recsval 8462	Strong transfinite recursi...
tz7.44lem1 8463	The ordered pair abstracti...
tz7.44-1 8464	The value of ` F ` at ` (/...
tz7.44-2 8465	The value of ` F ` at a su...
tz7.44-3 8466	The value of ` F ` at a li...
rdgeq1 8469	Equality theorem for the r...
rdgeq2 8470	Equality theorem for the r...
rdgeq12 8471	Equality theorem for the r...
nfrdg 8472	Bound-variable hypothesis ...
rdglem1 8473	Lemma used with the recurs...
rdgfun 8474	The recursive definition g...
rdgdmlim 8475	The domain of the recursiv...
rdgfnon 8476	The recursive definition g...
rdgvalg 8477	Value of the recursive def...
rdgval 8478	Value of the recursive def...
rdg0 8479	The initial value of the r...
rdgseg 8480	The initial segments of th...
rdgsucg 8481	The value of the recursive...
rdgsuc 8482	The value of the recursive...
rdglimg 8483	The value of the recursive...
rdglim 8484	The value of the recursive...
rdg0g 8485	The initial value of the r...
rdgsucmptf 8486	The value of the recursive...
rdgsucmptnf 8487	The value of the recursive...
rdgsucmpt2 8488	This version of ~ rdgsucmp...
rdgsucmpt 8489	The value of the recursive...
rdglim2 8490	The value of the recursive...
rdglim2a 8491	The value of the recursive...
rdg0n 8492	If ` A ` is a proper class...
frfnom 8493	The function generated by ...
fr0g 8494	The initial value resultin...
frsuc 8495	The successor value result...
frsucmpt 8496	The successor value result...
frsucmptn 8497	The value of the finite re...
frsucmpt2 8498	The successor value result...
tz7.48lem 8499	A way of showing an ordina...
tz7.48-2 8500	Proposition 7.48(2) of [Ta...
tz7.48-1 8501	Proposition 7.48(1) of [Ta...
tz7.48-3 8502	Proposition 7.48(3) of [Ta...
tz7.49 8503	Proposition 7.49 of [Takeu...
tz7.49c 8504	Corollary of Proposition 7...
seqomlem0 8507	Lemma for ` seqom ` . Cha...
seqomlem1 8508	Lemma for ` seqom ` . The...
seqomlem2 8509	Lemma for ` seqom ` . (Co...
seqomlem3 8510	Lemma for ` seqom ` . (Co...
seqomlem4 8511	Lemma for ` seqom ` . (Co...
seqomeq12 8512	Equality theorem for ` seq...
fnseqom 8513	An index-aware recursive d...
seqom0g 8514	Value of an index-aware re...
seqomsuc 8515	Value of an index-aware re...
omsucelsucb 8516	Membership is inherited by...
df1o2 8531	Expanded value of the ordi...
df2o3 8532	Expanded value of the ordi...
df2o2 8533	Expanded value of the ordi...
1oex 8534	Ordinal 1 is a set. (Cont...
2oex 8535	` 2o ` is a set. (Contrib...
1on 8536	Ordinal 1 is an ordinal nu...
1onOLD 8537	Obsolete version of ~ 1on ...
2on 8538	Ordinal 2 is an ordinal nu...
2onOLD 8539	Obsolete version of ~ 2on ...
2on0 8540	Ordinal two is not zero. ...
ord3 8541	Ordinal 3 is an ordinal cl...
3on 8542	Ordinal 3 is an ordinal nu...
4on 8543	Ordinal 4 is an ordinal nu...
1oexOLD 8544	Obsolete version of ~ 1oex...
2oexOLD 8545	Obsolete version of ~ 2oex...
1n0 8546	Ordinal one is not equal t...
nlim1 8547	1 is not a limit ordinal. ...
nlim2 8548	2 is not a limit ordinal. ...
xp01disj 8549	Cartesian products with th...
xp01disjl 8550	Cartesian products with th...
ordgt0ge1 8551	Two ways to express that a...
ordge1n0 8552	An ordinal greater than or...
el1o 8553	Membership in ordinal one....
ord1eln01 8554	An ordinal that is not 0 o...
ord2eln012 8555	An ordinal that is not 0, ...
1ellim 8556	A limit ordinal contains 1...
2ellim 8557	A limit ordinal contains 2...
dif1o 8558	Two ways to say that ` A `...
ondif1 8559	Two ways to say that ` A `...
ondif2 8560	Two ways to say that ` A `...
2oconcl 8561	Closure of the pair swappi...
0lt1o 8562	Ordinal zero is less than ...
dif20el 8563	An ordinal greater than on...
0we1 8564	The empty set is a well-or...
brwitnlem 8565	Lemma for relations which ...
fnoa 8566	Functionality and domain o...
fnom 8567	Functionality and domain o...
fnoe 8568	Functionality and domain o...
oav 8569	Value of ordinal addition....
omv 8570	Value of ordinal multiplic...
oe0lem 8571	A helper lemma for ~ oe0 a...
oev 8572	Value of ordinal exponenti...
oevn0 8573	Value of ordinal exponenti...
oa0 8574	Addition with zero. Propo...
om0 8575	Ordinal multiplication wit...
oe0m 8576	Value of zero raised to an...
om0x 8577	Ordinal multiplication wit...
oe0m0 8578	Ordinal exponentiation wit...
oe0m1 8579	Ordinal exponentiation wit...
oe0 8580	Ordinal exponentiation wit...
oev2 8581	Alternate value of ordinal...
oasuc 8582	Addition with successor. ...
oesuclem 8583	Lemma for ~ oesuc . (Cont...
omsuc 8584	Multiplication with succes...
oesuc 8585	Ordinal exponentiation wit...
onasuc 8586	Addition with successor. ...
onmsuc 8587	Multiplication with succes...
onesuc 8588	Exponentiation with a succ...
oa1suc 8589	Addition with 1 is same as...
oalim 8590	Ordinal addition with a li...
omlim 8591	Ordinal multiplication wit...
oelim 8592	Ordinal exponentiation wit...
oacl 8593	Closure law for ordinal ad...
omcl 8594	Closure law for ordinal mu...
oecl 8595	Closure law for ordinal ex...
oa0r 8596	Ordinal addition with zero...
om0r 8597	Ordinal multiplication wit...
o1p1e2 8598	1 + 1 = 2 for ordinal numb...
o2p2e4 8599	2 + 2 = 4 for ordinal numb...
om1 8600	Ordinal multiplication wit...
om1r 8601	Ordinal multiplication wit...
oe1 8602	Ordinal exponentiation wit...
oe1m 8603	Ordinal exponentiation wit...
oaordi 8604	Ordering property of ordin...
oaord 8605	Ordering property of ordin...
oacan 8606	Left cancellation law for ...
oaword 8607	Weak ordering property of ...
oawordri 8608	Weak ordering property of ...
oaord1 8609	An ordinal is less than it...
oaword1 8610	An ordinal is less than or...
oaword2 8611	An ordinal is less than or...
oawordeulem 8612	Lemma for ~ oawordex . (C...
oawordeu 8613	Existence theorem for weak...
oawordexr 8614	Existence theorem for weak...
oawordex 8615	Existence theorem for weak...
oaordex 8616	Existence theorem for orde...
oa00 8617	An ordinal sum is zero iff...
oalimcl 8618	The ordinal sum with a lim...
oaass 8619	Ordinal addition is associ...
oarec 8620	Recursive definition of or...
oaf1o 8621	Left addition by a constan...
oacomf1olem 8622	Lemma for ~ oacomf1o . (C...
oacomf1o 8623	Define a bijection from ` ...
omordi 8624	Ordering property of ordin...
omord2 8625	Ordering property of ordin...
omord 8626	Ordering property of ordin...
omcan 8627	Left cancellation law for ...
omword 8628	Weak ordering property of ...
omwordi 8629	Weak ordering property of ...
omwordri 8630	Weak ordering property of ...
omword1 8631	An ordinal is less than or...
omword2 8632	An ordinal is less than or...
om00 8633	The product of two ordinal...
om00el 8634	The product of two nonzero...
omordlim 8635	Ordering involving the pro...
omlimcl 8636	The product of any nonzero...
odi 8637	Distributive law for ordin...
omass 8638	Multiplication of ordinal ...
oneo 8639	If an ordinal number is ev...
omeulem1 8640	Lemma for ~ omeu : existen...
omeulem2 8641	Lemma for ~ omeu : uniquen...
omopth2 8642	An ordered pair-like theor...
omeu 8643	The division algorithm for...
oen0 8644	Ordinal exponentiation wit...
oeordi 8645	Ordering law for ordinal e...
oeord 8646	Ordering property of ordin...
oecan 8647	Left cancellation law for ...
oeword 8648	Weak ordering property of ...
oewordi 8649	Weak ordering property of ...
oewordri 8650	Weak ordering property of ...
oeworde 8651	Ordinal exponentiation com...
oeordsuc 8652	Ordering property of ordin...
oelim2 8653	Ordinal exponentiation wit...
oeoalem 8654	Lemma for ~ oeoa . (Contr...
oeoa 8655	Sum of exponents law for o...
oeoelem 8656	Lemma for ~ oeoe . (Contr...
oeoe 8657	Product of exponents law f...
oelimcl 8658	The ordinal exponential wi...
oeeulem 8659	Lemma for ~ oeeu . (Contr...
oeeui 8660	The division algorithm for...
oeeu 8661	The division algorithm for...
nna0 8662	Addition with zero. Theor...
nnm0 8663	Multiplication with zero. ...
nnasuc 8664	Addition with successor. ...
nnmsuc 8665	Multiplication with succes...
nnesuc 8666	Exponentiation with a succ...
nna0r 8667	Addition to zero. Remark ...
nnm0r 8668	Multiplication with zero. ...
nnacl 8669	Closure of addition of nat...
nnmcl 8670	Closure of multiplication ...
nnecl 8671	Closure of exponentiation ...
nnacli 8672	` _om ` is closed under ad...
nnmcli 8673	` _om ` is closed under mu...
nnarcl 8674	Reverse closure law for ad...
nnacom 8675	Addition of natural number...
nnaordi 8676	Ordering property of addit...
nnaord 8677	Ordering property of addit...
nnaordr 8678	Ordering property of addit...
nnawordi 8679	Adding to both sides of an...
nnaass 8680	Addition of natural number...
nndi 8681	Distributive law for natur...
nnmass 8682	Multiplication of natural ...
nnmsucr 8683	Multiplication with succes...
nnmcom 8684	Multiplication of natural ...
nnaword 8685	Weak ordering property of ...
nnacan 8686	Cancellation law for addit...
nnaword1 8687	Weak ordering property of ...
nnaword2 8688	Weak ordering property of ...
nnmordi 8689	Ordering property of multi...
nnmord 8690	Ordering property of multi...
nnmword 8691	Weak ordering property of ...
nnmcan 8692	Cancellation law for multi...
nnmwordi 8693	Weak ordering property of ...
nnmwordri 8694	Weak ordering property of ...
nnawordex 8695	Equivalence for weak order...
nnaordex 8696	Equivalence for ordering. ...
nnaordex2 8697	Equivalence for ordering. ...
1onn 8698	The ordinal 1 is a natural...
1onnALT 8699	Shorter proof of ~ 1onn us...
2onn 8700	The ordinal 2 is a natural...
2onnALT 8701	Shorter proof of ~ 2onn us...
3onn 8702	The ordinal 3 is a natural...
4onn 8703	The ordinal 4 is a natural...
1one2o 8704	Ordinal one is not ordinal...
oaabslem 8705	Lemma for ~ oaabs . (Cont...
oaabs 8706	Ordinal addition absorbs a...
oaabs2 8707	The absorption law ~ oaabs...
omabslem 8708	Lemma for ~ omabs . (Cont...
omabs 8709	Ordinal multiplication is ...
nnm1 8710	Multiply an element of ` _...
nnm2 8711	Multiply an element of ` _...
nn2m 8712	Multiply an element of ` _...
nnneo 8713	If a natural number is eve...
nneob 8714	A natural number is even i...
omsmolem 8715	Lemma for ~ omsmo . (Cont...
omsmo 8716	A strictly monotonic ordin...
omopthlem1 8717	Lemma for ~ omopthi . (Co...
omopthlem2 8718	Lemma for ~ omopthi . (Co...
omopthi 8719	An ordered pair theorem fo...
omopth 8720	An ordered pair theorem fo...
nnasmo 8721	There is at most one left ...
eldifsucnn 8722	Condition for membership i...
on2recsfn 8725	Show that double recursion...
on2recsov 8726	Calculate the value of the...
on2ind 8727	Double induction over ordi...
on3ind 8728	Triple induction over ordi...
coflton 8729	Cofinality theorem for ord...
cofon1 8730	Cofinality theorem for ord...
cofon2 8731	Cofinality theorem for ord...
cofonr 8732	Inverse cofinality law for...
naddfn 8733	Natural addition is a func...
naddcllem 8734	Lemma for ordinal addition...
naddcl 8735	Closure law for natural ad...
naddov 8736	The value of natural addit...
naddov2 8737	Alternate expression for n...
naddov3 8738	Alternate expression for n...
naddf 8739	Function statement for nat...
naddcom 8740	Natural addition commutes....
naddrid 8741	Ordinal zero is the additi...
naddlid 8742	Ordinal zero is the additi...
naddssim 8743	Ordinal less-than-or-equal...
naddelim 8744	Ordinal less-than is prese...
naddel1 8745	Ordinal less-than is not a...
naddel2 8746	Ordinal less-than is not a...
naddss1 8747	Ordinal less-than-or-equal...
naddss2 8748	Ordinal less-than-or-equal...
naddword1 8749	Weak-ordering principle fo...
naddword2 8750	Weak-ordering principle fo...
naddunif 8751	Uniformity theorem for nat...
naddasslem1 8752	Lemma for ~ naddass . Exp...
naddasslem2 8753	Lemma for ~ naddass . Exp...
naddass 8754	Natural ordinal addition i...
nadd32 8755	Commutative/associative la...
nadd4 8756	Rearragement of terms in a...
nadd42 8757	Rearragement of terms in a...
naddel12 8758	Natural addition to both s...
naddsuc2 8759	Natural addition with succ...
naddoa 8760	Natural addition of a natu...
omnaddcl 8761	The naturals are closed un...
dfer2 8766	Alternate definition of eq...
dfec2 8768	Alternate definition of ` ...
ecexg 8769	An equivalence class modul...
ecexr 8770	A nonempty equivalence cla...
ereq1 8772	Equality theorem for equiv...
ereq2 8773	Equality theorem for equiv...
errel 8774	An equivalence relation is...
erdm 8775	The domain of an equivalen...
ercl 8776	Elementhood in the field o...
ersym 8777	An equivalence relation is...
ercl2 8778	Elementhood in the field o...
ersymb 8779	An equivalence relation is...
ertr 8780	An equivalence relation is...
ertrd 8781	A transitivity relation fo...
ertr2d 8782	A transitivity relation fo...
ertr3d 8783	A transitivity relation fo...
ertr4d 8784	A transitivity relation fo...
erref 8785	An equivalence relation is...
ercnv 8786	The converse of an equival...
errn 8787	The range and domain of an...
erssxp 8788	An equivalence relation is...
erex 8789	An equivalence relation is...
erexb 8790	An equivalence relation is...
iserd 8791	A reflexive, symmetric, tr...
iseri 8792	A reflexive, symmetric, tr...
iseriALT 8793	Alternate proof of ~ iseri...
brinxper 8794	Conditions for a reflexive...
brdifun 8795	Evaluate the incomparabili...
swoer 8796	Incomparability under a st...
swoord1 8797	The incomparability equiva...
swoord2 8798	The incomparability equiva...
swoso 8799	If the incomparability rel...
eqerlem 8800	Lemma for ~ eqer . (Contr...
eqer 8801	Equivalence relation invol...
ider 8802	The identity relation is a...
0er 8803	The empty set is an equiva...
eceq1 8804	Equality theorem for equiv...
eceq1d 8805	Equality theorem for equiv...
eceq2 8806	Equality theorem for equiv...
eceq2i 8807	Equality theorem for the `...
eceq2d 8808	Equality theorem for the `...
elecg 8809	Membership in an equivalen...
ecref 8810	All elements are in their ...
elec 8811	Membership in an equivalen...
relelec 8812	Membership in an equivalen...
ecss 8813	An equivalence class is a ...
ecdmn0 8814	A representative of a none...
ereldm 8815	Equality of equivalence cl...
erth 8816	Basic property of equivale...
erth2 8817	Basic property of equivale...
erthi 8818	Basic property of equivale...
erdisj 8819	Equivalence classes do not...
ecidsn 8820	An equivalence class modul...
qseq1 8821	Equality theorem for quoti...
qseq2 8822	Equality theorem for quoti...
qseq2i 8823	Equality theorem for quoti...
qseq1d 8824	Equality theorem for quoti...
qseq2d 8825	Equality theorem for quoti...
qseq12 8826	Equality theorem for quoti...
0qs 8827	Quotient set with the empt...
elqsg 8828	Closed form of ~ elqs . (...
elqs 8829	Membership in a quotient s...
elqsi 8830	Membership in a quotient s...
elqsecl 8831	Membership in a quotient s...
ecelqsg 8832	Membership of an equivalen...
ecelqsi 8833	Membership of an equivalen...
ecopqsi 8834	"Closure" law for equivale...
qsexg 8835	A quotient set exists. (C...
qsex 8836	A quotient set exists. (C...
uniqs 8837	The union of a quotient se...
qsss 8838	A quotient set is a set of...
uniqs2 8839	The union of a quotient se...
snec 8840	The singleton of an equiva...
ecqs 8841	Equivalence class in terms...
ecid 8842	A set is equal to its cose...
qsid 8843	A set is equal to its quot...
ectocld 8844	Implicit substitution of c...
ectocl 8845	Implicit substitution of c...
elqsn0 8846	A quotient set does not co...
ecelqsdm 8847	Membership of an equivalen...
xpider 8848	A Cartesian square is an e...
iiner 8849	The intersection of a none...
riiner 8850	The relative intersection ...
erinxp 8851	A restricted equivalence r...
ecinxp 8852	Restrict the relation in a...
qsinxp 8853	Restrict the equivalence r...
qsdisj 8854	Members of a quotient set ...
qsdisj2 8855	A quotient set is a disjoi...
qsel 8856	If an element of a quotien...
uniinqs 8857	Class union distributes ov...
qliftlem 8858	Lemma for theorems about a...
qliftrel 8859	` F ` , a function lift, i...
qliftel 8860	Elementhood in the relatio...
qliftel1 8861	Elementhood in the relatio...
qliftfun 8862	The function ` F ` is the ...
qliftfund 8863	The function ` F ` is the ...
qliftfuns 8864	The function ` F ` is the ...
qliftf 8865	The domain and codomain of...
qliftval 8866	The value of the function ...
ecoptocl 8867	Implicit substitution of c...
2ecoptocl 8868	Implicit substitution of c...
3ecoptocl 8869	Implicit substitution of c...
brecop 8870	Binary relation on a quoti...
brecop2 8871	Binary relation on a quoti...
eroveu 8872	Lemma for ~ erov and ~ ero...
erovlem 8873	Lemma for ~ erov and ~ ero...
erov 8874	The value of an operation ...
eroprf 8875	Functionality of an operat...
erov2 8876	The value of an operation ...
eroprf2 8877	Functionality of an operat...
ecopoveq 8878	This is the first of sever...
ecopovsym 8879	Assuming the operation ` F...
ecopovtrn 8880	Assuming that operation ` ...
ecopover 8881	Assuming that operation ` ...
eceqoveq 8882	Equality of equivalence re...
ecovcom 8883	Lemma used to transfer a c...
ecovass 8884	Lemma used to transfer an ...
ecovdi 8885	Lemma used to transfer a d...
mapprc 8890	When ` A ` is a proper cla...
pmex 8891	The class of all partial f...
mapexOLD 8892	Obsolete version of ~ mape...
fnmap 8893	Set exponentiation has a u...
fnpm 8894	Partial function exponenti...
reldmmap 8895	Set exponentiation is a we...
mapvalg 8896	The value of set exponenti...
pmvalg 8897	The value of the partial m...
mapval 8898	The value of set exponenti...
elmapg 8899	Membership relation for se...
elmapd 8900	Deduction form of ~ elmapg...
elmapdd 8901	Deduction associated with ...
mapdm0 8902	The empty set is the only ...
elpmg 8903	The predicate "is a partia...
elpm2g 8904	The predicate "is a partia...
elpm2r 8905	Sufficient condition for b...
elpmi 8906	A partial function is a fu...
pmfun 8907	A partial function is a fu...
elmapex 8908	Eliminate antecedent for m...
elmapi 8909	A mapping is a function, f...
mapfset 8910	If ` B ` is a set, the val...
mapssfset 8911	The value of the set expon...
mapfoss 8912	The value of the set expon...
fsetsspwxp 8913	The class of all functions...
fset0 8914	The set of functions from ...
fsetdmprc0 8915	The set of functions with ...
fsetex 8916	The set of functions betwe...
f1setex 8917	The set of injections betw...
fosetex 8918	The set of surjections bet...
f1osetex 8919	The set of bijections betw...
fsetfcdm 8920	The class of functions wit...
fsetfocdm 8921	The class of functions wit...
fsetprcnex 8922	The class of all functions...
fsetcdmex 8923	The class of all functions...
fsetexb 8924	The class of all functions...
elmapfn 8925	A mapping is a function wi...
elmapfun 8926	A mapping is always a func...
elmapssres 8927	A restricted mapping is a ...
fpmg 8928	A total function is a part...
pmss12g 8929	Subset relation for the se...
pmresg 8930	Elementhood of a restricte...
elmap 8931	Membership relation for se...
mapval2 8932	Alternate expression for t...
elpm 8933	The predicate "is a partia...
elpm2 8934	The predicate "is a partia...
fpm 8935	A total function is a part...
mapsspm 8936	Set exponentiation is a su...
pmsspw 8937	Partial maps are a subset ...
mapsspw 8938	Set exponentiation is a su...
mapfvd 8939	The value of a function th...
elmapresaun 8940	~ fresaun transposed to ma...
fvmptmap 8941	Special case of ~ fvmpt fo...
map0e 8942	Set exponentiation with an...
map0b 8943	Set exponentiation with an...
map0g 8944	Set exponentiation is empt...
0map0sn0 8945	The set of mappings of the...
mapsnd 8946	The value of set exponenti...
map0 8947	Set exponentiation is empt...
mapsn 8948	The value of set exponenti...
mapss 8949	Subset inheritance for set...
fdiagfn 8950	Functionality of the diago...
fvdiagfn 8951	Functionality of the diago...
mapsnconst 8952	Every singleton map is a c...
mapsncnv 8953	Expression for the inverse...
mapsnf1o2 8954	Explicit bijection between...
mapsnf1o3 8955	Explicit bijection in the ...
ralxpmap 8956	Quantification over functi...
dfixp 8959	Eliminate the expression `...
ixpsnval 8960	The value of an infinite C...
elixp2 8961	Membership in an infinite ...
fvixp 8962	Projection of a factor of ...
ixpfn 8963	A nuple is a function. (C...
elixp 8964	Membership in an infinite ...
elixpconst 8965	Membership in an infinite ...
ixpconstg 8966	Infinite Cartesian product...
ixpconst 8967	Infinite Cartesian product...
ixpeq1 8968	Equality theorem for infin...
ixpeq1d 8969	Equality theorem for infin...
ss2ixp 8970	Subclass theorem for infin...
ixpeq2 8971	Equality theorem for infin...
ixpeq2dva 8972	Equality theorem for infin...
ixpeq2dv 8973	Equality theorem for infin...
cbvixp 8974	Change bound variable in a...
cbvixpv 8975	Change bound variable in a...
nfixpw 8976	Bound-variable hypothesis ...
nfixp 8977	Bound-variable hypothesis ...
nfixp1 8978	The index variable in an i...
ixpprc 8979	A cartesian product of pro...
ixpf 8980	A member of an infinite Ca...
uniixp 8981	The union of an infinite C...
ixpexg 8982	The existence of an infini...
ixpin 8983	The intersection of two in...
ixpiin 8984	The indexed intersection o...
ixpint 8985	The intersection of a coll...
ixp0x 8986	An infinite Cartesian prod...
ixpssmap2g 8987	An infinite Cartesian prod...
ixpssmapg 8988	An infinite Cartesian prod...
0elixp 8989	Membership of the empty se...
ixpn0 8990	The infinite Cartesian pro...
ixp0 8991	The infinite Cartesian pro...
ixpssmap 8992	An infinite Cartesian prod...
resixp 8993	Restriction of an element ...
undifixp 8994	Union of two projections o...
mptelixpg 8995	Condition for an explicit ...
resixpfo 8996	Restriction of elements of...
elixpsn 8997	Membership in a class of s...
ixpsnf1o 8998	A bijection between a clas...
mapsnf1o 8999	A bijection between a set ...
boxriin 9000	A rectangular subset of a ...
boxcutc 9001	The relative complement of...
relen 9010	Equinumerosity is a relati...
reldom 9011	Dominance is a relation. ...
relsdom 9012	Strict dominance is a rela...
encv 9013	If two classes are equinum...
breng 9014	Equinumerosity relation. ...
bren 9015	Equinumerosity relation. ...
brenOLD 9016	Obsolete version of ~ bren...
brdom2g 9017	Dominance relation. This ...
brdomg 9018	Dominance relation. (Cont...
brdomgOLD 9019	Obsolete version of ~ brdo...
brdomi 9020	Dominance relation. (Cont...
brdomiOLD 9021	Obsolete version of ~ brdo...
brdom 9022	Dominance relation. (Cont...
domen 9023	Dominance in terms of equi...
domeng 9024	Dominance in terms of equi...
ctex 9025	A countable set is a set. ...
f1oen4g 9026	The domain and range of a ...
f1dom4g 9027	The domain of a one-to-one...
f1oen3g 9028	The domain and range of a ...
f1dom3g 9029	The domain of a one-to-one...
f1oen2g 9030	The domain and range of a ...
f1dom2g 9031	The domain of a one-to-one...
f1dom2gOLD 9032	Obsolete version of ~ f1do...
f1oeng 9033	The domain and range of a ...
f1domg 9034	The domain of a one-to-one...
f1oen 9035	The domain and range of a ...
f1dom 9036	The domain of a one-to-one...
brsdom 9037	Strict dominance relation,...
isfi 9038	Express " ` A ` is finite"...
enssdom 9039	Equinumerosity implies dom...
dfdom2 9040	Alternate definition of do...
endom 9041	Equinumerosity implies dom...
sdomdom 9042	Strict dominance implies d...
sdomnen 9043	Strict dominance implies n...
brdom2 9044	Dominance in terms of stri...
bren2 9045	Equinumerosity expressed i...
enrefg 9046	Equinumerosity is reflexiv...
enref 9047	Equinumerosity is reflexiv...
eqeng 9048	Equality implies equinumer...
domrefg 9049	Dominance is reflexive. (...
en2d 9050	Equinumerosity inference f...
en3d 9051	Equinumerosity inference f...
en2i 9052	Equinumerosity inference f...
en3i 9053	Equinumerosity inference f...
dom2lem 9054	A mapping (first hypothesi...
dom2d 9055	A mapping (first hypothesi...
dom3d 9056	A mapping (first hypothesi...
dom2 9057	A mapping (first hypothesi...
dom3 9058	A mapping (first hypothesi...
idssen 9059	Equality implies equinumer...
domssl 9060	If ` A ` is a subset of ` ...
domssr 9061	If ` C ` is a superset of ...
ssdomg 9062	A set dominates its subset...
ener 9063	Equinumerosity is an equiv...
ensymb 9064	Symmetry of equinumerosity...
ensym 9065	Symmetry of equinumerosity...
ensymi 9066	Symmetry of equinumerosity...
ensymd 9067	Symmetry of equinumerosity...
entr 9068	Transitivity of equinumero...
domtr 9069	Transitivity of dominance ...
entri 9070	A chained equinumerosity i...
entr2i 9071	A chained equinumerosity i...
entr3i 9072	A chained equinumerosity i...
entr4i 9073	A chained equinumerosity i...
endomtr 9074	Transitivity of equinumero...
domentr 9075	Transitivity of dominance ...
f1imaeng 9076	If a function is one-to-on...
f1imaen2g 9077	If a function is one-to-on...
f1imaen3g 9078	If a set function is one-t...
f1imaen 9079	If a function is one-to-on...
en0 9080	The empty set is equinumer...
en0OLD 9081	Obsolete version of ~ en0 ...
en0ALT 9082	Shorter proof of ~ en0 , d...
en0r 9083	The empty set is equinumer...
ensn1 9084	A singleton is equinumerou...
ensn1OLD 9085	Obsolete version of ~ ensn...
ensn1g 9086	A singleton is equinumerou...
enpr1g 9087	` { A , A } ` has only one...
en1 9088	A set is equinumerous to o...
en1OLD 9089	Obsolete version of ~ en1 ...
en1b 9090	A set is equinumerous to o...
en1bOLD 9091	Obsolete version of ~ en1b...
reuen1 9092	Two ways to express "exact...
euen1 9093	Two ways to express "exact...
euen1b 9094	Two ways to express " ` A ...
en1uniel 9095	A singleton contains its s...
en1unielOLD 9096	Obsolete version of ~ en1u...
2dom 9097	A set that dominates ordin...
fundmen 9098	A function is equinumerous...
fundmeng 9099	A function is equinumerous...
cnven 9100	A relational set is equinu...
cnvct 9101	If a set is countable, so ...
fndmeng 9102	A function is equinumerate...
mapsnend 9103	Set exponentiation to a si...
mapsnen 9104	Set exponentiation to a si...
snmapen 9105	Set exponentiation: a sing...
snmapen1 9106	Set exponentiation: a sing...
map1 9107	Set exponentiation: ordina...
en2sn 9108	Two singletons are equinum...
en2snOLD 9109	Obsolete version of ~ en2s...
0fi 9110	The empty set is finite. ...
snfi 9111	A singleton is finite. (C...
snfiOLD 9112	Obsolete version of ~ snfi...
fiprc 9113	The class of finite sets i...
unen 9114	Equinumerosity of union of...
enrefnn 9115	Equinumerosity is reflexiv...
en2prd 9116	Two unordered pairs are eq...
enpr2d 9117	A pair with distinct eleme...
enpr2dOLD 9118	Obsolete version of ~ enpr...
ssct 9119	Any subset of a countable ...
ssctOLD 9120	Obsolete version of ~ ssct...
difsnen 9121	All decrements of a set ar...
domdifsn 9122	Dominance over a set with ...
xpsnen 9123	A set is equinumerous to i...
xpsneng 9124	A set is equinumerous to i...
xp1en 9125	One times a cardinal numbe...
endisj 9126	Any two sets are equinumer...
undom 9127	Dominance law for union. ...
undomOLD 9128	Obsolete version of ~ undo...
xpcomf1o 9129	The canonical bijection fr...
xpcomco 9130	Composition with the bijec...
xpcomen 9131	Commutative law for equinu...
xpcomeng 9132	Commutative law for equinu...
xpsnen2g 9133	A set is equinumerous to i...
xpassen 9134	Associative law for equinu...
xpdom2 9135	Dominance law for Cartesia...
xpdom2g 9136	Dominance law for Cartesia...
xpdom1g 9137	Dominance law for Cartesia...
xpdom3 9138	A set is dominated by its ...
xpdom1 9139	Dominance law for Cartesia...
domunsncan 9140	A singleton cancellation l...
omxpenlem 9141	Lemma for ~ omxpen . (Con...
omxpen 9142	The cardinal and ordinal p...
omf1o 9143	Construct an explicit bije...
pw2f1olem 9144	Lemma for ~ pw2f1o . (Con...
pw2f1o 9145	The power set of a set is ...
pw2eng 9146	The power set of a set is ...
pw2en 9147	The power set of a set is ...
fopwdom 9148	Covering implies injection...
enfixsn 9149	Given two equipollent sets...
sucdom2OLD 9150	Obsolete version of ~ sucd...
sbthlem1 9151	Lemma for ~ sbth . (Contr...
sbthlem2 9152	Lemma for ~ sbth . (Contr...
sbthlem3 9153	Lemma for ~ sbth . (Contr...
sbthlem4 9154	Lemma for ~ sbth . (Contr...
sbthlem5 9155	Lemma for ~ sbth . (Contr...
sbthlem6 9156	Lemma for ~ sbth . (Contr...
sbthlem7 9157	Lemma for ~ sbth . (Contr...
sbthlem8 9158	Lemma for ~ sbth . (Contr...
sbthlem9 9159	Lemma for ~ sbth . (Contr...
sbthlem10 9160	Lemma for ~ sbth . (Contr...
sbth 9161	Schroeder-Bernstein Theore...
sbthb 9162	Schroeder-Bernstein Theore...
sbthcl 9163	Schroeder-Bernstein Theore...
dfsdom2 9164	Alternate definition of st...
brsdom2 9165	Alternate definition of st...
sdomnsym 9166	Strict dominance is asymme...
domnsym 9167	Theorem 22(i) of [Suppes] ...
0domg 9168	Any set dominates the empt...
0domgOLD 9169	Obsolete version of ~ 0dom...
dom0 9170	A set dominated by the emp...
dom0OLD 9171	Obsolete version of ~ dom0...
0sdomg 9172	A set strictly dominates t...
0sdomgOLD 9173	Obsolete version of ~ 0sdo...
0dom 9174	Any set dominates the empt...
0sdom 9175	A set strictly dominates t...
sdom0 9176	The empty set does not str...
sdom0OLD 9177	Obsolete version of ~ sdom...
sdomdomtr 9178	Transitivity of strict dom...
sdomentr 9179	Transitivity of strict dom...
domsdomtr 9180	Transitivity of dominance ...
ensdomtr 9181	Transitivity of equinumero...
sdomirr 9182	Strict dominance is irrefl...
sdomtr 9183	Strict dominance is transi...
sdomn2lp 9184	Strict dominance has no 2-...
enen1 9185	Equality-like theorem for ...
enen2 9186	Equality-like theorem for ...
domen1 9187	Equality-like theorem for ...
domen2 9188	Equality-like theorem for ...
sdomen1 9189	Equality-like theorem for ...
sdomen2 9190	Equality-like theorem for ...
domtriord 9191	Dominance is trichotomous ...
sdomel 9192	For ordinals, strict domin...
sdomdif 9193	The difference of a set fr...
onsdominel 9194	An ordinal with more eleme...
domunsn 9195	Dominance over a set with ...
fodomr 9196	There exists a mapping fro...
pwdom 9197	Injection of sets implies ...
canth2 9198	Cantor's Theorem. No set ...
canth2g 9199	Cantor's theorem with the ...
2pwuninel 9200	The power set of the power...
2pwne 9201	No set equals the power se...
disjen 9202	A stronger form of ~ pwuni...
disjenex 9203	Existence version of ~ dis...
domss2 9204	A corollary of ~ disjenex ...
domssex2 9205	A corollary of ~ disjenex ...
domssex 9206	Weakening of ~ domssex2 to...
xpf1o 9207	Construct a bijection on a...
xpen 9208	Equinumerosity law for Car...
mapen 9209	Two set exponentiations ar...
mapdom1 9210	Order-preserving property ...
mapxpen 9211	Equinumerosity law for dou...
xpmapenlem 9212	Lemma for ~ xpmapen . (Co...
xpmapen 9213	Equinumerosity law for set...
mapunen 9214	Equinumerosity law for set...
map2xp 9215	A cardinal power with expo...
mapdom2 9216	Order-preserving property ...
mapdom3 9217	Set exponentiation dominat...
pwen 9218	If two sets are equinumero...
ssenen 9219	Equinumerosity of equinume...
limenpsi 9220	A limit ordinal is equinum...
limensuci 9221	A limit ordinal is equinum...
limensuc 9222	A limit ordinal is equinum...
infensuc 9223	Any infinite ordinal is eq...
dif1enlem 9224	Lemma for ~ rexdif1en and ...
dif1enlemOLD 9225	Obsolete version of ~ dif1...
rexdif1en 9226	If a set is equinumerous t...
rexdif1enOLD 9227	Obsolete version of ~ rexd...
dif1en 9228	If a set ` A ` is equinume...
dif1ennn 9229	If a set ` A ` is equinume...
dif1enOLD 9230	Obsolete version of ~ dif1...
findcard 9231	Schema for induction on th...
findcard2 9232	Schema for induction on th...
findcard2s 9233	Variation of ~ findcard2 r...
findcard2d 9234	Deduction version of ~ fin...
nnfi 9235	Natural numbers are finite...
pssnn 9236	A proper subset of a natur...
ssnnfi 9237	A subset of a natural numb...
ssnnfiOLD 9238	Obsolete version of ~ ssnn...
0finOLD 9239	Obsolete version of ~ 0fi ...
unfi 9240	The union of two finite se...
unfid 9241	The union of two finite se...
ssfi 9242	A subset of a finite set i...
ssfiALT 9243	Shorter proof of ~ ssfi us...
diffi 9244	If ` A ` is finite, ` ( A ...
cnvfi 9245	If a set is finite, its co...
fnfi 9246	A version of ~ fnex for fi...
f1oenfi 9247	If the domain of a one-to-...
f1oenfirn 9248	If the range of a one-to-o...
f1domfi 9249	If the codomain of a one-t...
f1domfi2 9250	If the domain of a one-to-...
enreffi 9251	Equinumerosity is reflexiv...
ensymfib 9252	Symmetry of equinumerosity...
entrfil 9253	Transitivity of equinumero...
enfii 9254	A set equinumerous to a fi...
enfi 9255	Equinumerous sets have the...
enfiALT 9256	Shorter proof of ~ enfi us...
domfi 9257	A set dominated by a finit...
entrfi 9258	Transitivity of equinumero...
entrfir 9259	Transitivity of equinumero...
domtrfil 9260	Transitivity of dominance ...
domtrfi 9261	Transitivity of dominance ...
domtrfir 9262	Transitivity of dominance ...
f1imaenfi 9263	If a function is one-to-on...
ssdomfi 9264	A finite set dominates its...
ssdomfi2 9265	A set dominates its finite...
sbthfilem 9266	Lemma for ~ sbthfi . (Con...
sbthfi 9267	Schroeder-Bernstein Theore...
domnsymfi 9268	If a set dominates a finit...
sdomdomtrfi 9269	Transitivity of strict dom...
domsdomtrfi 9270	Transitivity of dominance ...
sucdom2 9271	Strict dominance of a set ...
phplem1 9272	Lemma for Pigeonhole Princ...
phplem2 9273	Lemma for Pigeonhole Princ...
nneneq 9274	Two equinumerous natural n...
php 9275	Pigeonhole Principle. A n...
php2 9276	Corollary of Pigeonhole Pr...
php3 9277	Corollary of Pigeonhole Pr...
php4 9278	Corollary of the Pigeonhol...
php5 9279	Corollary of the Pigeonhol...
phpeqd 9280	Corollary of the Pigeonhol...
nndomog 9281	Cardinal ordering agrees w...
phplem1OLD 9282	Obsolete lemma for ~ php a...
phplem2OLD 9283	Obsolete lemma for ~ php a...
phplem3OLD 9284	Obsolete version of ~ phpl...
phplem4OLD 9285	Obsolete version of ~ phpl...
nneneqOLD 9286	Obsolete version of ~ nnen...
phpOLD 9287	Obsolete version of ~ php ...
php2OLD 9288	Obsolete version of ~ php2...
php3OLD 9289	Obsolete version of ~ php3...
phpeqdOLD 9290	Obsolete version of ~ phpe...
nndomogOLD 9291	Obsolete version of ~ nndo...
snnen2oOLD 9292	Obsolete version of ~ snne...
onomeneq 9293	An ordinal number equinume...
onomeneqOLD 9294	Obsolete version of ~ onom...
onfin 9295	An ordinal number is finit...
onfin2 9296	A set is a natural number ...
nnfiOLD 9297	Obsolete version of ~ nnfi...
nndomo 9298	Cardinal ordering agrees w...
nnsdomo 9299	Cardinal ordering agrees w...
sucdom 9300	Strict dominance of a set ...
sucdomOLD 9301	Obsolete version of ~ sucd...
snnen2o 9302	A singleton ` { A } ` is n...
0sdom1dom 9303	Strict dominance over 0 is...
0sdom1domALT 9304	Alternate proof of ~ 0sdom...
1sdom2 9305	Ordinal 1 is strictly domi...
1sdom2ALT 9306	Alternate proof of ~ 1sdom...
sdom1 9307	A set has less than one me...
sdom1OLD 9308	Obsolete version of ~ sdom...
modom 9309	Two ways to express "at mo...
modom2 9310	Two ways to express "at mo...
rex2dom 9311	A set that has at least 2 ...
1sdom2dom 9312	Strict dominance over 1 is...
1sdom 9313	A set that strictly domina...
1sdomOLD 9314	Obsolete version of ~ 1sdo...
unxpdomlem1 9315	Lemma for ~ unxpdom . (Tr...
unxpdomlem2 9316	Lemma for ~ unxpdom . (Co...
unxpdomlem3 9317	Lemma for ~ unxpdom . (Co...
unxpdom 9318	Cartesian product dominate...
unxpdom2 9319	Corollary of ~ unxpdom . ...
sucxpdom 9320	Cartesian product dominate...
pssinf 9321	A set equinumerous to a pr...
fisseneq 9322	A finite set is equal to i...
ominf 9323	The set of natural numbers...
ominfOLD 9324	Obsolete version of ~ omin...
isinf 9325	Any set that is not finite...
isinfOLD 9326	Obsolete version of ~ isin...
fineqvlem 9327	Lemma for ~ fineqv . (Con...
fineqv 9328	If the Axiom of Infinity i...
enfiiOLD 9329	Obsolete version of ~ enfi...
xpfir 9330	The components of a nonemp...
ssfid 9331	A subset of a finite set i...
infi 9332	The intersection of two se...
rabfi 9333	A restricted class built f...
finresfin 9334	The restriction of a finit...
f1finf1o 9335	Any injection from one fin...
f1finf1oOLD 9336	Obsolete version of ~ f1fi...
nfielex 9337	If a class is not finite, ...
en1eqsn 9338	A set with one element is ...
en1eqsnOLD 9339	Obsolete version of ~ en1e...
en1eqsnbi 9340	A set containing an elemen...
dif1ennnALT 9341	Alternate proof of ~ dif1e...
enp1ilem 9342	Lemma for uses of ~ enp1i ...
enp1i 9343	Proof induction for ~ en2 ...
enp1iOLD 9344	Obsolete version of ~ enp1...
en2 9345	A set equinumerous to ordi...
en3 9346	A set equinumerous to ordi...
en4 9347	A set equinumerous to ordi...
findcard3 9348	Schema for strong inductio...
findcard3OLD 9349	Obsolete version of ~ find...
ac6sfi 9350	A version of ~ ac6s for fi...
frfi 9351	A partial order is well-fo...
fimax2g 9352	A finite set has a maximum...
fimaxg 9353	A finite set has a maximum...
fisupg 9354	Lemma showing existence an...
wofi 9355	A total order on a finite ...
ordunifi 9356	The maximum of a finite co...
nnunifi 9357	The union (supremum) of a ...
unblem1 9358	Lemma for ~ unbnn . After...
unblem2 9359	Lemma for ~ unbnn . The v...
unblem3 9360	Lemma for ~ unbnn . The v...
unblem4 9361	Lemma for ~ unbnn . The f...
unbnn 9362	Any unbounded subset of na...
unbnn2 9363	Version of ~ unbnn that do...
isfinite2 9364	Any set strictly dominated...
nnsdomg 9365	Omega strictly dominates a...
nnsdomgOLD 9366	Obsolete version of ~ nnsd...
isfiniteg 9367	A set is finite iff it is ...
infsdomnn 9368	An infinite set strictly d...
infsdomnnOLD 9369	Obsolete version of ~ infs...
infn0 9370	An infinite set is not emp...
infn0ALT 9371	Shorter proof of ~ infn0 u...
fin2inf 9372	This (useless) theorem, wh...
unfilem1 9373	Lemma for proving that the...
unfilem2 9374	Lemma for proving that the...
unfilem3 9375	Lemma for proving that the...
unfir 9376	If a union is finite, the ...
unfib 9377	A union is finite if and o...
unfi2 9378	The union of two finite se...
difinf 9379	An infinite set ` A ` minu...
fodomfi 9380	An onto function implies d...
fofi 9381	If an onto function has a ...
f1fi 9382	If a 1-to-1 function has a...
imafi 9383	Images of finite sets are ...
imafiOLD 9384	Obsolete version of ~ imaf...
pwfir 9385	If the power set of a set ...
pwfilem 9386	Lemma for ~ pwfi . (Contr...
pwfi 9387	The power set of a finite ...
xpfi 9388	The Cartesian product of t...
xpfiOLD 9389	Obsolete version of ~ xpfi...
3xpfi 9390	The Cartesian product of t...
domunfican 9391	A finite set union cancell...
infcntss 9392	Every infinite set has a d...
prfi 9393	An unordered pair is finit...
prfiALT 9394	Shorter proof of ~ prfi us...
tpfi 9395	An unordered triple is fin...
fiint 9396	Equivalent ways of stating...
fiintOLD 9397	Obsolete version of ~ fiin...
fodomfir 9398	There exists a mapping fro...
fodomfib 9399	Equivalence of an onto map...
fodomfiOLD 9400	Obsolete version of ~ fodo...
fodomfibOLD 9401	Obsolete version of ~ fodo...
fofinf1o 9402	Any surjection from one fi...
rneqdmfinf1o 9403	Any function from a finite...
fidomdm 9404	Any finite set dominates i...
dmfi 9405	The domain of a finite set...
fundmfibi 9406	A function is finite if an...
resfnfinfin 9407	The restriction of a funct...
residfi 9408	A restricted identity func...
cnvfiALT 9409	Shorter proof of ~ cnvfi u...
rnfi 9410	The range of a finite set ...
f1dmvrnfibi 9411	A one-to-one function whos...
f1vrnfibi 9412	A one-to-one function whic...
iunfi 9413	The finite union of finite...
unifi 9414	The finite union of finite...
unifi2 9415	The finite union of finite...
infssuni 9416	If an infinite set ` A ` i...
unirnffid 9417	The union of the range of ...
pwfilemOLD 9418	Obsolete version of ~ pwfi...
pwfiOLD 9419	Obsolete version of ~ pwfi...
mapfi 9420	Set exponentiation of fini...
ixpfi 9421	A Cartesian product of fin...
ixpfi2 9422	A Cartesian product of fin...
mptfi 9423	A finite mapping set is fi...
abrexfi 9424	An image set from a finite...
cnvimamptfin 9425	A preimage of a mapping wi...
elfpw 9426	Membership in a class of f...
unifpw 9427	A set is the union of its ...
f1opwfi 9428	A one-to-one mapping induc...
fissuni 9429	A finite subset of a union...
fipreima 9430	Given a finite subset ` A ...
finsschain 9431	A finite subset of the uni...
indexfi 9432	If for every element of a ...
relfsupp 9435	The property of a function...
relprcnfsupp 9436	A proper class is never fi...
isfsupp 9437	The property of a class to...
isfsuppd 9438	Deduction form of ~ isfsup...
funisfsupp 9439	The property of a function...
fsuppimp 9440	Implications of a class be...
fsuppimpd 9441	A finitely supported funct...
fsuppfund 9442	A finitely supported funct...
fisuppfi 9443	A function on a finite set...
fidmfisupp 9444	A function with a finite d...
fdmfisuppfi 9445	The support of a function ...
fdmfifsupp 9446	A function with a finite d...
fsuppmptdm 9447	A mapping with a finite do...
fndmfisuppfi 9448	The support of a function ...
fndmfifsupp 9449	A function with a finite d...
suppeqfsuppbi 9450	If two functions have the ...
suppssfifsupp 9451	If the support of a functi...
fsuppsssupp 9452	If the support of a functi...
fsuppsssuppgd 9453	If the support of a functi...
fsuppss 9454	A subset of a finitely sup...
fsuppssov1 9455	Formula building theorem f...
fsuppxpfi 9456	The cartesian product of t...
fczfsuppd 9457	A constant function with v...
fsuppun 9458	The union of two finitely ...
fsuppunfi 9459	The union of the support o...
fsuppunbi 9460	If the union of two classe...
0fsupp 9461	The empty set is a finitel...
snopfsupp 9462	A singleton containing an ...
funsnfsupp 9463	Finite support for a funct...
fsuppres 9464	The restriction of a finit...
fmptssfisupp 9465	The restriction of a mappi...
ressuppfi 9466	If the support of the rest...
resfsupp 9467	If the restriction of a fu...
resfifsupp 9468	The restriction of a funct...
ffsuppbi 9469	Two ways of saying that a ...
fsuppmptif 9470	A function mapping an argu...
sniffsupp 9471	A function mapping all but...
fsuppcolem 9472	Lemma for ~ fsuppco . For...
fsuppco 9473	The composition of a 1-1 f...
fsuppco2 9474	The composition of a funct...
fsuppcor 9475	The composition of a funct...
mapfienlem1 9476	Lemma 1 for ~ mapfien . (...
mapfienlem2 9477	Lemma 2 for ~ mapfien . (...
mapfienlem3 9478	Lemma 3 for ~ mapfien . (...
mapfien 9479	A bijection of the base se...
mapfien2 9480	Equinumerousity relation f...
fival 9483	The set of all the finite ...
elfi 9484	Specific properties of an ...
elfi2 9485	The empty intersection nee...
elfir 9486	Sufficient condition for a...
intrnfi 9487	Sufficient condition for t...
iinfi 9488	An indexed intersection of...
inelfi 9489	The intersection of two se...
ssfii 9490	Any element of a set ` A `...
fi0 9491	The set of finite intersec...
fieq0 9492	A set is empty iff the cla...
fiin 9493	The elements of ` ( fi `` ...
dffi2 9494	The set of finite intersec...
fiss 9495	Subset relationship for fu...
inficl 9496	A set which is closed unde...
fipwuni 9497	The set of finite intersec...
fisn 9498	A singleton is closed unde...
fiuni 9499	The union of the finite in...
fipwss 9500	If a set is a family of su...
elfiun 9501	A finite intersection of e...
dffi3 9502	The set of finite intersec...
fifo 9503	Describe a surjection from...
marypha1lem 9504	Core induction for Philip ...
marypha1 9505	(Philip) Hall's marriage t...
marypha2lem1 9506	Lemma for ~ marypha2 . Pr...
marypha2lem2 9507	Lemma for ~ marypha2 . Pr...
marypha2lem3 9508	Lemma for ~ marypha2 . Pr...
marypha2lem4 9509	Lemma for ~ marypha2 . Pr...
marypha2 9510	Version of ~ marypha1 usin...
dfsup2 9515	Quantifier-free definition...
supeq1 9516	Equality theorem for supre...
supeq1d 9517	Equality deduction for sup...
supeq1i 9518	Equality inference for sup...
supeq2 9519	Equality theorem for supre...
supeq3 9520	Equality theorem for supre...
supeq123d 9521	Equality deduction for sup...
nfsup 9522	Hypothesis builder for sup...
supmo 9523	Any class ` B ` has at mos...
supexd 9524	A supremum is a set. (Con...
supeu 9525	A supremum is unique. Sim...
supval2 9526	Alternate expression for t...
eqsup 9527	Sufficient condition for a...
eqsupd 9528	Sufficient condition for a...
supcl 9529	A supremum belongs to its ...
supub 9530	A supremum is an upper bou...
suplub 9531	A supremum is the least up...
suplub2 9532	Bidirectional form of ~ su...
supnub 9533	An upper bound is not less...
supex 9534	A supremum is a set. (Con...
sup00 9535	The supremum under an empt...
sup0riota 9536	The supremum of an empty s...
sup0 9537	The supremum of an empty s...
supmax 9538	The greatest element of a ...
fisup2g 9539	A finite set satisfies the...
fisupcl 9540	A nonempty finite set cont...
supgtoreq 9541	The supremum of a finite s...
suppr 9542	The supremum of a pair. (...
supsn 9543	The supremum of a singleto...
supisolem 9544	Lemma for ~ supiso . (Con...
supisoex 9545	Lemma for ~ supiso . (Con...
supiso 9546	Image of a supremum under ...
infeq1 9547	Equality theorem for infim...
infeq1d 9548	Equality deduction for inf...
infeq1i 9549	Equality inference for inf...
infeq2 9550	Equality theorem for infim...
infeq3 9551	Equality theorem for infim...
infeq123d 9552	Equality deduction for inf...
nfinf 9553	Hypothesis builder for inf...
infexd 9554	An infimum is a set. (Con...
eqinf 9555	Sufficient condition for a...
eqinfd 9556	Sufficient condition for a...
infval 9557	Alternate expression for t...
infcllem 9558	Lemma for ~ infcl , ~ infl...
infcl 9559	An infimum belongs to its ...
inflb 9560	An infimum is a lower boun...
infglb 9561	An infimum is the greatest...
infglbb 9562	Bidirectional form of ~ in...
infnlb 9563	A lower bound is not great...
infex 9564	An infimum is a set. (Con...
infmin 9565	The smallest element of a ...
infmo 9566	Any class ` B ` has at mos...
infeu 9567	An infimum is unique. (Co...
fimin2g 9568	A finite set has a minimum...
fiming 9569	A finite set has a minimum...
fiinfg 9570	Lemma showing existence an...
fiinf2g 9571	A finite set satisfies the...
fiinfcl 9572	A nonempty finite set cont...
infltoreq 9573	The infimum of a finite se...
infpr 9574	The infimum of a pair. (C...
infsupprpr 9575	The infimum of a proper pa...
infsn 9576	The infimum of a singleton...
inf00 9577	The infimum regarding an e...
infempty 9578	The infimum of an empty se...
infiso 9579	Image of an infimum under ...
dfoi 9582	Rewrite ~ df-oi with abbre...
oieq1 9583	Equality theorem for ordin...
oieq2 9584	Equality theorem for ordin...
nfoi 9585	Hypothesis builder for ord...
ordiso2 9586	Generalize ~ ordiso to pro...
ordiso 9587	Order-isomorphic ordinal n...
ordtypecbv 9588	Lemma for ~ ordtype . (Co...
ordtypelem1 9589	Lemma for ~ ordtype . (Co...
ordtypelem2 9590	Lemma for ~ ordtype . (Co...
ordtypelem3 9591	Lemma for ~ ordtype . (Co...
ordtypelem4 9592	Lemma for ~ ordtype . (Co...
ordtypelem5 9593	Lemma for ~ ordtype . (Co...
ordtypelem6 9594	Lemma for ~ ordtype . (Co...
ordtypelem7 9595	Lemma for ~ ordtype . ` ra...
ordtypelem8 9596	Lemma for ~ ordtype . (Co...
ordtypelem9 9597	Lemma for ~ ordtype . Eit...
ordtypelem10 9598	Lemma for ~ ordtype . Usi...
oi0 9599	Definition of the ordinal ...
oicl 9600	The order type of the well...
oif 9601	The order isomorphism of t...
oiiso2 9602	The order isomorphism of t...
ordtype 9603	For any set-like well-orde...
oiiniseg 9604	` ran F ` is an initial se...
ordtype2 9605	For any set-like well-orde...
oiexg 9606	The order isomorphism on a...
oion 9607	The order type of the well...
oiiso 9608	The order isomorphism of t...
oien 9609	The order type of a well-o...
oieu 9610	Uniqueness of the unique o...
oismo 9611	When ` A ` is a subclass o...
oiid 9612	The order type of an ordin...
hartogslem1 9613	Lemma for ~ hartogs . (Co...
hartogslem2 9614	Lemma for ~ hartogs . (Co...
hartogs 9615	The class of ordinals domi...
wofib 9616	The only sets which are we...
wemaplem1 9617	Value of the lexicographic...
wemaplem2 9618	Lemma for ~ wemapso . Tra...
wemaplem3 9619	Lemma for ~ wemapso . Tra...
wemappo 9620	Construct lexicographic or...
wemapsolem 9621	Lemma for ~ wemapso . (Co...
wemapso 9622	Construct lexicographic or...
wemapso2lem 9623	Lemma for ~ wemapso2 . (C...
wemapso2 9624	An alternative to having a...
card2on 9625	The alternate definition o...
card2inf 9626	The alternate definition o...
harf 9629	Functionality of the Harto...
harcl 9630	Values of the Hartogs func...
harval 9631	Function value of the Hart...
elharval 9632	The Hartogs number of a se...
harndom 9633	The Hartogs number of a se...
harword 9634	Weak ordering property of ...
relwdom 9637	Weak dominance is a relati...
brwdom 9638	Property of weak dominance...
brwdomi 9639	Property of weak dominance...
brwdomn0 9640	Weak dominance over nonemp...
0wdom 9641	Any set weakly dominates t...
fowdom 9642	An onto function implies w...
wdomref 9643	Reflexivity of weak domina...
brwdom2 9644	Alternate characterization...
domwdom 9645	Weak dominance is implied ...
wdomtr 9646	Transitivity of weak domin...
wdomen1 9647	Equality-like theorem for ...
wdomen2 9648	Equality-like theorem for ...
wdompwdom 9649	Weak dominance strengthens...
canthwdom 9650	Cantor's Theorem, stated u...
wdom2d 9651	Deduce weak dominance from...
wdomd 9652	Deduce weak dominance from...
brwdom3 9653	Condition for weak dominan...
brwdom3i 9654	Weak dominance implies exi...
unwdomg 9655	Weak dominance of a (disjo...
xpwdomg 9656	Weak dominance of a Cartes...
wdomima2g 9657	A set is weakly dominant o...
wdomimag 9658	A set is weakly dominant o...
unxpwdom2 9659	Lemma for ~ unxpwdom . (C...
unxpwdom 9660	If a Cartesian product is ...
ixpiunwdom 9661	Describe an onto function ...
harwdom 9662	The value of the Hartogs f...
axreg2 9664	Axiom of Regularity expres...
zfregcl 9665	The Axiom of Regularity wi...
zfreg 9666	The Axiom of Regularity us...
elirrv 9667	The membership relation is...
elirr 9668	No class is a member of it...
elneq 9669	A class is not equal to an...
nelaneq 9670	A class is not an element ...
epinid0 9671	The membership relation an...
sucprcreg 9672	A class is equal to its su...
ruv 9673	The Russell class is equal...
ruALT 9674	Alternate proof of ~ ru , ...
disjcsn 9675	A class is disjoint from i...
zfregfr 9676	The membership relation is...
en2lp 9677	No class has 2-cycle membe...
elnanel 9678	Two classes are not elemen...
cnvepnep 9679	The membership (epsilon) r...
epnsym 9680	The membership (epsilon) r...
elnotel 9681	A class cannot be an eleme...
elnel 9682	A class cannot be an eleme...
en3lplem1 9683	Lemma for ~ en3lp . (Cont...
en3lplem2 9684	Lemma for ~ en3lp . (Cont...
en3lp 9685	No class has 3-cycle membe...
preleqg 9686	Equality of two unordered ...
preleq 9687	Equality of two unordered ...
preleqALT 9688	Alternate proof of ~ prele...
opthreg 9689	Theorem for alternate repr...
suc11reg 9690	The successor operation be...
dford2 9691	Assuming ~ ax-reg , an ord...
inf0 9692	Existence of ` _om ` impli...
inf1 9693	Variation of Axiom of Infi...
inf2 9694	Variation of Axiom of Infi...
inf3lema 9695	Lemma for our Axiom of Inf...
inf3lemb 9696	Lemma for our Axiom of Inf...
inf3lemc 9697	Lemma for our Axiom of Inf...
inf3lemd 9698	Lemma for our Axiom of Inf...
inf3lem1 9699	Lemma for our Axiom of Inf...
inf3lem2 9700	Lemma for our Axiom of Inf...
inf3lem3 9701	Lemma for our Axiom of Inf...
inf3lem4 9702	Lemma for our Axiom of Inf...
inf3lem5 9703	Lemma for our Axiom of Inf...
inf3lem6 9704	Lemma for our Axiom of Inf...
inf3lem7 9705	Lemma for our Axiom of Inf...
inf3 9706	Our Axiom of Infinity ~ ax...
infeq5i 9707	Half of ~ infeq5 . (Contr...
infeq5 9708	The statement "there exist...
zfinf 9710	Axiom of Infinity expresse...
axinf2 9711	A standard version of Axio...
zfinf2 9713	A standard version of the ...
omex 9714	The existence of omega (th...
axinf 9715	The first version of the A...
inf5 9716	The statement "there exist...
omelon 9717	Omega is an ordinal number...
dfom3 9718	The class of natural numbe...
elom3 9719	A simplification of ~ elom...
dfom4 9720	A simplification of ~ df-o...
dfom5 9721	` _om ` is the smallest li...
oancom 9722	Ordinal addition is not co...
isfinite 9723	A set is finite iff it is ...
fict 9724	A finite set is countable ...
nnsdom 9725	A natural number is strict...
omenps 9726	Omega is equinumerous to a...
omensuc 9727	The set of natural numbers...
infdifsn 9728	Removing a singleton from ...
infdiffi 9729	Removing a finite set from...
unbnn3 9730	Any unbounded subset of na...
noinfep 9731	Using the Axiom of Regular...
cantnffval 9734	The value of the Cantor no...
cantnfdm 9735	The domain of the Cantor n...
cantnfvalf 9736	Lemma for ~ cantnf . The ...
cantnfs 9737	Elementhood in the set of ...
cantnfcl 9738	Basic properties of the or...
cantnfval 9739	The value of the Cantor no...
cantnfval2 9740	Alternate expression for t...
cantnfsuc 9741	The value of the recursive...
cantnfle 9742	A lower bound on the ` CNF...
cantnflt 9743	An upper bound on the part...
cantnflt2 9744	An upper bound on the ` CN...
cantnff 9745	The ` CNF ` function is a ...
cantnf0 9746	The value of the zero func...
cantnfrescl 9747	A function is finitely sup...
cantnfres 9748	The ` CNF ` function respe...
cantnfp1lem1 9749	Lemma for ~ cantnfp1 . (C...
cantnfp1lem2 9750	Lemma for ~ cantnfp1 . (C...
cantnfp1lem3 9751	Lemma for ~ cantnfp1 . (C...
cantnfp1 9752	If ` F ` is created by add...
oemapso 9753	The relation ` T ` is a st...
oemapval 9754	Value of the relation ` T ...
oemapvali 9755	If ` F < G ` , then there ...
cantnflem1a 9756	Lemma for ~ cantnf . (Con...
cantnflem1b 9757	Lemma for ~ cantnf . (Con...
cantnflem1c 9758	Lemma for ~ cantnf . (Con...
cantnflem1d 9759	Lemma for ~ cantnf . (Con...
cantnflem1 9760	Lemma for ~ cantnf . This...
cantnflem2 9761	Lemma for ~ cantnf . (Con...
cantnflem3 9762	Lemma for ~ cantnf . Here...
cantnflem4 9763	Lemma for ~ cantnf . Comp...
cantnf 9764	The Cantor Normal Form the...
oemapwe 9765	The lexicographic order on...
cantnffval2 9766	An alternate definition of...
cantnff1o 9767	Simplify the isomorphism o...
wemapwe 9768	Construct lexicographic or...
oef1o 9769	A bijection of the base se...
cnfcomlem 9770	Lemma for ~ cnfcom . (Con...
cnfcom 9771	Any ordinal ` B ` is equin...
cnfcom2lem 9772	Lemma for ~ cnfcom2 . (Co...
cnfcom2 9773	Any nonzero ordinal ` B ` ...
cnfcom3lem 9774	Lemma for ~ cnfcom3 . (Co...
cnfcom3 9775	Any infinite ordinal ` B `...
cnfcom3clem 9776	Lemma for ~ cnfcom3c . (C...
cnfcom3c 9777	Wrap the construction of ~...
ttrcleq 9780	Equality theorem for trans...
nfttrcld 9781	Bound variable hypothesis ...
nfttrcl 9782	Bound variable hypothesis ...
relttrcl 9783	The transitive closure of ...
brttrcl 9784	Characterization of elemen...
brttrcl2 9785	Characterization of elemen...
ssttrcl 9786	If ` R ` is a relation, th...
ttrcltr 9787	The transitive closure of ...
ttrclresv 9788	The transitive closure of ...
ttrclco 9789	Composition law for the tr...
cottrcl 9790	Composition law for the tr...
ttrclss 9791	If ` R ` is a subclass of ...
dmttrcl 9792	The domain of a transitive...
rnttrcl 9793	The range of a transitive ...
ttrclexg 9794	If ` R ` is a set, then so...
dfttrcl2 9795	When ` R ` is a set and a ...
ttrclselem1 9796	Lemma for ~ ttrclse . Sho...
ttrclselem2 9797	Lemma for ~ ttrclse . Sho...
ttrclse 9798	If ` R ` is set-like over ...
trcl 9799	For any set ` A ` , show t...
tz9.1 9800	Every set has a transitive...
tz9.1c 9801	Alternate expression for t...
epfrs 9802	The strong form of the Axi...
zfregs 9803	The strong form of the Axi...
zfregs2 9804	Alternate strong form of t...
setind 9805	Set (epsilon) induction. ...
setind2 9806	Set (epsilon) induction, s...
tcvalg 9809	Value of the transitive cl...
tcid 9810	Defining property of the t...
tctr 9811	Defining property of the t...
tcmin 9812	Defining property of the t...
tc2 9813	A variant of the definitio...
tcsni 9814	The transitive closure of ...
tcss 9815	The transitive closure fun...
tcel 9816	The transitive closure fun...
tcidm 9817	The transitive closure fun...
tc0 9818	The transitive closure of ...
tc00 9819	The transitive closure is ...
frmin 9820	Every (possibly proper) su...
frind 9821	A subclass of a well-found...
frinsg 9822	Well-Founded Induction Sch...
frins 9823	Well-Founded Induction Sch...
frins2f 9824	Well-Founded Induction sch...
frins2 9825	Well-Founded Induction sch...
frins3 9826	Well-Founded Induction sch...
frr3g 9827	Functions defined by well-...
frrlem15 9828	Lemma for general well-fou...
frrlem16 9829	Lemma for general well-fou...
frr1 9830	Law of general well-founde...
frr2 9831	Law of general well-founde...
frr3 9832	Law of general well-founde...
r1funlim 9837	The cumulative hierarchy o...
r1fnon 9838	The cumulative hierarchy o...
r10 9839	Value of the cumulative hi...
r1sucg 9840	Value of the cumulative hi...
r1suc 9841	Value of the cumulative hi...
r1limg 9842	Value of the cumulative hi...
r1lim 9843	Value of the cumulative hi...
r1fin 9844	The first ` _om ` levels o...
r1sdom 9845	Each stage in the cumulati...
r111 9846	The cumulative hierarchy i...
r1tr 9847	The cumulative hierarchy o...
r1tr2 9848	The union of a cumulative ...
r1ordg 9849	Ordering relation for the ...
r1ord3g 9850	Ordering relation for the ...
r1ord 9851	Ordering relation for the ...
r1ord2 9852	Ordering relation for the ...
r1ord3 9853	Ordering relation for the ...
r1sssuc 9854	The value of the cumulativ...
r1pwss 9855	Each set of the cumulative...
r1sscl 9856	Each set of the cumulative...
r1val1 9857	The value of the cumulativ...
tz9.12lem1 9858	Lemma for ~ tz9.12 . (Con...
tz9.12lem2 9859	Lemma for ~ tz9.12 . (Con...
tz9.12lem3 9860	Lemma for ~ tz9.12 . (Con...
tz9.12 9861	A set is well-founded if a...
tz9.13 9862	Every set is well-founded,...
tz9.13g 9863	Every set is well-founded,...
rankwflemb 9864	Two ways of saying a set i...
rankf 9865	The domain and codomain of...
rankon 9866	The rank of a set is an or...
r1elwf 9867	Any member of the cumulati...
rankvalb 9868	Value of the rank function...
rankr1ai 9869	One direction of ~ rankr1a...
rankvaln 9870	Value of the rank function...
rankidb 9871	Identity law for the rank ...
rankdmr1 9872	A rank is a member of the ...
rankr1ag 9873	A version of ~ rankr1a tha...
rankr1bg 9874	A relationship between ran...
r1rankidb 9875	Any set is a subset of the...
r1elssi 9876	The range of the ` R1 ` fu...
r1elss 9877	The range of the ` R1 ` fu...
pwwf 9878	A power set is well-founde...
sswf 9879	A subset of a well-founded...
snwf 9880	A singleton is well-founde...
unwf 9881	A binary union is well-fou...
prwf 9882	An unordered pair is well-...
opwf 9883	An ordered pair is well-fo...
unir1 9884	The cumulative hierarchy o...
jech9.3 9885	Every set belongs to some ...
rankwflem 9886	Every set is well-founded,...
rankval 9887	Value of the rank function...
rankvalg 9888	Value of the rank function...
rankval2 9889	Value of an alternate defi...
uniwf 9890	A union is well-founded if...
rankr1clem 9891	Lemma for ~ rankr1c . (Co...
rankr1c 9892	A relationship between the...
rankidn 9893	A relationship between the...
rankpwi 9894	The rank of a power set. ...
rankelb 9895	The membership relation is...
wfelirr 9896	A well-founded set is not ...
rankval3b 9897	The value of the rank func...
ranksnb 9898	The rank of a singleton. ...
rankonidlem 9899	Lemma for ~ rankonid . (C...
rankonid 9900	The rank of an ordinal num...
onwf 9901	The ordinals are all well-...
onssr1 9902	Initial segments of the or...
rankr1g 9903	A relationship between the...
rankid 9904	Identity law for the rank ...
rankr1 9905	A relationship between the...
ssrankr1 9906	A relationship between an ...
rankr1a 9907	A relationship between ran...
r1val2 9908	The value of the cumulativ...
r1val3 9909	The value of the cumulativ...
rankel 9910	The membership relation is...
rankval3 9911	The value of the rank func...
bndrank 9912	Any class whose elements h...
unbndrank 9913	The elements of a proper c...
rankpw 9914	The rank of a power set. ...
ranklim 9915	The rank of a set belongs ...
r1pw 9916	A stronger property of ` R...
r1pwALT 9917	Alternate shorter proof of...
r1pwcl 9918	The cumulative hierarchy o...
rankssb 9919	The subset relation is inh...
rankss 9920	The subset relation is inh...
rankunb 9921	The rank of the union of t...
rankprb 9922	The rank of an unordered p...
rankopb 9923	The rank of an ordered pai...
rankuni2b 9924	The value of the rank func...
ranksn 9925	The rank of a singleton. ...
rankuni2 9926	The rank of a union. Part...
rankun 9927	The rank of the union of t...
rankpr 9928	The rank of an unordered p...
rankop 9929	The rank of an ordered pai...
r1rankid 9930	Any set is a subset of the...
rankeq0b 9931	A set is empty iff its ran...
rankeq0 9932	A set is empty iff its ran...
rankr1id 9933	The rank of the hierarchy ...
rankuni 9934	The rank of a union. Part...
rankr1b 9935	A relationship between ran...
ranksuc 9936	The rank of a successor. ...
rankuniss 9937	Upper bound of the rank of...
rankval4 9938	The rank of a set is the s...
rankbnd 9939	The rank of a set is bound...
rankbnd2 9940	The rank of a set is bound...
rankc1 9941	A relationship that can be...
rankc2 9942	A relationship that can be...
rankelun 9943	Rank membership is inherit...
rankelpr 9944	Rank membership is inherit...
rankelop 9945	Rank membership is inherit...
rankxpl 9946	A lower bound on the rank ...
rankxpu 9947	An upper bound on the rank...
rankfu 9948	An upper bound on the rank...
rankmapu 9949	An upper bound on the rank...
rankxplim 9950	The rank of a Cartesian pr...
rankxplim2 9951	If the rank of a Cartesian...
rankxplim3 9952	The rank of a Cartesian pr...
rankxpsuc 9953	The rank of a Cartesian pr...
tcwf 9954	The transitive closure fun...
tcrank 9955	This theorem expresses two...
scottex 9956	Scott's trick collects all...
scott0 9957	Scott's trick collects all...
scottexs 9958	Theorem scheme version of ...
scott0s 9959	Theorem scheme version of ...
cplem1 9960	Lemma for the Collection P...
cplem2 9961	Lemma for the Collection P...
cp 9962	Collection Principle. Thi...
bnd 9963	A very strong generalizati...
bnd2 9964	A variant of the Boundedne...
kardex 9965	The collection of all sets...
karden 9966	If we allow the Axiom of R...
htalem 9967	Lemma for defining an emul...
hta 9968	A ZFC emulation of Hilbert...
djueq12 9975	Equality theorem for disjo...
djueq1 9976	Equality theorem for disjo...
djueq2 9977	Equality theorem for disjo...
nfdju 9978	Bound-variable hypothesis ...
djuex 9979	The disjoint union of sets...
djuexb 9980	The disjoint union of two ...
djulcl 9981	Left closure of disjoint u...
djurcl 9982	Right closure of disjoint ...
djulf1o 9983	The left injection functio...
djurf1o 9984	The right injection functi...
inlresf 9985	The left injection restric...
inlresf1 9986	The left injection restric...
inrresf 9987	The right injection restri...
inrresf1 9988	The right injection restri...
djuin 9989	The images of any classes ...
djur 9990	A member of a disjoint uni...
djuss 9991	A disjoint union is a subc...
djuunxp 9992	The union of a disjoint un...
djuexALT 9993	Alternate proof of ~ djuex...
eldju1st 9994	The first component of an ...
eldju2ndl 9995	The second component of an...
eldju2ndr 9996	The second component of an...
djuun 9997	The disjoint union of two ...
1stinl 9998	The first component of the...
2ndinl 9999	The second component of th...
1stinr 10000	The first component of the...
2ndinr 10001	The second component of th...
updjudhf 10002	The mapping of an element ...
updjudhcoinlf 10003	The composition of the map...
updjudhcoinrg 10004	The composition of the map...
updjud 10005	Universal property of the ...
cardf2 10014	The cardinality function i...
cardon 10015	The cardinal number of a s...
isnum2 10016	A way to express well-orde...
isnumi 10017	A set equinumerous to an o...
ennum 10018	Equinumerous sets are equi...
finnum 10019	Every finite set is numera...
onenon 10020	Every ordinal number is nu...
tskwe 10021	A Tarski set is well-order...
xpnum 10022	The cartesian product of n...
cardval3 10023	An alternate definition of...
cardid2 10024	Any numerable set is equin...
isnum3 10025	A set is numerable iff it ...
oncardval 10026	The value of the cardinal ...
oncardid 10027	Any ordinal number is equi...
cardonle 10028	The cardinal of an ordinal...
card0 10029	The cardinality of the emp...
cardidm 10030	The cardinality function i...
oncard 10031	A set is a cardinal number...
ficardom 10032	The cardinal number of a f...
ficardid 10033	A finite set is equinumero...
cardnn 10034	The cardinality of a natur...
cardnueq0 10035	The empty set is the only ...
cardne 10036	No member of a cardinal nu...
carden2a 10037	If two sets have equal non...
carden2b 10038	If two sets are equinumero...
card1 10039	A set has cardinality one ...
cardsn 10040	A singleton has cardinalit...
carddomi2 10041	Two sets have the dominanc...
sdomsdomcardi 10042	A set strictly dominates i...
cardlim 10043	An infinite cardinal is a ...
cardsdomelir 10044	A cardinal strictly domina...
cardsdomel 10045	A cardinal strictly domina...
iscard 10046	Two ways to express the pr...
iscard2 10047	Two ways to express the pr...
carddom2 10048	Two numerable sets have th...
harcard 10049	The class of ordinal numbe...
cardprclem 10050	Lemma for ~ cardprc . (Co...
cardprc 10051	The class of all cardinal ...
carduni 10052	The union of a set of card...
cardiun 10053	The indexed union of a set...
cardennn 10054	If ` A ` is equinumerous t...
cardsucinf 10055	The cardinality of the suc...
cardsucnn 10056	The cardinality of the suc...
cardom 10057	The set of natural numbers...
carden2 10058	Two numerable sets are equ...
cardsdom2 10059	A numerable set is strictl...
domtri2 10060	Trichotomy of dominance fo...
nnsdomel 10061	Strict dominance and eleme...
cardval2 10062	An alternate version of th...
isinffi 10063	An infinite set contains s...
fidomtri 10064	Trichotomy of dominance wi...
fidomtri2 10065	Trichotomy of dominance wi...
harsdom 10066	The Hartogs number of a we...
onsdom 10067	Any well-orderable set is ...
harval2 10068	An alternate expression fo...
harsucnn 10069	The next cardinal after a ...
cardmin2 10070	The smallest ordinal that ...
pm54.43lem 10071	In Theorem *54.43 of [Whit...
pm54.43 10072	Theorem *54.43 of [Whitehe...
enpr2 10073	An unordered pair with dis...
pr2nelemOLD 10074	Obsolete version of ~ enpr...
pr2ne 10075	If an unordered pair has t...
pr2neOLD 10076	Obsolete version of ~ pr2n...
prdom2 10077	An unordered pair has at m...
en2eqpr 10078	Building a set with two el...
en2eleq 10079	Express a set of pair card...
en2other2 10080	Taking the other element t...
dif1card 10081	The cardinality of a nonem...
leweon 10082	Lexicographical order is a...
r0weon 10083	A set-like well-ordering o...
infxpenlem 10084	Lemma for ~ infxpen . (Co...
infxpen 10085	Every infinite ordinal is ...
xpomen 10086	The Cartesian product of o...
xpct 10087	The cartesian product of t...
infxpidm2 10088	Every infinite well-ordera...
infxpenc 10089	A canonical version of ~ i...
infxpenc2lem1 10090	Lemma for ~ infxpenc2 . (...
infxpenc2lem2 10091	Lemma for ~ infxpenc2 . (...
infxpenc2lem3 10092	Lemma for ~ infxpenc2 . (...
infxpenc2 10093	Existence form of ~ infxpe...
iunmapdisj 10094	The union ` U_ n e. C ( A ...
fseqenlem1 10095	Lemma for ~ fseqen . (Con...
fseqenlem2 10096	Lemma for ~ fseqen . (Con...
fseqdom 10097	One half of ~ fseqen . (C...
fseqen 10098	A set that is equinumerous...
infpwfidom 10099	The collection of finite s...
dfac8alem 10100	Lemma for ~ dfac8a . If t...
dfac8a 10101	Numeration theorem: every ...
dfac8b 10102	The well-ordering theorem:...
dfac8clem 10103	Lemma for ~ dfac8c . (Con...
dfac8c 10104	If the union of a set is w...
ac10ct 10105	A proof of the well-orderi...
ween 10106	A set is numerable iff it ...
ac5num 10107	A version of ~ ac5b with t...
ondomen 10108	If a set is dominated by a...
numdom 10109	A set dominated by a numer...
ssnum 10110	A subset of a numerable se...
onssnum 10111	All subsets of the ordinal...
indcardi 10112	Indirect strong induction ...
acnrcl 10113	Reverse closure for the ch...
acneq 10114	Equality theorem for the c...
isacn 10115	The property of being a ch...
acni 10116	The property of being a ch...
acni2 10117	The property of being a ch...
acni3 10118	The property of being a ch...
acnlem 10119	Construct a mapping satisf...
numacn 10120	A well-orderable set has c...
finacn 10121	Every set has finite choic...
acndom 10122	A set with long choice seq...
acnnum 10123	A set ` X ` which has choi...
acnen 10124	The class of choice sets o...
acndom2 10125	A set smaller than one wit...
acnen2 10126	The class of sets with cho...
fodomacn 10127	A version of ~ fodom that ...
fodomnum 10128	A version of ~ fodom that ...
fonum 10129	A surjection maps numerabl...
numwdom 10130	A surjection maps numerabl...
fodomfi2 10131	Onto functions define domi...
wdomfil 10132	Weak dominance agrees with...
infpwfien 10133	Any infinite well-orderabl...
inffien 10134	The set of finite intersec...
wdomnumr 10135	Weak dominance agrees with...
alephfnon 10136	The aleph function is a fu...
aleph0 10137	The first infinite cardina...
alephlim 10138	Value of the aleph functio...
alephsuc 10139	Value of the aleph functio...
alephon 10140	An aleph is an ordinal num...
alephcard 10141	Every aleph is a cardinal ...
alephnbtwn 10142	No cardinal can be sandwic...
alephnbtwn2 10143	No set has equinumerosity ...
alephordilem1 10144	Lemma for ~ alephordi . (...
alephordi 10145	Strict ordering property o...
alephord 10146	Ordering property of the a...
alephord2 10147	Ordering property of the a...
alephord2i 10148	Ordering property of the a...
alephord3 10149	Ordering property of the a...
alephsucdom 10150	A set dominated by an alep...
alephsuc2 10151	An alternate representatio...
alephdom 10152	Relationship between inclu...
alephgeom 10153	Every aleph is greater tha...
alephislim 10154	Every aleph is a limit ord...
aleph11 10155	The aleph function is one-...
alephf1 10156	The aleph function is a on...
alephsdom 10157	If an ordinal is smaller t...
alephdom2 10158	A dominated initial ordina...
alephle 10159	The argument of the aleph ...
cardaleph 10160	Given any transfinite card...
cardalephex 10161	Every transfinite cardinal...
infenaleph 10162	An infinite numerable set ...
isinfcard 10163	Two ways to express the pr...
iscard3 10164	Two ways to express the pr...
cardnum 10165	Two ways to express the cl...
alephinit 10166	An infinite initial ordina...
carduniima 10167	The union of the image of ...
cardinfima 10168	If a mapping to cardinals ...
alephiso 10169	Aleph is an order isomorph...
alephprc 10170	The class of all transfini...
alephsson 10171	The class of transfinite c...
unialeph 10172	The union of the class of ...
alephsmo 10173	The aleph function is stri...
alephf1ALT 10174	Alternate proof of ~ aleph...
alephfplem1 10175	Lemma for ~ alephfp . (Co...
alephfplem2 10176	Lemma for ~ alephfp . (Co...
alephfplem3 10177	Lemma for ~ alephfp . (Co...
alephfplem4 10178	Lemma for ~ alephfp . (Co...
alephfp 10179	The aleph function has a f...
alephfp2 10180	The aleph function has at ...
alephval3 10181	An alternate way to expres...
alephsucpw2 10182	The power set of an aleph ...
mappwen 10183	Power rule for cardinal ar...
finnisoeu 10184	A finite totally ordered s...
iunfictbso 10185	Countability of a countabl...
aceq1 10188	Equivalence of two version...
aceq0 10189	Equivalence of two version...
aceq2 10190	Equivalence of two version...
aceq3lem 10191	Lemma for ~ dfac3 . (Cont...
dfac3 10192	Equivalence of two version...
dfac4 10193	Equivalence of two version...
dfac5lem1 10194	Lemma for ~ dfac5 . (Cont...
dfac5lem2 10195	Lemma for ~ dfac5 . (Cont...
dfac5lem3 10196	Lemma for ~ dfac5 . (Cont...
dfac5lem4 10197	Lemma for ~ dfac5 . (Cont...
dfac5lem5 10198	Lemma for ~ dfac5 . (Cont...
dfac5lem4OLD 10199	Obsolete version of ~ dfac...
dfac5 10200	Equivalence of two version...
dfac2a 10201	Our Axiom of Choice (in th...
dfac2b 10202	Axiom of Choice (first for...
dfac2 10203	Axiom of Choice (first for...
dfac7 10204	Equivalence of the Axiom o...
dfac0 10205	Equivalence of two version...
dfac1 10206	Equivalence of two version...
dfac8 10207	A proof of the equivalency...
dfac9 10208	Equivalence of the axiom o...
dfac10 10209	Axiom of Choice equivalent...
dfac10c 10210	Axiom of Choice equivalent...
dfac10b 10211	Axiom of Choice equivalent...
acacni 10212	A choice equivalent: every...
dfacacn 10213	A choice equivalent: every...
dfac13 10214	The axiom of choice holds ...
dfac12lem1 10215	Lemma for ~ dfac12 . (Con...
dfac12lem2 10216	Lemma for ~ dfac12 . (Con...
dfac12lem3 10217	Lemma for ~ dfac12 . (Con...
dfac12r 10218	The axiom of choice holds ...
dfac12k 10219	Equivalence of ~ dfac12 an...
dfac12a 10220	The axiom of choice holds ...
dfac12 10221	The axiom of choice holds ...
kmlem1 10222	Lemma for 5-quantifier AC ...
kmlem2 10223	Lemma for 5-quantifier AC ...
kmlem3 10224	Lemma for 5-quantifier AC ...
kmlem4 10225	Lemma for 5-quantifier AC ...
kmlem5 10226	Lemma for 5-quantifier AC ...
kmlem6 10227	Lemma for 5-quantifier AC ...
kmlem7 10228	Lemma for 5-quantifier AC ...
kmlem8 10229	Lemma for 5-quantifier AC ...
kmlem9 10230	Lemma for 5-quantifier AC ...
kmlem10 10231	Lemma for 5-quantifier AC ...
kmlem11 10232	Lemma for 5-quantifier AC ...
kmlem12 10233	Lemma for 5-quantifier AC ...
kmlem13 10234	Lemma for 5-quantifier AC ...
kmlem14 10235	Lemma for 5-quantifier AC ...
kmlem15 10236	Lemma for 5-quantifier AC ...
kmlem16 10237	Lemma for 5-quantifier AC ...
dfackm 10238	Equivalence of the Axiom o...
undjudom 10239	Cardinal addition dominate...
endjudisj 10240	Equinumerosity of a disjoi...
djuen 10241	Disjoint unions of equinum...
djuenun 10242	Disjoint union is equinume...
dju1en 10243	Cardinal addition with car...
dju1dif 10244	Adding and subtracting one...
dju1p1e2 10245	1+1=2 for cardinal number ...
dju1p1e2ALT 10246	Alternate proof of ~ dju1p...
dju0en 10247	Cardinal addition with car...
xp2dju 10248	Two times a cardinal numbe...
djucomen 10249	Commutative law for cardin...
djuassen 10250	Associative law for cardin...
xpdjuen 10251	Cardinal multiplication di...
mapdjuen 10252	Sum of exponents law for c...
pwdjuen 10253	Sum of exponents law for c...
djudom1 10254	Ordering law for cardinal ...
djudom2 10255	Ordering law for cardinal ...
djudoml 10256	A set is dominated by its ...
djuxpdom 10257	Cartesian product dominate...
djufi 10258	The disjoint union of two ...
cdainflem 10259	Any partition of omega int...
djuinf 10260	A set is infinite iff the ...
infdju1 10261	An infinite set is equinum...
pwdju1 10262	The sum of a powerset with...
pwdjuidm 10263	If the natural numbers inj...
djulepw 10264	If ` A ` is idempotent und...
onadju 10265	The cardinal and ordinal s...
cardadju 10266	The cardinal sum is equinu...
djunum 10267	The disjoint union of two ...
unnum 10268	The union of two numerable...
nnadju 10269	The cardinal and ordinal s...
nnadjuALT 10270	Shorter proof of ~ nnadju ...
ficardadju 10271	The disjoint union of fini...
ficardun 10272	The cardinality of the uni...
ficardun2 10273	The cardinality of the uni...
pwsdompw 10274	Lemma for ~ domtriom . Th...
unctb 10275	The union of two countable...
infdjuabs 10276	Absorption law for additio...
infunabs 10277	An infinite set is equinum...
infdju 10278	The sum of two cardinal nu...
infdif 10279	The cardinality of an infi...
infdif2 10280	Cardinality ordering for a...
infxpdom 10281	Dominance law for multipli...
infxpabs 10282	Absorption law for multipl...
infunsdom1 10283	The union of two sets that...
infunsdom 10284	The union of two sets that...
infxp 10285	Absorption law for multipl...
pwdjudom 10286	A property of dominance ov...
infpss 10287	Every infinite set has an ...
infmap2 10288	An exponentiation law for ...
ackbij2lem1 10289	Lemma for ~ ackbij2 . (Co...
ackbij1lem1 10290	Lemma for ~ ackbij2 . (Co...
ackbij1lem2 10291	Lemma for ~ ackbij2 . (Co...
ackbij1lem3 10292	Lemma for ~ ackbij2 . (Co...
ackbij1lem4 10293	Lemma for ~ ackbij2 . (Co...
ackbij1lem5 10294	Lemma for ~ ackbij2 . (Co...
ackbij1lem6 10295	Lemma for ~ ackbij2 . (Co...
ackbij1lem7 10296	Lemma for ~ ackbij1 . (Co...
ackbij1lem8 10297	Lemma for ~ ackbij1 . (Co...
ackbij1lem9 10298	Lemma for ~ ackbij1 . (Co...
ackbij1lem10 10299	Lemma for ~ ackbij1 . (Co...
ackbij1lem11 10300	Lemma for ~ ackbij1 . (Co...
ackbij1lem12 10301	Lemma for ~ ackbij1 . (Co...
ackbij1lem13 10302	Lemma for ~ ackbij1 . (Co...
ackbij1lem14 10303	Lemma for ~ ackbij1 . (Co...
ackbij1lem15 10304	Lemma for ~ ackbij1 . (Co...
ackbij1lem16 10305	Lemma for ~ ackbij1 . (Co...
ackbij1lem17 10306	Lemma for ~ ackbij1 . (Co...
ackbij1lem18 10307	Lemma for ~ ackbij1 . (Co...
ackbij1 10308	The Ackermann bijection, p...
ackbij1b 10309	The Ackermann bijection, p...
ackbij2lem2 10310	Lemma for ~ ackbij2 . (Co...
ackbij2lem3 10311	Lemma for ~ ackbij2 . (Co...
ackbij2lem4 10312	Lemma for ~ ackbij2 . (Co...
ackbij2 10313	The Ackermann bijection, p...
r1om 10314	The set of hereditarily fi...
fictb 10315	A set is countable iff its...
cflem 10316	A lemma used to simplify c...
cflemOLD 10317	Obsolete version of ~ cfle...
cfval 10318	Value of the cofinality fu...
cff 10319	Cofinality is a function o...
cfub 10320	An upper bound on cofinali...
cflm 10321	Value of the cofinality fu...
cf0 10322	Value of the cofinality fu...
cardcf 10323	Cofinality is a cardinal n...
cflecard 10324	Cofinality is bounded by t...
cfle 10325	Cofinality is bounded by i...
cfon 10326	The cofinality of any set ...
cfeq0 10327	Only the ordinal zero has ...
cfsuc 10328	Value of the cofinality fu...
cff1 10329	There is always a map from...
cfflb 10330	If there is a cofinal map ...
cfval2 10331	Another expression for the...
coflim 10332	A simpler expression for t...
cflim3 10333	Another expression for the...
cflim2 10334	The cofinality function is...
cfom 10335	Value of the cofinality fu...
cfss 10336	There is a cofinal subset ...
cfslb 10337	Any cofinal subset of ` A ...
cfslbn 10338	Any subset of ` A ` smalle...
cfslb2n 10339	Any small collection of sm...
cofsmo 10340	Any cofinal map implies th...
cfsmolem 10341	Lemma for ~ cfsmo . (Cont...
cfsmo 10342	The map in ~ cff1 can be a...
cfcoflem 10343	Lemma for ~ cfcof , showin...
coftr 10344	If there is a cofinal map ...
cfcof 10345	If there is a cofinal map ...
cfidm 10346	The cofinality function is...
alephsing 10347	The cofinality of a limit ...
sornom 10348	The range of a single-step...
isfin1a 10363	Definition of a Ia-finite ...
fin1ai 10364	Property of a Ia-finite se...
isfin2 10365	Definition of a II-finite ...
fin2i 10366	Property of a II-finite se...
isfin3 10367	Definition of a III-finite...
isfin4 10368	Definition of a IV-finite ...
fin4i 10369	Infer that a set is IV-inf...
isfin5 10370	Definition of a V-finite s...
isfin6 10371	Definition of a VI-finite ...
isfin7 10372	Definition of a VII-finite...
sdom2en01 10373	A set with less than two e...
infpssrlem1 10374	Lemma for ~ infpssr . (Co...
infpssrlem2 10375	Lemma for ~ infpssr . (Co...
infpssrlem3 10376	Lemma for ~ infpssr . (Co...
infpssrlem4 10377	Lemma for ~ infpssr . (Co...
infpssrlem5 10378	Lemma for ~ infpssr . (Co...
infpssr 10379	Dedekind infinity implies ...
fin4en1 10380	Dedekind finite is a cardi...
ssfin4 10381	Dedekind finite sets have ...
domfin4 10382	A set dominated by a Dedek...
ominf4 10383	` _om ` is Dedekind infini...
infpssALT 10384	Alternate proof of ~ infps...
isfin4-2 10385	Alternate definition of IV...
isfin4p1 10386	Alternate definition of IV...
fin23lem7 10387	Lemma for ~ isfin2-2 . Th...
fin23lem11 10388	Lemma for ~ isfin2-2 . (C...
fin2i2 10389	A II-finite set contains m...
isfin2-2 10390	` Fin2 ` expressed in term...
ssfin2 10391	A subset of a II-finite se...
enfin2i 10392	II-finiteness is a cardina...
fin23lem24 10393	Lemma for ~ fin23 . In a ...
fincssdom 10394	In a chain of finite sets,...
fin23lem25 10395	Lemma for ~ fin23 . In a ...
fin23lem26 10396	Lemma for ~ fin23lem22 . ...
fin23lem23 10397	Lemma for ~ fin23lem22 . ...
fin23lem22 10398	Lemma for ~ fin23 but coul...
fin23lem27 10399	The mapping constructed in...
isfin3ds 10400	Property of a III-finite s...
ssfin3ds 10401	A subset of a III-finite s...
fin23lem12 10402	The beginning of the proof...
fin23lem13 10403	Lemma for ~ fin23 . Each ...
fin23lem14 10404	Lemma for ~ fin23 . ` U ` ...
fin23lem15 10405	Lemma for ~ fin23 . ` U ` ...
fin23lem16 10406	Lemma for ~ fin23 . ` U ` ...
fin23lem19 10407	Lemma for ~ fin23 . The f...
fin23lem20 10408	Lemma for ~ fin23 . ` X ` ...
fin23lem17 10409	Lemma for ~ fin23 . By ? ...
fin23lem21 10410	Lemma for ~ fin23 . ` X ` ...
fin23lem28 10411	Lemma for ~ fin23 . The r...
fin23lem29 10412	Lemma for ~ fin23 . The r...
fin23lem30 10413	Lemma for ~ fin23 . The r...
fin23lem31 10414	Lemma for ~ fin23 . The r...
fin23lem32 10415	Lemma for ~ fin23 . Wrap ...
fin23lem33 10416	Lemma for ~ fin23 . Disch...
fin23lem34 10417	Lemma for ~ fin23 . Estab...
fin23lem35 10418	Lemma for ~ fin23 . Stric...
fin23lem36 10419	Lemma for ~ fin23 . Weak ...
fin23lem38 10420	Lemma for ~ fin23 . The c...
fin23lem39 10421	Lemma for ~ fin23 . Thus,...
fin23lem40 10422	Lemma for ~ fin23 . ` Fin2...
fin23lem41 10423	Lemma for ~ fin23 . A set...
isf32lem1 10424	Lemma for ~ isfin3-2 . De...
isf32lem2 10425	Lemma for ~ isfin3-2 . No...
isf32lem3 10426	Lemma for ~ isfin3-2 . Be...
isf32lem4 10427	Lemma for ~ isfin3-2 . Be...
isf32lem5 10428	Lemma for ~ isfin3-2 . Th...
isf32lem6 10429	Lemma for ~ isfin3-2 . Ea...
isf32lem7 10430	Lemma for ~ isfin3-2 . Di...
isf32lem8 10431	Lemma for ~ isfin3-2 . K ...
isf32lem9 10432	Lemma for ~ isfin3-2 . Co...
isf32lem10 10433	Lemma for isfin3-2 . Writ...
isf32lem11 10434	Lemma for ~ isfin3-2 . Re...
isf32lem12 10435	Lemma for ~ isfin3-2 . (C...
isfin32i 10436	One half of ~ isfin3-2 . ...
isf33lem 10437	Lemma for ~ isfin3-3 . (C...
isfin3-2 10438	Weakly Dedekind-infinite s...
isfin3-3 10439	Weakly Dedekind-infinite s...
fin33i 10440	Inference from ~ isfin3-3 ...
compsscnvlem 10441	Lemma for ~ compsscnv . (...
compsscnv 10442	Complementation on a power...
isf34lem1 10443	Lemma for ~ isfin3-4 . (C...
isf34lem2 10444	Lemma for ~ isfin3-4 . (C...
compssiso 10445	Complementation is an anti...
isf34lem3 10446	Lemma for ~ isfin3-4 . (C...
compss 10447	Express image under of the...
isf34lem4 10448	Lemma for ~ isfin3-4 . (C...
isf34lem5 10449	Lemma for ~ isfin3-4 . (C...
isf34lem7 10450	Lemma for ~ isfin3-4 . (C...
isf34lem6 10451	Lemma for ~ isfin3-4 . (C...
fin34i 10452	Inference from ~ isfin3-4 ...
isfin3-4 10453	Weakly Dedekind-infinite s...
fin11a 10454	Every I-finite set is Ia-f...
enfin1ai 10455	Ia-finiteness is a cardina...
isfin1-2 10456	A set is finite in the usu...
isfin1-3 10457	A set is I-finite iff ever...
isfin1-4 10458	A set is I-finite iff ever...
dffin1-5 10459	Compact quantifier-free ve...
fin23 10460	Every II-finite set (every...
fin34 10461	Every III-finite set is IV...
isfin5-2 10462	Alternate definition of V-...
fin45 10463	Every IV-finite set is V-f...
fin56 10464	Every V-finite set is VI-f...
fin17 10465	Every I-finite set is VII-...
fin67 10466	Every VI-finite set is VII...
isfin7-2 10467	A set is VII-finite iff it...
fin71num 10468	A well-orderable set is VI...
dffin7-2 10469	Class form of ~ isfin7-2 ....
dfacfin7 10470	Axiom of Choice equivalent...
fin1a2lem1 10471	Lemma for ~ fin1a2 . (Con...
fin1a2lem2 10472	Lemma for ~ fin1a2 . The ...
fin1a2lem3 10473	Lemma for ~ fin1a2 . (Con...
fin1a2lem4 10474	Lemma for ~ fin1a2 . (Con...
fin1a2lem5 10475	Lemma for ~ fin1a2 . (Con...
fin1a2lem6 10476	Lemma for ~ fin1a2 . Esta...
fin1a2lem7 10477	Lemma for ~ fin1a2 . Spli...
fin1a2lem8 10478	Lemma for ~ fin1a2 . Spli...
fin1a2lem9 10479	Lemma for ~ fin1a2 . In a...
fin1a2lem10 10480	Lemma for ~ fin1a2 . A no...
fin1a2lem11 10481	Lemma for ~ fin1a2 . (Con...
fin1a2lem12 10482	Lemma for ~ fin1a2 . (Con...
fin1a2lem13 10483	Lemma for ~ fin1a2 . (Con...
fin12 10484	Weak theorem which skips I...
fin1a2s 10485	An II-infinite set can hav...
fin1a2 10486	Every Ia-finite set is II-...
itunifval 10487	Function value of iterated...
itunifn 10488	Functionality of the itera...
ituni0 10489	A zero-fold iterated union...
itunisuc 10490	Successor iterated union. ...
itunitc1 10491	Each union iterate is a me...
itunitc 10492	The union of all union ite...
ituniiun 10493	Unwrap an iterated union f...
hsmexlem7 10494	Lemma for ~ hsmex . Prope...
hsmexlem8 10495	Lemma for ~ hsmex . Prope...
hsmexlem9 10496	Lemma for ~ hsmex . Prope...
hsmexlem1 10497	Lemma for ~ hsmex . Bound...
hsmexlem2 10498	Lemma for ~ hsmex . Bound...
hsmexlem3 10499	Lemma for ~ hsmex . Clear...
hsmexlem4 10500	Lemma for ~ hsmex . The c...
hsmexlem5 10501	Lemma for ~ hsmex . Combi...
hsmexlem6 10502	Lemma for ~ hsmex . (Cont...
hsmex 10503	The collection of heredita...
hsmex2 10504	The set of hereditary size...
hsmex3 10505	The set of hereditary size...
axcc2lem 10507	Lemma for ~ axcc2 . (Cont...
axcc2 10508	A possibly more useful ver...
axcc3 10509	A possibly more useful ver...
axcc4 10510	A version of ~ axcc3 that ...
acncc 10511	An ~ ax-cc equivalent: eve...
axcc4dom 10512	Relax the constraint on ~ ...
domtriomlem 10513	Lemma for ~ domtriom . (C...
domtriom 10514	Trichotomy of equinumerosi...
fin41 10515	Under countable choice, th...
dominf 10516	A nonempty set that is a s...
dcomex 10518	The Axiom of Dependent Cho...
axdc2lem 10519	Lemma for ~ axdc2 . We co...
axdc2 10520	An apparent strengthening ...
axdc3lem 10521	The class ` S ` of finite ...
axdc3lem2 10522	Lemma for ~ axdc3 . We ha...
axdc3lem3 10523	Simple substitution lemma ...
axdc3lem4 10524	Lemma for ~ axdc3 . We ha...
axdc3 10525	Dependent Choice. Axiom D...
axdc4lem 10526	Lemma for ~ axdc4 . (Cont...
axdc4 10527	A more general version of ...
axcclem 10528	Lemma for ~ axcc . (Contr...
axcc 10529	Although CC can be proven ...
zfac 10531	Axiom of Choice expressed ...
ac2 10532	Axiom of Choice equivalent...
ac3 10533	Axiom of Choice using abbr...
axac3 10535	This theorem asserts that ...
ackm 10536	A remarkable equivalent to...
axac2 10537	Derive ~ ax-ac2 from ~ ax-...
axac 10538	Derive ~ ax-ac from ~ ax-a...
axaci 10539	Apply a choice equivalent....
cardeqv 10540	All sets are well-orderabl...
numth3 10541	All sets are well-orderabl...
numth2 10542	Numeration theorem: any se...
numth 10543	Numeration theorem: every ...
ac7 10544	An Axiom of Choice equival...
ac7g 10545	An Axiom of Choice equival...
ac4 10546	Equivalent of Axiom of Cho...
ac4c 10547	Equivalent of Axiom of Cho...
ac5 10548	An Axiom of Choice equival...
ac5b 10549	Equivalent of Axiom of Cho...
ac6num 10550	A version of ~ ac6 which t...
ac6 10551	Equivalent of Axiom of Cho...
ac6c4 10552	Equivalent of Axiom of Cho...
ac6c5 10553	Equivalent of Axiom of Cho...
ac9 10554	An Axiom of Choice equival...
ac6s 10555	Equivalent of Axiom of Cho...
ac6n 10556	Equivalent of Axiom of Cho...
ac6s2 10557	Generalization of the Axio...
ac6s3 10558	Generalization of the Axio...
ac6sg 10559	~ ac6s with sethood as ant...
ac6sf 10560	Version of ~ ac6 with boun...
ac6s4 10561	Generalization of the Axio...
ac6s5 10562	Generalization of the Axio...
ac8 10563	An Axiom of Choice equival...
ac9s 10564	An Axiom of Choice equival...
numthcor 10565	Any set is strictly domina...
weth 10566	Well-ordering theorem: any...
zorn2lem1 10567	Lemma for ~ zorn2 . (Cont...
zorn2lem2 10568	Lemma for ~ zorn2 . (Cont...
zorn2lem3 10569	Lemma for ~ zorn2 . (Cont...
zorn2lem4 10570	Lemma for ~ zorn2 . (Cont...
zorn2lem5 10571	Lemma for ~ zorn2 . (Cont...
zorn2lem6 10572	Lemma for ~ zorn2 . (Cont...
zorn2lem7 10573	Lemma for ~ zorn2 . (Cont...
zorn2g 10574	Zorn's Lemma of [Monk1] p....
zorng 10575	Zorn's Lemma. If the unio...
zornn0g 10576	Variant of Zorn's lemma ~ ...
zorn2 10577	Zorn's Lemma of [Monk1] p....
zorn 10578	Zorn's Lemma. If the unio...
zornn0 10579	Variant of Zorn's lemma ~ ...
ttukeylem1 10580	Lemma for ~ ttukey . Expa...
ttukeylem2 10581	Lemma for ~ ttukey . A pr...
ttukeylem3 10582	Lemma for ~ ttukey . (Con...
ttukeylem4 10583	Lemma for ~ ttukey . (Con...
ttukeylem5 10584	Lemma for ~ ttukey . The ...
ttukeylem6 10585	Lemma for ~ ttukey . (Con...
ttukeylem7 10586	Lemma for ~ ttukey . (Con...
ttukey2g 10587	The Teichmüller-Tukey...
ttukeyg 10588	The Teichmüller-Tukey...
ttukey 10589	The Teichmüller-Tukey...
axdclem 10590	Lemma for ~ axdc . (Contr...
axdclem2 10591	Lemma for ~ axdc . Using ...
axdc 10592	This theorem derives ~ ax-...
fodomg 10593	An onto function implies d...
fodom 10594	An onto function implies d...
dmct 10595	The domain of a countable ...
rnct 10596	The range of a countable s...
fodomb 10597	Equivalence of an onto map...
wdomac 10598	When assuming AC, weak and...
brdom3 10599	Equivalence to a dominance...
brdom5 10600	An equivalence to a domina...
brdom4 10601	An equivalence to a domina...
brdom7disj 10602	An equivalence to a domina...
brdom6disj 10603	An equivalence to a domina...
fin71ac 10604	Once we allow AC, the "str...
imadomg 10605	An image of a function und...
fimact 10606	The image by a function of...
fnrndomg 10607	The range of a function is...
fnct 10608	If the domain of a functio...
mptct 10609	A countable mapping set is...
iunfo 10610	Existence of an onto funct...
iundom2g 10611	An upper bound for the car...
iundomg 10612	An upper bound for the car...
iundom 10613	An upper bound for the car...
unidom 10614	An upper bound for the car...
uniimadom 10615	An upper bound for the car...
uniimadomf 10616	An upper bound for the car...
cardval 10617	The value of the cardinal ...
cardid 10618	Any set is equinumerous to...
cardidg 10619	Any set is equinumerous to...
cardidd 10620	Any set is equinumerous to...
cardf 10621	The cardinality function i...
carden 10622	Two sets are equinumerous ...
cardeq0 10623	Only the empty set has car...
unsnen 10624	Equinumerosity of a set wi...
carddom 10625	Two sets have the dominanc...
cardsdom 10626	Two sets have the strict d...
domtri 10627	Trichotomy law for dominan...
entric 10628	Trichotomy of equinumerosi...
entri2 10629	Trichotomy of dominance an...
entri3 10630	Trichotomy of dominance. ...
sdomsdomcard 10631	A set strictly dominates i...
canth3 10632	Cantor's theorem in terms ...
infxpidm 10633	Every infinite class is eq...
ondomon 10634	The class of ordinals domi...
cardmin 10635	The smallest ordinal that ...
ficard 10636	A set is finite iff its ca...
infinf 10637	Equivalence between two in...
unirnfdomd 10638	The union of the range of ...
konigthlem 10639	Lemma for ~ konigth . (Co...
konigth 10640	Konig's Theorem. If ` m (...
alephsucpw 10641	The power set of an aleph ...
aleph1 10642	The set exponentiation of ...
alephval2 10643	An alternate way to expres...
dominfac 10644	A nonempty set that is a s...
iunctb 10645	The countable union of cou...
unictb 10646	The countable union of cou...
infmap 10647	An exponentiation law for ...
alephadd 10648	The sum of two alephs is t...
alephmul 10649	The product of two alephs ...
alephexp1 10650	An exponentiation law for ...
alephsuc3 10651	An alternate representatio...
alephexp2 10652	An expression equinumerous...
alephreg 10653	A successor aleph is regul...
pwcfsdom 10654	A corollary of Konig's The...
cfpwsdom 10655	A corollary of Konig's The...
alephom 10656	From ~ canth2 , we know th...
smobeth 10657	The beth function is stric...
nd1 10658	A lemma for proving condit...
nd2 10659	A lemma for proving condit...
nd3 10660	A lemma for proving condit...
nd4 10661	A lemma for proving condit...
axextnd 10662	A version of the Axiom of ...
axrepndlem1 10663	Lemma for the Axiom of Rep...
axrepndlem2 10664	Lemma for the Axiom of Rep...
axrepnd 10665	A version of the Axiom of ...
axunndlem1 10666	Lemma for the Axiom of Uni...
axunnd 10667	A version of the Axiom of ...
axpowndlem1 10668	Lemma for the Axiom of Pow...
axpowndlem2 10669	Lemma for the Axiom of Pow...
axpowndlem3 10670	Lemma for the Axiom of Pow...
axpowndlem4 10671	Lemma for the Axiom of Pow...
axpownd 10672	A version of the Axiom of ...
axregndlem1 10673	Lemma for the Axiom of Reg...
axregndlem2 10674	Lemma for the Axiom of Reg...
axregnd 10675	A version of the Axiom of ...
axinfndlem1 10676	Lemma for the Axiom of Inf...
axinfnd 10677	A version of the Axiom of ...
axacndlem1 10678	Lemma for the Axiom of Cho...
axacndlem2 10679	Lemma for the Axiom of Cho...
axacndlem3 10680	Lemma for the Axiom of Cho...
axacndlem4 10681	Lemma for the Axiom of Cho...
axacndlem5 10682	Lemma for the Axiom of Cho...
axacnd 10683	A version of the Axiom of ...
zfcndext 10684	Axiom of Extensionality ~ ...
zfcndrep 10685	Axiom of Replacement ~ ax-...
zfcndun 10686	Axiom of Union ~ ax-un , r...
zfcndpow 10687	Axiom of Power Sets ~ ax-p...
zfcndreg 10688	Axiom of Regularity ~ ax-r...
zfcndinf 10689	Axiom of Infinity ~ ax-inf...
zfcndac 10690	Axiom of Choice ~ ax-ac , ...
elgch 10693	Elementhood in the collect...
fingch 10694	A finite set is a GCH-set....
gchi 10695	The only GCH-sets which ha...
gchen1 10696	If ` A <_ B < ~P A ` , and...
gchen2 10697	If ` A < B <_ ~P A ` , and...
gchor 10698	If ` A <_ B <_ ~P A ` , an...
engch 10699	The property of being a GC...
gchdomtri 10700	Under certain conditions, ...
fpwwe2cbv 10701	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem1 10702	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem2 10703	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem3 10704	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem4 10705	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem5 10706	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem6 10707	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem7 10708	Lemma for ~ fpwwe2 . Show...
fpwwe2lem8 10709	Lemma for ~ fpwwe2 . Give...
fpwwe2lem9 10710	Lemma for ~ fpwwe2 . Give...
fpwwe2lem10 10711	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem11 10712	Lemma for ~ fpwwe2 . (Con...
fpwwe2lem12 10713	Lemma for ~ fpwwe2 . (Con...
fpwwe2 10714	Given any function ` F ` f...
fpwwecbv 10715	Lemma for ~ fpwwe . (Cont...
fpwwelem 10716	Lemma for ~ fpwwe . (Cont...
fpwwe 10717	Given any function ` F ` f...
canth4 10718	An "effective" form of Can...
canthnumlem 10719	Lemma for ~ canthnum . (C...
canthnum 10720	The set of well-orderable ...
canthwelem 10721	Lemma for ~ canthwe . (Co...
canthwe 10722	The set of well-orders of ...
canthp1lem1 10723	Lemma for ~ canthp1 . (Co...
canthp1lem2 10724	Lemma for ~ canthp1 . (Co...
canthp1 10725	A slightly stronger form o...
finngch 10726	The exclusion of finite se...
gchdju1 10727	An infinite GCH-set is ide...
gchinf 10728	An infinite GCH-set is Ded...
pwfseqlem1 10729	Lemma for ~ pwfseq . Deri...
pwfseqlem2 10730	Lemma for ~ pwfseq . (Con...
pwfseqlem3 10731	Lemma for ~ pwfseq . Usin...
pwfseqlem4a 10732	Lemma for ~ pwfseqlem4 . ...
pwfseqlem4 10733	Lemma for ~ pwfseq . Deri...
pwfseqlem5 10734	Lemma for ~ pwfseq . Alth...
pwfseq 10735	The powerset of a Dedekind...
pwxpndom2 10736	The powerset of a Dedekind...
pwxpndom 10737	The powerset of a Dedekind...
pwdjundom 10738	The powerset of a Dedekind...
gchdjuidm 10739	An infinite GCH-set is ide...
gchxpidm 10740	An infinite GCH-set is ide...
gchpwdom 10741	A relationship between dom...
gchaleph 10742	If ` ( aleph `` A ) ` is a...
gchaleph2 10743	If ` ( aleph `` A ) ` and ...
hargch 10744	If ` A + ~~ ~P A ` , then ...
alephgch 10745	If ` ( aleph `` suc A ) ` ...
gch2 10746	It is sufficient to requir...
gch3 10747	An equivalent formulation ...
gch-kn 10748	The equivalence of two ver...
gchaclem 10749	Lemma for ~ gchac (obsolet...
gchhar 10750	A "local" form of ~ gchac ...
gchacg 10751	A "local" form of ~ gchac ...
gchac 10752	The Generalized Continuum ...
elwina 10757	Conditions of weak inacces...
elina 10758	Conditions of strong inacc...
winaon 10759	A weakly inaccessible card...
inawinalem 10760	Lemma for ~ inawina . (Co...
inawina 10761	Every strongly inaccessibl...
omina 10762	` _om ` is a strongly inac...
winacard 10763	A weakly inaccessible card...
winainflem 10764	A weakly inaccessible card...
winainf 10765	A weakly inaccessible card...
winalim 10766	A weakly inaccessible card...
winalim2 10767	A nontrivial weakly inacce...
winafp 10768	A nontrivial weakly inacce...
winafpi 10769	This theorem, which states...
gchina 10770	Assuming the GCH, weakly a...
iswun 10775	Properties of a weak unive...
wuntr 10776	A weak universe is transit...
wununi 10777	A weak universe is closed ...
wunpw 10778	A weak universe is closed ...
wunelss 10779	The elements of a weak uni...
wunpr 10780	A weak universe is closed ...
wunun 10781	A weak universe is closed ...
wuntp 10782	A weak universe is closed ...
wunss 10783	A weak universe is closed ...
wunin 10784	A weak universe is closed ...
wundif 10785	A weak universe is closed ...
wunint 10786	A weak universe is closed ...
wunsn 10787	A weak universe is closed ...
wunsuc 10788	A weak universe is closed ...
wun0 10789	A weak universe contains t...
wunr1om 10790	A weak universe is infinit...
wunom 10791	A weak universe contains a...
wunfi 10792	A weak universe contains a...
wunop 10793	A weak universe is closed ...
wunot 10794	A weak universe is closed ...
wunxp 10795	A weak universe is closed ...
wunpm 10796	A weak universe is closed ...
wunmap 10797	A weak universe is closed ...
wunf 10798	A weak universe is closed ...
wundm 10799	A weak universe is closed ...
wunrn 10800	A weak universe is closed ...
wuncnv 10801	A weak universe is closed ...
wunres 10802	A weak universe is closed ...
wunfv 10803	A weak universe is closed ...
wunco 10804	A weak universe is closed ...
wuntpos 10805	A weak universe is closed ...
intwun 10806	The intersection of a coll...
r1limwun 10807	Each limit stage in the cu...
r1wunlim 10808	The weak universes in the ...
wunex2 10809	Construct a weak universe ...
wunex 10810	Construct a weak universe ...
uniwun 10811	Every set is contained in ...
wunex3 10812	Construct a weak universe ...
wuncval 10813	Value of the weak universe...
wuncid 10814	The weak universe closure ...
wunccl 10815	The weak universe closure ...
wuncss 10816	The weak universe closure ...
wuncidm 10817	The weak universe closure ...
wuncval2 10818	Our earlier expression for...
eltskg 10821	Properties of a Tarski cla...
eltsk2g 10822	Properties of a Tarski cla...
tskpwss 10823	First axiom of a Tarski cl...
tskpw 10824	Second axiom of a Tarski c...
tsken 10825	Third axiom of a Tarski cl...
0tsk 10826	The empty set is a (transi...
tsksdom 10827	An element of a Tarski cla...
tskssel 10828	A part of a Tarski class s...
tskss 10829	The subsets of an element ...
tskin 10830	The intersection of two el...
tsksn 10831	A singleton of an element ...
tsktrss 10832	A transitive element of a ...
tsksuc 10833	If an element of a Tarski ...
tsk0 10834	A nonempty Tarski class co...
tsk1 10835	One is an element of a non...
tsk2 10836	Two is an element of a non...
2domtsk 10837	If a Tarski class is not e...
tskr1om 10838	A nonempty Tarski class is...
tskr1om2 10839	A nonempty Tarski class co...
tskinf 10840	A nonempty Tarski class is...
tskpr 10841	If ` A ` and ` B ` are mem...
tskop 10842	If ` A ` and ` B ` are mem...
tskxpss 10843	A Cartesian product of two...
tskwe2 10844	A Tarski class is well-ord...
inttsk 10845	The intersection of a coll...
inar1 10846	` ( R1 `` A ) ` for ` A ` ...
r1omALT 10847	Alternate proof of ~ r1om ...
rankcf 10848	Any set must be at least a...
inatsk 10849	` ( R1 `` A ) ` for ` A ` ...
r1omtsk 10850	The set of hereditarily fi...
tskord 10851	A Tarski class contains al...
tskcard 10852	An even more direct relati...
r1tskina 10853	There is a direct relation...
tskuni 10854	The union of an element of...
tskwun 10855	A nonempty transitive Tars...
tskint 10856	The intersection of an ele...
tskun 10857	The union of two elements ...
tskxp 10858	The Cartesian product of t...
tskmap 10859	Set exponentiation is an e...
tskurn 10860	A transitive Tarski class ...
elgrug 10863	Properties of a Grothendie...
grutr 10864	A Grothendieck universe is...
gruelss 10865	A Grothendieck universe is...
grupw 10866	A Grothendieck universe co...
gruss 10867	Any subset of an element o...
grupr 10868	A Grothendieck universe co...
gruurn 10869	A Grothendieck universe co...
gruiun 10870	If ` B ( x ) ` is a family...
gruuni 10871	A Grothendieck universe co...
grurn 10872	A Grothendieck universe co...
gruima 10873	A Grothendieck universe co...
gruel 10874	Any element of an element ...
grusn 10875	A Grothendieck universe co...
gruop 10876	A Grothendieck universe co...
gruun 10877	A Grothendieck universe co...
gruxp 10878	A Grothendieck universe co...
grumap 10879	A Grothendieck universe co...
gruixp 10880	A Grothendieck universe co...
gruiin 10881	A Grothendieck universe co...
gruf 10882	A Grothendieck universe co...
gruen 10883	A Grothendieck universe co...
gruwun 10884	A nonempty Grothendieck un...
intgru 10885	The intersection of a fami...
ingru 10886	The intersection of a univ...
wfgru 10887	The wellfounded part of a ...
grudomon 10888	Each ordinal that is compa...
gruina 10889	If a Grothendieck universe...
grur1a 10890	A characterization of Grot...
grur1 10891	A characterization of Grot...
grutsk1 10892	Grothendieck universes are...
grutsk 10893	Grothendieck universes are...
axgroth5 10895	The Tarski-Grothendieck ax...
axgroth2 10896	Alternate version of the T...
grothpw 10897	Derive the Axiom of Power ...
grothpwex 10898	Derive the Axiom of Power ...
axgroth6 10899	The Tarski-Grothendieck ax...
grothomex 10900	The Tarski-Grothendieck Ax...
grothac 10901	The Tarski-Grothendieck Ax...
axgroth3 10902	Alternate version of the T...
axgroth4 10903	Alternate version of the T...
grothprimlem 10904	Lemma for ~ grothprim . E...
grothprim 10905	The Tarski-Grothendieck Ax...
grothtsk 10906	The Tarski-Grothendieck Ax...
inaprc 10907	An equivalent to the Tarsk...
tskmval 10910	Value of our tarski map. ...
tskmid 10911	The set ` A ` is an elemen...
tskmcl 10912	A Tarski class that contai...
sstskm 10913	Being a part of ` ( tarski...
eltskm 10914	Belonging to ` ( tarskiMap...
elni 10947	Membership in the class of...
elni2 10948	Membership in the class of...
pinn 10949	A positive integer is a na...
pion 10950	A positive integer is an o...
piord 10951	A positive integer is ordi...
niex 10952	The class of positive inte...
0npi 10953	The empty set is not a pos...
1pi 10954	Ordinal 'one' is a positiv...
addpiord 10955	Positive integer addition ...
mulpiord 10956	Positive integer multiplic...
mulidpi 10957	1 is an identity element f...
ltpiord 10958	Positive integer 'less tha...
ltsopi 10959	Positive integer 'less tha...
ltrelpi 10960	Positive integer 'less tha...
dmaddpi 10961	Domain of addition on posi...
dmmulpi 10962	Domain of multiplication o...
addclpi 10963	Closure of addition of pos...
mulclpi 10964	Closure of multiplication ...
addcompi 10965	Addition of positive integ...
addasspi 10966	Addition of positive integ...
mulcompi 10967	Multiplication of positive...
mulasspi 10968	Multiplication of positive...
distrpi 10969	Multiplication of positive...
addcanpi 10970	Addition cancellation law ...
mulcanpi 10971	Multiplication cancellatio...
addnidpi 10972	There is no identity eleme...
ltexpi 10973	Ordering on positive integ...
ltapi 10974	Ordering property of addit...
ltmpi 10975	Ordering property of multi...
1lt2pi 10976	One is less than two (one ...
nlt1pi 10977	No positive integer is les...
indpi 10978	Principle of Finite Induct...
enqbreq 10990	Equivalence relation for p...
enqbreq2 10991	Equivalence relation for p...
enqer 10992	The equivalence relation f...
enqex 10993	The equivalence relation f...
nqex 10994	The class of positive frac...
0nnq 10995	The empty set is not a pos...
elpqn 10996	Each positive fraction is ...
ltrelnq 10997	Positive fraction 'less th...
pinq 10998	The representatives of pos...
1nq 10999	The positive fraction 'one...
nqereu 11000	There is a unique element ...
nqerf 11001	Corollary of ~ nqereu : th...
nqercl 11002	Corollary of ~ nqereu : cl...
nqerrel 11003	Any member of ` ( N. X. N....
nqerid 11004	Corollary of ~ nqereu : th...
enqeq 11005	Corollary of ~ nqereu : if...
nqereq 11006	The function ` /Q ` acts a...
addpipq2 11007	Addition of positive fract...
addpipq 11008	Addition of positive fract...
addpqnq 11009	Addition of positive fract...
mulpipq2 11010	Multiplication of positive...
mulpipq 11011	Multiplication of positive...
mulpqnq 11012	Multiplication of positive...
ordpipq 11013	Ordering of positive fract...
ordpinq 11014	Ordering of positive fract...
addpqf 11015	Closure of addition on pos...
addclnq 11016	Closure of addition on pos...
mulpqf 11017	Closure of multiplication ...
mulclnq 11018	Closure of multiplication ...
addnqf 11019	Domain of addition on posi...
mulnqf 11020	Domain of multiplication o...
addcompq 11021	Addition of positive fract...
addcomnq 11022	Addition of positive fract...
mulcompq 11023	Multiplication of positive...
mulcomnq 11024	Multiplication of positive...
adderpqlem 11025	Lemma for ~ adderpq . (Co...
mulerpqlem 11026	Lemma for ~ mulerpq . (Co...
adderpq 11027	Addition is compatible wit...
mulerpq 11028	Multiplication is compatib...
addassnq 11029	Addition of positive fract...
mulassnq 11030	Multiplication of positive...
mulcanenq 11031	Lemma for distributive law...
distrnq 11032	Multiplication of positive...
1nqenq 11033	The equivalence class of r...
mulidnq 11034	Multiplication identity el...
recmulnq 11035	Relationship between recip...
recidnq 11036	A positive fraction times ...
recclnq 11037	Closure law for positive f...
recrecnq 11038	Reciprocal of reciprocal o...
dmrecnq 11039	Domain of reciprocal on po...
ltsonq 11040	'Less than' is a strict or...
lterpq 11041	Compatibility of ordering ...
ltanq 11042	Ordering property of addit...
ltmnq 11043	Ordering property of multi...
1lt2nq 11044	One is less than two (one ...
ltaddnq 11045	The sum of two fractions i...
ltexnq 11046	Ordering on positive fract...
halfnq 11047	One-half of any positive f...
nsmallnq 11048	The is no smallest positiv...
ltbtwnnq 11049	There exists a number betw...
ltrnq 11050	Ordering property of recip...
archnq 11051	For any fraction, there is...
npex 11057	The class of positive real...
elnp 11058	Membership in positive rea...
elnpi 11059	Membership in positive rea...
prn0 11060	A positive real is not emp...
prpssnq 11061	A positive real is a subse...
elprnq 11062	A positive real is a set o...
0npr 11063	The empty set is not a pos...
prcdnq 11064	A positive real is closed ...
prub 11065	A positive fraction not in...
prnmax 11066	A positive real has no lar...
npomex 11067	A simplifying observation,...
prnmadd 11068	A positive real has no lar...
ltrelpr 11069	Positive real 'less than' ...
genpv 11070	Value of general operation...
genpelv 11071	Membership in value of gen...
genpprecl 11072	Pre-closure law for genera...
genpdm 11073	Domain of general operatio...
genpn0 11074	The result of an operation...
genpss 11075	The result of an operation...
genpnnp 11076	The result of an operation...
genpcd 11077	Downward closure of an ope...
genpnmax 11078	An operation on positive r...
genpcl 11079	Closure of an operation on...
genpass 11080	Associativity of an operat...
plpv 11081	Value of addition on posit...
mpv 11082	Value of multiplication on...
dmplp 11083	Domain of addition on posi...
dmmp 11084	Domain of multiplication o...
nqpr 11085	The canonical embedding of...
1pr 11086	The positive real number '...
addclprlem1 11087	Lemma to prove downward cl...
addclprlem2 11088	Lemma to prove downward cl...
addclpr 11089	Closure of addition on pos...
mulclprlem 11090	Lemma to prove downward cl...
mulclpr 11091	Closure of multiplication ...
addcompr 11092	Addition of positive reals...
addasspr 11093	Addition of positive reals...
mulcompr 11094	Multiplication of positive...
mulasspr 11095	Multiplication of positive...
distrlem1pr 11096	Lemma for distributive law...
distrlem4pr 11097	Lemma for distributive law...
distrlem5pr 11098	Lemma for distributive law...
distrpr 11099	Multiplication of positive...
1idpr 11100	1 is an identity element f...
ltprord 11101	Positive real 'less than' ...
psslinpr 11102	Proper subset is a linear ...
ltsopr 11103	Positive real 'less than' ...
prlem934 11104	Lemma 9-3.4 of [Gleason] p...
ltaddpr 11105	The sum of two positive re...
ltaddpr2 11106	The sum of two positive re...
ltexprlem1 11107	Lemma for Proposition 9-3....
ltexprlem2 11108	Lemma for Proposition 9-3....
ltexprlem3 11109	Lemma for Proposition 9-3....
ltexprlem4 11110	Lemma for Proposition 9-3....
ltexprlem5 11111	Lemma for Proposition 9-3....
ltexprlem6 11112	Lemma for Proposition 9-3....
ltexprlem7 11113	Lemma for Proposition 9-3....
ltexpri 11114	Proposition 9-3.5(iv) of [...
ltaprlem 11115	Lemma for Proposition 9-3....
ltapr 11116	Ordering property of addit...
addcanpr 11117	Addition cancellation law ...
prlem936 11118	Lemma 9-3.6 of [Gleason] p...
reclem2pr 11119	Lemma for Proposition 9-3....
reclem3pr 11120	Lemma for Proposition 9-3....
reclem4pr 11121	Lemma for Proposition 9-3....
recexpr 11122	The reciprocal of a positi...
suplem1pr 11123	The union of a nonempty, b...
suplem2pr 11124	The union of a set of posi...
supexpr 11125	The union of a nonempty, b...
enrer 11134	The equivalence relation f...
nrex1 11135	The class of signed reals ...
enrbreq 11136	Equivalence relation for s...
enreceq 11137	Equivalence class equality...
enrex 11138	The equivalence relation f...
ltrelsr 11139	Signed real 'less than' is...
addcmpblnr 11140	Lemma showing compatibilit...
mulcmpblnrlem 11141	Lemma used in lemma showin...
mulcmpblnr 11142	Lemma showing compatibilit...
prsrlem1 11143	Decomposing signed reals i...
addsrmo 11144	There is at most one resul...
mulsrmo 11145	There is at most one resul...
addsrpr 11146	Addition of signed reals i...
mulsrpr 11147	Multiplication of signed r...
ltsrpr 11148	Ordering of signed reals i...
gt0srpr 11149	Greater than zero in terms...
0nsr 11150	The empty set is not a sig...
0r 11151	The constant ` 0R ` is a s...
1sr 11152	The constant ` 1R ` is a s...
m1r 11153	The constant ` -1R ` is a ...
addclsr 11154	Closure of addition on sig...
mulclsr 11155	Closure of multiplication ...
dmaddsr 11156	Domain of addition on sign...
dmmulsr 11157	Domain of multiplication o...
addcomsr 11158	Addition of signed reals i...
addasssr 11159	Addition of signed reals i...
mulcomsr 11160	Multiplication of signed r...
mulasssr 11161	Multiplication of signed r...
distrsr 11162	Multiplication of signed r...
m1p1sr 11163	Minus one plus one is zero...
m1m1sr 11164	Minus one times minus one ...
ltsosr 11165	Signed real 'less than' is...
0lt1sr 11166	0 is less than 1 for signe...
1ne0sr 11167	1 and 0 are distinct for s...
0idsr 11168	The signed real number 0 i...
1idsr 11169	1 is an identity element f...
00sr 11170	A signed real times 0 is 0...
ltasr 11171	Ordering property of addit...
pn0sr 11172	A signed real plus its neg...
negexsr 11173	Existence of negative sign...
recexsrlem 11174	The reciprocal of a positi...
addgt0sr 11175	The sum of two positive si...
mulgt0sr 11176	The product of two positiv...
sqgt0sr 11177	The square of a nonzero si...
recexsr 11178	The reciprocal of a nonzer...
mappsrpr 11179	Mapping from positive sign...
ltpsrpr 11180	Mapping of order from posi...
map2psrpr 11181	Equivalence for positive s...
supsrlem 11182	Lemma for supremum theorem...
supsr 11183	A nonempty, bounded set of...
opelcn 11200	Ordered pair membership in...
opelreal 11201	Ordered pair membership in...
elreal 11202	Membership in class of rea...
elreal2 11203	Ordered pair membership in...
0ncn 11204	The empty set is not a com...
ltrelre 11205	'Less than' is a relation ...
addcnsr 11206	Addition of complex number...
mulcnsr 11207	Multiplication of complex ...
eqresr 11208	Equality of real numbers i...
addresr 11209	Addition of real numbers i...
mulresr 11210	Multiplication of real num...
ltresr 11211	Ordering of real subset of...
ltresr2 11212	Ordering of real subset of...
dfcnqs 11213	Technical trick to permit ...
addcnsrec 11214	Technical trick to permit ...
mulcnsrec 11215	Technical trick to permit ...
axaddf 11216	Addition is an operation o...
axmulf 11217	Multiplication is an opera...
axcnex 11218	The complex numbers form a...
axresscn 11219	The real numbers are a sub...
ax1cn 11220	1 is a complex number. Ax...
axicn 11221	` _i ` is a complex number...
axaddcl 11222	Closure law for addition o...
axaddrcl 11223	Closure law for addition i...
axmulcl 11224	Closure law for multiplica...
axmulrcl 11225	Closure law for multiplica...
axmulcom 11226	Multiplication of complex ...
axaddass 11227	Addition of complex number...
axmulass 11228	Multiplication of complex ...
axdistr 11229	Distributive law for compl...
axi2m1 11230	i-squared equals -1 (expre...
ax1ne0 11231	1 and 0 are distinct. Axi...
ax1rid 11232	` 1 ` is an identity eleme...
axrnegex 11233	Existence of negative of r...
axrrecex 11234	Existence of reciprocal of...
axcnre 11235	A complex number can be ex...
axpre-lttri 11236	Ordering on reals satisfie...
axpre-lttrn 11237	Ordering on reals is trans...
axpre-ltadd 11238	Ordering property of addit...
axpre-mulgt0 11239	The product of two positiv...
axpre-sup 11240	A nonempty, bounded-above ...
wuncn 11241	A weak universe containing...
cnex 11267	Alias for ~ ax-cnex . See...
addcl 11268	Alias for ~ ax-addcl , for...
readdcl 11269	Alias for ~ ax-addrcl , fo...
mulcl 11270	Alias for ~ ax-mulcl , for...
remulcl 11271	Alias for ~ ax-mulrcl , fo...
mulcom 11272	Alias for ~ ax-mulcom , fo...
addass 11273	Alias for ~ ax-addass , fo...
mulass 11274	Alias for ~ ax-mulass , fo...
adddi 11275	Alias for ~ ax-distr , for...
recn 11276	A real number is a complex...
reex 11277	The real numbers form a se...
reelprrecn 11278	Reals are a subset of the ...
cnelprrecn 11279	Complex numbers are a subs...
mpoaddf 11280	Addition is an operation o...
mpomulf 11281	Multiplication is an opera...
elimne0 11282	Hypothesis for weak deduct...
adddir 11283	Distributive law for compl...
0cn 11284	Zero is a complex number. ...
0cnd 11285	Zero is a complex number, ...
c0ex 11286	Zero is a set. (Contribut...
1cnd 11287	One is a complex number, d...
1ex 11288	One is a set. (Contribute...
cnre 11289	Alias for ~ ax-cnre , for ...
mulrid 11290	The number 1 is an identit...
mullid 11291	Identity law for multiplic...
1re 11292	The number 1 is real. Thi...
1red 11293	The number 1 is real, dedu...
0re 11294	The number 0 is real. Rem...
0red 11295	The number 0 is real, dedu...
mulridi 11296	Identity law for multiplic...
mullidi 11297	Identity law for multiplic...
addcli 11298	Closure law for addition. ...
mulcli 11299	Closure law for multiplica...
mulcomi 11300	Commutative law for multip...
mulcomli 11301	Commutative law for multip...
addassi 11302	Associative law for additi...
mulassi 11303	Associative law for multip...
adddii 11304	Distributive law (left-dis...
adddiri 11305	Distributive law (right-di...
recni 11306	A real number is a complex...
readdcli 11307	Closure law for addition o...
remulcli 11308	Closure law for multiplica...
mulridd 11309	Identity law for multiplic...
mullidd 11310	Identity law for multiplic...
addcld 11311	Closure law for addition. ...
mulcld 11312	Closure law for multiplica...
mulcomd 11313	Commutative law for multip...
addassd 11314	Associative law for additi...
mulassd 11315	Associative law for multip...
adddid 11316	Distributive law (left-dis...
adddird 11317	Distributive law (right-di...
adddirp1d 11318	Distributive law, plus 1 v...
joinlmuladdmuld 11319	Join AB+CB into (A+C) on L...
recnd 11320	Deduction from real number...
readdcld 11321	Closure law for addition o...
remulcld 11322	Closure law for multiplica...
pnfnre 11333	Plus infinity is not a rea...
pnfnre2 11334	Plus infinity is not a rea...
mnfnre 11335	Minus infinity is not a re...
ressxr 11336	The standard reals are a s...
rexpssxrxp 11337	The Cartesian product of s...
rexr 11338	A standard real is an exte...
0xr 11339	Zero is an extended real. ...
renepnf 11340	No (finite) real equals pl...
renemnf 11341	No real equals minus infin...
rexrd 11342	A standard real is an exte...
renepnfd 11343	No (finite) real equals pl...
renemnfd 11344	No real equals minus infin...
pnfex 11345	Plus infinity exists. (Co...
pnfxr 11346	Plus infinity belongs to t...
pnfnemnf 11347	Plus and minus infinity ar...
mnfnepnf 11348	Minus and plus infinity ar...
mnfxr 11349	Minus infinity belongs to ...
rexri 11350	A standard real is an exte...
1xr 11351	` 1 ` is an extended real ...
renfdisj 11352	The reals and the infiniti...
ltrelxr 11353	"Less than" is a relation ...
ltrel 11354	"Less than" is a relation....
lerelxr 11355	"Less than or equal to" is...
lerel 11356	"Less than or equal to" is...
xrlenlt 11357	"Less than or equal to" ex...
xrlenltd 11358	"Less than or equal to" ex...
xrltnle 11359	"Less than" expressed in t...
xrnltled 11360	"Not less than" implies "l...
ssxr 11361	The three (non-exclusive) ...
ltxrlt 11362	The standard less-than ` <...
axlttri 11363	Ordering on reals satisfie...
axlttrn 11364	Ordering on reals is trans...
axltadd 11365	Ordering property of addit...
axmulgt0 11366	The product of two positiv...
axsup 11367	A nonempty, bounded-above ...
lttr 11368	Alias for ~ axlttrn , for ...
mulgt0 11369	The product of two positiv...
lenlt 11370	'Less than or equal to' ex...
ltnle 11371	'Less than' expressed in t...
ltso 11372	'Less than' is a strict or...
gtso 11373	'Greater than' is a strict...
lttri2 11374	Consequence of trichotomy....
lttri3 11375	Trichotomy law for 'less t...
lttri4 11376	Trichotomy law for 'less t...
letri3 11377	Trichotomy law. (Contribu...
leloe 11378	'Less than or equal to' ex...
eqlelt 11379	Equality in terms of 'less...
ltle 11380	'Less than' implies 'less ...
leltne 11381	'Less than or equal to' im...
lelttr 11382	Transitive law. (Contribu...
leltletr 11383	Transitive law, weaker for...
ltletr 11384	Transitive law. (Contribu...
ltleletr 11385	Transitive law, weaker for...
letr 11386	Transitive law. (Contribu...
ltnr 11387	'Less than' is irreflexive...
leid 11388	'Less than or equal to' is...
ltne 11389	'Less than' implies not eq...
ltnsym 11390	'Less than' is not symmetr...
ltnsym2 11391	'Less than' is antisymmetr...
letric 11392	Trichotomy law. (Contribu...
ltlen 11393	'Less than' expressed in t...
eqle 11394	Equality implies 'less tha...
eqled 11395	Equality implies 'less tha...
ltadd2 11396	Addition to both sides of ...
ne0gt0 11397	A nonzero nonnegative numb...
lecasei 11398	Ordering elimination by ca...
lelttric 11399	Trichotomy law. (Contribu...
ltlecasei 11400	Ordering elimination by ca...
ltnri 11401	'Less than' is irreflexive...
eqlei 11402	Equality implies 'less tha...
eqlei2 11403	Equality implies 'less tha...
gtneii 11404	'Less than' implies not eq...
ltneii 11405	'Greater than' implies not...
lttri2i 11406	Consequence of trichotomy....
lttri3i 11407	Consequence of trichotomy....
letri3i 11408	Consequence of trichotomy....
leloei 11409	'Less than or equal to' in...
ltleni 11410	'Less than' expressed in t...
ltnsymi 11411	'Less than' is not symmetr...
lenlti 11412	'Less than or equal to' in...
ltnlei 11413	'Less than' in terms of 'l...
ltlei 11414	'Less than' implies 'less ...
ltleii 11415	'Less than' implies 'less ...
ltnei 11416	'Less than' implies not eq...
letrii 11417	Trichotomy law for 'less t...
lttri 11418	'Less than' is transitive....
lelttri 11419	'Less than or equal to', '...
ltletri 11420	'Less than', 'less than or...
letri 11421	'Less than or equal to' is...
le2tri3i 11422	Extended trichotomy law fo...
ltadd2i 11423	Addition to both sides of ...
mulgt0i 11424	The product of two positiv...
mulgt0ii 11425	The product of two positiv...
ltnrd 11426	'Less than' is irreflexive...
gtned 11427	'Less than' implies not eq...
ltned 11428	'Greater than' implies not...
ne0gt0d 11429	A nonzero nonnegative numb...
lttrid 11430	Ordering on reals satisfie...
lttri2d 11431	Consequence of trichotomy....
lttri3d 11432	Consequence of trichotomy....
lttri4d 11433	Trichotomy law for 'less t...
letri3d 11434	Consequence of trichotomy....
leloed 11435	'Less than or equal to' in...
eqleltd 11436	Equality in terms of 'less...
ltlend 11437	'Less than' expressed in t...
lenltd 11438	'Less than or equal to' in...
ltnled 11439	'Less than' in terms of 'l...
ltled 11440	'Less than' implies 'less ...
ltnsymd 11441	'Less than' implies 'less ...
nltled 11442	'Not less than ' implies '...
lensymd 11443	'Less than or equal to' im...
letrid 11444	Trichotomy law for 'less t...
leltned 11445	'Less than or equal to' im...
leneltd 11446	'Less than or equal to' an...
mulgt0d 11447	The product of two positiv...
ltadd2d 11448	Addition to both sides of ...
letrd 11449	Transitive law deduction f...
lelttrd 11450	Transitive law deduction f...
ltadd2dd 11451	Addition to both sides of ...
ltletrd 11452	Transitive law deduction f...
lttrd 11453	Transitive law deduction f...
lelttrdi 11454	If a number is less than a...
dedekind 11455	The Dedekind cut theorem. ...
dedekindle 11456	The Dedekind cut theorem, ...
mul12 11457	Commutative/associative la...
mul32 11458	Commutative/associative la...
mul31 11459	Commutative/associative la...
mul4 11460	Rearrangement of 4 factors...
mul4r 11461	Rearrangement of 4 factors...
muladd11 11462	A simple product of sums e...
1p1times 11463	Two times a number. (Cont...
peano2cn 11464	A theorem for complex numb...
peano2re 11465	A theorem for reals analog...
readdcan 11466	Cancellation law for addit...
00id 11467	` 0 ` is its own additive ...
mul02lem1 11468	Lemma for ~ mul02 . If an...
mul02lem2 11469	Lemma for ~ mul02 . Zero ...
mul02 11470	Multiplication by ` 0 ` . ...
mul01 11471	Multiplication by ` 0 ` . ...
addrid 11472	` 0 ` is an additive ident...
cnegex 11473	Existence of the negative ...
cnegex2 11474	Existence of a left invers...
addlid 11475	` 0 ` is a left identity f...
addcan 11476	Cancellation law for addit...
addcan2 11477	Cancellation law for addit...
addcom 11478	Addition commutes. This u...
addridi 11479	` 0 ` is an additive ident...
addlidi 11480	` 0 ` is a left identity f...
mul02i 11481	Multiplication by 0. Theo...
mul01i 11482	Multiplication by ` 0 ` . ...
addcomi 11483	Addition commutes. Based ...
addcomli 11484	Addition commutes. (Contr...
addcani 11485	Cancellation law for addit...
addcan2i 11486	Cancellation law for addit...
mul12i 11487	Commutative/associative la...
mul32i 11488	Commutative/associative la...
mul4i 11489	Rearrangement of 4 factors...
mul02d 11490	Multiplication by 0. Theo...
mul01d 11491	Multiplication by ` 0 ` . ...
addridd 11492	` 0 ` is an additive ident...
addlidd 11493	` 0 ` is a left identity f...
addcomd 11494	Addition commutes. Based ...
addcand 11495	Cancellation law for addit...
addcan2d 11496	Cancellation law for addit...
addcanad 11497	Cancelling a term on the l...
addcan2ad 11498	Cancelling a term on the r...
addneintrd 11499	Introducing a term on the ...
addneintr2d 11500	Introducing a term on the ...
mul12d 11501	Commutative/associative la...
mul32d 11502	Commutative/associative la...
mul31d 11503	Commutative/associative la...
mul4d 11504	Rearrangement of 4 factors...
muladd11r 11505	A simple product of sums e...
comraddd 11506	Commute RHS addition, in d...
ltaddneg 11507	Adding a negative number t...
ltaddnegr 11508	Adding a negative number t...
add12 11509	Commutative/associative la...
add32 11510	Commutative/associative la...
add32r 11511	Commutative/associative la...
add4 11512	Rearrangement of 4 terms i...
add42 11513	Rearrangement of 4 terms i...
add12i 11514	Commutative/associative la...
add32i 11515	Commutative/associative la...
add4i 11516	Rearrangement of 4 terms i...
add42i 11517	Rearrangement of 4 terms i...
add12d 11518	Commutative/associative la...
add32d 11519	Commutative/associative la...
add4d 11520	Rearrangement of 4 terms i...
add42d 11521	Rearrangement of 4 terms i...
0cnALT 11526	Alternate proof of ~ 0cn w...
0cnALT2 11527	Alternate proof of ~ 0cnAL...
negeu 11528	Existential uniqueness of ...
subval 11529	Value of subtraction, whic...
negeq 11530	Equality theorem for negat...
negeqi 11531	Equality inference for neg...
negeqd 11532	Equality deduction for neg...
nfnegd 11533	Deduction version of ~ nfn...
nfneg 11534	Bound-variable hypothesis ...
csbnegg 11535	Move class substitution in...
negex 11536	A negative is a set. (Con...
subcl 11537	Closure law for subtractio...
negcl 11538	Closure law for negative. ...
negicn 11539	` -u _i ` is a complex num...
subf 11540	Subtraction is an operatio...
subadd 11541	Relationship between subtr...
subadd2 11542	Relationship between subtr...
subsub23 11543	Swap subtrahend and result...
pncan 11544	Cancellation law for subtr...
pncan2 11545	Cancellation law for subtr...
pncan3 11546	Subtraction and addition o...
npcan 11547	Cancellation law for subtr...
addsubass 11548	Associative-type law for a...
addsub 11549	Law for addition and subtr...
subadd23 11550	Commutative/associative la...
addsub12 11551	Commutative/associative la...
2addsub 11552	Law for subtraction and ad...
addsubeq4 11553	Relation between sums and ...
pncan3oi 11554	Subtraction and addition o...
mvrraddi 11555	Move the right term in a s...
mvlladdi 11556	Move the left term in a su...
subid 11557	Subtraction of a number fr...
subid1 11558	Identity law for subtracti...
npncan 11559	Cancellation law for subtr...
nppcan 11560	Cancellation law for subtr...
nnpcan 11561	Cancellation law for subtr...
nppcan3 11562	Cancellation law for subtr...
subcan2 11563	Cancellation law for subtr...
subeq0 11564	If the difference between ...
npncan2 11565	Cancellation law for subtr...
subsub2 11566	Law for double subtraction...
nncan 11567	Cancellation law for subtr...
subsub 11568	Law for double subtraction...
nppcan2 11569	Cancellation law for subtr...
subsub3 11570	Law for double subtraction...
subsub4 11571	Law for double subtraction...
sub32 11572	Swap the second and third ...
nnncan 11573	Cancellation law for subtr...
nnncan1 11574	Cancellation law for subtr...
nnncan2 11575	Cancellation law for subtr...
npncan3 11576	Cancellation law for subtr...
pnpcan 11577	Cancellation law for mixed...
pnpcan2 11578	Cancellation law for mixed...
pnncan 11579	Cancellation law for mixed...
ppncan 11580	Cancellation law for mixed...
addsub4 11581	Rearrangement of 4 terms i...
subadd4 11582	Rearrangement of 4 terms i...
sub4 11583	Rearrangement of 4 terms i...
neg0 11584	Minus 0 equals 0. (Contri...
negid 11585	Addition of a number and i...
negsub 11586	Relationship between subtr...
subneg 11587	Relationship between subtr...
negneg 11588	A number is equal to the n...
neg11 11589	Negative is one-to-one. (...
negcon1 11590	Negative contraposition la...
negcon2 11591	Negative contraposition la...
negeq0 11592	A number is zero iff its n...
subcan 11593	Cancellation law for subtr...
negsubdi 11594	Distribution of negative o...
negdi 11595	Distribution of negative o...
negdi2 11596	Distribution of negative o...
negsubdi2 11597	Distribution of negative o...
neg2sub 11598	Relationship between subtr...
renegcli 11599	Closure law for negative o...
resubcli 11600	Closure law for subtractio...
renegcl 11601	Closure law for negative o...
resubcl 11602	Closure law for subtractio...
negreb 11603	The negative of a real is ...
peano2cnm 11604	"Reverse" second Peano pos...
peano2rem 11605	"Reverse" second Peano pos...
negcli 11606	Closure law for negative. ...
negidi 11607	Addition of a number and i...
negnegi 11608	A number is equal to the n...
subidi 11609	Subtraction of a number fr...
subid1i 11610	Identity law for subtracti...
negne0bi 11611	A number is nonzero iff it...
negrebi 11612	The negative of a real is ...
negne0i 11613	The negative of a nonzero ...
subcli 11614	Closure law for subtractio...
pncan3i 11615	Subtraction and addition o...
negsubi 11616	Relationship between subtr...
subnegi 11617	Relationship between subtr...
subeq0i 11618	If the difference between ...
neg11i 11619	Negative is one-to-one. (...
negcon1i 11620	Negative contraposition la...
negcon2i 11621	Negative contraposition la...
negdii 11622	Distribution of negative o...
negsubdii 11623	Distribution of negative o...
negsubdi2i 11624	Distribution of negative o...
subaddi 11625	Relationship between subtr...
subadd2i 11626	Relationship between subtr...
subaddrii 11627	Relationship between subtr...
subsub23i 11628	Swap subtrahend and result...
addsubassi 11629	Associative-type law for s...
addsubi 11630	Law for subtraction and ad...
subcani 11631	Cancellation law for subtr...
subcan2i 11632	Cancellation law for subtr...
pnncani 11633	Cancellation law for mixed...
addsub4i 11634	Rearrangement of 4 terms i...
0reALT 11635	Alternate proof of ~ 0re ....
negcld 11636	Closure law for negative. ...
subidd 11637	Subtraction of a number fr...
subid1d 11638	Identity law for subtracti...
negidd 11639	Addition of a number and i...
negnegd 11640	A number is equal to the n...
negeq0d 11641	A number is zero iff its n...
negne0bd 11642	A number is nonzero iff it...
negcon1d 11643	Contraposition law for una...
negcon1ad 11644	Contraposition law for una...
neg11ad 11645	The negatives of two compl...
negned 11646	If two complex numbers are...
negne0d 11647	The negative of a nonzero ...
negrebd 11648	The negative of a real is ...
subcld 11649	Closure law for subtractio...
pncand 11650	Cancellation law for subtr...
pncan2d 11651	Cancellation law for subtr...
pncan3d 11652	Subtraction and addition o...
npcand 11653	Cancellation law for subtr...
nncand 11654	Cancellation law for subtr...
negsubd 11655	Relationship between subtr...
subnegd 11656	Relationship between subtr...
subeq0d 11657	If the difference between ...
subne0d 11658	Two unequal numbers have n...
subeq0ad 11659	The difference of two comp...
subne0ad 11660	If the difference of two c...
neg11d 11661	If the difference between ...
negdid 11662	Distribution of negative o...
negdi2d 11663	Distribution of negative o...
negsubdid 11664	Distribution of negative o...
negsubdi2d 11665	Distribution of negative o...
neg2subd 11666	Relationship between subtr...
subaddd 11667	Relationship between subtr...
subadd2d 11668	Relationship between subtr...
addsubassd 11669	Associative-type law for s...
addsubd 11670	Law for subtraction and ad...
subadd23d 11671	Commutative/associative la...
addsub12d 11672	Commutative/associative la...
npncand 11673	Cancellation law for subtr...
nppcand 11674	Cancellation law for subtr...
nppcan2d 11675	Cancellation law for subtr...
nppcan3d 11676	Cancellation law for subtr...
subsubd 11677	Law for double subtraction...
subsub2d 11678	Law for double subtraction...
subsub3d 11679	Law for double subtraction...
subsub4d 11680	Law for double subtraction...
sub32d 11681	Swap the second and third ...
nnncand 11682	Cancellation law for subtr...
nnncan1d 11683	Cancellation law for subtr...
nnncan2d 11684	Cancellation law for subtr...
npncan3d 11685	Cancellation law for subtr...
pnpcand 11686	Cancellation law for mixed...
pnpcan2d 11687	Cancellation law for mixed...
pnncand 11688	Cancellation law for mixed...
ppncand 11689	Cancellation law for mixed...
subcand 11690	Cancellation law for subtr...
subcan2d 11691	Cancellation law for subtr...
subcanad 11692	Cancellation law for subtr...
subneintrd 11693	Introducing subtraction on...
subcan2ad 11694	Cancellation law for subtr...
subneintr2d 11695	Introducing subtraction on...
addsub4d 11696	Rearrangement of 4 terms i...
subadd4d 11697	Rearrangement of 4 terms i...
sub4d 11698	Rearrangement of 4 terms i...
2addsubd 11699	Law for subtraction and ad...
addsubeq4d 11700	Relation between sums and ...
subeqxfrd 11701	Transfer two terms of a su...
mvlraddd 11702	Move the right term in a s...
mvlladdd 11703	Move the left term in a su...
mvrraddd 11704	Move the right term in a s...
mvrladdd 11705	Move the left term in a su...
assraddsubd 11706	Associate RHS addition-sub...
subaddeqd 11707	Transfer two terms of a su...
addlsub 11708	Left-subtraction: Subtrac...
addrsub 11709	Right-subtraction: Subtra...
subexsub 11710	A subtraction law: Exchan...
addid0 11711	If adding a number to a an...
addn0nid 11712	Adding a nonzero number to...
pnpncand 11713	Addition/subtraction cance...
subeqrev 11714	Reverse the order of subtr...
addeq0 11715	Two complex numbers add up...
pncan1 11716	Cancellation law for addit...
npcan1 11717	Cancellation law for subtr...
subeq0bd 11718	If two complex numbers are...
renegcld 11719	Closure law for negative o...
resubcld 11720	Closure law for subtractio...
negn0 11721	The image under negation o...
negf1o 11722	Negation is an isomorphism...
kcnktkm1cn 11723	k times k minus 1 is a com...
muladd 11724	Product of two sums. (Con...
subdi 11725	Distribution of multiplica...
subdir 11726	Distribution of multiplica...
ine0 11727	The imaginary unit ` _i ` ...
mulneg1 11728	Product with negative is n...
mulneg2 11729	The product with a negativ...
mulneg12 11730	Swap the negative sign in ...
mul2neg 11731	Product of two negatives. ...
submul2 11732	Convert a subtraction to a...
mulm1 11733	Product with minus one is ...
addneg1mul 11734	Addition with product with...
mulsub 11735	Product of two differences...
mulsub2 11736	Swap the order of subtract...
mulm1i 11737	Product with minus one is ...
mulneg1i 11738	Product with negative is n...
mulneg2i 11739	Product with negative is n...
mul2negi 11740	Product of two negatives. ...
subdii 11741	Distribution of multiplica...
subdiri 11742	Distribution of multiplica...
muladdi 11743	Product of two sums. (Con...
mulm1d 11744	Product with minus one is ...
mulneg1d 11745	Product with negative is n...
mulneg2d 11746	Product with negative is n...
mul2negd 11747	Product of two negatives. ...
subdid 11748	Distribution of multiplica...
subdird 11749	Distribution of multiplica...
muladdd 11750	Product of two sums. (Con...
mulsubd 11751	Product of two differences...
muls1d 11752	Multiplication by one minu...
mulsubfacd 11753	Multiplication followed by...
addmulsub 11754	The product of a sum and a...
subaddmulsub 11755	The difference with a prod...
mulsubaddmulsub 11756	A special difference of a ...
gt0ne0 11757	Positive implies nonzero. ...
lt0ne0 11758	A number which is less tha...
ltadd1 11759	Addition to both sides of ...
leadd1 11760	Addition to both sides of ...
leadd2 11761	Addition to both sides of ...
ltsubadd 11762	'Less than' relationship b...
ltsubadd2 11763	'Less than' relationship b...
lesubadd 11764	'Less than or equal to' re...
lesubadd2 11765	'Less than or equal to' re...
ltaddsub 11766	'Less than' relationship b...
ltaddsub2 11767	'Less than' relationship b...
leaddsub 11768	'Less than or equal to' re...
leaddsub2 11769	'Less than or equal to' re...
suble 11770	Swap subtrahends in an ine...
lesub 11771	Swap subtrahends in an ine...
ltsub23 11772	'Less than' relationship b...
ltsub13 11773	'Less than' relationship b...
le2add 11774	Adding both sides of two '...
ltleadd 11775	Adding both sides of two o...
leltadd 11776	Adding both sides of two o...
lt2add 11777	Adding both sides of two '...
addgt0 11778	The sum of 2 positive numb...
addgegt0 11779	The sum of nonnegative and...
addgtge0 11780	The sum of nonnegative and...
addge0 11781	The sum of 2 nonnegative n...
ltaddpos 11782	Adding a positive number t...
ltaddpos2 11783	Adding a positive number t...
ltsubpos 11784	Subtracting a positive num...
posdif 11785	Comparison of two numbers ...
lesub1 11786	Subtraction from both side...
lesub2 11787	Subtraction of both sides ...
ltsub1 11788	Subtraction from both side...
ltsub2 11789	Subtraction of both sides ...
lt2sub 11790	Subtracting both sides of ...
le2sub 11791	Subtracting both sides of ...
ltneg 11792	Negative of both sides of ...
ltnegcon1 11793	Contraposition of negative...
ltnegcon2 11794	Contraposition of negative...
leneg 11795	Negative of both sides of ...
lenegcon1 11796	Contraposition of negative...
lenegcon2 11797	Contraposition of negative...
lt0neg1 11798	Comparison of a number and...
lt0neg2 11799	Comparison of a number and...
le0neg1 11800	Comparison of a number and...
le0neg2 11801	Comparison of a number and...
addge01 11802	A number is less than or e...
addge02 11803	A number is less than or e...
add20 11804	Two nonnegative numbers ar...
subge0 11805	Nonnegative subtraction. ...
suble0 11806	Nonpositive subtraction. ...
leaddle0 11807	The sum of a real number a...
subge02 11808	Nonnegative subtraction. ...
lesub0 11809	Lemma to show a nonnegativ...
mulge0 11810	The product of two nonnega...
mullt0 11811	The product of two negativ...
msqgt0 11812	A nonzero square is positi...
msqge0 11813	A square is nonnegative. ...
0lt1 11814	0 is less than 1. Theorem...
0le1 11815	0 is less than or equal to...
relin01 11816	An interval law for less t...
ltordlem 11817	Lemma for ~ ltord1 . (Con...
ltord1 11818	Infer an ordering relation...
leord1 11819	Infer an ordering relation...
eqord1 11820	A strictly increasing real...
ltord2 11821	Infer an ordering relation...
leord2 11822	Infer an ordering relation...
eqord2 11823	A strictly decreasing real...
wloglei 11824	Form of ~ wlogle where bot...
wlogle 11825	If the predicate ` ch ( x ...
leidi 11826	'Less than or equal to' is...
gt0ne0i 11827	Positive means nonzero (us...
gt0ne0ii 11828	Positive implies nonzero. ...
msqgt0i 11829	A nonzero square is positi...
msqge0i 11830	A square is nonnegative. ...
addgt0i 11831	Addition of 2 positive num...
addge0i 11832	Addition of 2 nonnegative ...
addgegt0i 11833	Addition of nonnegative an...
addgt0ii 11834	Addition of 2 positive num...
add20i 11835	Two nonnegative numbers ar...
ltnegi 11836	Negative of both sides of ...
lenegi 11837	Negative of both sides of ...
ltnegcon2i 11838	Contraposition of negative...
mulge0i 11839	The product of two nonnega...
lesub0i 11840	Lemma to show a nonnegativ...
ltaddposi 11841	Adding a positive number t...
posdifi 11842	Comparison of two numbers ...
ltnegcon1i 11843	Contraposition of negative...
lenegcon1i 11844	Contraposition of negative...
subge0i 11845	Nonnegative subtraction. ...
ltadd1i 11846	Addition to both sides of ...
leadd1i 11847	Addition to both sides of ...
leadd2i 11848	Addition to both sides of ...
ltsubaddi 11849	'Less than' relationship b...
lesubaddi 11850	'Less than or equal to' re...
ltsubadd2i 11851	'Less than' relationship b...
lesubadd2i 11852	'Less than or equal to' re...
ltaddsubi 11853	'Less than' relationship b...
lt2addi 11854	Adding both side of two in...
le2addi 11855	Adding both side of two in...
gt0ne0d 11856	Positive implies nonzero. ...
lt0ne0d 11857	Something less than zero i...
leidd 11858	'Less than or equal to' is...
msqgt0d 11859	A nonzero square is positi...
msqge0d 11860	A square is nonnegative. ...
lt0neg1d 11861	Comparison of a number and...
lt0neg2d 11862	Comparison of a number and...
le0neg1d 11863	Comparison of a number and...
le0neg2d 11864	Comparison of a number and...
addgegt0d 11865	Addition of nonnegative an...
addgtge0d 11866	Addition of positive and n...
addgt0d 11867	Addition of 2 positive num...
addge0d 11868	Addition of 2 nonnegative ...
mulge0d 11869	The product of two nonnega...
ltnegd 11870	Negative of both sides of ...
lenegd 11871	Negative of both sides of ...
ltnegcon1d 11872	Contraposition of negative...
ltnegcon2d 11873	Contraposition of negative...
lenegcon1d 11874	Contraposition of negative...
lenegcon2d 11875	Contraposition of negative...
ltaddposd 11876	Adding a positive number t...
ltaddpos2d 11877	Adding a positive number t...
ltsubposd 11878	Subtracting a positive num...
posdifd 11879	Comparison of two numbers ...
addge01d 11880	A number is less than or e...
addge02d 11881	A number is less than or e...
subge0d 11882	Nonnegative subtraction. ...
suble0d 11883	Nonpositive subtraction. ...
subge02d 11884	Nonnegative subtraction. ...
ltadd1d 11885	Addition to both sides of ...
leadd1d 11886	Addition to both sides of ...
leadd2d 11887	Addition to both sides of ...
ltsubaddd 11888	'Less than' relationship b...
lesubaddd 11889	'Less than or equal to' re...
ltsubadd2d 11890	'Less than' relationship b...
lesubadd2d 11891	'Less than or equal to' re...
ltaddsubd 11892	'Less than' relationship b...
ltaddsub2d 11893	'Less than' relationship b...
leaddsub2d 11894	'Less than or equal to' re...
subled 11895	Swap subtrahends in an ine...
lesubd 11896	Swap subtrahends in an ine...
ltsub23d 11897	'Less than' relationship b...
ltsub13d 11898	'Less than' relationship b...
lesub1d 11899	Subtraction from both side...
lesub2d 11900	Subtraction of both sides ...
ltsub1d 11901	Subtraction from both side...
ltsub2d 11902	Subtraction of both sides ...
ltadd1dd 11903	Addition to both sides of ...
ltsub1dd 11904	Subtraction from both side...
ltsub2dd 11905	Subtraction of both sides ...
leadd1dd 11906	Addition to both sides of ...
leadd2dd 11907	Addition to both sides of ...
lesub1dd 11908	Subtraction from both side...
lesub2dd 11909	Subtraction of both sides ...
lesub3d 11910	The result of subtracting ...
le2addd 11911	Adding both side of two in...
le2subd 11912	Subtracting both sides of ...
ltleaddd 11913	Adding both sides of two o...
leltaddd 11914	Adding both sides of two o...
lt2addd 11915	Adding both side of two in...
lt2subd 11916	Subtracting both sides of ...
possumd 11917	Condition for a positive s...
sublt0d 11918	When a subtraction gives a...
ltaddsublt 11919	Addition and subtraction o...
1le1 11920	One is less than or equal ...
ixi 11921	` _i ` times itself is min...
recextlem1 11922	Lemma for ~ recex . (Cont...
recextlem2 11923	Lemma for ~ recex . (Cont...
recex 11924	Existence of reciprocal of...
mulcand 11925	Cancellation law for multi...
mulcan2d 11926	Cancellation law for multi...
mulcanad 11927	Cancellation of a nonzero ...
mulcan2ad 11928	Cancellation of a nonzero ...
mulcan 11929	Cancellation law for multi...
mulcan2 11930	Cancellation law for multi...
mulcani 11931	Cancellation law for multi...
mul0or 11932	If a product is zero, one ...
mulne0b 11933	The product of two nonzero...
mulne0 11934	The product of two nonzero...
mulne0i 11935	The product of two nonzero...
muleqadd 11936	Property of numbers whose ...
receu 11937	Existential uniqueness of ...
mulnzcnf 11938	Multiplication maps nonzer...
msq0i 11939	A number is zero iff its s...
mul0ori 11940	If a product is zero, one ...
msq0d 11941	A number is zero iff its s...
mul0ord 11942	If a product is zero, one ...
mulne0bd 11943	The product of two nonzero...
mulne0d 11944	The product of two nonzero...
mulcan1g 11945	A generalized form of the ...
mulcan2g 11946	A generalized form of the ...
mulne0bad 11947	A factor of a nonzero comp...
mulne0bbd 11948	A factor of a nonzero comp...
1div0 11951	You can't divide by zero, ...
1div0OLD 11952	Obsolete version of ~ 1div...
divval 11953	Value of division: if ` A ...
divmul 11954	Relationship between divis...
divmul2 11955	Relationship between divis...
divmul3 11956	Relationship between divis...
divcl 11957	Closure law for division. ...
reccl 11958	Closure law for reciprocal...
divcan2 11959	A cancellation law for div...
divcan1 11960	A cancellation law for div...
diveq0 11961	A ratio is zero iff the nu...
divne0b 11962	The ratio of nonzero numbe...
divne0 11963	The ratio of nonzero numbe...
recne0 11964	The reciprocal of a nonzer...
recid 11965	Multiplication of a number...
recid2 11966	Multiplication of a number...
divrec 11967	Relationship between divis...
divrec2 11968	Relationship between divis...
divass 11969	An associative law for div...
div23 11970	A commutative/associative ...
div32 11971	A commutative/associative ...
div13 11972	A commutative/associative ...
div12 11973	A commutative/associative ...
divmulass 11974	An associative law for div...
divmulasscom 11975	An associative/commutative...
divdir 11976	Distribution of division o...
divcan3 11977	A cancellation law for div...
divcan4 11978	A cancellation law for div...
div11 11979	One-to-one relationship fo...
div11OLD 11980	Obsolete version of ~ div1...
diveq1 11981	Equality in terms of unit ...
divid 11982	A number divided by itself...
dividOLD 11983	Obsolete version of ~ divi...
div0 11984	Division into zero is zero...
div0OLD 11985	Obsolete version of ~ div0...
div1 11986	A number divided by 1 is i...
1div1e1 11987	1 divided by 1 is 1. (Con...
divneg 11988	Move negative sign inside ...
muldivdir 11989	Distribution of division o...
divsubdir 11990	Distribution of division o...
subdivcomb1 11991	Bring a term in a subtract...
subdivcomb2 11992	Bring a term in a subtract...
recrec 11993	A number is equal to the r...
rec11 11994	Reciprocal is one-to-one. ...
rec11r 11995	Mutual reciprocals. (Cont...
divmuldiv 11996	Multiplication of two rati...
divdivdiv 11997	Division of two ratios. T...
divcan5 11998	Cancellation of common fac...
divmul13 11999	Swap the denominators in t...
divmul24 12000	Swap the numerators in the...
divmuleq 12001	Cross-multiply in an equal...
recdiv 12002	The reciprocal of a ratio....
divcan6 12003	Cancellation of inverted f...
divdiv32 12004	Swap denominators in a div...
divcan7 12005	Cancel equal divisors in a...
dmdcan 12006	Cancellation law for divis...
divdiv1 12007	Division into a fraction. ...
divdiv2 12008	Division by a fraction. (...
recdiv2 12009	Division into a reciprocal...
ddcan 12010	Cancellation in a double d...
divadddiv 12011	Addition of two ratios. T...
divsubdiv 12012	Subtraction of two ratios....
conjmul 12013	Two numbers whose reciproc...
rereccl 12014	Closure law for reciprocal...
redivcl 12015	Closure law for division o...
eqneg 12016	A number equal to its nega...
eqnegd 12017	A complex number equals it...
eqnegad 12018	If a complex number equals...
div2neg 12019	Quotient of two negatives....
divneg2 12020	Move negative sign inside ...
recclzi 12021	Closure law for reciprocal...
recne0zi 12022	The reciprocal of a nonzer...
recidzi 12023	Multiplication of a number...
div1i 12024	A number divided by 1 is i...
eqnegi 12025	A number equal to its nega...
reccli 12026	Closure law for reciprocal...
recidi 12027	Multiplication of a number...
recreci 12028	A number is equal to the r...
dividi 12029	A number divided by itself...
div0i 12030	Division into zero is zero...
divclzi 12031	Closure law for division. ...
divcan1zi 12032	A cancellation law for div...
divcan2zi 12033	A cancellation law for div...
divreczi 12034	Relationship between divis...
divcan3zi 12035	A cancellation law for div...
divcan4zi 12036	A cancellation law for div...
rec11i 12037	Reciprocal is one-to-one. ...
divcli 12038	Closure law for division. ...
divcan2i 12039	A cancellation law for div...
divcan1i 12040	A cancellation law for div...
divreci 12041	Relationship between divis...
divcan3i 12042	A cancellation law for div...
divcan4i 12043	A cancellation law for div...
divne0i 12044	The ratio of nonzero numbe...
rec11ii 12045	Reciprocal is one-to-one. ...
divasszi 12046	An associative law for div...
divmulzi 12047	Relationship between divis...
divdirzi 12048	Distribution of division o...
divdiv23zi 12049	Swap denominators in a div...
divmuli 12050	Relationship between divis...
divdiv32i 12051	Swap denominators in a div...
divassi 12052	An associative law for div...
divdiri 12053	Distribution of division o...
div23i 12054	A commutative/associative ...
div11i 12055	One-to-one relationship fo...
divmuldivi 12056	Multiplication of two rati...
divmul13i 12057	Swap denominators of two r...
divadddivi 12058	Addition of two ratios. T...
divdivdivi 12059	Division of two ratios. T...
rerecclzi 12060	Closure law for reciprocal...
rereccli 12061	Closure law for reciprocal...
redivclzi 12062	Closure law for division o...
redivcli 12063	Closure law for division o...
div1d 12064	A number divided by 1 is i...
reccld 12065	Closure law for reciprocal...
recne0d 12066	The reciprocal of a nonzer...
recidd 12067	Multiplication of a number...
recid2d 12068	Multiplication of a number...
recrecd 12069	A number is equal to the r...
dividd 12070	A number divided by itself...
div0d 12071	Division into zero is zero...
divcld 12072	Closure law for division. ...
divcan1d 12073	A cancellation law for div...
divcan2d 12074	A cancellation law for div...
divrecd 12075	Relationship between divis...
divrec2d 12076	Relationship between divis...
divcan3d 12077	A cancellation law for div...
divcan4d 12078	A cancellation law for div...
diveq0d 12079	A ratio is zero iff the nu...
diveq1d 12080	Equality in terms of unit ...
diveq1ad 12081	The quotient of two comple...
diveq0ad 12082	A fraction of complex numb...
divne1d 12083	If two complex numbers are...
divne0bd 12084	A ratio is zero iff the nu...
divnegd 12085	Move negative sign inside ...
divneg2d 12086	Move negative sign inside ...
div2negd 12087	Quotient of two negatives....
divne0d 12088	The ratio of nonzero numbe...
recdivd 12089	The reciprocal of a ratio....
recdiv2d 12090	Division into a reciprocal...
divcan6d 12091	Cancellation of inverted f...
ddcand 12092	Cancellation in a double d...
rec11d 12093	Reciprocal is one-to-one. ...
divmuld 12094	Relationship between divis...
div32d 12095	A commutative/associative ...
div13d 12096	A commutative/associative ...
divdiv32d 12097	Swap denominators in a div...
divcan5d 12098	Cancellation of common fac...
divcan5rd 12099	Cancellation of common fac...
divcan7d 12100	Cancel equal divisors in a...
dmdcand 12101	Cancellation law for divis...
dmdcan2d 12102	Cancellation law for divis...
divdiv1d 12103	Division into a fraction. ...
divdiv2d 12104	Division by a fraction. (...
divmul2d 12105	Relationship between divis...
divmul3d 12106	Relationship between divis...
divassd 12107	An associative law for div...
div12d 12108	A commutative/associative ...
div23d 12109	A commutative/associative ...
divdird 12110	Distribution of division o...
divsubdird 12111	Distribution of division o...
div11d 12112	One-to-one relationship fo...
divmuldivd 12113	Multiplication of two rati...
divmul13d 12114	Swap denominators of two r...
divmul24d 12115	Swap the numerators in the...
divadddivd 12116	Addition of two ratios. T...
divsubdivd 12117	Subtraction of two ratios....
divmuleqd 12118	Cross-multiply in an equal...
divdivdivd 12119	Division of two ratios. T...
diveq1bd 12120	If two complex numbers are...
div2sub 12121	Swap the order of subtract...
div2subd 12122	Swap subtrahend and minuen...
rereccld 12123	Closure law for reciprocal...
redivcld 12124	Closure law for division o...
subrec 12125	Subtraction of reciprocals...
subreci 12126	Subtraction of reciprocals...
subrecd 12127	Subtraction of reciprocals...
mvllmuld 12128	Move the left term in a pr...
mvllmuli 12129	Move the left term in a pr...
ldiv 12130	Left-division. (Contribut...
rdiv 12131	Right-division. (Contribu...
mdiv 12132	A division law. (Contribu...
lineq 12133	Solution of a (scalar) lin...
elimgt0 12134	Hypothesis for weak deduct...
elimge0 12135	Hypothesis for weak deduct...
ltp1 12136	A number is less than itse...
lep1 12137	A number is less than or e...
ltm1 12138	A number minus 1 is less t...
lem1 12139	A number minus 1 is less t...
letrp1 12140	A transitive property of '...
p1le 12141	A transitive property of p...
recgt0 12142	The reciprocal of a positi...
prodgt0 12143	Infer that a multiplicand ...
prodgt02 12144	Infer that a multiplier is...
ltmul1a 12145	Lemma for ~ ltmul1 . Mult...
ltmul1 12146	Multiplication of both sid...
ltmul2 12147	Multiplication of both sid...
lemul1 12148	Multiplication of both sid...
lemul2 12149	Multiplication of both sid...
lemul1a 12150	Multiplication of both sid...
lemul2a 12151	Multiplication of both sid...
ltmul12a 12152	Comparison of product of t...
lemul12b 12153	Comparison of product of t...
lemul12a 12154	Comparison of product of t...
mulgt1OLD 12155	Obsolete version of ~ mulg...
ltmulgt11 12156	Multiplication by a number...
ltmulgt12 12157	Multiplication by a number...
mulgt1 12158	The product of two numbers...
lemulge11 12159	Multiplication by a number...
lemulge12 12160	Multiplication by a number...
ltdiv1 12161	Division of both sides of ...
lediv1 12162	Division of both sides of ...
gt0div 12163	Division of a positive num...
ge0div 12164	Division of a nonnegative ...
divgt0 12165	The ratio of two positive ...
divge0 12166	The ratio of nonnegative a...
mulge0b 12167	A condition for multiplica...
mulle0b 12168	A condition for multiplica...
mulsuble0b 12169	A condition for multiplica...
ltmuldiv 12170	'Less than' relationship b...
ltmuldiv2 12171	'Less than' relationship b...
ltdivmul 12172	'Less than' relationship b...
ledivmul 12173	'Less than or equal to' re...
ltdivmul2 12174	'Less than' relationship b...
lt2mul2div 12175	'Less than' relationship b...
ledivmul2 12176	'Less than or equal to' re...
lemuldiv 12177	'Less than or equal' relat...
lemuldiv2 12178	'Less than or equal' relat...
ltrec 12179	The reciprocal of both sid...
lerec 12180	The reciprocal of both sid...
lt2msq1 12181	Lemma for ~ lt2msq . (Con...
lt2msq 12182	Two nonnegative numbers co...
ltdiv2 12183	Division of a positive num...
ltrec1 12184	Reciprocal swap in a 'less...
lerec2 12185	Reciprocal swap in a 'less...
ledivdiv 12186	Invert ratios of positive ...
lediv2 12187	Division of a positive num...
ltdiv23 12188	Swap denominator with othe...
lediv23 12189	Swap denominator with othe...
lediv12a 12190	Comparison of ratio of two...
lediv2a 12191	Division of both sides of ...
reclt1 12192	The reciprocal of a positi...
recgt1 12193	The reciprocal of a positi...
recgt1i 12194	The reciprocal of a number...
recp1lt1 12195	Construct a number less th...
recreclt 12196	Given a positive number ` ...
le2msq 12197	The square function on non...
msq11 12198	The square of a nonnegativ...
ledivp1 12199	"Less than or equal to" an...
squeeze0 12200	If a nonnegative number is...
ltp1i 12201	A number is less than itse...
recgt0i 12202	The reciprocal of a positi...
recgt0ii 12203	The reciprocal of a positi...
prodgt0i 12204	Infer that a multiplicand ...
divgt0i 12205	The ratio of two positive ...
divge0i 12206	The ratio of nonnegative a...
ltreci 12207	The reciprocal of both sid...
lereci 12208	The reciprocal of both sid...
lt2msqi 12209	The square function on non...
le2msqi 12210	The square function on non...
msq11i 12211	The square of a nonnegativ...
divgt0i2i 12212	The ratio of two positive ...
ltrecii 12213	The reciprocal of both sid...
divgt0ii 12214	The ratio of two positive ...
ltmul1i 12215	Multiplication of both sid...
ltdiv1i 12216	Division of both sides of ...
ltmuldivi 12217	'Less than' relationship b...
ltmul2i 12218	Multiplication of both sid...
lemul1i 12219	Multiplication of both sid...
lemul2i 12220	Multiplication of both sid...
ltdiv23i 12221	Swap denominator with othe...
ledivp1i 12222	"Less than or equal to" an...
ltdivp1i 12223	Less-than and division rel...
ltdiv23ii 12224	Swap denominator with othe...
ltmul1ii 12225	Multiplication of both sid...
ltdiv1ii 12226	Division of both sides of ...
ltp1d 12227	A number is less than itse...
lep1d 12228	A number is less than or e...
ltm1d 12229	A number minus 1 is less t...
lem1d 12230	A number minus 1 is less t...
recgt0d 12231	The reciprocal of a positi...
divgt0d 12232	The ratio of two positive ...
mulgt1d 12233	The product of two numbers...
lemulge11d 12234	Multiplication by a number...
lemulge12d 12235	Multiplication by a number...
lemul1ad 12236	Multiplication of both sid...
lemul2ad 12237	Multiplication of both sid...
ltmul12ad 12238	Comparison of product of t...
lemul12ad 12239	Comparison of product of t...
lemul12bd 12240	Comparison of product of t...
fimaxre 12241	A finite set of real numbe...
fimaxre2 12242	A nonempty finite set of r...
fimaxre3 12243	A nonempty finite set of r...
fiminre 12244	A nonempty finite set of r...
fiminre2 12245	A nonempty finite set of r...
negfi 12246	The negation of a finite s...
lbreu 12247	If a set of reals contains...
lbcl 12248	If a set of reals contains...
lble 12249	If a set of reals contains...
lbinf 12250	If a set of reals contains...
lbinfcl 12251	If a set of reals contains...
lbinfle 12252	If a set of reals contains...
sup2 12253	A nonempty, bounded-above ...
sup3 12254	A version of the completen...
infm3lem 12255	Lemma for ~ infm3 . (Cont...
infm3 12256	The completeness axiom for...
suprcl 12257	Closure of supremum of a n...
suprub 12258	A member of a nonempty bou...
suprubd 12259	Natural deduction form of ...
suprcld 12260	Natural deduction form of ...
suprlub 12261	The supremum of a nonempty...
suprnub 12262	An upper bound is not less...
suprleub 12263	The supremum of a nonempty...
supaddc 12264	The supremum function dist...
supadd 12265	The supremum function dist...
supmul1 12266	The supremum function dist...
supmullem1 12267	Lemma for ~ supmul . (Con...
supmullem2 12268	Lemma for ~ supmul . (Con...
supmul 12269	The supremum function dist...
sup3ii 12270	A version of the completen...
suprclii 12271	Closure of supremum of a n...
suprubii 12272	A member of a nonempty bou...
suprlubii 12273	The supremum of a nonempty...
suprnubii 12274	An upper bound is not less...
suprleubii 12275	The supremum of a nonempty...
riotaneg 12276	The negative of the unique...
negiso 12277	Negation is an order anti-...
dfinfre 12278	The infimum of a set of re...
infrecl 12279	Closure of infimum of a no...
infrenegsup 12280	The infimum of a set of re...
infregelb 12281	Any lower bound of a nonem...
infrelb 12282	If a nonempty set of real ...
infrefilb 12283	The infimum of a finite se...
supfirege 12284	The supremum of a finite s...
inelr 12285	The imaginary unit ` _i ` ...
rimul 12286	A real number times the im...
cru 12287	The representation of comp...
crne0 12288	The real representation of...
creur 12289	The real part of a complex...
creui 12290	The imaginary part of a co...
cju 12291	The complex conjugate of a...
ofsubeq0 12292	Function analogue of ~ sub...
ofnegsub 12293	Function analogue of ~ neg...
ofsubge0 12294	Function analogue of ~ sub...
nnexALT 12297	Alternate proof of ~ nnex ...
peano5nni 12298	Peano's inductive postulat...
nnssre 12299	The positive integers are ...
nnsscn 12300	The positive integers are ...
nnex 12301	The set of positive intege...
nnre 12302	A positive integer is a re...
nncn 12303	A positive integer is a co...
nnrei 12304	A positive integer is a re...
nncni 12305	A positive integer is a co...
1nn 12306	Peano postulate: 1 is a po...
peano2nn 12307	Peano postulate: a success...
dfnn2 12308	Alternate definition of th...
dfnn3 12309	Alternate definition of th...
nnred 12310	A positive integer is a re...
nncnd 12311	A positive integer is a co...
peano2nnd 12312	Peano postulate: a success...
nnind 12313	Principle of Mathematical ...
nnindALT 12314	Principle of Mathematical ...
nnindd 12315	Principle of Mathematical ...
nn1m1nn 12316	Every positive integer is ...
nn1suc 12317	If a statement holds for 1...
nnaddcl 12318	Closure of addition of pos...
nnmulcl 12319	Closure of multiplication ...
nnmulcli 12320	Closure of multiplication ...
nnmtmip 12321	"Minus times minus is plus...
nn2ge 12322	There exists a positive in...
nnge1 12323	A positive integer is one ...
nngt1ne1 12324	A positive integer is grea...
nnle1eq1 12325	A positive integer is less...
nngt0 12326	A positive integer is posi...
nnnlt1 12327	A positive integer is not ...
nnnle0 12328	A positive integer is not ...
nnne0 12329	A positive integer is nonz...
nnneneg 12330	No positive integer is equ...
0nnn 12331	Zero is not a positive int...
0nnnALT 12332	Alternate proof of ~ 0nnn ...
nnne0ALT 12333	Alternate version of ~ nnn...
nngt0i 12334	A positive integer is posi...
nnne0i 12335	A positive integer is nonz...
nndivre 12336	The quotient of a real and...
nnrecre 12337	The reciprocal of a positi...
nnrecgt0 12338	The reciprocal of a positi...
nnsub 12339	Subtraction of positive in...
nnsubi 12340	Subtraction of positive in...
nndiv 12341	Two ways to express " ` A ...
nndivtr 12342	Transitive property of div...
nnge1d 12343	A positive integer is one ...
nngt0d 12344	A positive integer is posi...
nnne0d 12345	A positive integer is nonz...
nnrecred 12346	The reciprocal of a positi...
nnaddcld 12347	Closure of addition of pos...
nnmulcld 12348	Closure of multiplication ...
nndivred 12349	A positive integer is one ...
0ne1 12366	Zero is different from one...
1m1e0 12367	One minus one equals zero....
2nn 12368	2 is a positive integer. ...
2re 12369	The number 2 is real. (Co...
2cn 12370	The number 2 is a complex ...
2cnALT 12371	Alternate proof of ~ 2cn ....
2ex 12372	The number 2 is a set. (C...
2cnd 12373	The number 2 is a complex ...
3nn 12374	3 is a positive integer. ...
3re 12375	The number 3 is real. (Co...
3cn 12376	The number 3 is a complex ...
3ex 12377	The number 3 is a set. (C...
4nn 12378	4 is a positive integer. ...
4re 12379	The number 4 is real. (Co...
4cn 12380	The number 4 is a complex ...
5nn 12381	5 is a positive integer. ...
5re 12382	The number 5 is real. (Co...
5cn 12383	The number 5 is a complex ...
6nn 12384	6 is a positive integer. ...
6re 12385	The number 6 is real. (Co...
6cn 12386	The number 6 is a complex ...
7nn 12387	7 is a positive integer. ...
7re 12388	The number 7 is real. (Co...
7cn 12389	The number 7 is a complex ...
8nn 12390	8 is a positive integer. ...
8re 12391	The number 8 is real. (Co...
8cn 12392	The number 8 is a complex ...
9nn 12393	9 is a positive integer. ...
9re 12394	The number 9 is real. (Co...
9cn 12395	The number 9 is a complex ...
0le0 12396	Zero is nonnegative. (Con...
0le2 12397	The number 0 is less than ...
2pos 12398	The number 2 is positive. ...
2ne0 12399	The number 2 is nonzero. ...
3pos 12400	The number 3 is positive. ...
3ne0 12401	The number 3 is nonzero. ...
4pos 12402	The number 4 is positive. ...
4ne0 12403	The number 4 is nonzero. ...
5pos 12404	The number 5 is positive. ...
6pos 12405	The number 6 is positive. ...
7pos 12406	The number 7 is positive. ...
8pos 12407	The number 8 is positive. ...
9pos 12408	The number 9 is positive. ...
neg1cn 12409	-1 is a complex number. (...
neg1rr 12410	-1 is a real number. (Con...
neg1ne0 12411	-1 is nonzero. (Contribut...
neg1lt0 12412	-1 is less than 0. (Contr...
negneg1e1 12413	` -u -u 1 ` is 1. (Contri...
1pneg1e0 12414	` 1 + -u 1 ` is 0. (Contr...
0m0e0 12415	0 minus 0 equals 0. (Cont...
1m0e1 12416	1 - 0 = 1. (Contributed b...
0p1e1 12417	0 + 1 = 1. (Contributed b...
fv0p1e1 12418	Function value at ` N + 1 ...
1p0e1 12419	1 + 0 = 1. (Contributed b...
1p1e2 12420	1 + 1 = 2. (Contributed b...
2m1e1 12421	2 - 1 = 1. The result is ...
1e2m1 12422	1 = 2 - 1. (Contributed b...
3m1e2 12423	3 - 1 = 2. (Contributed b...
4m1e3 12424	4 - 1 = 3. (Contributed b...
5m1e4 12425	5 - 1 = 4. (Contributed b...
6m1e5 12426	6 - 1 = 5. (Contributed b...
7m1e6 12427	7 - 1 = 6. (Contributed b...
8m1e7 12428	8 - 1 = 7. (Contributed b...
9m1e8 12429	9 - 1 = 8. (Contributed b...
2p2e4 12430	Two plus two equals four. ...
2times 12431	Two times a number. (Cont...
times2 12432	A number times 2. (Contri...
2timesi 12433	Two times a number. (Cont...
times2i 12434	A number times 2. (Contri...
2txmxeqx 12435	Two times a complex number...
2div2e1 12436	2 divided by 2 is 1. (Con...
2p1e3 12437	2 + 1 = 3. (Contributed b...
1p2e3 12438	1 + 2 = 3. For a shorter ...
1p2e3ALT 12439	Alternate proof of ~ 1p2e3...
3p1e4 12440	3 + 1 = 4. (Contributed b...
4p1e5 12441	4 + 1 = 5. (Contributed b...
5p1e6 12442	5 + 1 = 6. (Contributed b...
6p1e7 12443	6 + 1 = 7. (Contributed b...
7p1e8 12444	7 + 1 = 8. (Contributed b...
8p1e9 12445	8 + 1 = 9. (Contributed b...
3p2e5 12446	3 + 2 = 5. (Contributed b...
3p3e6 12447	3 + 3 = 6. (Contributed b...
4p2e6 12448	4 + 2 = 6. (Contributed b...
4p3e7 12449	4 + 3 = 7. (Contributed b...
4p4e8 12450	4 + 4 = 8. (Contributed b...
5p2e7 12451	5 + 2 = 7. (Contributed b...
5p3e8 12452	5 + 3 = 8. (Contributed b...
5p4e9 12453	5 + 4 = 9. (Contributed b...
6p2e8 12454	6 + 2 = 8. (Contributed b...
6p3e9 12455	6 + 3 = 9. (Contributed b...
7p2e9 12456	7 + 2 = 9. (Contributed b...
1t1e1 12457	1 times 1 equals 1. (Cont...
2t1e2 12458	2 times 1 equals 2. (Cont...
2t2e4 12459	2 times 2 equals 4. (Cont...
3t1e3 12460	3 times 1 equals 3. (Cont...
3t2e6 12461	3 times 2 equals 6. (Cont...
3t3e9 12462	3 times 3 equals 9. (Cont...
4t2e8 12463	4 times 2 equals 8. (Cont...
2t0e0 12464	2 times 0 equals 0. (Cont...
4d2e2 12465	One half of four is two. ...
1lt2 12466	1 is less than 2. (Contri...
2lt3 12467	2 is less than 3. (Contri...
1lt3 12468	1 is less than 3. (Contri...
3lt4 12469	3 is less than 4. (Contri...
2lt4 12470	2 is less than 4. (Contri...
1lt4 12471	1 is less than 4. (Contri...
4lt5 12472	4 is less than 5. (Contri...
3lt5 12473	3 is less than 5. (Contri...
2lt5 12474	2 is less than 5. (Contri...
1lt5 12475	1 is less than 5. (Contri...
5lt6 12476	5 is less than 6. (Contri...
4lt6 12477	4 is less than 6. (Contri...
3lt6 12478	3 is less than 6. (Contri...
2lt6 12479	2 is less than 6. (Contri...
1lt6 12480	1 is less than 6. (Contri...
6lt7 12481	6 is less than 7. (Contri...
5lt7 12482	5 is less than 7. (Contri...
4lt7 12483	4 is less than 7. (Contri...
3lt7 12484	3 is less than 7. (Contri...
2lt7 12485	2 is less than 7. (Contri...
1lt7 12486	1 is less than 7. (Contri...
7lt8 12487	7 is less than 8. (Contri...
6lt8 12488	6 is less than 8. (Contri...
5lt8 12489	5 is less than 8. (Contri...
4lt8 12490	4 is less than 8. (Contri...
3lt8 12491	3 is less than 8. (Contri...
2lt8 12492	2 is less than 8. (Contri...
1lt8 12493	1 is less than 8. (Contri...
8lt9 12494	8 is less than 9. (Contri...
7lt9 12495	7 is less than 9. (Contri...
6lt9 12496	6 is less than 9. (Contri...
5lt9 12497	5 is less than 9. (Contri...
4lt9 12498	4 is less than 9. (Contri...
3lt9 12499	3 is less than 9. (Contri...
2lt9 12500	2 is less than 9. (Contri...
1lt9 12501	1 is less than 9. (Contri...
0ne2 12502	0 is not equal to 2. (Con...
1ne2 12503	1 is not equal to 2. (Con...
1le2 12504	1 is less than or equal to...
2cnne0 12505	2 is a nonzero complex num...
2rene0 12506	2 is a nonzero real number...
1le3 12507	1 is less than or equal to...
neg1mulneg1e1 12508	` -u 1 x. -u 1 ` is 1. (C...
halfre 12509	One-half is real. (Contri...
halfcn 12510	One-half is a complex numb...
halfgt0 12511	One-half is greater than z...
halfge0 12512	One-half is not negative. ...
halflt1 12513	One-half is less than one....
1mhlfehlf 12514	Prove that 1 - 1/2 = 1/2. ...
8th4div3 12515	An eighth of four thirds i...
halfpm6th 12516	One half plus or minus one...
it0e0 12517	i times 0 equals 0. (Cont...
2mulicn 12518	` ( 2 x. _i ) e. CC ` . (...
2muline0 12519	` ( 2 x. _i ) =/= 0 ` . (...
halfcl 12520	Closure of half of a numbe...
rehalfcl 12521	Real closure of half. (Co...
half0 12522	Half of a number is zero i...
2halves 12523	Two halves make a whole. ...
halfpos2 12524	A number is positive iff i...
halfpos 12525	A positive number is great...
halfnneg2 12526	A number is nonnegative if...
halfaddsubcl 12527	Closure of half-sum and ha...
halfaddsub 12528	Sum and difference of half...
subhalfhalf 12529	Subtracting the half of a ...
lt2halves 12530	A sum is less than the who...
addltmul 12531	Sum is less than product f...
nominpos 12532	There is no smallest posit...
avglt1 12533	Ordering property for aver...
avglt2 12534	Ordering property for aver...
avgle1 12535	Ordering property for aver...
avgle2 12536	Ordering property for aver...
avgle 12537	The average of two numbers...
2timesd 12538	Two times a number. (Cont...
times2d 12539	A number times 2. (Contri...
halfcld 12540	Closure of half of a numbe...
2halvesd 12541	Two halves make a whole. ...
rehalfcld 12542	Real closure of half. (Co...
lt2halvesd 12543	A sum is less than the who...
rehalfcli 12544	Half a real number is real...
lt2addmuld 12545	If two real numbers are le...
add1p1 12546	Adding two times 1 to a nu...
sub1m1 12547	Subtracting two times 1 fr...
cnm2m1cnm3 12548	Subtracting 2 and afterwar...
xp1d2m1eqxm1d2 12549	A complex number increased...
div4p1lem1div2 12550	An integer greater than 5,...
nnunb 12551	The set of positive intege...
arch 12552	Archimedean property of re...
nnrecl 12553	There exists a positive in...
bndndx 12554	A bounded real sequence ` ...
elnn0 12557	Nonnegative integers expre...
nnssnn0 12558	Positive naturals are a su...
nn0ssre 12559	Nonnegative integers are a...
nn0sscn 12560	Nonnegative integers are a...
nn0ex 12561	The set of nonnegative int...
nnnn0 12562	A positive integer is a no...
nnnn0i 12563	A positive integer is a no...
nn0re 12564	A nonnegative integer is a...
nn0cn 12565	A nonnegative integer is a...
nn0rei 12566	A nonnegative integer is a...
nn0cni 12567	A nonnegative integer is a...
dfn2 12568	The set of positive intege...
elnnne0 12569	The positive integer prope...
0nn0 12570	0 is a nonnegative integer...
1nn0 12571	1 is a nonnegative integer...
2nn0 12572	2 is a nonnegative integer...
3nn0 12573	3 is a nonnegative integer...
4nn0 12574	4 is a nonnegative integer...
5nn0 12575	5 is a nonnegative integer...
6nn0 12576	6 is a nonnegative integer...
7nn0 12577	7 is a nonnegative integer...
8nn0 12578	8 is a nonnegative integer...
9nn0 12579	9 is a nonnegative integer...
nn0ge0 12580	A nonnegative integer is g...
nn0nlt0 12581	A nonnegative integer is n...
nn0ge0i 12582	Nonnegative integers are n...
nn0le0eq0 12583	A nonnegative integer is l...
nn0p1gt0 12584	A nonnegative integer incr...
nnnn0addcl 12585	A positive integer plus a ...
nn0nnaddcl 12586	A nonnegative integer plus...
0mnnnnn0 12587	The result of subtracting ...
un0addcl 12588	If ` S ` is closed under a...
un0mulcl 12589	If ` S ` is closed under m...
nn0addcl 12590	Closure of addition of non...
nn0mulcl 12591	Closure of multiplication ...
nn0addcli 12592	Closure of addition of non...
nn0mulcli 12593	Closure of multiplication ...
nn0p1nn 12594	A nonnegative integer plus...
peano2nn0 12595	Second Peano postulate for...
nnm1nn0 12596	A positive integer minus 1...
elnn0nn 12597	The nonnegative integer pr...
elnnnn0 12598	The positive integer prope...
elnnnn0b 12599	The positive integer prope...
elnnnn0c 12600	The positive integer prope...
nn0addge1 12601	A number is less than or e...
nn0addge2 12602	A number is less than or e...
nn0addge1i 12603	A number is less than or e...
nn0addge2i 12604	A number is less than or e...
nn0sub 12605	Subtraction of nonnegative...
ltsubnn0 12606	Subtracting a nonnegative ...
nn0negleid 12607	A nonnegative integer is g...
difgtsumgt 12608	If the difference of a rea...
nn0le2xi 12609	A nonnegative integer is l...
nn0lele2xi 12610	'Less than or equal to' im...
fcdmnn0supp 12611	Two ways to write the supp...
fcdmnn0fsupp 12612	A function into ` NN0 ` is...
fcdmnn0suppg 12613	Version of ~ fcdmnn0supp a...
fcdmnn0fsuppg 12614	Version of ~ fcdmnn0fsupp ...
nnnn0d 12615	A positive integer is a no...
nn0red 12616	A nonnegative integer is a...
nn0cnd 12617	A nonnegative integer is a...
nn0ge0d 12618	A nonnegative integer is g...
nn0addcld 12619	Closure of addition of non...
nn0mulcld 12620	Closure of multiplication ...
nn0readdcl 12621	Closure law for addition o...
nn0n0n1ge2 12622	A nonnegative integer whic...
nn0n0n1ge2b 12623	A nonnegative integer is n...
nn0ge2m1nn 12624	If a nonnegative integer i...
nn0ge2m1nn0 12625	If a nonnegative integer i...
nn0nndivcl 12626	Closure law for dividing o...
elxnn0 12629	An extended nonnegative in...
nn0ssxnn0 12630	The standard nonnegative i...
nn0xnn0 12631	A standard nonnegative int...
xnn0xr 12632	An extended nonnegative in...
0xnn0 12633	Zero is an extended nonneg...
pnf0xnn0 12634	Positive infinity is an ex...
nn0nepnf 12635	No standard nonnegative in...
nn0xnn0d 12636	A standard nonnegative int...
nn0nepnfd 12637	No standard nonnegative in...
xnn0nemnf 12638	No extended nonnegative in...
xnn0xrnemnf 12639	The extended nonnegative i...
xnn0nnn0pnf 12640	An extended nonnegative in...
elz 12643	Membership in the set of i...
nnnegz 12644	The negative of a positive...
zre 12645	An integer is a real. (Co...
zcn 12646	An integer is a complex nu...
zrei 12647	An integer is a real numbe...
zssre 12648	The integers are a subset ...
zsscn 12649	The integers are a subset ...
zex 12650	The set of integers exists...
elnnz 12651	Positive integer property ...
0z 12652	Zero is an integer. (Cont...
0zd 12653	Zero is an integer, deduct...
elnn0z 12654	Nonnegative integer proper...
elznn0nn 12655	Integer property expressed...
elznn0 12656	Integer property expressed...
elznn 12657	Integer property expressed...
zle0orge1 12658	There is no integer in the...
elz2 12659	Membership in the set of i...
dfz2 12660	Alternative definition of ...
zexALT 12661	Alternate proof of ~ zex ....
nnz 12662	A positive integer is an i...
nnssz 12663	Positive integers are a su...
nn0ssz 12664	Nonnegative integers are a...
nnzOLD 12665	Obsolete version of ~ nnz ...
nn0z 12666	A nonnegative integer is a...
nn0zd 12667	A nonnegative integer is a...
nnzd 12668	A positive integer is an i...
nnzi 12669	A positive integer is an i...
nn0zi 12670	A nonnegative integer is a...
elnnz1 12671	Positive integer property ...
znnnlt1 12672	An integer is not a positi...
nnzrab 12673	Positive integers expresse...
nn0zrab 12674	Nonnegative integers expre...
1z 12675	One is an integer. (Contr...
1zzd 12676	One is an integer, deducti...
2z 12677	2 is an integer. (Contrib...
3z 12678	3 is an integer. (Contrib...
4z 12679	4 is an integer. (Contrib...
znegcl 12680	Closure law for negative i...
neg1z 12681	-1 is an integer. (Contri...
znegclb 12682	A complex number is an int...
nn0negz 12683	The negative of a nonnegat...
nn0negzi 12684	The negative of a nonnegat...
zaddcl 12685	Closure of addition of int...
peano2z 12686	Second Peano postulate gen...
zsubcl 12687	Closure of subtraction of ...
peano2zm 12688	"Reverse" second Peano pos...
zletr 12689	Transitive law of ordering...
zrevaddcl 12690	Reverse closure law for ad...
znnsub 12691	The positive difference of...
znn0sub 12692	The nonnegative difference...
nzadd 12693	The sum of a real number n...
zmulcl 12694	Closure of multiplication ...
zltp1le 12695	Integer ordering relation....
zleltp1 12696	Integer ordering relation....
zlem1lt 12697	Integer ordering relation....
zltlem1 12698	Integer ordering relation....
zgt0ge1 12699	An integer greater than ` ...
nnleltp1 12700	Positive integer ordering ...
nnltp1le 12701	Positive integer ordering ...
nnaddm1cl 12702	Closure of addition of pos...
nn0ltp1le 12703	Nonnegative integer orderi...
nn0leltp1 12704	Nonnegative integer orderi...
nn0ltlem1 12705	Nonnegative integer orderi...
nn0sub2 12706	Subtraction of nonnegative...
nn0lt10b 12707	A nonnegative integer less...
nn0lt2 12708	A nonnegative integer less...
nn0le2is012 12709	A nonnegative integer whic...
nn0lem1lt 12710	Nonnegative integer orderi...
nnlem1lt 12711	Positive integer ordering ...
nnltlem1 12712	Positive integer ordering ...
nnm1ge0 12713	A positive integer decreas...
nn0ge0div 12714	Division of a nonnegative ...
zdiv 12715	Two ways to express " ` M ...
zdivadd 12716	Property of divisibility: ...
zdivmul 12717	Property of divisibility: ...
zextle 12718	An extensionality-like pro...
zextlt 12719	An extensionality-like pro...
recnz 12720	The reciprocal of a number...
btwnnz 12721	A number between an intege...
gtndiv 12722	A larger number does not d...
halfnz 12723	One-half is not an integer...
3halfnz 12724	Three halves is not an int...
suprzcl 12725	The supremum of a bounded-...
prime 12726	Two ways to express " ` A ...
msqznn 12727	The square of a nonzero in...
zneo 12728	No even integer equals an ...
nneo 12729	A positive integer is even...
nneoi 12730	A positive integer is even...
zeo 12731	An integer is even or odd....
zeo2 12732	An integer is even or odd ...
peano2uz2 12733	Second Peano postulate for...
peano5uzi 12734	Peano's inductive postulat...
peano5uzti 12735	Peano's inductive postulat...
dfuzi 12736	An expression for the uppe...
uzind 12737	Induction on the upper int...
uzind2 12738	Induction on the upper int...
uzind3 12739	Induction on the upper int...
nn0ind 12740	Principle of Mathematical ...
nn0indALT 12741	Principle of Mathematical ...
nn0indd 12742	Principle of Mathematical ...
fzind 12743	Induction on the integers ...
fnn0ind 12744	Induction on the integers ...
nn0ind-raph 12745	Principle of Mathematical ...
zindd 12746	Principle of Mathematical ...
fzindd 12747	Induction on the integers ...
btwnz 12748	Any real number can be san...
zred 12749	An integer is a real numbe...
zcnd 12750	An integer is a complex nu...
znegcld 12751	Closure law for negative i...
peano2zd 12752	Deduction from second Pean...
zaddcld 12753	Closure of addition of int...
zsubcld 12754	Closure of subtraction of ...
zmulcld 12755	Closure of multiplication ...
znnn0nn 12756	The negative of a negative...
zadd2cl 12757	Increasing an integer by 2...
zriotaneg 12758	The negative of the unique...
suprfinzcl 12759	The supremum of a nonempty...
9p1e10 12762	9 + 1 = 10. (Contributed ...
dfdec10 12763	Version of the definition ...
decex 12764	A decimal number is a set....
deceq1 12765	Equality theorem for the d...
deceq2 12766	Equality theorem for the d...
deceq1i 12767	Equality theorem for the d...
deceq2i 12768	Equality theorem for the d...
deceq12i 12769	Equality theorem for the d...
numnncl 12770	Closure for a numeral (wit...
num0u 12771	Add a zero in the units pl...
num0h 12772	Add a zero in the higher p...
numcl 12773	Closure for a decimal inte...
numsuc 12774	The successor of a decimal...
deccl 12775	Closure for a numeral. (C...
10nn 12776	10 is a positive integer. ...
10pos 12777	The number 10 is positive....
10nn0 12778	10 is a nonnegative intege...
10re 12779	The number 10 is real. (C...
decnncl 12780	Closure for a numeral. (C...
dec0u 12781	Add a zero in the units pl...
dec0h 12782	Add a zero in the higher p...
numnncl2 12783	Closure for a decimal inte...
decnncl2 12784	Closure for a decimal inte...
numlt 12785	Comparing two decimal inte...
numltc 12786	Comparing two decimal inte...
le9lt10 12787	A "decimal digit" (i.e. a ...
declt 12788	Comparing two decimal inte...
decltc 12789	Comparing two decimal inte...
declth 12790	Comparing two decimal inte...
decsuc 12791	The successor of a decimal...
3declth 12792	Comparing two decimal inte...
3decltc 12793	Comparing two decimal inte...
decle 12794	Comparing two decimal inte...
decleh 12795	Comparing two decimal inte...
declei 12796	Comparing a digit to a dec...
numlti 12797	Comparing a digit to a dec...
declti 12798	Comparing a digit to a dec...
decltdi 12799	Comparing a digit to a dec...
numsucc 12800	The successor of a decimal...
decsucc 12801	The successor of a decimal...
1e0p1 12802	The successor of zero. (C...
dec10p 12803	Ten plus an integer. (Con...
numma 12804	Perform a multiply-add of ...
nummac 12805	Perform a multiply-add of ...
numma2c 12806	Perform a multiply-add of ...
numadd 12807	Add two decimal integers `...
numaddc 12808	Add two decimal integers `...
nummul1c 12809	The product of a decimal i...
nummul2c 12810	The product of a decimal i...
decma 12811	Perform a multiply-add of ...
decmac 12812	Perform a multiply-add of ...
decma2c 12813	Perform a multiply-add of ...
decadd 12814	Add two numerals ` M ` and...
decaddc 12815	Add two numerals ` M ` and...
decaddc2 12816	Add two numerals ` M ` and...
decrmanc 12817	Perform a multiply-add of ...
decrmac 12818	Perform a multiply-add of ...
decaddm10 12819	The sum of two multiples o...
decaddi 12820	Add two numerals ` M ` and...
decaddci 12821	Add two numerals ` M ` and...
decaddci2 12822	Add two numerals ` M ` and...
decsubi 12823	Difference between a numer...
decmul1 12824	The product of a numeral w...
decmul1c 12825	The product of a numeral w...
decmul2c 12826	The product of a numeral w...
decmulnc 12827	The product of a numeral w...
11multnc 12828	The product of 11 (as nume...
decmul10add 12829	A multiplication of a numb...
6p5lem 12830	Lemma for ~ 6p5e11 and rel...
5p5e10 12831	5 + 5 = 10. (Contributed ...
6p4e10 12832	6 + 4 = 10. (Contributed ...
6p5e11 12833	6 + 5 = 11. (Contributed ...
6p6e12 12834	6 + 6 = 12. (Contributed ...
7p3e10 12835	7 + 3 = 10. (Contributed ...
7p4e11 12836	7 + 4 = 11. (Contributed ...
7p5e12 12837	7 + 5 = 12. (Contributed ...
7p6e13 12838	7 + 6 = 13. (Contributed ...
7p7e14 12839	7 + 7 = 14. (Contributed ...
8p2e10 12840	8 + 2 = 10. (Contributed ...
8p3e11 12841	8 + 3 = 11. (Contributed ...
8p4e12 12842	8 + 4 = 12. (Contributed ...
8p5e13 12843	8 + 5 = 13. (Contributed ...
8p6e14 12844	8 + 6 = 14. (Contributed ...
8p7e15 12845	8 + 7 = 15. (Contributed ...
8p8e16 12846	8 + 8 = 16. (Contributed ...
9p2e11 12847	9 + 2 = 11. (Contributed ...
9p3e12 12848	9 + 3 = 12. (Contributed ...
9p4e13 12849	9 + 4 = 13. (Contributed ...
9p5e14 12850	9 + 5 = 14. (Contributed ...
9p6e15 12851	9 + 6 = 15. (Contributed ...
9p7e16 12852	9 + 7 = 16. (Contributed ...
9p8e17 12853	9 + 8 = 17. (Contributed ...
9p9e18 12854	9 + 9 = 18. (Contributed ...
10p10e20 12855	10 + 10 = 20. (Contribute...
10m1e9 12856	10 - 1 = 9. (Contributed ...
4t3lem 12857	Lemma for ~ 4t3e12 and rel...
4t3e12 12858	4 times 3 equals 12. (Con...
4t4e16 12859	4 times 4 equals 16. (Con...
5t2e10 12860	5 times 2 equals 10. (Con...
5t3e15 12861	5 times 3 equals 15. (Con...
5t4e20 12862	5 times 4 equals 20. (Con...
5t5e25 12863	5 times 5 equals 25. (Con...
6t2e12 12864	6 times 2 equals 12. (Con...
6t3e18 12865	6 times 3 equals 18. (Con...
6t4e24 12866	6 times 4 equals 24. (Con...
6t5e30 12867	6 times 5 equals 30. (Con...
6t6e36 12868	6 times 6 equals 36. (Con...
7t2e14 12869	7 times 2 equals 14. (Con...
7t3e21 12870	7 times 3 equals 21. (Con...
7t4e28 12871	7 times 4 equals 28. (Con...
7t5e35 12872	7 times 5 equals 35. (Con...
7t6e42 12873	7 times 6 equals 42. (Con...
7t7e49 12874	7 times 7 equals 49. (Con...
8t2e16 12875	8 times 2 equals 16. (Con...
8t3e24 12876	8 times 3 equals 24. (Con...
8t4e32 12877	8 times 4 equals 32. (Con...
8t5e40 12878	8 times 5 equals 40. (Con...
8t6e48 12879	8 times 6 equals 48. (Con...
8t7e56 12880	8 times 7 equals 56. (Con...
8t8e64 12881	8 times 8 equals 64. (Con...
9t2e18 12882	9 times 2 equals 18. (Con...
9t3e27 12883	9 times 3 equals 27. (Con...
9t4e36 12884	9 times 4 equals 36. (Con...
9t5e45 12885	9 times 5 equals 45. (Con...
9t6e54 12886	9 times 6 equals 54. (Con...
9t7e63 12887	9 times 7 equals 63. (Con...
9t8e72 12888	9 times 8 equals 72. (Con...
9t9e81 12889	9 times 9 equals 81. (Con...
9t11e99 12890	9 times 11 equals 99. (Co...
9lt10 12891	9 is less than 10. (Contr...
8lt10 12892	8 is less than 10. (Contr...
7lt10 12893	7 is less than 10. (Contr...
6lt10 12894	6 is less than 10. (Contr...
5lt10 12895	5 is less than 10. (Contr...
4lt10 12896	4 is less than 10. (Contr...
3lt10 12897	3 is less than 10. (Contr...
2lt10 12898	2 is less than 10. (Contr...
1lt10 12899	1 is less than 10. (Contr...
decbin0 12900	Decompose base 4 into base...
decbin2 12901	Decompose base 4 into base...
decbin3 12902	Decompose base 4 into base...
halfthird 12903	Half minus a third. (Cont...
5recm6rec 12904	One fifth minus one sixth....
uzval 12907	The value of the upper int...
uzf 12908	The domain and codomain of...
eluz1 12909	Membership in the upper se...
eluzel2 12910	Implication of membership ...
eluz2 12911	Membership in an upper set...
eluzmn 12912	Membership in an earlier u...
eluz1i 12913	Membership in an upper set...
eluzuzle 12914	An integer in an upper set...
eluzelz 12915	A member of an upper set o...
eluzelre 12916	A member of an upper set o...
eluzelcn 12917	A member of an upper set o...
eluzle 12918	Implication of membership ...
eluz 12919	Membership in an upper set...
uzid 12920	Membership of the least me...
uzidd 12921	Membership of the least me...
uzn0 12922	The upper integers are all...
uztrn 12923	Transitive law for sets of...
uztrn2 12924	Transitive law for sets of...
uzneg 12925	Contraposition law for upp...
uzssz 12926	An upper set of integers i...
uzssre 12927	An upper set of integers i...
uzss 12928	Subset relationship for tw...
uztric 12929	Totality of the ordering r...
uz11 12930	The upper integers functio...
eluzp1m1 12931	Membership in the next upp...
eluzp1l 12932	Strict ordering implied by...
eluzp1p1 12933	Membership in the next upp...
eluzadd 12934	Membership in a later uppe...
eluzsub 12935	Membership in an earlier u...
eluzaddi 12936	Membership in a later uppe...
eluzaddiOLD 12937	Obsolete version of ~ eluz...
eluzsubi 12938	Membership in an earlier u...
eluzsubiOLD 12939	Obsolete version of ~ eluz...
eluzaddOLD 12940	Obsolete version of ~ eluz...
eluzsubOLD 12941	Obsolete version of ~ eluz...
subeluzsub 12942	Membership of a difference...
uzm1 12943	Choices for an element of ...
uznn0sub 12944	The nonnegative difference...
uzin 12945	Intersection of two upper ...
uzp1 12946	Choices for an element of ...
nn0uz 12947	Nonnegative integers expre...
nnuz 12948	Positive integers expresse...
elnnuz 12949	A positive integer express...
elnn0uz 12950	A nonnegative integer expr...
eluz2nn 12951	An integer greater than or...
eluz4eluz2 12952	An integer greater than or...
eluz4nn 12953	An integer greater than or...
eluzge2nn0 12954	If an integer is greater t...
eluz2n0 12955	An integer greater than or...
uzuzle23 12956	An integer in the upper se...
eluzge3nn 12957	If an integer is greater t...
uz3m2nn 12958	An integer greater than or...
1eluzge0 12959	1 is an integer greater th...
2eluzge0 12960	2 is an integer greater th...
2eluzge1 12961	2 is an integer greater th...
uznnssnn 12962	The upper integers startin...
raluz 12963	Restricted universal quant...
raluz2 12964	Restricted universal quant...
rexuz 12965	Restricted existential qua...
rexuz2 12966	Restricted existential qua...
2rexuz 12967	Double existential quantif...
peano2uz 12968	Second Peano postulate for...
peano2uzs 12969	Second Peano postulate for...
peano2uzr 12970	Reversed second Peano axio...
uzaddcl 12971	Addition closure law for a...
nn0pzuz 12972	The sum of a nonnegative i...
uzind4 12973	Induction on the upper set...
uzind4ALT 12974	Induction on the upper set...
uzind4s 12975	Induction on the upper set...
uzind4s2 12976	Induction on the upper set...
uzind4i 12977	Induction on the upper int...
uzwo 12978	Well-ordering principle: a...
uzwo2 12979	Well-ordering principle: a...
nnwo 12980	Well-ordering principle: a...
nnwof 12981	Well-ordering principle: a...
nnwos 12982	Well-ordering principle: a...
indstr 12983	Strong Mathematical Induct...
eluznn0 12984	Membership in a nonnegativ...
eluznn 12985	Membership in a positive u...
eluz2b1 12986	Two ways to say "an intege...
eluz2gt1 12987	An integer greater than or...
eluz2b2 12988	Two ways to say "an intege...
eluz2b3 12989	Two ways to say "an intege...
uz2m1nn 12990	One less than an integer g...
1nuz2 12991	1 is not in ` ( ZZ>= `` 2 ...
elnn1uz2 12992	A positive integer is eith...
uz2mulcl 12993	Closure of multiplication ...
indstr2 12994	Strong Mathematical Induct...
uzinfi 12995	Extract the lower bound of...
nninf 12996	The infimum of the set of ...
nn0inf 12997	The infimum of the set of ...
infssuzle 12998	The infimum of a subset of...
infssuzcl 12999	The infimum of a subset of...
ublbneg 13000	The image under negation o...
eqreznegel 13001	Two ways to express the im...
supminf 13002	The supremum of a bounded-...
lbzbi 13003	If a set of reals is bound...
zsupss 13004	Any nonempty bounded subse...
suprzcl2 13005	The supremum of a bounded-...
suprzub 13006	The supremum of a bounded-...
uzsupss 13007	Any bounded subset of an u...
nn01to3 13008	A (nonnegative) integer be...
nn0ge2m1nnALT 13009	Alternate proof of ~ nn0ge...
uzwo3 13010	Well-ordering principle: a...
zmin 13011	There is a unique smallest...
zmax 13012	There is a unique largest ...
zbtwnre 13013	There is a unique integer ...
rebtwnz 13014	There is a unique greatest...
elq 13017	Membership in the set of r...
qmulz 13018	If ` A ` is rational, then...
znq 13019	The ratio of an integer an...
qre 13020	A rational number is a rea...
zq 13021	An integer is a rational n...
qred 13022	A rational number is a rea...
zssq 13023	The integers are a subset ...
nn0ssq 13024	The nonnegative integers a...
nnssq 13025	The positive integers are ...
qssre 13026	The rationals are a subset...
qsscn 13027	The rationals are a subset...
qex 13028	The set of rational number...
nnq 13029	A positive integer is rati...
qcn 13030	A rational number is a com...
qexALT 13031	Alternate proof of ~ qex ....
qaddcl 13032	Closure of addition of rat...
qnegcl 13033	Closure law for the negati...
qmulcl 13034	Closure of multiplication ...
qsubcl 13035	Closure of subtraction of ...
qreccl 13036	Closure of reciprocal of r...
qdivcl 13037	Closure of division of rat...
qrevaddcl 13038	Reverse closure law for ad...
nnrecq 13039	The reciprocal of a positi...
irradd 13040	The sum of an irrational n...
irrmul 13041	The product of an irration...
elpq 13042	A positive rational is the...
elpqb 13043	A class is a positive rati...
rpnnen1lem2 13044	Lemma for ~ rpnnen1 . (Co...
rpnnen1lem1 13045	Lemma for ~ rpnnen1 . (Co...
rpnnen1lem3 13046	Lemma for ~ rpnnen1 . (Co...
rpnnen1lem4 13047	Lemma for ~ rpnnen1 . (Co...
rpnnen1lem5 13048	Lemma for ~ rpnnen1 . (Co...
rpnnen1lem6 13049	Lemma for ~ rpnnen1 . (Co...
rpnnen1 13050	One half of ~ rpnnen , whe...
reexALT 13051	Alternate proof of ~ reex ...
cnref1o 13052	There is a natural one-to-...
cnexALT 13053	The set of complex numbers...
xrex 13054	The set of extended reals ...
mpoaddex 13055	The addition operation is ...
addex 13056	The addition operation is ...
mpomulex 13057	The multiplication operati...
mulex 13058	The multiplication operati...
elrp 13061	Membership in the set of p...
elrpii 13062	Membership in the set of p...
1rp 13063	1 is a positive real. (Co...
2rp 13064	2 is a positive real. (Co...
3rp 13065	3 is a positive real. (Co...
rpssre 13066	The positive reals are a s...
rpre 13067	A positive real is a real....
rpxr 13068	A positive real is an exte...
rpcn 13069	A positive real is a compl...
nnrp 13070	A positive integer is a po...
rpgt0 13071	A positive real is greater...
rpge0 13072	A positive real is greater...
rpregt0 13073	A positive real is a posit...
rprege0 13074	A positive real is a nonne...
rpne0 13075	A positive real is nonzero...
rprene0 13076	A positive real is a nonze...
rpcnne0 13077	A positive real is a nonze...
rpcndif0 13078	A positive real number is ...
ralrp 13079	Quantification over positi...
rexrp 13080	Quantification over positi...
rpaddcl 13081	Closure law for addition o...
rpmulcl 13082	Closure law for multiplica...
rpmtmip 13083	"Minus times minus is plus...
rpdivcl 13084	Closure law for division o...
rpreccl 13085	Closure law for reciprocat...
rphalfcl 13086	Closure law for half of a ...
rpgecl 13087	A number greater than or e...
rphalflt 13088	Half of a positive real is...
rerpdivcl 13089	Closure law for division o...
ge0p1rp 13090	A nonnegative number plus ...
rpneg 13091	Either a nonzero real or i...
negelrp 13092	Elementhood of a negation ...
negelrpd 13093	The negation of a negative...
0nrp 13094	Zero is not a positive rea...
ltsubrp 13095	Subtracting a positive rea...
ltaddrp 13096	Adding a positive number t...
difrp 13097	Two ways to say one number...
elrpd 13098	Membership in the set of p...
nnrpd 13099	A positive integer is a po...
zgt1rpn0n1 13100	An integer greater than 1 ...
rpred 13101	A positive real is a real....
rpxrd 13102	A positive real is an exte...
rpcnd 13103	A positive real is a compl...
rpgt0d 13104	A positive real is greater...
rpge0d 13105	A positive real is greater...
rpne0d 13106	A positive real is nonzero...
rpregt0d 13107	A positive real is real an...
rprege0d 13108	A positive real is real an...
rprene0d 13109	A positive real is a nonze...
rpcnne0d 13110	A positive real is a nonze...
rpreccld 13111	Closure law for reciprocat...
rprecred 13112	Closure law for reciprocat...
rphalfcld 13113	Closure law for half of a ...
reclt1d 13114	The reciprocal of a positi...
recgt1d 13115	The reciprocal of a positi...
rpaddcld 13116	Closure law for addition o...
rpmulcld 13117	Closure law for multiplica...
rpdivcld 13118	Closure law for division o...
ltrecd 13119	The reciprocal of both sid...
lerecd 13120	The reciprocal of both sid...
ltrec1d 13121	Reciprocal swap in a 'less...
lerec2d 13122	Reciprocal swap in a 'less...
lediv2ad 13123	Division of both sides of ...
ltdiv2d 13124	Division of a positive num...
lediv2d 13125	Division of a positive num...
ledivdivd 13126	Invert ratios of positive ...
divge1 13127	The ratio of a number over...
divlt1lt 13128	A real number divided by a...
divle1le 13129	A real number divided by a...
ledivge1le 13130	If a number is less than o...
ge0p1rpd 13131	A nonnegative number plus ...
rerpdivcld 13132	Closure law for division o...
ltsubrpd 13133	Subtracting a positive rea...
ltaddrpd 13134	Adding a positive number t...
ltaddrp2d 13135	Adding a positive number t...
ltmulgt11d 13136	Multiplication by a number...
ltmulgt12d 13137	Multiplication by a number...
gt0divd 13138	Division of a positive num...
ge0divd 13139	Division of a nonnegative ...
rpgecld 13140	A number greater than or e...
divge0d 13141	The ratio of nonnegative a...
ltmul1d 13142	The ratio of nonnegative a...
ltmul2d 13143	Multiplication of both sid...
lemul1d 13144	Multiplication of both sid...
lemul2d 13145	Multiplication of both sid...
ltdiv1d 13146	Division of both sides of ...
lediv1d 13147	Division of both sides of ...
ltmuldivd 13148	'Less than' relationship b...
ltmuldiv2d 13149	'Less than' relationship b...
lemuldivd 13150	'Less than or equal to' re...
lemuldiv2d 13151	'Less than or equal to' re...
ltdivmuld 13152	'Less than' relationship b...
ltdivmul2d 13153	'Less than' relationship b...
ledivmuld 13154	'Less than or equal to' re...
ledivmul2d 13155	'Less than or equal to' re...
ltmul1dd 13156	The ratio of nonnegative a...
ltmul2dd 13157	Multiplication of both sid...
ltdiv1dd 13158	Division of both sides of ...
lediv1dd 13159	Division of both sides of ...
lediv12ad 13160	Comparison of ratio of two...
mul2lt0rlt0 13161	If the result of a multipl...
mul2lt0rgt0 13162	If the result of a multipl...
mul2lt0llt0 13163	If the result of a multipl...
mul2lt0lgt0 13164	If the result of a multipl...
mul2lt0bi 13165	If the result of a multipl...
prodge0rd 13166	Infer that a multiplicand ...
prodge0ld 13167	Infer that a multiplier is...
ltdiv23d 13168	Swap denominator with othe...
lediv23d 13169	Swap denominator with othe...
lt2mul2divd 13170	The ratio of nonnegative a...
nnledivrp 13171	Division of a positive int...
nn0ledivnn 13172	Division of a nonnegative ...
addlelt 13173	If the sum of a real numbe...
ltxr 13180	The 'less than' binary rel...
elxr 13181	Membership in the set of e...
xrnemnf 13182	An extended real other tha...
xrnepnf 13183	An extended real other tha...
xrltnr 13184	The extended real 'less th...
ltpnf 13185	Any (finite) real is less ...
ltpnfd 13186	Any (finite) real is less ...
0ltpnf 13187	Zero is less than plus inf...
mnflt 13188	Minus infinity is less tha...
mnfltd 13189	Minus infinity is less tha...
mnflt0 13190	Minus infinity is less tha...
mnfltpnf 13191	Minus infinity is less tha...
mnfltxr 13192	Minus infinity is less tha...
pnfnlt 13193	No extended real is greate...
nltmnf 13194	No extended real is less t...
pnfge 13195	Plus infinity is an upper ...
xnn0n0n1ge2b 13196	An extended nonnegative in...
0lepnf 13197	0 less than or equal to po...
xnn0ge0 13198	An extended nonnegative in...
mnfle 13199	Minus infinity is less tha...
mnfled 13200	Minus infinity is less tha...
xrltnsym 13201	Ordering on the extended r...
xrltnsym2 13202	'Less than' is antisymmetr...
xrlttri 13203	Ordering on the extended r...
xrlttr 13204	Ordering on the extended r...
xrltso 13205	'Less than' is a strict or...
xrlttri2 13206	Trichotomy law for 'less t...
xrlttri3 13207	Trichotomy law for 'less t...
xrleloe 13208	'Less than or equal' expre...
xrleltne 13209	'Less than or equal to' im...
xrltlen 13210	'Less than' expressed in t...
dfle2 13211	Alternative definition of ...
dflt2 13212	Alternative definition of ...
xrltle 13213	'Less than' implies 'less ...
xrltled 13214	'Less than' implies 'less ...
xrleid 13215	'Less than or equal to' is...
xrleidd 13216	'Less than or equal to' is...
xrletri 13217	Trichotomy law for extende...
xrletri3 13218	Trichotomy law for extende...
xrletrid 13219	Trichotomy law for extende...
xrlelttr 13220	Transitive law for orderin...
xrltletr 13221	Transitive law for orderin...
xrletr 13222	Transitive law for orderin...
xrlttrd 13223	Transitive law for orderin...
xrlelttrd 13224	Transitive law for orderin...
xrltletrd 13225	Transitive law for orderin...
xrletrd 13226	Transitive law for orderin...
xrltne 13227	'Less than' implies not eq...
nltpnft 13228	An extended real is not le...
xgepnf 13229	An extended real which is ...
ngtmnft 13230	An extended real is not gr...
xlemnf 13231	An extended real which is ...
xrrebnd 13232	An extended real is real i...
xrre 13233	A way of proving that an e...
xrre2 13234	An extended real between t...
xrre3 13235	A way of proving that an e...
ge0gtmnf 13236	A nonnegative extended rea...
ge0nemnf 13237	A nonnegative extended rea...
xrrege0 13238	A nonnegative extended rea...
xrmax1 13239	An extended real is less t...
xrmax2 13240	An extended real is less t...
xrmin1 13241	The minimum of two extende...
xrmin2 13242	The minimum of two extende...
xrmaxeq 13243	The maximum of two extende...
xrmineq 13244	The minimum of two extende...
xrmaxlt 13245	Two ways of saying the max...
xrltmin 13246	Two ways of saying an exte...
xrmaxle 13247	Two ways of saying the max...
xrlemin 13248	Two ways of saying a numbe...
max1 13249	A number is less than or e...
max1ALT 13250	A number is less than or e...
max2 13251	A number is less than or e...
2resupmax 13252	The supremum of two real n...
min1 13253	The minimum of two numbers...
min2 13254	The minimum of two numbers...
maxle 13255	Two ways of saying the max...
lemin 13256	Two ways of saying a numbe...
maxlt 13257	Two ways of saying the max...
ltmin 13258	Two ways of saying a numbe...
lemaxle 13259	A real number which is les...
max0sub 13260	Decompose a real number in...
ifle 13261	An if statement transforms...
z2ge 13262	There exists an integer gr...
qbtwnre 13263	The rational numbers are d...
qbtwnxr 13264	The rational numbers are d...
qsqueeze 13265	If a nonnegative real is l...
qextltlem 13266	Lemma for ~ qextlt and qex...
qextlt 13267	An extensionality-like pro...
qextle 13268	An extensionality-like pro...
xralrple 13269	Show that ` A ` is less th...
alrple 13270	Show that ` A ` is less th...
xnegeq 13271	Equality of two extended n...
xnegex 13272	A negative extended real e...
xnegpnf 13273	Minus ` +oo ` . Remark of...
xnegmnf 13274	Minus ` -oo ` . Remark of...
rexneg 13275	Minus a real number. Rema...
xneg0 13276	The negative of zero. (Co...
xnegcl 13277	Closure of extended real n...
xnegneg 13278	Extended real version of ~...
xneg11 13279	Extended real version of ~...
xltnegi 13280	Forward direction of ~ xlt...
xltneg 13281	Extended real version of ~...
xleneg 13282	Extended real version of ~...
xlt0neg1 13283	Extended real version of ~...
xlt0neg2 13284	Extended real version of ~...
xle0neg1 13285	Extended real version of ~...
xle0neg2 13286	Extended real version of ~...
xaddval 13287	Value of the extended real...
xaddf 13288	The extended real addition...
xmulval 13289	Value of the extended real...
xaddpnf1 13290	Addition of positive infin...
xaddpnf2 13291	Addition of positive infin...
xaddmnf1 13292	Addition of negative infin...
xaddmnf2 13293	Addition of negative infin...
pnfaddmnf 13294	Addition of positive and n...
mnfaddpnf 13295	Addition of negative and p...
rexadd 13296	The extended real addition...
rexsub 13297	Extended real subtraction ...
rexaddd 13298	The extended real addition...
xnn0xaddcl 13299	The extended nonnegative i...
xaddnemnf 13300	Closure of extended real a...
xaddnepnf 13301	Closure of extended real a...
xnegid 13302	Extended real version of ~...
xaddcl 13303	The extended real addition...
xaddcom 13304	The extended real addition...
xaddrid 13305	Extended real version of ~...
xaddlid 13306	Extended real version of ~...
xaddridd 13307	` 0 ` is a right identity ...
xnn0lem1lt 13308	Extended nonnegative integ...
xnn0lenn0nn0 13309	An extended nonnegative in...
xnn0le2is012 13310	An extended nonnegative in...
xnn0xadd0 13311	The sum of two extended no...
xnegdi 13312	Extended real version of ~...
xaddass 13313	Associativity of extended ...
xaddass2 13314	Associativity of extended ...
xpncan 13315	Extended real version of ~...
xnpcan 13316	Extended real version of ~...
xleadd1a 13317	Extended real version of ~...
xleadd2a 13318	Commuted form of ~ xleadd1...
xleadd1 13319	Weakened version of ~ xlea...
xltadd1 13320	Extended real version of ~...
xltadd2 13321	Extended real version of ~...
xaddge0 13322	The sum of nonnegative ext...
xle2add 13323	Extended real version of ~...
xlt2add 13324	Extended real version of ~...
xsubge0 13325	Extended real version of ~...
xposdif 13326	Extended real version of ~...
xlesubadd 13327	Under certain conditions, ...
xmullem 13328	Lemma for ~ rexmul . (Con...
xmullem2 13329	Lemma for ~ xmulneg1 . (C...
xmulcom 13330	Extended real multiplicati...
xmul01 13331	Extended real version of ~...
xmul02 13332	Extended real version of ~...
xmulneg1 13333	Extended real version of ~...
xmulneg2 13334	Extended real version of ~...
rexmul 13335	The extended real multipli...
xmulf 13336	The extended real multipli...
xmulcl 13337	Closure of extended real m...
xmulpnf1 13338	Multiplication by plus inf...
xmulpnf2 13339	Multiplication by plus inf...
xmulmnf1 13340	Multiplication by minus in...
xmulmnf2 13341	Multiplication by minus in...
xmulpnf1n 13342	Multiplication by plus inf...
xmulrid 13343	Extended real version of ~...
xmullid 13344	Extended real version of ~...
xmulm1 13345	Extended real version of ~...
xmulasslem2 13346	Lemma for ~ xmulass . (Co...
xmulgt0 13347	Extended real version of ~...
xmulge0 13348	Extended real version of ~...
xmulasslem 13349	Lemma for ~ xmulass . (Co...
xmulasslem3 13350	Lemma for ~ xmulass . (Co...
xmulass 13351	Associativity of the exten...
xlemul1a 13352	Extended real version of ~...
xlemul2a 13353	Extended real version of ~...
xlemul1 13354	Extended real version of ~...
xlemul2 13355	Extended real version of ~...
xltmul1 13356	Extended real version of ~...
xltmul2 13357	Extended real version of ~...
xadddilem 13358	Lemma for ~ xadddi . (Con...
xadddi 13359	Distributive property for ...
xadddir 13360	Commuted version of ~ xadd...
xadddi2 13361	The assumption that the mu...
xadddi2r 13362	Commuted version of ~ xadd...
x2times 13363	Extended real version of ~...
xnegcld 13364	Closure of extended real n...
xaddcld 13365	The extended real addition...
xmulcld 13366	Closure of extended real m...
xadd4d 13367	Rearrangement of 4 terms i...
xnn0add4d 13368	Rearrangement of 4 terms i...
xrsupexmnf 13369	Adding minus infinity to a...
xrinfmexpnf 13370	Adding plus infinity to a ...
xrsupsslem 13371	Lemma for ~ xrsupss . (Co...
xrinfmsslem 13372	Lemma for ~ xrinfmss . (C...
xrsupss 13373	Any subset of extended rea...
xrinfmss 13374	Any subset of extended rea...
xrinfmss2 13375	Any subset of extended rea...
xrub 13376	By quantifying only over r...
supxr 13377	The supremum of a set of e...
supxr2 13378	The supremum of a set of e...
supxrcl 13379	The supremum of an arbitra...
supxrun 13380	The supremum of the union ...
supxrmnf 13381	Adding minus infinity to a...
supxrpnf 13382	The supremum of a set of e...
supxrunb1 13383	The supremum of an unbound...
supxrunb2 13384	The supremum of an unbound...
supxrbnd1 13385	The supremum of a bounded-...
supxrbnd2 13386	The supremum of a bounded-...
xrsup0 13387	The supremum of an empty s...
supxrub 13388	A member of a set of exten...
supxrlub 13389	The supremum of a set of e...
supxrleub 13390	The supremum of a set of e...
supxrre 13391	The real and extended real...
supxrbnd 13392	The supremum of a bounded-...
supxrgtmnf 13393	The supremum of a nonempty...
supxrre1 13394	The supremum of a nonempty...
supxrre2 13395	The supremum of a nonempty...
supxrss 13396	Smaller sets of extended r...
infxrcl 13397	The infimum of an arbitrar...
infxrlb 13398	A member of a set of exten...
infxrgelb 13399	The infimum of a set of ex...
infxrre 13400	The real and extended real...
infxrmnf 13401	The infinimum of a set of ...
xrinf0 13402	The infimum of the empty s...
infxrss 13403	Larger sets of extended re...
reltre 13404	For all real numbers there...
rpltrp 13405	For all positive real numb...
reltxrnmnf 13406	For all extended real numb...
infmremnf 13407	The infimum of the reals i...
infmrp1 13408	The infimum of the positiv...
ixxval 13417	Value of the interval func...
elixx1 13418	Membership in an interval ...
ixxf 13419	The set of intervals of ex...
ixxex 13420	The set of intervals of ex...
ixxssxr 13421	The set of intervals of ex...
elixx3g 13422	Membership in a set of ope...
ixxssixx 13423	An interval is a subset of...
ixxdisj 13424	Split an interval into dis...
ixxun 13425	Split an interval into two...
ixxin 13426	Intersection of two interv...
ixxss1 13427	Subset relationship for in...
ixxss2 13428	Subset relationship for in...
ixxss12 13429	Subset relationship for in...
ixxub 13430	Extract the upper bound of...
ixxlb 13431	Extract the lower bound of...
iooex 13432	The set of open intervals ...
iooval 13433	Value of the open interval...
ioo0 13434	An empty open interval of ...
ioon0 13435	An open interval of extend...
ndmioo 13436	The open interval function...
iooid 13437	An open interval with iden...
elioo3g 13438	Membership in a set of ope...
elioore 13439	A member of an open interv...
lbioo 13440	An open interval does not ...
ubioo 13441	An open interval does not ...
iooval2 13442	Value of the open interval...
iooin 13443	Intersection of two open i...
iooss1 13444	Subset relationship for op...
iooss2 13445	Subset relationship for op...
iocval 13446	Value of the open-below, c...
icoval 13447	Value of the closed-below,...
iccval 13448	Value of the closed interv...
elioo1 13449	Membership in an open inte...
elioo2 13450	Membership in an open inte...
elioc1 13451	Membership in an open-belo...
elico1 13452	Membership in a closed-bel...
elicc1 13453	Membership in a closed int...
iccid 13454	A closed interval with ide...
ico0 13455	An empty open interval of ...
ioc0 13456	An empty open interval of ...
icc0 13457	An empty closed interval o...
dfrp2 13458	Alternate definition of th...
elicod 13459	Membership in a left-close...
icogelb 13460	An element of a left-close...
elicore 13461	A member of a left-closed ...
ubioc1 13462	The upper bound belongs to...
lbico1 13463	The lower bound belongs to...
iccleub 13464	An element of a closed int...
iccgelb 13465	An element of a closed int...
elioo5 13466	Membership in an open inte...
eliooxr 13467	A nonempty open interval s...
eliooord 13468	Ordering implied by a memb...
elioo4g 13469	Membership in an open inte...
ioossre 13470	An open interval is a set ...
ioosscn 13471	An open interval is a set ...
elioc2 13472	Membership in an open-belo...
elico2 13473	Membership in a closed-bel...
elicc2 13474	Membership in a closed rea...
elicc2i 13475	Inference for membership i...
elicc4 13476	Membership in a closed rea...
iccss 13477	Condition for a closed int...
iccssioo 13478	Condition for a closed int...
icossico 13479	Condition for a closed-bel...
iccss2 13480	Condition for a closed int...
iccssico 13481	Condition for a closed int...
iccssioo2 13482	Condition for a closed int...
iccssico2 13483	Condition for a closed int...
ioomax 13484	The open interval from min...
iccmax 13485	The closed interval from m...
ioopos 13486	The set of positive reals ...
ioorp 13487	The set of positive reals ...
iooshf 13488	Shift the arguments of the...
iocssre 13489	A closed-above interval wi...
icossre 13490	A closed-below interval wi...
iccssre 13491	A closed real interval is ...
iccssxr 13492	A closed interval is a set...
iocssxr 13493	An open-below, closed-abov...
icossxr 13494	A closed-below, open-above...
ioossicc 13495	An open interval is a subs...
iccssred 13496	A closed real interval is ...
eliccxr 13497	A member of a closed inter...
icossicc 13498	A closed-below, open-above...
iocssicc 13499	A closed-above, open-below...
ioossico 13500	An open interval is a subs...
iocssioo 13501	Condition for a closed int...
icossioo 13502	Condition for a closed int...
ioossioo 13503	Condition for an open inte...
iccsupr 13504	A nonempty subset of a clo...
elioopnf 13505	Membership in an unbounded...
elioomnf 13506	Membership in an unbounded...
elicopnf 13507	Membership in a closed unb...
repos 13508	Two ways of saying that a ...
ioof 13509	The set of open intervals ...
iccf 13510	The set of closed interval...
unirnioo 13511	The union of the range of ...
dfioo2 13512	Alternate definition of th...
ioorebas 13513	Open intervals are element...
xrge0neqmnf 13514	A nonnegative extended rea...
xrge0nre 13515	An extended real which is ...
elrege0 13516	The predicate "is a nonneg...
nn0rp0 13517	A nonnegative integer is a...
rge0ssre 13518	Nonnegative real numbers a...
elxrge0 13519	Elementhood in the set of ...
0e0icopnf 13520	0 is a member of ` ( 0 [,)...
0e0iccpnf 13521	0 is a member of ` ( 0 [,]...
ge0addcl 13522	The nonnegative reals are ...
ge0mulcl 13523	The nonnegative reals are ...
ge0xaddcl 13524	The nonnegative reals are ...
ge0xmulcl 13525	The nonnegative extended r...
lbicc2 13526	The lower bound of a close...
ubicc2 13527	The upper bound of a close...
elicc01 13528	Membership in the closed r...
elunitrn 13529	The closed unit interval i...
elunitcn 13530	The closed unit interval i...
0elunit 13531	Zero is an element of the ...
1elunit 13532	One is an element of the c...
iooneg 13533	Membership in a negated op...
iccneg 13534	Membership in a negated cl...
icoshft 13535	A shifted real is a member...
icoshftf1o 13536	Shifting a closed-below, o...
icoun 13537	The union of two adjacent ...
icodisj 13538	Adjacent left-closed right...
ioounsn 13539	The union of an open inter...
snunioo 13540	The closure of one end of ...
snunico 13541	The closure of the open en...
snunioc 13542	The closure of the open en...
prunioo 13543	The closure of an open rea...
ioodisj 13544	If the upper bound of one ...
ioojoin 13545	Join two open intervals to...
difreicc 13546	The class difference of ` ...
iccsplit 13547	Split a closed interval in...
iccshftr 13548	Membership in a shifted in...
iccshftri 13549	Membership in a shifted in...
iccshftl 13550	Membership in a shifted in...
iccshftli 13551	Membership in a shifted in...
iccdil 13552	Membership in a dilated in...
iccdili 13553	Membership in a dilated in...
icccntr 13554	Membership in a contracted...
icccntri 13555	Membership in a contracted...
divelunit 13556	A condition for a ratio to...
lincmb01cmp 13557	A linear combination of tw...
iccf1o 13558	Describe a bijection from ...
iccen 13559	Any nontrivial closed inte...
xov1plusxeqvd 13560	A complex number ` X ` is ...
unitssre 13561	` ( 0 [,] 1 ) ` is a subse...
unitsscn 13562	The closed unit interval i...
supicc 13563	Supremum of a bounded set ...
supiccub 13564	The supremum of a bounded ...
supicclub 13565	The supremum of a bounded ...
supicclub2 13566	The supremum of a bounded ...
zltaddlt1le 13567	The sum of an integer and ...
xnn0xrge0 13568	An extended nonnegative in...
fzval 13571	The value of a finite set ...
fzval2 13572	An alternative way of expr...
fzf 13573	Establish the domain and c...
elfz1 13574	Membership in a finite set...
elfz 13575	Membership in a finite set...
elfz2 13576	Membership in a finite set...
elfzd 13577	Membership in a finite set...
elfz5 13578	Membership in a finite set...
elfz4 13579	Membership in a finite set...
elfzuzb 13580	Membership in a finite set...
eluzfz 13581	Membership in a finite set...
elfzuz 13582	A member of a finite set o...
elfzuz3 13583	Membership in a finite set...
elfzel2 13584	Membership in a finite set...
elfzel1 13585	Membership in a finite set...
elfzelz 13586	A member of a finite set o...
elfzelzd 13587	A member of a finite set o...
fzssz 13588	A finite sequence of integ...
elfzle1 13589	A member of a finite set o...
elfzle2 13590	A member of a finite set o...
elfzuz2 13591	Implication of membership ...
elfzle3 13592	Membership in a finite set...
eluzfz1 13593	Membership in a finite set...
eluzfz2 13594	Membership in a finite set...
eluzfz2b 13595	Membership in a finite set...
elfz3 13596	Membership in a finite set...
elfz1eq 13597	Membership in a finite set...
elfzubelfz 13598	If there is a member in a ...
peano2fzr 13599	A Peano-postulate-like the...
fzn0 13600	Properties of a finite int...
fz0 13601	A finite set of sequential...
fzn 13602	A finite set of sequential...
fzen 13603	A shifted finite set of se...
fz1n 13604	A 1-based finite set of se...
0nelfz1 13605	0 is not an element of a f...
0fz1 13606	Two ways to say a finite 1...
fz10 13607	There are no integers betw...
uzsubsubfz 13608	Membership of an integer g...
uzsubsubfz1 13609	Membership of an integer g...
ige3m2fz 13610	Membership of an integer g...
fzsplit2 13611	Split a finite interval of...
fzsplit 13612	Split a finite interval of...
fzdisj 13613	Condition for two finite i...
fz01en 13614	0-based and 1-based finite...
elfznn 13615	A member of a finite set o...
elfz1end 13616	A nonempty finite range of...
fz1ssnn 13617	A finite set of positive i...
fznn0sub 13618	Subtraction closure for a ...
fzmmmeqm 13619	Subtracting the difference...
fzaddel 13620	Membership of a sum in a f...
fzadd2 13621	Membership of a sum in a f...
fzsubel 13622	Membership of a difference...
fzopth 13623	A finite set of sequential...
fzass4 13624	Two ways to express a nond...
fzss1 13625	Subset relationship for fi...
fzss2 13626	Subset relationship for fi...
fzssuz 13627	A finite set of sequential...
fzsn 13628	A finite interval of integ...
fzssp1 13629	Subset relationship for fi...
fzssnn 13630	Finite sets of sequential ...
ssfzunsnext 13631	A subset of a finite seque...
ssfzunsn 13632	A subset of a finite seque...
fzsuc 13633	Join a successor to the en...
fzpred 13634	Join a predecessor to the ...
fzpreddisj 13635	A finite set of sequential...
elfzp1 13636	Append an element to a fin...
fzp1ss 13637	Subset relationship for fi...
fzelp1 13638	Membership in a set of seq...
fzp1elp1 13639	Add one to an element of a...
fznatpl1 13640	Shift membership in a fini...
fzpr 13641	A finite interval of integ...
fztp 13642	A finite interval of integ...
fz12pr 13643	An integer range between 1...
fzsuc2 13644	Join a successor to the en...
fzp1disj 13645	` ( M ... ( N + 1 ) ) ` is...
fzdifsuc 13646	Remove a successor from th...
fzprval 13647	Two ways of defining the f...
fztpval 13648	Two ways of defining the f...
fzrev 13649	Reversal of start and end ...
fzrev2 13650	Reversal of start and end ...
fzrev2i 13651	Reversal of start and end ...
fzrev3 13652	The "complement" of a memb...
fzrev3i 13653	The "complement" of a memb...
fznn 13654	Finite set of sequential i...
elfz1b 13655	Membership in a 1-based fi...
elfz1uz 13656	Membership in a 1-based fi...
elfzm11 13657	Membership in a finite set...
uzsplit 13658	Express an upper integer s...
uzdisj 13659	The first ` N ` elements o...
fseq1p1m1 13660	Add/remove an item to/from...
fseq1m1p1 13661	Add/remove an item to/from...
fz1sbc 13662	Quantification over a one-...
elfzp1b 13663	An integer is a member of ...
elfzm1b 13664	An integer is a member of ...
elfzp12 13665	Options for membership in ...
fzm1 13666	Choices for an element of ...
fzneuz 13667	No finite set of sequentia...
fznuz 13668	Disjointness of the upper ...
uznfz 13669	Disjointness of the upper ...
fzp1nel 13670	One plus the upper bound o...
fzrevral 13671	Reversal of scanning order...
fzrevral2 13672	Reversal of scanning order...
fzrevral3 13673	Reversal of scanning order...
fzshftral 13674	Shift the scanning order i...
ige2m1fz1 13675	Membership of an integer g...
ige2m1fz 13676	Membership in a 0-based fi...
elfz2nn0 13677	Membership in a finite set...
fznn0 13678	Characterization of a fini...
elfznn0 13679	A member of a finite set o...
elfz3nn0 13680	The upper bound of a nonem...
fz0ssnn0 13681	Finite sets of sequential ...
fz1ssfz0 13682	Subset relationship for fi...
0elfz 13683	0 is an element of a finit...
nn0fz0 13684	A nonnegative integer is a...
elfz0add 13685	An element of a finite set...
fz0sn 13686	An integer range from 0 to...
fz0tp 13687	An integer range from 0 to...
fz0to3un2pr 13688	An integer range from 0 to...
fz0to4untppr 13689	An integer range from 0 to...
fz0to5un2tp 13690	An integer range from 0 to...
elfz0ubfz0 13691	An element of a finite set...
elfz0fzfz0 13692	A member of a finite set o...
fz0fzelfz0 13693	If a member of a finite se...
fznn0sub2 13694	Subtraction closure for a ...
uzsubfz0 13695	Membership of an integer g...
fz0fzdiffz0 13696	The difference of an integ...
elfzmlbm 13697	Subtracting the lower boun...
elfzmlbp 13698	Subtracting the lower boun...
fzctr 13699	Lemma for theorems about t...
difelfzle 13700	The difference of two inte...
difelfznle 13701	The difference of two inte...
nn0split 13702	Express the set of nonnega...
nn0disj 13703	The first ` N + 1 ` elemen...
fz0sn0fz1 13704	A finite set of sequential...
fvffz0 13705	The function value of a fu...
1fv 13706	A function on a singleton....
4fvwrd4 13707	The first four function va...
2ffzeq 13708	Two functions over 0-based...
preduz 13709	The value of the predecess...
prednn 13710	The value of the predecess...
prednn0 13711	The value of the predecess...
predfz 13712	Calculate the predecessor ...
fzof 13715	Functionality of the half-...
elfzoel1 13716	Reverse closure for half-o...
elfzoel2 13717	Reverse closure for half-o...
elfzoelz 13718	Reverse closure for half-o...
fzoval 13719	Value of the half-open int...
elfzo 13720	Membership in a half-open ...
elfzo2 13721	Membership in a half-open ...
elfzouz 13722	Membership in a half-open ...
nelfzo 13723	An integer not being a mem...
fzolb 13724	The left endpoint of a hal...
fzolb2 13725	The left endpoint of a hal...
elfzole1 13726	A member in a half-open in...
elfzolt2 13727	A member in a half-open in...
elfzolt3 13728	Membership in a half-open ...
elfzolt2b 13729	A member in a half-open in...
elfzolt3b 13730	Membership in a half-open ...
elfzop1le2 13731	A member in a half-open in...
fzonel 13732	A half-open range does not...
elfzouz2 13733	The upper bound of a half-...
elfzofz 13734	A half-open range is conta...
elfzo3 13735	Express membership in a ha...
fzon0 13736	A half-open integer interv...
fzossfz 13737	A half-open range is conta...
fzossz 13738	A half-open integer interv...
fzon 13739	A half-open set of sequent...
fzo0n 13740	A half-open range of nonne...
fzonlt0 13741	A half-open integer range ...
fzo0 13742	Half-open sets with equal ...
fzonnsub 13743	If ` K < N ` then ` N - K ...
fzonnsub2 13744	If ` M < N ` then ` N - M ...
fzoss1 13745	Subset relationship for ha...
fzoss2 13746	Subset relationship for ha...
fzossrbm1 13747	Subset of a half-open rang...
fzo0ss1 13748	Subset relationship for ha...
fzossnn0 13749	A half-open integer range ...
fzospliti 13750	One direction of splitting...
fzosplit 13751	Split a half-open integer ...
fzodisj 13752	Abutting half-open integer...
fzouzsplit 13753	Split an upper integer set...
fzouzdisj 13754	A half-open integer range ...
fzoun 13755	A half-open integer range ...
fzodisjsn 13756	A half-open integer range ...
prinfzo0 13757	The intersection of a half...
lbfzo0 13758	An integer is strictly gre...
elfzo0 13759	Membership in a half-open ...
elfzo0z 13760	Membership in a half-open ...
nn0p1elfzo 13761	A nonnegative integer incr...
elfzo0le 13762	A member in a half-open ra...
elfzonn0 13763	A member of a half-open ra...
fzonmapblen 13764	The result of subtracting ...
fzofzim 13765	If a nonnegative integer i...
fz1fzo0m1 13766	Translation of one between...
fzossnn 13767	Half-open integer ranges s...
elfzo1 13768	Membership in a half-open ...
fzo1fzo0n0 13769	An integer between 1 and a...
fzo0n0 13770	A half-open integer range ...
fzoaddel 13771	Translate membership in a ...
fzo0addel 13772	Translate membership in a ...
fzo0addelr 13773	Translate membership in a ...
fzoaddel2 13774	Translate membership in a ...
elfzoext 13775	Membership of an integer i...
elincfzoext 13776	Membership of an increased...
fzosubel 13777	Translate membership in a ...
fzosubel2 13778	Membership in a translated...
fzosubel3 13779	Membership in a translated...
eluzgtdifelfzo 13780	Membership of the differen...
ige2m2fzo 13781	Membership of an integer g...
fzocatel 13782	Translate membership in a ...
ubmelfzo 13783	If an integer in a 1-based...
elfzodifsumelfzo 13784	If an integer is in a half...
elfzom1elp1fzo 13785	Membership of an integer i...
elfzom1elfzo 13786	Membership in a half-open ...
fzval3 13787	Expressing a closed intege...
fz0add1fz1 13788	Translate membership in a ...
fzosn 13789	Expressing a singleton as ...
elfzomin 13790	Membership of an integer i...
zpnn0elfzo 13791	Membership of an integer i...
zpnn0elfzo1 13792	Membership of an integer i...
fzosplitsnm1 13793	Removing a singleton from ...
elfzonlteqm1 13794	If an element of a half-op...
fzonn0p1 13795	A nonnegative integer is e...
fzossfzop1 13796	A half-open range of nonne...
fzonn0p1p1 13797	If a nonnegative integer i...
elfzom1p1elfzo 13798	Increasing an element of a...
fzo0ssnn0 13799	Half-open integer ranges s...
fzo01 13800	Expressing the singleton o...
fzo12sn 13801	A 1-based half-open intege...
fzo13pr 13802	A 1-based half-open intege...
fzo0to2pr 13803	A half-open integer range ...
fzo0to3tp 13804	A half-open integer range ...
fzo0to42pr 13805	A half-open integer range ...
fzo1to4tp 13806	A half-open integer range ...
fzo0sn0fzo1 13807	A half-open range of nonne...
elfzo0l 13808	A member of a half-open ra...
fzoend 13809	The endpoint of a half-ope...
fzo0end 13810	The endpoint of a zero-bas...
ssfzo12 13811	Subset relationship for ha...
ssfzoulel 13812	If a half-open integer ran...
ssfzo12bi 13813	Subset relationship for ha...
fzoopth 13814	A half-open integer range ...
ubmelm1fzo 13815	The result of subtracting ...
fzofzp1 13816	If a point is in a half-op...
fzofzp1b 13817	If a point is in a half-op...
elfzom1b 13818	An integer is a member of ...
elfzom1elp1fzo1 13819	Membership of a nonnegativ...
elfzo1elm1fzo0 13820	Membership of a positive i...
elfzonelfzo 13821	If an element of a half-op...
fzonfzoufzol 13822	If an element of a half-op...
elfzomelpfzo 13823	An integer increased by an...
elfznelfzo 13824	A value in a finite set of...
elfznelfzob 13825	A value in a finite set of...
peano2fzor 13826	A Peano-postulate-like the...
fzosplitsn 13827	Extending a half-open rang...
fzosplitpr 13828	Extending a half-open inte...
fzosplitprm1 13829	Extending a half-open inte...
fzosplitsni 13830	Membership in a half-open ...
fzisfzounsn 13831	A finite interval of integ...
elfzr 13832	A member of a finite inter...
elfzlmr 13833	A member of a finite inter...
elfz0lmr 13834	A member of a finite inter...
fzostep1 13835	Two possibilities for a nu...
fzoshftral 13836	Shift the scanning order i...
fzind2 13837	Induction on the integers ...
fvinim0ffz 13838	The function values for th...
injresinjlem 13839	Lemma for ~ injresinj . (...
injresinj 13840	A function whose restricti...
subfzo0 13841	The difference between two...
fvf1tp 13842	Values of a one-to-one fun...
flval 13847	Value of the floor (greate...
flcl 13848	The floor (greatest intege...
reflcl 13849	The floor (greatest intege...
fllelt 13850	A basic property of the fl...
flcld 13851	The floor (greatest intege...
flle 13852	A basic property of the fl...
flltp1 13853	A basic property of the fl...
fllep1 13854	A basic property of the fl...
fraclt1 13855	The fractional part of a r...
fracle1 13856	The fractional part of a r...
fracge0 13857	The fractional part of a r...
flge 13858	The floor function value i...
fllt 13859	The floor function value i...
flflp1 13860	Move floor function betwee...
flid 13861	An integer is its own floo...
flidm 13862	The floor function is idem...
flidz 13863	A real number equals its f...
flltnz 13864	The floor of a non-integer...
flwordi 13865	Ordering relation for the ...
flword2 13866	Ordering relation for the ...
flval2 13867	An alternate way to define...
flval3 13868	An alternate way to define...
flbi 13869	A condition equivalent to ...
flbi2 13870	A condition equivalent to ...
adddivflid 13871	The floor of a sum of an i...
ico01fl0 13872	The floor of a real number...
flge0nn0 13873	The floor of a number grea...
flge1nn 13874	The floor of a number grea...
fldivnn0 13875	The floor function of a di...
refldivcl 13876	The floor function of a di...
divfl0 13877	The floor of a fraction is...
fladdz 13878	An integer can be moved in...
flzadd 13879	An integer can be moved in...
flmulnn0 13880	Move a nonnegative integer...
btwnzge0 13881	A real bounded between an ...
2tnp1ge0ge0 13882	Two times an integer plus ...
flhalf 13883	Ordering relation for the ...
fldivle 13884	The floor function of a di...
fldivnn0le 13885	The floor function of a di...
flltdivnn0lt 13886	The floor function of a di...
ltdifltdiv 13887	If the dividend of a divis...
fldiv4p1lem1div2 13888	The floor of an integer eq...
fldiv4lem1div2uz2 13889	The floor of an integer gr...
fldiv4lem1div2 13890	The floor of a positive in...
ceilval 13891	The value of the ceiling f...
dfceil2 13892	Alternative definition of ...
ceilval2 13893	The value of the ceiling f...
ceicl 13894	The ceiling function retur...
ceilcl 13895	Closure of the ceiling fun...
ceilcld 13896	Closure of the ceiling fun...
ceige 13897	The ceiling of a real numb...
ceilge 13898	The ceiling of a real numb...
ceilged 13899	The ceiling of a real numb...
ceim1l 13900	One less than the ceiling ...
ceilm1lt 13901	One less than the ceiling ...
ceile 13902	The ceiling of a real numb...
ceille 13903	The ceiling of a real numb...
ceilid 13904	An integer is its own ceil...
ceilidz 13905	A real number equals its c...
flleceil 13906	The floor of a real number...
fleqceilz 13907	A real number is an intege...
quoremz 13908	Quotient and remainder of ...
quoremnn0 13909	Quotient and remainder of ...
quoremnn0ALT 13910	Alternate proof of ~ quore...
intfrac2 13911	Decompose a real into inte...
intfracq 13912	Decompose a rational numbe...
fldiv 13913	Cancellation of the embedd...
fldiv2 13914	Cancellation of an embedde...
fznnfl 13915	Finite set of sequential i...
uzsup 13916	An upper set of integers i...
ioopnfsup 13917	An upper set of reals is u...
icopnfsup 13918	An upper set of reals is u...
rpsup 13919	The positive reals are unb...
resup 13920	The real numbers are unbou...
xrsup 13921	The extended real numbers ...
modval 13924	The value of the modulo op...
modvalr 13925	The value of the modulo op...
modcl 13926	Closure law for the modulo...
flpmodeq 13927	Partition of a division in...
modcld 13928	Closure law for the modulo...
mod0 13929	` A mod B ` is zero iff ` ...
mulmod0 13930	The product of an integer ...
negmod0 13931	` A ` is divisible by ` B ...
modge0 13932	The modulo operation is no...
modlt 13933	The modulo operation is le...
modelico 13934	Modular reduction produces...
moddiffl 13935	Value of the modulo operat...
moddifz 13936	The modulo operation diffe...
modfrac 13937	The fractional part of a n...
flmod 13938	The floor function express...
intfrac 13939	Break a number into its in...
zmod10 13940	An integer modulo 1 is 0. ...
zmod1congr 13941	Two arbitrary integers are...
modmulnn 13942	Move a positive integer in...
modvalp1 13943	The value of the modulo op...
zmodcl 13944	Closure law for the modulo...
zmodcld 13945	Closure law for the modulo...
zmodfz 13946	An integer mod ` B ` lies ...
zmodfzo 13947	An integer mod ` B ` lies ...
zmodfzp1 13948	An integer mod ` B ` lies ...
modid 13949	Identity law for modulo. ...
modid0 13950	A positive real number mod...
modid2 13951	Identity law for modulo. ...
zmodid2 13952	Identity law for modulo re...
zmodidfzo 13953	Identity law for modulo re...
zmodidfzoimp 13954	Identity law for modulo re...
0mod 13955	Special case: 0 modulo a p...
1mod 13956	Special case: 1 modulo a r...
modabs 13957	Absorption law for modulo....
modabs2 13958	Absorption law for modulo....
modcyc 13959	The modulo operation is pe...
modcyc2 13960	The modulo operation is pe...
modadd1 13961	Addition property of the m...
modaddabs 13962	Absorption law for modulo....
modaddmod 13963	The sum of a real number m...
muladdmodid 13964	The sum of a positive real...
mulp1mod1 13965	The product of an integer ...
modmuladd 13966	Decomposition of an intege...
modmuladdim 13967	Implication of a decomposi...
modmuladdnn0 13968	Implication of a decomposi...
negmod 13969	The negation of a number m...
m1modnnsub1 13970	Minus one modulo a positiv...
m1modge3gt1 13971	Minus one modulo an intege...
addmodid 13972	The sum of a positive inte...
addmodidr 13973	The sum of a positive inte...
modadd2mod 13974	The sum of a real number m...
modm1p1mod0 13975	If a real number modulo a ...
modltm1p1mod 13976	If a real number modulo a ...
modmul1 13977	Multiplication property of...
modmul12d 13978	Multiplication property of...
modnegd 13979	Negation property of the m...
modadd12d 13980	Additive property of the m...
modsub12d 13981	Subtraction property of th...
modsubmod 13982	The difference of a real n...
modsubmodmod 13983	The difference of a real n...
2txmodxeq0 13984	Two times a positive real ...
2submod 13985	If a real number is betwee...
modifeq2int 13986	If a nonnegative integer i...
modaddmodup 13987	The sum of an integer modu...
modaddmodlo 13988	The sum of an integer modu...
modmulmod 13989	The product of a real numb...
modmulmodr 13990	The product of an integer ...
modaddmulmod 13991	The sum of a real number a...
moddi 13992	Distribute multiplication ...
modsubdir 13993	Distribute the modulo oper...
modeqmodmin 13994	A real number equals the d...
modirr 13995	A number modulo an irratio...
modfzo0difsn 13996	For a number within a half...
modsumfzodifsn 13997	The sum of a number within...
modlteq 13998	Two nonnegative integers l...
addmodlteq 13999	Two nonnegative integers l...
om2uz0i 14000	The mapping ` G ` is a one...
om2uzsuci 14001	The value of ` G ` (see ~ ...
om2uzuzi 14002	The value ` G ` (see ~ om2...
om2uzlti 14003	Less-than relation for ` G...
om2uzlt2i 14004	The mapping ` G ` (see ~ o...
om2uzrani 14005	Range of ` G ` (see ~ om2u...
om2uzf1oi 14006	` G ` (see ~ om2uz0i ) is ...
om2uzisoi 14007	` G ` (see ~ om2uz0i ) is ...
om2uzoi 14008	An alternative definition ...
om2uzrdg 14009	A helper lemma for the val...
uzrdglem 14010	A helper lemma for the val...
uzrdgfni 14011	The recursive definition g...
uzrdg0i 14012	Initial value of a recursi...
uzrdgsuci 14013	Successor value of a recur...
ltweuz 14014	` < ` is a well-founded re...
ltwenn 14015	Less than well-orders the ...
ltwefz 14016	Less than well-orders a se...
uzenom 14017	An upper integer set is de...
uzinf 14018	An upper integer set is in...
nnnfi 14019	The set of positive intege...
uzrdgxfr 14020	Transfer the value of the ...
fzennn 14021	The cardinality of a finit...
fzen2 14022	The cardinality of a finit...
cardfz 14023	The cardinality of a finit...
hashgf1o 14024	` G ` maps ` _om ` one-to-...
fzfi 14025	A finite interval of integ...
fzfid 14026	Commonly used special case...
fzofi 14027	Half-open integer sets are...
fsequb 14028	The values of a finite rea...
fsequb2 14029	The values of a finite rea...
fseqsupcl 14030	The values of a finite rea...
fseqsupubi 14031	The values of a finite rea...
nn0ennn 14032	The nonnegative integers a...
nnenom 14033	The set of positive intege...
nnct 14034	` NN ` is countable. (Con...
uzindi 14035	Indirect strong induction ...
axdc4uzlem 14036	Lemma for ~ axdc4uz . (Co...
axdc4uz 14037	A version of ~ axdc4 that ...
ssnn0fi 14038	A subset of the nonnegativ...
rabssnn0fi 14039	A subset of the nonnegativ...
uzsinds 14040	Strong (or "total") induct...
nnsinds 14041	Strong (or "total") induct...
nn0sinds 14042	Strong (or "total") induct...
fsuppmapnn0fiublem 14043	Lemma for ~ fsuppmapnn0fiu...
fsuppmapnn0fiub 14044	If all functions of a fini...
fsuppmapnn0fiubex 14045	If all functions of a fini...
fsuppmapnn0fiub0 14046	If all functions of a fini...
suppssfz 14047	Condition for a function o...
fsuppmapnn0ub 14048	If a function over the non...
fsuppmapnn0fz 14049	If a function over the non...
mptnn0fsupp 14050	A mapping from the nonnega...
mptnn0fsuppd 14051	A mapping from the nonnega...
mptnn0fsuppr 14052	A finitely supported mappi...
f13idfv 14053	A one-to-one function with...
seqex 14056	Existence of the sequence ...
seqeq1 14057	Equality theorem for the s...
seqeq2 14058	Equality theorem for the s...
seqeq3 14059	Equality theorem for the s...
seqeq1d 14060	Equality deduction for the...
seqeq2d 14061	Equality deduction for the...
seqeq3d 14062	Equality deduction for the...
seqeq123d 14063	Equality deduction for the...
nfseq 14064	Hypothesis builder for the...
seqval 14065	Value of the sequence buil...
seqfn 14066	The sequence builder funct...
seq1 14067	Value of the sequence buil...
seq1i 14068	Value of the sequence buil...
seqp1 14069	Value of the sequence buil...
seqexw 14070	Weak version of ~ seqex th...
seqp1d 14071	Value of the sequence buil...
seqm1 14072	Value of the sequence buil...
seqcl2 14073	Closure properties of the ...
seqf2 14074	Range of the recursive seq...
seqcl 14075	Closure properties of the ...
seqf 14076	Range of the recursive seq...
seqfveq2 14077	Equality of sequences. (C...
seqfeq2 14078	Equality of sequences. (C...
seqfveq 14079	Equality of sequences. (C...
seqfeq 14080	Equality of sequences. (C...
seqshft2 14081	Shifting the index set of ...
seqres 14082	Restricting its characteri...
serf 14083	An infinite series of comp...
serfre 14084	An infinite series of real...
monoord 14085	Ordering relation for a mo...
monoord2 14086	Ordering relation for a mo...
sermono 14087	The partial sums in an inf...
seqsplit 14088	Split a sequence into two ...
seq1p 14089	Removing the first term fr...
seqcaopr3 14090	Lemma for ~ seqcaopr2 . (...
seqcaopr2 14091	The sum of two infinite se...
seqcaopr 14092	The sum of two infinite se...
seqf1olem2a 14093	Lemma for ~ seqf1o . (Con...
seqf1olem1 14094	Lemma for ~ seqf1o . (Con...
seqf1olem2 14095	Lemma for ~ seqf1o . (Con...
seqf1o 14096	Rearrange a sum via an arb...
seradd 14097	The sum of two infinite se...
sersub 14098	The difference of two infi...
seqid3 14099	A sequence that consists e...
seqid 14100	Discarding the first few t...
seqid2 14101	The last few partial sums ...
seqhomo 14102	Apply a homomorphism to a ...
seqz 14103	If the operation ` .+ ` ha...
seqfeq4 14104	Equality of series under d...
seqfeq3 14105	Equality of series under d...
seqdistr 14106	The distributive property ...
ser0 14107	The value of the partial s...
ser0f 14108	A zero-valued infinite ser...
serge0 14109	A finite sum of nonnegativ...
serle 14110	Comparison of partial sums...
ser1const 14111	Value of the partial serie...
seqof 14112	Distribute function operat...
seqof2 14113	Distribute function operat...
expval 14116	Value of exponentiation to...
expnnval 14117	Value of exponentiation to...
exp0 14118	Value of a complex number ...
0exp0e1 14119	The zeroth power of zero e...
exp1 14120	Value of a complex number ...
expp1 14121	Value of a complex number ...
expneg 14122	Value of a complex number ...
expneg2 14123	Value of a complex number ...
expn1 14124	A complex number raised to...
expcllem 14125	Lemma for proving nonnegat...
expcl2lem 14126	Lemma for proving integer ...
nnexpcl 14127	Closure of exponentiation ...
nn0expcl 14128	Closure of exponentiation ...
zexpcl 14129	Closure of exponentiation ...
qexpcl 14130	Closure of exponentiation ...
reexpcl 14131	Closure of exponentiation ...
expcl 14132	Closure law for nonnegativ...
rpexpcl 14133	Closure law for integer ex...
qexpclz 14134	Closure of integer exponen...
reexpclz 14135	Closure of integer exponen...
expclzlem 14136	Lemma for ~ expclz . (Con...
expclz 14137	Closure law for integer ex...
m1expcl2 14138	Closure of integer exponen...
m1expcl 14139	Closure of exponentiation ...
zexpcld 14140	Closure of exponentiation ...
nn0expcli 14141	Closure of exponentiation ...
nn0sqcl 14142	The square of a nonnegativ...
expm1t 14143	Exponentiation in terms of...
1exp 14144	Value of 1 raised to an in...
expeq0 14145	A positive integer power i...
expne0 14146	A positive integer power i...
expne0i 14147	An integer power is nonzer...
expgt0 14148	A positive real raised to ...
expnegz 14149	Value of a nonzero complex...
0exp 14150	Value of zero raised to a ...
expge0 14151	A nonnegative real raised ...
expge1 14152	A real greater than or equ...
expgt1 14153	A real greater than 1 rais...
mulexp 14154	Nonnegative integer expone...
mulexpz 14155	Integer exponentiation of ...
exprec 14156	Integer exponentiation of ...
expadd 14157	Sum of exponents law for n...
expaddzlem 14158	Lemma for ~ expaddz . (Co...
expaddz 14159	Sum of exponents law for i...
expmul 14160	Product of exponents law f...
expmulz 14161	Product of exponents law f...
m1expeven 14162	Exponentiation of negative...
expsub 14163	Exponent subtraction law f...
expp1z 14164	Value of a nonzero complex...
expm1 14165	Value of a nonzero complex...
expdiv 14166	Nonnegative integer expone...
sqval 14167	Value of the square of a c...
sqneg 14168	The square of the negative...
sqsubswap 14169	Swap the order of subtract...
sqcl 14170	Closure of square. (Contr...
sqmul 14171	Distribution of squaring o...
sqeq0 14172	A complex number is zero i...
sqdiv 14173	Distribution of squaring o...
sqdivid 14174	The square of a nonzero co...
sqne0 14175	A complex number is nonzer...
resqcl 14176	Closure of squaring in rea...
resqcld 14177	Closure of squaring in rea...
sqgt0 14178	The square of a nonzero re...
sqn0rp 14179	The square of a nonzero re...
nnsqcl 14180	The positive naturals are ...
zsqcl 14181	Integers are closed under ...
qsqcl 14182	The square of a rational i...
sq11 14183	The square function is one...
nn0sq11 14184	The square function is one...
lt2sq 14185	The square function is inc...
le2sq 14186	The square function is non...
le2sq2 14187	The square function is non...
sqge0 14188	The square of a real is no...
sqge0d 14189	The square of a real is no...
zsqcl2 14190	The square of an integer i...
0expd 14191	Value of zero raised to a ...
exp0d 14192	Value of a complex number ...
exp1d 14193	Value of a complex number ...
expeq0d 14194	If a positive integer powe...
sqvald 14195	Value of square. Inferenc...
sqcld 14196	Closure of square. (Contr...
sqeq0d 14197	A number is zero iff its s...
expcld 14198	Closure law for nonnegativ...
expp1d 14199	Value of a complex number ...
expaddd 14200	Sum of exponents law for n...
expmuld 14201	Product of exponents law f...
sqrecd 14202	Square of reciprocal is re...
expclzd 14203	Closure law for integer ex...
expne0d 14204	A nonnegative integer powe...
expnegd 14205	Value of a nonzero complex...
exprecd 14206	An integer power of a reci...
expp1zd 14207	Value of a nonzero complex...
expm1d 14208	Value of a nonzero complex...
expsubd 14209	Exponent subtraction law f...
sqmuld 14210	Distribution of squaring o...
sqdivd 14211	Distribution of squaring o...
expdivd 14212	Nonnegative integer expone...
mulexpd 14213	Nonnegative integer expone...
znsqcld 14214	The square of a nonzero in...
reexpcld 14215	Closure of exponentiation ...
expge0d 14216	A nonnegative real raised ...
expge1d 14217	A real greater than or equ...
ltexp2a 14218	Exponent ordering relation...
expmordi 14219	Base ordering relationship...
rpexpmord 14220	Base ordering relationship...
expcan 14221	Cancellation law for integ...
ltexp2 14222	Strict ordering law for ex...
leexp2 14223	Ordering law for exponenti...
leexp2a 14224	Weak ordering relationship...
ltexp2r 14225	The integer powers of a fi...
leexp2r 14226	Weak ordering relationship...
leexp1a 14227	Weak base ordering relatio...
exple1 14228	A real between 0 and 1 inc...
expubnd 14229	An upper bound on ` A ^ N ...
sumsqeq0 14230	The sum of two squres of r...
sqvali 14231	Value of square. Inferenc...
sqcli 14232	Closure of square. (Contr...
sqeq0i 14233	A complex number is zero i...
sqrecii 14234	The square of a reciprocal...
sqmuli 14235	Distribution of squaring o...
sqdivi 14236	Distribution of squaring o...
resqcli 14237	Closure of square in reals...
sqgt0i 14238	The square of a nonzero re...
sqge0i 14239	The square of a real is no...
lt2sqi 14240	The square function on non...
le2sqi 14241	The square function on non...
sq11i 14242	The square function is one...
sq0 14243	The square of 0 is 0. (Co...
sq0i 14244	If a number is zero, then ...
sq0id 14245	If a number is zero, then ...
sq1 14246	The square of 1 is 1. (Co...
neg1sqe1 14247	The square of ` -u 1 ` is ...
sq2 14248	The square of 2 is 4. (Co...
sq3 14249	The square of 3 is 9. (Co...
sq4e2t8 14250	The square of 4 is 2 times...
cu2 14251	The cube of 2 is 8. (Cont...
irec 14252	The reciprocal of ` _i ` ....
i2 14253	` _i ` squared. (Contribu...
i3 14254	` _i ` cubed. (Contribute...
i4 14255	` _i ` to the fourth power...
nnlesq 14256	A positive integer is less...
zzlesq 14257	An integer is less than or...
iexpcyc 14258	Taking ` _i ` to the ` K `...
expnass 14259	A counterexample showing t...
sqlecan 14260	Cancel one factor of a squ...
subsq 14261	Factor the difference of t...
subsq2 14262	Express the difference of ...
binom2i 14263	The square of a binomial. ...
subsqi 14264	Factor the difference of t...
sqeqori 14265	The squares of two complex...
subsq0i 14266	The two solutions to the d...
sqeqor 14267	The squares of two complex...
binom2 14268	The square of a binomial. ...
binom2d 14269	Deduction form of ~ binom2...
binom21 14270	Special case of ~ binom2 w...
binom2sub 14271	Expand the square of a sub...
binom2sub1 14272	Special case of ~ binom2su...
binom2subi 14273	Expand the square of a sub...
mulbinom2 14274	The square of a binomial w...
binom3 14275	The cube of a binomial. (...
sq01 14276	If a complex number equals...
zesq 14277	An integer is even iff its...
nnesq 14278	A positive integer is even...
crreczi 14279	Reciprocal of a complex nu...
bernneq 14280	Bernoulli's inequality, du...
bernneq2 14281	Variation of Bernoulli's i...
bernneq3 14282	A corollary of ~ bernneq ....
expnbnd 14283	Exponentiation with a base...
expnlbnd 14284	The reciprocal of exponent...
expnlbnd2 14285	The reciprocal of exponent...
expmulnbnd 14286	Exponentiation with a base...
digit2 14287	Two ways to express the ` ...
digit1 14288	Two ways to express the ` ...
modexp 14289	Exponentiation property of...
discr1 14290	A nonnegative quadratic fo...
discr 14291	If a quadratic polynomial ...
expnngt1 14292	If an integer power with a...
expnngt1b 14293	An integer power with an i...
sqoddm1div8 14294	A squared odd number minus...
nnsqcld 14295	The naturals are closed un...
nnexpcld 14296	Closure of exponentiation ...
nn0expcld 14297	Closure of exponentiation ...
rpexpcld 14298	Closure law for exponentia...
ltexp2rd 14299	The power of a positive nu...
reexpclzd 14300	Closure of exponentiation ...
sqgt0d 14301	The square of a nonzero re...
ltexp2d 14302	Ordering relationship for ...
leexp2d 14303	Ordering law for exponenti...
expcand 14304	Ordering relationship for ...
leexp2ad 14305	Ordering relationship for ...
leexp2rd 14306	Ordering relationship for ...
lt2sqd 14307	The square function on non...
le2sqd 14308	The square function on non...
sq11d 14309	The square function is one...
ltexp1d 14310	Elevating to a positive po...
ltexp1dd 14311	Raising both sides of 'les...
exp11nnd 14312	The function elevating non...
mulsubdivbinom2 14313	The square of a binomial w...
muldivbinom2 14314	The square of a binomial w...
sq10 14315	The square of 10 is 100. ...
sq10e99m1 14316	The square of 10 is 99 plu...
3dec 14317	A "decimal constructor" wh...
nn0le2msqi 14318	The square function on non...
nn0opthlem1 14319	A rather pretty lemma for ...
nn0opthlem2 14320	Lemma for ~ nn0opthi . (C...
nn0opthi 14321	An ordered pair theorem fo...
nn0opth2i 14322	An ordered pair theorem fo...
nn0opth2 14323	An ordered pair theorem fo...
facnn 14326	Value of the factorial fun...
fac0 14327	The factorial of 0. (Cont...
fac1 14328	The factorial of 1. (Cont...
facp1 14329	The factorial of a success...
fac2 14330	The factorial of 2. (Cont...
fac3 14331	The factorial of 3. (Cont...
fac4 14332	The factorial of 4. (Cont...
facnn2 14333	Value of the factorial fun...
faccl 14334	Closure of the factorial f...
faccld 14335	Closure of the factorial f...
facmapnn 14336	The factorial function res...
facne0 14337	The factorial function is ...
facdiv 14338	A positive integer divides...
facndiv 14339	No positive integer (great...
facwordi 14340	Ordering property of facto...
faclbnd 14341	A lower bound for the fact...
faclbnd2 14342	A lower bound for the fact...
faclbnd3 14343	A lower bound for the fact...
faclbnd4lem1 14344	Lemma for ~ faclbnd4 . Pr...
faclbnd4lem2 14345	Lemma for ~ faclbnd4 . Us...
faclbnd4lem3 14346	Lemma for ~ faclbnd4 . Th...
faclbnd4lem4 14347	Lemma for ~ faclbnd4 . Pr...
faclbnd4 14348	Variant of ~ faclbnd5 prov...
faclbnd5 14349	The factorial function gro...
faclbnd6 14350	Geometric lower bound for ...
facubnd 14351	An upper bound for the fac...
facavg 14352	The product of two factori...
bcval 14355	Value of the binomial coef...
bcval2 14356	Value of the binomial coef...
bcval3 14357	Value of the binomial coef...
bcval4 14358	Value of the binomial coef...
bcrpcl 14359	Closure of the binomial co...
bccmpl 14360	"Complementing" its second...
bcn0 14361	` N ` choose 0 is 1. Rema...
bc0k 14362	The binomial coefficient "...
bcnn 14363	` N ` choose ` N ` is 1. ...
bcn1 14364	Binomial coefficient: ` N ...
bcnp1n 14365	Binomial coefficient: ` N ...
bcm1k 14366	The proportion of one bino...
bcp1n 14367	The proportion of one bino...
bcp1nk 14368	The proportion of one bino...
bcval5 14369	Write out the top and bott...
bcn2 14370	Binomial coefficient: ` N ...
bcp1m1 14371	Compute the binomial coeff...
bcpasc 14372	Pascal's rule for the bino...
bccl 14373	A binomial coefficient, in...
bccl2 14374	A binomial coefficient, in...
bcn2m1 14375	Compute the binomial coeff...
bcn2p1 14376	Compute the binomial coeff...
permnn 14377	The number of permutations...
bcnm1 14378	The binomial coefficient o...
4bc3eq4 14379	The value of four choose t...
4bc2eq6 14380	The value of four choose t...
hashkf 14383	The finite part of the siz...
hashgval 14384	The value of the ` # ` fun...
hashginv 14385	The converse of ` G ` maps...
hashinf 14386	The value of the ` # ` fun...
hashbnd 14387	If ` A ` has size bounded ...
hashfxnn0 14388	The size function is a fun...
hashf 14389	The size function maps all...
hashxnn0 14390	The value of the hash func...
hashresfn 14391	Restriction of the domain ...
dmhashres 14392	Restriction of the domain ...
hashnn0pnf 14393	The value of the hash func...
hashnnn0genn0 14394	If the size of a set is no...
hashnemnf 14395	The size of a set is never...
hashv01gt1 14396	The size of a set is eithe...
hashfz1 14397	The set ` ( 1 ... N ) ` ha...
hashen 14398	Two finite sets have the s...
hasheni 14399	Equinumerous sets have the...
hasheqf1o 14400	The size of two finite set...
fiinfnf1o 14401	There is no bijection betw...
hasheqf1oi 14402	The size of two sets is eq...
hashf1rn 14403	The size of a finite set w...
hasheqf1od 14404	The size of two sets is eq...
fz1eqb 14405	Two possibly-empty 1-based...
hashcard 14406	The size function of the c...
hashcl 14407	Closure of the ` # ` funct...
hashxrcl 14408	Extended real closure of t...
hashclb 14409	Reverse closure of the ` #...
nfile 14410	The size of any infinite s...
hashvnfin 14411	A set of finite size is a ...
hashnfinnn0 14412	The size of an infinite se...
isfinite4 14413	A finite set is equinumero...
hasheq0 14414	Two ways of saying a set i...
hashneq0 14415	Two ways of saying a set i...
hashgt0n0 14416	If the size of a set is gr...
hashnncl 14417	Positive natural closure o...
hash0 14418	The empty set has size zer...
hashelne0d 14419	A set with an element has ...
hashsng 14420	The size of a singleton. ...
hashen1 14421	A set has size 1 if and on...
hash1elsn 14422	A set of size 1 with a kno...
hashrabrsn 14423	The size of a restricted c...
hashrabsn01 14424	The size of a restricted c...
hashrabsn1 14425	If the size of a restricte...
hashfn 14426	A function is equinumerous...
fseq1hash 14427	The value of the size func...
hashgadd 14428	` G ` maps ordinal additio...
hashgval2 14429	A short expression for the...
hashdom 14430	Dominance relation for the...
hashdomi 14431	Non-strict order relation ...
hashsdom 14432	Strict dominance relation ...
hashun 14433	The size of the union of d...
hashun2 14434	The size of the union of f...
hashun3 14435	The size of the union of f...
hashinfxadd 14436	The extended real addition...
hashunx 14437	The size of the union of d...
hashge0 14438	The cardinality of a set i...
hashgt0 14439	The cardinality of a nonem...
hashge1 14440	The cardinality of a nonem...
1elfz0hash 14441	1 is an element of the fin...
hashnn0n0nn 14442	If a nonnegative integer i...
hashunsng 14443	The size of the union of a...
hashunsngx 14444	The size of the union of a...
hashunsnggt 14445	The size of a set is great...
hashprg 14446	The size of an unordered p...
elprchashprn2 14447	If one element of an unord...
hashprb 14448	The size of an unordered p...
hashprdifel 14449	The elements of an unorder...
prhash2ex 14450	There is (at least) one se...
hashle00 14451	If the size of a set is le...
hashgt0elex 14452	If the size of a set is gr...
hashgt0elexb 14453	The size of a set is great...
hashp1i 14454	Size of a finite ordinal. ...
hash1 14455	Size of a finite ordinal. ...
hash2 14456	Size of a finite ordinal. ...
hash3 14457	Size of a finite ordinal. ...
hash4 14458	Size of a finite ordinal. ...
pr0hash2ex 14459	There is (at least) one se...
hashss 14460	The size of a subset is le...
prsshashgt1 14461	The size of a superset of ...
hashin 14462	The size of the intersecti...
hashssdif 14463	The size of the difference...
hashdif 14464	The size of the difference...
hashdifsn 14465	The size of the difference...
hashdifpr 14466	The size of the difference...
hashsn01 14467	The size of a singleton is...
hashsnle1 14468	The size of a singleton is...
hashsnlei 14469	Get an upper bound on a co...
hash1snb 14470	The size of a set is 1 if ...
euhash1 14471	The size of a set is 1 in ...
hash1n0 14472	If the size of a set is 1 ...
hashgt12el 14473	In a set with more than on...
hashgt12el2 14474	In a set with more than on...
hashgt23el 14475	A set with more than two e...
hashunlei 14476	Get an upper bound on a co...
hashsslei 14477	Get an upper bound on a co...
hashfz 14478	Value of the numeric cardi...
fzsdom2 14479	Condition for finite range...
hashfzo 14480	Cardinality of a half-open...
hashfzo0 14481	Cardinality of a half-open...
hashfzp1 14482	Value of the numeric cardi...
hashfz0 14483	Value of the numeric cardi...
hashxplem 14484	Lemma for ~ hashxp . (Con...
hashxp 14485	The size of the Cartesian ...
hashmap 14486	The size of the set expone...
hashpw 14487	The size of the power set ...
hashfun 14488	A finite set is a function...
hashres 14489	The number of elements of ...
hashreshashfun 14490	The number of elements of ...
hashimarn 14491	The size of the image of a...
hashimarni 14492	If the size of the image o...
hashfundm 14493	The size of a set function...
hashf1dmrn 14494	The size of the domain of ...
hashf1dmcdm 14495	The size of the domain of ...
resunimafz0 14496	TODO-AV: Revise using ` F...
fnfz0hash 14497	The size of a function on ...
ffz0hash 14498	The size of a function on ...
fnfz0hashnn0 14499	The size of a function on ...
ffzo0hash 14500	The size of a function on ...
fnfzo0hash 14501	The size of a function on ...
fnfzo0hashnn0 14502	The value of the size func...
hashbclem 14503	Lemma for ~ hashbc : induc...
hashbc 14504	The binomial coefficient c...
hashfacen 14505	The number of bijections b...
hashf1lem1 14506	Lemma for ~ hashf1 . (Con...
hashf1lem2 14507	Lemma for ~ hashf1 . (Con...
hashf1 14508	The permutation number ` |...
hashfac 14509	A factorial counts the num...
leiso 14510	Two ways to write a strict...
leisorel 14511	Version of ~ isorel for st...
fz1isolem 14512	Lemma for ~ fz1iso . (Con...
fz1iso 14513	Any finite ordered set has...
ishashinf 14514	Any set that is not finite...
seqcoll 14515	The function ` F ` contain...
seqcoll2 14516	The function ` F ` contain...
phphashd 14517	Corollary of the Pigeonhol...
phphashrd 14518	Corollary of the Pigeonhol...
hashprlei 14519	An unordered pair has at m...
hash2pr 14520	A set of size two is an un...
hash2prde 14521	A set of size two is an un...
hash2exprb 14522	A set of size two is an un...
hash2prb 14523	A set of size two is a pro...
prprrab 14524	The set of proper pairs of...
nehash2 14525	The cardinality of a set w...
hash2prd 14526	A set of size two is an un...
hash2pwpr 14527	If the size of a subset of...
hashle2pr 14528	A nonempty set of size les...
hashle2prv 14529	A nonempty subset of a pow...
pr2pwpr 14530	The set of subsets of a pa...
hashge2el2dif 14531	A set with size at least 2...
hashge2el2difr 14532	A set with at least 2 diff...
hashge2el2difb 14533	A set has size at least 2 ...
hashdmpropge2 14534	The size of the domain of ...
hashtplei 14535	An unordered triple has at...
hashtpg 14536	The size of an unordered t...
hash7g 14537	The size of an unordered s...
hashge3el3dif 14538	A set with size at least 3...
elss2prb 14539	An element of the set of s...
hash2sspr 14540	A subset of size two is an...
exprelprel 14541	If there is an element of ...
hash3tr 14542	A set of size three is an ...
hash1to3 14543	If the size of a set is be...
hash3tpde 14544	A set of size three is an ...
hash3tpexb 14545	A set of size three is an ...
hash3tpb 14546	A set of size three is a p...
tpf1ofv0 14547	The value of a one-to-one ...
tpf1ofv1 14548	The value of a one-to-one ...
tpf1ofv2 14549	The value of a one-to-one ...
tpf 14550	A function into a (proper)...
tpfo 14551	A function onto a (proper)...
tpf1o 14552	A bijection onto a (proper...
fundmge2nop0 14553	A function with a domain c...
fundmge2nop 14554	A function with a domain c...
fun2dmnop0 14555	A function with a domain c...
fun2dmnop 14556	A function with a domain c...
hashdifsnp1 14557	If the size of a set is a ...
fi1uzind 14558	Properties of an ordered p...
brfi1uzind 14559	Properties of a binary rel...
brfi1ind 14560	Properties of a binary rel...
brfi1indALT 14561	Alternate proof of ~ brfi1...
opfi1uzind 14562	Properties of an ordered p...
opfi1ind 14563	Properties of an ordered p...
iswrd 14566	Property of being a word o...
wrdval 14567	Value of the set of words ...
iswrdi 14568	A zero-based sequence is a...
wrdf 14569	A word is a zero-based seq...
iswrdb 14570	A word over an alphabet is...
wrddm 14571	The indices of a word (i.e...
sswrd 14572	The set of words respects ...
snopiswrd 14573	A singleton of an ordered ...
wrdexg 14574	The set of words over a se...
wrdexb 14575	The set of words over a se...
wrdexi 14576	The set of words over a se...
wrdsymbcl 14577	A symbol within a word ove...
wrdfn 14578	A word is a function with ...
wrdv 14579	A word over an alphabet is...
wrdlndm 14580	The length of a word is no...
iswrdsymb 14581	An arbitrary word is a wor...
wrdfin 14582	A word is a finite set. (...
lencl 14583	The length of a word is a ...
lennncl 14584	The length of a nonempty w...
wrdffz 14585	A word is a function from ...
wrdeq 14586	Equality theorem for the s...
wrdeqi 14587	Equality theorem for the s...
iswrddm0 14588	A function with empty doma...
wrd0 14589	The empty set is a word (t...
0wrd0 14590	The empty word is the only...
ffz0iswrd 14591	A sequence with zero-based...
wrdsymb 14592	A word is a word over the ...
nfwrd 14593	Hypothesis builder for ` W...
csbwrdg 14594	Class substitution for the...
wrdnval 14595	Words of a fixed length ar...
wrdmap 14596	Words as a mapping. (Cont...
hashwrdn 14597	If there is only a finite ...
wrdnfi 14598	If there is only a finite ...
wrdsymb0 14599	A symbol at a position "ou...
wrdlenge1n0 14600	A word with length at leas...
len0nnbi 14601	The length of a word is a ...
wrdlenge2n0 14602	A word with length at leas...
wrdsymb1 14603	The first symbol of a none...
wrdlen1 14604	A word of length 1 starts ...
fstwrdne 14605	The first symbol of a none...
fstwrdne0 14606	The first symbol of a none...
eqwrd 14607	Two words are equal iff th...
elovmpowrd 14608	Implications for the value...
elovmptnn0wrd 14609	Implications for the value...
wrdred1 14610	A word truncated by a symb...
wrdred1hash 14611	The length of a word trunc...
lsw 14614	Extract the last symbol of...
lsw0 14615	The last symbol of an empt...
lsw0g 14616	The last symbol of an empt...
lsw1 14617	The last symbol of a word ...
lswcl 14618	Closure of the last symbol...
lswlgt0cl 14619	The last symbol of a nonem...
ccatfn 14622	The concatenation operator...
ccatfval 14623	Value of the concatenation...
ccatcl 14624	The concatenation of two w...
ccatlen 14625	The length of a concatenat...
ccat0 14626	The concatenation of two w...
ccatval1 14627	Value of a symbol in the l...
ccatval2 14628	Value of a symbol in the r...
ccatval3 14629	Value of a symbol in the r...
elfzelfzccat 14630	An element of a finite set...
ccatvalfn 14631	The concatenation of two w...
ccatsymb 14632	The symbol at a given posi...
ccatfv0 14633	The first symbol of a conc...
ccatval1lsw 14634	The last symbol of the lef...
ccatval21sw 14635	The first symbol of the ri...
ccatlid 14636	Concatenation of a word by...
ccatrid 14637	Concatenation of a word by...
ccatass 14638	Associative law for concat...
ccatrn 14639	The range of a concatenate...
ccatidid 14640	Concatenation of the empty...
lswccatn0lsw 14641	The last symbol of a word ...
lswccat0lsw 14642	The last symbol of a word ...
ccatalpha 14643	A concatenation of two arb...
ccatrcl1 14644	Reverse closure of a conca...
ids1 14647	Identity function protecti...
s1val 14648	Value of a singleton word....
s1rn 14649	The range of a singleton w...
s1eq 14650	Equality theorem for a sin...
s1eqd 14651	Equality theorem for a sin...
s1cl 14652	A singleton word is a word...
s1cld 14653	A singleton word is a word...
s1prc 14654	Value of a singleton word ...
s1cli 14655	A singleton word is a word...
s1len 14656	Length of a singleton word...
s1nz 14657	A singleton word is not th...
s1dm 14658	The domain of a singleton ...
s1dmALT 14659	Alternate version of ~ s1d...
s1fv 14660	Sole symbol of a singleton...
lsws1 14661	The last symbol of a singl...
eqs1 14662	A word of length 1 is a si...
wrdl1exs1 14663	A word of length 1 is a si...
wrdl1s1 14664	A word of length 1 is a si...
s111 14665	The singleton word functio...
ccatws1cl 14666	The concatenation of a wor...
ccatws1clv 14667	The concatenation of a wor...
ccat2s1cl 14668	The concatenation of two s...
ccats1alpha 14669	A concatenation of a word ...
ccatws1len 14670	The length of the concaten...
ccatws1lenp1b 14671	The length of a word is ` ...
wrdlenccats1lenm1 14672	The length of a word is th...
ccat2s1len 14673	The length of the concaten...
ccatw2s1cl 14674	The concatenation of a wor...
ccatw2s1len 14675	The length of the concaten...
ccats1val1 14676	Value of a symbol in the l...
ccats1val2 14677	Value of the symbol concat...
ccat1st1st 14678	The first symbol of a word...
ccat2s1p1 14679	Extract the first of two c...
ccat2s1p2 14680	Extract the second of two ...
ccatw2s1ass 14681	Associative law for a conc...
ccatws1n0 14682	The concatenation of a wor...
ccatws1ls 14683	The last symbol of the con...
lswccats1 14684	The last symbol of a word ...
lswccats1fst 14685	The last symbol of a nonem...
ccatw2s1p1 14686	Extract the symbol of the ...
ccatw2s1p2 14687	Extract the second of two ...
ccat2s1fvw 14688	Extract a symbol of a word...
ccat2s1fst 14689	The first symbol of the co...
swrdnznd 14692	The value of a subword ope...
swrdval 14693	Value of a subword. (Cont...
swrd00 14694	A zero length substring. ...
swrdcl 14695	Closure of the subword ext...
swrdval2 14696	Value of the subword extra...
swrdlen 14697	Length of an extracted sub...
swrdfv 14698	A symbol in an extracted s...
swrdfv0 14699	The first symbol in an ext...
swrdf 14700	A subword of a word is a f...
swrdvalfn 14701	Value of the subword extra...
swrdrn 14702	The range of a subword of ...
swrdlend 14703	The value of the subword e...
swrdnd 14704	The value of the subword e...
swrdnd2 14705	Value of the subword extra...
swrdnnn0nd 14706	The value of a subword ope...
swrdnd0 14707	The value of a subword ope...
swrd0 14708	A subword of an empty set ...
swrdrlen 14709	Length of a right-anchored...
swrdlen2 14710	Length of an extracted sub...
swrdfv2 14711	A symbol in an extracted s...
swrdwrdsymb 14712	A subword is a word over t...
swrdsb0eq 14713	Two subwords with the same...
swrdsbslen 14714	Two subwords with the same...
swrdspsleq 14715	Two words have a common su...
swrds1 14716	Extract a single symbol fr...
swrdlsw 14717	Extract the last single sy...
ccatswrd 14718	Joining two adjacent subwo...
swrdccat2 14719	Recover the right half of ...
pfxnndmnd 14722	The value of a prefix oper...
pfxval 14723	Value of a prefix operatio...
pfx00 14724	The zero length prefix is ...
pfx0 14725	A prefix of an empty set i...
pfxval0 14726	Value of a prefix operatio...
pfxcl 14727	Closure of the prefix extr...
pfxmpt 14728	Value of the prefix extrac...
pfxres 14729	Value of the subword extra...
pfxf 14730	A prefix of a word is a fu...
pfxfn 14731	Value of the prefix extrac...
pfxfv 14732	A symbol in a prefix of a ...
pfxlen 14733	Length of a prefix. (Cont...
pfxid 14734	A word is a prefix of itse...
pfxrn 14735	The range of a prefix of a...
pfxn0 14736	A prefix consisting of at ...
pfxnd 14737	The value of a prefix oper...
pfxnd0 14738	The value of a prefix oper...
pfxwrdsymb 14739	A prefix of a word is a wo...
addlenrevpfx 14740	The sum of the lengths of ...
addlenpfx 14741	The sum of the lengths of ...
pfxfv0 14742	The first symbol of a pref...
pfxtrcfv 14743	A symbol in a word truncat...
pfxtrcfv0 14744	The first symbol in a word...
pfxfvlsw 14745	The last symbol in a nonem...
pfxeq 14746	The prefixes of two words ...
pfxtrcfvl 14747	The last symbol in a word ...
pfxsuffeqwrdeq 14748	Two words are equal if and...
pfxsuff1eqwrdeq 14749	Two (nonempty) words are e...
disjwrdpfx 14750	Sets of words are disjoint...
ccatpfx 14751	Concatenating a prefix wit...
pfxccat1 14752	Recover the left half of a...
pfx1 14753	The prefix of length one o...
swrdswrdlem 14754	Lemma for ~ swrdswrd . (C...
swrdswrd 14755	A subword of a subword is ...
pfxswrd 14756	A prefix of a subword is a...
swrdpfx 14757	A subword of a prefix is a...
pfxpfx 14758	A prefix of a prefix is a ...
pfxpfxid 14759	A prefix of a prefix with ...
pfxcctswrd 14760	The concatenation of the p...
lenpfxcctswrd 14761	The length of the concaten...
lenrevpfxcctswrd 14762	The length of the concaten...
pfxlswccat 14763	Reconstruct a nonempty wor...
ccats1pfxeq 14764	The last symbol of a word ...
ccats1pfxeqrex 14765	There exists a symbol such...
ccatopth 14766	An ~ opth -like theorem fo...
ccatopth2 14767	An ~ opth -like theorem fo...
ccatlcan 14768	Concatenation of words is ...
ccatrcan 14769	Concatenation of words is ...
wrdeqs1cat 14770	Decompose a nonempty word ...
cats1un 14771	Express a word with an ext...
wrdind 14772	Perform induction over the...
wrd2ind 14773	Perform induction over the...
swrdccatfn 14774	The subword of a concatena...
swrdccatin1 14775	The subword of a concatena...
pfxccatin12lem4 14776	Lemma 4 for ~ pfxccatin12 ...
pfxccatin12lem2a 14777	Lemma for ~ pfxccatin12lem...
pfxccatin12lem1 14778	Lemma 1 for ~ pfxccatin12 ...
swrdccatin2 14779	The subword of a concatena...
pfxccatin12lem2c 14780	Lemma for ~ pfxccatin12lem...
pfxccatin12lem2 14781	Lemma 2 for ~ pfxccatin12 ...
pfxccatin12lem3 14782	Lemma 3 for ~ pfxccatin12 ...
pfxccatin12 14783	The subword of a concatena...
pfxccat3 14784	The subword of a concatena...
swrdccat 14785	The subword of a concatena...
pfxccatpfx1 14786	A prefix of a concatenatio...
pfxccatpfx2 14787	A prefix of a concatenatio...
pfxccat3a 14788	A prefix of a concatenatio...
swrdccat3blem 14789	Lemma for ~ swrdccat3b . ...
swrdccat3b 14790	A suffix of a concatenatio...
pfxccatid 14791	A prefix of a concatenatio...
ccats1pfxeqbi 14792	A word is a prefix of a wo...
swrdccatin1d 14793	The subword of a concatena...
swrdccatin2d 14794	The subword of a concatena...
pfxccatin12d 14795	The subword of a concatena...
reuccatpfxs1lem 14796	Lemma for ~ reuccatpfxs1 ....
reuccatpfxs1 14797	There is a unique word hav...
reuccatpfxs1v 14798	There is a unique word hav...
splval 14801	Value of the substring rep...
splcl 14802	Closure of the substring r...
splid 14803	Splicing a subword for the...
spllen 14804	The length of a splice. (...
splfv1 14805	Symbols to the left of a s...
splfv2a 14806	Symbols within the replace...
splval2 14807	Value of a splice, assumin...
revval 14810	Value of the word reversin...
revcl 14811	The reverse of a word is a...
revlen 14812	The reverse of a word has ...
revfv 14813	Reverse of a word at a poi...
rev0 14814	The empty word is its own ...
revs1 14815	Singleton words are their ...
revccat 14816	Antiautomorphic property o...
revrev 14817	Reversal is an involution ...
reps 14820	Construct a function mappi...
repsundef 14821	A function mapping a half-...
repsconst 14822	Construct a function mappi...
repsf 14823	The constructed function m...
repswsymb 14824	The symbols of a "repeated...
repsw 14825	A function mapping a half-...
repswlen 14826	The length of a "repeated ...
repsw0 14827	The "repeated symbol word"...
repsdf2 14828	Alternative definition of ...
repswsymball 14829	All the symbols of a "repe...
repswsymballbi 14830	A word is a "repeated symb...
repswfsts 14831	The first symbol of a none...
repswlsw 14832	The last symbol of a nonem...
repsw1 14833	The "repeated symbol word"...
repswswrd 14834	A subword of a "repeated s...
repswpfx 14835	A prefix of a repeated sym...
repswccat 14836	The concatenation of two "...
repswrevw 14837	The reverse of a "repeated...
cshfn 14840	Perform a cyclical shift f...
cshword 14841	Perform a cyclical shift f...
cshnz 14842	A cyclical shift is the em...
0csh0 14843	Cyclically shifting an emp...
cshw0 14844	A word cyclically shifted ...
cshwmodn 14845	Cyclically shifting a word...
cshwsublen 14846	Cyclically shifting a word...
cshwn 14847	A word cyclically shifted ...
cshwcl 14848	A cyclically shifted word ...
cshwlen 14849	The length of a cyclically...
cshwf 14850	A cyclically shifted word ...
cshwfn 14851	A cyclically shifted word ...
cshwrn 14852	The range of a cyclically ...
cshwidxmod 14853	The symbol at a given inde...
cshwidxmodr 14854	The symbol at a given inde...
cshwidx0mod 14855	The symbol at index 0 of a...
cshwidx0 14856	The symbol at index 0 of a...
cshwidxm1 14857	The symbol at index ((n-N)...
cshwidxm 14858	The symbol at index (n-N) ...
cshwidxn 14859	The symbol at index (n-1) ...
cshf1 14860	Cyclically shifting a word...
cshinj 14861	If a word is injectiv (reg...
repswcshw 14862	A cyclically shifted "repe...
2cshw 14863	Cyclically shifting a word...
2cshwid 14864	Cyclically shifting a word...
lswcshw 14865	The last symbol of a word ...
2cshwcom 14866	Cyclically shifting a word...
cshwleneq 14867	If the results of cyclical...
3cshw 14868	Cyclically shifting a word...
cshweqdif2 14869	If cyclically shifting two...
cshweqdifid 14870	If cyclically shifting a w...
cshweqrep 14871	If cyclically shifting a w...
cshw1 14872	If cyclically shifting a w...
cshw1repsw 14873	If cyclically shifting a w...
cshwsexa 14874	The class of (different!) ...
cshwsexaOLD 14875	Obsolete version of ~ cshw...
2cshwcshw 14876	If a word is a cyclically ...
scshwfzeqfzo 14877	For a nonempty word the se...
cshwcshid 14878	A cyclically shifted word ...
cshwcsh2id 14879	A cyclically shifted word ...
cshimadifsn 14880	The image of a cyclically ...
cshimadifsn0 14881	The image of a cyclically ...
wrdco 14882	Mapping a word by a functi...
lenco 14883	Length of a mapped word is...
s1co 14884	Mapping of a singleton wor...
revco 14885	Mapping of words (i.e., a ...
ccatco 14886	Mapping of words commutes ...
cshco 14887	Mapping of words commutes ...
swrdco 14888	Mapping of words commutes ...
pfxco 14889	Mapping of words commutes ...
lswco 14890	Mapping of (nonempty) word...
repsco 14891	Mapping of words commutes ...
cats1cld 14906	Closure of concatenation w...
cats1co 14907	Closure of concatenation w...
cats1cli 14908	Closure of concatenation w...
cats1fvn 14909	The last symbol of a conca...
cats1fv 14910	A symbol other than the la...
cats1len 14911	The length of concatenatio...
cats1cat 14912	Closure of concatenation w...
cats2cat 14913	Closure of concatenation o...
s2eqd 14914	Equality theorem for a dou...
s3eqd 14915	Equality theorem for a len...
s4eqd 14916	Equality theorem for a len...
s5eqd 14917	Equality theorem for a len...
s6eqd 14918	Equality theorem for a len...
s7eqd 14919	Equality theorem for a len...
s8eqd 14920	Equality theorem for a len...
s3eq2 14921	Equality theorem for a len...
s2cld 14922	A doubleton word is a word...
s3cld 14923	A length 3 string is a wor...
s4cld 14924	A length 4 string is a wor...
s5cld 14925	A length 5 string is a wor...
s6cld 14926	A length 6 string is a wor...
s7cld 14927	A length 7 string is a wor...
s8cld 14928	A length 7 string is a wor...
s2cl 14929	A doubleton word is a word...
s3cl 14930	A length 3 string is a wor...
s2cli 14931	A doubleton word is a word...
s3cli 14932	A length 3 string is a wor...
s4cli 14933	A length 4 string is a wor...
s5cli 14934	A length 5 string is a wor...
s6cli 14935	A length 6 string is a wor...
s7cli 14936	A length 7 string is a wor...
s8cli 14937	A length 8 string is a wor...
s2fv0 14938	Extract the first symbol f...
s2fv1 14939	Extract the second symbol ...
s2len 14940	The length of a doubleton ...
s2dm 14941	The domain of a doubleton ...
s3fv0 14942	Extract the first symbol f...
s3fv1 14943	Extract the second symbol ...
s3fv2 14944	Extract the third symbol f...
s3len 14945	The length of a length 3 s...
s4fv0 14946	Extract the first symbol f...
s4fv1 14947	Extract the second symbol ...
s4fv2 14948	Extract the third symbol f...
s4fv3 14949	Extract the fourth symbol ...
s4len 14950	The length of a length 4 s...
s5len 14951	The length of a length 5 s...
s6len 14952	The length of a length 6 s...
s7len 14953	The length of a length 7 s...
s8len 14954	The length of a length 8 s...
lsws2 14955	The last symbol of a doubl...
lsws3 14956	The last symbol of a 3 let...
lsws4 14957	The last symbol of a 4 let...
s2prop 14958	A length 2 word is an unor...
s2dmALT 14959	Alternate version of ~ s2d...
s3tpop 14960	A length 3 word is an unor...
s4prop 14961	A length 4 word is a union...
s3fn 14962	A length 3 word is a funct...
funcnvs1 14963	The converse of a singleto...
funcnvs2 14964	The converse of a length 2...
funcnvs3 14965	The converse of a length 3...
funcnvs4 14966	The converse of a length 4...
s2f1o 14967	A length 2 word with mutua...
f1oun2prg 14968	A union of unordered pairs...
s4f1o 14969	A length 4 word with mutua...
s4dom 14970	The domain of a length 4 w...
s2co 14971	Mapping a doubleton word b...
s3co 14972	Mapping a length 3 string ...
s0s1 14973	Concatenation of fixed len...
s1s2 14974	Concatenation of fixed len...
s1s3 14975	Concatenation of fixed len...
s1s4 14976	Concatenation of fixed len...
s1s5 14977	Concatenation of fixed len...
s1s6 14978	Concatenation of fixed len...
s1s7 14979	Concatenation of fixed len...
s2s2 14980	Concatenation of fixed len...
s4s2 14981	Concatenation of fixed len...
s4s3 14982	Concatenation of fixed len...
s4s4 14983	Concatenation of fixed len...
s3s4 14984	Concatenation of fixed len...
s2s5 14985	Concatenation of fixed len...
s5s2 14986	Concatenation of fixed len...
s2eq2s1eq 14987	Two length 2 words are equ...
s2eq2seq 14988	Two length 2 words are equ...
s3eqs2s1eq 14989	Two length 3 words are equ...
s3eq3seq 14990	Two length 3 words are equ...
swrds2 14991	Extract two adjacent symbo...
swrds2m 14992	Extract two adjacent symbo...
wrdlen2i 14993	Implications of a word of ...
wrd2pr2op 14994	A word of length two repre...
wrdlen2 14995	A word of length two. (Co...
wrdlen2s2 14996	A word of length two as do...
wrdl2exs2 14997	A word of length two is a ...
pfx2 14998	A prefix of length two. (...
wrd3tpop 14999	A word of length three rep...
wrdlen3s3 15000	A word of length three as ...
repsw2 15001	The "repeated symbol word"...
repsw3 15002	The "repeated symbol word"...
swrd2lsw 15003	Extract the last two symbo...
2swrd2eqwrdeq 15004	Two words of length at lea...
ccatw2s1ccatws2 15005	The concatenation of a wor...
ccat2s1fvwALT 15006	Alternate proof of ~ ccat2...
wwlktovf 15007	Lemma 1 for ~ wrd2f1tovbij...
wwlktovf1 15008	Lemma 2 for ~ wrd2f1tovbij...
wwlktovfo 15009	Lemma 3 for ~ wrd2f1tovbij...
wwlktovf1o 15010	Lemma 4 for ~ wrd2f1tovbij...
wrd2f1tovbij 15011	There is a bijection betwe...
eqwrds3 15012	A word is equal with a len...
wrdl3s3 15013	A word of length 3 is a le...
s2rn 15014	Range of a length 2 string...
s3rn 15015	Range of a length 3 string...
s7rn 15016	Range of a length 7 string...
s7f1o 15017	A length 7 word with mutua...
s3sndisj 15018	The singletons consisting ...
s3iunsndisj 15019	The union of singletons co...
ofccat 15020	Letterwise operations on w...
ofs1 15021	Letterwise operations on a...
ofs2 15022	Letterwise operations on a...
coss12d 15023	Subset deduction for compo...
trrelssd 15024	The composition of subclas...
xpcogend 15025	The most interesting case ...
xpcoidgend 15026	If two classes are not dis...
cotr2g 15027	Two ways of saying that th...
cotr2 15028	Two ways of saying a relat...
cotr3 15029	Two ways of saying a relat...
coemptyd 15030	Deduction about compositio...
xptrrel 15031	The cross product is alway...
0trrel 15032	The empty class is a trans...
cleq1lem 15033	Equality implies bijection...
cleq1 15034	Equality of relations impl...
clsslem 15035	The closure of a subclass ...
trcleq1 15040	Equality of relations impl...
trclsslem 15041	The transitive closure (as...
trcleq2lem 15042	Equality implies bijection...
cvbtrcl 15043	Change of bound variable i...
trcleq12lem 15044	Equality implies bijection...
trclexlem 15045	Existence of relation impl...
trclublem 15046	If a relation exists then ...
trclubi 15047	The Cartesian product of t...
trclubgi 15048	The union with the Cartesi...
trclub 15049	The Cartesian product of t...
trclubg 15050	The union with the Cartesi...
trclfv 15051	The transitive closure of ...
brintclab 15052	Two ways to express a bina...
brtrclfv 15053	Two ways of expressing the...
brcnvtrclfv 15054	Two ways of expressing the...
brtrclfvcnv 15055	Two ways of expressing the...
brcnvtrclfvcnv 15056	Two ways of expressing the...
trclfvss 15057	The transitive closure (as...
trclfvub 15058	The transitive closure of ...
trclfvlb 15059	The transitive closure of ...
trclfvcotr 15060	The transitive closure of ...
trclfvlb2 15061	The transitive closure of ...
trclfvlb3 15062	The transitive closure of ...
cotrtrclfv 15063	The transitive closure of ...
trclidm 15064	The transitive closure of ...
trclun 15065	Transitive closure of a un...
trclfvg 15066	The value of the transitiv...
trclfvcotrg 15067	The value of the transitiv...
reltrclfv 15068	The transitive closure of ...
dmtrclfv 15069	The domain of the transiti...
reldmrelexp 15072	The domain of the repeated...
relexp0g 15073	A relation composed zero t...
relexp0 15074	A relation composed zero t...
relexp0d 15075	A relation composed zero t...
relexpsucnnr 15076	A reduction for relation e...
relexp1g 15077	A relation composed once i...
dfid5 15078	Identity relation is equal...
dfid6 15079	Identity relation expresse...
relexp1d 15080	A relation composed once i...
relexpsucnnl 15081	A reduction for relation e...
relexpsucl 15082	A reduction for relation e...
relexpsucr 15083	A reduction for relation e...
relexpsucrd 15084	A reduction for relation e...
relexpsucld 15085	A reduction for relation e...
relexpcnv 15086	Commutation of converse an...
relexpcnvd 15087	Commutation of converse an...
relexp0rel 15088	The exponentiation of a cl...
relexprelg 15089	The exponentiation of a cl...
relexprel 15090	The exponentiation of a re...
relexpreld 15091	The exponentiation of a re...
relexpnndm 15092	The domain of an exponenti...
relexpdmg 15093	The domain of an exponenti...
relexpdm 15094	The domain of an exponenti...
relexpdmd 15095	The domain of an exponenti...
relexpnnrn 15096	The range of an exponentia...
relexprng 15097	The range of an exponentia...
relexprn 15098	The range of an exponentia...
relexprnd 15099	The range of an exponentia...
relexpfld 15100	The field of an exponentia...
relexpfldd 15101	The field of an exponentia...
relexpaddnn 15102	Relation composition becom...
relexpuzrel 15103	The exponentiation of a cl...
relexpaddg 15104	Relation composition becom...
relexpaddd 15105	Relation composition becom...
rtrclreclem1 15108	The reflexive, transitive ...
dfrtrclrec2 15109	If two elements are connec...
rtrclreclem2 15110	The reflexive, transitive ...
rtrclreclem3 15111	The reflexive, transitive ...
rtrclreclem4 15112	The reflexive, transitive ...
dfrtrcl2 15113	The two definitions ` t* `...
relexpindlem 15114	Principle of transitive in...
relexpind 15115	Principle of transitive in...
rtrclind 15116	Principle of transitive in...
shftlem 15119	Two ways to write a shifte...
shftuz 15120	A shift of the upper integ...
shftfval 15121	The value of the sequence ...
shftdm 15122	Domain of a relation shift...
shftfib 15123	Value of a fiber of the re...
shftfn 15124	Functionality and domain o...
shftval 15125	Value of a sequence shifte...
shftval2 15126	Value of a sequence shifte...
shftval3 15127	Value of a sequence shifte...
shftval4 15128	Value of a sequence shifte...
shftval5 15129	Value of a shifted sequenc...
shftf 15130	Functionality of a shifted...
2shfti 15131	Composite shift operations...
shftidt2 15132	Identity law for the shift...
shftidt 15133	Identity law for the shift...
shftcan1 15134	Cancellation law for the s...
shftcan2 15135	Cancellation law for the s...
seqshft 15136	Shifting the index set of ...
sgnval 15139	Value of the signum functi...
sgn0 15140	The signum of 0 is 0. (Co...
sgnp 15141	The signum of a positive e...
sgnrrp 15142	The signum of a positive r...
sgn1 15143	The signum of 1 is 1. (Co...
sgnpnf 15144	The signum of ` +oo ` is 1...
sgnn 15145	The signum of a negative e...
sgnmnf 15146	The signum of ` -oo ` is -...
cjval 15153	The value of the conjugate...
cjth 15154	The defining property of t...
cjf 15155	Domain and codomain of the...
cjcl 15156	The conjugate of a complex...
reval 15157	The value of the real part...
imval 15158	The value of the imaginary...
imre 15159	The imaginary part of a co...
reim 15160	The real part of a complex...
recl 15161	The real part of a complex...
imcl 15162	The imaginary part of a co...
ref 15163	Domain and codomain of the...
imf 15164	Domain and codomain of the...
crre 15165	The real part of a complex...
crim 15166	The real part of a complex...
replim 15167	Reconstruct a complex numb...
remim 15168	Value of the conjugate of ...
reim0 15169	The imaginary part of a re...
reim0b 15170	A number is real iff its i...
rereb 15171	A number is real iff it eq...
mulre 15172	A product with a nonzero r...
rere 15173	A real number equals its r...
cjreb 15174	A number is real iff it eq...
recj 15175	Real part of a complex con...
reneg 15176	Real part of negative. (C...
readd 15177	Real part distributes over...
resub 15178	Real part distributes over...
remullem 15179	Lemma for ~ remul , ~ immu...
remul 15180	Real part of a product. (...
remul2 15181	Real part of a product. (...
rediv 15182	Real part of a division. ...
imcj 15183	Imaginary part of a comple...
imneg 15184	The imaginary part of a ne...
imadd 15185	Imaginary part distributes...
imsub 15186	Imaginary part distributes...
immul 15187	Imaginary part of a produc...
immul2 15188	Imaginary part of a produc...
imdiv 15189	Imaginary part of a divisi...
cjre 15190	A real number equals its c...
cjcj 15191	The conjugate of the conju...
cjadd 15192	Complex conjugate distribu...
cjmul 15193	Complex conjugate distribu...
ipcnval 15194	Standard inner product on ...
cjmulrcl 15195	A complex number times its...
cjmulval 15196	A complex number times its...
cjmulge0 15197	A complex number times its...
cjneg 15198	Complex conjugate of negat...
addcj 15199	A number plus its conjugat...
cjsub 15200	Complex conjugate distribu...
cjexp 15201	Complex conjugate of posit...
imval2 15202	The imaginary part of a nu...
re0 15203	The real part of zero. (C...
im0 15204	The imaginary part of zero...
re1 15205	The real part of one. (Co...
im1 15206	The imaginary part of one....
rei 15207	The real part of ` _i ` . ...
imi 15208	The imaginary part of ` _i...
cj0 15209	The conjugate of zero. (C...
cji 15210	The complex conjugate of t...
cjreim 15211	The conjugate of a represe...
cjreim2 15212	The conjugate of the repre...
cj11 15213	Complex conjugate is a one...
cjne0 15214	A number is nonzero iff it...
cjdiv 15215	Complex conjugate distribu...
cnrecnv 15216	The inverse to the canonic...
sqeqd 15217	A deduction for showing tw...
recli 15218	The real part of a complex...
imcli 15219	The imaginary part of a co...
cjcli 15220	Closure law for complex co...
replimi 15221	Construct a complex number...
cjcji 15222	The conjugate of the conju...
reim0bi 15223	A number is real iff its i...
rerebi 15224	A real number equals its r...
cjrebi 15225	A number is real iff it eq...
recji 15226	Real part of a complex con...
imcji 15227	Imaginary part of a comple...
cjmulrcli 15228	A complex number times its...
cjmulvali 15229	A complex number times its...
cjmulge0i 15230	A complex number times its...
renegi 15231	Real part of negative. (C...
imnegi 15232	Imaginary part of negative...
cjnegi 15233	Complex conjugate of negat...
addcji 15234	A number plus its conjugat...
readdi 15235	Real part distributes over...
imaddi 15236	Imaginary part distributes...
remuli 15237	Real part of a product. (...
immuli 15238	Imaginary part of a produc...
cjaddi 15239	Complex conjugate distribu...
cjmuli 15240	Complex conjugate distribu...
ipcni 15241	Standard inner product on ...
cjdivi 15242	Complex conjugate distribu...
crrei 15243	The real part of a complex...
crimi 15244	The imaginary part of a co...
recld 15245	The real part of a complex...
imcld 15246	The imaginary part of a co...
cjcld 15247	Closure law for complex co...
replimd 15248	Construct a complex number...
remimd 15249	Value of the conjugate of ...
cjcjd 15250	The conjugate of the conju...
reim0bd 15251	A number is real iff its i...
rerebd 15252	A real number equals its r...
cjrebd 15253	A number is real iff it eq...
cjne0d 15254	A number is nonzero iff it...
recjd 15255	Real part of a complex con...
imcjd 15256	Imaginary part of a comple...
cjmulrcld 15257	A complex number times its...
cjmulvald 15258	A complex number times its...
cjmulge0d 15259	A complex number times its...
renegd 15260	Real part of negative. (C...
imnegd 15261	Imaginary part of negative...
cjnegd 15262	Complex conjugate of negat...
addcjd 15263	A number plus its conjugat...
cjexpd 15264	Complex conjugate of posit...
readdd 15265	Real part distributes over...
imaddd 15266	Imaginary part distributes...
resubd 15267	Real part distributes over...
imsubd 15268	Imaginary part distributes...
remuld 15269	Real part of a product. (...
immuld 15270	Imaginary part of a produc...
cjaddd 15271	Complex conjugate distribu...
cjmuld 15272	Complex conjugate distribu...
ipcnd 15273	Standard inner product on ...
cjdivd 15274	Complex conjugate distribu...
rered 15275	A real number equals its r...
reim0d 15276	The imaginary part of a re...
cjred 15277	A real number equals its c...
remul2d 15278	Real part of a product. (...
immul2d 15279	Imaginary part of a produc...
redivd 15280	Real part of a division. ...
imdivd 15281	Imaginary part of a divisi...
crred 15282	The real part of a complex...
crimd 15283	The imaginary part of a co...
sqrtval 15288	Value of square root funct...
absval 15289	The absolute value (modulu...
rennim 15290	A real number does not lie...
cnpart 15291	The specification of restr...
sqrt0 15292	The square root of zero is...
01sqrexlem1 15293	Lemma for ~ 01sqrex . (Co...
01sqrexlem2 15294	Lemma for ~ 01sqrex . (Co...
01sqrexlem3 15295	Lemma for ~ 01sqrex . (Co...
01sqrexlem4 15296	Lemma for ~ 01sqrex . (Co...
01sqrexlem5 15297	Lemma for ~ 01sqrex . (Co...
01sqrexlem6 15298	Lemma for ~ 01sqrex . (Co...
01sqrexlem7 15299	Lemma for ~ 01sqrex . (Co...
01sqrex 15300	Existence of a square root...
resqrex 15301	Existence of a square root...
sqrmo 15302	Uniqueness for the square ...
resqreu 15303	Existence and uniqueness f...
resqrtcl 15304	Closure of the square root...
resqrtthlem 15305	Lemma for ~ resqrtth . (C...
resqrtth 15306	Square root theorem over t...
remsqsqrt 15307	Square of square root. (C...
sqrtge0 15308	The square root function i...
sqrtgt0 15309	The square root function i...
sqrtmul 15310	Square root distributes ov...
sqrtle 15311	Square root is monotonic. ...
sqrtlt 15312	Square root is strictly mo...
sqrt11 15313	The square root function i...
sqrt00 15314	A square root is zero iff ...
rpsqrtcl 15315	The square root of a posit...
sqrtdiv 15316	Square root distributes ov...
sqrtneglem 15317	The square root of a negat...
sqrtneg 15318	The square root of a negat...
sqrtsq2 15319	Relationship between squar...
sqrtsq 15320	Square root of square. (C...
sqrtmsq 15321	Square root of square. (C...
sqrt1 15322	The square root of 1 is 1....
sqrt4 15323	The square root of 4 is 2....
sqrt9 15324	The square root of 9 is 3....
sqrt2gt1lt2 15325	The square root of 2 is bo...
sqrtm1 15326	The imaginary unit is the ...
nn0sqeq1 15327	A natural number with squa...
absneg 15328	Absolute value of the nega...
abscl 15329	Real closure of absolute v...
abscj 15330	The absolute value of a nu...
absvalsq 15331	Square of value of absolut...
absvalsq2 15332	Square of value of absolut...
sqabsadd 15333	Square of absolute value o...
sqabssub 15334	Square of absolute value o...
absval2 15335	Value of absolute value fu...
abs0 15336	The absolute value of 0. ...
absi 15337	The absolute value of the ...
absge0 15338	Absolute value is nonnegat...
absrpcl 15339	The absolute value of a no...
abs00 15340	The absolute value of a nu...
abs00ad 15341	A complex number is zero i...
abs00bd 15342	If a complex number is zer...
absreimsq 15343	Square of the absolute val...
absreim 15344	Absolute value of a number...
absmul 15345	Absolute value distributes...
absdiv 15346	Absolute value distributes...
absid 15347	A nonnegative number is it...
abs1 15348	The absolute value of one ...
absnid 15349	For a negative number, its...
leabs 15350	A real number is less than...
absor 15351	The absolute value of a re...
absre 15352	Absolute value of a real n...
absresq 15353	Square of the absolute val...
absmod0 15354	` A ` is divisible by ` B ...
absexp 15355	Absolute value of positive...
absexpz 15356	Absolute value of integer ...
abssq 15357	Square can be moved in and...
sqabs 15358	The squares of two reals a...
absrele 15359	The absolute value of a co...
absimle 15360	The absolute value of a co...
max0add 15361	The sum of the positive an...
absz 15362	A real number is an intege...
nn0abscl 15363	The absolute value of an i...
zabscl 15364	The absolute value of an i...
abslt 15365	Absolute value and 'less t...
absle 15366	Absolute value and 'less t...
abssubne0 15367	If the absolute value of a...
absdiflt 15368	The absolute value of a di...
absdifle 15369	The absolute value of a di...
elicc4abs 15370	Membership in a symmetric ...
lenegsq 15371	Comparison to a nonnegativ...
releabs 15372	The real part of a number ...
recval 15373	Reciprocal expressed with ...
absidm 15374	The absolute value functio...
absgt0 15375	The absolute value of a no...
nnabscl 15376	The absolute value of a no...
abssub 15377	Swapping order of subtract...
abssubge0 15378	Absolute value of a nonneg...
abssuble0 15379	Absolute value of a nonpos...
absmax 15380	The maximum of two numbers...
abstri 15381	Triangle inequality for ab...
abs3dif 15382	Absolute value of differen...
abs2dif 15383	Difference of absolute val...
abs2dif2 15384	Difference of absolute val...
abs2difabs 15385	Absolute value of differen...
abs1m 15386	For any complex number, th...
recan 15387	Cancellation law involving...
absf 15388	Mapping domain and codomai...
abs3lem 15389	Lemma involving absolute v...
abslem2 15390	Lemma involving absolute v...
rddif 15391	The difference between a r...
absrdbnd 15392	Bound on the absolute valu...
fzomaxdiflem 15393	Lemma for ~ fzomaxdif . (...
fzomaxdif 15394	A bound on the separation ...
uzin2 15395	The upper integers are clo...
rexanuz 15396	Combine two different uppe...
rexanre 15397	Combine two different uppe...
rexfiuz 15398	Combine finitely many diff...
rexuz3 15399	Restrict the base of the u...
rexanuz2 15400	Combine two different uppe...
r19.29uz 15401	A version of ~ 19.29 for u...
r19.2uz 15402	A version of ~ r19.2z for ...
rexuzre 15403	Convert an upper real quan...
rexico 15404	Restrict the base of an up...
cau3lem 15405	Lemma for ~ cau3 . (Contr...
cau3 15406	Convert between three-quan...
cau4 15407	Change the base of a Cauch...
caubnd2 15408	A Cauchy sequence of compl...
caubnd 15409	A Cauchy sequence of compl...
sqreulem 15410	Lemma for ~ sqreu : write ...
sqreu 15411	Existence and uniqueness f...
sqrtcl 15412	Closure of the square root...
sqrtthlem 15413	Lemma for ~ sqrtth . (Con...
sqrtf 15414	Mapping domain and codomai...
sqrtth 15415	Square root theorem over t...
sqrtrege0 15416	The square root function m...
eqsqrtor 15417	Solve an equation containi...
eqsqrtd 15418	A deduction for showing th...
eqsqrt2d 15419	A deduction for showing th...
amgm2 15420	Arithmetic-geometric mean ...
sqrtthi 15421	Square root theorem. Theo...
sqrtcli 15422	The square root of a nonne...
sqrtgt0i 15423	The square root of a posit...
sqrtmsqi 15424	Square root of square. (C...
sqrtsqi 15425	Square root of square. (C...
sqsqrti 15426	Square of square root. (C...
sqrtge0i 15427	The square root of a nonne...
absidi 15428	A nonnegative number is it...
absnidi 15429	A negative number is the n...
leabsi 15430	A real number is less than...
absori 15431	The absolute value of a re...
absrei 15432	Absolute value of a real n...
sqrtpclii 15433	The square root of a posit...
sqrtgt0ii 15434	The square root of a posit...
sqrt11i 15435	The square root function i...
sqrtmuli 15436	Square root distributes ov...
sqrtmulii 15437	Square root distributes ov...
sqrtmsq2i 15438	Relationship between squar...
sqrtlei 15439	Square root is monotonic. ...
sqrtlti 15440	Square root is strictly mo...
abslti 15441	Absolute value and 'less t...
abslei 15442	Absolute value and 'less t...
cnsqrt00 15443	A square root of a complex...
absvalsqi 15444	Square of value of absolut...
absvalsq2i 15445	Square of value of absolut...
abscli 15446	Real closure of absolute v...
absge0i 15447	Absolute value is nonnegat...
absval2i 15448	Value of absolute value fu...
abs00i 15449	The absolute value of a nu...
absgt0i 15450	The absolute value of a no...
absnegi 15451	Absolute value of negative...
abscji 15452	The absolute value of a nu...
releabsi 15453	The real part of a number ...
abssubi 15454	Swapping order of subtract...
absmuli 15455	Absolute value distributes...
sqabsaddi 15456	Square of absolute value o...
sqabssubi 15457	Square of absolute value o...
absdivzi 15458	Absolute value distributes...
abstrii 15459	Triangle inequality for ab...
abs3difi 15460	Absolute value of differen...
abs3lemi 15461	Lemma involving absolute v...
rpsqrtcld 15462	The square root of a posit...
sqrtgt0d 15463	The square root of a posit...
absnidd 15464	A negative number is the n...
leabsd 15465	A real number is less than...
absord 15466	The absolute value of a re...
absred 15467	Absolute value of a real n...
resqrtcld 15468	The square root of a nonne...
sqrtmsqd 15469	Square root of square. (C...
sqrtsqd 15470	Square root of square. (C...
sqrtge0d 15471	The square root of a nonne...
sqrtnegd 15472	The square root of a negat...
absidd 15473	A nonnegative number is it...
sqrtdivd 15474	Square root distributes ov...
sqrtmuld 15475	Square root distributes ov...
sqrtsq2d 15476	Relationship between squar...
sqrtled 15477	Square root is monotonic. ...
sqrtltd 15478	Square root is strictly mo...
sqr11d 15479	The square root function i...
absltd 15480	Absolute value and 'less t...
absled 15481	Absolute value and 'less t...
abssubge0d 15482	Absolute value of a nonneg...
abssuble0d 15483	Absolute value of a nonpos...
absdifltd 15484	The absolute value of a di...
absdifled 15485	The absolute value of a di...
icodiamlt 15486	Two elements in a half-ope...
abscld 15487	Real closure of absolute v...
sqrtcld 15488	Closure of the square root...
sqrtrege0d 15489	The real part of the squar...
sqsqrtd 15490	Square root theorem. Theo...
msqsqrtd 15491	Square root theorem. Theo...
sqr00d 15492	A square root is zero iff ...
absvalsqd 15493	Square of value of absolut...
absvalsq2d 15494	Square of value of absolut...
absge0d 15495	Absolute value is nonnegat...
absval2d 15496	Value of absolute value fu...
abs00d 15497	The absolute value of a nu...
absne0d 15498	The absolute value of a nu...
absrpcld 15499	The absolute value of a no...
absnegd 15500	Absolute value of negative...
abscjd 15501	The absolute value of a nu...
releabsd 15502	The real part of a number ...
absexpd 15503	Absolute value of positive...
abssubd 15504	Swapping order of subtract...
absmuld 15505	Absolute value distributes...
absdivd 15506	Absolute value distributes...
abstrid 15507	Triangle inequality for ab...
abs2difd 15508	Difference of absolute val...
abs2dif2d 15509	Difference of absolute val...
abs2difabsd 15510	Absolute value of differen...
abs3difd 15511	Absolute value of differen...
abs3lemd 15512	Lemma involving absolute v...
reusq0 15513	A complex number is the sq...
bhmafibid1cn 15514	The Brahmagupta-Fibonacci ...
bhmafibid2cn 15515	The Brahmagupta-Fibonacci ...
bhmafibid1 15516	The Brahmagupta-Fibonacci ...
bhmafibid2 15517	The Brahmagupta-Fibonacci ...
limsupgord 15520	Ordering property of the s...
limsupcl 15521	Closure of the superior li...
limsupval 15522	The superior limit of an i...
limsupgf 15523	Closure of the superior li...
limsupgval 15524	Value of the superior limi...
limsupgle 15525	The defining property of t...
limsuple 15526	The defining property of t...
limsuplt 15527	The defining property of t...
limsupval2 15528	The superior limit, relati...
limsupgre 15529	If a sequence of real numb...
limsupbnd1 15530	If a sequence is eventuall...
limsupbnd2 15531	If a sequence is eventuall...
climrel 15540	The limit relation is a re...
rlimrel 15541	The limit relation is a re...
clim 15542	Express the predicate: Th...
rlim 15543	Express the predicate: Th...
rlim2 15544	Rewrite ~ rlim for a mappi...
rlim2lt 15545	Use strictly less-than in ...
rlim3 15546	Restrict the range of the ...
climcl 15547	Closure of the limit of a ...
rlimpm 15548	Closure of a function with...
rlimf 15549	Closure of a function with...
rlimss 15550	Domain closure of a functi...
rlimcl 15551	Closure of the limit of a ...
clim2 15552	Express the predicate: Th...
clim2c 15553	Express the predicate ` F ...
clim0 15554	Express the predicate ` F ...
clim0c 15555	Express the predicate ` F ...
rlim0 15556	Express the predicate ` B ...
rlim0lt 15557	Use strictly less-than in ...
climi 15558	Convergence of a sequence ...
climi2 15559	Convergence of a sequence ...
climi0 15560	Convergence of a sequence ...
rlimi 15561	Convergence at infinity of...
rlimi2 15562	Convergence at infinity of...
ello1 15563	Elementhood in the set of ...
ello12 15564	Elementhood in the set of ...
ello12r 15565	Sufficient condition for e...
lo1f 15566	An eventually upper bounde...
lo1dm 15567	An eventually upper bounde...
lo1bdd 15568	The defining property of a...
ello1mpt 15569	Elementhood in the set of ...
ello1mpt2 15570	Elementhood in the set of ...
ello1d 15571	Sufficient condition for e...
lo1bdd2 15572	If an eventually bounded f...
lo1bddrp 15573	Refine ~ o1bdd2 to give a ...
elo1 15574	Elementhood in the set of ...
elo12 15575	Elementhood in the set of ...
elo12r 15576	Sufficient condition for e...
o1f 15577	An eventually bounded func...
o1dm 15578	An eventually bounded func...
o1bdd 15579	The defining property of a...
lo1o1 15580	A function is eventually b...
lo1o12 15581	A function is eventually b...
elo1mpt 15582	Elementhood in the set of ...
elo1mpt2 15583	Elementhood in the set of ...
elo1d 15584	Sufficient condition for e...
o1lo1 15585	A real function is eventua...
o1lo12 15586	A lower bounded real funct...
o1lo1d 15587	A real eventually bounded ...
icco1 15588	Derive eventual boundednes...
o1bdd2 15589	If an eventually bounded f...
o1bddrp 15590	Refine ~ o1bdd2 to give a ...
climconst 15591	An (eventually) constant s...
rlimconst 15592	A constant sequence conver...
rlimclim1 15593	Forward direction of ~ rli...
rlimclim 15594	A sequence on an upper int...
climrlim2 15595	Produce a real limit from ...
climconst2 15596	A constant sequence conver...
climz 15597	The zero sequence converge...
rlimuni 15598	A real function whose doma...
rlimdm 15599	Two ways to express that a...
climuni 15600	An infinite sequence of co...
fclim 15601	The limit relation is func...
climdm 15602	Two ways to express that a...
climeu 15603	An infinite sequence of co...
climreu 15604	An infinite sequence of co...
climmo 15605	An infinite sequence of co...
rlimres 15606	The restriction of a funct...
lo1res 15607	The restriction of an even...
o1res 15608	The restriction of an even...
rlimres2 15609	The restriction of a funct...
lo1res2 15610	The restriction of a funct...
o1res2 15611	The restriction of a funct...
lo1resb 15612	The restriction of a funct...
rlimresb 15613	The restriction of a funct...
o1resb 15614	The restriction of a funct...
climeq 15615	Two functions that are eve...
lo1eq 15616	Two functions that are eve...
rlimeq 15617	Two functions that are eve...
o1eq 15618	Two functions that are eve...
climmpt 15619	Exhibit a function ` G ` w...
2clim 15620	If two sequences converge ...
climmpt2 15621	Relate an integer limit on...
climshftlem 15622	A shifted function converg...
climres 15623	A function restricted to u...
climshft 15624	A shifted function converg...
serclim0 15625	The zero series converges ...
rlimcld2 15626	If ` D ` is a closed set i...
rlimrege0 15627	The limit of a sequence of...
rlimrecl 15628	The limit of a real sequen...
rlimge0 15629	The limit of a sequence of...
climshft2 15630	A shifted function converg...
climrecl 15631	The limit of a convergent ...
climge0 15632	A nonnegative sequence con...
climabs0 15633	Convergence to zero of the...
o1co 15634	Sufficient condition for t...
o1compt 15635	Sufficient condition for t...
rlimcn1 15636	Image of a limit under a c...
rlimcn1b 15637	Image of a limit under a c...
rlimcn3 15638	Image of a limit under a c...
rlimcn2 15639	Image of a limit under a c...
climcn1 15640	Image of a limit under a c...
climcn2 15641	Image of a limit under a c...
addcn2 15642	Complex number addition is...
subcn2 15643	Complex number subtraction...
mulcn2 15644	Complex number multiplicat...
reccn2 15645	The reciprocal function is...
cn1lem 15646	A sufficient condition for...
abscn2 15647	The absolute value functio...
cjcn2 15648	The complex conjugate func...
recn2 15649	The real part function is ...
imcn2 15650	The imaginary part functio...
climcn1lem 15651	The limit of a continuous ...
climabs 15652	Limit of the absolute valu...
climcj 15653	Limit of the complex conju...
climre 15654	Limit of the real part of ...
climim 15655	Limit of the imaginary par...
rlimmptrcl 15656	Reverse closure for a real...
rlimabs 15657	Limit of the absolute valu...
rlimcj 15658	Limit of the complex conju...
rlimre 15659	Limit of the real part of ...
rlimim 15660	Limit of the imaginary par...
o1of2 15661	Show that a binary operati...
o1add 15662	The sum of two eventually ...
o1mul 15663	The product of two eventua...
o1sub 15664	The difference of two even...
rlimo1 15665	Any function with a finite...
rlimdmo1 15666	A convergent function is e...
o1rlimmul 15667	The product of an eventual...
o1const 15668	A constant function is eve...
lo1const 15669	A constant function is eve...
lo1mptrcl 15670	Reverse closure for an eve...
o1mptrcl 15671	Reverse closure for an eve...
o1add2 15672	The sum of two eventually ...
o1mul2 15673	The product of two eventua...
o1sub2 15674	The product of two eventua...
lo1add 15675	The sum of two eventually ...
lo1mul 15676	The product of an eventual...
lo1mul2 15677	The product of an eventual...
o1dif 15678	If the difference of two f...
lo1sub 15679	The difference of an event...
climadd 15680	Limit of the sum of two co...
climmul 15681	Limit of the product of tw...
climsub 15682	Limit of the difference of...
climaddc1 15683	Limit of a constant ` C ` ...
climaddc2 15684	Limit of a constant ` C ` ...
climmulc2 15685	Limit of a sequence multip...
climsubc1 15686	Limit of a constant ` C ` ...
climsubc2 15687	Limit of a constant ` C ` ...
climle 15688	Comparison of the limits o...
climsqz 15689	Convergence of a sequence ...
climsqz2 15690	Convergence of a sequence ...
rlimadd 15691	Limit of the sum of two co...
rlimaddOLD 15692	Obsolete version of ~ rlim...
rlimsub 15693	Limit of the difference of...
rlimmul 15694	Limit of the product of tw...
rlimmulOLD 15695	Obsolete version of ~ rlim...
rlimdiv 15696	Limit of the quotient of t...
rlimneg 15697	Limit of the negative of a...
rlimle 15698	Comparison of the limits o...
rlimsqzlem 15699	Lemma for ~ rlimsqz and ~ ...
rlimsqz 15700	Convergence of a sequence ...
rlimsqz2 15701	Convergence of a sequence ...
lo1le 15702	Transfer eventual upper bo...
o1le 15703	Transfer eventual boundedn...
rlimno1 15704	A function whose inverse c...
clim2ser 15705	The limit of an infinite s...
clim2ser2 15706	The limit of an infinite s...
iserex 15707	An infinite series converg...
isermulc2 15708	Multiplication of an infin...
climlec2 15709	Comparison of a constant t...
iserle 15710	Comparison of the limits o...
iserge0 15711	The limit of an infinite s...
climub 15712	The limit of a monotonic s...
climserle 15713	The partial sums of a conv...
isershft 15714	Index shift of the limit o...
isercolllem1 15715	Lemma for ~ isercoll . (C...
isercolllem2 15716	Lemma for ~ isercoll . (C...
isercolllem3 15717	Lemma for ~ isercoll . (C...
isercoll 15718	Rearrange an infinite seri...
isercoll2 15719	Generalize ~ isercoll so t...
climsup 15720	A bounded monotonic sequen...
climcau 15721	A converging sequence of c...
climbdd 15722	A converging sequence of c...
caucvgrlem 15723	Lemma for ~ caurcvgr . (C...
caurcvgr 15724	A Cauchy sequence of real ...
caucvgrlem2 15725	Lemma for ~ caucvgr . (Co...
caucvgr 15726	A Cauchy sequence of compl...
caurcvg 15727	A Cauchy sequence of real ...
caurcvg2 15728	A Cauchy sequence of real ...
caucvg 15729	A Cauchy sequence of compl...
caucvgb 15730	A function is convergent i...
serf0 15731	If an infinite series conv...
iseraltlem1 15732	Lemma for ~ iseralt . A d...
iseraltlem2 15733	Lemma for ~ iseralt . The...
iseraltlem3 15734	Lemma for ~ iseralt . Fro...
iseralt 15735	The alternating series tes...
sumex 15738	A sum is a set. (Contribu...
sumeq1 15739	Equality theorem for a sum...
nfsum1 15740	Bound-variable hypothesis ...
nfsum 15741	Bound-variable hypothesis ...
sumeq2w 15742	Equality theorem for sum, ...
sumeq2ii 15743	Equality theorem for sum, ...
sumeq2 15744	Equality theorem for sum. ...
cbvsum 15745	Change bound variable in a...
cbvsumv 15746	Change bound variable in a...
sumeq1i 15747	Equality inference for sum...
sumeq2i 15748	Equality inference for sum...
sumeq12i 15749	Equality inference for sum...
sumeq1d 15750	Equality deduction for sum...
sumeq2d 15751	Equality deduction for sum...
sumeq2dv 15752	Equality deduction for sum...
sumeq2sdv 15753	Equality deduction for sum...
sumeq2sdvOLD 15754	Obsolete version of ~ sume...
2sumeq2dv 15755	Equality deduction for dou...
sumeq12dv 15756	Equality deduction for sum...
sumeq12rdv 15757	Equality deduction for sum...
sum2id 15758	The second class argument ...
sumfc 15759	A lemma to facilitate conv...
fz1f1o 15760	A lemma for working with f...
sumrblem 15761	Lemma for ~ sumrb . (Cont...
fsumcvg 15762	The sequence of partial su...
sumrb 15763	Rebase the starting point ...
summolem3 15764	Lemma for ~ summo . (Cont...
summolem2a 15765	Lemma for ~ summo . (Cont...
summolem2 15766	Lemma for ~ summo . (Cont...
summo 15767	A sum has at most one limi...
zsum 15768	Series sum with index set ...
isum 15769	Series sum with an upper i...
fsum 15770	The value of a sum over a ...
sum0 15771	Any sum over the empty set...
sumz 15772	Any sum of zero over a sum...
fsumf1o 15773	Re-index a finite sum usin...
sumss 15774	Change the index set to a ...
fsumss 15775	Change the index set to a ...
sumss2 15776	Change the index set of a ...
fsumcvg2 15777	The sequence of partial su...
fsumsers 15778	Special case of series sum...
fsumcvg3 15779	A finite sum is convergent...
fsumser 15780	A finite sum expressed in ...
fsumcl2lem 15781	- Lemma for finite sum clo...
fsumcllem 15782	- Lemma for finite sum clo...
fsumcl 15783	Closure of a finite sum of...
fsumrecl 15784	Closure of a finite sum of...
fsumzcl 15785	Closure of a finite sum of...
fsumnn0cl 15786	Closure of a finite sum of...
fsumrpcl 15787	Closure of a finite sum of...
fsumclf 15788	Closure of a finite sum of...
fsumzcl2 15789	A finite sum with integer ...
fsumadd 15790	The sum of two finite sums...
fsumsplit 15791	Split a sum into two parts...
fsumsplitf 15792	Split a sum into two parts...
sumsnf 15793	A sum of a singleton is th...
fsumsplitsn 15794	Separate out a term in a f...
fsumsplit1 15795	Separate out a term in a f...
sumsn 15796	A sum of a singleton is th...
fsum1 15797	The finite sum of ` A ( k ...
sumpr 15798	A sum over a pair is the s...
sumtp 15799	A sum over a triple is the...
sumsns 15800	A sum of a singleton is th...
fsumm1 15801	Separate out the last term...
fzosump1 15802	Separate out the last term...
fsum1p 15803	Separate out the first ter...
fsummsnunz 15804	A finite sum all of whose ...
fsumsplitsnun 15805	Separate out a term in a f...
fsump1 15806	The addition of the next t...
isumclim 15807	An infinite sum equals the...
isumclim2 15808	A converging series conver...
isumclim3 15809	The sequence of partial fi...
sumnul 15810	The sum of a non-convergen...
isumcl 15811	The sum of a converging in...
isummulc2 15812	An infinite sum multiplied...
isummulc1 15813	An infinite sum multiplied...
isumdivc 15814	An infinite sum divided by...
isumrecl 15815	The sum of a converging in...
isumge0 15816	An infinite sum of nonnega...
isumadd 15817	Addition of infinite sums....
sumsplit 15818	Split a sum into two parts...
fsump1i 15819	Optimized version of ~ fsu...
fsum2dlem 15820	Lemma for ~ fsum2d - induc...
fsum2d 15821	Write a double sum as a su...
fsumxp 15822	Combine two sums into a si...
fsumcnv 15823	Transform a region of summ...
fsumcom2 15824	Interchange order of summa...
fsumcom 15825	Interchange order of summa...
fsum0diaglem 15826	Lemma for ~ fsum0diag . (...
fsum0diag 15827	Two ways to express "the s...
mptfzshft 15828	1-1 onto function in maps-...
fsumrev 15829	Reversal of a finite sum. ...
fsumshft 15830	Index shift of a finite su...
fsumshftm 15831	Negative index shift of a ...
fsumrev2 15832	Reversal of a finite sum. ...
fsum0diag2 15833	Two ways to express "the s...
fsummulc2 15834	A finite sum multiplied by...
fsummulc1 15835	A finite sum multiplied by...
fsumdivc 15836	A finite sum divided by a ...
fsumneg 15837	Negation of a finite sum. ...
fsumsub 15838	Split a finite sum over a ...
fsum2mul 15839	Separate the nested sum of...
fsumconst 15840	The sum of constant terms ...
fsumdifsnconst 15841	The sum of constant terms ...
modfsummodslem1 15842	Lemma 1 for ~ modfsummods ...
modfsummods 15843	Induction step for ~ modfs...
modfsummod 15844	A finite sum modulo a posi...
fsumge0 15845	If all of the terms of a f...
fsumless 15846	A shorter sum of nonnegati...
fsumge1 15847	A sum of nonnegative numbe...
fsum00 15848	A sum of nonnegative numbe...
fsumle 15849	If all of the terms of fin...
fsumlt 15850	If every term in one finit...
fsumabs 15851	Generalized triangle inequ...
telfsumo 15852	Sum of a telescoping serie...
telfsumo2 15853	Sum of a telescoping serie...
telfsum 15854	Sum of a telescoping serie...
telfsum2 15855	Sum of a telescoping serie...
fsumparts 15856	Summation by parts. (Cont...
fsumrelem 15857	Lemma for ~ fsumre , ~ fsu...
fsumre 15858	The real part of a sum. (...
fsumim 15859	The imaginary part of a su...
fsumcj 15860	The complex conjugate of a...
fsumrlim 15861	Limit of a finite sum of c...
fsumo1 15862	The finite sum of eventual...
o1fsum 15863	If ` A ( k ) ` is O(1), th...
seqabs 15864	Generalized triangle inequ...
iserabs 15865	Generalized triangle inequ...
cvgcmp 15866	A comparison test for conv...
cvgcmpub 15867	An upper bound for the lim...
cvgcmpce 15868	A comparison test for conv...
abscvgcvg 15869	An absolutely convergent s...
climfsum 15870	Limit of a finite sum of c...
fsumiun 15871	Sum over a disjoint indexe...
hashiun 15872	The cardinality of a disjo...
hash2iun 15873	The cardinality of a neste...
hash2iun1dif1 15874	The cardinality of a neste...
hashrabrex 15875	The number of elements in ...
hashuni 15876	The cardinality of a disjo...
qshash 15877	The cardinality of a set w...
ackbijnn 15878	Translate the Ackermann bi...
binomlem 15879	Lemma for ~ binom (binomia...
binom 15880	The binomial theorem: ` ( ...
binom1p 15881	Special case of the binomi...
binom11 15882	Special case of the binomi...
binom1dif 15883	A summation for the differ...
bcxmaslem1 15884	Lemma for ~ bcxmas . (Con...
bcxmas 15885	Parallel summation (Christ...
incexclem 15886	Lemma for ~ incexc . (Con...
incexc 15887	The inclusion/exclusion pr...
incexc2 15888	The inclusion/exclusion pr...
isumshft 15889	Index shift of an infinite...
isumsplit 15890	Split off the first ` N ` ...
isum1p 15891	The infinite sum of a conv...
isumnn0nn 15892	Sum from 0 to infinity in ...
isumrpcl 15893	The infinite sum of positi...
isumle 15894	Comparison of two infinite...
isumless 15895	A finite sum of nonnegativ...
isumsup2 15896	An infinite sum of nonnega...
isumsup 15897	An infinite sum of nonnega...
isumltss 15898	A partial sum of a series ...
climcndslem1 15899	Lemma for ~ climcnds : bou...
climcndslem2 15900	Lemma for ~ climcnds : bou...
climcnds 15901	The Cauchy condensation te...
divrcnv 15902	The sequence of reciprocal...
divcnv 15903	The sequence of reciprocal...
flo1 15904	The floor function satisfi...
divcnvshft 15905	Limit of a ratio function....
supcvg 15906	Extract a sequence ` f ` i...
infcvgaux1i 15907	Auxiliary theorem for appl...
infcvgaux2i 15908	Auxiliary theorem for appl...
harmonic 15909	The harmonic series ` H ` ...
arisum 15910	Arithmetic series sum of t...
arisum2 15911	Arithmetic series sum of t...
trireciplem 15912	Lemma for ~ trirecip . Sh...
trirecip 15913	The sum of the reciprocals...
expcnv 15914	A sequence of powers of a ...
explecnv 15915	A sequence of terms conver...
geoserg 15916	The value of the finite ge...
geoser 15917	The value of the finite ge...
pwdif 15918	The difference of two numb...
pwm1geoser 15919	The n-th power of a number...
geolim 15920	The partial sums in the in...
geolim2 15921	The partial sums in the ge...
georeclim 15922	The limit of a geometric s...
geo2sum 15923	The value of the finite ge...
geo2sum2 15924	The value of the finite ge...
geo2lim 15925	The value of the infinite ...
geomulcvg 15926	The geometric series conve...
geoisum 15927	The infinite sum of ` 1 + ...
geoisumr 15928	The infinite sum of recipr...
geoisum1 15929	The infinite sum of ` A ^ ...
geoisum1c 15930	The infinite sum of ` A x....
0.999... 15931	The recurring decimal 0.99...
geoihalfsum 15932	Prove that the infinite ge...
cvgrat 15933	Ratio test for convergence...
mertenslem1 15934	Lemma for ~ mertens . (Co...
mertenslem2 15935	Lemma for ~ mertens . (Co...
mertens 15936	Mertens' theorem. If ` A ...
prodf 15937	An infinite product of com...
clim2prod 15938	The limit of an infinite p...
clim2div 15939	The limit of an infinite p...
prodfmul 15940	The product of two infinit...
prodf1 15941	The value of the partial p...
prodf1f 15942	A one-valued infinite prod...
prodfclim1 15943	The constant one product c...
prodfn0 15944	No term of a nonzero infin...
prodfrec 15945	The reciprocal of an infin...
prodfdiv 15946	The quotient of two infini...
ntrivcvg 15947	A non-trivially converging...
ntrivcvgn0 15948	A product that converges t...
ntrivcvgfvn0 15949	Any value of a product seq...
ntrivcvgtail 15950	A tail of a non-trivially ...
ntrivcvgmullem 15951	Lemma for ~ ntrivcvgmul . ...
ntrivcvgmul 15952	The product of two non-tri...
prodex 15955	A product is a set. (Cont...
prodeq1f 15956	Equality theorem for a pro...
prodeq1 15957	Equality theorem for a pro...
nfcprod1 15958	Bound-variable hypothesis ...
nfcprod 15959	Bound-variable hypothesis ...
prodeq2w 15960	Equality theorem for produ...
prodeq2ii 15961	Equality theorem for produ...
prodeq2 15962	Equality theorem for produ...
cbvprod 15963	Change bound variable in a...
cbvprodv 15964	Change bound variable in a...
cbvprodi 15965	Change bound variable in a...
prodeq1i 15966	Equality inference for pro...
prodeq1iOLD 15967	Obsolete version of ~ prod...
prodeq2i 15968	Equality inference for pro...
prodeq12i 15969	Equality inference for pro...
prodeq1d 15970	Equality deduction for pro...
prodeq2d 15971	Equality deduction for pro...
prodeq2dv 15972	Equality deduction for pro...
prodeq2sdv 15973	Equality deduction for pro...
prodeq2sdvOLD 15974	Obsolete version of ~ prod...
2cprodeq2dv 15975	Equality deduction for dou...
prodeq12dv 15976	Equality deduction for pro...
prodeq12rdv 15977	Equality deduction for pro...
prod2id 15978	The second class argument ...
prodrblem 15979	Lemma for ~ prodrb . (Con...
fprodcvg 15980	The sequence of partial pr...
prodrblem2 15981	Lemma for ~ prodrb . (Con...
prodrb 15982	Rebase the starting point ...
prodmolem3 15983	Lemma for ~ prodmo . (Con...
prodmolem2a 15984	Lemma for ~ prodmo . (Con...
prodmolem2 15985	Lemma for ~ prodmo . (Con...
prodmo 15986	A product has at most one ...
zprod 15987	Series product with index ...
iprod 15988	Series product with an upp...
zprodn0 15989	Nonzero series product wit...
iprodn0 15990	Nonzero series product wit...
fprod 15991	The value of a product ove...
fprodntriv 15992	A non-triviality lemma for...
prod0 15993	A product over the empty s...
prod1 15994	Any product of one over a ...
prodfc 15995	A lemma to facilitate conv...
fprodf1o 15996	Re-index a finite product ...
prodss 15997	Change the index set to a ...
fprodss 15998	Change the index set to a ...
fprodser 15999	A finite product expressed...
fprodcl2lem 16000	Finite product closure lem...
fprodcllem 16001	Finite product closure lem...
fprodcl 16002	Closure of a finite produc...
fprodrecl 16003	Closure of a finite produc...
fprodzcl 16004	Closure of a finite produc...
fprodnncl 16005	Closure of a finite produc...
fprodrpcl 16006	Closure of a finite produc...
fprodnn0cl 16007	Closure of a finite produc...
fprodcllemf 16008	Finite product closure lem...
fprodreclf 16009	Closure of a finite produc...
fprodmul 16010	The product of two finite ...
fproddiv 16011	The quotient of two finite...
prodsn 16012	A product of a singleton i...
fprod1 16013	A finite product of only o...
prodsnf 16014	A product of a singleton i...
climprod1 16015	The limit of a product ove...
fprodsplit 16016	Split a finite product int...
fprodm1 16017	Separate out the last term...
fprod1p 16018	Separate out the first ter...
fprodp1 16019	Multiply in the last term ...
fprodm1s 16020	Separate out the last term...
fprodp1s 16021	Multiply in the last term ...
prodsns 16022	A product of the singleton...
fprodfac 16023	Factorial using product no...
fprodabs 16024	The absolute value of a fi...
fprodeq0 16025	Any finite product contain...
fprodshft 16026	Shift the index of a finit...
fprodrev 16027	Reversal of a finite produ...
fprodconst 16028	The product of constant te...
fprodn0 16029	A finite product of nonzer...
fprod2dlem 16030	Lemma for ~ fprod2d - indu...
fprod2d 16031	Write a double product as ...
fprodxp 16032	Combine two products into ...
fprodcnv 16033	Transform a product region...
fprodcom2 16034	Interchange order of multi...
fprodcom 16035	Interchange product order....
fprod0diag 16036	Two ways to express "the p...
fproddivf 16037	The quotient of two finite...
fprodsplitf 16038	Split a finite product int...
fprodsplitsn 16039	Separate out a term in a f...
fprodsplit1f 16040	Separate out a term in a f...
fprodn0f 16041	A finite product of nonzer...
fprodclf 16042	Closure of a finite produc...
fprodge0 16043	If all the terms of a fini...
fprodeq0g 16044	Any finite product contain...
fprodge1 16045	If all of the terms of a f...
fprodle 16046	If all the terms of two fi...
fprodmodd 16047	If all factors of two fini...
iprodclim 16048	An infinite product equals...
iprodclim2 16049	A converging product conve...
iprodclim3 16050	The sequence of partial fi...
iprodcl 16051	The product of a non-trivi...
iprodrecl 16052	The product of a non-trivi...
iprodmul 16053	Multiplication of infinite...
risefacval 16058	The value of the rising fa...
fallfacval 16059	The value of the falling f...
risefacval2 16060	One-based value of rising ...
fallfacval2 16061	One-based value of falling...
fallfacval3 16062	A product representation o...
risefaccllem 16063	Lemma for rising factorial...
fallfaccllem 16064	Lemma for falling factoria...
risefaccl 16065	Closure law for rising fac...
fallfaccl 16066	Closure law for falling fa...
rerisefaccl 16067	Closure law for rising fac...
refallfaccl 16068	Closure law for falling fa...
nnrisefaccl 16069	Closure law for rising fac...
zrisefaccl 16070	Closure law for rising fac...
zfallfaccl 16071	Closure law for falling fa...
nn0risefaccl 16072	Closure law for rising fac...
rprisefaccl 16073	Closure law for rising fac...
risefallfac 16074	A relationship between ris...
fallrisefac 16075	A relationship between fal...
risefall0lem 16076	Lemma for ~ risefac0 and ~...
risefac0 16077	The value of the rising fa...
fallfac0 16078	The value of the falling f...
risefacp1 16079	The value of the rising fa...
fallfacp1 16080	The value of the falling f...
risefacp1d 16081	The value of the rising fa...
fallfacp1d 16082	The value of the falling f...
risefac1 16083	The value of rising factor...
fallfac1 16084	The value of falling facto...
risefacfac 16085	Relate rising factorial to...
fallfacfwd 16086	The forward difference of ...
0fallfac 16087	The value of the zero fall...
0risefac 16088	The value of the zero risi...
binomfallfaclem1 16089	Lemma for ~ binomfallfac ....
binomfallfaclem2 16090	Lemma for ~ binomfallfac ....
binomfallfac 16091	A version of the binomial ...
binomrisefac 16092	A version of the binomial ...
fallfacval4 16093	Represent the falling fact...
bcfallfac 16094	Binomial coefficient in te...
fallfacfac 16095	Relate falling factorial t...
bpolylem 16098	Lemma for ~ bpolyval . (C...
bpolyval 16099	The value of the Bernoulli...
bpoly0 16100	The value of the Bernoulli...
bpoly1 16101	The value of the Bernoulli...
bpolycl 16102	Closure law for Bernoulli ...
bpolysum 16103	A sum for Bernoulli polyno...
bpolydiflem 16104	Lemma for ~ bpolydif . (C...
bpolydif 16105	Calculate the difference b...
fsumkthpow 16106	A closed-form expression f...
bpoly2 16107	The Bernoulli polynomials ...
bpoly3 16108	The Bernoulli polynomials ...
bpoly4 16109	The Bernoulli polynomials ...
fsumcube 16110	Express the sum of cubes i...
eftcl 16123	Closure of a term in the s...
reeftcl 16124	The terms of the series ex...
eftabs 16125	The absolute value of a te...
eftval 16126	The value of a term in the...
efcllem 16127	Lemma for ~ efcl . The se...
ef0lem 16128	The series defining the ex...
efval 16129	Value of the exponential f...
esum 16130	Value of Euler's constant ...
eff 16131	Domain and codomain of the...
efcl 16132	Closure law for the expone...
efcld 16133	Closure law for the expone...
efval2 16134	Value of the exponential f...
efcvg 16135	The series that defines th...
efcvgfsum 16136	Exponential function conve...
reefcl 16137	The exponential function i...
reefcld 16138	The exponential function i...
ere 16139	Euler's constant ` _e ` = ...
ege2le3 16140	Lemma for ~ egt2lt3 . (Co...
ef0 16141	Value of the exponential f...
efcj 16142	The exponential of a compl...
efaddlem 16143	Lemma for ~ efadd (exponen...
efadd 16144	Sum of exponents law for e...
fprodefsum 16145	Move the exponential funct...
efcan 16146	Cancellation law for expon...
efne0 16147	The exponential of a compl...
efneg 16148	The exponential of the opp...
eff2 16149	The exponential function m...
efsub 16150	Difference of exponents la...
efexp 16151	The exponential of an inte...
efzval 16152	Value of the exponential f...
efgt0 16153	The exponential of a real ...
rpefcl 16154	The exponential of a real ...
rpefcld 16155	The exponential of a real ...
eftlcvg 16156	The tail series of the exp...
eftlcl 16157	Closure of the sum of an i...
reeftlcl 16158	Closure of the sum of an i...
eftlub 16159	An upper bound on the abso...
efsep 16160	Separate out the next term...
effsumlt 16161	The partial sums of the se...
eft0val 16162	The value of the first ter...
ef4p 16163	Separate out the first fou...
efgt1p2 16164	The exponential of a posit...
efgt1p 16165	The exponential of a posit...
efgt1 16166	The exponential of a posit...
eflt 16167	The exponential function o...
efle 16168	The exponential function o...
reef11 16169	The exponential function o...
reeff1 16170	The exponential function m...
eflegeo 16171	The exponential function o...
sinval 16172	Value of the sine function...
cosval 16173	Value of the cosine functi...
sinf 16174	Domain and codomain of the...
cosf 16175	Domain and codomain of the...
sincl 16176	Closure of the sine functi...
coscl 16177	Closure of the cosine func...
tanval 16178	Value of the tangent funct...
tancl 16179	The closure of the tangent...
sincld 16180	Closure of the sine functi...
coscld 16181	Closure of the cosine func...
tancld 16182	Closure of the tangent fun...
tanval2 16183	Express the tangent functi...
tanval3 16184	Express the tangent functi...
resinval 16185	The sine of a real number ...
recosval 16186	The cosine of a real numbe...
efi4p 16187	Separate out the first fou...
resin4p 16188	Separate out the first fou...
recos4p 16189	Separate out the first fou...
resincl 16190	The sine of a real number ...
recoscl 16191	The cosine of a real numbe...
retancl 16192	The closure of the tangent...
resincld 16193	Closure of the sine functi...
recoscld 16194	Closure of the cosine func...
retancld 16195	Closure of the tangent fun...
sinneg 16196	The sine of a negative is ...
cosneg 16197	The cosines of a number an...
tanneg 16198	The tangent of a negative ...
sin0 16199	Value of the sine function...
cos0 16200	Value of the cosine functi...
tan0 16201	The value of the tangent f...
efival 16202	The exponential function i...
efmival 16203	The exponential function i...
sinhval 16204	Value of the hyperbolic si...
coshval 16205	Value of the hyperbolic co...
resinhcl 16206	The hyperbolic sine of a r...
rpcoshcl 16207	The hyperbolic cosine of a...
recoshcl 16208	The hyperbolic cosine of a...
retanhcl 16209	The hyperbolic tangent of ...
tanhlt1 16210	The hyperbolic tangent of ...
tanhbnd 16211	The hyperbolic tangent of ...
efeul 16212	Eulerian representation of...
efieq 16213	The exponentials of two im...
sinadd 16214	Addition formula for sine....
cosadd 16215	Addition formula for cosin...
tanaddlem 16216	A useful intermediate step...
tanadd 16217	Addition formula for tange...
sinsub 16218	Sine of difference. (Cont...
cossub 16219	Cosine of difference. (Co...
addsin 16220	Sum of sines. (Contribute...
subsin 16221	Difference of sines. (Con...
sinmul 16222	Product of sines can be re...
cosmul 16223	Product of cosines can be ...
addcos 16224	Sum of cosines. (Contribu...
subcos 16225	Difference of cosines. (C...
sincossq 16226	Sine squared plus cosine s...
sin2t 16227	Double-angle formula for s...
cos2t 16228	Double-angle formula for c...
cos2tsin 16229	Double-angle formula for c...
sinbnd 16230	The sine of a real number ...
cosbnd 16231	The cosine of a real numbe...
sinbnd2 16232	The sine of a real number ...
cosbnd2 16233	The cosine of a real numbe...
ef01bndlem 16234	Lemma for ~ sin01bnd and ~...
sin01bnd 16235	Bounds on the sine of a po...
cos01bnd 16236	Bounds on the cosine of a ...
cos1bnd 16237	Bounds on the cosine of 1....
cos2bnd 16238	Bounds on the cosine of 2....
sinltx 16239	The sine of a positive rea...
sin01gt0 16240	The sine of a positive rea...
cos01gt0 16241	The cosine of a positive r...
sin02gt0 16242	The sine of a positive rea...
sincos1sgn 16243	The signs of the sine and ...
sincos2sgn 16244	The signs of the sine and ...
sin4lt0 16245	The sine of 4 is negative....
absefi 16246	The absolute value of the ...
absef 16247	The absolute value of the ...
absefib 16248	A complex number is real i...
efieq1re 16249	A number whose imaginary e...
demoivre 16250	De Moivre's Formula. Proo...
demoivreALT 16251	Alternate proof of ~ demoi...
eirrlem 16254	Lemma for ~ eirr . (Contr...
eirr 16255	` _e ` is irrational. (Co...
egt2lt3 16256	Euler's constant ` _e ` = ...
epos 16257	Euler's constant ` _e ` is...
epr 16258	Euler's constant ` _e ` is...
ene0 16259	` _e ` is not 0. (Contrib...
ene1 16260	` _e ` is not 1. (Contrib...
xpnnen 16261	The Cartesian product of t...
znnen 16262	The set of integers and th...
qnnen 16263	The rational numbers are c...
rpnnen2lem1 16264	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem2 16265	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem3 16266	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem4 16267	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem5 16268	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem6 16269	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem7 16270	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem8 16271	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem9 16272	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem10 16273	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem11 16274	Lemma for ~ rpnnen2 . (Co...
rpnnen2lem12 16275	Lemma for ~ rpnnen2 . (Co...
rpnnen2 16276	The other half of ~ rpnnen...
rpnnen 16277	The cardinality of the con...
rexpen 16278	The real numbers are equin...
cpnnen 16279	The complex numbers are eq...
rucALT 16280	Alternate proof of ~ ruc ....
ruclem1 16281	Lemma for ~ ruc (the reals...
ruclem2 16282	Lemma for ~ ruc . Orderin...
ruclem3 16283	Lemma for ~ ruc . The con...
ruclem4 16284	Lemma for ~ ruc . Initial...
ruclem6 16285	Lemma for ~ ruc . Domain ...
ruclem7 16286	Lemma for ~ ruc . Success...
ruclem8 16287	Lemma for ~ ruc . The int...
ruclem9 16288	Lemma for ~ ruc . The fir...
ruclem10 16289	Lemma for ~ ruc . Every f...
ruclem11 16290	Lemma for ~ ruc . Closure...
ruclem12 16291	Lemma for ~ ruc . The sup...
ruclem13 16292	Lemma for ~ ruc . There i...
ruc 16293	The set of positive intege...
resdomq 16294	The set of rationals is st...
aleph1re 16295	There are at least aleph-o...
aleph1irr 16296	There are at least aleph-o...
cnso 16297	The complex numbers can be...
sqrt2irrlem 16298	Lemma for ~ sqrt2irr . Th...
sqrt2irr 16299	The square root of 2 is ir...
sqrt2re 16300	The square root of 2 exist...
sqrt2irr0 16301	The square root of 2 is an...
nthruc 16302	The sequence ` NN ` , ` ZZ...
nthruz 16303	The sequence ` NN ` , ` NN...
divides 16306	Define the divides relatio...
dvdsval2 16307	One nonzero integer divide...
dvdsval3 16308	One nonzero integer divide...
dvdszrcl 16309	Reverse closure for the di...
dvdsmod0 16310	If a positive integer divi...
p1modz1 16311	If a number greater than 1...
dvdsmodexp 16312	If a positive integer divi...
nndivdvds 16313	Strong form of ~ dvdsval2 ...
nndivides 16314	Definition of the divides ...
moddvds 16315	Two ways to say ` A == B `...
modm1div 16316	An integer greater than on...
dvds0lem 16317	A lemma to assist theorems...
dvds1lem 16318	A lemma to assist theorems...
dvds2lem 16319	A lemma to assist theorems...
iddvds 16320	An integer divides itself....
1dvds 16321	1 divides any integer. Th...
dvds0 16322	Any integer divides 0. Th...
negdvdsb 16323	An integer divides another...
dvdsnegb 16324	An integer divides another...
absdvdsb 16325	An integer divides another...
dvdsabsb 16326	An integer divides another...
0dvds 16327	Only 0 is divisible by 0. ...
dvdsmul1 16328	An integer divides a multi...
dvdsmul2 16329	An integer divides a multi...
iddvdsexp 16330	An integer divides a posit...
muldvds1 16331	If a product divides an in...
muldvds2 16332	If a product divides an in...
dvdscmul 16333	Multiplication by a consta...
dvdsmulc 16334	Multiplication by a consta...
dvdscmulr 16335	Cancellation law for the d...
dvdsmulcr 16336	Cancellation law for the d...
summodnegmod 16337	The sum of two integers mo...
modmulconst 16338	Constant multiplication in...
dvds2ln 16339	If an integer divides each...
dvds2add 16340	If an integer divides each...
dvds2sub 16341	If an integer divides each...
dvds2addd 16342	Deduction form of ~ dvds2a...
dvds2subd 16343	Deduction form of ~ dvds2s...
dvdstr 16344	The divides relation is tr...
dvdstrd 16345	The divides relation is tr...
dvdsmultr1 16346	If an integer divides anot...
dvdsmultr1d 16347	Deduction form of ~ dvdsmu...
dvdsmultr2 16348	If an integer divides anot...
dvdsmultr2d 16349	Deduction form of ~ dvdsmu...
ordvdsmul 16350	If an integer divides eith...
dvdssub2 16351	If an integer divides a di...
dvdsadd 16352	An integer divides another...
dvdsaddr 16353	An integer divides another...
dvdssub 16354	An integer divides another...
dvdssubr 16355	An integer divides another...
dvdsadd2b 16356	Adding a multiple of the b...
dvdsaddre2b 16357	Adding a multiple of the b...
fsumdvds 16358	If every term in a sum is ...
dvdslelem 16359	Lemma for ~ dvdsle . (Con...
dvdsle 16360	The divisors of a positive...
dvdsleabs 16361	The divisors of a nonzero ...
dvdsleabs2 16362	Transfer divisibility to a...
dvdsabseq 16363	If two integers divide eac...
dvdseq 16364	If two nonnegative integer...
divconjdvds 16365	If a nonzero integer ` M `...
dvdsdivcl 16366	The complement of a diviso...
dvdsflip 16367	An involution of the divis...
dvdsssfz1 16368	The set of divisors of a n...
dvds1 16369	The only nonnegative integ...
alzdvds 16370	Only 0 is divisible by all...
dvdsext 16371	Poset extensionality for d...
fzm1ndvds 16372	No number between ` 1 ` an...
fzo0dvdseq 16373	Zero is the only one of th...
fzocongeq 16374	Two different elements of ...
addmodlteqALT 16375	Two nonnegative integers l...
dvdsfac 16376	A positive integer divides...
dvdsexp2im 16377	If an integer divides anot...
dvdsexp 16378	A power divides a power wi...
dvdsmod 16379	Any number ` K ` whose mod...
mulmoddvds 16380	If an integer is divisible...
3dvds 16381	A rule for divisibility by...
3dvdsdec 16382	A decimal number is divisi...
3dvds2dec 16383	A decimal number is divisi...
fprodfvdvdsd 16384	A finite product of intege...
fproddvdsd 16385	A finite product of intege...
evenelz 16386	An even number is an integ...
zeo3 16387	An integer is even or odd....
zeo4 16388	An integer is even or odd ...
zeneo 16389	No even integer equals an ...
odd2np1lem 16390	Lemma for ~ odd2np1 . (Co...
odd2np1 16391	An integer is odd iff it i...
even2n 16392	An integer is even iff it ...
oddm1even 16393	An integer is odd iff its ...
oddp1even 16394	An integer is odd iff its ...
oexpneg 16395	The exponential of the neg...
mod2eq0even 16396	An integer is 0 modulo 2 i...
mod2eq1n2dvds 16397	An integer is 1 modulo 2 i...
oddnn02np1 16398	A nonnegative integer is o...
oddge22np1 16399	An integer greater than on...
evennn02n 16400	A nonnegative integer is e...
evennn2n 16401	A positive integer is even...
2tp1odd 16402	A number which is twice an...
mulsucdiv2z 16403	An integer multiplied with...
sqoddm1div8z 16404	A squared odd number minus...
2teven 16405	A number which is twice an...
zeo5 16406	An integer is either even ...
evend2 16407	An integer is even iff its...
oddp1d2 16408	An integer is odd iff its ...
zob 16409	Alternate characterization...
oddm1d2 16410	An integer is odd iff its ...
ltoddhalfle 16411	An integer is less than ha...
halfleoddlt 16412	An integer is greater than...
opoe 16413	The sum of two odds is eve...
omoe 16414	The difference of two odds...
opeo 16415	The sum of an odd and an e...
omeo 16416	The difference of an odd a...
z0even 16417	2 divides 0. That means 0...
n2dvds1 16418	2 does not divide 1. That...
n2dvdsm1 16419	2 does not divide -1. Tha...
z2even 16420	2 divides 2. That means 2...
n2dvds3 16421	2 does not divide 3. That...
z4even 16422	2 divides 4. That means 4...
4dvdseven 16423	An integer which is divisi...
m1expe 16424	Exponentiation of -1 by an...
m1expo 16425	Exponentiation of -1 by an...
m1exp1 16426	Exponentiation of negative...
nn0enne 16427	A positive integer is an e...
nn0ehalf 16428	The half of an even nonneg...
nnehalf 16429	The half of an even positi...
nn0onn 16430	An odd nonnegative integer...
nn0o1gt2 16431	An odd nonnegative integer...
nno 16432	An alternate characterizat...
nn0o 16433	An alternate characterizat...
nn0ob 16434	Alternate characterization...
nn0oddm1d2 16435	A positive integer is odd ...
nnoddm1d2 16436	A positive integer is odd ...
sumeven 16437	If every term in a sum is ...
sumodd 16438	If every term in a sum is ...
evensumodd 16439	If every term in a sum wit...
oddsumodd 16440	If every term in a sum wit...
pwp1fsum 16441	The n-th power of a number...
oddpwp1fsum 16442	An odd power of a number i...
divalglem0 16443	Lemma for ~ divalg . (Con...
divalglem1 16444	Lemma for ~ divalg . (Con...
divalglem2 16445	Lemma for ~ divalg . (Con...
divalglem4 16446	Lemma for ~ divalg . (Con...
divalglem5 16447	Lemma for ~ divalg . (Con...
divalglem6 16448	Lemma for ~ divalg . (Con...
divalglem7 16449	Lemma for ~ divalg . (Con...
divalglem8 16450	Lemma for ~ divalg . (Con...
divalglem9 16451	Lemma for ~ divalg . (Con...
divalglem10 16452	Lemma for ~ divalg . (Con...
divalg 16453	The division algorithm (th...
divalgb 16454	Express the division algor...
divalg2 16455	The division algorithm (th...
divalgmod 16456	The result of the ` mod ` ...
divalgmodcl 16457	The result of the ` mod ` ...
modremain 16458	The result of the modulo o...
ndvdssub 16459	Corollary of the division ...
ndvdsadd 16460	Corollary of the division ...
ndvdsp1 16461	Special case of ~ ndvdsadd...
ndvdsi 16462	A quick test for non-divis...
flodddiv4 16463	The floor of an odd intege...
fldivndvdslt 16464	The floor of an integer di...
flodddiv4lt 16465	The floor of an odd number...
flodddiv4t2lthalf 16466	The floor of an odd number...
bitsfval 16471	Expand the definition of t...
bitsval 16472	Expand the definition of t...
bitsval2 16473	Expand the definition of t...
bitsss 16474	The set of bits of an inte...
bitsf 16475	The ` bits ` function is a...
bits0 16476	Value of the zeroth bit. ...
bits0e 16477	The zeroth bit of an even ...
bits0o 16478	The zeroth bit of an odd n...
bitsp1 16479	The ` M + 1 ` -th bit of `...
bitsp1e 16480	The ` M + 1 ` -th bit of `...
bitsp1o 16481	The ` M + 1 ` -th bit of `...
bitsfzolem 16482	Lemma for ~ bitsfzo . (Co...
bitsfzo 16483	The bits of a number are a...
bitsmod 16484	Truncating the bit sequenc...
bitsfi 16485	Every number is associated...
bitscmp 16486	The bit complement of ` N ...
0bits 16487	The bits of zero. (Contri...
m1bits 16488	The bits of negative one. ...
bitsinv1lem 16489	Lemma for ~ bitsinv1 . (C...
bitsinv1 16490	There is an explicit inver...
bitsinv2 16491	There is an explicit inver...
bitsf1ocnv 16492	The ` bits ` function rest...
bitsf1o 16493	The ` bits ` function rest...
bitsf1 16494	The ` bits ` function is a...
2ebits 16495	The bits of a power of two...
bitsinv 16496	The inverse of the ` bits ...
bitsinvp1 16497	Recursive definition of th...
sadadd2lem2 16498	The core of the proof of ~...
sadfval 16500	Define the addition of two...
sadcf 16501	The carry sequence is a se...
sadc0 16502	The initial element of the...
sadcp1 16503	The carry sequence (which ...
sadval 16504	The full adder sequence is...
sadcaddlem 16505	Lemma for ~ sadcadd . (Co...
sadcadd 16506	Non-recursive definition o...
sadadd2lem 16507	Lemma for ~ sadadd2 . (Co...
sadadd2 16508	Sum of initial segments of...
sadadd3 16509	Sum of initial segments of...
sadcl 16510	The sum of two sequences i...
sadcom 16511	The adder sequence functio...
saddisjlem 16512	Lemma for ~ sadadd . (Con...
saddisj 16513	The sum of disjoint sequen...
sadaddlem 16514	Lemma for ~ sadadd . (Con...
sadadd 16515	For sequences that corresp...
sadid1 16516	The adder sequence functio...
sadid2 16517	The adder sequence functio...
sadasslem 16518	Lemma for ~ sadass . (Con...
sadass 16519	Sequence addition is assoc...
sadeq 16520	Any element of a sequence ...
bitsres 16521	Restrict the bits of a num...
bitsuz 16522	The bits of a number are a...
bitsshft 16523	Shifting a bit sequence to...
smufval 16525	The multiplication of two ...
smupf 16526	The sequence of partial su...
smup0 16527	The initial element of the...
smupp1 16528	The initial element of the...
smuval 16529	Define the addition of two...
smuval2 16530	The partial sum sequence s...
smupvallem 16531	If ` A ` only has elements...
smucl 16532	The product of two sequenc...
smu01lem 16533	Lemma for ~ smu01 and ~ sm...
smu01 16534	Multiplication of a sequen...
smu02 16535	Multiplication of a sequen...
smupval 16536	Rewrite the elements of th...
smup1 16537	Rewrite ~ smupp1 using onl...
smueqlem 16538	Any element of a sequence ...
smueq 16539	Any element of a sequence ...
smumullem 16540	Lemma for ~ smumul . (Con...
smumul 16541	For sequences that corresp...
gcdval 16544	The value of the ` gcd ` o...
gcd0val 16545	The value, by convention, ...
gcdn0val 16546	The value of the ` gcd ` o...
gcdcllem1 16547	Lemma for ~ gcdn0cl , ~ gc...
gcdcllem2 16548	Lemma for ~ gcdn0cl , ~ gc...
gcdcllem3 16549	Lemma for ~ gcdn0cl , ~ gc...
gcdn0cl 16550	Closure of the ` gcd ` ope...
gcddvds 16551	The gcd of two integers di...
dvdslegcd 16552	An integer which divides b...
nndvdslegcd 16553	A positive integer which d...
gcdcl 16554	Closure of the ` gcd ` ope...
gcdnncl 16555	Closure of the ` gcd ` ope...
gcdcld 16556	Closure of the ` gcd ` ope...
gcd2n0cl 16557	Closure of the ` gcd ` ope...
zeqzmulgcd 16558	An integer is the product ...
divgcdz 16559	An integer divided by the ...
gcdf 16560	Domain and codomain of the...
gcdcom 16561	The ` gcd ` operator is co...
gcdcomd 16562	The ` gcd ` operator is co...
divgcdnn 16563	A positive integer divided...
divgcdnnr 16564	A positive integer divided...
gcdeq0 16565	The gcd of two integers is...
gcdn0gt0 16566	The gcd of two integers is...
gcd0id 16567	The gcd of 0 and an intege...
gcdid0 16568	The gcd of an integer and ...
nn0gcdid0 16569	The gcd of a nonnegative i...
gcdneg 16570	Negating one operand of th...
neggcd 16571	Negating one operand of th...
gcdaddmlem 16572	Lemma for ~ gcdaddm . (Co...
gcdaddm 16573	Adding a multiple of one o...
gcdadd 16574	The GCD of two numbers is ...
gcdid 16575	The gcd of a number and it...
gcd1 16576	The gcd of a number with 1...
gcdabs1 16577	` gcd ` of the absolute va...
gcdabs2 16578	` gcd ` of the absolute va...
gcdabs 16579	The gcd of two integers is...
gcdabsOLD 16580	Obsolete version of ~ gcda...
modgcd 16581	The gcd remains unchanged ...
1gcd 16582	The GCD of one and an inte...
gcdmultipled 16583	The greatest common diviso...
gcdmultiplez 16584	The GCD of a multiple of a...
gcdmultiple 16585	The GCD of a multiple of a...
dvdsgcdidd 16586	The greatest common diviso...
6gcd4e2 16587	The greatest common diviso...
bezoutlem1 16588	Lemma for ~ bezout . (Con...
bezoutlem2 16589	Lemma for ~ bezout . (Con...
bezoutlem3 16590	Lemma for ~ bezout . (Con...
bezoutlem4 16591	Lemma for ~ bezout . (Con...
bezout 16592	Bézout's identity: ...
dvdsgcd 16593	An integer which divides e...
dvdsgcdb 16594	Biconditional form of ~ dv...
dfgcd2 16595	Alternate definition of th...
gcdass 16596	Associative law for ` gcd ...
mulgcd 16597	Distribute multiplication ...
absmulgcd 16598	Distribute absolute value ...
mulgcdr 16599	Reverse distribution law f...
gcddiv 16600	Division law for GCD. (Con...
gcdzeq 16601	A positive integer ` A ` i...
gcdeq 16602	` A ` is equal to its gcd ...
dvdssqim 16603	Unidirectional form of ~ d...
dvdsexpim 16604	If two numbers are divisib...
dvdsmulgcd 16605	A divisibility equivalent ...
rpmulgcd 16606	If ` K ` and ` M ` are rel...
rplpwr 16607	If ` A ` and ` B ` are rel...
rprpwr 16608	If ` A ` and ` B ` are rel...
rppwr 16609	If ` A ` and ` B ` are rel...
nn0rppwr 16610	If ` A ` and ` B ` are rel...
sqgcd 16611	Square distributes over gc...
expgcd 16612	Exponentiation distributes...
nn0expgcd 16613	Exponentiation distributes...
zexpgcd 16614	Exponentiation distributes...
dvdssqlem 16615	Lemma for ~ dvdssq . (Con...
dvdssq 16616	Two numbers are divisible ...
bezoutr 16617	Partial converse to ~ bezo...
bezoutr1 16618	Converse of ~ bezout for w...
nn0seqcvgd 16619	A strictly-decreasing nonn...
seq1st 16620	A sequence whose iteration...
algr0 16621	The value of the algorithm...
algrf 16622	An algorithm is a step fun...
algrp1 16623	The value of the algorithm...
alginv 16624	If ` I ` is an invariant o...
algcvg 16625	One way to prove that an a...
algcvgblem 16626	Lemma for ~ algcvgb . (Co...
algcvgb 16627	Two ways of expressing tha...
algcvga 16628	The countdown function ` C...
algfx 16629	If ` F ` reaches a fixed p...
eucalgval2 16630	The value of the step func...
eucalgval 16631	Euclid's Algorithm ~ eucal...
eucalgf 16632	Domain and codomain of the...
eucalginv 16633	The invariant of the step ...
eucalglt 16634	The second member of the s...
eucalgcvga 16635	Once Euclid's Algorithm ha...
eucalg 16636	Euclid's Algorithm compute...
lcmval 16641	Value of the ` lcm ` opera...
lcmcom 16642	The ` lcm ` operator is co...
lcm0val 16643	The value, by convention, ...
lcmn0val 16644	The value of the ` lcm ` o...
lcmcllem 16645	Lemma for ~ lcmn0cl and ~ ...
lcmn0cl 16646	Closure of the ` lcm ` ope...
dvdslcm 16647	The lcm of two integers is...
lcmledvds 16648	A positive integer which b...
lcmeq0 16649	The lcm of two integers is...
lcmcl 16650	Closure of the ` lcm ` ope...
gcddvdslcm 16651	The greatest common diviso...
lcmneg 16652	Negating one operand of th...
neglcm 16653	Negating one operand of th...
lcmabs 16654	The lcm of two integers is...
lcmgcdlem 16655	Lemma for ~ lcmgcd and ~ l...
lcmgcd 16656	The product of two numbers...
lcmdvds 16657	The lcm of two integers di...
lcmid 16658	The lcm of an integer and ...
lcm1 16659	The lcm of an integer and ...
lcmgcdnn 16660	The product of two positiv...
lcmgcdeq 16661	Two integers' absolute val...
lcmdvdsb 16662	Biconditional form of ~ lc...
lcmass 16663	Associative law for ` lcm ...
3lcm2e6woprm 16664	The least common multiple ...
6lcm4e12 16665	The least common multiple ...
absproddvds 16666	The absolute value of the ...
absprodnn 16667	The absolute value of the ...
fissn0dvds 16668	For each finite subset of ...
fissn0dvdsn0 16669	For each finite subset of ...
lcmfval 16670	Value of the ` _lcm ` func...
lcmf0val 16671	The value, by convention, ...
lcmfn0val 16672	The value of the ` _lcm ` ...
lcmfnnval 16673	The value of the ` _lcm ` ...
lcmfcllem 16674	Lemma for ~ lcmfn0cl and ~...
lcmfn0cl 16675	Closure of the ` _lcm ` fu...
lcmfpr 16676	The value of the ` _lcm ` ...
lcmfcl 16677	Closure of the ` _lcm ` fu...
lcmfnncl 16678	Closure of the ` _lcm ` fu...
lcmfeq0b 16679	The least common multiple ...
dvdslcmf 16680	The least common multiple ...
lcmfledvds 16681	A positive integer which i...
lcmf 16682	Characterization of the le...
lcmf0 16683	The least common multiple ...
lcmfsn 16684	The least common multiple ...
lcmftp 16685	The least common multiple ...
lcmfunsnlem1 16686	Lemma for ~ lcmfdvds and ~...
lcmfunsnlem2lem1 16687	Lemma 1 for ~ lcmfunsnlem2...
lcmfunsnlem2lem2 16688	Lemma 2 for ~ lcmfunsnlem2...
lcmfunsnlem2 16689	Lemma for ~ lcmfunsn and ~...
lcmfunsnlem 16690	Lemma for ~ lcmfdvds and ~...
lcmfdvds 16691	The least common multiple ...
lcmfdvdsb 16692	Biconditional form of ~ lc...
lcmfunsn 16693	The ` _lcm ` function for ...
lcmfun 16694	The ` _lcm ` function for ...
lcmfass 16695	Associative law for the ` ...
lcmf2a3a4e12 16696	The least common multiple ...
lcmflefac 16697	The least common multiple ...
coprmgcdb 16698	Two positive integers are ...
ncoprmgcdne1b 16699	Two positive integers are ...
ncoprmgcdgt1b 16700	Two positive integers are ...
coprmdvds1 16701	If two positive integers a...
coprmdvds 16702	Euclid's Lemma (see ProofW...
coprmdvds2 16703	If an integer is divisible...
mulgcddvds 16704	One half of ~ rpmulgcd2 , ...
rpmulgcd2 16705	If ` M ` is relatively pri...
qredeq 16706	Two equal reduced fraction...
qredeu 16707	Every rational number has ...
rpmul 16708	If ` K ` is relatively pri...
rpdvds 16709	If ` K ` is relatively pri...
coprmprod 16710	The product of the element...
coprmproddvdslem 16711	Lemma for ~ coprmproddvds ...
coprmproddvds 16712	If a positive integer is d...
congr 16713	Definition of congruence b...
divgcdcoprm0 16714	Integers divided by gcd ar...
divgcdcoprmex 16715	Integers divided by gcd ar...
cncongr1 16716	One direction of the bicon...
cncongr2 16717	The other direction of the...
cncongr 16718	Cancellability of Congruen...
cncongrcoprm 16719	Corollary 1 of Cancellabil...
isprm 16722	The predicate "is a prime ...
prmnn 16723	A prime number is a positi...
prmz 16724	A prime number is an integ...
prmssnn 16725	The prime numbers are a su...
prmex 16726	The set of prime numbers e...
0nprm 16727	0 is not a prime number. ...
1nprm 16728	1 is not a prime number. ...
1idssfct 16729	The positive divisors of a...
isprm2lem 16730	Lemma for ~ isprm2 . (Con...
isprm2 16731	The predicate "is a prime ...
isprm3 16732	The predicate "is a prime ...
isprm4 16733	The predicate "is a prime ...
prmind2 16734	A variation on ~ prmind as...
prmind 16735	Perform induction over the...
dvdsprime 16736	If ` M ` divides a prime, ...
nprm 16737	A product of two integers ...
nprmi 16738	An inference for composite...
dvdsnprmd 16739	If a number is divisible b...
prm2orodd 16740	A prime number is either 2...
2prm 16741	2 is a prime number. (Con...
2mulprm 16742	A multiple of two is prime...
3prm 16743	3 is a prime number. (Con...
4nprm 16744	4 is not a prime number. ...
prmuz2 16745	A prime number is an integ...
prmgt1 16746	A prime number is an integ...
prmm2nn0 16747	Subtracting 2 from a prime...
oddprmgt2 16748	An odd prime is greater th...
oddprmge3 16749	An odd prime is greater th...
ge2nprmge4 16750	A composite integer greate...
sqnprm 16751	A square is never prime. ...
dvdsprm 16752	An integer greater than or...
exprmfct 16753	Every integer greater than...
prmdvdsfz 16754	Each integer greater than ...
nprmdvds1 16755	No prime number divides 1....
isprm5 16756	One need only check prime ...
isprm7 16757	One need only check prime ...
maxprmfct 16758	The set of prime factors o...
divgcdodd 16759	Either ` A / ( A gcd B ) `...
coprm 16760	A prime number either divi...
prmrp 16761	Unequal prime numbers are ...
euclemma 16762	Euclid's lemma. A prime n...
isprm6 16763	A number is prime iff it s...
prmdvdsexp 16764	A prime divides a positive...
prmdvdsexpb 16765	A prime divides a positive...
prmdvdsexpr 16766	If a prime divides a nonne...
prmdvdssq 16767	Condition for a prime divi...
prmexpb 16768	Two positive prime powers ...
prmfac1 16769	The factorial of a number ...
dvdszzq 16770	Divisibility for an intege...
rpexp 16771	If two numbers ` A ` and `...
rpexp1i 16772	Relative primality passes ...
rpexp12i 16773	Relative primality passes ...
prmndvdsfaclt 16774	A prime number does not di...
prmdvdsbc 16775	Condition for a prime numb...
prmdvdsncoprmbd 16776	Two positive integers are ...
ncoprmlnprm 16777	If two positive integers a...
cncongrprm 16778	Corollary 2 of Cancellabil...
isevengcd2 16779	The predicate "is an even ...
isoddgcd1 16780	The predicate "is an odd n...
3lcm2e6 16781	The least common multiple ...
qnumval 16786	Value of the canonical num...
qdenval 16787	Value of the canonical den...
qnumdencl 16788	Lemma for ~ qnumcl and ~ q...
qnumcl 16789	The canonical numerator of...
qdencl 16790	The canonical denominator ...
fnum 16791	Canonical numerator define...
fden 16792	Canonical denominator defi...
qnumdenbi 16793	Two numbers are the canoni...
qnumdencoprm 16794	The canonical representati...
qeqnumdivden 16795	Recover a rational number ...
qmuldeneqnum 16796	Multiplying a rational by ...
divnumden 16797	Calculate the reduced form...
divdenle 16798	Reducing a quotient never ...
qnumgt0 16799	A rational is positive iff...
qgt0numnn 16800	A rational is positive iff...
nn0gcdsq 16801	Squaring commutes with GCD...
zgcdsq 16802	~ nn0gcdsq extended to int...
numdensq 16803	Squaring a rational square...
numsq 16804	Square commutes with canon...
densq 16805	Square commutes with canon...
qden1elz 16806	A rational is an integer i...
zsqrtelqelz 16807	If an integer has a ration...
nonsq 16808	Any integer strictly betwe...
numdenexp 16809	Elevating a rational numbe...
numexp 16810	Elevating to a nonnegative...
denexp 16811	Elevating to a nonnegative...
phival 16816	Value of the Euler ` phi `...
phicl2 16817	Bounds and closure for the...
phicl 16818	Closure for the value of t...
phibndlem 16819	Lemma for ~ phibnd . (Con...
phibnd 16820	A slightly tighter bound o...
phicld 16821	Closure for the value of t...
phi1 16822	Value of the Euler ` phi `...
dfphi2 16823	Alternate definition of th...
hashdvds 16824	The number of numbers in a...
phiprmpw 16825	Value of the Euler ` phi `...
phiprm 16826	Value of the Euler ` phi `...
crth 16827	The Chinese Remainder Theo...
phimullem 16828	Lemma for ~ phimul . (Con...
phimul 16829	The Euler ` phi ` function...
eulerthlem1 16830	Lemma for ~ eulerth . (Co...
eulerthlem2 16831	Lemma for ~ eulerth . (Co...
eulerth 16832	Euler's theorem, a general...
fermltl 16833	Fermat's little theorem. ...
prmdiv 16834	Show an explicit expressio...
prmdiveq 16835	The modular inverse of ` A...
prmdivdiv 16836	The (modular) inverse of t...
hashgcdlem 16837	A correspondence between e...
hashgcdeq 16838	Number of initial positive...
phisum 16839	The divisor sum identity o...
odzval 16840	Value of the order functio...
odzcllem 16841	- Lemma for ~ odzcl , show...
odzcl 16842	The order of a group eleme...
odzid 16843	Any element raised to the ...
odzdvds 16844	The only powers of ` A ` t...
odzphi 16845	The order of any group ele...
modprm1div 16846	A prime number divides an ...
m1dvdsndvds 16847	If an integer minus 1 is d...
modprminv 16848	Show an explicit expressio...
modprminveq 16849	The modular inverse of ` A...
vfermltl 16850	Variant of Fermat's little...
vfermltlALT 16851	Alternate proof of ~ vferm...
powm2modprm 16852	If an integer minus 1 is d...
reumodprminv 16853	For any prime number and f...
modprm0 16854	For two positive integers ...
nnnn0modprm0 16855	For a positive integer and...
modprmn0modprm0 16856	For an integer not being 0...
coprimeprodsq 16857	If three numbers are copri...
coprimeprodsq2 16858	If three numbers are copri...
oddprm 16859	A prime not equal to ` 2 `...
nnoddn2prm 16860	A prime not equal to ` 2 `...
oddn2prm 16861	A prime not equal to ` 2 `...
nnoddn2prmb 16862	A number is a prime number...
prm23lt5 16863	A prime less than 5 is eit...
prm23ge5 16864	A prime is either 2 or 3 o...
pythagtriplem1 16865	Lemma for ~ pythagtrip . ...
pythagtriplem2 16866	Lemma for ~ pythagtrip . ...
pythagtriplem3 16867	Lemma for ~ pythagtrip . ...
pythagtriplem4 16868	Lemma for ~ pythagtrip . ...
pythagtriplem10 16869	Lemma for ~ pythagtrip . ...
pythagtriplem6 16870	Lemma for ~ pythagtrip . ...
pythagtriplem7 16871	Lemma for ~ pythagtrip . ...
pythagtriplem8 16872	Lemma for ~ pythagtrip . ...
pythagtriplem9 16873	Lemma for ~ pythagtrip . ...
pythagtriplem11 16874	Lemma for ~ pythagtrip . ...
pythagtriplem12 16875	Lemma for ~ pythagtrip . ...
pythagtriplem13 16876	Lemma for ~ pythagtrip . ...
pythagtriplem14 16877	Lemma for ~ pythagtrip . ...
pythagtriplem15 16878	Lemma for ~ pythagtrip . ...
pythagtriplem16 16879	Lemma for ~ pythagtrip . ...
pythagtriplem17 16880	Lemma for ~ pythagtrip . ...
pythagtriplem18 16881	Lemma for ~ pythagtrip . ...
pythagtriplem19 16882	Lemma for ~ pythagtrip . ...
pythagtrip 16883	Parameterize the Pythagore...
iserodd 16884	Collect the odd terms in a...
pclem 16887	- Lemma for the prime powe...
pcprecl 16888	Closure of the prime power...
pcprendvds 16889	Non-divisibility property ...
pcprendvds2 16890	Non-divisibility property ...
pcpre1 16891	Value of the prime power p...
pcpremul 16892	Multiplicative property of...
pcval 16893	The value of the prime pow...
pceulem 16894	Lemma for ~ pceu . (Contr...
pceu 16895	Uniqueness for the prime p...
pczpre 16896	Connect the prime count pr...
pczcl 16897	Closure of the prime power...
pccl 16898	Closure of the prime power...
pccld 16899	Closure of the prime power...
pcmul 16900	Multiplication property of...
pcdiv 16901	Division property of the p...
pcqmul 16902	Multiplication property of...
pc0 16903	The value of the prime pow...
pc1 16904	Value of the prime count f...
pcqcl 16905	Closure of the general pri...
pcqdiv 16906	Division property of the p...
pcrec 16907	Prime power of a reciproca...
pcexp 16908	Prime power of an exponent...
pcxnn0cl 16909	Extended nonnegative integ...
pcxcl 16910	Extended real closure of t...
pcge0 16911	The prime count of an inte...
pczdvds 16912	Defining property of the p...
pcdvds 16913	Defining property of the p...
pczndvds 16914	Defining property of the p...
pcndvds 16915	Defining property of the p...
pczndvds2 16916	The remainder after dividi...
pcndvds2 16917	The remainder after dividi...
pcdvdsb 16918	` P ^ A ` divides ` N ` if...
pcelnn 16919	There are a positive numbe...
pceq0 16920	There are zero powers of a...
pcidlem 16921	The prime count of a prime...
pcid 16922	The prime count of a prime...
pcneg 16923	The prime count of a negat...
pcabs 16924	The prime count of an abso...
pcdvdstr 16925	The prime count increases ...
pcgcd1 16926	The prime count of a GCD i...
pcgcd 16927	The prime count of a GCD i...
pc2dvds 16928	A characterization of divi...
pc11 16929	The prime count function, ...
pcz 16930	The prime count function c...
pcprmpw2 16931	Self-referential expressio...
pcprmpw 16932	Self-referential expressio...
dvdsprmpweq 16933	If a positive integer divi...
dvdsprmpweqnn 16934	If an integer greater than...
dvdsprmpweqle 16935	If a positive integer divi...
difsqpwdvds 16936	If the difference of two s...
pcaddlem 16937	Lemma for ~ pcadd . The o...
pcadd 16938	An inequality for the prim...
pcadd2 16939	The inequality of ~ pcadd ...
pcmptcl 16940	Closure for the prime powe...
pcmpt 16941	Construct a function with ...
pcmpt2 16942	Dividing two prime count m...
pcmptdvds 16943	The partial products of th...
pcprod 16944	The product of the primes ...
sumhash 16945	The sum of 1 over a set is...
fldivp1 16946	The difference between the...
pcfaclem 16947	Lemma for ~ pcfac . (Cont...
pcfac 16948	Calculate the prime count ...
pcbc 16949	Calculate the prime count ...
qexpz 16950	If a power of a rational n...
expnprm 16951	A second or higher power o...
oddprmdvds 16952	Every positive integer whi...
prmpwdvds 16953	A relation involving divis...
pockthlem 16954	Lemma for ~ pockthg . (Co...
pockthg 16955	The generalized Pocklingto...
pockthi 16956	Pocklington's theorem, whi...
unbenlem 16957	Lemma for ~ unben . (Cont...
unben 16958	An unbounded set of positi...
infpnlem1 16959	Lemma for ~ infpn . The s...
infpnlem2 16960	Lemma for ~ infpn . For a...
infpn 16961	There exist infinitely man...
infpn2 16962	There exist infinitely man...
prmunb 16963	The primes are unbounded. ...
prminf 16964	There are an infinite numb...
prmreclem1 16965	Lemma for ~ prmrec . Prop...
prmreclem2 16966	Lemma for ~ prmrec . Ther...
prmreclem3 16967	Lemma for ~ prmrec . The ...
prmreclem4 16968	Lemma for ~ prmrec . Show...
prmreclem5 16969	Lemma for ~ prmrec . Here...
prmreclem6 16970	Lemma for ~ prmrec . If t...
prmrec 16971	The sum of the reciprocals...
1arithlem1 16972	Lemma for ~ 1arith . (Con...
1arithlem2 16973	Lemma for ~ 1arith . (Con...
1arithlem3 16974	Lemma for ~ 1arith . (Con...
1arithlem4 16975	Lemma for ~ 1arith . (Con...
1arith 16976	Fundamental theorem of ari...
1arith2 16977	Fundamental theorem of ari...
elgz 16980	Elementhood in the gaussia...
gzcn 16981	A gaussian integer is a co...
zgz 16982	An integer is a gaussian i...
igz 16983	` _i ` is a gaussian integ...
gznegcl 16984	The gaussian integers are ...
gzcjcl 16985	The gaussian integers are ...
gzaddcl 16986	The gaussian integers are ...
gzmulcl 16987	The gaussian integers are ...
gzreim 16988	Construct a gaussian integ...
gzsubcl 16989	The gaussian integers are ...
gzabssqcl 16990	The squared norm of a gaus...
4sqlem5 16991	Lemma for ~ 4sq . (Contri...
4sqlem6 16992	Lemma for ~ 4sq . (Contri...
4sqlem7 16993	Lemma for ~ 4sq . (Contri...
4sqlem8 16994	Lemma for ~ 4sq . (Contri...
4sqlem9 16995	Lemma for ~ 4sq . (Contri...
4sqlem10 16996	Lemma for ~ 4sq . (Contri...
4sqlem1 16997	Lemma for ~ 4sq . The set...
4sqlem2 16998	Lemma for ~ 4sq . Change ...
4sqlem3 16999	Lemma for ~ 4sq . Suffici...
4sqlem4a 17000	Lemma for ~ 4sqlem4 . (Co...
4sqlem4 17001	Lemma for ~ 4sq . We can ...
mul4sqlem 17002	Lemma for ~ mul4sq : algeb...
mul4sq 17003	Euler's four-square identi...
4sqlem11 17004	Lemma for ~ 4sq . Use the...
4sqlem12 17005	Lemma for ~ 4sq . For any...
4sqlem13 17006	Lemma for ~ 4sq . (Contri...
4sqlem14 17007	Lemma for ~ 4sq . (Contri...
4sqlem15 17008	Lemma for ~ 4sq . (Contri...
4sqlem16 17009	Lemma for ~ 4sq . (Contri...
4sqlem17 17010	Lemma for ~ 4sq . (Contri...
4sqlem18 17011	Lemma for ~ 4sq . Inducti...
4sqlem19 17012	Lemma for ~ 4sq . The pro...
4sq 17013	Lagrange's four-square the...
vdwapfval 17020	Define the arithmetic prog...
vdwapf 17021	The arithmetic progression...
vdwapval 17022	Value of the arithmetic pr...
vdwapun 17023	Remove the first element o...
vdwapid1 17024	The first element of an ar...
vdwap0 17025	Value of a length-1 arithm...
vdwap1 17026	Value of a length-1 arithm...
vdwmc 17027	The predicate " The ` <. R...
vdwmc2 17028	Expand out the definition ...
vdwpc 17029	The predicate " The colori...
vdwlem1 17030	Lemma for ~ vdw . (Contri...
vdwlem2 17031	Lemma for ~ vdw . (Contri...
vdwlem3 17032	Lemma for ~ vdw . (Contri...
vdwlem4 17033	Lemma for ~ vdw . (Contri...
vdwlem5 17034	Lemma for ~ vdw . (Contri...
vdwlem6 17035	Lemma for ~ vdw . (Contri...
vdwlem7 17036	Lemma for ~ vdw . (Contri...
vdwlem8 17037	Lemma for ~ vdw . (Contri...
vdwlem9 17038	Lemma for ~ vdw . (Contri...
vdwlem10 17039	Lemma for ~ vdw . Set up ...
vdwlem11 17040	Lemma for ~ vdw . (Contri...
vdwlem12 17041	Lemma for ~ vdw . ` K = 2 ...
vdwlem13 17042	Lemma for ~ vdw . Main in...
vdw 17043	Van der Waerden's theorem....
vdwnnlem1 17044	Corollary of ~ vdw , and l...
vdwnnlem2 17045	Lemma for ~ vdwnn . The s...
vdwnnlem3 17046	Lemma for ~ vdwnn . (Cont...
vdwnn 17047	Van der Waerden's theorem,...
ramtlecl 17049	The set ` T ` of numbers w...
hashbcval 17051	Value of the "binomial set...
hashbccl 17052	The binomial set is a fini...
hashbcss 17053	Subset relation for the bi...
hashbc0 17054	The set of subsets of size...
hashbc2 17055	The size of the binomial s...
0hashbc 17056	There are no subsets of th...
ramval 17057	The value of the Ramsey nu...
ramcl2lem 17058	Lemma for extended real cl...
ramtcl 17059	The Ramsey number has the ...
ramtcl2 17060	The Ramsey number is an in...
ramtub 17061	The Ramsey number is a low...
ramub 17062	The Ramsey number is a low...
ramub2 17063	It is sufficient to check ...
rami 17064	The defining property of a...
ramcl2 17065	The Ramsey number is eithe...
ramxrcl 17066	The Ramsey number is an ex...
ramubcl 17067	If the Ramsey number is up...
ramlb 17068	Establish a lower bound on...
0ram 17069	The Ramsey number when ` M...
0ram2 17070	The Ramsey number when ` M...
ram0 17071	The Ramsey number when ` R...
0ramcl 17072	Lemma for ~ ramcl : Exist...
ramz2 17073	The Ramsey number when ` F...
ramz 17074	The Ramsey number when ` F...
ramub1lem1 17075	Lemma for ~ ramub1 . (Con...
ramub1lem2 17076	Lemma for ~ ramub1 . (Con...
ramub1 17077	Inductive step for Ramsey'...
ramcl 17078	Ramsey's theorem: the Rams...
ramsey 17079	Ramsey's theorem with the ...
prmoval 17082	Value of the primorial fun...
prmocl 17083	Closure of the primorial f...
prmone0 17084	The primorial function is ...
prmo0 17085	The primorial of 0. (Cont...
prmo1 17086	The primorial of 1. (Cont...
prmop1 17087	The primorial of a success...
prmonn2 17088	Value of the primorial fun...
prmo2 17089	The primorial of 2. (Cont...
prmo3 17090	The primorial of 3. (Cont...
prmdvdsprmo 17091	The primorial of a number ...
prmdvdsprmop 17092	The primorial of a number ...
fvprmselelfz 17093	The value of the prime sel...
fvprmselgcd1 17094	The greatest common diviso...
prmolefac 17095	The primorial of a positiv...
prmodvdslcmf 17096	The primorial of a nonnega...
prmolelcmf 17097	The primorial of a positiv...
prmgaplem1 17098	Lemma for ~ prmgap : The ...
prmgaplem2 17099	Lemma for ~ prmgap : The ...
prmgaplcmlem1 17100	Lemma for ~ prmgaplcm : T...
prmgaplcmlem2 17101	Lemma for ~ prmgaplcm : T...
prmgaplem3 17102	Lemma for ~ prmgap . (Con...
prmgaplem4 17103	Lemma for ~ prmgap . (Con...
prmgaplem5 17104	Lemma for ~ prmgap : for e...
prmgaplem6 17105	Lemma for ~ prmgap : for e...
prmgaplem7 17106	Lemma for ~ prmgap . (Con...
prmgaplem8 17107	Lemma for ~ prmgap . (Con...
prmgap 17108	The prime gap theorem: for...
prmgaplcm 17109	Alternate proof of ~ prmga...
prmgapprmolem 17110	Lemma for ~ prmgapprmo : ...
prmgapprmo 17111	Alternate proof of ~ prmga...
dec2dvds 17112	Divisibility by two is obv...
dec5dvds 17113	Divisibility by five is ob...
dec5dvds2 17114	Divisibility by five is ob...
dec5nprm 17115	Divisibility by five is ob...
dec2nprm 17116	Divisibility by two is obv...
modxai 17117	Add exponents in a power m...
mod2xi 17118	Double exponents in a powe...
modxp1i 17119	Add one to an exponent in ...
mod2xnegi 17120	Version of ~ mod2xi with a...
modsubi 17121	Subtract from within a mod...
gcdi 17122	Calculate a GCD via Euclid...
gcdmodi 17123	Calculate a GCD via Euclid...
decexp2 17124	Calculate a power of two. ...
numexp0 17125	Calculate an integer power...
numexp1 17126	Calculate an integer power...
numexpp1 17127	Calculate an integer power...
numexp2x 17128	Double an integer power. ...
decsplit0b 17129	Split a decimal number int...
decsplit0 17130	Split a decimal number int...
decsplit1 17131	Split a decimal number int...
decsplit 17132	Split a decimal number int...
karatsuba 17133	The Karatsuba multiplicati...
2exp4 17134	Two to the fourth power is...
2exp5 17135	Two to the fifth power is ...
2exp6 17136	Two to the sixth power is ...
2exp7 17137	Two to the seventh power i...
2exp8 17138	Two to the eighth power is...
2exp11 17139	Two to the eleventh power ...
2exp16 17140	Two to the sixteenth power...
3exp3 17141	Three to the third power i...
2expltfac 17142	The factorial grows faster...
cshwsidrepsw 17143	If cyclically shifting a w...
cshwsidrepswmod0 17144	If cyclically shifting a w...
cshwshashlem1 17145	If cyclically shifting a w...
cshwshashlem2 17146	If cyclically shifting a w...
cshwshashlem3 17147	If cyclically shifting a w...
cshwsdisj 17148	The singletons resulting b...
cshwsiun 17149	The set of (different!) wo...
cshwsex 17150	The class of (different!) ...
cshws0 17151	The size of the set of (di...
cshwrepswhash1 17152	The size of the set of (di...
cshwshashnsame 17153	If a word (not consisting ...
cshwshash 17154	If a word has a length bei...
prmlem0 17155	Lemma for ~ prmlem1 and ~ ...
prmlem1a 17156	A quick proof skeleton to ...
prmlem1 17157	A quick proof skeleton to ...
5prm 17158	5 is a prime number. (Con...
6nprm 17159	6 is not a prime number. ...
7prm 17160	7 is a prime number. (Con...
8nprm 17161	8 is not a prime number. ...
9nprm 17162	9 is not a prime number. ...
10nprm 17163	10 is not a prime number. ...
11prm 17164	11 is a prime number. (Co...
13prm 17165	13 is a prime number. (Co...
17prm 17166	17 is a prime number. (Co...
19prm 17167	19 is a prime number. (Co...
23prm 17168	23 is a prime number. (Co...
prmlem2 17169	Our last proving session g...
37prm 17170	37 is a prime number. (Co...
43prm 17171	43 is a prime number. (Co...
83prm 17172	83 is a prime number. (Co...
139prm 17173	139 is a prime number. (C...
163prm 17174	163 is a prime number. (C...
317prm 17175	317 is a prime number. (C...
631prm 17176	631 is a prime number. (C...
prmo4 17177	The primorial of 4. (Cont...
prmo5 17178	The primorial of 5. (Cont...
prmo6 17179	The primorial of 6. (Cont...
1259lem1 17180	Lemma for ~ 1259prm . Cal...
1259lem2 17181	Lemma for ~ 1259prm . Cal...
1259lem3 17182	Lemma for ~ 1259prm . Cal...
1259lem4 17183	Lemma for ~ 1259prm . Cal...
1259lem5 17184	Lemma for ~ 1259prm . Cal...
1259prm 17185	1259 is a prime number. (...
2503lem1 17186	Lemma for ~ 2503prm . Cal...
2503lem2 17187	Lemma for ~ 2503prm . Cal...
2503lem3 17188	Lemma for ~ 2503prm . Cal...
2503prm 17189	2503 is a prime number. (...
4001lem1 17190	Lemma for ~ 4001prm . Cal...
4001lem2 17191	Lemma for ~ 4001prm . Cal...
4001lem3 17192	Lemma for ~ 4001prm . Cal...
4001lem4 17193	Lemma for ~ 4001prm . Cal...
4001prm 17194	4001 is a prime number. (...
brstruct 17197	The structure relation is ...
isstruct2 17198	The property of being a st...
structex 17199	A structure is a set. (Co...
structn0fun 17200	A structure without the em...
isstruct 17201	The property of being a st...
structcnvcnv 17202	Two ways to express the re...
structfung 17203	The converse of the conver...
structfun 17204	Convert between two kinds ...
structfn 17205	Convert between two kinds ...
strleun 17206	Combine two structures int...
strle1 17207	Make a structure from a si...
strle2 17208	Make a structure from a pa...
strle3 17209	Make a structure from a tr...
sbcie2s 17210	A special version of class...
sbcie3s 17211	A special version of class...
reldmsets 17214	The structure override ope...
setsvalg 17215	Value of the structure rep...
setsval 17216	Value of the structure rep...
fvsetsid 17217	The value of the structure...
fsets 17218	The structure replacement ...
setsdm 17219	The domain of a structure ...
setsfun 17220	A structure with replaceme...
setsfun0 17221	A structure with replaceme...
setsn0fun 17222	The value of the structure...
setsstruct2 17223	An extensible structure wi...
setsexstruct2 17224	An extensible structure wi...
setsstruct 17225	An extensible structure wi...
wunsets 17226	Closure of structure repla...
setsres 17227	The structure replacement ...
setsabs 17228	Replacing the same compone...
setscom 17229	Different components can b...
sloteq 17232	Equality theorem for the `...
slotfn 17233	A slot is a function on se...
strfvnd 17234	Deduction version of ~ str...
strfvn 17235	Value of a structure compo...
strfvss 17236	A structure component extr...
wunstr 17237	Closure of a structure ind...
str0 17238	All components of the empt...
strfvi 17239	Structure slot extractors ...
fveqprc 17240	Lemma for showing the equa...
oveqprc 17241	Lemma for showing the equa...
wunndx 17244	Closure of the index extra...
ndxarg 17245	Get the numeric argument f...
ndxid 17246	A structure component extr...
strndxid 17247	The value of a structure c...
setsidvald 17248	Value of the structure rep...
setsidvaldOLD 17249	Obsolete version of ~ sets...
strfvd 17250	Deduction version of ~ str...
strfv2d 17251	Deduction version of ~ str...
strfv2 17252	A variation on ~ strfv to ...
strfv 17253	Extract a structure compon...
strfv3 17254	Variant on ~ strfv for lar...
strssd 17255	Deduction version of ~ str...
strss 17256	Propagate component extrac...
setsid 17257	Value of the structure rep...
setsnid 17258	Value of the structure rep...
setsnidOLD 17259	Obsolete proof of ~ setsni...
baseval 17262	Value of the base set extr...
baseid 17263	Utility theorem: index-ind...
basfn 17264	The base set extractor is ...
base0 17265	The base set of the empty ...
elbasfv 17266	Utility theorem: reverse c...
elbasov 17267	Utility theorem: reverse c...
strov2rcl 17268	Partial reverse closure fo...
basendx 17269	Index value of the base se...
basendxnn 17270	The index value of the bas...
basendxnnOLD 17271	Obsolete proof of ~ basend...
basndxelwund 17272	The index of the base set ...
basprssdmsets 17273	The pair of the base index...
opelstrbas 17274	The base set of a structur...
1strstr 17275	A constructed one-slot str...
1strstr1 17276	A constructed one-slot str...
1strbas 17277	The base set of a construc...
1strbasOLD 17278	Obsolete proof of ~ 1strba...
1strwunbndx 17279	A constructed one-slot str...
1strwun 17280	A constructed one-slot str...
1strwunOLD 17281	Obsolete version of ~ 1str...
2strstr 17282	A constructed two-slot str...
2strbas 17283	The base set of a construc...
2strop 17284	The other slot of a constr...
2strstr1 17285	A constructed two-slot str...
2strstr1OLD 17286	Obsolete version of ~ 2str...
2strbas1 17287	The base set of a construc...
2strop1 17288	The other slot of a constr...
reldmress 17291	The structure restriction ...
ressval 17292	Value of structure restric...
ressid2 17293	General behavior of trivia...
ressval2 17294	Value of nontrivial struct...
ressbas 17295	Base set of a structure re...
ressbasOLD 17296	Obsolete proof of ~ ressba...
ressbasssg 17297	The base set of a restrict...
ressbas2 17298	Base set of a structure re...
ressbasss 17299	The base set of a restrict...
ressbasssOLD 17300	Obsolete proof of ~ ressba...
ressbasss2 17301	The base set of a restrict...
resseqnbas 17302	The components of an exten...
resslemOLD 17303	Obsolete version of ~ ress...
ress0 17304	All restrictions of the nu...
ressid 17305	Behavior of trivial restri...
ressinbas 17306	Restriction only cares abo...
ressval3d 17307	Value of structure restric...
ressval3dOLD 17308	Obsolete version of ~ ress...
ressress 17309	Restriction composition la...
ressabs 17310	Restriction absorption law...
wunress 17311	Closure of structure restr...
wunressOLD 17312	Obsolete proof of ~ wunres...
plusgndx 17339	Index value of the ~ df-pl...
plusgid 17340	Utility theorem: index-ind...
plusgndxnn 17341	The index of the slot for ...
basendxltplusgndx 17342	The index of the slot for ...
basendxnplusgndx 17343	The slot for the base set ...
basendxnplusgndxOLD 17344	Obsolete version of ~ base...
grpstr 17345	A constructed group is a s...
grpstrndx 17346	A constructed group is a s...
grpbase 17347	The base set of a construc...
grpbaseOLD 17348	Obsolete version of ~ grpb...
grpplusg 17349	The operation of a constru...
grpplusgOLD 17350	Obsolete version of ~ grpp...
ressplusg 17351	` +g ` is unaffected by re...
grpbasex 17352	The base of an explicitly ...
grpplusgx 17353	The operation of an explic...
mulrndx 17354	Index value of the ~ df-mu...
mulridx 17355	Utility theorem: index-ind...
basendxnmulrndx 17356	The slot for the base set ...
basendxnmulrndxOLD 17357	Obsolete proof of ~ basend...
plusgndxnmulrndx 17358	The slot for the group (ad...
rngstr 17359	A constructed ring is a st...
rngbase 17360	The base set of a construc...
rngplusg 17361	The additive operation of ...
rngmulr 17362	The multiplicative operati...
starvndx 17363	Index value of the ~ df-st...
starvid 17364	Utility theorem: index-ind...
starvndxnbasendx 17365	The slot for the involutio...
starvndxnplusgndx 17366	The slot for the involutio...
starvndxnmulrndx 17367	The slot for the involutio...
ressmulr 17368	` .r ` is unaffected by re...
ressstarv 17369	` *r ` is unaffected by re...
srngstr 17370	A constructed star ring is...
srngbase 17371	The base set of a construc...
srngplusg 17372	The addition operation of ...
srngmulr 17373	The multiplication operati...
srnginvl 17374	The involution function of...
scandx 17375	Index value of the ~ df-sc...
scaid 17376	Utility theorem: index-ind...
scandxnbasendx 17377	The slot for the scalar is...
scandxnplusgndx 17378	The slot for the scalar fi...
scandxnmulrndx 17379	The slot for the scalar fi...
vscandx 17380	Index value of the ~ df-vs...
vscaid 17381	Utility theorem: index-ind...
vscandxnbasendx 17382	The slot for the scalar pr...
vscandxnplusgndx 17383	The slot for the scalar pr...
vscandxnmulrndx 17384	The slot for the scalar pr...
vscandxnscandx 17385	The slot for the scalar pr...
lmodstr 17386	A constructed left module ...
lmodbase 17387	The base set of a construc...
lmodplusg 17388	The additive operation of ...
lmodsca 17389	The set of scalars of a co...
lmodvsca 17390	The scalar product operati...
ipndx 17391	Index value of the ~ df-ip...
ipid 17392	Utility theorem: index-ind...
ipndxnbasendx 17393	The slot for the inner pro...
ipndxnplusgndx 17394	The slot for the inner pro...
ipndxnmulrndx 17395	The slot for the inner pro...
slotsdifipndx 17396	The slot for the scalar is...
ipsstr 17397	Lemma to shorten proofs of...
ipsbase 17398	The base set of a construc...
ipsaddg 17399	The additive operation of ...
ipsmulr 17400	The multiplicative operati...
ipssca 17401	The set of scalars of a co...
ipsvsca 17402	The scalar product operati...
ipsip 17403	The multiplicative operati...
resssca 17404	` Scalar ` is unaffected b...
ressvsca 17405	` .s ` is unaffected by re...
ressip 17406	The inner product is unaff...
phlstr 17407	A constructed pre-Hilbert ...
phlbase 17408	The base set of a construc...
phlplusg 17409	The additive operation of ...
phlsca 17410	The ring of scalars of a c...
phlvsca 17411	The scalar product operati...
phlip 17412	The inner product (Hermiti...
tsetndx 17413	Index value of the ~ df-ts...
tsetid 17414	Utility theorem: index-ind...
tsetndxnn 17415	The index of the slot for ...
basendxlttsetndx 17416	The index of the slot for ...
tsetndxnbasendx 17417	The slot for the topology ...
tsetndxnplusgndx 17418	The slot for the topology ...
tsetndxnmulrndx 17419	The slot for the topology ...
tsetndxnstarvndx 17420	The slot for the topology ...
slotstnscsi 17421	The slots ` Scalar ` , ` ....
topgrpstr 17422	A constructed topological ...
topgrpbas 17423	The base set of a construc...
topgrpplusg 17424	The additive operation of ...
topgrptset 17425	The topology of a construc...
resstset 17426	` TopSet ` is unaffected b...
plendx 17427	Index value of the ~ df-pl...
pleid 17428	Utility theorem: self-refe...
plendxnn 17429	The index value of the ord...
basendxltplendx 17430	The index value of the ` B...
plendxnbasendx 17431	The slot for the order is ...
plendxnplusgndx 17432	The slot for the "less tha...
plendxnmulrndx 17433	The slot for the "less tha...
plendxnscandx 17434	The slot for the "less tha...
plendxnvscandx 17435	The slot for the "less tha...
slotsdifplendx 17436	The index of the slot for ...
otpsstr 17437	Functionality of a topolog...
otpsbas 17438	The base set of a topologi...
otpstset 17439	The open sets of a topolog...
otpsle 17440	The order of a topological...
ressle 17441	` le ` is unaffected by re...
ocndx 17442	Index value of the ~ df-oc...
ocid 17443	Utility theorem: index-ind...
basendxnocndx 17444	The slot for the orthocomp...
plendxnocndx 17445	The slot for the orthocomp...
dsndx 17446	Index value of the ~ df-ds...
dsid 17447	Utility theorem: index-ind...
dsndxnn 17448	The index of the slot for ...
basendxltdsndx 17449	The index of the slot for ...
dsndxnbasendx 17450	The slot for the distance ...
dsndxnplusgndx 17451	The slot for the distance ...
dsndxnmulrndx 17452	The slot for the distance ...
slotsdnscsi 17453	The slots ` Scalar ` , ` ....
dsndxntsetndx 17454	The slot for the distance ...
slotsdifdsndx 17455	The index of the slot for ...
unifndx 17456	Index value of the ~ df-un...
unifid 17457	Utility theorem: index-ind...
unifndxnn 17458	The index of the slot for ...
basendxltunifndx 17459	The index of the slot for ...
unifndxnbasendx 17460	The slot for the uniform s...
unifndxntsetndx 17461	The slot for the uniform s...
slotsdifunifndx 17462	The index of the slot for ...
ressunif 17463	` UnifSet ` is unaffected ...
odrngstr 17464	Functionality of an ordere...
odrngbas 17465	The base set of an ordered...
odrngplusg 17466	The addition operation of ...
odrngmulr 17467	The multiplication operati...
odrngtset 17468	The open sets of an ordere...
odrngle 17469	The order of an ordered me...
odrngds 17470	The metric of an ordered m...
ressds 17471	` dist ` is unaffected by ...
homndx 17472	Index value of the ~ df-ho...
homid 17473	Utility theorem: index-ind...
ccondx 17474	Index value of the ~ df-cc...
ccoid 17475	Utility theorem: index-ind...
slotsbhcdif 17476	The slots ` Base ` , ` Hom...
slotsbhcdifOLD 17477	Obsolete proof of ~ slotsb...
slotsdifplendx2 17478	The index of the slot for ...
slotsdifocndx 17479	The index of the slot for ...
resshom 17480	` Hom ` is unaffected by r...
ressco 17481	` comp ` is unaffected by ...
restfn 17486	The subspace topology oper...
topnfn 17487	The topology extractor fun...
restval 17488	The subspace topology indu...
elrest 17489	The predicate "is an open ...
elrestr 17490	Sufficient condition for b...
0rest 17491	Value of the structure res...
restid2 17492	The subspace topology over...
restsspw 17493	The subspace topology is a...
firest 17494	The finite intersections o...
restid 17495	The subspace topology of t...
topnval 17496	Value of the topology extr...
topnid 17497	Value of the topology extr...
topnpropd 17498	The topology extractor fun...
reldmprds 17510	The structure product is a...
prdsbasex 17512	Lemma for structure produc...
imasvalstr 17513	An image structure value i...
prdsvalstr 17514	Structure product value is...
prdsbaslem 17515	Lemma for ~ prdsbas and si...
prdsvallem 17516	Lemma for ~ prdsval . (Co...
prdsval 17517	Value of the structure pro...
prdssca 17518	Scalar ring of a structure...
prdsbas 17519	Base set of a structure pr...
prdsplusg 17520	Addition in a structure pr...
prdsmulr 17521	Multiplication in a struct...
prdsvsca 17522	Scalar multiplication in a...
prdsip 17523	Inner product in a structu...
prdsle 17524	Structure product weak ord...
prdsless 17525	Closure of the order relat...
prdsds 17526	Structure product distance...
prdsdsfn 17527	Structure product distance...
prdstset 17528	Structure product topology...
prdshom 17529	Structure product hom-sets...
prdsco 17530	Structure product composit...
prdsbas2 17531	The base set of a structur...
prdsbasmpt 17532	A constructed tuple is a p...
prdsbasfn 17533	Points in the structure pr...
prdsbasprj 17534	Each point in a structure ...
prdsplusgval 17535	Value of a componentwise s...
prdsplusgfval 17536	Value of a structure produ...
prdsmulrval 17537	Value of a componentwise r...
prdsmulrfval 17538	Value of a structure produ...
prdsleval 17539	Value of the product order...
prdsdsval 17540	Value of the metric in a s...
prdsvscaval 17541	Scalar multiplication in a...
prdsvscafval 17542	Scalar multiplication of a...
prdsbas3 17543	The base set of an indexed...
prdsbasmpt2 17544	A constructed tuple is a p...
prdsbascl 17545	An element of the base has...
prdsdsval2 17546	Value of the metric in a s...
prdsdsval3 17547	Value of the metric in a s...
pwsval 17548	Value of a structure power...
pwsbas 17549	Base set of a structure po...
pwselbasb 17550	Membership in the base set...
pwselbas 17551	An element of a structure ...
pwsplusgval 17552	Value of addition in a str...
pwsmulrval 17553	Value of multiplication in...
pwsle 17554	Ordering in a structure po...
pwsleval 17555	Ordering in a structure po...
pwsvscafval 17556	Scalar multiplication in a...
pwsvscaval 17557	Scalar multiplication of a...
pwssca 17558	The ring of scalars of a s...
pwsdiagel 17559	Membership of diagonal ele...
pwssnf1o 17560	Triviality of singleton po...
imasval 17573	Value of an image structur...
imasbas 17574	The base set of an image s...
imasds 17575	The distance function of a...
imasdsfn 17576	The distance function is a...
imasdsval 17577	The distance function of a...
imasdsval2 17578	The distance function of a...
imasplusg 17579	The group operation in an ...
imasmulr 17580	The ring multiplication in...
imassca 17581	The scalar field of an ima...
imasvsca 17582	The scalar multiplication ...
imasip 17583	The inner product of an im...
imastset 17584	The topology of an image s...
imasle 17585	The ordering of an image s...
f1ocpbllem 17586	Lemma for ~ f1ocpbl . (Co...
f1ocpbl 17587	An injection is compatible...
f1ovscpbl 17588	An injection is compatible...
f1olecpbl 17589	An injection is compatible...
imasaddfnlem 17590	The image structure operat...
imasaddvallem 17591	The operation of an image ...
imasaddflem 17592	The image set operations a...
imasaddfn 17593	The image structure's grou...
imasaddval 17594	The value of an image stru...
imasaddf 17595	The image structure's grou...
imasmulfn 17596	The image structure's ring...
imasmulval 17597	The value of an image stru...
imasmulf 17598	The image structure's ring...
imasvscafn 17599	The image structure's scal...
imasvscaval 17600	The value of an image stru...
imasvscaf 17601	The image structure's scal...
imasless 17602	The order relation defined...
imasleval 17603	The value of the image str...
qusval 17604	Value of a quotient struct...
quslem 17605	The function in ~ qusval i...
qusin 17606	Restrict the equivalence r...
qusbas 17607	Base set of a quotient str...
quss 17608	The scalar field of a quot...
divsfval 17609	Value of the function in ~...
ercpbllem 17610	Lemma for ~ ercpbl . (Con...
ercpbl 17611	Translate the function com...
erlecpbl 17612	Translate the relation com...
qusaddvallem 17613	Value of an operation defi...
qusaddflem 17614	The operation of a quotien...
qusaddval 17615	The addition in a quotient...
qusaddf 17616	The addition in a quotient...
qusmulval 17617	The multiplication in a qu...
qusmulf 17618	The multiplication in a qu...
fnpr2o 17619	Function with a domain of ...
fnpr2ob 17620	Biconditional version of ~...
fvpr0o 17621	The value of a function wi...
fvpr1o 17622	The value of a function wi...
fvprif 17623	The value of the pair func...
xpsfrnel 17624	Elementhood in the target ...
xpsfeq 17625	A function on ` 2o ` is de...
xpsfrnel2 17626	Elementhood in the target ...
xpscf 17627	Equivalent condition for t...
xpsfval 17628	The value of the function ...
xpsff1o 17629	The function appearing in ...
xpsfrn 17630	A short expression for the...
xpsff1o2 17631	The function appearing in ...
xpsval 17632	Value of the binary struct...
xpsrnbas 17633	The indexed structure prod...
xpsbas 17634	The base set of the binary...
xpsaddlem 17635	Lemma for ~ xpsadd and ~ x...
xpsadd 17636	Value of the addition oper...
xpsmul 17637	Value of the multiplicatio...
xpssca 17638	Value of the scalar field ...
xpsvsca 17639	Value of the scalar multip...
xpsless 17640	Closure of the ordering in...
xpsle 17641	Value of the ordering in a...
ismre 17650	Property of being a Moore ...
fnmre 17651	The Moore collection gener...
mresspw 17652	A Moore collection is a su...
mress 17653	A Moore-closed subset is a...
mre1cl 17654	In any Moore collection th...
mreintcl 17655	A nonempty collection of c...
mreiincl 17656	A nonempty indexed interse...
mrerintcl 17657	The relative intersection ...
mreriincl 17658	The relative intersection ...
mreincl 17659	Two closed sets have a clo...
mreuni 17660	Since the entire base set ...
mreunirn 17661	Two ways to express the no...
ismred 17662	Properties that determine ...
ismred2 17663	Properties that determine ...
mremre 17664	The Moore collections of s...
submre 17665	The subcollection of a clo...
mrcflem 17666	The domain and codomain of...
fnmrc 17667	Moore-closure is a well-be...
mrcfval 17668	Value of the function expr...
mrcf 17669	The Moore closure is a fun...
mrcval 17670	Evaluation of the Moore cl...
mrccl 17671	The Moore closure of a set...
mrcsncl 17672	The Moore closure of a sin...
mrcid 17673	The closure of a closed se...
mrcssv 17674	The closure of a set is a ...
mrcidb 17675	A set is closed iff it is ...
mrcss 17676	Closure preserves subset o...
mrcssid 17677	The closure of a set is a ...
mrcidb2 17678	A set is closed iff it con...
mrcidm 17679	The closure operation is i...
mrcsscl 17680	The closure is the minimal...
mrcuni 17681	Idempotence of closure und...
mrcun 17682	Idempotence of closure und...
mrcssvd 17683	The Moore closure of a set...
mrcssd 17684	Moore closure preserves su...
mrcssidd 17685	A set is contained in its ...
mrcidmd 17686	Moore closure is idempoten...
mressmrcd 17687	In a Moore system, if a se...
submrc 17688	In a closure system which ...
mrieqvlemd 17689	In a Moore system, if ` Y ...
mrisval 17690	Value of the set of indepe...
ismri 17691	Criterion for a set to be ...
ismri2 17692	Criterion for a subset of ...
ismri2d 17693	Criterion for a subset of ...
ismri2dd 17694	Definition of independence...
mriss 17695	An independent set of a Mo...
mrissd 17696	An independent set of a Mo...
ismri2dad 17697	Consequence of a set in a ...
mrieqvd 17698	In a Moore system, a set i...
mrieqv2d 17699	In a Moore system, a set i...
mrissmrcd 17700	In a Moore system, if an i...
mrissmrid 17701	In a Moore system, subsets...
mreexd 17702	In a Moore system, the clo...
mreexmrid 17703	In a Moore system whose cl...
mreexexlemd 17704	This lemma is used to gene...
mreexexlem2d 17705	Used in ~ mreexexlem4d to ...
mreexexlem3d 17706	Base case of the induction...
mreexexlem4d 17707	Induction step of the indu...
mreexexd 17708	Exchange-type theorem. In...
mreexdomd 17709	In a Moore system whose cl...
mreexfidimd 17710	In a Moore system whose cl...
isacs 17711	A set is an algebraic clos...
acsmre 17712	Algebraic closure systems ...
isacs2 17713	In the definition of an al...
acsfiel 17714	A set is closed in an alge...
acsfiel2 17715	A set is closed in an alge...
acsmred 17716	An algebraic closure syste...
isacs1i 17717	A closure system determine...
mreacs 17718	Algebraicity is a composab...
acsfn 17719	Algebraicity of a conditio...
acsfn0 17720	Algebraicity of a point cl...
acsfn1 17721	Algebraicity of a one-argu...
acsfn1c 17722	Algebraicity of a one-argu...
acsfn2 17723	Algebraicity of a two-argu...
iscat 17732	The predicate "is a catego...
iscatd 17733	Properties that determine ...
catidex 17734	Each object in a category ...
catideu 17735	Each object in a category ...
cidfval 17736	Each object in a category ...
cidval 17737	Each object in a category ...
cidffn 17738	The identity arrow constru...
cidfn 17739	The identity arrow operato...
catidd 17740	Deduce the identity arrow ...
iscatd2 17741	Version of ~ iscatd with a...
catidcl 17742	Each object in a category ...
catlid 17743	Left identity property of ...
catrid 17744	Right identity property of...
catcocl 17745	Closure of a composition a...
catass 17746	Associativity of compositi...
catcone0 17747	Composition of non-empty h...
0catg 17748	Any structure with an empt...
0cat 17749	The empty set is a categor...
homffval 17750	Value of the functionalize...
fnhomeqhomf 17751	If the Hom-set operation i...
homfval 17752	Value of the functionalize...
homffn 17753	The functionalized Hom-set...
homfeq 17754	Condition for two categori...
homfeqd 17755	If two structures have the...
homfeqbas 17756	Deduce equality of base se...
homfeqval 17757	Value of the functionalize...
comfffval 17758	Value of the functionalize...
comffval 17759	Value of the functionalize...
comfval 17760	Value of the functionalize...
comfffval2 17761	Value of the functionalize...
comffval2 17762	Value of the functionalize...
comfval2 17763	Value of the functionalize...
comfffn 17764	The functionalized composi...
comffn 17765	The functionalized composi...
comfeq 17766	Condition for two categori...
comfeqd 17767	Condition for two categori...
comfeqval 17768	Equality of two compositio...
catpropd 17769	Two structures with the sa...
cidpropd 17770	Two structures with the sa...
oppcval 17773	Value of the opposite cate...
oppchomfval 17774	Hom-sets of the opposite c...
oppchomfvalOLD 17775	Obsolete proof of ~ oppcho...
oppchom 17776	Hom-sets of the opposite c...
oppccofval 17777	Composition in the opposit...
oppcco 17778	Composition in the opposit...
oppcbas 17779	Base set of an opposite ca...
oppcbasOLD 17780	Obsolete version of ~ oppc...
oppccatid 17781	Lemma for ~ oppccat . (Co...
oppchomf 17782	Hom-sets of the opposite c...
oppcid 17783	Identity function of an op...
oppccat 17784	An opposite category is a ...
2oppcbas 17785	The double opposite catego...
2oppchomf 17786	The double opposite catego...
2oppccomf 17787	The double opposite catego...
oppchomfpropd 17788	If two categories have the...
oppccomfpropd 17789	If two categories have the...
oppccatf 17790	` oppCat ` restricted to `...
monfval 17795	Definition of a monomorphi...
ismon 17796	Definition of a monomorphi...
ismon2 17797	Write out the monomorphism...
monhom 17798	A monomorphism is a morphi...
moni 17799	Property of a monomorphism...
monpropd 17800	If two categories have the...
oppcmon 17801	A monomorphism in the oppo...
oppcepi 17802	An epimorphism in the oppo...
isepi 17803	Definition of an epimorphi...
isepi2 17804	Write out the epimorphism ...
epihom 17805	An epimorphism is a morphi...
epii 17806	Property of an epimorphism...
sectffval 17813	Value of the section opera...
sectfval 17814	Value of the section relat...
sectss 17815	The section relation is a ...
issect 17816	The property " ` F ` is a ...
issect2 17817	Property of being a sectio...
sectcan 17818	If ` G ` is a section of `...
sectco 17819	Composition of two section...
isofval 17820	Function value of the func...
invffval 17821	Value of the inverse relat...
invfval 17822	Value of the inverse relat...
isinv 17823	Value of the inverse relat...
invss 17824	The inverse relation is a ...
invsym 17825	The inverse relation is sy...
invsym2 17826	The inverse relation is sy...
invfun 17827	The inverse relation is a ...
isoval 17828	The isomorphisms are the d...
inviso1 17829	If ` G ` is an inverse to ...
inviso2 17830	If ` G ` is an inverse to ...
invf 17831	The inverse relation is a ...
invf1o 17832	The inverse relation is a ...
invinv 17833	The inverse of the inverse...
invco 17834	The composition of two iso...
dfiso2 17835	Alternate definition of an...
dfiso3 17836	Alternate definition of an...
inveq 17837	If there are two inverses ...
isofn 17838	The function value of the ...
isohom 17839	An isomorphism is a homomo...
isoco 17840	The composition of two iso...
oppcsect 17841	A section in the opposite ...
oppcsect2 17842	A section in the opposite ...
oppcinv 17843	An inverse in the opposite...
oppciso 17844	An isomorphism in the oppo...
sectmon 17845	If ` F ` is a section of `...
monsect 17846	If ` F ` is a monomorphism...
sectepi 17847	If ` F ` is a section of `...
episect 17848	If ` F ` is an epimorphism...
sectid 17849	The identity is a section ...
invid 17850	The inverse of the identit...
idiso 17851	The identity is an isomorp...
idinv 17852	The inverse of the identit...
invisoinvl 17853	The inverse of an isomorph...
invisoinvr 17854	The inverse of an isomorph...
invcoisoid 17855	The inverse of an isomorph...
isocoinvid 17856	The inverse of an isomorph...
rcaninv 17857	Right cancellation of an i...
cicfval 17860	The set of isomorphic obje...
brcic 17861	The relation "is isomorphi...
cic 17862	Objects ` X ` and ` Y ` in...
brcici 17863	Prove that two objects are...
cicref 17864	Isomorphism is reflexive. ...
ciclcl 17865	Isomorphism implies the le...
cicrcl 17866	Isomorphism implies the ri...
cicsym 17867	Isomorphism is symmetric. ...
cictr 17868	Isomorphism is transitive....
cicer 17869	Isomorphism is an equivale...
sscrel 17876	The subcategory subset rel...
brssc 17877	The subcategory subset rel...
sscpwex 17878	An analogue of ~ pwex for ...
subcrcl 17879	Reverse closure for the su...
sscfn1 17880	The subcategory subset rel...
sscfn2 17881	The subcategory subset rel...
ssclem 17882	Lemma for ~ ssc1 and simil...
isssc 17883	Value of the subcategory s...
ssc1 17884	Infer subset relation on o...
ssc2 17885	Infer subset relation on m...
sscres 17886	Any function restricted to...
sscid 17887	The subcategory subset rel...
ssctr 17888	The subcategory subset rel...
ssceq 17889	The subcategory subset rel...
rescval 17890	Value of the category rest...
rescval2 17891	Value of the category rest...
rescbas 17892	Base set of the category r...
rescbasOLD 17893	Obsolete version of ~ resc...
reschom 17894	Hom-sets of the category r...
reschomf 17895	Hom-sets of the category r...
rescco 17896	Composition in the categor...
resccoOLD 17897	Obsolete proof of ~ rescco...
rescabs 17898	Restriction absorption law...
rescabsOLD 17899	Obsolete proof of ~ seqp1d...
rescabs2 17900	Restriction absorption law...
issubc 17901	Elementhood in the set of ...
issubc2 17902	Elementhood in the set of ...
0ssc 17903	For any category ` C ` , t...
0subcat 17904	For any category ` C ` , t...
catsubcat 17905	For any category ` C ` , `...
subcssc 17906	An element in the set of s...
subcfn 17907	An element in the set of s...
subcss1 17908	The objects of a subcatego...
subcss2 17909	The morphisms of a subcate...
subcidcl 17910	The identity of the origin...
subccocl 17911	A subcategory is closed un...
subccatid 17912	A subcategory is a categor...
subcid 17913	The identity in a subcateg...
subccat 17914	A subcategory is a categor...
issubc3 17915	Alternate definition of a ...
fullsubc 17916	The full subcategory gener...
fullresc 17917	The category formed by str...
resscat 17918	A category restricted to a...
subsubc 17919	A subcategory of a subcate...
relfunc 17928	The set of functors is a r...
funcrcl 17929	Reverse closure for a func...
isfunc 17930	Value of the set of functo...
isfuncd 17931	Deduce that an operation i...
funcf1 17932	The object part of a funct...
funcixp 17933	The morphism part of a fun...
funcf2 17934	The morphism part of a fun...
funcfn2 17935	The morphism part of a fun...
funcid 17936	A functor maps each identi...
funcco 17937	A functor maps composition...
funcsect 17938	The image of a section und...
funcinv 17939	The image of an inverse un...
funciso 17940	The image of an isomorphis...
funcoppc 17941	A functor on categories yi...
idfuval 17942	Value of the identity func...
idfu2nd 17943	Value of the morphism part...
idfu2 17944	Value of the morphism part...
idfu1st 17945	Value of the object part o...
idfu1 17946	Value of the object part o...
idfucl 17947	The identity functor is a ...
cofuval 17948	Value of the composition o...
cofu1st 17949	Value of the object part o...
cofu1 17950	Value of the object part o...
cofu2nd 17951	Value of the morphism part...
cofu2 17952	Value of the morphism part...
cofuval2 17953	Value of the composition o...
cofucl 17954	The composition of two fun...
cofuass 17955	Functor composition is ass...
cofulid 17956	The identity functor is a ...
cofurid 17957	The identity functor is a ...
resfval 17958	Value of the functor restr...
resfval2 17959	Value of the functor restr...
resf1st 17960	Value of the functor restr...
resf2nd 17961	Value of the functor restr...
funcres 17962	A functor restricted to a ...
funcres2b 17963	Condition for a functor to...
funcres2 17964	A functor into a restricte...
idfusubc0 17965	The identity functor for a...
idfusubc 17966	The identity functor for a...
wunfunc 17967	A weak universe is closed ...
wunfuncOLD 17968	Obsolete proof of ~ wunfun...
funcpropd 17969	If two categories have the...
funcres2c 17970	Condition for a functor to...
fullfunc 17975	A full functor is a functo...
fthfunc 17976	A faithful functor is a fu...
relfull 17977	The set of full functors i...
relfth 17978	The set of faithful functo...
isfull 17979	Value of the set of full f...
isfull2 17980	Equivalent condition for a...
fullfo 17981	The morphism map of a full...
fulli 17982	The morphism map of a full...
isfth 17983	Value of the set of faithf...
isfth2 17984	Equivalent condition for a...
isffth2 17985	A fully faithful functor i...
fthf1 17986	The morphism map of a fait...
fthi 17987	The morphism map of a fait...
ffthf1o 17988	The morphism map of a full...
fullpropd 17989	If two categories have the...
fthpropd 17990	If two categories have the...
fulloppc 17991	The opposite functor of a ...
fthoppc 17992	The opposite functor of a ...
ffthoppc 17993	The opposite functor of a ...
fthsect 17994	A faithful functor reflect...
fthinv 17995	A faithful functor reflect...
fthmon 17996	A faithful functor reflect...
fthepi 17997	A faithful functor reflect...
ffthiso 17998	A fully faithful functor r...
fthres2b 17999	Condition for a faithful f...
fthres2c 18000	Condition for a faithful f...
fthres2 18001	A faithful functor into a ...
idffth 18002	The identity functor is a ...
cofull 18003	The composition of two ful...
cofth 18004	The composition of two fai...
coffth 18005	The composition of two ful...
rescfth 18006	The inclusion functor from...
ressffth 18007	The inclusion functor from...
fullres2c 18008	Condition for a full funct...
ffthres2c 18009	Condition for a fully fait...
inclfusubc 18010	The "inclusion functor" fr...
fnfuc 18015	The ` FuncCat ` operation ...
natfval 18016	Value of the function givi...
isnat 18017	Property of being a natura...
isnat2 18018	Property of being a natura...
natffn 18019	The natural transformation...
natrcl 18020	Reverse closure for a natu...
nat1st2nd 18021	Rewrite the natural transf...
natixp 18022	A natural transformation i...
natcl 18023	A component of a natural t...
natfn 18024	A natural transformation i...
nati 18025	Naturality property of a n...
wunnat 18026	A weak universe is closed ...
wunnatOLD 18027	Obsolete proof of ~ wunnat...
catstr 18028	A category structure is a ...
fucval 18029	Value of the functor categ...
fuccofval 18030	Value of the functor categ...
fucbas 18031	The objects of the functor...
fuchom 18032	The morphisms in the funct...
fuchomOLD 18033	Obsolete proof of ~ fuchom...
fucco 18034	Value of the composition o...
fuccoval 18035	Value of the functor categ...
fuccocl 18036	The composition of two nat...
fucidcl 18037	The identity natural trans...
fuclid 18038	Left identity of natural t...
fucrid 18039	Right identity of natural ...
fucass 18040	Associativity of natural t...
fuccatid 18041	The functor category is a ...
fuccat 18042	The functor category is a ...
fucid 18043	The identity morphism in t...
fucsect 18044	Two natural transformation...
fucinv 18045	Two natural transformation...
invfuc 18046	If ` V ( x ) ` is an inver...
fuciso 18047	A natural transformation i...
natpropd 18048	If two categories have the...
fucpropd 18049	If two categories have the...
initofn 18056	` InitO ` is a function on...
termofn 18057	` TermO ` is a function on...
zeroofn 18058	` ZeroO ` is a function on...
initorcl 18059	Reverse closure for an ini...
termorcl 18060	Reverse closure for a term...
zeroorcl 18061	Reverse closure for a zero...
initoval 18062	The value of the initial o...
termoval 18063	The value of the terminal ...
zerooval 18064	The value of the zero obje...
isinito 18065	The predicate "is an initi...
istermo 18066	The predicate "is a termin...
iszeroo 18067	The predicate "is a zero o...
isinitoi 18068	Implication of a class bei...
istermoi 18069	Implication of a class bei...
initoid 18070	For an initial object, the...
termoid 18071	For a terminal object, the...
dfinito2 18072	An initial object is a ter...
dftermo2 18073	A terminal object is an in...
dfinito3 18074	An alternate definition of...
dftermo3 18075	An alternate definition of...
initoo 18076	An initial object is an ob...
termoo 18077	A terminal object is an ob...
iszeroi 18078	Implication of a class bei...
2initoinv 18079	Morphisms between two init...
initoeu1 18080	Initial objects are essent...
initoeu1w 18081	Initial objects are essent...
initoeu2lem0 18082	Lemma 0 for ~ initoeu2 . ...
initoeu2lem1 18083	Lemma 1 for ~ initoeu2 . ...
initoeu2lem2 18084	Lemma 2 for ~ initoeu2 . ...
initoeu2 18085	Initial objects are essent...
2termoinv 18086	Morphisms between two term...
termoeu1 18087	Terminal objects are essen...
termoeu1w 18088	Terminal objects are essen...
homarcl 18097	Reverse closure for an arr...
homafval 18098	Value of the disjointified...
homaf 18099	Functionality of the disjo...
homaval 18100	Value of the disjointified...
elhoma 18101	Value of the disjointified...
elhomai 18102	Produce an arrow from a mo...
elhomai2 18103	Produce an arrow from a mo...
homarcl2 18104	Reverse closure for the do...
homarel 18105	An arrow is an ordered pai...
homa1 18106	The first component of an ...
homahom2 18107	The second component of an...
homahom 18108	The second component of an...
homadm 18109	The domain of an arrow wit...
homacd 18110	The codomain of an arrow w...
homadmcd 18111	Decompose an arrow into do...
arwval 18112	The set of arrows is the u...
arwrcl 18113	The first component of an ...
arwhoma 18114	An arrow is contained in t...
homarw 18115	A hom-set is a subset of t...
arwdm 18116	The domain of an arrow is ...
arwcd 18117	The codomain of an arrow i...
dmaf 18118	The domain function is a f...
cdaf 18119	The codomain function is a...
arwhom 18120	The second component of an...
arwdmcd 18121	Decompose an arrow into do...
idafval 18126	Value of the identity arro...
idaval 18127	Value of the identity arro...
ida2 18128	Morphism part of the ident...
idahom 18129	Domain and codomain of the...
idadm 18130	Domain of the identity arr...
idacd 18131	Codomain of the identity a...
idaf 18132	The identity arrow functio...
coafval 18133	The value of the compositi...
eldmcoa 18134	A pair ` <. G , F >. ` is ...
dmcoass 18135	The domain of composition ...
homdmcoa 18136	If ` F : X --> Y ` and ` G...
coaval 18137	Value of composition for c...
coa2 18138	The morphism part of arrow...
coahom 18139	The composition of two com...
coapm 18140	Composition of arrows is a...
arwlid 18141	Left identity of a categor...
arwrid 18142	Right identity of a catego...
arwass 18143	Associativity of compositi...
setcval 18146	Value of the category of s...
setcbas 18147	Set of objects of the cate...
setchomfval 18148	Set of arrows of the categ...
setchom 18149	Set of arrows of the categ...
elsetchom 18150	A morphism of sets is a fu...
setccofval 18151	Composition in the categor...
setcco 18152	Composition in the categor...
setccatid 18153	Lemma for ~ setccat . (Co...
setccat 18154	The category of sets is a ...
setcid 18155	The identity arrow in the ...
setcmon 18156	A monomorphism of sets is ...
setcepi 18157	An epimorphism of sets is ...
setcsect 18158	A section in the category ...
setcinv 18159	An inverse in the category...
setciso 18160	An isomorphism in the cate...
resssetc 18161	The restriction of the cat...
funcsetcres2 18162	A functor into a smaller c...
setc2obas 18163	` (/) ` and ` 1o ` are dis...
setc2ohom 18164	` ( SetCat `` 2o ) ` is a ...
cat1lem 18165	The category of sets in a ...
cat1 18166	The definition of category...
catcval 18169	Value of the category of c...
catcbas 18170	Set of objects of the cate...
catchomfval 18171	Set of arrows of the categ...
catchom 18172	Set of arrows of the categ...
catccofval 18173	Composition in the categor...
catcco 18174	Composition in the categor...
catccatid 18175	Lemma for ~ catccat . (Co...
catcid 18176	The identity arrow in the ...
catccat 18177	The category of categories...
resscatc 18178	The restriction of the cat...
catcisolem 18179	Lemma for ~ catciso . (Co...
catciso 18180	A functor is an isomorphis...
catcbascl 18181	An element of the base set...
catcslotelcl 18182	A slot entry of an element...
catcbaselcl 18183	The base set of an element...
catchomcl 18184	The Hom-set of an element ...
catcccocl 18185	The composition operation ...
catcoppccl 18186	The category of categories...
catcoppcclOLD 18187	Obsolete proof of ~ catcop...
catcfuccl 18188	The category of categories...
catcfucclOLD 18189	Obsolete proof of ~ catcfu...
fncnvimaeqv 18190	The inverse images of the ...
bascnvimaeqv 18191	The inverse image of the u...
estrcval 18194	Value of the category of e...
estrcbas 18195	Set of objects of the cate...
estrchomfval 18196	Set of morphisms ("arrows"...
estrchom 18197	The morphisms between exte...
elestrchom 18198	A morphism between extensi...
estrccofval 18199	Composition in the categor...
estrcco 18200	Composition in the categor...
estrcbasbas 18201	An element of the base set...
estrccatid 18202	Lemma for ~ estrccat . (C...
estrccat 18203	The category of extensible...
estrcid 18204	The identity arrow in the ...
estrchomfn 18205	The Hom-set operation in t...
estrchomfeqhom 18206	The functionalized Hom-set...
estrreslem1 18207	Lemma 1 for ~ estrres . (...
estrreslem1OLD 18208	Obsolete version of ~ estr...
estrreslem2 18209	Lemma 2 for ~ estrres . (...
estrres 18210	Any restriction of a categ...
funcestrcsetclem1 18211	Lemma 1 for ~ funcestrcset...
funcestrcsetclem2 18212	Lemma 2 for ~ funcestrcset...
funcestrcsetclem3 18213	Lemma 3 for ~ funcestrcset...
funcestrcsetclem4 18214	Lemma 4 for ~ funcestrcset...
funcestrcsetclem5 18215	Lemma 5 for ~ funcestrcset...
funcestrcsetclem6 18216	Lemma 6 for ~ funcestrcset...
funcestrcsetclem7 18217	Lemma 7 for ~ funcestrcset...
funcestrcsetclem8 18218	Lemma 8 for ~ funcestrcset...
funcestrcsetclem9 18219	Lemma 9 for ~ funcestrcset...
funcestrcsetc 18220	The "natural forgetful fun...
fthestrcsetc 18221	The "natural forgetful fun...
fullestrcsetc 18222	The "natural forgetful fun...
equivestrcsetc 18223	The "natural forgetful fun...
setc1strwun 18224	A constructed one-slot str...
funcsetcestrclem1 18225	Lemma 1 for ~ funcsetcestr...
funcsetcestrclem2 18226	Lemma 2 for ~ funcsetcestr...
funcsetcestrclem3 18227	Lemma 3 for ~ funcsetcestr...
embedsetcestrclem 18228	Lemma for ~ embedsetcestrc...
funcsetcestrclem4 18229	Lemma 4 for ~ funcsetcestr...
funcsetcestrclem5 18230	Lemma 5 for ~ funcsetcestr...
funcsetcestrclem6 18231	Lemma 6 for ~ funcsetcestr...
funcsetcestrclem7 18232	Lemma 7 for ~ funcsetcestr...
funcsetcestrclem8 18233	Lemma 8 for ~ funcsetcestr...
funcsetcestrclem9 18234	Lemma 9 for ~ funcsetcestr...
funcsetcestrc 18235	The "embedding functor" fr...
fthsetcestrc 18236	The "embedding functor" fr...
fullsetcestrc 18237	The "embedding functor" fr...
embedsetcestrc 18238	The "embedding functor" fr...
fnxpc 18247	The binary product of cate...
xpcval 18248	Value of the binary produc...
xpcbas 18249	Set of objects of the bina...
xpchomfval 18250	Set of morphisms of the bi...
xpchom 18251	Set of morphisms of the bi...
relxpchom 18252	A hom-set in the binary pr...
xpccofval 18253	Value of composition in th...
xpcco 18254	Value of composition in th...
xpcco1st 18255	Value of composition in th...
xpcco2nd 18256	Value of composition in th...
xpchom2 18257	Value of the set of morphi...
xpcco2 18258	Value of composition in th...
xpccatid 18259	The product of two categor...
xpcid 18260	The identity morphism in t...
xpccat 18261	The product of two categor...
1stfval 18262	Value of the first project...
1stf1 18263	Value of the first project...
1stf2 18264	Value of the first project...
2ndfval 18265	Value of the first project...
2ndf1 18266	Value of the first project...
2ndf2 18267	Value of the first project...
1stfcl 18268	The first projection funct...
2ndfcl 18269	The second projection func...
prfval 18270	Value of the pairing funct...
prf1 18271	Value of the pairing funct...
prf2fval 18272	Value of the pairing funct...
prf2 18273	Value of the pairing funct...
prfcl 18274	The pairing of functors ` ...
prf1st 18275	Cancellation of pairing wi...
prf2nd 18276	Cancellation of pairing wi...
1st2ndprf 18277	Break a functor into a pro...
catcxpccl 18278	The category of categories...
catcxpcclOLD 18279	Obsolete proof of ~ catcxp...
xpcpropd 18280	If two categories have the...
evlfval 18289	Value of the evaluation fu...
evlf2 18290	Value of the evaluation fu...
evlf2val 18291	Value of the evaluation na...
evlf1 18292	Value of the evaluation fu...
evlfcllem 18293	Lemma for ~ evlfcl . (Con...
evlfcl 18294	The evaluation functor is ...
curfval 18295	Value of the curry functor...
curf1fval 18296	Value of the object part o...
curf1 18297	Value of the object part o...
curf11 18298	Value of the double evalua...
curf12 18299	The partially evaluated cu...
curf1cl 18300	The partially evaluated cu...
curf2 18301	Value of the curry functor...
curf2val 18302	Value of a component of th...
curf2cl 18303	The curry functor at a mor...
curfcl 18304	The curry functor of a fun...
curfpropd 18305	If two categories have the...
uncfval 18306	Value of the uncurry funct...
uncfcl 18307	The uncurry operation take...
uncf1 18308	Value of the uncurry funct...
uncf2 18309	Value of the uncurry funct...
curfuncf 18310	Cancellation of curry with...
uncfcurf 18311	Cancellation of uncurry wi...
diagval 18312	Define the diagonal functo...
diagcl 18313	The diagonal functor is a ...
diag1cl 18314	The constant functor of ` ...
diag11 18315	Value of the constant func...
diag12 18316	Value of the constant func...
diag2 18317	Value of the diagonal func...
diag2cl 18318	The diagonal functor at a ...
curf2ndf 18319	As shown in ~ diagval , th...
hofval 18324	Value of the Hom functor, ...
hof1fval 18325	The object part of the Hom...
hof1 18326	The object part of the Hom...
hof2fval 18327	The morphism part of the H...
hof2val 18328	The morphism part of the H...
hof2 18329	The morphism part of the H...
hofcllem 18330	Lemma for ~ hofcl . (Cont...
hofcl 18331	Closure of the Hom functor...
oppchofcl 18332	Closure of the opposite Ho...
yonval 18333	Value of the Yoneda embedd...
yoncl 18334	The Yoneda embedding is a ...
yon1cl 18335	The Yoneda embedding at an...
yon11 18336	Value of the Yoneda embedd...
yon12 18337	Value of the Yoneda embedd...
yon2 18338	Value of the Yoneda embedd...
hofpropd 18339	If two categories have the...
yonpropd 18340	If two categories have the...
oppcyon 18341	Value of the opposite Yone...
oyoncl 18342	The opposite Yoneda embedd...
oyon1cl 18343	The opposite Yoneda embedd...
yonedalem1 18344	Lemma for ~ yoneda . (Con...
yonedalem21 18345	Lemma for ~ yoneda . (Con...
yonedalem3a 18346	Lemma for ~ yoneda . (Con...
yonedalem4a 18347	Lemma for ~ yoneda . (Con...
yonedalem4b 18348	Lemma for ~ yoneda . (Con...
yonedalem4c 18349	Lemma for ~ yoneda . (Con...
yonedalem22 18350	Lemma for ~ yoneda . (Con...
yonedalem3b 18351	Lemma for ~ yoneda . (Con...
yonedalem3 18352	Lemma for ~ yoneda . (Con...
yonedainv 18353	The Yoneda Lemma with expl...
yonffthlem 18354	Lemma for ~ yonffth . (Co...
yoneda 18355	The Yoneda Lemma. There i...
yonffth 18356	The Yoneda Lemma. The Yon...
yoniso 18357	If the codomain is recover...
oduval 18360	Value of an order dual str...
oduleval 18361	Value of the less-equal re...
oduleg 18362	Truth of the less-equal re...
odubas 18363	Base set of an order dual ...
odubasOLD 18364	Obsolete proof of ~ odubas...
isprs 18369	Property of being a preord...
prslem 18370	Lemma for ~ prsref and ~ p...
prsref 18371	"Less than or equal to" is...
prstr 18372	"Less than or equal to" is...
isdrs 18373	Property of being a direct...
drsdir 18374	Direction of a directed se...
drsprs 18375	A directed set is a proset...
drsbn0 18376	The base of a directed set...
drsdirfi 18377	Any _finite_ number of ele...
isdrs2 18378	Directed sets may be defin...
ispos 18386	The predicate "is a poset"...
ispos2 18387	A poset is an antisymmetri...
posprs 18388	A poset is a proset. (Con...
posi 18389	Lemma for poset properties...
posref 18390	A poset ordering is reflex...
posasymb 18391	A poset ordering is asymme...
postr 18392	A poset ordering is transi...
0pos 18393	Technical lemma to simplif...
0posOLD 18394	Obsolete proof of ~ 0pos a...
isposd 18395	Properties that determine ...
isposi 18396	Properties that determine ...
isposix 18397	Properties that determine ...
isposixOLD 18398	Obsolete proof of ~ isposi...
pospropd 18399	Posethood is determined on...
odupos 18400	Being a poset is a self-du...
oduposb 18401	Being a poset is a self-du...
pltfval 18403	Value of the less-than rel...
pltval 18404	Less-than relation. ( ~ d...
pltle 18405	"Less than" implies "less ...
pltne 18406	The "less than" relation i...
pltirr 18407	The "less than" relation i...
pleval2i 18408	One direction of ~ pleval2...
pleval2 18409	"Less than or equal to" in...
pltnle 18410	"Less than" implies not co...
pltval3 18411	Alternate expression for t...
pltnlt 18412	The less-than relation imp...
pltn2lp 18413	The less-than relation has...
plttr 18414	The less-than relation is ...
pltletr 18415	Transitive law for chained...
plelttr 18416	Transitive law for chained...
pospo 18417	Write a poset structure in...
lubfval 18422	Value of the least upper b...
lubdm 18423	Domain of the least upper ...
lubfun 18424	The LUB is a function. (C...
lubeldm 18425	Member of the domain of th...
lubelss 18426	A member of the domain of ...
lubeu 18427	Unique existence proper of...
lubval 18428	Value of the least upper b...
lubcl 18429	The least upper bound func...
lubprop 18430	Properties of greatest low...
luble 18431	The greatest lower bound i...
lublecllem 18432	Lemma for ~ lublecl and ~ ...
lublecl 18433	The set of all elements le...
lubid 18434	The LUB of elements less t...
glbfval 18435	Value of the greatest lowe...
glbdm 18436	Domain of the greatest low...
glbfun 18437	The GLB is a function. (C...
glbeldm 18438	Member of the domain of th...
glbelss 18439	A member of the domain of ...
glbeu 18440	Unique existence proper of...
glbval 18441	Value of the greatest lowe...
glbcl 18442	The least upper bound func...
glbprop 18443	Properties of greatest low...
glble 18444	The greatest lower bound i...
joinfval 18445	Value of join function for...
joinfval2 18446	Value of join function for...
joindm 18447	Domain of join function fo...
joindef 18448	Two ways to say that a joi...
joinval 18449	Join value. Since both si...
joincl 18450	Closure of join of element...
joindmss 18451	Subset property of domain ...
joinval2lem 18452	Lemma for ~ joinval2 and ~...
joinval2 18453	Value of join for a poset ...
joineu 18454	Uniqueness of join of elem...
joinlem 18455	Lemma for join properties....
lejoin1 18456	A join's first argument is...
lejoin2 18457	A join's second argument i...
joinle 18458	A join is less than or equ...
meetfval 18459	Value of meet function for...
meetfval2 18460	Value of meet function for...
meetdm 18461	Domain of meet function fo...
meetdef 18462	Two ways to say that a mee...
meetval 18463	Meet value. Since both si...
meetcl 18464	Closure of meet of element...
meetdmss 18465	Subset property of domain ...
meetval2lem 18466	Lemma for ~ meetval2 and ~...
meetval2 18467	Value of meet for a poset ...
meeteu 18468	Uniqueness of meet of elem...
meetlem 18469	Lemma for meet properties....
lemeet1 18470	A meet's first argument is...
lemeet2 18471	A meet's second argument i...
meetle 18472	A meet is less than or equ...
joincomALT 18473	The join of a poset is com...
joincom 18474	The join of a poset is com...
meetcomALT 18475	The meet of a poset is com...
meetcom 18476	The meet of a poset is com...
join0 18477	Lemma for ~ odumeet . (Co...
meet0 18478	Lemma for ~ odujoin . (Co...
odulub 18479	Least upper bounds in a du...
odujoin 18480	Joins in a dual order are ...
oduglb 18481	Greatest lower bounds in a...
odumeet 18482	Meets in a dual order are ...
poslubmo 18483	Least upper bounds in a po...
posglbmo 18484	Greatest lower bounds in a...
poslubd 18485	Properties which determine...
poslubdg 18486	Properties which determine...
posglbdg 18487	Properties which determine...
istos 18490	The predicate "is a toset"...
tosso 18491	Write the totally ordered ...
tospos 18492	A Toset is a Poset. (Cont...
tleile 18493	In a Toset, any two elemen...
tltnle 18494	In a Toset, "less than" is...
p0val 18499	Value of poset zero. (Con...
p1val 18500	Value of poset zero. (Con...
p0le 18501	Any element is less than o...
ple1 18502	Any element is less than o...
islat 18505	The predicate "is a lattic...
odulatb 18506	Being a lattice is self-du...
odulat 18507	Being a lattice is self-du...
latcl2 18508	The join and meet of any t...
latlem 18509	Lemma for lattice properti...
latpos 18510	A lattice is a poset. (Co...
latjcl 18511	Closure of join operation ...
latmcl 18512	Closure of meet operation ...
latref 18513	A lattice ordering is refl...
latasymb 18514	A lattice ordering is asym...
latasym 18515	A lattice ordering is asym...
lattr 18516	A lattice ordering is tran...
latasymd 18517	Deduce equality from latti...
lattrd 18518	A lattice ordering is tran...
latjcom 18519	The join of a lattice comm...
latlej1 18520	A join's first argument is...
latlej2 18521	A join's second argument i...
latjle12 18522	A join is less than or equ...
latleeqj1 18523	"Less than or equal to" in...
latleeqj2 18524	"Less than or equal to" in...
latjlej1 18525	Add join to both sides of ...
latjlej2 18526	Add join to both sides of ...
latjlej12 18527	Add join to both sides of ...
latnlej 18528	An idiom to express that a...
latnlej1l 18529	An idiom to express that a...
latnlej1r 18530	An idiom to express that a...
latnlej2 18531	An idiom to express that a...
latnlej2l 18532	An idiom to express that a...
latnlej2r 18533	An idiom to express that a...
latjidm 18534	Lattice join is idempotent...
latmcom 18535	The join of a lattice comm...
latmle1 18536	A meet is less than or equ...
latmle2 18537	A meet is less than or equ...
latlem12 18538	An element is less than or...
latleeqm1 18539	"Less than or equal to" in...
latleeqm2 18540	"Less than or equal to" in...
latmlem1 18541	Add meet to both sides of ...
latmlem2 18542	Add meet to both sides of ...
latmlem12 18543	Add join to both sides of ...
latnlemlt 18544	Negation of "less than or ...
latnle 18545	Equivalent expressions for...
latmidm 18546	Lattice meet is idempotent...
latabs1 18547	Lattice absorption law. F...
latabs2 18548	Lattice absorption law. F...
latledi 18549	An ortholattice is distrib...
latmlej11 18550	Ordering of a meet and joi...
latmlej12 18551	Ordering of a meet and joi...
latmlej21 18552	Ordering of a meet and joi...
latmlej22 18553	Ordering of a meet and joi...
lubsn 18554	The least upper bound of a...
latjass 18555	Lattice join is associativ...
latj12 18556	Swap 1st and 2nd members o...
latj32 18557	Swap 2nd and 3rd members o...
latj13 18558	Swap 1st and 3rd members o...
latj31 18559	Swap 2nd and 3rd members o...
latjrot 18560	Rotate lattice join of 3 c...
latj4 18561	Rearrangement of lattice j...
latj4rot 18562	Rotate lattice join of 4 c...
latjjdi 18563	Lattice join distributes o...
latjjdir 18564	Lattice join distributes o...
mod1ile 18565	The weak direction of the ...
mod2ile 18566	The weak direction of the ...
latmass 18567	Lattice meet is associativ...
latdisdlem 18568	Lemma for ~ latdisd . (Co...
latdisd 18569	In a lattice, joins distri...
isclat 18572	The predicate "is a comple...
clatpos 18573	A complete lattice is a po...
clatlem 18574	Lemma for properties of a ...
clatlubcl 18575	Any subset of the base set...
clatlubcl2 18576	Any subset of the base set...
clatglbcl 18577	Any subset of the base set...
clatglbcl2 18578	Any subset of the base set...
oduclatb 18579	Being a complete lattice i...
clatl 18580	A complete lattice is a la...
isglbd 18581	Properties that determine ...
lublem 18582	Lemma for the least upper ...
lubub 18583	The LUB of a complete latt...
lubl 18584	The LUB of a complete latt...
lubss 18585	Subset law for least upper...
lubel 18586	An element of a set is les...
lubun 18587	The LUB of a union. (Cont...
clatglb 18588	Properties of greatest low...
clatglble 18589	The greatest lower bound i...
clatleglb 18590	Two ways of expressing "le...
clatglbss 18591	Subset law for greatest lo...
isdlat 18594	Property of being a distri...
dlatmjdi 18595	In a distributive lattice,...
dlatl 18596	A distributive lattice is ...
odudlatb 18597	The dual of a distributive...
dlatjmdi 18598	In a distributive lattice,...
ipostr 18601	The structure of ~ df-ipo ...
ipoval 18602	Value of the inclusion pos...
ipobas 18603	Base set of the inclusion ...
ipolerval 18604	Relation of the inclusion ...
ipotset 18605	Topology of the inclusion ...
ipole 18606	Weak order condition of th...
ipolt 18607	Strict order condition of ...
ipopos 18608	The inclusion poset on a f...
isipodrs 18609	Condition for a family of ...
ipodrscl 18610	Direction by inclusion as ...
ipodrsfi 18611	Finite upper bound propert...
fpwipodrs 18612	The finite subsets of any ...
ipodrsima 18613	The monotone image of a di...
isacs3lem 18614	An algebraic closure syste...
acsdrsel 18615	An algebraic closure syste...
isacs4lem 18616	In a closure system in whi...
isacs5lem 18617	If closure commutes with d...
acsdrscl 18618	In an algebraic closure sy...
acsficl 18619	A closure in an algebraic ...
isacs5 18620	A closure system is algebr...
isacs4 18621	A closure system is algebr...
isacs3 18622	A closure system is algebr...
acsficld 18623	In an algebraic closure sy...
acsficl2d 18624	In an algebraic closure sy...
acsfiindd 18625	In an algebraic closure sy...
acsmapd 18626	In an algebraic closure sy...
acsmap2d 18627	In an algebraic closure sy...
acsinfd 18628	In an algebraic closure sy...
acsdomd 18629	In an algebraic closure sy...
acsinfdimd 18630	In an algebraic closure sy...
acsexdimd 18631	In an algebraic closure sy...
mrelatglb 18632	Greatest lower bounds in a...
mrelatglb0 18633	The empty intersection in ...
mrelatlub 18634	Least upper bounds in a Mo...
mreclatBAD 18635	A Moore space is a complet...
isps 18640	The predicate "is a poset"...
psrel 18641	A poset is a relation. (C...
psref2 18642	A poset is antisymmetric a...
pstr2 18643	A poset is transitive. (C...
pslem 18644	Lemma for ~ psref and othe...
psdmrn 18645	The domain and range of a ...
psref 18646	A poset is reflexive. (Co...
psrn 18647	The range of a poset equal...
psasym 18648	A poset is antisymmetric. ...
pstr 18649	A poset is transitive. (C...
cnvps 18650	The converse of a poset is...
cnvpsb 18651	The converse of a poset is...
psss 18652	Any subset of a partially ...
psssdm2 18653	Field of a subposet. (Con...
psssdm 18654	Field of a subposet. (Con...
istsr 18655	The predicate is a toset. ...
istsr2 18656	The predicate is a toset. ...
tsrlin 18657	A toset is a linear order....
tsrlemax 18658	Two ways of saying a numbe...
tsrps 18659	A toset is a poset. (Cont...
cnvtsr 18660	The converse of a toset is...
tsrss 18661	Any subset of a totally or...
ledm 18662	The domain of ` <_ ` is ` ...
lern 18663	The range of ` <_ ` is ` R...
lefld 18664	The field of the 'less or ...
letsr 18665	The "less than or equal to...
isdir 18670	A condition for a relation...
reldir 18671	A direction is a relation....
dirdm 18672	A direction's domain is eq...
dirref 18673	A direction is reflexive. ...
dirtr 18674	A direction is transitive....
dirge 18675	For any two elements of a ...
tsrdir 18676	A totally ordered set is a...
ismgm 18681	The predicate "is a magma"...
ismgmn0 18682	The predicate "is a magma"...
mgmcl 18683	Closure of the operation o...
isnmgm 18684	A condition for a structur...
mgmsscl 18685	If the base set of a magma...
plusffval 18686	The group addition operati...
plusfval 18687	The group addition operati...
plusfeq 18688	If the addition operation ...
plusffn 18689	The group addition operati...
mgmplusf 18690	The group addition functio...
mgmpropd 18691	If two structures have the...
ismgmd 18692	Deduce a magma from its pr...
issstrmgm 18693	Characterize a substructur...
intopsn 18694	The internal operation for...
mgmb1mgm1 18695	The only magma with a base...
mgm0 18696	Any set with an empty base...
mgm0b 18697	The structure with an empt...
mgm1 18698	The structure with one ele...
opifismgm 18699	A structure with a group a...
mgmidmo 18700	A two-sided identity eleme...
grpidval 18701	The value of the identity ...
grpidpropd 18702	If two structures have the...
fn0g 18703	The group zero extractor i...
0g0 18704	The identity element funct...
ismgmid 18705	The identity element of a ...
mgmidcl 18706	The identity element of a ...
mgmlrid 18707	The identity element of a ...
ismgmid2 18708	Show that a given element ...
lidrideqd 18709	If there is a left and rig...
lidrididd 18710	If there is a left and rig...
grpidd 18711	Deduce the identity elemen...
mgmidsssn0 18712	Property of the set of ide...
grpinvalem 18713	Lemma for ~ grpinva . (Co...
grpinva 18714	Deduce right inverse from ...
grprida 18715	Deduce right identity from...
gsumvalx 18716	Expand out the substitutio...
gsumval 18717	Expand out the substitutio...
gsumpropd 18718	The group sum depends only...
gsumpropd2lem 18719	Lemma for ~ gsumpropd2 . ...
gsumpropd2 18720	A stronger version of ~ gs...
gsummgmpropd 18721	A stronger version of ~ gs...
gsumress 18722	The group sum in a substru...
gsumval1 18723	Value of the group sum ope...
gsum0 18724	Value of the empty group s...
gsumval2a 18725	Value of the group sum ope...
gsumval2 18726	Value of the group sum ope...
gsumsplit1r 18727	Splitting off the rightmos...
gsumprval 18728	Value of the group sum ope...
gsumpr12val 18729	Value of the group sum ope...
mgmhmrcl 18734	Reverse closure of a magma...
submgmrcl 18735	Reverse closure for submag...
ismgmhm 18736	Property of a magma homomo...
mgmhmf 18737	A magma homomorphism is a ...
mgmhmpropd 18738	Magma homomorphism depends...
mgmhmlin 18739	A magma homomorphism prese...
mgmhmf1o 18740	A magma homomorphism is bi...
idmgmhm 18741	The identity homomorphism ...
issubmgm 18742	Expand definition of a sub...
issubmgm2 18743	Submagmas are subsets that...
rabsubmgmd 18744	Deduction for proving that...
submgmss 18745	Submagmas are subsets of t...
submgmid 18746	Every magma is trivially a...
submgmcl 18747	Submagmas are closed under...
submgmmgm 18748	Submagmas are themselves m...
submgmbas 18749	The base set of a submagma...
subsubmgm 18750	A submagma of a submagma i...
resmgmhm 18751	Restriction of a magma hom...
resmgmhm2 18752	One direction of ~ resmgmh...
resmgmhm2b 18753	Restriction of the codomai...
mgmhmco 18754	The composition of magma h...
mgmhmima 18755	The homomorphic image of a...
mgmhmeql 18756	The equalizer of two magma...
submgmacs 18757	Submagmas are an algebraic...
issgrp 18760	The predicate "is a semigr...
issgrpv 18761	The predicate "is a semigr...
issgrpn0 18762	The predicate "is a semigr...
isnsgrp 18763	A condition for a structur...
sgrpmgm 18764	A semigroup is a magma. (...
sgrpass 18765	A semigroup operation is a...
sgrpcl 18766	Closure of the operation o...
sgrp0 18767	Any set with an empty base...
sgrp0b 18768	The structure with an empt...
sgrp1 18769	The structure with one ele...
issgrpd 18770	Deduce a semigroup from it...
sgrppropd 18771	If two structures are sets...
prdsplusgsgrpcl 18772	Structure product pointwis...
prdssgrpd 18773	The product of a family of...
ismnddef 18776	The predicate "is a monoid...
ismnd 18777	The predicate "is a monoid...
isnmnd 18778	A condition for a structur...
sgrpidmnd 18779	A semigroup with an identi...
mndsgrp 18780	A monoid is a semigroup. ...
mndmgm 18781	A monoid is a magma. (Con...
mndcl 18782	Closure of the operation o...
mndass 18783	A monoid operation is asso...
mndid 18784	A monoid has a two-sided i...
mndideu 18785	The two-sided identity ele...
mnd32g 18786	Commutative/associative la...
mnd12g 18787	Commutative/associative la...
mnd4g 18788	Commutative/associative la...
mndidcl 18789	The identity element of a ...
mndbn0 18790	The base set of a monoid i...
hashfinmndnn 18791	A finite monoid has positi...
mndplusf 18792	The group addition operati...
mndlrid 18793	A monoid's identity elemen...
mndlid 18794	The identity element of a ...
mndrid 18795	The identity element of a ...
ismndd 18796	Deduce a monoid from its p...
mndpfo 18797	The addition operation of ...
mndfo 18798	The addition operation of ...
mndpropd 18799	If two structures have the...
mndprop 18800	If two structures have the...
issubmnd 18801	Characterize a submonoid b...
ress0g 18802	` 0g ` is unaffected by re...
submnd0 18803	The zero of a submonoid is...
mndinvmod 18804	Uniqueness of an inverse e...
prdsplusgcl 18805	Structure product pointwis...
prdsidlem 18806	Characterization of identi...
prdsmndd 18807	The product of a family of...
prds0g 18808	Zero in a product of monoi...
pwsmnd 18809	The structure power of a m...
pws0g 18810	Zero in a structure power ...
imasmnd2 18811	The image structure of a m...
imasmnd 18812	The image structure of a m...
imasmndf1 18813	The image of a monoid unde...
xpsmnd 18814	The binary product of mono...
xpsmnd0 18815	The identity element of a ...
mnd1 18816	The (smallest) structure r...
mnd1id 18817	The singleton element of a...
ismhm 18822	Property of a monoid homom...
ismhmd 18823	Deduction version of ~ ism...
mhmrcl1 18824	Reverse closure of a monoi...
mhmrcl2 18825	Reverse closure of a monoi...
mhmf 18826	A monoid homomorphism is a...
ismhm0 18827	Property of a monoid homom...
mhmismgmhm 18828	Each monoid homomorphism i...
mhmpropd 18829	Monoid homomorphism depend...
mhmlin 18830	A monoid homomorphism comm...
mhm0 18831	A monoid homomorphism pres...
idmhm 18832	The identity homomorphism ...
mhmf1o 18833	A monoid homomorphism is b...
mndvcl 18834	Tuple-wise additive closur...
mndvass 18835	Tuple-wise associativity i...
mndvlid 18836	Tuple-wise left identity i...
mndvrid 18837	Tuple-wise right identity ...
mhmvlin 18838	Tuple extension of monoid ...
submrcl 18839	Reverse closure for submon...
issubm 18840	Expand definition of a sub...
issubm2 18841	Submonoids are subsets tha...
issubmndb 18842	The submonoid predicate. ...
issubmd 18843	Deduction for proving a su...
mndissubm 18844	If the base set of a monoi...
resmndismnd 18845	If the base set of a monoi...
submss 18846	Submonoids are subsets of ...
submid 18847	Every monoid is trivially ...
subm0cl 18848	Submonoids contain zero. ...
submcl 18849	Submonoids are closed unde...
submmnd 18850	Submonoids are themselves ...
submbas 18851	The base set of a submonoi...
subm0 18852	Submonoids have the same i...
subsubm 18853	A submonoid of a submonoid...
0subm 18854	The zero submonoid of an a...
insubm 18855	The intersection of two su...
0mhm 18856	The constant zero linear f...
resmhm 18857	Restriction of a monoid ho...
resmhm2 18858	One direction of ~ resmhm2...
resmhm2b 18859	Restriction of the codomai...
mhmco 18860	The composition of monoid ...
mhmimalem 18861	Lemma for ~ mhmima and sim...
mhmima 18862	The homomorphic image of a...
mhmeql 18863	The equalizer of two monoi...
submacs 18864	Submonoids are an algebrai...
mndind 18865	Induction in a monoid. In...
prdspjmhm 18866	A projection from a produc...
pwspjmhm 18867	A projection from a struct...
pwsdiagmhm 18868	Diagonal monoid homomorphi...
pwsco1mhm 18869	Right composition with a f...
pwsco2mhm 18870	Left composition with a mo...
gsumvallem2 18871	Lemma for properties of th...
gsumsubm 18872	Evaluate a group sum in a ...
gsumz 18873	Value of a group sum over ...
gsumwsubmcl 18874	Closure of the composite i...
gsumws1 18875	A singleton composite reco...
gsumwcl 18876	Closure of the composite o...
gsumsgrpccat 18877	Homomorphic property of no...
gsumccat 18878	Homomorphic property of co...
gsumws2 18879	Valuation of a pair in a m...
gsumccatsn 18880	Homomorphic property of co...
gsumspl 18881	The primary purpose of the...
gsumwmhm 18882	Behavior of homomorphisms ...
gsumwspan 18883	The submonoid generated by...
frmdval 18888	Value of the free monoid c...
frmdbas 18889	The base set of a free mon...
frmdelbas 18890	An element of the base set...
frmdplusg 18891	The monoid operation of a ...
frmdadd 18892	Value of the monoid operat...
vrmdfval 18893	The canonical injection fr...
vrmdval 18894	The value of the generatin...
vrmdf 18895	The mapping from the index...
frmdmnd 18896	A free monoid is a monoid....
frmd0 18897	The identity of the free m...
frmdsssubm 18898	The set of words taking va...
frmdgsum 18899	Any word in a free monoid ...
frmdss2 18900	A subset of generators is ...
frmdup1 18901	Any assignment of the gene...
frmdup2 18902	The evaluation map has the...
frmdup3lem 18903	Lemma for ~ frmdup3 . (Co...
frmdup3 18904	Universal property of the ...
efmnd 18907	The monoid of endofunction...
efmndbas 18908	The base set of the monoid...
efmndbasabf 18909	The base set of the monoid...
elefmndbas 18910	Two ways of saying a funct...
elefmndbas2 18911	Two ways of saying a funct...
efmndbasf 18912	Elements in the monoid of ...
efmndhash 18913	The monoid of endofunction...
efmndbasfi 18914	The monoid of endofunction...
efmndfv 18915	The function value of an e...
efmndtset 18916	The topology of the monoid...
efmndplusg 18917	The group operation of a m...
efmndov 18918	The value of the group ope...
efmndcl 18919	The group operation of the...
efmndtopn 18920	The topology of the monoid...
symggrplem 18921	Lemma for ~ symggrp and ~ ...
efmndmgm 18922	The monoid of endofunction...
efmndsgrp 18923	The monoid of endofunction...
ielefmnd 18924	The identity function rest...
efmndid 18925	The identity function rest...
efmndmnd 18926	The monoid of endofunction...
efmnd0nmnd 18927	Even the monoid of endofun...
efmndbas0 18928	The base set of the monoid...
efmnd1hash 18929	The monoid of endofunction...
efmnd1bas 18930	The monoid of endofunction...
efmnd2hash 18931	The monoid of endofunction...
submefmnd 18932	If the base set of a monoi...
sursubmefmnd 18933	The set of surjective endo...
injsubmefmnd 18934	The set of injective endof...
idressubmefmnd 18935	The singleton containing o...
idresefmnd 18936	The structure with the sin...
smndex1ibas 18937	The modulo function ` I ` ...
smndex1iidm 18938	The modulo function ` I ` ...
smndex1gbas 18939	The constant functions ` (...
smndex1gid 18940	The composition of a const...
smndex1igid 18941	The composition of the mod...
smndex1basss 18942	The modulo function ` I ` ...
smndex1bas 18943	The base set of the monoid...
smndex1mgm 18944	The monoid of endofunction...
smndex1sgrp 18945	The monoid of endofunction...
smndex1mndlem 18946	Lemma for ~ smndex1mnd and...
smndex1mnd 18947	The monoid of endofunction...
smndex1id 18948	The modulo function ` I ` ...
smndex1n0mnd 18949	The identity of the monoid...
nsmndex1 18950	The base set ` B ` of the ...
smndex2dbas 18951	The doubling function ` D ...
smndex2dnrinv 18952	The doubling function ` D ...
smndex2hbas 18953	The halving functions ` H ...
smndex2dlinvh 18954	The halving functions ` H ...
mgm2nsgrplem1 18955	Lemma 1 for ~ mgm2nsgrp : ...
mgm2nsgrplem2 18956	Lemma 2 for ~ mgm2nsgrp . ...
mgm2nsgrplem3 18957	Lemma 3 for ~ mgm2nsgrp . ...
mgm2nsgrplem4 18958	Lemma 4 for ~ mgm2nsgrp : ...
mgm2nsgrp 18959	A small magma (with two el...
sgrp2nmndlem1 18960	Lemma 1 for ~ sgrp2nmnd : ...
sgrp2nmndlem2 18961	Lemma 2 for ~ sgrp2nmnd . ...
sgrp2nmndlem3 18962	Lemma 3 for ~ sgrp2nmnd . ...
sgrp2rid2 18963	A small semigroup (with tw...
sgrp2rid2ex 18964	A small semigroup (with tw...
sgrp2nmndlem4 18965	Lemma 4 for ~ sgrp2nmnd : ...
sgrp2nmndlem5 18966	Lemma 5 for ~ sgrp2nmnd : ...
sgrp2nmnd 18967	A small semigroup (with tw...
mgmnsgrpex 18968	There is a magma which is ...
sgrpnmndex 18969	There is a semigroup which...
sgrpssmgm 18970	The class of all semigroup...
mndsssgrp 18971	The class of all monoids i...
pwmndgplus 18972	The operation of the monoi...
pwmndid 18973	The identity of the monoid...
pwmnd 18974	The power set of a class `...
isgrp 18981	The predicate "is a group"...
grpmnd 18982	A group is a monoid. (Con...
grpcl 18983	Closure of the operation o...
grpass 18984	A group operation is assoc...
grpinvex 18985	Every member of a group ha...
grpideu 18986	The two-sided identity ele...
grpassd 18987	A group operation is assoc...
grpmndd 18988	A group is a monoid. (Con...
grpcld 18989	Closure of the operation o...
grpplusf 18990	The group addition operati...
grpplusfo 18991	The group addition operati...
resgrpplusfrn 18992	The underlying set of a gr...
grppropd 18993	If two structures have the...
grpprop 18994	If two structures have the...
grppropstr 18995	Generalize a specific 2-el...
grpss 18996	Show that a structure exte...
isgrpd2e 18997	Deduce a group from its pr...
isgrpd2 18998	Deduce a group from its pr...
isgrpde 18999	Deduce a group from its pr...
isgrpd 19000	Deduce a group from its pr...
isgrpi 19001	Properties that determine ...
grpsgrp 19002	A group is a semigroup. (...
grpmgmd 19003	A group is a magma, deduct...
dfgrp2 19004	Alternate definition of a ...
dfgrp2e 19005	Alternate definition of a ...
isgrpix 19006	Properties that determine ...
grpidcl 19007	The identity element of a ...
grpbn0 19008	The base set of a group is...
grplid 19009	The identity element of a ...
grprid 19010	The identity element of a ...
grplidd 19011	The identity element of a ...
grpridd 19012	The identity element of a ...
grpn0 19013	A group is not empty. (Co...
hashfingrpnn 19014	A finite group has positiv...
grprcan 19015	Right cancellation law for...
grpinveu 19016	The left inverse element o...
grpid 19017	Two ways of saying that an...
isgrpid2 19018	Properties showing that an...
grpidd2 19019	Deduce the identity elemen...
grpinvfval 19020	The inverse function of a ...
grpinvfvalALT 19021	Shorter proof of ~ grpinvf...
grpinvval 19022	The inverse of a group ele...
grpinvfn 19023	Functionality of the group...
grpinvfvi 19024	The group inverse function...
grpsubfval 19025	Group subtraction (divisio...
grpsubfvalALT 19026	Shorter proof of ~ grpsubf...
grpsubval 19027	Group subtraction (divisio...
grpinvf 19028	The group inversion operat...
grpinvcl 19029	A group element's inverse ...
grpinvcld 19030	A group element's inverse ...
grplinv 19031	The left inverse of a grou...
grprinv 19032	The right inverse of a gro...
grpinvid1 19033	The inverse of a group ele...
grpinvid2 19034	The inverse of a group ele...
isgrpinv 19035	Properties showing that a ...
grplinvd 19036	The left inverse of a grou...
grprinvd 19037	The right inverse of a gro...
grplrinv 19038	In a group, every member h...
grpidinv2 19039	A group's properties using...
grpidinv 19040	A group has a left and rig...
grpinvid 19041	The inverse of the identit...
grplcan 19042	Left cancellation law for ...
grpasscan1 19043	An associative cancellatio...
grpasscan2 19044	An associative cancellatio...
grpidrcan 19045	If right adding an element...
grpidlcan 19046	If left adding an element ...
grpinvinv 19047	Double inverse law for gro...
grpinvcnv 19048	The group inverse is its o...
grpinv11 19049	The group inverse is one-t...
grpinv11OLD 19050	Obsolete version of ~ grpi...
grpinvf1o 19051	The group inverse is a one...
grpinvnz 19052	The inverse of a nonzero g...
grpinvnzcl 19053	The inverse of a nonzero g...
grpsubinv 19054	Subtraction of an inverse....
grplmulf1o 19055	Left multiplication by a g...
grpraddf1o 19056	Right addition by a group ...
grpinvpropd 19057	If two structures have the...
grpidssd 19058	If the base set of a group...
grpinvssd 19059	If the base set of a group...
grpinvadd 19060	The inverse of the group o...
grpsubf 19061	Functionality of group sub...
grpsubcl 19062	Closure of group subtracti...
grpsubrcan 19063	Right cancellation law for...
grpinvsub 19064	Inverse of a group subtrac...
grpinvval2 19065	A ~ df-neg -like equation ...
grpsubid 19066	Subtraction of a group ele...
grpsubid1 19067	Subtraction of the identit...
grpsubeq0 19068	If the difference between ...
grpsubadd0sub 19069	Subtraction expressed as a...
grpsubadd 19070	Relationship between group...
grpsubsub 19071	Double group subtraction. ...
grpaddsubass 19072	Associative-type law for g...
grppncan 19073	Cancellation law for subtr...
grpnpcan 19074	Cancellation law for subtr...
grpsubsub4 19075	Double group subtraction (...
grppnpcan2 19076	Cancellation law for mixed...
grpnpncan 19077	Cancellation law for group...
grpnpncan0 19078	Cancellation law for group...
grpnnncan2 19079	Cancellation law for group...
dfgrp3lem 19080	Lemma for ~ dfgrp3 . (Con...
dfgrp3 19081	Alternate definition of a ...
dfgrp3e 19082	Alternate definition of a ...
grplactfval 19083	The left group action of e...
grplactval 19084	The value of the left grou...
grplactcnv 19085	The left group action of e...
grplactf1o 19086	The left group action of e...
grpsubpropd 19087	Weak property deduction fo...
grpsubpropd2 19088	Strong property deduction ...
grp1 19089	The (smallest) structure r...
grp1inv 19090	The inverse function of th...
prdsinvlem 19091	Characterization of invers...
prdsgrpd 19092	The product of a family of...
prdsinvgd 19093	Negation in a product of g...
pwsgrp 19094	A structure power of a gro...
pwsinvg 19095	Negation in a group power....
pwssub 19096	Subtraction in a group pow...
imasgrp2 19097	The image structure of a g...
imasgrp 19098	The image structure of a g...
imasgrpf1 19099	The image of a group under...
qusgrp2 19100	Prove that a quotient stru...
xpsgrp 19101	The binary product of grou...
xpsinv 19102	Value of the negation oper...
xpsgrpsub 19103	Value of the subtraction o...
mhmlem 19104	Lemma for ~ mhmmnd and ~ g...
mhmid 19105	A surjective monoid morphi...
mhmmnd 19106	The image of a monoid ` G ...
mhmfmhm 19107	The function fulfilling th...
ghmgrp 19108	The image of a group ` G `...
mulgfval 19111	Group multiple (exponentia...
mulgfvalALT 19112	Shorter proof of ~ mulgfva...
mulgval 19113	Value of the group multipl...
mulgfn 19114	Functionality of the group...
mulgfvi 19115	The group multiple operati...
mulg0 19116	Group multiple (exponentia...
mulgnn 19117	Group multiple (exponentia...
ressmulgnn 19118	Values for the group multi...
ressmulgnn0 19119	Values for the group multi...
ressmulgnnd 19120	Values for the group multi...
mulgnngsum 19121	Group multiple (exponentia...
mulgnn0gsum 19122	Group multiple (exponentia...
mulg1 19123	Group multiple (exponentia...
mulgnnp1 19124	Group multiple (exponentia...
mulg2 19125	Group multiple (exponentia...
mulgnegnn 19126	Group multiple (exponentia...
mulgnn0p1 19127	Group multiple (exponentia...
mulgnnsubcl 19128	Closure of the group multi...
mulgnn0subcl 19129	Closure of the group multi...
mulgsubcl 19130	Closure of the group multi...
mulgnncl 19131	Closure of the group multi...
mulgnn0cl 19132	Closure of the group multi...
mulgcl 19133	Closure of the group multi...
mulgneg 19134	Group multiple (exponentia...
mulgnegneg 19135	The inverse of a negative ...
mulgm1 19136	Group multiple (exponentia...
mulgnn0cld 19137	Closure of the group multi...
mulgcld 19138	Deduction associated with ...
mulgaddcomlem 19139	Lemma for ~ mulgaddcom . ...
mulgaddcom 19140	The group multiple operato...
mulginvcom 19141	The group multiple operato...
mulginvinv 19142	The group multiple operato...
mulgnn0z 19143	A group multiple of the id...
mulgz 19144	A group multiple of the id...
mulgnndir 19145	Sum of group multiples, fo...
mulgnn0dir 19146	Sum of group multiples, ge...
mulgdirlem 19147	Lemma for ~ mulgdir . (Co...
mulgdir 19148	Sum of group multiples, ge...
mulgp1 19149	Group multiple (exponentia...
mulgneg2 19150	Group multiple (exponentia...
mulgnnass 19151	Product of group multiples...
mulgnn0ass 19152	Product of group multiples...
mulgass 19153	Product of group multiples...
mulgassr 19154	Reversed product of group ...
mulgmodid 19155	Casting out multiples of t...
mulgsubdir 19156	Distribution of group mult...
mhmmulg 19157	A homomorphism of monoids ...
mulgpropd 19158	Two structures with the sa...
submmulgcl 19159	Closure of the group multi...
submmulg 19160	A group multiple is the sa...
pwsmulg 19161	Value of a group multiple ...
issubg 19168	The subgroup predicate. (...
subgss 19169	A subgroup is a subset. (...
subgid 19170	A group is a subgroup of i...
subggrp 19171	A subgroup is a group. (C...
subgbas 19172	The base of the restricted...
subgrcl 19173	Reverse closure for the su...
subg0 19174	A subgroup of a group must...
subginv 19175	The inverse of an element ...
subg0cl 19176	The group identity is an e...
subginvcl 19177	The inverse of an element ...
subgcl 19178	A subgroup is closed under...
subgsubcl 19179	A subgroup is closed under...
subgsub 19180	The subtraction of element...
subgmulgcl 19181	Closure of the group multi...
subgmulg 19182	A group multiple is the sa...
issubg2 19183	Characterize the subgroups...
issubgrpd2 19184	Prove a subgroup by closur...
issubgrpd 19185	Prove a subgroup by closur...
issubg3 19186	A subgroup is a symmetric ...
issubg4 19187	A subgroup is a nonempty s...
grpissubg 19188	If the base set of a group...
resgrpisgrp 19189	If the base set of a group...
subgsubm 19190	A subgroup is a submonoid....
subsubg 19191	A subgroup of a subgroup i...
subgint 19192	The intersection of a none...
0subg 19193	The zero subgroup of an ar...
0subgOLD 19194	Obsolete version of ~ 0sub...
trivsubgd 19195	The only subgroup of a tri...
trivsubgsnd 19196	The only subgroup of a tri...
isnsg 19197	Property of being a normal...
isnsg2 19198	Weaken the condition of ~ ...
nsgbi 19199	Defining property of a nor...
nsgsubg 19200	A normal subgroup is a sub...
nsgconj 19201	The conjugation of an elem...
isnsg3 19202	A subgroup is normal iff t...
subgacs 19203	Subgroups are an algebraic...
nsgacs 19204	Normal subgroups form an a...
elnmz 19205	Elementhood in the normali...
nmzbi 19206	Defining property of the n...
nmzsubg 19207	The normalizer N_G(S) of a...
ssnmz 19208	A subgroup is a subset of ...
isnsg4 19209	A subgroup is normal iff i...
nmznsg 19210	Any subgroup is a normal s...
0nsg 19211	The zero subgroup is norma...
nsgid 19212	The whole group is a norma...
0idnsgd 19213	The whole group and the ze...
trivnsgd 19214	The only normal subgroup o...
triv1nsgd 19215	A trivial group has exactl...
1nsgtrivd 19216	A group with exactly one n...
releqg 19217	The left coset equivalence...
eqgfval 19218	Value of the subgroup left...
eqgval 19219	Value of the subgroup left...
eqger 19220	The subgroup coset equival...
eqglact 19221	A left coset can be expres...
eqgid 19222	The left coset containing ...
eqgen 19223	Each coset is equipotent t...
eqgcpbl 19224	The subgroup coset equival...
eqg0el 19225	Equivalence class of a quo...
quselbas 19226	Membership in the base set...
quseccl0 19227	Closure of the quotient ma...
qusgrp 19228	If ` Y ` is a normal subgr...
quseccl 19229	Closure of the quotient ma...
qusadd 19230	Value of the group operati...
qus0 19231	Value of the group identit...
qusinv 19232	Value of the group inverse...
qussub 19233	Value of the group subtrac...
ecqusaddd 19234	Addition of equivalence cl...
ecqusaddcl 19235	Closure of the addition in...
lagsubg2 19236	Lagrange's theorem for fin...
lagsubg 19237	Lagrange's theorem for Gro...
eqg0subg 19238	The coset equivalence rela...
eqg0subgecsn 19239	The equivalence classes mo...
qus0subgbas 19240	The base set of a quotient...
qus0subgadd 19241	The addition in a quotient...
cycsubmel 19242	Characterization of an ele...
cycsubmcl 19243	The set of nonnegative int...
cycsubm 19244	The set of nonnegative int...
cyccom 19245	Condition for an operation...
cycsubmcom 19246	The operation of a monoid ...
cycsubggend 19247	The cyclic subgroup genera...
cycsubgcl 19248	The set of integer powers ...
cycsubgss 19249	The cyclic subgroup genera...
cycsubg 19250	The cyclic group generated...
cycsubgcld 19251	The cyclic subgroup genera...
cycsubg2 19252	The subgroup generated by ...
cycsubg2cl 19253	Any multiple of an element...
reldmghm 19256	Lemma for group homomorphi...
isghm 19257	Property of being a homomo...
isghmOLD 19258	Obsolete version of ~ isgh...
isghm3 19259	Property of a group homomo...
ghmgrp1 19260	A group homomorphism is on...
ghmgrp2 19261	A group homomorphism is on...
ghmf 19262	A group homomorphism is a ...
ghmlin 19263	A homomorphism of groups i...
ghmid 19264	A homomorphism of groups p...
ghminv 19265	A homomorphism of groups p...
ghmsub 19266	Linearity of subtraction t...
isghmd 19267	Deduction for a group homo...
ghmmhm 19268	A group homomorphism is a ...
ghmmhmb 19269	Group homomorphisms and mo...
ghmmulg 19270	A group homomorphism prese...
ghmrn 19271	The range of a homomorphis...
0ghm 19272	The constant zero linear f...
idghm 19273	The identity homomorphism ...
resghm 19274	Restriction of a homomorph...
resghm2 19275	One direction of ~ resghm2...
resghm2b 19276	Restriction of the codomai...
ghmghmrn 19277	A group homomorphism from ...
ghmco 19278	The composition of group h...
ghmima 19279	The image of a subgroup un...
ghmpreima 19280	The inverse image of a sub...
ghmeql 19281	The equalizer of two group...
ghmnsgima 19282	The image of a normal subg...
ghmnsgpreima 19283	The inverse image of a nor...
ghmker 19284	The kernel of a homomorphi...
ghmeqker 19285	Two source points map to t...
pwsdiagghm 19286	Diagonal homomorphism into...
f1ghm0to0 19287	If a group homomorphism ` ...
ghmf1 19288	Two ways of saying a group...
kerf1ghm 19289	A group homomorphism ` F `...
ghmf1o 19290	A bijective group homomorp...
conjghm 19291	Conjugation is an automorp...
conjsubg 19292	A conjugated subgroup is a...
conjsubgen 19293	A conjugated subgroup is e...
conjnmz 19294	A subgroup is unchanged un...
conjnmzb 19295	Alternative condition for ...
conjnsg 19296	A normal subgroup is uncha...
qusghm 19297	If ` Y ` is a normal subgr...
ghmpropd 19298	Group homomorphism depends...
gimfn 19303	The group isomorphism func...
isgim 19304	An isomorphism of groups i...
gimf1o 19305	An isomorphism of groups i...
gimghm 19306	An isomorphism of groups i...
isgim2 19307	A group isomorphism is a h...
subggim 19308	Behavior of subgroups unde...
gimcnv 19309	The converse of a group is...
gimco 19310	The composition of group i...
gim0to0 19311	A group isomorphism maps t...
brgic 19312	The relation "is isomorphi...
brgici 19313	Prove isomorphic by an exp...
gicref 19314	Isomorphism is reflexive. ...
giclcl 19315	Isomorphism implies the le...
gicrcl 19316	Isomorphism implies the ri...
gicsym 19317	Isomorphism is symmetric. ...
gictr 19318	Isomorphism is transitive....
gicer 19319	Isomorphism is an equivale...
gicen 19320	Isomorphic groups have equ...
gicsubgen 19321	A less trivial example of ...
ghmqusnsglem1 19322	Lemma for ~ ghmqusnsg . (...
ghmqusnsglem2 19323	Lemma for ~ ghmqusnsg . (...
ghmqusnsg 19324	The mapping ` H ` induced ...
ghmquskerlem1 19325	Lemma for ~ ghmqusker . (...
ghmquskerco 19326	In the case of theorem ~ g...
ghmquskerlem2 19327	Lemma for ~ ghmqusker . (...
ghmquskerlem3 19328	The mapping ` H ` induced ...
ghmqusker 19329	A surjective group homomor...
gicqusker 19330	The image ` H ` of a group...
isga 19333	The predicate "is a (left)...
gagrp 19334	The left argument of a gro...
gaset 19335	The right argument of a gr...
gagrpid 19336	The identity of the group ...
gaf 19337	The mapping of the group a...
gafo 19338	A group action is onto its...
gaass 19339	An "associative" property ...
ga0 19340	The action of a group on t...
gaid 19341	The trivial action of a gr...
subgga 19342	A subgroup acts on its par...
gass 19343	A subset of a group action...
gasubg 19344	The restriction of a group...
gaid2 19345	A group operation is a lef...
galcan 19346	The action of a particular...
gacan 19347	Group inverses cancel in a...
gapm 19348	The action of a particular...
gaorb 19349	The orbit equivalence rela...
gaorber 19350	The orbit equivalence rela...
gastacl 19351	The stabilizer subgroup in...
gastacos 19352	Write the coset relation f...
orbstafun 19353	Existence and uniqueness f...
orbstaval 19354	Value of the function at a...
orbsta 19355	The Orbit-Stabilizer theor...
orbsta2 19356	Relation between the size ...
cntrval 19361	Substitute definition of t...
cntzfval 19362	First level substitution f...
cntzval 19363	Definition substitution fo...
elcntz 19364	Elementhood in the central...
cntzel 19365	Membership in a centralize...
cntzsnval 19366	Special substitution for t...
elcntzsn 19367	Value of the centralizer o...
sscntz 19368	A centralizer expression f...
cntzrcl 19369	Reverse closure for elemen...
cntzssv 19370	The centralizer is uncondi...
cntzi 19371	Membership in a centralize...
elcntr 19372	Elementhood in the center ...
cntrss 19373	The center is a subset of ...
cntri 19374	Defining property of the c...
resscntz 19375	Centralizer in a substruct...
cntzsgrpcl 19376	Centralizers are closed un...
cntz2ss 19377	Centralizers reverse the s...
cntzrec 19378	Reciprocity relationship f...
cntziinsn 19379	Express any centralizer as...
cntzsubm 19380	Centralizers in a monoid a...
cntzsubg 19381	Centralizers in a group ar...
cntzidss 19382	If the elements of ` S ` c...
cntzmhm 19383	Centralizers in a monoid a...
cntzmhm2 19384	Centralizers in a monoid a...
cntrsubgnsg 19385	A central subgroup is norm...
cntrnsg 19386	The center of a group is a...
oppgval 19389	Value of the opposite grou...
oppgplusfval 19390	Value of the addition oper...
oppgplus 19391	Value of the addition oper...
setsplusg 19392	The other components of an...
oppglemOLD 19393	Obsolete version of ~ sets...
oppgbas 19394	Base set of an opposite gr...
oppgbasOLD 19395	Obsolete version of ~ oppg...
oppgtset 19396	Topology of an opposite gr...
oppgtsetOLD 19397	Obsolete version of ~ oppg...
oppgtopn 19398	Topology of an opposite gr...
oppgmnd 19399	The opposite of a monoid i...
oppgmndb 19400	Bidirectional form of ~ op...
oppgid 19401	Zero in a monoid is a symm...
oppggrp 19402	The opposite of a group is...
oppggrpb 19403	Bidirectional form of ~ op...
oppginv 19404	Inverses in a group are a ...
invoppggim 19405	The inverse is an antiauto...
oppggic 19406	Every group is (naturally)...
oppgsubm 19407	Being a submonoid is a sym...
oppgsubg 19408	Being a subgroup is a symm...
oppgcntz 19409	A centralizer in a group i...
oppgcntr 19410	The center of a group is t...
gsumwrev 19411	A sum in an opposite monoi...
symgval 19414	The value of the symmetric...
symgbas 19415	The base set of the symmet...
elsymgbas2 19416	Two ways of saying a funct...
elsymgbas 19417	Two ways of saying a funct...
symgbasf1o 19418	Elements in the symmetric ...
symgbasf 19419	A permutation (element of ...
symgbasmap 19420	A permutation (element of ...
symghash 19421	The symmetric group on ` n...
symgbasfi 19422	The symmetric group on a f...
symgfv 19423	The function value of a pe...
symgfvne 19424	The function values of a p...
symgressbas 19425	The symmetric group on ` A...
symgplusg 19426	The group operation of a s...
symgov 19427	The value of the group ope...
symgcl 19428	The group operation of the...
idresperm 19429	The identity function rest...
symgmov1 19430	For a permutation of a set...
symgmov2 19431	For a permutation of a set...
symgbas0 19432	The base set of the symmet...
symg1hash 19433	The symmetric group on a s...
symg1bas 19434	The symmetric group on a s...
symg2hash 19435	The symmetric group on a (...
symg2bas 19436	The symmetric group on a p...
0symgefmndeq 19437	The symmetric group on the...
snsymgefmndeq 19438	The symmetric group on a s...
symgpssefmnd 19439	For a set ` A ` with more ...
symgvalstruct 19440	The value of the symmetric...
symgvalstructOLD 19441	Obsolete proof of ~ symgva...
symgsubmefmnd 19442	The symmetric group on a s...
symgtset 19443	The topology of the symmet...
symggrp 19444	The symmetric group on a s...
symgid 19445	The group identity element...
symginv 19446	The group inverse in the s...
symgsubmefmndALT 19447	The symmetric group on a s...
galactghm 19448	The currying of a group ac...
lactghmga 19449	The converse of ~ galactgh...
symgtopn 19450	The topology of the symmet...
symgga 19451	The symmetric group induce...
pgrpsubgsymgbi 19452	Every permutation group is...
pgrpsubgsymg 19453	Every permutation group is...
idressubgsymg 19454	The singleton containing o...
idrespermg 19455	The structure with the sin...
cayleylem1 19456	Lemma for ~ cayley . (Con...
cayleylem2 19457	Lemma for ~ cayley . (Con...
cayley 19458	Cayley's Theorem (construc...
cayleyth 19459	Cayley's Theorem (existenc...
symgfix2 19460	If a permutation does not ...
symgextf 19461	The extension of a permuta...
symgextfv 19462	The function value of the ...
symgextfve 19463	The function value of the ...
symgextf1lem 19464	Lemma for ~ symgextf1 . (...
symgextf1 19465	The extension of a permuta...
symgextfo 19466	The extension of a permuta...
symgextf1o 19467	The extension of a permuta...
symgextsymg 19468	The extension of a permuta...
symgextres 19469	The restriction of the ext...
gsumccatsymgsn 19470	Homomorphic property of co...
gsmsymgrfixlem1 19471	Lemma 1 for ~ gsmsymgrfix ...
gsmsymgrfix 19472	The composition of permuta...
fvcosymgeq 19473	The values of two composit...
gsmsymgreqlem1 19474	Lemma 1 for ~ gsmsymgreq ....
gsmsymgreqlem2 19475	Lemma 2 for ~ gsmsymgreq ....
gsmsymgreq 19476	Two combination of permuta...
symgfixelq 19477	A permutation of a set fix...
symgfixels 19478	The restriction of a permu...
symgfixelsi 19479	The restriction of a permu...
symgfixf 19480	The mapping of a permutati...
symgfixf1 19481	The mapping of a permutati...
symgfixfolem1 19482	Lemma 1 for ~ symgfixfo . ...
symgfixfo 19483	The mapping of a permutati...
symgfixf1o 19484	The mapping of a permutati...
f1omvdmvd 19487	A permutation of any class...
f1omvdcnv 19488	A permutation and its inve...
mvdco 19489	Composing two permutations...
f1omvdconj 19490	Conjugation of a permutati...
f1otrspeq 19491	A transposition is charact...
f1omvdco2 19492	If exactly one of two perm...
f1omvdco3 19493	If a point is moved by exa...
pmtrfval 19494	The function generating tr...
pmtrval 19495	A generated transposition,...
pmtrfv 19496	General value of mapping a...
pmtrprfv 19497	In a transposition of two ...
pmtrprfv3 19498	In a transposition of two ...
pmtrf 19499	Functionality of a transpo...
pmtrmvd 19500	A transposition moves prec...
pmtrrn 19501	Transposing two points giv...
pmtrfrn 19502	A transposition (as a kind...
pmtrffv 19503	Mapping of a point under a...
pmtrrn2 19504	For any transposition ther...
pmtrfinv 19505	A transposition function i...
pmtrfmvdn0 19506	A transposition moves at l...
pmtrff1o 19507	A transposition function i...
pmtrfcnv 19508	A transposition function i...
pmtrfb 19509	An intrinsic characterizat...
pmtrfconj 19510	Any conjugate of a transpo...
symgsssg 19511	The symmetric group has su...
symgfisg 19512	The symmetric group has a ...
symgtrf 19513	Transpositions are element...
symggen 19514	The span of the transposit...
symggen2 19515	A finite permutation group...
symgtrinv 19516	To invert a permutation re...
pmtr3ncomlem1 19517	Lemma 1 for ~ pmtr3ncom . ...
pmtr3ncomlem2 19518	Lemma 2 for ~ pmtr3ncom . ...
pmtr3ncom 19519	Transpositions over sets w...
pmtrdifellem1 19520	Lemma 1 for ~ pmtrdifel . ...
pmtrdifellem2 19521	Lemma 2 for ~ pmtrdifel . ...
pmtrdifellem3 19522	Lemma 3 for ~ pmtrdifel . ...
pmtrdifellem4 19523	Lemma 4 for ~ pmtrdifel . ...
pmtrdifel 19524	A transposition of element...
pmtrdifwrdellem1 19525	Lemma 1 for ~ pmtrdifwrdel...
pmtrdifwrdellem2 19526	Lemma 2 for ~ pmtrdifwrdel...
pmtrdifwrdellem3 19527	Lemma 3 for ~ pmtrdifwrdel...
pmtrdifwrdel2lem1 19528	Lemma 1 for ~ pmtrdifwrdel...
pmtrdifwrdel 19529	A sequence of transpositio...
pmtrdifwrdel2 19530	A sequence of transpositio...
pmtrprfval 19531	The transpositions on a pa...
pmtrprfvalrn 19532	The range of the transposi...
psgnunilem1 19537	Lemma for ~ psgnuni . Giv...
psgnunilem5 19538	Lemma for ~ psgnuni . It ...
psgnunilem2 19539	Lemma for ~ psgnuni . Ind...
psgnunilem3 19540	Lemma for ~ psgnuni . Any...
psgnunilem4 19541	Lemma for ~ psgnuni . An ...
m1expaddsub 19542	Addition and subtraction o...
psgnuni 19543	If the same permutation ca...
psgnfval 19544	Function definition of the...
psgnfn 19545	Functionality and domain o...
psgndmsubg 19546	The finitary permutations ...
psgneldm 19547	Property of being a finita...
psgneldm2 19548	The finitary permutations ...
psgneldm2i 19549	A sequence of transpositio...
psgneu 19550	A finitary permutation has...
psgnval 19551	Value of the permutation s...
psgnvali 19552	A finitary permutation has...
psgnvalii 19553	Any representation of a pe...
psgnpmtr 19554	All transpositions are odd...
psgn0fv0 19555	The permutation sign funct...
sygbasnfpfi 19556	The class of non-fixed poi...
psgnfvalfi 19557	Function definition of the...
psgnvalfi 19558	Value of the permutation s...
psgnran 19559	The range of the permutati...
gsmtrcl 19560	The group sum of transposi...
psgnfitr 19561	A permutation of a finite ...
psgnfieu 19562	A permutation of a finite ...
pmtrsn 19563	The value of the transposi...
psgnsn 19564	The permutation sign funct...
psgnprfval 19565	The permutation sign funct...
psgnprfval1 19566	The permutation sign of th...
psgnprfval2 19567	The permutation sign of th...
odfval 19576	Value of the order functio...
odfvalALT 19577	Shorter proof of ~ odfval ...
odval 19578	Second substitution for th...
odlem1 19579	The group element order is...
odcl 19580	The order of a group eleme...
odf 19581	Functionality of the group...
odid 19582	Any element to the power o...
odlem2 19583	Any positive annihilator o...
odmodnn0 19584	Reduce the argument of a g...
mndodconglem 19585	Lemma for ~ mndodcong . (...
mndodcong 19586	If two multipliers are con...
mndodcongi 19587	If two multipliers are con...
oddvdsnn0 19588	The only multiples of ` A ...
odnncl 19589	If a nonzero multiple of a...
odmod 19590	Reduce the argument of a g...
oddvds 19591	The only multiples of ` A ...
oddvdsi 19592	Any group element is annih...
odcong 19593	If two multipliers are con...
odeq 19594	The ~ oddvds property uniq...
odval2 19595	A non-conditional definiti...
odcld 19596	The order of a group eleme...
odm1inv 19597	The (order-1)th multiple o...
odmulgid 19598	A relationship between the...
odmulg2 19599	The order of a multiple di...
odmulg 19600	Relationship between the o...
odmulgeq 19601	A multiple of a point of f...
odbezout 19602	If ` N ` is coprime to the...
od1 19603	The order of the group ide...
odeq1 19604	The group identity is the ...
odinv 19605	The order of the inverse o...
odf1 19606	The multiples of an elemen...
odinf 19607	The multiples of an elemen...
dfod2 19608	An alternative definition ...
odcl2 19609	The order of an element of...
oddvds2 19610	The order of an element of...
finodsubmsubg 19611	A submonoid whose elements...
0subgALT 19612	A shorter proof of ~ 0subg...
submod 19613	The order of an element is...
subgod 19614	The order of an element is...
odsubdvds 19615	The order of an element of...
odf1o1 19616	An element with zero order...
odf1o2 19617	An element with nonzero or...
odhash 19618	An element of zero order g...
odhash2 19619	If an element has nonzero ...
odhash3 19620	An element which generates...
odngen 19621	A cyclic subgroup of size ...
gexval 19622	Value of the exponent of a...
gexlem1 19623	The group element order is...
gexcl 19624	The exponent of a group is...
gexid 19625	Any element to the power o...
gexlem2 19626	Any positive annihilator o...
gexdvdsi 19627	Any group element is annih...
gexdvds 19628	The only ` N ` that annihi...
gexdvds2 19629	An integer divides the gro...
gexod 19630	Any group element is annih...
gexcl3 19631	If the order of every grou...
gexnnod 19632	Every group element has fi...
gexcl2 19633	The exponent of a finite g...
gexdvds3 19634	The exponent of a finite g...
gex1 19635	A group or monoid has expo...
ispgp 19636	A group is a ` P ` -group ...
pgpprm 19637	Reverse closure for the fi...
pgpgrp 19638	Reverse closure for the se...
pgpfi1 19639	A finite group with order ...
pgp0 19640	The identity subgroup is a...
subgpgp 19641	A subgroup of a p-group is...
sylow1lem1 19642	Lemma for ~ sylow1 . The ...
sylow1lem2 19643	Lemma for ~ sylow1 . The ...
sylow1lem3 19644	Lemma for ~ sylow1 . One ...
sylow1lem4 19645	Lemma for ~ sylow1 . The ...
sylow1lem5 19646	Lemma for ~ sylow1 . Usin...
sylow1 19647	Sylow's first theorem. If...
odcau 19648	Cauchy's theorem for the o...
pgpfi 19649	The converse to ~ pgpfi1 ....
pgpfi2 19650	Alternate version of ~ pgp...
pgphash 19651	The order of a p-group. (...
isslw 19652	The property of being a Sy...
slwprm 19653	Reverse closure for the fi...
slwsubg 19654	A Sylow ` P ` -subgroup is...
slwispgp 19655	Defining property of a Syl...
slwpss 19656	A proper superset of a Syl...
slwpgp 19657	A Sylow ` P ` -subgroup is...
pgpssslw 19658	Every ` P ` -subgroup is c...
slwn0 19659	Every finite group contain...
subgslw 19660	A Sylow subgroup that is c...
sylow2alem1 19661	Lemma for ~ sylow2a . An ...
sylow2alem2 19662	Lemma for ~ sylow2a . All...
sylow2a 19663	A named lemma of Sylow's s...
sylow2blem1 19664	Lemma for ~ sylow2b . Eva...
sylow2blem2 19665	Lemma for ~ sylow2b . Lef...
sylow2blem3 19666	Sylow's second theorem. P...
sylow2b 19667	Sylow's second theorem. A...
slwhash 19668	A sylow subgroup has cardi...
fislw 19669	The sylow subgroups of a f...
sylow2 19670	Sylow's second theorem. S...
sylow3lem1 19671	Lemma for ~ sylow3 , first...
sylow3lem2 19672	Lemma for ~ sylow3 , first...
sylow3lem3 19673	Lemma for ~ sylow3 , first...
sylow3lem4 19674	Lemma for ~ sylow3 , first...
sylow3lem5 19675	Lemma for ~ sylow3 , secon...
sylow3lem6 19676	Lemma for ~ sylow3 , secon...
sylow3 19677	Sylow's third theorem. Th...
lsmfval 19682	The subgroup sum function ...
lsmvalx 19683	Subspace sum value (for a ...
lsmelvalx 19684	Subspace sum membership (f...
lsmelvalix 19685	Subspace sum membership (f...
oppglsm 19686	The subspace sum operation...
lsmssv 19687	Subgroup sum is a subset o...
lsmless1x 19688	Subset implies subgroup su...
lsmless2x 19689	Subset implies subgroup su...
lsmub1x 19690	Subgroup sum is an upper b...
lsmub2x 19691	Subgroup sum is an upper b...
lsmval 19692	Subgroup sum value (for a ...
lsmelval 19693	Subgroup sum membership (f...
lsmelvali 19694	Subgroup sum membership (f...
lsmelvalm 19695	Subgroup sum membership an...
lsmelvalmi 19696	Membership of vector subtr...
lsmsubm 19697	The sum of two commuting s...
lsmsubg 19698	The sum of two commuting s...
lsmcom2 19699	Subgroup sum commutes. (C...
smndlsmidm 19700	The direct product is idem...
lsmub1 19701	Subgroup sum is an upper b...
lsmub2 19702	Subgroup sum is an upper b...
lsmunss 19703	Union of subgroups is a su...
lsmless1 19704	Subset implies subgroup su...
lsmless2 19705	Subset implies subgroup su...
lsmless12 19706	Subset implies subgroup su...
lsmidm 19707	Subgroup sum is idempotent...
lsmlub 19708	The least upper bound prop...
lsmss1 19709	Subgroup sum with a subset...
lsmss1b 19710	Subgroup sum with a subset...
lsmss2 19711	Subgroup sum with a subset...
lsmss2b 19712	Subgroup sum with a subset...
lsmass 19713	Subgroup sum is associativ...
mndlsmidm 19714	Subgroup sum is idempotent...
lsm01 19715	Subgroup sum with the zero...
lsm02 19716	Subgroup sum with the zero...
subglsm 19717	The subgroup sum evaluated...
lssnle 19718	Equivalent expressions for...
lsmmod 19719	The modular law holds for ...
lsmmod2 19720	Modular law dual for subgr...
lsmpropd 19721	If two structures have the...
cntzrecd 19722	Commute the "subgroups com...
lsmcntz 19723	The "subgroups commute" pr...
lsmcntzr 19724	The "subgroups commute" pr...
lsmdisj 19725	Disjointness from a subgro...
lsmdisj2 19726	Association of the disjoin...
lsmdisj3 19727	Association of the disjoin...
lsmdisjr 19728	Disjointness from a subgro...
lsmdisj2r 19729	Association of the disjoin...
lsmdisj3r 19730	Association of the disjoin...
lsmdisj2a 19731	Association of the disjoin...
lsmdisj2b 19732	Association of the disjoin...
lsmdisj3a 19733	Association of the disjoin...
lsmdisj3b 19734	Association of the disjoin...
subgdisj1 19735	Vectors belonging to disjo...
subgdisj2 19736	Vectors belonging to disjo...
subgdisjb 19737	Vectors belonging to disjo...
pj1fval 19738	The left projection functi...
pj1val 19739	The left projection functi...
pj1eu 19740	Uniqueness of a left proje...
pj1f 19741	The left projection functi...
pj2f 19742	The right projection funct...
pj1id 19743	Any element of a direct su...
pj1eq 19744	Any element of a direct su...
pj1lid 19745	The left projection functi...
pj1rid 19746	The left projection functi...
pj1ghm 19747	The left projection functi...
pj1ghm2 19748	The left projection functi...
lsmhash 19749	The order of the direct pr...
efgmval 19756	Value of the formal invers...
efgmf 19757	The formal inverse operati...
efgmnvl 19758	The inversion function on ...
efgrcl 19759	Lemma for ~ efgval . (Con...
efglem 19760	Lemma for ~ efgval . (Con...
efgval 19761	Value of the free group co...
efger 19762	Value of the free group co...
efgi 19763	Value of the free group co...
efgi0 19764	Value of the free group co...
efgi1 19765	Value of the free group co...
efgtf 19766	Value of the free group co...
efgtval 19767	Value of the extension fun...
efgval2 19768	Value of the free group co...
efgi2 19769	Value of the free group co...
efgtlen 19770	Value of the free group co...
efginvrel2 19771	The inverse of the reverse...
efginvrel1 19772	The inverse of the reverse...
efgsf 19773	Value of the auxiliary fun...
efgsdm 19774	Elementhood in the domain ...
efgsval 19775	Value of the auxiliary fun...
efgsdmi 19776	Property of the last link ...
efgsval2 19777	Value of the auxiliary fun...
efgsrel 19778	The start and end of any e...
efgs1 19779	A singleton of an irreduci...
efgs1b 19780	Every extension sequence e...
efgsp1 19781	If ` F ` is an extension s...
efgsres 19782	An initial segment of an e...
efgsfo 19783	For any word, there is a s...
efgredlema 19784	The reduced word that form...
efgredlemf 19785	Lemma for ~ efgredleme . ...
efgredlemg 19786	Lemma for ~ efgred . (Con...
efgredleme 19787	Lemma for ~ efgred . (Con...
efgredlemd 19788	The reduced word that form...
efgredlemc 19789	The reduced word that form...
efgredlemb 19790	The reduced word that form...
efgredlem 19791	The reduced word that form...
efgred 19792	The reduced word that form...
efgrelexlema 19793	If two words ` A , B ` are...
efgrelexlemb 19794	If two words ` A , B ` are...
efgrelex 19795	If two words ` A , B ` are...
efgredeu 19796	There is a unique reduced ...
efgred2 19797	Two extension sequences ha...
efgcpbllema 19798	Lemma for ~ efgrelex . De...
efgcpbllemb 19799	Lemma for ~ efgrelex . Sh...
efgcpbl 19800	Two extension sequences ha...
efgcpbl2 19801	Two extension sequences ha...
frgpval 19802	Value of the free group co...
frgpcpbl 19803	Compatibility of the group...
frgp0 19804	The free group is a group....
frgpeccl 19805	Closure of the quotient ma...
frgpgrp 19806	The free group is a group....
frgpadd 19807	Addition in the free group...
frgpinv 19808	The inverse of an element ...
frgpmhm 19809	The "natural map" from wor...
vrgpfval 19810	The canonical injection fr...
vrgpval 19811	The value of the generatin...
vrgpf 19812	The mapping from the index...
vrgpinv 19813	The inverse of a generatin...
frgpuptf 19814	Any assignment of the gene...
frgpuptinv 19815	Any assignment of the gene...
frgpuplem 19816	Any assignment of the gene...
frgpupf 19817	Any assignment of the gene...
frgpupval 19818	Any assignment of the gene...
frgpup1 19819	Any assignment of the gene...
frgpup2 19820	The evaluation map has the...
frgpup3lem 19821	The evaluation map has the...
frgpup3 19822	Universal property of the ...
0frgp 19823	The free group on zero gen...
isabl 19828	The predicate "is an Abeli...
ablgrp 19829	An Abelian group is a grou...
ablgrpd 19830	An Abelian group is a grou...
ablcmn 19831	An Abelian group is a comm...
ablcmnd 19832	An Abelian group is a comm...
iscmn 19833	The predicate "is a commut...
isabl2 19834	The predicate "is an Abeli...
cmnpropd 19835	If two structures have the...
ablpropd 19836	If two structures have the...
ablprop 19837	If two structures have the...
iscmnd 19838	Properties that determine ...
isabld 19839	Properties that determine ...
isabli 19840	Properties that determine ...
cmnmnd 19841	A commutative monoid is a ...
cmncom 19842	A commutative monoid is co...
ablcom 19843	An Abelian group operation...
cmn32 19844	Commutative/associative la...
cmn4 19845	Commutative/associative la...
cmn12 19846	Commutative/associative la...
abl32 19847	Commutative/associative la...
cmnmndd 19848	A commutative monoid is a ...
cmnbascntr 19849	The base set of a commutat...
rinvmod 19850	Uniqueness of a right inve...
ablinvadd 19851	The inverse of an Abelian ...
ablsub2inv 19852	Abelian group subtraction ...
ablsubadd 19853	Relationship between Abeli...
ablsub4 19854	Commutative/associative su...
abladdsub4 19855	Abelian group addition/sub...
abladdsub 19856	Associative-type law for g...
ablsubadd23 19857	Commutative/associative la...
ablsubaddsub 19858	Double subtraction and add...
ablpncan2 19859	Cancellation law for subtr...
ablpncan3 19860	A cancellation law for Abe...
ablsubsub 19861	Law for double subtraction...
ablsubsub4 19862	Law for double subtraction...
ablpnpcan 19863	Cancellation law for mixed...
ablnncan 19864	Cancellation law for group...
ablsub32 19865	Swap the second and third ...
ablnnncan 19866	Cancellation law for group...
ablnnncan1 19867	Cancellation law for group...
ablsubsub23 19868	Swap subtrahend and result...
mulgnn0di 19869	Group multiple of a sum, f...
mulgdi 19870	Group multiple of a sum. ...
mulgmhm 19871	The map from ` x ` to ` n ...
mulgghm 19872	The map from ` x ` to ` n ...
mulgsubdi 19873	Group multiple of a differ...
ghmfghm 19874	The function fulfilling th...
ghmcmn 19875	The image of a commutative...
ghmabl 19876	The image of an abelian gr...
invghm 19877	The inversion map is a gro...
eqgabl 19878	Value of the subgroup cose...
qusecsub 19879	Two subgroup cosets are eq...
subgabl 19880	A subgroup of an abelian g...
subcmn 19881	A submonoid of a commutati...
submcmn 19882	A submonoid of a commutati...
submcmn2 19883	A submonoid is commutative...
cntzcmn 19884	The centralizer of any sub...
cntzcmnss 19885	Any subset in a commutativ...
cntrcmnd 19886	The center of a monoid is ...
cntrabl 19887	The center of a group is a...
cntzspan 19888	If the generators commute,...
cntzcmnf 19889	Discharge the centralizer ...
ghmplusg 19890	The pointwise sum of two l...
ablnsg 19891	Every subgroup of an abeli...
odadd1 19892	The order of a product in ...
odadd2 19893	The order of a product in ...
odadd 19894	The order of a product is ...
gex2abl 19895	A group with exponent 2 (o...
gexexlem 19896	Lemma for ~ gexex . (Cont...
gexex 19897	In an abelian group with f...
torsubg 19898	The set of all elements of...
oddvdssubg 19899	The set of all elements wh...
lsmcomx 19900	Subgroup sum commutes (ext...
ablcntzd 19901	All subgroups in an abelia...
lsmcom 19902	Subgroup sum commutes. (C...
lsmsubg2 19903	The sum of two subgroups i...
lsm4 19904	Commutative/associative la...
prdscmnd 19905	The product of a family of...
prdsabld 19906	The product of a family of...
pwscmn 19907	The structure power on a c...
pwsabl 19908	The structure power on an ...
qusabl 19909	If ` Y ` is a subgroup of ...
abl1 19910	The (smallest) structure r...
abln0 19911	Abelian groups (and theref...
cnaddablx 19912	The complex numbers are an...
cnaddabl 19913	The complex numbers are an...
cnaddid 19914	The group identity element...
cnaddinv 19915	Value of the group inverse...
zaddablx 19916	The integers are an Abelia...
frgpnabllem1 19917	Lemma for ~ frgpnabl . (C...
frgpnabllem2 19918	Lemma for ~ frgpnabl . (C...
frgpnabl 19919	The free group on two or m...
imasabl 19920	The image structure of an ...
iscyg 19923	Definition of a cyclic gro...
iscyggen 19924	The property of being a cy...
iscyggen2 19925	The property of being a cy...
iscyg2 19926	A cyclic group is a group ...
cyggeninv 19927	The inverse of a cyclic ge...
cyggenod 19928	An element is the generato...
cyggenod2 19929	In an infinite cyclic grou...
iscyg3 19930	Definition of a cyclic gro...
iscygd 19931	Definition of a cyclic gro...
iscygodd 19932	Show that a group with an ...
cycsubmcmn 19933	The set of nonnegative int...
cyggrp 19934	A cyclic group is a group....
cygabl 19935	A cyclic group is abelian....
cygctb 19936	A cyclic group is countabl...
0cyg 19937	The trivial group is cycli...
prmcyg 19938	A group with prime order i...
lt6abl 19939	A group with fewer than ` ...
ghmcyg 19940	The image of a cyclic grou...
cyggex2 19941	The exponent of a cyclic g...
cyggex 19942	The exponent of a finite c...
cyggexb 19943	A finite abelian group is ...
giccyg 19944	Cyclicity is a group prope...
cycsubgcyg 19945	The cyclic subgroup genera...
cycsubgcyg2 19946	The cyclic subgroup genera...
gsumval3a 19947	Value of the group sum ope...
gsumval3eu 19948	The group sum as defined i...
gsumval3lem1 19949	Lemma 1 for ~ gsumval3 . ...
gsumval3lem2 19950	Lemma 2 for ~ gsumval3 . ...
gsumval3 19951	Value of the group sum ope...
gsumcllem 19952	Lemma for ~ gsumcl and rel...
gsumzres 19953	Extend a finite group sum ...
gsumzcl2 19954	Closure of a finite group ...
gsumzcl 19955	Closure of a finite group ...
gsumzf1o 19956	Re-index a finite group su...
gsumres 19957	Extend a finite group sum ...
gsumcl2 19958	Closure of a finite group ...
gsumcl 19959	Closure of a finite group ...
gsumf1o 19960	Re-index a finite group su...
gsumreidx 19961	Re-index a finite group su...
gsumzsubmcl 19962	Closure of a group sum in ...
gsumsubmcl 19963	Closure of a group sum in ...
gsumsubgcl 19964	Closure of a group sum in ...
gsumzaddlem 19965	The sum of two group sums....
gsumzadd 19966	The sum of two group sums....
gsumadd 19967	The sum of two group sums....
gsummptfsadd 19968	The sum of two group sums ...
gsummptfidmadd 19969	The sum of two group sums ...
gsummptfidmadd2 19970	The sum of two group sums ...
gsumzsplit 19971	Split a group sum into two...
gsumsplit 19972	Split a group sum into two...
gsumsplit2 19973	Split a group sum into two...
gsummptfidmsplit 19974	Split a group sum expresse...
gsummptfidmsplitres 19975	Split a group sum expresse...
gsummptfzsplit 19976	Split a group sum expresse...
gsummptfzsplitl 19977	Split a group sum expresse...
gsumconst 19978	Sum of a constant series. ...
gsumconstf 19979	Sum of a constant series. ...
gsummptshft 19980	Index shift of a finite gr...
gsumzmhm 19981	Apply a group homomorphism...
gsummhm 19982	Apply a group homomorphism...
gsummhm2 19983	Apply a group homomorphism...
gsummptmhm 19984	Apply a group homomorphism...
gsummulglem 19985	Lemma for ~ gsummulg and ~...
gsummulg 19986	Nonnegative multiple of a ...
gsummulgz 19987	Integer multiple of a grou...
gsumzoppg 19988	The opposite of a group su...
gsumzinv 19989	Inverse of a group sum. (...
gsuminv 19990	Inverse of a group sum. (...
gsummptfidminv 19991	Inverse of a group sum exp...
gsumsub 19992	The difference of two grou...
gsummptfssub 19993	The difference of two grou...
gsummptfidmsub 19994	The difference of two grou...
gsumsnfd 19995	Group sum of a singleton, ...
gsumsnd 19996	Group sum of a singleton, ...
gsumsnf 19997	Group sum of a singleton, ...
gsumsn 19998	Group sum of a singleton. ...
gsumpr 19999	Group sum of a pair. (Con...
gsumzunsnd 20000	Append an element to a fin...
gsumunsnfd 20001	Append an element to a fin...
gsumunsnd 20002	Append an element to a fin...
gsumunsnf 20003	Append an element to a fin...
gsumunsn 20004	Append an element to a fin...
gsumdifsnd 20005	Extract a summand from a f...
gsumpt 20006	Sum of a family that is no...
gsummptf1o 20007	Re-index a finite group su...
gsummptun 20008	Group sum of a disjoint un...
gsummpt1n0 20009	If only one summand in a f...
gsummptif1n0 20010	If only one summand in a f...
gsummptcl 20011	Closure of a finite group ...
gsummptfif1o 20012	Re-index a finite group su...
gsummptfzcl 20013	Closure of a finite group ...
gsum2dlem1 20014	Lemma 1 for ~ gsum2d . (C...
gsum2dlem2 20015	Lemma for ~ gsum2d . (Con...
gsum2d 20016	Write a sum over a two-dim...
gsum2d2lem 20017	Lemma for ~ gsum2d2 : show...
gsum2d2 20018	Write a group sum over a t...
gsumcom2 20019	Two-dimensional commutatio...
gsumxp 20020	Write a group sum over a c...
gsumcom 20021	Commute the arguments of a...
gsumcom3 20022	A commutative law for fini...
gsumcom3fi 20023	A commutative law for fini...
gsumxp2 20024	Write a group sum over a c...
prdsgsum 20025	Finite commutative sums in...
pwsgsum 20026	Finite commutative sums in...
fsfnn0gsumfsffz 20027	Replacing a finitely suppo...
nn0gsumfz 20028	Replacing a finitely suppo...
nn0gsumfz0 20029	Replacing a finitely suppo...
gsummptnn0fz 20030	A final group sum over a f...
gsummptnn0fzfv 20031	A final group sum over a f...
telgsumfzslem 20032	Lemma for ~ telgsumfzs (in...
telgsumfzs 20033	Telescoping group sum rang...
telgsumfz 20034	Telescoping group sum rang...
telgsumfz0s 20035	Telescoping finite group s...
telgsumfz0 20036	Telescoping finite group s...
telgsums 20037	Telescoping finitely suppo...
telgsum 20038	Telescoping finitely suppo...
reldmdprd 20043	The domain of the internal...
dmdprd 20044	The domain of definition o...
dmdprdd 20045	Show that a given family i...
dprddomprc 20046	A family of subgroups inde...
dprddomcld 20047	If a family of subgroups i...
dprdval0prc 20048	The internal direct produc...
dprdval 20049	The value of the internal ...
eldprd 20050	A class ` A ` is an intern...
dprdgrp 20051	Reverse closure for the in...
dprdf 20052	The function ` S ` is a fa...
dprdf2 20053	The function ` S ` is a fa...
dprdcntz 20054	The function ` S ` is a fa...
dprddisj 20055	The function ` S ` is a fa...
dprdw 20056	The property of being a fi...
dprdwd 20057	A mapping being a finitely...
dprdff 20058	A finitely supported funct...
dprdfcl 20059	A finitely supported funct...
dprdffsupp 20060	A finitely supported funct...
dprdfcntz 20061	A function on the elements...
dprdssv 20062	The internal direct produc...
dprdfid 20063	A function mapping all but...
eldprdi 20064	The domain of definition o...
dprdfinv 20065	Take the inverse of a grou...
dprdfadd 20066	Take the sum of group sums...
dprdfsub 20067	Take the difference of gro...
dprdfeq0 20068	The zero function is the o...
dprdf11 20069	Two group sums over a dire...
dprdsubg 20070	The internal direct produc...
dprdub 20071	Each factor is a subset of...
dprdlub 20072	The direct product is smal...
dprdspan 20073	The direct product is the ...
dprdres 20074	Restriction of a direct pr...
dprdss 20075	Create a direct product by...
dprdz 20076	A family consisting entire...
dprd0 20077	The empty family is an int...
dprdf1o 20078	Rearrange the index set of...
dprdf1 20079	Rearrange the index set of...
subgdmdprd 20080	A direct product in a subg...
subgdprd 20081	A direct product in a subg...
dprdsn 20082	A singleton family is an i...
dmdprdsplitlem 20083	Lemma for ~ dmdprdsplit . ...
dprdcntz2 20084	The function ` S ` is a fa...
dprddisj2 20085	The function ` S ` is a fa...
dprd2dlem2 20086	The direct product of a co...
dprd2dlem1 20087	The direct product of a co...
dprd2da 20088	The direct product of a co...
dprd2db 20089	The direct product of a co...
dprd2d2 20090	The direct product of a co...
dmdprdsplit2lem 20091	Lemma for ~ dmdprdsplit . ...
dmdprdsplit2 20092	The direct product splits ...
dmdprdsplit 20093	The direct product splits ...
dprdsplit 20094	The direct product is the ...
dmdprdpr 20095	A singleton family is an i...
dprdpr 20096	A singleton family is an i...
dpjlem 20097	Lemma for theorems about d...
dpjcntz 20098	The two subgroups that app...
dpjdisj 20099	The two subgroups that app...
dpjlsm 20100	The two subgroups that app...
dpjfval 20101	Value of the direct produc...
dpjval 20102	Value of the direct produc...
dpjf 20103	The ` X ` -th index projec...
dpjidcl 20104	The key property of projec...
dpjeq 20105	Decompose a group sum into...
dpjid 20106	The key property of projec...
dpjlid 20107	The ` X ` -th index projec...
dpjrid 20108	The ` Y ` -th index projec...
dpjghm 20109	The direct product is the ...
dpjghm2 20110	The direct product is the ...
ablfacrplem 20111	Lemma for ~ ablfacrp2 . (...
ablfacrp 20112	A finite abelian group who...
ablfacrp2 20113	The factors ` K , L ` of ~...
ablfac1lem 20114	Lemma for ~ ablfac1b . Sa...
ablfac1a 20115	The factors of ~ ablfac1b ...
ablfac1b 20116	Any abelian group is the d...
ablfac1c 20117	The factors of ~ ablfac1b ...
ablfac1eulem 20118	Lemma for ~ ablfac1eu . (...
ablfac1eu 20119	The factorization of ~ abl...
pgpfac1lem1 20120	Lemma for ~ pgpfac1 . (Co...
pgpfac1lem2 20121	Lemma for ~ pgpfac1 . (Co...
pgpfac1lem3a 20122	Lemma for ~ pgpfac1 . (Co...
pgpfac1lem3 20123	Lemma for ~ pgpfac1 . (Co...
pgpfac1lem4 20124	Lemma for ~ pgpfac1 . (Co...
pgpfac1lem5 20125	Lemma for ~ pgpfac1 . (Co...
pgpfac1 20126	Factorization of a finite ...
pgpfaclem1 20127	Lemma for ~ pgpfac . (Con...
pgpfaclem2 20128	Lemma for ~ pgpfac . (Con...
pgpfaclem3 20129	Lemma for ~ pgpfac . (Con...
pgpfac 20130	Full factorization of a fi...
ablfaclem1 20131	Lemma for ~ ablfac . (Con...
ablfaclem2 20132	Lemma for ~ ablfac . (Con...
ablfaclem3 20133	Lemma for ~ ablfac . (Con...
ablfac 20134	The Fundamental Theorem of...
ablfac2 20135	Choose generators for each...
issimpg 20138	The predicate "is a simple...
issimpgd 20139	Deduce a simple group from...
simpggrp 20140	A simple group is a group....
simpggrpd 20141	A simple group is a group....
simpg2nsg 20142	A simple group has two nor...
trivnsimpgd 20143	Trivial groups are not sim...
simpgntrivd 20144	Simple groups are nontrivi...
simpgnideld 20145	A simple group contains a ...
simpgnsgd 20146	The only normal subgroups ...
simpgnsgeqd 20147	A normal subgroup of a sim...
2nsgsimpgd 20148	If any normal subgroup of ...
simpgnsgbid 20149	A nontrivial group is simp...
ablsimpnosubgd 20150	A subgroup of an abelian s...
ablsimpg1gend 20151	An abelian simple group is...
ablsimpgcygd 20152	An abelian simple group is...
ablsimpgfindlem1 20153	Lemma for ~ ablsimpgfind ....
ablsimpgfindlem2 20154	Lemma for ~ ablsimpgfind ....
cycsubggenodd 20155	Relationship between the o...
ablsimpgfind 20156	An abelian simple group is...
fincygsubgd 20157	The subgroup referenced in...
fincygsubgodd 20158	Calculate the order of a s...
fincygsubgodexd 20159	A finite cyclic group has ...
prmgrpsimpgd 20160	A group of prime order is ...
ablsimpgprmd 20161	An abelian simple group ha...
ablsimpgd 20162	An abelian group is simple...
fnmgp 20165	The multiplicative group o...
mgpval 20166	Value of the multiplicatio...
mgpplusg 20167	Value of the group operati...
mgplemOLD 20168	Obsolete version of ~ sets...
mgpbas 20169	Base set of the multiplica...
mgpbasOLD 20170	Obsolete version of ~ mgpb...
mgpsca 20171	The multiplication monoid ...
mgpscaOLD 20172	Obsolete version of ~ mgps...
mgptset 20173	Topology component of the ...
mgptsetOLD 20174	Obsolete version of ~ mgpt...
mgptopn 20175	Topology of the multiplica...
mgpds 20176	Distance function of the m...
mgpdsOLD 20177	Obsolete version of ~ mgpd...
mgpress 20178	Subgroup commutes with the...
mgpressOLD 20179	Obsolete version of ~ mgpr...
prdsmgp 20180	The multiplicative monoid ...
isrng 20183	The predicate "is a non-un...
rngabl 20184	A non-unital ring is an (a...
rngmgp 20185	A non-unital ring is a sem...
rngmgpf 20186	Restricted functionality o...
rnggrp 20187	A non-unital ring is a (ad...
rngass 20188	Associative law for the mu...
rngdi 20189	Distributive law for the m...
rngdir 20190	Distributive law for the m...
rngacl 20191	Closure of the addition op...
rng0cl 20192	The zero element of a non-...
rngcl 20193	Closure of the multiplicat...
rnglz 20194	The zero of a non-unital r...
rngrz 20195	The zero of a non-unital r...
rngmneg1 20196	Negation of a product in a...
rngmneg2 20197	Negation of a product in a...
rngm2neg 20198	Double negation of a produ...
rngansg 20199	Every additive subgroup of...
rngsubdi 20200	Ring multiplication distri...
rngsubdir 20201	Ring multiplication distri...
isrngd 20202	Properties that determine ...
rngpropd 20203	If two structures have the...
prdsmulrngcl 20204	Closure of the multiplicat...
prdsrngd 20205	A product of non-unital ri...
imasrng 20206	The image structure of a n...
imasrngf1 20207	The image of a non-unital ...
xpsrngd 20208	A product of two non-unita...
qusrng 20209	The quotient structure of ...
ringidval 20212	The value of the unity ele...
dfur2 20213	The multiplicative identit...
ringurd 20214	Deduce the unity element o...
issrg 20217	The predicate "is a semiri...
srgcmn 20218	A semiring is a commutativ...
srgmnd 20219	A semiring is a monoid. (...
srgmgp 20220	A semiring is a monoid und...
srgdilem 20221	Lemma for ~ srgdi and ~ sr...
srgcl 20222	Closure of the multiplicat...
srgass 20223	Associative law for the mu...
srgideu 20224	The unity element of a sem...
srgfcl 20225	Functionality of the multi...
srgdi 20226	Distributive law for the m...
srgdir 20227	Distributive law for the m...
srgidcl 20228	The unity element of a sem...
srg0cl 20229	The zero element of a semi...
srgidmlem 20230	Lemma for ~ srglidm and ~ ...
srglidm 20231	The unity element of a sem...
srgridm 20232	The unity element of a sem...
issrgid 20233	Properties showing that an...
srgacl 20234	Closure of the addition op...
srgcom 20235	Commutativity of the addit...
srgrz 20236	The zero of a semiring is ...
srglz 20237	The zero of a semiring is ...
srgisid 20238	In a semiring, the only le...
o2timesd 20239	An element of a ring-like ...
rglcom4d 20240	Restricted commutativity o...
srgo2times 20241	A semiring element plus it...
srgcom4lem 20242	Lemma for ~ srgcom4 . Thi...
srgcom4 20243	Restricted commutativity o...
srg1zr 20244	The only semiring with a b...
srgen1zr 20245	The only semiring with one...
srgmulgass 20246	An associative property be...
srgpcomp 20247	If two elements of a semir...
srgpcompp 20248	If two elements of a semir...
srgpcomppsc 20249	If two elements of a semir...
srglmhm 20250	Left-multiplication in a s...
srgrmhm 20251	Right-multiplication in a ...
srgsummulcr 20252	A finite semiring sum mult...
sgsummulcl 20253	A finite semiring sum mult...
srg1expzeq1 20254	The exponentiation (by a n...
srgbinomlem1 20255	Lemma 1 for ~ srgbinomlem ...
srgbinomlem2 20256	Lemma 2 for ~ srgbinomlem ...
srgbinomlem3 20257	Lemma 3 for ~ srgbinomlem ...
srgbinomlem4 20258	Lemma 4 for ~ srgbinomlem ...
srgbinomlem 20259	Lemma for ~ srgbinom . In...
srgbinom 20260	The binomial theorem for c...
csrgbinom 20261	The binomial theorem for c...
isring 20266	The predicate "is a (unita...
ringgrp 20267	A ring is a group. (Contr...
ringmgp 20268	A ring is a monoid under m...
iscrng 20269	A commutative ring is a ri...
crngmgp 20270	A commutative ring's multi...
ringgrpd 20271	A ring is a group. (Contr...
ringmnd 20272	A ring is a monoid under a...
ringmgm 20273	A ring is a magma. (Contr...
crngring 20274	A commutative ring is a ri...
crngringd 20275	A commutative ring is a ri...
crnggrpd 20276	A commutative ring is a gr...
mgpf 20277	Restricted functionality o...
ringdilem 20278	Properties of a unital rin...
ringcl 20279	Closure of the multiplicat...
crngcom 20280	A commutative ring's multi...
iscrng2 20281	A commutative ring is a ri...
ringass 20282	Associative law for multip...
ringideu 20283	The unity element of a rin...
crngcomd 20284	Multiplication is commutat...
crngbascntr 20285	The base set of a commutat...
ringassd 20286	Associative law for multip...
crng12d 20287	Commutative/associative la...
ringcld 20288	Closure of the multiplicat...
ringdi 20289	Distributive law for the m...
ringdir 20290	Distributive law for the m...
ringidcl 20291	The unity element of a rin...
ring0cl 20292	The zero element of a ring...
ringidmlem 20293	Lemma for ~ ringlidm and ~...
ringlidm 20294	The unity element of a rin...
ringridm 20295	The unity element of a rin...
isringid 20296	Properties showing that an...
ringlidmd 20297	The unity element of a rin...
ringridmd 20298	The unity element of a rin...
ringid 20299	The multiplication operati...
ringo2times 20300	A ring element plus itself...
ringadd2 20301	A ring element plus itself...
ringidss 20302	A subset of the multiplica...
ringacl 20303	Closure of the addition op...
ringcomlem 20304	Lemma for ~ ringcom . Thi...
ringcom 20305	Commutativity of the addit...
ringabl 20306	A ring is an Abelian group...
ringcmn 20307	A ring is a commutative mo...
ringabld 20308	A ring is an Abelian group...
ringcmnd 20309	A ring is a commutative mo...
ringrng 20310	A unital ring is a non-uni...
ringssrng 20311	The unital rings are non-u...
isringrng 20312	The predicate "is a unital...
ringpropd 20313	If two structures have the...
crngpropd 20314	If two structures have the...
ringprop 20315	If two structures have the...
isringd 20316	Properties that determine ...
iscrngd 20317	Properties that determine ...
ringlz 20318	The zero of a unital ring ...
ringrz 20319	The zero of a unital ring ...
ringlzd 20320	The zero of a unital ring ...
ringrzd 20321	The zero of a unital ring ...
ringsrg 20322	Any ring is also a semirin...
ring1eq0 20323	If one and zero are equal,...
ring1ne0 20324	If a ring has at least two...
ringinvnz1ne0 20325	In a unital ring, a left i...
ringinvnzdiv 20326	In a unital ring, a left i...
ringnegl 20327	Negation in a ring is the ...
ringnegr 20328	Negation in a ring is the ...
ringmneg1 20329	Negation of a product in a...
ringmneg2 20330	Negation of a product in a...
ringm2neg 20331	Double negation of a produ...
ringsubdi 20332	Ring multiplication distri...
ringsubdir 20333	Ring multiplication distri...
mulgass2 20334	An associative property be...
ring1 20335	The (smallest) structure r...
ringn0 20336	Rings exist. (Contributed...
ringlghm 20337	Left-multiplication in a r...
ringrghm 20338	Right-multiplication in a ...
gsummulc1OLD 20339	Obsolete version of ~ gsum...
gsummulc2OLD 20340	Obsolete version of ~ gsum...
gsummulc1 20341	A finite ring sum multipli...
gsummulc2 20342	A finite ring sum multipli...
gsummgp0 20343	If one factor in a finite ...
gsumdixp 20344	Distribute a binary produc...
prdsmulrcl 20345	A structure product of rin...
prdsringd 20346	A product of rings is a ri...
prdscrngd 20347	A product of commutative r...
prds1 20348	Value of the ring unity in...
pwsring 20349	A structure power of a rin...
pws1 20350	Value of the ring unity in...
pwscrng 20351	A structure power of a com...
pwsmgp 20352	The multiplicative group o...
pwspjmhmmgpd 20353	The projection given by ~ ...
pwsexpg 20354	Value of a group exponenti...
imasring 20355	The image structure of a r...
imasringf1 20356	The image of a ring under ...
xpsringd 20357	A product of two rings is ...
xpsring1d 20358	The multiplicative identit...
qusring2 20359	The quotient structure of ...
crngbinom 20360	The binomial theorem for c...
opprval 20363	Value of the opposite ring...
opprmulfval 20364	Value of the multiplicatio...
opprmul 20365	Value of the multiplicatio...
crngoppr 20366	In a commutative ring, the...
opprlem 20367	Lemma for ~ opprbas and ~ ...
opprlemOLD 20368	Obsolete version of ~ oppr...
opprbas 20369	Base set of an opposite ri...
opprbasOLD 20370	Obsolete proof of ~ opprba...
oppradd 20371	Addition operation of an o...
oppraddOLD 20372	Obsolete proof of ~ opprba...
opprrng 20373	An opposite non-unital rin...
opprrngb 20374	A class is a non-unital ri...
opprring 20375	An opposite ring is a ring...
opprringb 20376	Bidirectional form of ~ op...
oppr0 20377	Additive identity of an op...
oppr1 20378	Multiplicative identity of...
opprneg 20379	The negative function in a...
opprsubg 20380	Being a subgroup is a symm...
mulgass3 20381	An associative property be...
reldvdsr 20388	The divides relation is a ...
dvdsrval 20389	Value of the divides relat...
dvdsr 20390	Value of the divides relat...
dvdsr2 20391	Value of the divides relat...
dvdsrmul 20392	A left-multiple of ` X ` i...
dvdsrcl 20393	Closure of a dividing elem...
dvdsrcl2 20394	Closure of a dividing elem...
dvdsrid 20395	An element in a (unital) r...
dvdsrtr 20396	Divisibility is transitive...
dvdsrmul1 20397	The divisibility relation ...
dvdsrneg 20398	An element divides its neg...
dvdsr01 20399	In a ring, zero is divisib...
dvdsr02 20400	Only zero is divisible by ...
isunit 20401	Property of being a unit o...
1unit 20402	The multiplicative identit...
unitcl 20403	A unit is an element of th...
unitss 20404	The set of units is contai...
opprunit 20405	Being a unit is a symmetri...
crngunit 20406	Property of being a unit i...
dvdsunit 20407	A divisor of a unit is a u...
unitmulcl 20408	The product of units is a ...
unitmulclb 20409	Reversal of ~ unitmulcl in...
unitgrpbas 20410	The base set of the group ...
unitgrp 20411	The group of units is a gr...
unitabl 20412	The group of units of a co...
unitgrpid 20413	The identity of the group ...
unitsubm 20414	The group of units is a su...
invrfval 20417	Multiplicative inverse fun...
unitinvcl 20418	The inverse of a unit exis...
unitinvinv 20419	The inverse of the inverse...
ringinvcl 20420	The inverse of a unit is a...
unitlinv 20421	A unit times its inverse i...
unitrinv 20422	A unit times its inverse i...
1rinv 20423	The inverse of the ring un...
0unit 20424	The additive identity is a...
unitnegcl 20425	The negative of a unit is ...
ringunitnzdiv 20426	In a unitary ring, a unit ...
ring1nzdiv 20427	In a unitary ring, the rin...
dvrfval 20430	Division operation in a ri...
dvrval 20431	Division operation in a ri...
dvrcl 20432	Closure of division operat...
unitdvcl 20433	The units are closed under...
dvrid 20434	A ring element divided by ...
dvr1 20435	A ring element divided by ...
dvrass 20436	An associative law for div...
dvrcan1 20437	A cancellation law for div...
dvrcan3 20438	A cancellation law for div...
dvreq1 20439	Equality in terms of ratio...
dvrdir 20440	Distributive law for the d...
rdivmuldivd 20441	Multiplication of two rati...
ringinvdv 20442	Write the inverse function...
rngidpropd 20443	The ring unity depends onl...
dvdsrpropd 20444	The divisibility relation ...
unitpropd 20445	The set of units depends o...
invrpropd 20446	The ring inverse function ...
isirred 20447	An irreducible element of ...
isnirred 20448	The property of being a no...
isirred2 20449	Expand out the class diffe...
opprirred 20450	Irreducibility is symmetri...
irredn0 20451	The additive identity is n...
irredcl 20452	An irreducible element is ...
irrednu 20453	An irreducible element is ...
irredn1 20454	The multiplicative identit...
irredrmul 20455	The product of an irreduci...
irredlmul 20456	The product of a unit and ...
irredmul 20457	If product of two elements...
irredneg 20458	The negative of an irreduc...
irrednegb 20459	An element is irreducible ...
rnghmrcl 20466	Reverse closure of a non-u...
rnghmfn 20467	The mapping of two non-uni...
rnghmval 20468	The set of the non-unital ...
isrnghm 20469	A function is a non-unital...
isrnghmmul 20470	A function is a non-unital...
rnghmmgmhm 20471	A non-unital ring homomorp...
rnghmval2 20472	The non-unital ring homomo...
isrngim 20473	An isomorphism of non-unit...
rngimrcl 20474	Reverse closure for an iso...
rnghmghm 20475	A non-unital ring homomorp...
rnghmf 20476	A ring homomorphism is a f...
rnghmmul 20477	A homomorphism of non-unit...
isrnghm2d 20478	Demonstration of non-unita...
isrnghmd 20479	Demonstration of non-unita...
rnghmf1o 20480	A non-unital ring homomorp...
isrngim2 20481	An isomorphism of non-unit...
rngimf1o 20482	An isomorphism of non-unit...
rngimrnghm 20483	An isomorphism of non-unit...
rngimcnv 20484	The converse of an isomorp...
rnghmco 20485	The composition of non-uni...
idrnghm 20486	The identity homomorphism ...
c0mgm 20487	The constant mapping to ze...
c0mhm 20488	The constant mapping to ze...
c0ghm 20489	The constant mapping to ze...
c0snmgmhm 20490	The constant mapping to ze...
c0snmhm 20491	The constant mapping to ze...
c0snghm 20492	The constant mapping to ze...
rngisomfv1 20493	If there is a non-unital r...
rngisom1 20494	If there is a non-unital r...
rngisomring 20495	If there is a non-unital r...
rngisomring1 20496	If there is a non-unital r...
dfrhm2 20502	The property of a ring hom...
rhmrcl1 20504	Reverse closure of a ring ...
rhmrcl2 20505	Reverse closure of a ring ...
isrhm 20506	A function is a ring homom...
rhmmhm 20507	A ring homomorphism is a h...
rhmisrnghm 20508	Each unital ring homomorph...
isrim0OLD 20509	Obsolete version of ~ isri...
rimrcl 20510	Reverse closure for an iso...
isrim0 20511	A ring isomorphism is a ho...
rhmghm 20512	A ring homomorphism is an ...
rhmf 20513	A ring homomorphism is a f...
rhmmul 20514	A homomorphism of rings pr...
isrhm2d 20515	Demonstration of ring homo...
isrhmd 20516	Demonstration of ring homo...
rhm1 20517	Ring homomorphisms are req...
idrhm 20518	The identity homomorphism ...
rhmf1o 20519	A ring homomorphism is bij...
isrim 20520	An isomorphism of rings is...
isrimOLD 20521	Obsolete version of ~ isri...
rimf1o 20522	An isomorphism of rings is...
rimrhmOLD 20523	Obsolete version of ~ rimr...
rimrhm 20524	A ring isomorphism is a ho...
rimgim 20525	An isomorphism of rings is...
rimisrngim 20526	Each unital ring isomorphi...
rhmfn 20527	The mapping of two rings t...
rhmval 20528	The ring homomorphisms bet...
rhmco 20529	The composition of ring ho...
pwsco1rhm 20530	Right composition with a f...
pwsco2rhm 20531	Left composition with a ri...
brric 20532	The relation "is isomorphi...
brrici 20533	Prove isomorphic by an exp...
brric2 20534	The relation "is isomorphi...
ricgic 20535	If two rings are (ring) is...
rhmdvdsr 20536	A ring homomorphism preser...
rhmopp 20537	A ring homomorphism is als...
elrhmunit 20538	Ring homomorphisms preserv...
rhmunitinv 20539	Ring homomorphisms preserv...
isnzr 20542	Property of a nonzero ring...
nzrnz 20543	One and zero are different...
nzrring 20544	A nonzero ring is a ring. ...
nzrringOLD 20545	Obsolete version of ~ nzrr...
isnzr2 20546	Equivalent characterizatio...
isnzr2hash 20547	Equivalent characterizatio...
nzrpropd 20548	If two structures have the...
opprnzrb 20549	The opposite of a nonzero ...
opprnzr 20550	The opposite of a nonzero ...
ringelnzr 20551	A ring is nonzero if it ha...
nzrunit 20552	A unit is nonzero in any n...
0ringnnzr 20553	A ring is a zero ring iff ...
0ring 20554	If a ring has only one ele...
0ringdif 20555	A zero ring is a ring whic...
0ringbas 20556	The base set of a zero rin...
0ring01eq 20557	In a ring with only one el...
01eq0ring 20558	If the zero and the identi...
01eq0ringOLD 20559	Obsolete version of ~ 01eq...
0ring01eqbi 20560	In a unital ring the zero ...
0ring1eq0 20561	In a zero ring, a ring whi...
c0rhm 20562	The constant mapping to ze...
c0rnghm 20563	The constant mapping to ze...
zrrnghm 20564	The constant mapping to ze...
nrhmzr 20565	There is no ring homomorph...
islring 20568	The predicate "is a local ...
lringnzr 20569	A local ring is a nonzero ...
lringring 20570	A local ring is a ring. (...
lringnz 20571	A local ring is a nonzero ...
lringuplu 20572	If the sum of two elements...
issubrng 20575	The subring of non-unital ...
subrngss 20576	A subring is a subset. (C...
subrngid 20577	Every non-unital ring is a...
subrngrng 20578	A subring is a non-unital ...
subrngrcl 20579	Reverse closure for a subr...
subrngsubg 20580	A subring is a subgroup. ...
subrngringnsg 20581	A subring is a normal subg...
subrngbas 20582	Base set of a subring stru...
subrng0 20583	A subring always has the s...
subrngacl 20584	A subring is closed under ...
subrngmcl 20585	A subring is closed under ...
issubrng2 20586	Characterize the subrings ...
opprsubrng 20587	Being a subring is a symme...
subrngint 20588	The intersection of a none...
subrngin 20589	The intersection of two su...
subrngmre 20590	The subrings of a non-unit...
subsubrng 20591	A subring of a subring is ...
subsubrng2 20592	The set of subrings of a s...
rhmimasubrnglem 20593	Lemma for ~ rhmimasubrng :...
rhmimasubrng 20594	The homomorphic image of a...
cntzsubrng 20595	Centralizers in a non-unit...
subrngpropd 20596	If two structures have the...
issubrg 20601	The subring predicate. (C...
subrgss 20602	A subring is a subset. (C...
subrgid 20603	Every ring is a subring of...
subrgring 20604	A subring is a ring. (Con...
subrgcrng 20605	A subring of a commutative...
subrgrcl 20606	Reverse closure for a subr...
subrgsubg 20607	A subring is a subgroup. ...
subrgsubrng 20608	A subring of a unital ring...
subrg0 20609	A subring always has the s...
subrg1cl 20610	A subring contains the mul...
subrgbas 20611	Base set of a subring stru...
subrg1 20612	A subring always has the s...
subrgacl 20613	A subring is closed under ...
subrgmcl 20614	A subring is closed under ...
subrgsubm 20615	A subring is a submonoid o...
subrgdvds 20616	If an element divides anot...
subrguss 20617	A unit of a subring is a u...
subrginv 20618	A subring always has the s...
subrgdv 20619	A subring always has the s...
subrgunit 20620	An element of a ring is a ...
subrgugrp 20621	The units of a subring for...
issubrg2 20622	Characterize the subrings ...
opprsubrg 20623	Being a subring is a symme...
subrgnzr 20624	A subring of a nonzero rin...
subrgint 20625	The intersection of a none...
subrgin 20626	The intersection of two su...
subrgmre 20627	The subrings of a ring are...
subsubrg 20628	A subring of a subring is ...
subsubrg2 20629	The set of subrings of a s...
issubrg3 20630	A subring is an additive s...
resrhm 20631	Restriction of a ring homo...
resrhm2b 20632	Restriction of the codomai...
rhmeql 20633	The equalizer of two ring ...
rhmima 20634	The homomorphic image of a...
rnrhmsubrg 20635	The range of a ring homomo...
cntzsubr 20636	Centralizers in a ring are...
pwsdiagrhm 20637	Diagonal homomorphism into...
subrgpropd 20638	If two structures have the...
rhmpropd 20639	Ring homomorphism depends ...
rngcval 20642	Value of the category of n...
rnghmresfn 20643	The class of non-unital ri...
rnghmresel 20644	An element of the non-unit...
rngcbas 20645	Set of objects of the cate...
rngchomfval 20646	Set of arrows of the categ...
rngchom 20647	Set of arrows of the categ...
elrngchom 20648	A morphism of non-unital r...
rngchomfeqhom 20649	The functionalized Hom-set...
rngccofval 20650	Composition in the categor...
rngcco 20651	Composition in the categor...
dfrngc2 20652	Alternate definition of th...
rnghmsscmap2 20653	The non-unital ring homomo...
rnghmsscmap 20654	The non-unital ring homomo...
rnghmsubcsetclem1 20655	Lemma 1 for ~ rnghmsubcset...
rnghmsubcsetclem2 20656	Lemma 2 for ~ rnghmsubcset...
rnghmsubcsetc 20657	The non-unital ring homomo...
rngccat 20658	The category of non-unital...
rngcid 20659	The identity arrow in the ...
rngcsect 20660	A section in the category ...
rngcinv 20661	An inverse in the category...
rngciso 20662	An isomorphism in the cate...
rngcifuestrc 20663	The "inclusion functor" fr...
funcrngcsetc 20664	The "natural forgetful fun...
funcrngcsetcALT 20665	Alternate proof of ~ funcr...
zrinitorngc 20666	The zero ring is an initia...
zrtermorngc 20667	The zero ring is a termina...
zrzeroorngc 20668	The zero ring is a zero ob...
ringcval 20671	Value of the category of u...
rhmresfn 20672	The class of unital ring h...
rhmresel 20673	An element of the unital r...
ringcbas 20674	Set of objects of the cate...
ringchomfval 20675	Set of arrows of the categ...
ringchom 20676	Set of arrows of the categ...
elringchom 20677	A morphism of unital rings...
ringchomfeqhom 20678	The functionalized Hom-set...
ringccofval 20679	Composition in the categor...
ringcco 20680	Composition in the categor...
dfringc2 20681	Alternate definition of th...
rhmsscmap2 20682	The unital ring homomorphi...
rhmsscmap 20683	The unital ring homomorphi...
rhmsubcsetclem1 20684	Lemma 1 for ~ rhmsubcsetc ...
rhmsubcsetclem2 20685	Lemma 2 for ~ rhmsubcsetc ...
rhmsubcsetc 20686	The unital ring homomorphi...
ringccat 20687	The category of unital rin...
ringcid 20688	The identity arrow in the ...
rhmsscrnghm 20689	The unital ring homomorphi...
rhmsubcrngclem1 20690	Lemma 1 for ~ rhmsubcrngc ...
rhmsubcrngclem2 20691	Lemma 2 for ~ rhmsubcrngc ...
rhmsubcrngc 20692	The unital ring homomorphi...
rngcresringcat 20693	The restriction of the cat...
ringcsect 20694	A section in the category ...
ringcinv 20695	An inverse in the category...
ringciso 20696	An isomorphism in the cate...
ringcbasbas 20697	An element of the base set...
funcringcsetc 20698	The "natural forgetful fun...
zrtermoringc 20699	The zero ring is a termina...
zrninitoringc 20700	The zero ring is not an in...
srhmsubclem1 20701	Lemma 1 for ~ srhmsubc . ...
srhmsubclem2 20702	Lemma 2 for ~ srhmsubc . ...
srhmsubclem3 20703	Lemma 3 for ~ srhmsubc . ...
srhmsubc 20704	According to ~ df-subc , t...
sringcat 20705	The restriction of the cat...
crhmsubc 20706	According to ~ df-subc , t...
cringcat 20707	The restriction of the cat...
rngcrescrhm 20708	The category of non-unital...
rhmsubclem1 20709	Lemma 1 for ~ rhmsubc . (...
rhmsubclem2 20710	Lemma 2 for ~ rhmsubc . (...
rhmsubclem3 20711	Lemma 3 for ~ rhmsubc . (...
rhmsubclem4 20712	Lemma 4 for ~ rhmsubc . (...
rhmsubc 20713	According to ~ df-subc , t...
rhmsubccat 20714	The restriction of the cat...
rrgval 20721	Value of the set or left-r...
isrrg 20722	Membership in the set of l...
rrgeq0i 20723	Property of a left-regular...
rrgeq0 20724	Left-multiplication by a l...
rrgsupp 20725	Left multiplication by a l...
rrgss 20726	Left-regular elements are ...
unitrrg 20727	Units are regular elements...
rrgnz 20728	In a nonzero ring, the zer...
isdomn 20729	Expand definition of a dom...
domnnzr 20730	A domain is a nonzero ring...
domnring 20731	A domain is a ring. (Cont...
domneq0 20732	In a domain, a product is ...
domnmuln0 20733	In a domain, a product of ...
isdomn5 20734	The equivalence between th...
isdomn2 20735	A ring is a domain iff all...
isdomn2OLD 20736	Obsolete version of ~ isdo...
domnrrg 20737	In a domain, a nonzero ele...
isdomn6 20738	A ring is a domain iff the...
isdomn3 20739	Nonzero elements form a mu...
isdomn4 20740	A ring is a domain iff it ...
opprdomnb 20741	A class is a domain if and...
opprdomn 20742	The opposite of a domain i...
isdomn4r 20743	A ring is a domain iff it ...
domnlcanb 20744	Left-cancellation law for ...
domnlcan 20745	Left-cancellation law for ...
domnrcanb 20746	Right-cancellation law for...
domnrcan 20747	Right-cancellation law for...
domneq0r 20748	Right multiplication by a ...
isidom 20749	An integral domain is a co...
idomdomd 20750	An integral domain is a do...
idomcringd 20751	An integral domain is a co...
idomringd 20752	An integral domain is a ri...
isdrng 20757	The predicate "is a divisi...
drngunit 20758	Elementhood in the set of ...
drngui 20759	The set of units of a divi...
drngring 20760	A division ring is a ring....
drngringd 20761	A division ring is a ring....
drnggrpd 20762	A division ring is a group...
drnggrp 20763	A division ring is a group...
isfld 20764	A field is a commutative d...
flddrngd 20765	A field is a division ring...
fldcrngd 20766	A field is a commutative r...
isdrng2 20767	A division ring can equiva...
drngprop 20768	If two structures have the...
drngmgp 20769	A division ring contains a...
drngid 20770	A division ring's unity is...
drngunz 20771	A division ring's unity is...
drngnzr 20772	A division ring is a nonze...
drngdomn 20773	A division ring is a domai...
drngmcl 20774	The product of two nonzero...
drngmclOLD 20775	Obsolete version of ~ drng...
drngid2 20776	Properties showing that an...
drnginvrcl 20777	Closure of the multiplicat...
drnginvrn0 20778	The multiplicative inverse...
drnginvrcld 20779	Closure of the multiplicat...
drnginvrl 20780	Property of the multiplica...
drnginvrr 20781	Property of the multiplica...
drnginvrld 20782	Property of the multiplica...
drnginvrrd 20783	Property of the multiplica...
drngmul0or 20784	A product is zero iff one ...
drngmul0orOLD 20785	Obsolete version of ~ drng...
drngmulne0 20786	A product is nonzero iff b...
drngmuleq0 20787	An element is zero iff its...
opprdrng 20788	The opposite of a division...
isdrngd 20789	Properties that characteri...
isdrngrd 20790	Properties that characteri...
isdrngdOLD 20791	Obsolete version of ~ isdr...
isdrngrdOLD 20792	Obsolete version of ~ isdr...
drngpropd 20793	If two structures have the...
fldpropd 20794	If two structures have the...
fldidom 20795	A field is an integral dom...
fldidomOLD 20796	Obsolete version of ~ fldi...
fidomndrnglem 20797	Lemma for ~ fidomndrng . ...
fidomndrng 20798	A finite domain is a divis...
fiidomfld 20799	A finite integral domain i...
rng1nnzr 20800	The (smallest) structure r...
ring1zr 20801	The only (unital) ring wit...
rngen1zr 20802	The only (unital) ring wit...
ringen1zr 20803	The only unital ring with ...
rng1nfld 20804	The zero ring is not a fie...
issubdrg 20805	Characterize the subfields...
drhmsubc 20806	According to ~ df-subc , t...
drngcat 20807	The restriction of the cat...
fldcat 20808	The restriction of the cat...
fldc 20809	The restriction of the cat...
fldhmsubc 20810	According to ~ df-subc , t...
issdrg 20813	Property of a division sub...
sdrgrcl 20814	Reverse closure for a sub-...
sdrgdrng 20815	A sub-division-ring is a d...
sdrgsubrg 20816	A sub-division-ring is a s...
sdrgid 20817	Every division ring is a d...
sdrgss 20818	A division subring is a su...
sdrgbas 20819	Base set of a sub-division...
issdrg2 20820	Property of a division sub...
sdrgunit 20821	A unit of a sub-division-r...
imadrhmcl 20822	The image of a (nontrivial...
fldsdrgfld 20823	A sub-division-ring of a f...
acsfn1p 20824	Construction of a closure ...
subrgacs 20825	Closure property of subrin...
sdrgacs 20826	Closure property of divisi...
cntzsdrg 20827	Centralizers in division r...
subdrgint 20828	The intersection of a none...
sdrgint 20829	The intersection of a none...
primefld 20830	The smallest sub division ...
primefld0cl 20831	The prime field contains t...
primefld1cl 20832	The prime field contains t...
abvfval 20835	Value of the set of absolu...
isabv 20836	Elementhood in the set of ...
isabvd 20837	Properties that determine ...
abvrcl 20838	Reverse closure for the ab...
abvfge0 20839	An absolute value is a fun...
abvf 20840	An absolute value is a fun...
abvcl 20841	An absolute value is a fun...
abvge0 20842	The absolute value of a nu...
abveq0 20843	The value of an absolute v...
abvne0 20844	The absolute value of a no...
abvgt0 20845	The absolute value of a no...
abvmul 20846	An absolute value distribu...
abvtri 20847	An absolute value satisfie...
abv0 20848	The absolute value of zero...
abv1z 20849	The absolute value of one ...
abv1 20850	The absolute value of one ...
abvneg 20851	The absolute value of a ne...
abvsubtri 20852	An absolute value satisfie...
abvrec 20853	The absolute value distrib...
abvdiv 20854	The absolute value distrib...
abvdom 20855	Any ring with an absolute ...
abvres 20856	The restriction of an abso...
abvtrivd 20857	The trivial absolute value...
abvtrivg 20858	The trivial absolute value...
abvtriv 20859	The trivial absolute value...
abvpropd 20860	If two structures have the...
abvn0b 20861	Another characterization o...
staffval 20866	The functionalization of t...
stafval 20867	The functionalization of t...
staffn 20868	The functionalization is e...
issrng 20869	The predicate "is a star r...
srngrhm 20870	The involution function in...
srngring 20871	A star ring is a ring. (C...
srngcnv 20872	The involution function in...
srngf1o 20873	The involution function in...
srngcl 20874	The involution function in...
srngnvl 20875	The involution function in...
srngadd 20876	The involution function in...
srngmul 20877	The involution function in...
srng1 20878	The conjugate of the ring ...
srng0 20879	The conjugate of the ring ...
issrngd 20880	Properties that determine ...
idsrngd 20881	A commutative ring is a st...
islmod 20886	The predicate "is a left m...
lmodlema 20887	Lemma for properties of a ...
islmodd 20888	Properties that determine ...
lmodgrp 20889	A left module is a group. ...
lmodring 20890	The scalar component of a ...
lmodfgrp 20891	The scalar component of a ...
lmodgrpd 20892	A left module is a group. ...
lmodbn0 20893	The base set of a left mod...
lmodacl 20894	Closure of ring addition f...
lmodmcl 20895	Closure of ring multiplica...
lmodsn0 20896	The set of scalars in a le...
lmodvacl 20897	Closure of vector addition...
lmodass 20898	Left module vector sum is ...
lmodlcan 20899	Left cancellation law for ...
lmodvscl 20900	Closure of scalar product ...
lmodvscld 20901	Closure of scalar product ...
scaffval 20902	The scalar multiplication ...
scafval 20903	The scalar multiplication ...
scafeq 20904	If the scalar multiplicati...
scaffn 20905	The scalar multiplication ...
lmodscaf 20906	The scalar multiplication ...
lmodvsdi 20907	Distributive law for scala...
lmodvsdir 20908	Distributive law for scala...
lmodvsass 20909	Associative law for scalar...
lmod0cl 20910	The ring zero in a left mo...
lmod1cl 20911	The ring unity in a left m...
lmodvs1 20912	Scalar product with the ri...
lmod0vcl 20913	The zero vector is a vecto...
lmod0vlid 20914	Left identity law for the ...
lmod0vrid 20915	Right identity law for the...
lmod0vid 20916	Identity equivalent to the...
lmod0vs 20917	Zero times a vector is the...
lmodvs0 20918	Anything times the zero ve...
lmodvsmmulgdi 20919	Distributive law for a gro...
lmodfopnelem1 20920	Lemma 1 for ~ lmodfopne . ...
lmodfopnelem2 20921	Lemma 2 for ~ lmodfopne . ...
lmodfopne 20922	The (functionalized) opera...
lcomf 20923	A linear-combination sum i...
lcomfsupp 20924	A linear-combination sum i...
lmodvnegcl 20925	Closure of vector negative...
lmodvnegid 20926	Addition of a vector with ...
lmodvneg1 20927	Minus 1 times a vector is ...
lmodvsneg 20928	Multiplication of a vector...
lmodvsubcl 20929	Closure of vector subtract...
lmodcom 20930	Left module vector sum is ...
lmodabl 20931	A left module is an abelia...
lmodcmn 20932	A left module is a commuta...
lmodnegadd 20933	Distribute negation throug...
lmod4 20934	Commutative/associative la...
lmodvsubadd 20935	Relationship between vecto...
lmodvaddsub4 20936	Vector addition/subtractio...
lmodvpncan 20937	Addition/subtraction cance...
lmodvnpcan 20938	Cancellation law for vecto...
lmodvsubval2 20939	Value of vector subtractio...
lmodsubvs 20940	Subtraction of a scalar pr...
lmodsubdi 20941	Scalar multiplication dist...
lmodsubdir 20942	Scalar multiplication dist...
lmodsubeq0 20943	If the difference between ...
lmodsubid 20944	Subtraction of a vector fr...
lmodvsghm 20945	Scalar multiplication of t...
lmodprop2d 20946	If two structures have the...
lmodpropd 20947	If two structures have the...
gsumvsmul 20948	Pull a scalar multiplicati...
mptscmfsupp0 20949	A mapping to a scalar prod...
mptscmfsuppd 20950	A function mapping to a sc...
rmodislmodlem 20951	Lemma for ~ rmodislmod . ...
rmodislmod 20952	The right module ` R ` ind...
rmodislmodOLD 20953	Obsolete version of ~ rmod...
lssset 20956	The set of all (not necess...
islss 20957	The predicate "is a subspa...
islssd 20958	Properties that determine ...
lssss 20959	A subspace is a set of vec...
lssel 20960	A subspace member is a vec...
lss1 20961	The set of vectors in a le...
lssuni 20962	The union of all subspaces...
lssn0 20963	A subspace is not empty. ...
00lss 20964	The empty structure has no...
lsscl 20965	Closure property of a subs...
lssvacl 20966	Closure of vector addition...
lssvsubcl 20967	Closure of vector subtract...
lssvancl1 20968	Non-closure: if one vector...
lssvancl2 20969	Non-closure: if one vector...
lss0cl 20970	The zero vector belongs to...
lsssn0 20971	The singleton of the zero ...
lss0ss 20972	The zero subspace is inclu...
lssle0 20973	No subspace is smaller tha...
lssne0 20974	A nonzero subspace has a n...
lssvneln0 20975	A vector ` X ` which doesn...
lssneln0 20976	A vector ` X ` which doesn...
lssssr 20977	Conclude subspace ordering...
lssvscl 20978	Closure of scalar product ...
lssvnegcl 20979	Closure of negative vector...
lsssubg 20980	All subspaces are subgroup...
lsssssubg 20981	All subspaces are subgroup...
islss3 20982	A linear subspace of a mod...
lsslmod 20983	A submodule is a module. ...
lsslss 20984	The subspaces of a subspac...
islss4 20985	A linear subspace is a sub...
lss1d 20986	One-dimensional subspace (...
lssintcl 20987	The intersection of a none...
lssincl 20988	The intersection of two su...
lssmre 20989	The subspaces of a module ...
lssacs 20990	Submodules are an algebrai...
prdsvscacl 20991	Pointwise scalar multiplic...
prdslmodd 20992	The product of a family of...
pwslmod 20993	A structure power of a lef...
lspfval 20996	The span function for a le...
lspf 20997	The span function on a lef...
lspval 20998	The span of a set of vecto...
lspcl 20999	The span of a set of vecto...
lspsncl 21000	The span of a singleton is...
lspprcl 21001	The span of a pair is a su...
lsptpcl 21002	The span of an unordered t...
lspsnsubg 21003	The span of a singleton is...
00lsp 21004	~ fvco4i lemma for linear ...
lspid 21005	The span of a subspace is ...
lspssv 21006	A span is a set of vectors...
lspss 21007	Span preserves subset orde...
lspssid 21008	A set of vectors is a subs...
lspidm 21009	The span of a set of vecto...
lspun 21010	The span of union is the s...
lspssp 21011	If a set of vectors is a s...
mrclsp 21012	Moore closure generalizes ...
lspsnss 21013	The span of the singleton ...
ellspsn3 21014	A member of the span of th...
lspprss 21015	The span of a pair of vect...
lspsnid 21016	A vector belongs to the sp...
ellspsn6 21017	Relationship between a vec...
ellspsn5b 21018	Relationship between a vec...
ellspsn5 21019	Relationship between a vec...
lspprid1 21020	A member of a pair of vect...
lspprid2 21021	A member of a pair of vect...
lspprvacl 21022	The sum of two vectors bel...
lssats2 21023	A way to express atomistic...
ellspsni 21024	A scalar product with a ve...
lspsn 21025	Span of the singleton of a...
ellspsn 21026	Member of span of the sing...
lspsnvsi 21027	Span of a scalar product o...
lspsnss2 21028	Comparable spans of single...
lspsnneg 21029	Negation does not change t...
lspsnsub 21030	Swapping subtraction order...
lspsn0 21031	Span of the singleton of t...
lsp0 21032	Span of the empty set. (C...
lspuni0 21033	Union of the span of the e...
lspun0 21034	The span of a union with t...
lspsneq0 21035	Span of the singleton is t...
lspsneq0b 21036	Equal singleton spans impl...
lmodindp1 21037	Two independent (non-colin...
lsslsp 21038	Spans in submodules corres...
lsslspOLD 21039	Obsolete version of ~ lssl...
lss0v 21040	The zero vector in a submo...
lsspropd 21041	If two structures have the...
lsppropd 21042	If two structures have the...
reldmlmhm 21049	Lemma for module homomorph...
lmimfn 21050	Lemma for module isomorphi...
islmhm 21051	Property of being a homomo...
islmhm3 21052	Property of a module homom...
lmhmlem 21053	Non-quantified consequence...
lmhmsca 21054	A homomorphism of left mod...
lmghm 21055	A homomorphism of left mod...
lmhmlmod2 21056	A homomorphism of left mod...
lmhmlmod1 21057	A homomorphism of left mod...
lmhmf 21058	A homomorphism of left mod...
lmhmlin 21059	A homomorphism of left mod...
lmodvsinv 21060	Multiplication of a vector...
lmodvsinv2 21061	Multiplying a negated vect...
islmhm2 21062	A one-equation proof of li...
islmhmd 21063	Deduction for a module hom...
0lmhm 21064	The constant zero linear f...
idlmhm 21065	The identity function on a...
invlmhm 21066	The negative function on a...
lmhmco 21067	The composition of two mod...
lmhmplusg 21068	The pointwise sum of two l...
lmhmvsca 21069	The pointwise scalar produ...
lmhmf1o 21070	A bijective module homomor...
lmhmima 21071	The image of a subspace un...
lmhmpreima 21072	The inverse image of a sub...
lmhmlsp 21073	Homomorphisms preserve spa...
lmhmrnlss 21074	The range of a homomorphis...
lmhmkerlss 21075	The kernel of a homomorphi...
reslmhm 21076	Restriction of a homomorph...
reslmhm2 21077	Expansion of the codomain ...
reslmhm2b 21078	Expansion of the codomain ...
lmhmeql 21079	The equalizer of two modul...
lspextmo 21080	A linear function is compl...
pwsdiaglmhm 21081	Diagonal homomorphism into...
pwssplit0 21082	Splitting for structure po...
pwssplit1 21083	Splitting for structure po...
pwssplit2 21084	Splitting for structure po...
pwssplit3 21085	Splitting for structure po...
islmim 21086	An isomorphism of left mod...
lmimf1o 21087	An isomorphism of left mod...
lmimlmhm 21088	An isomorphism of modules ...
lmimgim 21089	An isomorphism of modules ...
islmim2 21090	An isomorphism of left mod...
lmimcnv 21091	The converse of a bijectiv...
brlmic 21092	The relation "is isomorphi...
brlmici 21093	Prove isomorphic by an exp...
lmiclcl 21094	Isomorphism implies the le...
lmicrcl 21095	Isomorphism implies the ri...
lmicsym 21096	Module isomorphism is symm...
lmhmpropd 21097	Module homomorphism depend...
islbs 21100	The predicate " ` B ` is a...
lbsss 21101	A basis is a set of vector...
lbsel 21102	An element of a basis is a...
lbssp 21103	The span of a basis is the...
lbsind 21104	A basis is linearly indepe...
lbsind2 21105	A basis is linearly indepe...
lbspss 21106	No proper subset of a basi...
lsmcl 21107	The sum of two subspaces i...
lsmspsn 21108	Member of subspace sum of ...
lsmelval2 21109	Subspace sum membership in...
lsmsp 21110	Subspace sum in terms of s...
lsmsp2 21111	Subspace sum of spans of s...
lsmssspx 21112	Subspace sum (in its exten...
lsmpr 21113	The span of a pair of vect...
lsppreli 21114	A vector expressed as a su...
lsmelpr 21115	Two ways to say that a vec...
lsppr0 21116	The span of a vector paire...
lsppr 21117	Span of a pair of vectors....
lspprel 21118	Member of the span of a pa...
lspprabs 21119	Absorption of vector sum i...
lspvadd 21120	The span of a vector sum i...
lspsntri 21121	Triangle-type inequality f...
lspsntrim 21122	Triangle-type inequality f...
lbspropd 21123	If two structures have the...
pj1lmhm 21124	The left projection functi...
pj1lmhm2 21125	The left projection functi...
islvec 21128	The predicate "is a left v...
lvecdrng 21129	The set of scalars of a le...
lveclmod 21130	A left vector space is a l...
lveclmodd 21131	A vector space is a left m...
lvecgrpd 21132	A vector space is a group....
lsslvec 21133	A vector subspace is a vec...
lmhmlvec 21134	The property for modules t...
lvecvs0or 21135	If a scalar product is zer...
lvecvsn0 21136	A scalar product is nonzer...
lssvs0or 21137	If a scalar product belong...
lvecvscan 21138	Cancellation law for scala...
lvecvscan2 21139	Cancellation law for scala...
lvecinv 21140	Invert coefficient of scal...
lspsnvs 21141	A nonzero scalar product d...
lspsneleq 21142	Membership relation that i...
lspsncmp 21143	Comparable spans of nonzer...
lspsnne1 21144	Two ways to express that v...
lspsnne2 21145	Two ways to express that v...
lspsnnecom 21146	Swap two vectors with diff...
lspabs2 21147	Absorption law for span of...
lspabs3 21148	Absorption law for span of...
lspsneq 21149	Equal spans of singletons ...
lspsneu 21150	Nonzero vectors with equal...
ellspsn4 21151	A member of the span of th...
lspdisj 21152	The span of a vector not i...
lspdisjb 21153	A nonzero vector is not in...
lspdisj2 21154	Unequal spans are disjoint...
lspfixed 21155	Show membership in the spa...
lspexch 21156	Exchange property for span...
lspexchn1 21157	Exchange property for span...
lspexchn2 21158	Exchange property for span...
lspindpi 21159	Partial independence prope...
lspindp1 21160	Alternate way to say 3 vec...
lspindp2l 21161	Alternate way to say 3 vec...
lspindp2 21162	Alternate way to say 3 vec...
lspindp3 21163	Independence of 2 vectors ...
lspindp4 21164	(Partial) independence of ...
lvecindp 21165	Compute the ` X ` coeffici...
lvecindp2 21166	Sums of independent vector...
lspsnsubn0 21167	Unequal singleton spans im...
lsmcv 21168	Subspace sum has the cover...
lspsolvlem 21169	Lemma for ~ lspsolv . (Co...
lspsolv 21170	If ` X ` is in the span of...
lssacsex 21171	In a vector space, subspac...
lspsnat 21172	There is no subspace stric...
lspsncv0 21173	The span of a singleton co...
lsppratlem1 21174	Lemma for ~ lspprat . Let...
lsppratlem2 21175	Lemma for ~ lspprat . Sho...
lsppratlem3 21176	Lemma for ~ lspprat . In ...
lsppratlem4 21177	Lemma for ~ lspprat . In ...
lsppratlem5 21178	Lemma for ~ lspprat . Com...
lsppratlem6 21179	Lemma for ~ lspprat . Neg...
lspprat 21180	A proper subspace of the s...
islbs2 21181	An equivalent formulation ...
islbs3 21182	An equivalent formulation ...
lbsacsbs 21183	Being a basis in a vector ...
lvecdim 21184	The dimension theorem for ...
lbsextlem1 21185	Lemma for ~ lbsext . The ...
lbsextlem2 21186	Lemma for ~ lbsext . Sinc...
lbsextlem3 21187	Lemma for ~ lbsext . A ch...
lbsextlem4 21188	Lemma for ~ lbsext . ~ lbs...
lbsextg 21189	For any linearly independe...
lbsext 21190	For any linearly independe...
lbsexg 21191	Every vector space has a b...
lbsex 21192	Every vector space has a b...
lvecprop2d 21193	If two structures have the...
lvecpropd 21194	If two structures have the...
sraval 21199	Lemma for ~ srabase throug...
sralem 21200	Lemma for ~ srabase and si...
sralemOLD 21201	Obsolete version of ~ sral...
srabase 21202	Base set of a subring alge...
srabaseOLD 21203	Obsolete proof of ~ srabas...
sraaddg 21204	Additive operation of a su...
sraaddgOLD 21205	Obsolete proof of ~ sraadd...
sramulr 21206	Multiplicative operation o...
sramulrOLD 21207	Obsolete proof of ~ sramul...
srasca 21208	The set of scalars of a su...
srascaOLD 21209	Obsolete proof of ~ srasca...
sravsca 21210	The scalar product operati...
sravscaOLD 21211	Obsolete proof of ~ sravsc...
sraip 21212	The inner product operatio...
sratset 21213	Topology component of a su...
sratsetOLD 21214	Obsolete proof of ~ sratse...
sratopn 21215	Topology component of a su...
srads 21216	Distance function of a sub...
sradsOLD 21217	Obsolete proof of ~ srads ...
sraring 21218	Condition for a subring al...
sralmod 21219	The subring algebra is a l...
sralmod0 21220	The subring module inherit...
issubrgd 21221	Prove a subring by closure...
rlmfn 21222	` ringLMod ` is a function...
rlmval 21223	Value of the ring module. ...
rlmval2 21224	Value of the ring module e...
rlmbas 21225	Base set of the ring modul...
rlmplusg 21226	Vector addition in the rin...
rlm0 21227	Zero vector in the ring mo...
rlmsub 21228	Subtraction in the ring mo...
rlmmulr 21229	Ring multiplication in the...
rlmsca 21230	Scalars in the ring module...
rlmsca2 21231	Scalars in the ring module...
rlmvsca 21232	Scalar multiplication in t...
rlmtopn 21233	Topology component of the ...
rlmds 21234	Metric component of the ri...
rlmlmod 21235	The ring module is a modul...
rlmlvec 21236	The ring module over a div...
rlmlsm 21237	Subgroup sum of the ring m...
rlmvneg 21238	Vector negation in the rin...
rlmscaf 21239	Functionalized scalar mult...
ixpsnbasval 21240	The value of an infinite C...
lidlval 21245	Value of the set of ring i...
rspval 21246	Value of the ring span fun...
lidlss 21247	An ideal is a subset of th...
lidlssbas 21248	The base set of the restri...
lidlbas 21249	A (left) ideal of a ring i...
islidl 21250	Predicate of being a (left...
rnglidlmcl 21251	A (left) ideal containing ...
rngridlmcl 21252	A right ideal (which is a ...
dflidl2rng 21253	Alternate (the usual textb...
isridlrng 21254	A right ideal is a left id...
lidl0cl 21255	An ideal contains 0. (Con...
lidlacl 21256	An ideal is closed under a...
lidlnegcl 21257	An ideal contains negative...
lidlsubg 21258	An ideal is a subgroup of ...
lidlsubcl 21259	An ideal is closed under s...
lidlmcl 21260	An ideal is closed under l...
lidl1el 21261	An ideal contains 1 iff it...
dflidl2 21262	Alternate (the usual textb...
lidl0ALT 21263	Alternate proof for ~ lidl...
rnglidl0 21264	Every non-unital ring cont...
lidl0 21265	Every ring contains a zero...
lidl1ALT 21266	Alternate proof for ~ lidl...
rnglidl1 21267	The base set of every non-...
lidl1 21268	Every ring contains a unit...
lidlacs 21269	The ideal system is an alg...
rspcl 21270	The span of a set of ring ...
rspssid 21271	The span of a set of ring ...
rsp1 21272	The span of the identity e...
rsp0 21273	The span of the zero eleme...
rspssp 21274	The ideal span of a set of...
elrspsn 21275	Membership in a principal ...
mrcrsp 21276	Moore closure generalizes ...
lidlnz 21277	A nonzero ideal contains a...
drngnidl 21278	A division ring has only t...
lidlrsppropd 21279	The left ideals and ring s...
rnglidlmmgm 21280	The multiplicative group o...
rnglidlmsgrp 21281	The multiplicative group o...
rnglidlrng 21282	A (left) ideal of a non-un...
lidlnsg 21283	An ideal is a normal subgr...
2idlval 21286	Definition of a two-sided ...
isridl 21287	A right ideal is a left id...
2idlelb 21288	Membership in a two-sided ...
2idllidld 21289	A two-sided ideal is a lef...
2idlridld 21290	A two-sided ideal is a rig...
df2idl2rng 21291	Alternate (the usual textb...
df2idl2 21292	Alternate (the usual textb...
ridl0 21293	Every ring contains a zero...
ridl1 21294	Every ring contains a unit...
2idl0 21295	Every ring contains a zero...
2idl1 21296	Every ring contains a unit...
2idlss 21297	A two-sided ideal is a sub...
2idlbas 21298	The base set of a two-side...
2idlelbas 21299	The base set of a two-side...
rng2idlsubrng 21300	A two-sided ideal of a non...
rng2idlnsg 21301	A two-sided ideal of a non...
rng2idl0 21302	The zero (additive identit...
rng2idlsubgsubrng 21303	A two-sided ideal of a non...
rng2idlsubgnsg 21304	A two-sided ideal of a non...
rng2idlsubg0 21305	The zero (additive identit...
2idlcpblrng 21306	The coset equivalence rela...
2idlcpbl 21307	The coset equivalence rela...
qus2idrng 21308	The quotient of a non-unit...
qus1 21309	The multiplicative identit...
qusring 21310	If ` S ` is a two-sided id...
qusrhm 21311	If ` S ` is a two-sided id...
rhmpreimaidl 21312	The preimage of an ideal b...
kerlidl 21313	The kernel of a ring homom...
qusmul2idl 21314	Value of the ring operatio...
crngridl 21315	In a commutative ring, the...
crng2idl 21316	In a commutative ring, a t...
qusmulrng 21317	Value of the multiplicatio...
quscrng 21318	The quotient of a commutat...
qusmulcrng 21319	Value of the ring operatio...
rhmqusnsg 21320	The mapping ` J ` induced ...
rngqiprng1elbas 21321	The ring unity of a two-si...
rngqiprngghmlem1 21322	Lemma 1 for ~ rngqiprngghm...
rngqiprngghmlem2 21323	Lemma 2 for ~ rngqiprngghm...
rngqiprngghmlem3 21324	Lemma 3 for ~ rngqiprngghm...
rngqiprngimfolem 21325	Lemma for ~ rngqiprngimfo ...
rngqiprnglinlem1 21326	Lemma 1 for ~ rngqiprnglin...
rngqiprnglinlem2 21327	Lemma 2 for ~ rngqiprnglin...
rngqiprnglinlem3 21328	Lemma 3 for ~ rngqiprnglin...
rngqiprngimf1lem 21329	Lemma for ~ rngqiprngimf1 ...
rngqipbas 21330	The base set of the produc...
rngqiprng 21331	The product of the quotien...
rngqiprngimf 21332	` F ` is a function from (...
rngqiprngimfv 21333	The value of the function ...
rngqiprngghm 21334	` F ` is a homomorphism of...
rngqiprngimf1 21335	` F ` is a one-to-one func...
rngqiprngimfo 21336	` F ` is a function from (...
rngqiprnglin 21337	` F ` is linear with respe...
rngqiprngho 21338	` F ` is a homomorphism of...
rngqiprngim 21339	` F ` is an isomorphism of...
rng2idl1cntr 21340	The unity of a two-sided i...
rngringbdlem1 21341	In a unital ring, the quot...
rngringbdlem2 21342	A non-unital ring is unita...
rngringbd 21343	A non-unital ring is unita...
ring2idlqus 21344	For every unital ring ther...
ring2idlqusb 21345	A non-unital ring is unita...
rngqiprngfulem1 21346	Lemma 1 for ~ rngqiprngfu ...
rngqiprngfulem2 21347	Lemma 2 for ~ rngqiprngfu ...
rngqiprngfulem3 21348	Lemma 3 for ~ rngqiprngfu ...
rngqiprngfulem4 21349	Lemma 4 for ~ rngqiprngfu ...
rngqiprngfulem5 21350	Lemma 5 for ~ rngqiprngfu ...
rngqipring1 21351	The ring unity of the prod...
rngqiprngfu 21352	The function value of ` F ...
rngqiprngu 21353	If a non-unital ring has a...
ring2idlqus1 21354	If a non-unital ring has a...
lpival 21359	Value of the set of princi...
islpidl 21360	Property of being a princi...
lpi0 21361	The zero ideal is always p...
lpi1 21362	The unit ideal is always p...
islpir 21363	Principal ideal rings are ...
lpiss 21364	Principal ideals are a sub...
islpir2 21365	Principal ideal rings are ...
lpirring 21366	Principal ideal rings are ...
drnglpir 21367	Division rings are princip...
rspsn 21368	Membership in principal id...
lidldvgen 21369	An element generates an id...
lpigen 21370	An ideal is principal iff ...
cnfldstr 21391	The field of complex numbe...
cnfldex 21392	The field of complex numbe...
cnfldbas 21393	The base set of the field ...
mpocnfldadd 21394	The addition operation of ...
cnfldadd 21395	The addition operation of ...
mpocnfldmul 21396	The multiplication operati...
cnfldmul 21397	The multiplication operati...
cnfldcj 21398	The conjugation operation ...
cnfldtset 21399	The topology component of ...
cnfldle 21400	The ordering of the field ...
cnfldds 21401	The metric of the field of...
cnfldunif 21402	The uniform structure comp...
cnfldfun 21403	The field of complex numbe...
cnfldfunALT 21404	The field of complex numbe...
dfcnfldOLD 21405	Obsolete version of ~ df-c...
cnfldstrOLD 21406	Obsolete version of ~ cnfl...
cnfldexOLD 21407	Obsolete version of ~ cnfl...
cnfldbasOLD 21408	Obsolete version of ~ cnfl...
cnfldaddOLD 21409	Obsolete version of ~ cnfl...
cnfldmulOLD 21410	Obsolete version of ~ cnfl...
cnfldcjOLD 21411	Obsolete version of ~ cnfl...
cnfldtsetOLD 21412	Obsolete version of ~ cnfl...
cnfldleOLD 21413	Obsolete version of ~ cnfl...
cnflddsOLD 21414	Obsolete version of ~ cnfl...
cnfldunifOLD 21415	Obsolete version of ~ cnfl...
cnfldfunOLD 21416	Obsolete version of ~ cnfl...
cnfldfunALTOLD 21417	Obsolete version of ~ cnfl...
cnfldfunALTOLDOLD 21418	Obsolete proof of ~ cnfldf...
xrsstr 21419	The extended real structur...
xrsex 21420	The extended real structur...
xrsbas 21421	The base set of the extend...
xrsadd 21422	The addition operation of ...
xrsmul 21423	The multiplication operati...
xrstset 21424	The topology component of ...
xrsle 21425	The ordering of the extend...
cncrng 21426	The complex numbers form a...
cncrngOLD 21427	Obsolete version of ~ cncr...
cnring 21428	The complex numbers form a...
xrsmcmn 21429	The "multiplicative group"...
cnfld0 21430	Zero is the zero element o...
cnfld1 21431	One is the unity element o...
cnfld1OLD 21432	Obsolete version of ~ cnfl...
cnfldneg 21433	The additive inverse in th...
cnfldplusf 21434	The functionalized additio...
cnfldsub 21435	The subtraction operator i...
cndrng 21436	The complex numbers form a...
cndrngOLD 21437	Obsolete version of ~ cndr...
cnflddiv 21438	The division operation in ...
cnflddivOLD 21439	Obsolete version of ~ cnfl...
cnfldinv 21440	The multiplicative inverse...
cnfldmulg 21441	The group multiple functio...
cnfldexp 21442	The exponentiation operato...
cnsrng 21443	The complex numbers form a...
xrsmgm 21444	The "additive group" of th...
xrsnsgrp 21445	The "additive group" of th...
xrsmgmdifsgrp 21446	The "additive group" of th...
xrs1mnd 21447	The extended real numbers,...
xrs10 21448	The zero of the extended r...
xrs1cmn 21449	The extended real numbers ...
xrge0subm 21450	The nonnegative extended r...
xrge0cmn 21451	The nonnegative extended r...
xrsds 21452	The metric of the extended...
xrsdsval 21453	The metric of the extended...
xrsdsreval 21454	The metric of the extended...
xrsdsreclblem 21455	Lemma for ~ xrsdsreclb . ...
xrsdsreclb 21456	The metric of the extended...
cnsubmlem 21457	Lemma for ~ nn0subm and fr...
cnsubglem 21458	Lemma for ~ resubdrg and f...
cnsubrglem 21459	Lemma for ~ resubdrg and f...
cnsubrglemOLD 21460	Obsolete version of ~ cnsu...
cnsubdrglem 21461	Lemma for ~ resubdrg and f...
qsubdrg 21462	The rational numbers form ...
zsubrg 21463	The integers form a subrin...
gzsubrg 21464	The gaussian integers form...
nn0subm 21465	The nonnegative integers f...
rege0subm 21466	The nonnegative reals form...
absabv 21467	The regular absolute value...
zsssubrg 21468	The integers are a subset ...
qsssubdrg 21469	The rational numbers are a...
cnsubrg 21470	There are no subrings of t...
cnmgpabl 21471	The unit group of the comp...
cnmgpid 21472	The group identity element...
cnmsubglem 21473	Lemma for ~ rpmsubg and fr...
rpmsubg 21474	The positive reals form a ...
gzrngunitlem 21475	Lemma for ~ gzrngunit . (...
gzrngunit 21476	The units on ` ZZ [ _i ] `...
gsumfsum 21477	Relate a group sum on ` CC...
regsumfsum 21478	Relate a group sum on ` ( ...
expmhm 21479	Exponentiation is a monoid...
nn0srg 21480	The nonnegative integers f...
rge0srg 21481	The nonnegative real numbe...
zringcrng 21484	The ring of integers is a ...
zringring 21485	The ring of integers is a ...
zringrng 21486	The ring of integers is a ...
zringabl 21487	The ring of integers is an...
zringgrp 21488	The ring of integers is an...
zringbas 21489	The integers are the base ...
zringplusg 21490	The addition operation of ...
zringsub 21491	The subtraction of element...
zringmulg 21492	The multiplication (group ...
zringmulr 21493	The multiplication operati...
zring0 21494	The zero element of the ri...
zring1 21495	The unity element of the r...
zringnzr 21496	The ring of integers is a ...
dvdsrzring 21497	Ring divisibility in the r...
zringlpirlem1 21498	Lemma for ~ zringlpir . A...
zringlpirlem2 21499	Lemma for ~ zringlpir . A...
zringlpirlem3 21500	Lemma for ~ zringlpir . A...
zringinvg 21501	The additive inverse of an...
zringunit 21502	The units of ` ZZ ` are th...
zringlpir 21503	The integers are a princip...
zringndrg 21504	The integers are not a div...
zringcyg 21505	The integers are a cyclic ...
zringsubgval 21506	Subtraction in the ring of...
zringmpg 21507	The multiplicative group o...
prmirredlem 21508	A positive integer is irre...
dfprm2 21509	The positive irreducible e...
prmirred 21510	The irreducible elements o...
expghm 21511	Exponentiation is a group ...
mulgghm2 21512	The powers of a group elem...
mulgrhm 21513	The powers of the element ...
mulgrhm2 21514	The powers of the element ...
irinitoringc 21515	The ring of integers is an...
nzerooringczr 21516	There is no zero object in...
pzriprnglem1 21517	Lemma 1 for ~ pzriprng : `...
pzriprnglem2 21518	Lemma 2 for ~ pzriprng : ...
pzriprnglem3 21519	Lemma 3 for ~ pzriprng : ...
pzriprnglem4 21520	Lemma 4 for ~ pzriprng : `...
pzriprnglem5 21521	Lemma 5 for ~ pzriprng : `...
pzriprnglem6 21522	Lemma 6 for ~ pzriprng : `...
pzriprnglem7 21523	Lemma 7 for ~ pzriprng : `...
pzriprnglem8 21524	Lemma 8 for ~ pzriprng : `...
pzriprnglem9 21525	Lemma 9 for ~ pzriprng : ...
pzriprnglem10 21526	Lemma 10 for ~ pzriprng : ...
pzriprnglem11 21527	Lemma 11 for ~ pzriprng : ...
pzriprnglem12 21528	Lemma 12 for ~ pzriprng : ...
pzriprnglem13 21529	Lemma 13 for ~ pzriprng : ...
pzriprnglem14 21530	Lemma 14 for ~ pzriprng : ...
pzriprngALT 21531	The non-unital ring ` ( ZZ...
pzriprng1ALT 21532	The ring unity of the ring...
pzriprng 21533	The non-unital ring ` ( ZZ...
pzriprng1 21534	The ring unity of the ring...
zrhval 21543	Define the unique homomorp...
zrhval2 21544	Alternate value of the ` Z...
zrhmulg 21545	Value of the ` ZRHom ` hom...
zrhrhmb 21546	The ` ZRHom ` homomorphism...
zrhrhm 21547	The ` ZRHom ` homomorphism...
zrh1 21548	Interpretation of 1 in a r...
zrh0 21549	Interpretation of 0 in a r...
zrhpropd 21550	The ` ZZ ` ring homomorphi...
zlmval 21551	Augment an abelian group w...
zlmlem 21552	Lemma for ~ zlmbas and ~ z...
zlmlemOLD 21553	Obsolete version of ~ zlml...
zlmbas 21554	Base set of a ` ZZ ` -modu...
zlmbasOLD 21555	Obsolete version of ~ zlmb...
zlmplusg 21556	Group operation of a ` ZZ ...
zlmplusgOLD 21557	Obsolete version of ~ zlmb...
zlmmulr 21558	Ring operation of a ` ZZ `...
zlmmulrOLD 21559	Obsolete version of ~ zlmb...
zlmsca 21560	Scalar ring of a ` ZZ ` -m...
zlmvsca 21561	Scalar multiplication oper...
zlmlmod 21562	The ` ZZ ` -module operati...
chrval 21563	Definition substitution of...
chrcl 21564	Closure of the characteris...
chrid 21565	The canonical ` ZZ ` ring ...
chrdvds 21566	The ` ZZ ` ring homomorphi...
chrcong 21567	If two integers are congru...
dvdschrmulg 21568	In a ring, any multiple of...
fermltlchr 21569	A generalization of Fermat...
chrnzr 21570	Nonzero rings are precisel...
chrrhm 21571	The characteristic restric...
domnchr 21572	The characteristic of a do...
znlidl 21573	The set ` n ZZ ` is an ide...
zncrng2 21574	Making a commutative ring ...
znval 21575	The value of the ` Z/nZ ` ...
znle 21576	The value of the ` Z/nZ ` ...
znval2 21577	Self-referential expressio...
znbaslem 21578	Lemma for ~ znbas . (Cont...
znbaslemOLD 21579	Obsolete version of ~ znba...
znbas2 21580	The base set of ` Z/nZ ` i...
znbas2OLD 21581	Obsolete version of ~ znba...
znadd 21582	The additive structure of ...
znaddOLD 21583	Obsolete version of ~ znad...
znmul 21584	The multiplicative structu...
znmulOLD 21585	Obsolete version of ~ znad...
znzrh 21586	The ` ZZ ` ring homomorphi...
znbas 21587	The base set of ` Z/nZ ` s...
zncrng 21588	` Z/nZ ` is a commutative ...
znzrh2 21589	The ` ZZ ` ring homomorphi...
znzrhval 21590	The ` ZZ ` ring homomorphi...
znzrhfo 21591	The ` ZZ ` ring homomorphi...
zncyg 21592	The group ` ZZ / n ZZ ` is...
zndvds 21593	Express equality of equiva...
zndvds0 21594	Special case of ~ zndvds w...
znf1o 21595	The function ` F ` enumera...
zzngim 21596	The ` ZZ ` ring homomorphi...
znle2 21597	The ordering of the ` Z/nZ...
znleval 21598	The ordering of the ` Z/nZ...
znleval2 21599	The ordering of the ` Z/nZ...
zntoslem 21600	Lemma for ~ zntos . (Cont...
zntos 21601	The ` Z/nZ ` structure is ...
znhash 21602	The ` Z/nZ ` structure has...
znfi 21603	The ` Z/nZ ` structure is ...
znfld 21604	The ` Z/nZ ` structure is ...
znidomb 21605	The ` Z/nZ ` structure is ...
znchr 21606	Cyclic rings are defined b...
znunit 21607	The units of ` Z/nZ ` are ...
znunithash 21608	The size of the unit group...
znrrg 21609	The regular elements of ` ...
cygznlem1 21610	Lemma for ~ cygzn . (Cont...
cygznlem2a 21611	Lemma for ~ cygzn . (Cont...
cygznlem2 21612	Lemma for ~ cygzn . (Cont...
cygznlem3 21613	A cyclic group with ` n ` ...
cygzn 21614	A cyclic group with ` n ` ...
cygth 21615	The "fundamental theorem o...
cyggic 21616	Cyclic groups are isomorph...
frgpcyg 21617	A free group is cyclic iff...
freshmansdream 21618	For a prime number ` P ` ,...
frobrhm 21619	In a commutative ring with...
cnmsgnsubg 21620	The signs form a multiplic...
cnmsgnbas 21621	The base set of the sign s...
cnmsgngrp 21622	The group of signs under m...
psgnghm 21623	The sign is a homomorphism...
psgnghm2 21624	The sign is a homomorphism...
psgninv 21625	The sign of a permutation ...
psgnco 21626	Multiplicativity of the pe...
zrhpsgnmhm 21627	Embedding of permutation s...
zrhpsgninv 21628	The embedded sign of a per...
evpmss 21629	Even permutations are perm...
psgnevpmb 21630	A class is an even permuta...
psgnodpm 21631	A permutation which is odd...
psgnevpm 21632	A permutation which is eve...
psgnodpmr 21633	If a permutation has sign ...
zrhpsgnevpm 21634	The sign of an even permut...
zrhpsgnodpm 21635	The sign of an odd permuta...
cofipsgn 21636	Composition of any class `...
zrhpsgnelbas 21637	Embedding of permutation s...
zrhcopsgnelbas 21638	Embedding of permutation s...
evpmodpmf1o 21639	The function for performin...
pmtrodpm 21640	A transposition is an odd ...
psgnfix1 21641	A permutation of a finite ...
psgnfix2 21642	A permutation of a finite ...
psgndiflemB 21643	Lemma 1 for ~ psgndif . (...
psgndiflemA 21644	Lemma 2 for ~ psgndif . (...
psgndif 21645	Embedding of permutation s...
copsgndif 21646	Embedding of permutation s...
rebase 21649	The base of the field of r...
remulg 21650	The multiplication (group ...
resubdrg 21651	The real numbers form a di...
resubgval 21652	Subtraction in the field o...
replusg 21653	The addition operation of ...
remulr 21654	The multiplication operati...
re0g 21655	The zero element of the fi...
re1r 21656	The unity element of the f...
rele2 21657	The ordering relation of t...
relt 21658	The ordering relation of t...
reds 21659	The distance of the field ...
redvr 21660	The division operation of ...
retos 21661	The real numbers are a tot...
refld 21662	The real numbers form a fi...
refldcj 21663	The conjugation operation ...
resrng 21664	The real numbers form a st...
regsumsupp 21665	The group sum over the rea...
rzgrp 21666	The quotient group ` RR / ...
isphl 21671	The predicate "is a genera...
phllvec 21672	A pre-Hilbert space is a l...
phllmod 21673	A pre-Hilbert space is a l...
phlsrng 21674	The scalar ring of a pre-H...
phllmhm 21675	The inner product of a pre...
ipcl 21676	Closure of the inner produ...
ipcj 21677	Conjugate of an inner prod...
iporthcom 21678	Orthogonality (meaning inn...
ip0l 21679	Inner product with a zero ...
ip0r 21680	Inner product with a zero ...
ipeq0 21681	The inner product of a vec...
ipdir 21682	Distributive law for inner...
ipdi 21683	Distributive law for inner...
ip2di 21684	Distributive law for inner...
ipsubdir 21685	Distributive law for inner...
ipsubdi 21686	Distributive law for inner...
ip2subdi 21687	Distributive law for inner...
ipass 21688	Associative law for inner ...
ipassr 21689	"Associative" law for seco...
ipassr2 21690	"Associative" law for inne...
ipffval 21691	The inner product operatio...
ipfval 21692	The inner product operatio...
ipfeq 21693	If the inner product opera...
ipffn 21694	The inner product operatio...
phlipf 21695	The inner product operatio...
ip2eq 21696	Two vectors are equal iff ...
isphld 21697	Properties that determine ...
phlpropd 21698	If two structures have the...
ssipeq 21699	The inner product on a sub...
phssipval 21700	The inner product on a sub...
phssip 21701	The inner product (as a fu...
phlssphl 21702	A subspace of an inner pro...
ocvfval 21709	The orthocomplement operat...
ocvval 21710	Value of the orthocompleme...
elocv 21711	Elementhood in the orthoco...
ocvi 21712	Property of a member of th...
ocvss 21713	The orthocomplement of a s...
ocvocv 21714	A set is contained in its ...
ocvlss 21715	The orthocomplement of a s...
ocv2ss 21716	Orthocomplements reverse s...
ocvin 21717	An orthocomplement has tri...
ocvsscon 21718	Two ways to say that ` S `...
ocvlsp 21719	The orthocomplement of a l...
ocv0 21720	The orthocomplement of the...
ocvz 21721	The orthocomplement of the...
ocv1 21722	The orthocomplement of the...
unocv 21723	The orthocomplement of a u...
iunocv 21724	The orthocomplement of an ...
cssval 21725	The set of closed subspace...
iscss 21726	The predicate "is a closed...
cssi 21727	Property of a closed subsp...
cssss 21728	A closed subspace is a sub...
iscss2 21729	It is sufficient to prove ...
ocvcss 21730	The orthocomplement of any...
cssincl 21731	The zero subspace is a clo...
css0 21732	The zero subspace is a clo...
css1 21733	The whole space is a close...
csslss 21734	A closed subspace of a pre...
lsmcss 21735	A subset of a pre-Hilbert ...
cssmre 21736	The closed subspaces of a ...
mrccss 21737	The Moore closure correspo...
thlval 21738	Value of the Hilbert latti...
thlbas 21739	Base set of the Hilbert la...
thlbasOLD 21740	Obsolete proof of ~ thlbas...
thlle 21741	Ordering on the Hilbert la...
thlleOLD 21742	Obsolete proof of ~ thlle ...
thlleval 21743	Ordering on the Hilbert la...
thloc 21744	Orthocomplement on the Hil...
pjfval 21751	The value of the projectio...
pjdm 21752	A subspace is in the domai...
pjpm 21753	The projection map is a pa...
pjfval2 21754	Value of the projection ma...
pjval 21755	Value of the projection ma...
pjdm2 21756	A subspace is in the domai...
pjff 21757	A projection is a linear o...
pjf 21758	A projection is a function...
pjf2 21759	A projection is a function...
pjfo 21760	A projection is a surjecti...
pjcss 21761	A projection subspace is a...
ocvpj 21762	The orthocomplement of a p...
ishil 21763	The predicate "is a Hilber...
ishil2 21764	The predicate "is a Hilber...
isobs 21765	The predicate "is an ortho...
obsip 21766	The inner product of two e...
obsipid 21767	A basis element has length...
obsrcl 21768	Reverse closure for an ort...
obsss 21769	An orthonormal basis is a ...
obsne0 21770	A basis element is nonzero...
obsocv 21771	An orthonormal basis has t...
obs2ocv 21772	The double orthocomplement...
obselocv 21773	A basis element is in the ...
obs2ss 21774	A basis has no proper subs...
obslbs 21775	An orthogonal basis is a l...
reldmdsmm 21778	The direct sum is a well-b...
dsmmval 21779	Value of the module direct...
dsmmbase 21780	Base set of the module dir...
dsmmval2 21781	Self-referential definitio...
dsmmbas2 21782	Base set of the direct sum...
dsmmfi 21783	For finite products, the d...
dsmmelbas 21784	Membership in the finitely...
dsmm0cl 21785	The all-zero vector is con...
dsmmacl 21786	The finite hull is closed ...
prdsinvgd2 21787	Negation of a single coord...
dsmmsubg 21788	The finite hull of a produ...
dsmmlss 21789	The finite hull of a produ...
dsmmlmod 21790	The direct sum of a family...
frlmval 21793	Value of the "free module"...
frlmlmod 21794	The free module is a modul...
frlmpws 21795	The free module as a restr...
frlmlss 21796	The base set of the free m...
frlmpwsfi 21797	The finite free module is ...
frlmsca 21798	The ring of scalars of a f...
frlm0 21799	Zero in a free module (rin...
frlmbas 21800	Base set of the free modul...
frlmelbas 21801	Membership in the base set...
frlmrcl 21802	If a free module is inhabi...
frlmbasfsupp 21803	Elements of the free modul...
frlmbasmap 21804	Elements of the free modul...
frlmbasf 21805	Elements of the free modul...
frlmlvec 21806	The free module over a div...
frlmfibas 21807	The base set of the finite...
elfrlmbasn0 21808	If the dimension of a free...
frlmplusgval 21809	Addition in a free module....
frlmsubgval 21810	Subtraction in a free modu...
frlmvscafval 21811	Scalar multiplication in a...
frlmvplusgvalc 21812	Coordinates of a sum with ...
frlmvscaval 21813	Coordinates of a scalar mu...
frlmplusgvalb 21814	Addition in a free module ...
frlmvscavalb 21815	Scalar multiplication in a...
frlmvplusgscavalb 21816	Addition combined with sca...
frlmgsum 21817	Finite commutative sums in...
frlmsplit2 21818	Restriction is homomorphic...
frlmsslss 21819	A subset of a free module ...
frlmsslss2 21820	A subset of a free module ...
frlmbas3 21821	An element of the base set...
mpofrlmd 21822	Elements of the free modul...
frlmip 21823	The inner product of a fre...
frlmipval 21824	The inner product of a fre...
frlmphllem 21825	Lemma for ~ frlmphl . (Co...
frlmphl 21826	Conditions for a free modu...
uvcfval 21829	Value of the unit-vector g...
uvcval 21830	Value of a single unit vec...
uvcvval 21831	Value of a unit vector coo...
uvcvvcl 21832	A coordinate of a unit vec...
uvcvvcl2 21833	A unit vector coordinate i...
uvcvv1 21834	The unit vector is one at ...
uvcvv0 21835	The unit vector is zero at...
uvcff 21836	Domain and codomain of the...
uvcf1 21837	In a nonzero ring, each un...
uvcresum 21838	Any element of a free modu...
frlmssuvc1 21839	A scalar multiple of a uni...
frlmssuvc2 21840	A nonzero scalar multiple ...
frlmsslsp 21841	A subset of a free module ...
frlmlbs 21842	The unit vectors comprise ...
frlmup1 21843	Any assignment of unit vec...
frlmup2 21844	The evaluation map has the...
frlmup3 21845	The range of such an evalu...
frlmup4 21846	Universal property of the ...
ellspd 21847	The elements of the span o...
elfilspd 21848	Simplified version of ~ el...
rellindf 21853	The independent-family pre...
islinds 21854	Property of an independent...
linds1 21855	An independent set of vect...
linds2 21856	An independent set of vect...
islindf 21857	Property of an independent...
islinds2 21858	Expanded property of an in...
islindf2 21859	Property of an independent...
lindff 21860	Functional property of a l...
lindfind 21861	A linearly independent fam...
lindsind 21862	A linearly independent set...
lindfind2 21863	In a linearly independent ...
lindsind2 21864	In a linearly independent ...
lindff1 21865	A linearly independent fam...
lindfrn 21866	The range of an independen...
f1lindf 21867	Rearranging and deleting e...
lindfres 21868	Any restriction of an inde...
lindsss 21869	Any subset of an independe...
f1linds 21870	A family constructed from ...
islindf3 21871	In a nonzero ring, indepen...
lindfmm 21872	Linear independence of a f...
lindsmm 21873	Linear independence of a s...
lindsmm2 21874	The monomorphic image of a...
lsslindf 21875	Linear independence is unc...
lsslinds 21876	Linear independence is unc...
islbs4 21877	A basis is an independent ...
lbslinds 21878	A basis is independent. (...
islinds3 21879	A subset is linearly indep...
islinds4 21880	A set is independent in a ...
lmimlbs 21881	The isomorphic image of a ...
lmiclbs 21882	Having a basis is an isomo...
islindf4 21883	A family is independent if...
islindf5 21884	A family is independent if...
indlcim 21885	An independent, spanning f...
lbslcic 21886	A module with a basis is i...
lmisfree 21887	A module has a basis iff i...
lvecisfrlm 21888	Every vector space is isom...
lmimco 21889	The composition of two iso...
lmictra 21890	Module isomorphism is tran...
uvcf1o 21891	In a nonzero ring, the map...
uvcendim 21892	In a nonzero ring, the num...
frlmisfrlm 21893	A free module is isomorphi...
frlmiscvec 21894	Every free module is isomo...
isassa 21901	The properties of an assoc...
assalem 21902	The properties of an assoc...
assaass 21903	Left-associative property ...
assaassr 21904	Right-associative property...
assalmod 21905	An associative algebra is ...
assaring 21906	An associative algebra is ...
assasca 21907	The scalars of an associat...
assa2ass 21908	Left- and right-associativ...
assa2ass2 21909	Left- and right-associativ...
isassad 21910	Sufficient condition for b...
issubassa3 21911	A subring that is also a s...
issubassa 21912	The subalgebras of an asso...
sraassab 21913	A subring algebra is an as...
sraassa 21914	The subring algebra over a...
sraassaOLD 21915	Obsolete version of ~ sraa...
rlmassa 21916	The ring module over a com...
assapropd 21917	If two structures have the...
aspval 21918	Value of the algebraic clo...
asplss 21919	The algebraic span of a se...
aspid 21920	The algebraic span of a su...
aspsubrg 21921	The algebraic span of a se...
aspss 21922	Span preserves subset orde...
aspssid 21923	A set of vectors is a subs...
asclfval 21924	Function value of the alge...
asclval 21925	Value of a mapped algebra ...
asclfn 21926	Unconditional functionalit...
asclf 21927	The algebra scalars functi...
asclghm 21928	The algebra scalars functi...
ascl0 21929	The scalar 0 embedded into...
ascl1 21930	The scalar 1 embedded into...
asclmul1 21931	Left multiplication by a l...
asclmul2 21932	Right multiplication by a ...
ascldimul 21933	The algebra scalars functi...
asclinvg 21934	The group inverse (negatio...
asclrhm 21935	The algebra scalars functi...
rnascl 21936	The set of lifted scalars ...
issubassa2 21937	A subring of a unital alge...
rnasclsubrg 21938	The scalar multiples of th...
rnasclmulcl 21939	(Vector) multiplication is...
rnasclassa 21940	The scalar multiples of th...
ressascl 21941	The lifting of scalars is ...
asclpropd 21942	If two structures have the...
aspval2 21943	The algebraic closure is t...
assamulgscmlem1 21944	Lemma 1 for ~ assamulgscm ...
assamulgscmlem2 21945	Lemma for ~ assamulgscm (i...
assamulgscm 21946	Exponentiation of a scalar...
asclmulg 21947	Apply group multiplication...
zlmassa 21948	The ` ZZ ` -module operati...
reldmpsr 21959	The multivariate power ser...
psrval 21960	Value of the multivariate ...
psrvalstr 21961	The multivariate power ser...
psrbag 21962	Elementhood in the set of ...
psrbagf 21963	A finite bag is a function...
psrbagfsupp 21964	Finite bags have finite su...
snifpsrbag 21965	A bag containing one eleme...
fczpsrbag 21966	The constant function equa...
psrbaglesupp 21967	The support of a dominated...
psrbaglecl 21968	The set of finite bags is ...
psrbagaddcl 21969	The sum of two finite bags...
psrbagcon 21970	The analogue of the statem...
psrbaglefi 21971	There are finitely many ba...
psrbagconcl 21972	The complement of a bag is...
psrbagleadd1 21973	The analogue of " ` X <_ F...
psrbagconf1o 21974	Bag complementation is a b...
gsumbagdiaglem 21975	Lemma for ~ gsumbagdiag . ...
gsumbagdiag 21976	Two-dimensional commutatio...
psrass1lem 21977	A group sum commutation us...
psrbas 21978	The base set of the multiv...
psrelbas 21979	An element of the set of p...
psrelbasfun 21980	An element of the set of p...
psrplusg 21981	The addition operation of ...
psradd 21982	The addition operation of ...
psraddcl 21983	Closure of the power serie...
psraddclOLD 21984	Obsolete version of ~ psra...
rhmpsrlem1 21985	Lemma for ~ rhmpsr et al. ...
rhmpsrlem2 21986	Lemma for ~ rhmpsr et al. ...
psrmulr 21987	The multiplication operati...
psrmulfval 21988	The multiplication operati...
psrmulval 21989	The multiplication operati...
psrmulcllem 21990	Closure of the power serie...
psrmulcl 21991	Closure of the power serie...
psrsca 21992	The scalar field of the mu...
psrvscafval 21993	The scalar multiplication ...
psrvsca 21994	The scalar multiplication ...
psrvscaval 21995	The scalar multiplication ...
psrvscacl 21996	Closure of the power serie...
psr0cl 21997	The zero element of the ri...
psr0lid 21998	The zero element of the ri...
psrnegcl 21999	The negative function in t...
psrlinv 22000	The negative function in t...
psrgrp 22001	The ring of power series i...
psrgrpOLD 22002	Obsolete proof of ~ psrgrp...
psr0 22003	The zero element of the ri...
psrneg 22004	The negative function of t...
psrlmod 22005	The ring of power series i...
psr1cl 22006	The identity element of th...
psrlidm 22007	The identity element of th...
psrridm 22008	The identity element of th...
psrass1 22009	Associative identity for t...
psrdi 22010	Distributive law for the r...
psrdir 22011	Distributive law for the r...
psrass23l 22012	Associative identity for t...
psrcom 22013	Commutative law for the ri...
psrass23 22014	Associative identities for...
psrring 22015	The ring of power series i...
psr1 22016	The identity element of th...
psrcrng 22017	The ring of power series i...
psrassa 22018	The ring of power series i...
resspsrbas 22019	A restricted power series ...
resspsradd 22020	A restricted power series ...
resspsrmul 22021	A restricted power series ...
resspsrvsca 22022	A restricted power series ...
subrgpsr 22023	A subring of the base ring...
psrascl 22024	Value of the scalar inject...
psrasclcl 22025	A scalar is lifted into a ...
mvrfval 22026	Value of the generating el...
mvrval 22027	Value of the generating el...
mvrval2 22028	Value of the generating el...
mvrid 22029	The ` X i ` -th coefficien...
mvrf 22030	The power series variable ...
mvrf1 22031	The power series variable ...
mvrcl2 22032	A power series variable is...
reldmmpl 22033	The multivariate polynomia...
mplval 22034	Value of the set of multiv...
mplbas 22035	Base set of the set of mul...
mplelbas 22036	Property of being a polyno...
mvrcl 22037	A power series variable is...
mvrf2 22038	The power series/polynomia...
mplrcl 22039	Reverse closure for the po...
mplelsfi 22040	A polynomial treated as a ...
mplval2 22041	Self-referential expressio...
mplbasss 22042	The set of polynomials is ...
mplelf 22043	A polynomial is defined as...
mplsubglem 22044	If ` A ` is an ideal of se...
mpllsslem 22045	If ` A ` is an ideal of su...
mplsubglem2 22046	Lemma for ~ mplsubg and ~ ...
mplsubg 22047	The set of polynomials is ...
mpllss 22048	The set of polynomials is ...
mplsubrglem 22049	Lemma for ~ mplsubrg . (C...
mplsubrg 22050	The set of polynomials is ...
mpl0 22051	The zero polynomial. (Con...
mplplusg 22052	Value of addition in a pol...
mplmulr 22053	Value of multiplication in...
mpladd 22054	The addition operation on ...
mplneg 22055	The negative function on m...
mplmul 22056	The multiplication operati...
mpl1 22057	The identity element of th...
mplsca 22058	The scalar field of a mult...
mplvsca2 22059	The scalar multiplication ...
mplvsca 22060	The scalar multiplication ...
mplvscaval 22061	The scalar multiplication ...
mplgrp 22062	The polynomial ring is a g...
mpllmod 22063	The polynomial ring is a l...
mplring 22064	The polynomial ring is a r...
mpllvec 22065	The polynomial ring is a v...
mplcrng 22066	The polynomial ring is a c...
mplassa 22067	The polynomial ring is an ...
mplringd 22068	The polynomial ring is a r...
mpllmodd 22069	The polynomial ring is a l...
ressmplbas2 22070	The base set of a restrict...
ressmplbas 22071	A restricted polynomial al...
ressmpladd 22072	A restricted polynomial al...
ressmplmul 22073	A restricted polynomial al...
ressmplvsca 22074	A restricted power series ...
subrgmpl 22075	A subring of the base ring...
subrgmvr 22076	The variables in a subring...
subrgmvrf 22077	The variables in a polynom...
mplmon 22078	A monomial is a polynomial...
mplmonmul 22079	The product of two monomia...
mplcoe1 22080	Decompose a polynomial int...
mplcoe3 22081	Decompose a monomial in on...
mplcoe5lem 22082	Lemma for ~ mplcoe4 . (Co...
mplcoe5 22083	Decompose a monomial into ...
mplcoe2 22084	Decompose a monomial into ...
mplbas2 22085	An alternative expression ...
ltbval 22086	Value of the well-order on...
ltbwe 22087	The finite bag order is a ...
reldmopsr 22088	Lemma for ordered power se...
opsrval 22089	The value of the "ordered ...
opsrle 22090	An alternative expression ...
opsrval2 22091	Self-referential expressio...
opsrbaslem 22092	Get a component of the ord...
opsrbaslemOLD 22093	Obsolete version of ~ opsr...
opsrbas 22094	The base set of the ordere...
opsrbasOLD 22095	Obsolete version of ~ opsr...
opsrplusg 22096	The addition operation of ...
opsrplusgOLD 22097	Obsolete version of ~ opsr...
opsrmulr 22098	The multiplication operati...
opsrmulrOLD 22099	Obsolete version of ~ opsr...
opsrvsca 22100	The scalar product operati...
opsrvscaOLD 22101	Obsolete version of ~ opsr...
opsrsca 22102	The scalar ring of the ord...
opsrscaOLD 22103	Obsolete version of ~ opsr...
opsrtoslem1 22104	Lemma for ~ opsrtos . (Co...
opsrtoslem2 22105	Lemma for ~ opsrtos . (Co...
opsrtos 22106	The ordered power series s...
opsrso 22107	The ordered power series s...
opsrcrng 22108	The ring of ordered power ...
opsrassa 22109	The ring of ordered power ...
mplmon2 22110	Express a scaled monomial....
psrbag0 22111	The empty bag is a bag. (...
psrbagsn 22112	A singleton bag is a bag. ...
mplascl 22113	Value of the scalar inject...
mplasclf 22114	The scalar injection is a ...
subrgascl 22115	The scalar injection funct...
subrgasclcl 22116	The scalars in a polynomia...
mplmon2cl 22117	A scaled monomial is a pol...
mplmon2mul 22118	Product of scaled monomial...
mplind 22119	Prove a property of polyno...
mplcoe4 22120	Decompose a polynomial int...
evlslem4 22125	The support of a tensor pr...
psrbagev1 22126	A bag of multipliers provi...
psrbagev2 22127	Closure of a sum using a b...
evlslem2 22128	A linear function on the p...
evlslem3 22129	Lemma for ~ evlseu . Poly...
evlslem6 22130	Lemma for ~ evlseu . Fini...
evlslem1 22131	Lemma for ~ evlseu , give ...
evlseu 22132	For a given interpretation...
reldmevls 22133	Well-behaved binary operat...
mpfrcl 22134	Reverse closure for the se...
evlsval 22135	Value of the polynomial ev...
evlsval2 22136	Characterizing properties ...
evlsrhm 22137	Polynomial evaluation is a...
evlssca 22138	Polynomial evaluation maps...
evlsvar 22139	Polynomial evaluation maps...
evlsgsumadd 22140	Polynomial evaluation maps...
evlsgsummul 22141	Polynomial evaluation maps...
evlspw 22142	Polynomial evaluation for ...
evlsvarpw 22143	Polynomial evaluation for ...
evlval 22144	Value of the simple/same r...
evlrhm 22145	The simple evaluation map ...
evlsscasrng 22146	The evaluation of a scalar...
evlsca 22147	Simple polynomial evaluati...
evlsvarsrng 22148	The evaluation of the vari...
evlvar 22149	Simple polynomial evaluati...
mpfconst 22150	Constants are multivariate...
mpfproj 22151	Projections are multivaria...
mpfsubrg 22152	Polynomial functions are a...
mpff 22153	Polynomial functions are f...
mpfaddcl 22154	The sum of multivariate po...
mpfmulcl 22155	The product of multivariat...
mpfind 22156	Prove a property of polyno...
selvffval 22162	Value of the "variable sel...
selvfval 22163	Value of the "variable sel...
selvval 22164	Value of the "variable sel...
reldmmhp 22166	The domain of the homogene...
mhpfval 22167	Value of the "homogeneous ...
mhpval 22168	Value of the "homogeneous ...
ismhp 22169	Property of being a homoge...
ismhp2 22170	Deduce a homogeneous polyn...
ismhp3 22171	A polynomial is homogeneou...
mhprcl 22172	Reverse closure for homoge...
mhpmpl 22173	A homogeneous polynomial i...
mhpdeg 22174	All nonzero terms of a hom...
mhp0cl 22175	The zero polynomial is hom...
mhpsclcl 22176	A scalar (or constant) pol...
mhpvarcl 22177	A power series variable is...
mhpmulcl 22178	A product of homogeneous p...
mhppwdeg 22179	Degree of a homogeneous po...
mhpaddcl 22180	Homogeneous polynomials ar...
mhpinvcl 22181	Homogeneous polynomials ar...
mhpsubg 22182	Homogeneous polynomials fo...
mhpvscacl 22183	Homogeneous polynomials ar...
mhplss 22184	Homogeneous polynomials fo...
psdffval 22186	Value of the power series ...
psdfval 22187	Give a map between power s...
psdval 22188	Evaluate the partial deriv...
psdcoef 22189	Coefficient of a term of t...
psdcl 22190	The derivative of a power ...
psdmplcl 22191	The derivative of a polyno...
psdadd 22192	The derivative of a sum is...
psdvsca 22193	The derivative of a scaled...
psdmullem 22194	Lemma for ~ psdmul . Tran...
psdmul 22195	Product rule for power ser...
psd1 22196	The derivative of one is z...
psdascl 22197	The derivative of a consta...
psr1baslem 22209	The set of finite bags on ...
psr1val 22210	Value of the ring of univa...
psr1crng 22211	The ring of univariate pow...
psr1assa 22212	The ring of univariate pow...
psr1tos 22213	The ordered power series s...
psr1bas2 22214	The base set of the ring o...
psr1bas 22215	The base set of the ring o...
vr1val 22216	The value of the generator...
vr1cl2 22217	The variable ` X ` is a me...
ply1val 22218	The value of the set of un...
ply1bas 22219	The value of the base set ...
ply1basOLD 22220	Obsolete version of ~ ply1...
ply1lss 22221	Univariate polynomials for...
ply1subrg 22222	Univariate polynomials for...
ply1crng 22223	The ring of univariate pol...
ply1assa 22224	The ring of univariate pol...
psr1bascl 22225	A univariate power series ...
psr1basf 22226	Univariate power series ba...
ply1basf 22227	Univariate polynomial base...
ply1bascl 22228	A univariate polynomial is...
ply1bascl2 22229	A univariate polynomial is...
coe1fval 22230	Value of the univariate po...
coe1fv 22231	Value of an evaluated coef...
fvcoe1 22232	Value of a multivariate co...
coe1fval3 22233	Univariate power series co...
coe1f2 22234	Functionality of univariat...
coe1fval2 22235	Univariate polynomial coef...
coe1f 22236	Functionality of univariat...
coe1fvalcl 22237	A coefficient of a univari...
coe1sfi 22238	Finite support of univaria...
coe1fsupp 22239	The coefficient vector of ...
mptcoe1fsupp 22240	A mapping involving coeffi...
coe1ae0 22241	The coefficient vector of ...
vr1cl 22242	The generator of a univari...
opsr0 22243	Zero in the ordered power ...
opsr1 22244	One in the ordered power s...
psr1plusg 22245	Value of addition in a uni...
psr1vsca 22246	Value of scalar multiplica...
psr1mulr 22247	Value of multiplication in...
ply1plusg 22248	Value of addition in a uni...
ply1vsca 22249	Value of scalar multiplica...
ply1mulr 22250	Value of multiplication in...
ply1ass23l 22251	Associative identity with ...
ressply1bas2 22252	The base set of a restrict...
ressply1bas 22253	A restricted polynomial al...
ressply1add 22254	A restricted polynomial al...
ressply1mul 22255	A restricted polynomial al...
ressply1vsca 22256	A restricted power series ...
subrgply1 22257	A subring of the base ring...
gsumply1subr 22258	Evaluate a group sum in a ...
psrbaspropd 22259	Property deduction for pow...
psrplusgpropd 22260	Property deduction for pow...
mplbaspropd 22261	Property deduction for pol...
psropprmul 22262	Reversing multiplication i...
ply1opprmul 22263	Reversing multiplication i...
00ply1bas 22264	Lemma for ~ ply1basfvi and...
ply1basfvi 22265	Protection compatibility o...
ply1plusgfvi 22266	Protection compatibility o...
ply1baspropd 22267	Property deduction for uni...
ply1plusgpropd 22268	Property deduction for uni...
opsrring 22269	Ordered power series form ...
opsrlmod 22270	Ordered power series form ...
psr1ring 22271	Univariate power series fo...
ply1ring 22272	Univariate polynomials for...
psr1lmod 22273	Univariate power series fo...
psr1sca 22274	Scalars of a univariate po...
psr1sca2 22275	Scalars of a univariate po...
ply1lmod 22276	Univariate polynomials for...
ply1sca 22277	Scalars of a univariate po...
ply1sca2 22278	Scalars of a univariate po...
ply1ascl0 22279	The zero scalar as a polyn...
ply1ascl1 22280	The multiplicative identit...
ply1mpl0 22281	The univariate polynomial ...
ply10s0 22282	Zero times a univariate po...
ply1mpl1 22283	The univariate polynomial ...
ply1ascl 22284	The univariate polynomial ...
subrg1ascl 22285	The scalar injection funct...
subrg1asclcl 22286	The scalars in a polynomia...
subrgvr1 22287	The variables in a subring...
subrgvr1cl 22288	The variables in a polynom...
coe1z 22289	The coefficient vector of ...
coe1add 22290	The coefficient vector of ...
coe1addfv 22291	A particular coefficient o...
coe1subfv 22292	A particular coefficient o...
coe1mul2lem1 22293	An equivalence for ~ coe1m...
coe1mul2lem2 22294	An equivalence for ~ coe1m...
coe1mul2 22295	The coefficient vector of ...
coe1mul 22296	The coefficient vector of ...
ply1moncl 22297	Closure of the expression ...
ply1tmcl 22298	Closure of the expression ...
coe1tm 22299	Coefficient vector of a po...
coe1tmfv1 22300	Nonzero coefficient of a p...
coe1tmfv2 22301	Zero coefficient of a poly...
coe1tmmul2 22302	Coefficient vector of a po...
coe1tmmul 22303	Coefficient vector of a po...
coe1tmmul2fv 22304	Function value of a right-...
coe1pwmul 22305	Coefficient vector of a po...
coe1pwmulfv 22306	Function value of a right-...
ply1scltm 22307	A scalar is a term with ze...
coe1sclmul 22308	Coefficient vector of a po...
coe1sclmulfv 22309	A single coefficient of a ...
coe1sclmul2 22310	Coefficient vector of a po...
ply1sclf 22311	A scalar polynomial is a p...
ply1sclcl 22312	The value of the algebra s...
coe1scl 22313	Coefficient vector of a sc...
ply1sclid 22314	Recover the base scalar fr...
ply1sclf1 22315	The polynomial scalar func...
ply1scl0 22316	The zero scalar is zero. ...
ply1scl0OLD 22317	Obsolete version of ~ ply1...
ply1scln0 22318	Nonzero scalars create non...
ply1scl1 22319	The one scalar is the unit...
ply1scl1OLD 22320	Obsolete version of ~ ply1...
ply1idvr1 22321	The identity of a polynomi...
ply1idvr1OLD 22322	Obsolete version of ~ ply1...
cply1mul 22323	The product of two constan...
ply1coefsupp 22324	The decomposition of a uni...
ply1coe 22325	Decompose a univariate pol...
eqcoe1ply1eq 22326	Two polynomials over the s...
ply1coe1eq 22327	Two polynomials over the s...
cply1coe0 22328	All but the first coeffici...
cply1coe0bi 22329	A polynomial is constant (...
coe1fzgsumdlem 22330	Lemma for ~ coe1fzgsumd (i...
coe1fzgsumd 22331	Value of an evaluated coef...
ply1scleq 22332	Equality of a constant pol...
ply1chr 22333	The characteristic of a po...
gsumsmonply1 22334	A finite group sum of scal...
gsummoncoe1 22335	A coefficient of the polyn...
gsumply1eq 22336	Two univariate polynomials...
lply1binom 22337	The binomial theorem for l...
lply1binomsc 22338	The binomial theorem for l...
ply1fermltlchr 22339	Fermat's little theorem fo...
reldmevls1 22344	Well-behaved binary operat...
ply1frcl 22345	Reverse closure for the se...
evls1fval 22346	Value of the univariate po...
evls1val 22347	Value of the univariate po...
evls1rhmlem 22348	Lemma for ~ evl1rhm and ~ ...
evls1rhm 22349	Polynomial evaluation is a...
evls1sca 22350	Univariate polynomial eval...
evls1gsumadd 22351	Univariate polynomial eval...
evls1gsummul 22352	Univariate polynomial eval...
evls1pw 22353	Univariate polynomial eval...
evls1varpw 22354	Univariate polynomial eval...
evl1fval 22355	Value of the simple/same r...
evl1val 22356	Value of the simple/same r...
evl1fval1lem 22357	Lemma for ~ evl1fval1 . (...
evl1fval1 22358	Value of the simple/same r...
evl1rhm 22359	Polynomial evaluation is a...
fveval1fvcl 22360	The function value of the ...
evl1sca 22361	Polynomial evaluation maps...
evl1scad 22362	Polynomial evaluation buil...
evl1var 22363	Polynomial evaluation maps...
evl1vard 22364	Polynomial evaluation buil...
evls1var 22365	Univariate polynomial eval...
evls1scasrng 22366	The evaluation of a scalar...
evls1varsrng 22367	The evaluation of the vari...
evl1addd 22368	Polynomial evaluation buil...
evl1subd 22369	Polynomial evaluation buil...
evl1muld 22370	Polynomial evaluation buil...
evl1vsd 22371	Polynomial evaluation buil...
evl1expd 22372	Polynomial evaluation buil...
pf1const 22373	Constants are polynomial f...
pf1id 22374	The identity is a polynomi...
pf1subrg 22375	Polynomial functions are a...
pf1rcl 22376	Reverse closure for the se...
pf1f 22377	Polynomial functions are f...
mpfpf1 22378	Convert a multivariate pol...
pf1mpf 22379	Convert a univariate polyn...
pf1addcl 22380	The sum of multivariate po...
pf1mulcl 22381	The product of multivariat...
pf1ind 22382	Prove a property of polyno...
evl1gsumdlem 22383	Lemma for ~ evl1gsumd (ind...
evl1gsumd 22384	Polynomial evaluation buil...
evl1gsumadd 22385	Univariate polynomial eval...
evl1gsumaddval 22386	Value of a univariate poly...
evl1gsummul 22387	Univariate polynomial eval...
evl1varpw 22388	Univariate polynomial eval...
evl1varpwval 22389	Value of a univariate poly...
evl1scvarpw 22390	Univariate polynomial eval...
evl1scvarpwval 22391	Value of a univariate poly...
evl1gsummon 22392	Value of a univariate poly...
evls1scafv 22393	Value of the univariate po...
evls1expd 22394	Univariate polynomial eval...
evls1varpwval 22395	Univariate polynomial eval...
evls1fpws 22396	Evaluation of a univariate...
ressply1evl 22397	Evaluation of a univariate...
evls1addd 22398	Univariate polynomial eval...
evls1muld 22399	Univariate polynomial eval...
evls1vsca 22400	Univariate polynomial eval...
asclply1subcl 22401	Closure of the algebra sca...
evls1fvcl 22402	Variant of ~ fveval1fvcl f...
evls1maprhm 22403	The function ` F ` mapping...
evls1maplmhm 22404	The function ` F ` mapping...
evls1maprnss 22405	The function ` F ` mapping...
evl1maprhm 22406	The function ` F ` mapping...
mhmcompl 22407	The composition of a monoi...
mhmcoaddmpl 22408	Show that the ring homomor...
rhmcomulmpl 22409	Show that the ring homomor...
rhmmpl 22410	Provide a ring homomorphis...
ply1vscl 22411	Closure of scalar multipli...
mhmcoply1 22412	The composition of a monoi...
rhmply1 22413	Provide a ring homomorphis...
rhmply1vr1 22414	A ring homomorphism betwee...
rhmply1vsca 22415	Apply a ring homomorphism ...
rhmply1mon 22416	Apply a ring homomorphism ...
mamufval 22419	Functional value of the ma...
mamuval 22420	Multiplication of two matr...
mamufv 22421	A cell in the multiplicati...
mamudm 22422	The domain of the matrix m...
mamufacex 22423	Every solution of the equa...
mamures 22424	Rows in a matrix product a...
grpvlinv 22425	Tuple-wise left inverse in...
grpvrinv 22426	Tuple-wise right inverse i...
ringvcl 22427	Tuple-wise multiplication ...
mamucl 22428	Operation closure of matri...
mamuass 22429	Matrix multiplication is a...
mamudi 22430	Matrix multiplication dist...
mamudir 22431	Matrix multiplication dist...
mamuvs1 22432	Matrix multiplication dist...
mamuvs2 22433	Matrix multiplication dist...
matbas0pc 22436	There is no matrix with a ...
matbas0 22437	There is no matrix for a n...
matval 22438	Value of the matrix algebr...
matrcl 22439	Reverse closure for the ma...
matbas 22440	The matrix ring has the sa...
matplusg 22441	The matrix ring has the sa...
matsca 22442	The matrix ring has the sa...
matscaOLD 22443	Obsolete proof of ~ matsca...
matvsca 22444	The matrix ring has the sa...
matvscaOLD 22445	Obsolete proof of ~ matvsc...
mat0 22446	The matrix ring has the sa...
matinvg 22447	The matrix ring has the sa...
mat0op 22448	Value of a zero matrix as ...
matsca2 22449	The scalars of the matrix ...
matbas2 22450	The base set of the matrix...
matbas2i 22451	A matrix is a function. (...
matbas2d 22452	The base set of the matrix...
eqmat 22453	Two square matrices of the...
matecl 22454	Each entry (according to W...
matecld 22455	Each entry (according to W...
matplusg2 22456	Addition in the matrix rin...
matvsca2 22457	Scalar multiplication in t...
matlmod 22458	The matrix ring is a linea...
matgrp 22459	The matrix ring is a group...
matvscl 22460	Closure of the scalar mult...
matsubg 22461	The matrix ring has the sa...
matplusgcell 22462	Addition in the matrix rin...
matsubgcell 22463	Subtraction in the matrix ...
matinvgcell 22464	Additive inversion in the ...
matvscacell 22465	Scalar multiplication in t...
matgsum 22466	Finite commutative sums in...
matmulr 22467	Multiplication in the matr...
mamumat1cl 22468	The identity matrix (as op...
mat1comp 22469	The components of the iden...
mamulid 22470	The identity matrix (as op...
mamurid 22471	The identity matrix (as op...
matring 22472	Existence of the matrix ri...
matassa 22473	Existence of the matrix al...
matmulcell 22474	Multiplication in the matr...
mpomatmul 22475	Multiplication of two N x ...
mat1 22476	Value of an identity matri...
mat1ov 22477	Entries of an identity mat...
mat1bas 22478	The identity matrix is a m...
matsc 22479	The identity matrix multip...
ofco2 22480	Distribution law for the f...
oftpos 22481	The transposition of the v...
mattposcl 22482	The transpose of a square ...
mattpostpos 22483	The transpose of the trans...
mattposvs 22484	The transposition of a mat...
mattpos1 22485	The transposition of the i...
tposmap 22486	The transposition of an I ...
mamutpos 22487	Behavior of transposes in ...
mattposm 22488	Multiplying two transposed...
matgsumcl 22489	Closure of a group sum ove...
madetsumid 22490	The identity summand in th...
matepmcl 22491	Each entry of a matrix wit...
matepm2cl 22492	Each entry of a matrix wit...
madetsmelbas 22493	A summand of the determina...
madetsmelbas2 22494	A summand of the determina...
mat0dimbas0 22495	The empty set is the one a...
mat0dim0 22496	The zero of the algebra of...
mat0dimid 22497	The identity of the algebr...
mat0dimscm 22498	The scalar multiplication ...
mat0dimcrng 22499	The algebra of matrices wi...
mat1dimelbas 22500	A matrix with dimension 1 ...
mat1dimbas 22501	A matrix with dimension 1 ...
mat1dim0 22502	The zero of the algebra of...
mat1dimid 22503	The identity of the algebr...
mat1dimscm 22504	The scalar multiplication ...
mat1dimmul 22505	The ring multiplication in...
mat1dimcrng 22506	The algebra of matrices wi...
mat1f1o 22507	There is a 1-1 function fr...
mat1rhmval 22508	The value of the ring homo...
mat1rhmelval 22509	The value of the ring homo...
mat1rhmcl 22510	The value of the ring homo...
mat1f 22511	There is a function from a...
mat1ghm 22512	There is a group homomorph...
mat1mhm 22513	There is a monoid homomorp...
mat1rhm 22514	There is a ring homomorphi...
mat1rngiso 22515	There is a ring isomorphis...
mat1ric 22516	A ring is isomorphic to th...
dmatval 22521	The set of ` N ` x ` N ` d...
dmatel 22522	A ` N ` x ` N ` diagonal m...
dmatmat 22523	An ` N ` x ` N ` diagonal ...
dmatid 22524	The identity matrix is a d...
dmatelnd 22525	An extradiagonal entry of ...
dmatmul 22526	The product of two diagona...
dmatsubcl 22527	The difference of two diag...
dmatsgrp 22528	The set of diagonal matric...
dmatmulcl 22529	The product of two diagona...
dmatsrng 22530	The set of diagonal matric...
dmatcrng 22531	The subring of diagonal ma...
dmatscmcl 22532	The multiplication of a di...
scmatval 22533	The set of ` N ` x ` N ` s...
scmatel 22534	An ` N ` x ` N ` scalar ma...
scmatscmid 22535	A scalar matrix can be exp...
scmatscmide 22536	An entry of a scalar matri...
scmatscmiddistr 22537	Distributive law for scala...
scmatmat 22538	An ` N ` x ` N ` scalar ma...
scmate 22539	An entry of an ` N ` x ` N...
scmatmats 22540	The set of an ` N ` x ` N ...
scmateALT 22541	Alternate proof of ~ scmat...
scmatscm 22542	The multiplication of a ma...
scmatid 22543	The identity matrix is a s...
scmatdmat 22544	A scalar matrix is a diago...
scmataddcl 22545	The sum of two scalar matr...
scmatsubcl 22546	The difference of two scal...
scmatmulcl 22547	The product of two scalar ...
scmatsgrp 22548	The set of scalar matrices...
scmatsrng 22549	The set of scalar matrices...
scmatcrng 22550	The subring of scalar matr...
scmatsgrp1 22551	The set of scalar matrices...
scmatsrng1 22552	The set of scalar matrices...
smatvscl 22553	Closure of the scalar mult...
scmatlss 22554	The set of scalar matrices...
scmatstrbas 22555	The set of scalar matrices...
scmatrhmval 22556	The value of the ring homo...
scmatrhmcl 22557	The value of the ring homo...
scmatf 22558	There is a function from a...
scmatfo 22559	There is a function from a...
scmatf1 22560	There is a 1-1 function fr...
scmatf1o 22561	There is a bijection betwe...
scmatghm 22562	There is a group homomorph...
scmatmhm 22563	There is a monoid homomorp...
scmatrhm 22564	There is a ring homomorphi...
scmatrngiso 22565	There is a ring isomorphis...
scmatric 22566	A ring is isomorphic to ev...
mat0scmat 22567	The empty matrix over a ri...
mat1scmat 22568	A 1-dimensional matrix ove...
mvmulfval 22571	Functional value of the ma...
mvmulval 22572	Multiplication of a vector...
mvmulfv 22573	A cell/element in the vect...
mavmulval 22574	Multiplication of a vector...
mavmulfv 22575	A cell/element in the vect...
mavmulcl 22576	Multiplication of an NxN m...
1mavmul 22577	Multiplication of the iden...
mavmulass 22578	Associativity of the multi...
mavmuldm 22579	The domain of the matrix v...
mavmulsolcl 22580	Every solution of the equa...
mavmul0 22581	Multiplication of a 0-dime...
mavmul0g 22582	The result of the 0-dimens...
mvmumamul1 22583	The multiplication of an M...
mavmumamul1 22584	The multiplication of an N...
marrepfval 22589	First substitution for the...
marrepval0 22590	Second substitution for th...
marrepval 22591	Third substitution for the...
marrepeval 22592	An entry of a matrix with ...
marrepcl 22593	Closure of the row replace...
marepvfval 22594	First substitution for the...
marepvval0 22595	Second substitution for th...
marepvval 22596	Third substitution for the...
marepveval 22597	An entry of a matrix with ...
marepvcl 22598	Closure of the column repl...
ma1repvcl 22599	Closure of the column repl...
ma1repveval 22600	An entry of an identity ma...
mulmarep1el 22601	Element by element multipl...
mulmarep1gsum1 22602	The sum of element by elem...
mulmarep1gsum2 22603	The sum of element by elem...
1marepvmarrepid 22604	Replacing the ith row by 0...
submabas 22607	Any subset of the index se...
submafval 22608	First substitution for a s...
submaval0 22609	Second substitution for a ...
submaval 22610	Third substitution for a s...
submaeval 22611	An entry of a submatrix of...
1marepvsma1 22612	The submatrix of the ident...
mdetfval 22615	First substitution for the...
mdetleib 22616	Full substitution of our d...
mdetleib2 22617	Leibniz' formula can also ...
nfimdetndef 22618	The determinant is not def...
mdetfval1 22619	First substitution of an a...
mdetleib1 22620	Full substitution of an al...
mdet0pr 22621	The determinant function f...
mdet0f1o 22622	The determinant function f...
mdet0fv0 22623	The determinant of the emp...
mdetf 22624	Functionality of the deter...
mdetcl 22625	The determinant evaluates ...
m1detdiag 22626	The determinant of a 1-dim...
mdetdiaglem 22627	Lemma for ~ mdetdiag . Pr...
mdetdiag 22628	The determinant of a diago...
mdetdiagid 22629	The determinant of a diago...
mdet1 22630	The determinant of the ide...
mdetrlin 22631	The determinant function i...
mdetrsca 22632	The determinant function i...
mdetrsca2 22633	The determinant function i...
mdetr0 22634	The determinant of a matri...
mdet0 22635	The determinant of the zer...
mdetrlin2 22636	The determinant function i...
mdetralt 22637	The determinant function i...
mdetralt2 22638	The determinant function i...
mdetero 22639	The determinant function i...
mdettpos 22640	Determinant is invariant u...
mdetunilem1 22641	Lemma for ~ mdetuni . (Co...
mdetunilem2 22642	Lemma for ~ mdetuni . (Co...
mdetunilem3 22643	Lemma for ~ mdetuni . (Co...
mdetunilem4 22644	Lemma for ~ mdetuni . (Co...
mdetunilem5 22645	Lemma for ~ mdetuni . (Co...
mdetunilem6 22646	Lemma for ~ mdetuni . (Co...
mdetunilem7 22647	Lemma for ~ mdetuni . (Co...
mdetunilem8 22648	Lemma for ~ mdetuni . (Co...
mdetunilem9 22649	Lemma for ~ mdetuni . (Co...
mdetuni0 22650	Lemma for ~ mdetuni . (Co...
mdetuni 22651	According to the definitio...
mdetmul 22652	Multiplicativity of the de...
m2detleiblem1 22653	Lemma 1 for ~ m2detleib . ...
m2detleiblem5 22654	Lemma 5 for ~ m2detleib . ...
m2detleiblem6 22655	Lemma 6 for ~ m2detleib . ...
m2detleiblem7 22656	Lemma 7 for ~ m2detleib . ...
m2detleiblem2 22657	Lemma 2 for ~ m2detleib . ...
m2detleiblem3 22658	Lemma 3 for ~ m2detleib . ...
m2detleiblem4 22659	Lemma 4 for ~ m2detleib . ...
m2detleib 22660	Leibniz' Formula for 2x2-m...
mndifsplit 22665	Lemma for ~ maducoeval2 . ...
madufval 22666	First substitution for the...
maduval 22667	Second substitution for th...
maducoeval 22668	An entry of the adjunct (c...
maducoeval2 22669	An entry of the adjunct (c...
maduf 22670	Creating the adjunct of ma...
madutpos 22671	The adjuct of a transposed...
madugsum 22672	The determinant of a matri...
madurid 22673	Multiplying a matrix with ...
madulid 22674	Multiplying the adjunct of...
minmar1fval 22675	First substitution for the...
minmar1val0 22676	Second substitution for th...
minmar1val 22677	Third substitution for the...
minmar1eval 22678	An entry of a matrix for a...
minmar1marrep 22679	The minor matrix is a spec...
minmar1cl 22680	Closure of the row replace...
maducoevalmin1 22681	The coefficients of an adj...
symgmatr01lem 22682	Lemma for ~ symgmatr01 . ...
symgmatr01 22683	Applying a permutation tha...
gsummatr01lem1 22684	Lemma A for ~ gsummatr01 ....
gsummatr01lem2 22685	Lemma B for ~ gsummatr01 ....
gsummatr01lem3 22686	Lemma 1 for ~ gsummatr01 ....
gsummatr01lem4 22687	Lemma 2 for ~ gsummatr01 ....
gsummatr01 22688	Lemma 1 for ~ smadiadetlem...
marep01ma 22689	Replacing a row of a squar...
smadiadetlem0 22690	Lemma 0 for ~ smadiadet : ...
smadiadetlem1 22691	Lemma 1 for ~ smadiadet : ...
smadiadetlem1a 22692	Lemma 1a for ~ smadiadet :...
smadiadetlem2 22693	Lemma 2 for ~ smadiadet : ...
smadiadetlem3lem0 22694	Lemma 0 for ~ smadiadetlem...
smadiadetlem3lem1 22695	Lemma 1 for ~ smadiadetlem...
smadiadetlem3lem2 22696	Lemma 2 for ~ smadiadetlem...
smadiadetlem3 22697	Lemma 3 for ~ smadiadet . ...
smadiadetlem4 22698	Lemma 4 for ~ smadiadet . ...
smadiadet 22699	The determinant of a subma...
smadiadetglem1 22700	Lemma 1 for ~ smadiadetg ....
smadiadetglem2 22701	Lemma 2 for ~ smadiadetg ....
smadiadetg 22702	The determinant of a squar...
smadiadetg0 22703	Lemma for ~ smadiadetr : v...
smadiadetr 22704	The determinant of a squar...
invrvald 22705	If a matrix multiplied wit...
matinv 22706	The inverse of a matrix is...
matunit 22707	A matrix is a unit in the ...
slesolvec 22708	Every solution of a system...
slesolinv 22709	The solution of a system o...
slesolinvbi 22710	The solution of a system o...
slesolex 22711	Every system of linear equ...
cramerimplem1 22712	Lemma 1 for ~ cramerimp : ...
cramerimplem2 22713	Lemma 2 for ~ cramerimp : ...
cramerimplem3 22714	Lemma 3 for ~ cramerimp : ...
cramerimp 22715	One direction of Cramer's ...
cramerlem1 22716	Lemma 1 for ~ cramer . (C...
cramerlem2 22717	Lemma 2 for ~ cramer . (C...
cramerlem3 22718	Lemma 3 for ~ cramer . (C...
cramer0 22719	Special case of Cramer's r...
cramer 22720	Cramer's rule. According ...
pmatring 22721	The set of polynomial matr...
pmatlmod 22722	The set of polynomial matr...
pmatassa 22723	The set of polynomial matr...
pmat0op 22724	The zero polynomial matrix...
pmat1op 22725	The identity polynomial ma...
pmat1ovd 22726	Entries of the identity po...
pmat0opsc 22727	The zero polynomial matrix...
pmat1opsc 22728	The identity polynomial ma...
pmat1ovscd 22729	Entries of the identity po...
pmatcoe1fsupp 22730	For a polynomial matrix th...
1pmatscmul 22731	The scalar product of the ...
cpmat 22738	Value of the constructor o...
cpmatpmat 22739	A constant polynomial matr...
cpmatel 22740	Property of a constant pol...
cpmatelimp 22741	Implication of a set being...
cpmatel2 22742	Another property of a cons...
cpmatelimp2 22743	Another implication of a s...
1elcpmat 22744	The identity of the ring o...
cpmatacl 22745	The set of all constant po...
cpmatinvcl 22746	The set of all constant po...
cpmatmcllem 22747	Lemma for ~ cpmatmcl . (C...
cpmatmcl 22748	The set of all constant po...
cpmatsubgpmat 22749	The set of all constant po...
cpmatsrgpmat 22750	The set of all constant po...
0elcpmat 22751	The zero of the ring of al...
mat2pmatfval 22752	Value of the matrix transf...
mat2pmatval 22753	The result of a matrix tra...
mat2pmatvalel 22754	A (matrix) element of the ...
mat2pmatbas 22755	The result of a matrix tra...
mat2pmatbas0 22756	The result of a matrix tra...
mat2pmatf 22757	The matrix transformation ...
mat2pmatf1 22758	The matrix transformation ...
mat2pmatghm 22759	The transformation of matr...
mat2pmatmul 22760	The transformation of matr...
mat2pmat1 22761	The transformation of the ...
mat2pmatmhm 22762	The transformation of matr...
mat2pmatrhm 22763	The transformation of matr...
mat2pmatlin 22764	The transformation of matr...
0mat2pmat 22765	The transformed zero matri...
idmatidpmat 22766	The transformed identity m...
d0mat2pmat 22767	The transformed empty set ...
d1mat2pmat 22768	The transformation of a ma...
mat2pmatscmxcl 22769	A transformed matrix multi...
m2cpm 22770	The result of a matrix tra...
m2cpmf 22771	The matrix transformation ...
m2cpmf1 22772	The matrix transformation ...
m2cpmghm 22773	The transformation of matr...
m2cpmmhm 22774	The transformation of matr...
m2cpmrhm 22775	The transformation of matr...
m2pmfzmap 22776	The transformed values of ...
m2pmfzgsumcl 22777	Closure of the sum of scal...
cpm2mfval 22778	Value of the inverse matri...
cpm2mval 22779	The result of an inverse m...
cpm2mvalel 22780	A (matrix) element of the ...
cpm2mf 22781	The inverse matrix transfo...
m2cpminvid 22782	The inverse transformation...
m2cpminvid2lem 22783	Lemma for ~ m2cpminvid2 . ...
m2cpminvid2 22784	The transformation applied...
m2cpmfo 22785	The matrix transformation ...
m2cpmf1o 22786	The matrix transformation ...
m2cpmrngiso 22787	The transformation of matr...
matcpmric 22788	The ring of matrices over ...
m2cpminv 22789	The inverse matrix transfo...
m2cpminv0 22790	The inverse matrix transfo...
decpmatval0 22793	The matrix consisting of t...
decpmatval 22794	The matrix consisting of t...
decpmate 22795	An entry of the matrix con...
decpmatcl 22796	Closure of the decompositi...
decpmataa0 22797	The matrix consisting of t...
decpmatfsupp 22798	The mapping to the matrice...
decpmatid 22799	The matrix consisting of t...
decpmatmullem 22800	Lemma for ~ decpmatmul . ...
decpmatmul 22801	The matrix consisting of t...
decpmatmulsumfsupp 22802	Lemma 0 for ~ pm2mpmhm . ...
pmatcollpw1lem1 22803	Lemma 1 for ~ pmatcollpw1 ...
pmatcollpw1lem2 22804	Lemma 2 for ~ pmatcollpw1 ...
pmatcollpw1 22805	Write a polynomial matrix ...
pmatcollpw2lem 22806	Lemma for ~ pmatcollpw2 . ...
pmatcollpw2 22807	Write a polynomial matrix ...
monmatcollpw 22808	The matrix consisting of t...
pmatcollpwlem 22809	Lemma for ~ pmatcollpw . ...
pmatcollpw 22810	Write a polynomial matrix ...
pmatcollpwfi 22811	Write a polynomial matrix ...
pmatcollpw3lem 22812	Lemma for ~ pmatcollpw3 an...
pmatcollpw3 22813	Write a polynomial matrix ...
pmatcollpw3fi 22814	Write a polynomial matrix ...
pmatcollpw3fi1lem1 22815	Lemma 1 for ~ pmatcollpw3f...
pmatcollpw3fi1lem2 22816	Lemma 2 for ~ pmatcollpw3f...
pmatcollpw3fi1 22817	Write a polynomial matrix ...
pmatcollpwscmatlem1 22818	Lemma 1 for ~ pmatcollpwsc...
pmatcollpwscmatlem2 22819	Lemma 2 for ~ pmatcollpwsc...
pmatcollpwscmat 22820	Write a scalar matrix over...
pm2mpf1lem 22823	Lemma for ~ pm2mpf1 . (Co...
pm2mpval 22824	Value of the transformatio...
pm2mpfval 22825	A polynomial matrix transf...
pm2mpcl 22826	The transformation of poly...
pm2mpf 22827	The transformation of poly...
pm2mpf1 22828	The transformation of poly...
pm2mpcoe1 22829	A coefficient of the polyn...
idpm2idmp 22830	The transformation of the ...
mptcoe1matfsupp 22831	The mapping extracting the...
mply1topmatcllem 22832	Lemma for ~ mply1topmatcl ...
mply1topmatval 22833	A polynomial over matrices...
mply1topmatcl 22834	A polynomial over matrices...
mp2pm2mplem1 22835	Lemma 1 for ~ mp2pm2mp . ...
mp2pm2mplem2 22836	Lemma 2 for ~ mp2pm2mp . ...
mp2pm2mplem3 22837	Lemma 3 for ~ mp2pm2mp . ...
mp2pm2mplem4 22838	Lemma 4 for ~ mp2pm2mp . ...
mp2pm2mplem5 22839	Lemma 5 for ~ mp2pm2mp . ...
mp2pm2mp 22840	A polynomial over matrices...
pm2mpghmlem2 22841	Lemma 2 for ~ pm2mpghm . ...
pm2mpghmlem1 22842	Lemma 1 for pm2mpghm . (C...
pm2mpfo 22843	The transformation of poly...
pm2mpf1o 22844	The transformation of poly...
pm2mpghm 22845	The transformation of poly...
pm2mpgrpiso 22846	The transformation of poly...
pm2mpmhmlem1 22847	Lemma 1 for ~ pm2mpmhm . ...
pm2mpmhmlem2 22848	Lemma 2 for ~ pm2mpmhm . ...
pm2mpmhm 22849	The transformation of poly...
pm2mprhm 22850	The transformation of poly...
pm2mprngiso 22851	The transformation of poly...
pmmpric 22852	The ring of polynomial mat...
monmat2matmon 22853	The transformation of a po...
pm2mp 22854	The transformation of a su...
chmatcl 22857	Closure of the characteris...
chmatval 22858	The entries of the charact...
chpmatfval 22859	Value of the characteristi...
chpmatval 22860	The characteristic polynom...
chpmatply1 22861	The characteristic polynom...
chpmatval2 22862	The characteristic polynom...
chpmat0d 22863	The characteristic polynom...
chpmat1dlem 22864	Lemma for ~ chpmat1d . (C...
chpmat1d 22865	The characteristic polynom...
chpdmatlem0 22866	Lemma 0 for ~ chpdmat . (...
chpdmatlem1 22867	Lemma 1 for ~ chpdmat . (...
chpdmatlem2 22868	Lemma 2 for ~ chpdmat . (...
chpdmatlem3 22869	Lemma 3 for ~ chpdmat . (...
chpdmat 22870	The characteristic polynom...
chpscmat 22871	The characteristic polynom...
chpscmat0 22872	The characteristic polynom...
chpscmatgsumbin 22873	The characteristic polynom...
chpscmatgsummon 22874	The characteristic polynom...
chp0mat 22875	The characteristic polynom...
chpidmat 22876	The characteristic polynom...
chmaidscmat 22877	The characteristic polynom...
fvmptnn04if 22878	The function values of a m...
fvmptnn04ifa 22879	The function value of a ma...
fvmptnn04ifb 22880	The function value of a ma...
fvmptnn04ifc 22881	The function value of a ma...
fvmptnn04ifd 22882	The function value of a ma...
chfacfisf 22883	The "characteristic factor...
chfacfisfcpmat 22884	The "characteristic factor...
chfacffsupp 22885	The "characteristic factor...
chfacfscmulcl 22886	Closure of a scaled value ...
chfacfscmul0 22887	A scaled value of the "cha...
chfacfscmulfsupp 22888	A mapping of scaled values...
chfacfscmulgsum 22889	Breaking up a sum of value...
chfacfpmmulcl 22890	Closure of the value of th...
chfacfpmmul0 22891	The value of the "characte...
chfacfpmmulfsupp 22892	A mapping of values of the...
chfacfpmmulgsum 22893	Breaking up a sum of value...
chfacfpmmulgsum2 22894	Breaking up a sum of value...
cayhamlem1 22895	Lemma 1 for ~ cayleyhamilt...
cpmadurid 22896	The right-hand fundamental...
cpmidgsum 22897	Representation of the iden...
cpmidgsumm2pm 22898	Representation of the iden...
cpmidpmatlem1 22899	Lemma 1 for ~ cpmidpmat . ...
cpmidpmatlem2 22900	Lemma 2 for ~ cpmidpmat . ...
cpmidpmatlem3 22901	Lemma 3 for ~ cpmidpmat . ...
cpmidpmat 22902	Representation of the iden...
cpmadugsumlemB 22903	Lemma B for ~ cpmadugsum ....
cpmadugsumlemC 22904	Lemma C for ~ cpmadugsum ....
cpmadugsumlemF 22905	Lemma F for ~ cpmadugsum ....
cpmadugsumfi 22906	The product of the charact...
cpmadugsum 22907	The product of the charact...
cpmidgsum2 22908	Representation of the iden...
cpmidg2sum 22909	Equality of two sums repre...
cpmadumatpolylem1 22910	Lemma 1 for ~ cpmadumatpol...
cpmadumatpolylem2 22911	Lemma 2 for ~ cpmadumatpol...
cpmadumatpoly 22912	The product of the charact...
cayhamlem2 22913	Lemma for ~ cayhamlem3 . ...
chcoeffeqlem 22914	Lemma for ~ chcoeffeq . (...
chcoeffeq 22915	The coefficients of the ch...
cayhamlem3 22916	Lemma for ~ cayhamlem4 . ...
cayhamlem4 22917	Lemma for ~ cayleyhamilton...
cayleyhamilton0 22918	The Cayley-Hamilton theore...
cayleyhamilton 22919	The Cayley-Hamilton theore...
cayleyhamiltonALT 22920	Alternate proof of ~ cayle...
cayleyhamilton1 22921	The Cayley-Hamilton theore...
istopg 22924	Express the predicate " ` ...
istop2g 22925	Express the predicate " ` ...
uniopn 22926	The union of a subset of a...
iunopn 22927	The indexed union of a sub...
inopn 22928	The intersection of two op...
fitop 22929	A topology is closed under...
fiinopn 22930	The intersection of a none...
iinopn 22931	The intersection of a none...
unopn 22932	The union of two open sets...
0opn 22933	The empty set is an open s...
0ntop 22934	The empty set is not a top...
topopn 22935	The underlying set of a to...
eltopss 22936	A member of a topology is ...
riinopn 22937	A finite indexed relative ...
rintopn 22938	A finite relative intersec...
istopon 22941	Property of being a topolo...
topontop 22942	A topology on a given base...
toponuni 22943	The base set of a topology...
topontopi 22944	A topology on a given base...
toponunii 22945	The base set of a topology...
toptopon 22946	Alternative definition of ...
toptopon2 22947	A topology is the same thi...
topontopon 22948	A topology on a set is a t...
funtopon 22949	The class ` TopOn ` is a f...
toponrestid 22950	Given a topology on a set,...
toponsspwpw 22951	The set of topologies on a...
dmtopon 22952	The domain of ` TopOn ` is...
fntopon 22953	The class ` TopOn ` is a f...
toprntopon 22954	A topology is the same thi...
toponmax 22955	The base set of a topology...
toponss 22956	A member of a topology is ...
toponcom 22957	If ` K ` is a topology on ...
toponcomb 22958	Biconditional form of ~ to...
topgele 22959	The topologies over the sa...
topsn 22960	The only topology on a sin...
istps 22963	Express the predicate "is ...
istps2 22964	Express the predicate "is ...
tpsuni 22965	The base set of a topologi...
tpstop 22966	The topology extractor on ...
tpspropd 22967	A topological space depend...
tpsprop2d 22968	A topological space depend...
topontopn 22969	Express the predicate "is ...
tsettps 22970	If the topology component ...
istpsi 22971	Properties that determine ...
eltpsg 22972	Properties that determine ...
eltpsgOLD 22973	Obsolete version of ~ eltp...
eltpsi 22974	Properties that determine ...
isbasisg 22977	Express the predicate "the...
isbasis2g 22978	Express the predicate "the...
isbasis3g 22979	Express the predicate "the...
basis1 22980	Property of a basis. (Con...
basis2 22981	Property of a basis. (Con...
fiinbas 22982	If a set is closed under f...
basdif0 22983	A basis is not affected by...
baspartn 22984	A disjoint system of sets ...
tgval 22985	The topology generated by ...
tgval2 22986	Definition of a topology g...
eltg 22987	Membership in a topology g...
eltg2 22988	Membership in a topology g...
eltg2b 22989	Membership in a topology g...
eltg4i 22990	An open set in a topology ...
eltg3i 22991	The union of a set of basi...
eltg3 22992	Membership in a topology g...
tgval3 22993	Alternate expression for t...
tg1 22994	Property of a member of a ...
tg2 22995	Property of a member of a ...
bastg 22996	A member of a basis is a s...
unitg 22997	The topology generated by ...
tgss 22998	Subset relation for genera...
tgcl 22999	Show that a basis generate...
tgclb 23000	The property ~ tgcl can be...
tgtopon 23001	A basis generates a topolo...
topbas 23002	A topology is its own basi...
tgtop 23003	A topology is its own basi...
eltop 23004	Membership in a topology, ...
eltop2 23005	Membership in a topology. ...
eltop3 23006	Membership in a topology. ...
fibas 23007	A collection of finite int...
tgdom 23008	A space has no more open s...
tgiun 23009	The indexed union of a set...
tgidm 23010	The topology generator fun...
bastop 23011	Two ways to express that a...
tgtop11 23012	The topology generation fu...
0top 23013	The singleton of the empty...
en1top 23014	` { (/) } ` is the only to...
en2top 23015	If a topology has two elem...
tgss3 23016	A criterion for determinin...
tgss2 23017	A criterion for determinin...
basgen 23018	Given a topology ` J ` , s...
basgen2 23019	Given a topology ` J ` , s...
2basgen 23020	Conditions that determine ...
tgfiss 23021	If a subbase is included i...
tgdif0 23022	A generated topology is no...
bastop1 23023	A subset of a topology is ...
bastop2 23024	A version of ~ bastop1 tha...
distop 23025	The discrete topology on a...
topnex 23026	The class of all topologie...
distopon 23027	The discrete topology on a...
sn0topon 23028	The singleton of the empty...
sn0top 23029	The singleton of the empty...
indislem 23030	A lemma to eliminate some ...
indistopon 23031	The indiscrete topology on...
indistop 23032	The indiscrete topology on...
indisuni 23033	The base set of the indisc...
fctop 23034	The finite complement topo...
fctop2 23035	The finite complement topo...
cctop 23036	The countable complement t...
ppttop 23037	The particular point topol...
pptbas 23038	The particular point topol...
epttop 23039	The excluded point topolog...
indistpsx 23040	The indiscrete topology on...
indistps 23041	The indiscrete topology on...
indistps2 23042	The indiscrete topology on...
indistpsALT 23043	The indiscrete topology on...
indistpsALTOLD 23044	Obsolete version of ~ indi...
indistps2ALT 23045	The indiscrete topology on...
distps 23046	The discrete topology on a...
fncld 23053	The closed-set generator i...
cldval 23054	The set of closed sets of ...
ntrfval 23055	The interior function on t...
clsfval 23056	The closure function on th...
cldrcl 23057	Reverse closure of the clo...
iscld 23058	The predicate "the class `...
iscld2 23059	A subset of the underlying...
cldss 23060	A closed set is a subset o...
cldss2 23061	The set of closed sets is ...
cldopn 23062	The complement of a closed...
isopn2 23063	A subset of the underlying...
opncld 23064	The complement of an open ...
difopn 23065	The difference of a closed...
topcld 23066	The underlying set of a to...
ntrval 23067	The interior of a subset o...
clsval 23068	The closure of a subset of...
0cld 23069	The empty set is closed. ...
iincld 23070	The indexed intersection o...
intcld 23071	The intersection of a set ...
uncld 23072	The union of two closed se...
cldcls 23073	A closed subset equals its...
incld 23074	The intersection of two cl...
riincld 23075	An indexed relative inters...
iuncld 23076	A finite indexed union of ...
unicld 23077	A finite union of closed s...
clscld 23078	The closure of a subset of...
clsf 23079	The closure function is a ...
ntropn 23080	The interior of a subset o...
clsval2 23081	Express closure in terms o...
ntrval2 23082	Interior expressed in term...
ntrdif 23083	An interior of a complemen...
clsdif 23084	A closure of a complement ...
clsss 23085	Subset relationship for cl...
ntrss 23086	Subset relationship for in...
sscls 23087	A subset of a topology's u...
ntrss2 23088	A subset includes its inte...
ssntr 23089	An open subset of a set is...
clsss3 23090	The closure of a subset of...
ntrss3 23091	The interior of a subset o...
ntrin 23092	A pairwise intersection of...
cmclsopn 23093	The complement of a closur...
cmntrcld 23094	The complement of an inter...
iscld3 23095	A subset is closed iff it ...
iscld4 23096	A subset is closed iff it ...
isopn3 23097	A subset is open iff it eq...
clsidm 23098	The closure operation is i...
ntridm 23099	The interior operation is ...
clstop 23100	The closure of a topology'...
ntrtop 23101	The interior of a topology...
0ntr 23102	A subset with an empty int...
clsss2 23103	If a subset is included in...
elcls 23104	Membership in a closure. ...
elcls2 23105	Membership in a closure. ...
clsndisj 23106	Any open set containing a ...
ntrcls0 23107	A subset whose closure has...
ntreq0 23108	Two ways to say that a sub...
cldmre 23109	The closed sets of a topol...
mrccls 23110	Moore closure generalizes ...
cls0 23111	The closure of the empty s...
ntr0 23112	The interior of the empty ...
isopn3i 23113	An open subset equals its ...
elcls3 23114	Membership in a closure in...
opncldf1 23115	A bijection useful for con...
opncldf2 23116	The values of the open-clo...
opncldf3 23117	The values of the converse...
isclo 23118	A set ` A ` is clopen iff ...
isclo2 23119	A set ` A ` is clopen iff ...
discld 23120	The open sets of a discret...
sn0cld 23121	The closed sets of the top...
indiscld 23122	The closed sets of an indi...
mretopd 23123	A Moore collection which i...
toponmre 23124	The topologies over a give...
cldmreon 23125	The closed sets of a topol...
iscldtop 23126	A family is the closed set...
mreclatdemoBAD 23127	The closed subspaces of a ...
neifval 23130	Value of the neighborhood ...
neif 23131	The neighborhood function ...
neiss2 23132	A set with a neighborhood ...
neival 23133	Value of the set of neighb...
isnei 23134	The predicate "the class `...
neiint 23135	An intuitive definition of...
isneip 23136	The predicate "the class `...
neii1 23137	A neighborhood is included...
neisspw 23138	The neighborhoods of any s...
neii2 23139	Property of a neighborhood...
neiss 23140	Any neighborhood of a set ...
ssnei 23141	A set is included in any o...
elnei 23142	A point belongs to any of ...
0nnei 23143	The empty set is not a nei...
neips 23144	A neighborhood of a set is...
opnneissb 23145	An open set is a neighborh...
opnssneib 23146	Any superset of an open se...
ssnei2 23147	Any subset ` M ` of ` X ` ...
neindisj 23148	Any neighborhood of an ele...
opnneiss 23149	An open set is a neighborh...
opnneip 23150	An open set is a neighborh...
opnnei 23151	A set is open iff it is a ...
tpnei 23152	The underlying set of a to...
neiuni 23153	The union of the neighborh...
neindisj2 23154	A point ` P ` belongs to t...
topssnei 23155	A finer topology has more ...
innei 23156	The intersection of two ne...
opnneiid 23157	Only an open set is a neig...
neissex 23158	For any neighborhood ` N `...
0nei 23159	The empty set is a neighbo...
neipeltop 23160	Lemma for ~ neiptopreu . ...
neiptopuni 23161	Lemma for ~ neiptopreu . ...
neiptoptop 23162	Lemma for ~ neiptopreu . ...
neiptopnei 23163	Lemma for ~ neiptopreu . ...
neiptopreu 23164	If, to each element ` P ` ...
lpfval 23169	The limit point function o...
lpval 23170	The set of limit points of...
islp 23171	The predicate "the class `...
lpsscls 23172	The limit points of a subs...
lpss 23173	The limit points of a subs...
lpdifsn 23174	` P ` is a limit point of ...
lpss3 23175	Subset relationship for li...
islp2 23176	The predicate " ` P ` is a...
islp3 23177	The predicate " ` P ` is a...
maxlp 23178	A point is a limit point o...
clslp 23179	The closure of a subset of...
islpi 23180	A point belonging to a set...
cldlp 23181	A subset of a topological ...
isperf 23182	Definition of a perfect sp...
isperf2 23183	Definition of a perfect sp...
isperf3 23184	A perfect space is a topol...
perflp 23185	The limit points of a perf...
perfi 23186	Property of a perfect spac...
perftop 23187	A perfect space is a topol...
restrcl 23188	Reverse closure for the su...
restbas 23189	A subspace topology basis ...
tgrest 23190	A subspace can be generate...
resttop 23191	A subspace topology is a t...
resttopon 23192	A subspace topology is a t...
restuni 23193	The underlying set of a su...
stoig 23194	The topological space buil...
restco 23195	Composition of subspaces. ...
restabs 23196	Equivalence of being a sub...
restin 23197	When the subspace region i...
restuni2 23198	The underlying set of a su...
resttopon2 23199	The underlying set of a su...
rest0 23200	The subspace topology indu...
restsn 23201	The only subspace topology...
restsn2 23202	The subspace topology indu...
restcld 23203	A closed set of a subspace...
restcldi 23204	A closed set is closed in ...
restcldr 23205	A set which is closed in t...
restopnb 23206	If ` B ` is an open subset...
ssrest 23207	If ` K ` is a finer topolo...
restopn2 23208	If ` A ` is open, then ` B...
restdis 23209	A subspace of a discrete t...
restfpw 23210	The restriction of the set...
neitr 23211	The neighborhood of a trac...
restcls 23212	A closure in a subspace to...
restntr 23213	An interior in a subspace ...
restlp 23214	The limit points of a subs...
restperf 23215	Perfection of a subspace. ...
perfopn 23216	An open subset of a perfec...
resstopn 23217	The topology of a restrict...
resstps 23218	A restricted topological s...
ordtbaslem 23219	Lemma for ~ ordtbas . In ...
ordtval 23220	Value of the order topolog...
ordtuni 23221	Value of the order topolog...
ordtbas2 23222	Lemma for ~ ordtbas . (Co...
ordtbas 23223	In a total order, the fini...
ordttopon 23224	Value of the order topolog...
ordtopn1 23225	An upward ray ` ( P , +oo ...
ordtopn2 23226	A downward ray ` ( -oo , P...
ordtopn3 23227	An open interval ` ( A , B...
ordtcld1 23228	A downward ray ` ( -oo , P...
ordtcld2 23229	An upward ray ` [ P , +oo ...
ordtcld3 23230	A closed interval ` [ A , ...
ordttop 23231	The order topology is a to...
ordtcnv 23232	The order dual generates t...
ordtrest 23233	The subspace topology of a...
ordtrest2lem 23234	Lemma for ~ ordtrest2 . (...
ordtrest2 23235	An interval-closed set ` A...
letopon 23236	The topology of the extend...
letop 23237	The topology of the extend...
letopuni 23238	The topology of the extend...
xrstopn 23239	The topology component of ...
xrstps 23240	The extended real number s...
leordtvallem1 23241	Lemma for ~ leordtval . (...
leordtvallem2 23242	Lemma for ~ leordtval . (...
leordtval2 23243	The topology of the extend...
leordtval 23244	The topology of the extend...
iccordt 23245	A closed interval is close...
iocpnfordt 23246	An unbounded above open in...
icomnfordt 23247	An unbounded above open in...
iooordt 23248	An open interval is open i...
reordt 23249	The real numbers are an op...
lecldbas 23250	The set of closed interval...
pnfnei 23251	A neighborhood of ` +oo ` ...
mnfnei 23252	A neighborhood of ` -oo ` ...
ordtrestixx 23253	The restriction of the les...
ordtresticc 23254	The restriction of the les...
lmrel 23261	The topological space conv...
lmrcl 23262	Reverse closure for the co...
lmfval 23263	The relation "sequence ` f...
cnfval 23264	The set of all continuous ...
cnpfval 23265	The function mapping the p...
iscn 23266	The predicate "the class `...
cnpval 23267	The set of all functions f...
iscnp 23268	The predicate "the class `...
iscn2 23269	The predicate "the class `...
iscnp2 23270	The predicate "the class `...
cntop1 23271	Reverse closure for a cont...
cntop2 23272	Reverse closure for a cont...
cnptop1 23273	Reverse closure for a func...
cnptop2 23274	Reverse closure for a func...
iscnp3 23275	The predicate "the class `...
cnprcl 23276	Reverse closure for a func...
cnf 23277	A continuous function is a...
cnpf 23278	A continuous function at p...
cnpcl 23279	The value of a continuous ...
cnf2 23280	A continuous function is a...
cnpf2 23281	A continuous function at p...
cnprcl2 23282	Reverse closure for a func...
tgcn 23283	The continuity predicate w...
tgcnp 23284	The "continuous at a point...
subbascn 23285	The continuity predicate w...
ssidcn 23286	The identity function is a...
cnpimaex 23287	Property of a function con...
idcn 23288	A restricted identity func...
lmbr 23289	Express the binary relatio...
lmbr2 23290	Express the binary relatio...
lmbrf 23291	Express the binary relatio...
lmconst 23292	A constant sequence conver...
lmcvg 23293	Convergence property of a ...
iscnp4 23294	The predicate "the class `...
cnpnei 23295	A condition for continuity...
cnima 23296	An open subset of the codo...
cnco 23297	The composition of two con...
cnpco 23298	The composition of a funct...
cnclima 23299	A closed subset of the cod...
iscncl 23300	A characterization of a co...
cncls2i 23301	Property of the preimage o...
cnntri 23302	Property of the preimage o...
cnclsi 23303	Property of the image of a...
cncls2 23304	Continuity in terms of clo...
cncls 23305	Continuity in terms of clo...
cnntr 23306	Continuity in terms of int...
cnss1 23307	If the topology ` K ` is f...
cnss2 23308	If the topology ` K ` is f...
cncnpi 23309	A continuous function is c...
cnsscnp 23310	The set of continuous func...
cncnp 23311	A continuous function is c...
cncnp2 23312	A continuous function is c...
cnnei 23313	Continuity in terms of nei...
cnconst2 23314	A constant function is con...
cnconst 23315	A constant function is con...
cnrest 23316	Continuity of a restrictio...
cnrest2 23317	Equivalence of continuity ...
cnrest2r 23318	Equivalence of continuity ...
cnpresti 23319	One direction of ~ cnprest...
cnprest 23320	Equivalence of continuity ...
cnprest2 23321	Equivalence of point-conti...
cndis 23322	Every function is continuo...
cnindis 23323	Every function is continuo...
cnpdis 23324	If ` A ` is an isolated po...
paste 23325	Pasting lemma. If ` A ` a...
lmfpm 23326	If ` F ` converges, then `...
lmfss 23327	Inclusion of a function ha...
lmcl 23328	Closure of a limit. (Cont...
lmss 23329	Limit on a subspace. (Con...
sslm 23330	A finer topology has fewer...
lmres 23331	A function converges iff i...
lmff 23332	If ` F ` converges, there ...
lmcls 23333	Any convergent sequence of...
lmcld 23334	Any convergent sequence of...
lmcnp 23335	The image of a convergent ...
lmcn 23336	The image of a convergent ...
ist0 23351	The predicate "is a T_0 sp...
ist1 23352	The predicate "is a T_1 sp...
ishaus 23353	The predicate "is a Hausdo...
iscnrm 23354	The property of being comp...
t0sep 23355	Any two topologically indi...
t0dist 23356	Any two distinct points in...
t1sncld 23357	In a T_1 space, singletons...
t1ficld 23358	In a T_1 space, finite set...
hausnei 23359	Neighborhood property of a...
t0top 23360	A T_0 space is a topologic...
t1top 23361	A T_1 space is a topologic...
haustop 23362	A Hausdorff space is a top...
isreg 23363	The predicate "is a regula...
regtop 23364	A regular space is a topol...
regsep 23365	In a regular space, every ...
isnrm 23366	The predicate "is a normal...
nrmtop 23367	A normal space is a topolo...
cnrmtop 23368	A completely normal space ...
iscnrm2 23369	The property of being comp...
ispnrm 23370	The property of being perf...
pnrmnrm 23371	A perfectly normal space i...
pnrmtop 23372	A perfectly normal space i...
pnrmcld 23373	A closed set in a perfectl...
pnrmopn 23374	An open set in a perfectly...
ist0-2 23375	The predicate "is a T_0 sp...
ist0-3 23376	The predicate "is a T_0 sp...
cnt0 23377	The preimage of a T_0 topo...
ist1-2 23378	An alternate characterizat...
t1t0 23379	A T_1 space is a T_0 space...
ist1-3 23380	A space is T_1 iff every p...
cnt1 23381	The preimage of a T_1 topo...
ishaus2 23382	Express the predicate " ` ...
haust1 23383	A Hausdorff space is a T_1...
hausnei2 23384	The Hausdorff condition st...
cnhaus 23385	The preimage of a Hausdorf...
nrmsep3 23386	In a normal space, given a...
nrmsep2 23387	In a normal space, any two...
nrmsep 23388	In a normal space, disjoin...
isnrm2 23389	An alternate characterizat...
isnrm3 23390	A topological space is nor...
cnrmi 23391	A subspace of a completely...
cnrmnrm 23392	A completely normal space ...
restcnrm 23393	A subspace of a completely...
resthauslem 23394	Lemma for ~ resthaus and s...
lpcls 23395	The limit points of the cl...
perfcls 23396	A subset of a perfect spac...
restt0 23397	A subspace of a T_0 topolo...
restt1 23398	A subspace of a T_1 topolo...
resthaus 23399	A subspace of a Hausdorff ...
t1sep2 23400	Any two points in a T_1 sp...
t1sep 23401	Any two distinct points in...
sncld 23402	A singleton is closed in a...
sshauslem 23403	Lemma for ~ sshaus and sim...
sst0 23404	A topology finer than a T_...
sst1 23405	A topology finer than a T_...
sshaus 23406	A topology finer than a Ha...
regsep2 23407	In a regular space, a clos...
isreg2 23408	A topological space is reg...
dnsconst 23409	If a continuous mapping to...
ordtt1 23410	The order topology is T_1 ...
lmmo 23411	A sequence in a Hausdorff ...
lmfun 23412	The convergence relation i...
dishaus 23413	A discrete topology is Hau...
ordthauslem 23414	Lemma for ~ ordthaus . (C...
ordthaus 23415	The order topology of a to...
xrhaus 23416	The topology of the extend...
iscmp 23419	The predicate "is a compac...
cmpcov 23420	An open cover of a compact...
cmpcov2 23421	Rewrite ~ cmpcov for the c...
cmpcovf 23422	Combine ~ cmpcov with ~ ac...
cncmp 23423	Compactness is respected b...
fincmp 23424	A finite topology is compa...
0cmp 23425	The singleton of the empty...
cmptop 23426	A compact topology is a to...
rncmp 23427	The image of a compact set...
imacmp 23428	The image of a compact set...
discmp 23429	A discrete topology is com...
cmpsublem 23430	Lemma for ~ cmpsub . (Con...
cmpsub 23431	Two equivalent ways of des...
tgcmp 23432	A topology generated by a ...
cmpcld 23433	A closed subset of a compa...
uncmp 23434	The union of two compact s...
fiuncmp 23435	A finite union of compact ...
sscmp 23436	A subset of a compact topo...
hauscmplem 23437	Lemma for ~ hauscmp . (Co...
hauscmp 23438	A compact subspace of a T2...
cmpfi 23439	If a topology is compact a...
cmpfii 23440	In a compact topology, a s...
bwth 23441	The glorious Bolzano-Weier...
isconn 23444	The predicate ` J ` is a c...
isconn2 23445	The predicate ` J ` is a c...
connclo 23446	The only nonempty clopen s...
conndisj 23447	If a topology is connected...
conntop 23448	A connected topology is a ...
indisconn 23449	The indiscrete topology (o...
dfconn2 23450	An alternate definition of...
connsuba 23451	Connectedness for a subspa...
connsub 23452	Two equivalent ways of say...
cnconn 23453	Connectedness is respected...
nconnsubb 23454	Disconnectedness for a sub...
connsubclo 23455	If a clopen set meets a co...
connima 23456	The image of a connected s...
conncn 23457	A continuous function from...
iunconnlem 23458	Lemma for ~ iunconn . (Co...
iunconn 23459	The indexed union of conne...
unconn 23460	The union of two connected...
clsconn 23461	The closure of a connected...
conncompid 23462	The connected component co...
conncompconn 23463	The connected component co...
conncompss 23464	The connected component co...
conncompcld 23465	The connected component co...
conncompclo 23466	The connected component co...
t1connperf 23467	A connected T_1 space is p...
is1stc 23472	The predicate "is a first-...
is1stc2 23473	An equivalent way of sayin...
1stctop 23474	A first-countable topology...
1stcclb 23475	A property of points in a ...
1stcfb 23476	For any point ` A ` in a f...
is2ndc 23477	The property of being seco...
2ndctop 23478	A second-countable topolog...
2ndci 23479	A countable basis generate...
2ndcsb 23480	Having a countable subbase...
2ndcredom 23481	A second-countable space h...
2ndc1stc 23482	A second-countable space i...
1stcrestlem 23483	Lemma for ~ 1stcrest . (C...
1stcrest 23484	A subspace of a first-coun...
2ndcrest 23485	A subspace of a second-cou...
2ndcctbss 23486	If a topology is second-co...
2ndcdisj 23487	Any disjoint family of ope...
2ndcdisj2 23488	Any disjoint collection of...
2ndcomap 23489	A surjective continuous op...
2ndcsep 23490	A second-countable topolog...
dis2ndc 23491	A discrete space is second...
1stcelcls 23492	A point belongs to the clo...
1stccnp 23493	A mapping is continuous at...
1stccn 23494	A mapping ` X --> Y ` , wh...
islly 23499	The property of being a lo...
isnlly 23500	The property of being an n...
llyeq 23501	Equality theorem for the `...
nllyeq 23502	Equality theorem for the `...
llytop 23503	A locally ` A ` space is a...
nllytop 23504	A locally ` A ` space is a...
llyi 23505	The property of a locally ...
nllyi 23506	The property of an n-local...
nlly2i 23507	Eliminate the neighborhood...
llynlly 23508	A locally ` A ` space is n...
llyssnlly 23509	A locally ` A ` space is n...
llyss 23510	The "locally" predicate re...
nllyss 23511	The "n-locally" predicate ...
subislly 23512	The property of a subspace...
restnlly 23513	If the property ` A ` pass...
restlly 23514	If the property ` A ` pass...
islly2 23515	An alternative expression ...
llyrest 23516	An open subspace of a loca...
nllyrest 23517	An open subspace of an n-l...
loclly 23518	If ` A ` is a local proper...
llyidm 23519	Idempotence of the "locall...
nllyidm 23520	Idempotence of the "n-loca...
toplly 23521	A topology is locally a to...
topnlly 23522	A topology is n-locally a ...
hauslly 23523	A Hausdorff space is local...
hausnlly 23524	A Hausdorff space is n-loc...
hausllycmp 23525	A compact Hausdorff space ...
cldllycmp 23526	A closed subspace of a loc...
lly1stc 23527	First-countability is a lo...
dislly 23528	The discrete space ` ~P X ...
disllycmp 23529	A discrete space is locall...
dis1stc 23530	A discrete space is first-...
hausmapdom 23531	If ` X ` is a first-counta...
hauspwdom 23532	Simplify the cardinal ` A ...
refrel 23539	Refinement is a relation. ...
isref 23540	The property of being a re...
refbas 23541	A refinement covers the sa...
refssex 23542	Every set in a refinement ...
ssref 23543	A subcover is a refinement...
refref 23544	Reflexivity of refinement....
reftr 23545	Refinement is transitive. ...
refun0 23546	Adding the empty set prese...
isptfin 23547	The statement "is a point-...
islocfin 23548	The statement "is a locall...
finptfin 23549	A finite cover is a point-...
ptfinfin 23550	A point covered by a point...
finlocfin 23551	A finite cover of a topolo...
locfintop 23552	A locally finite cover cov...
locfinbas 23553	A locally finite cover mus...
locfinnei 23554	A point covered by a local...
lfinpfin 23555	A locally finite cover is ...
lfinun 23556	Adding a finite set preser...
locfincmp 23557	For a compact space, the l...
unisngl 23558	Taking the union of the se...
dissnref 23559	The set of singletons is a...
dissnlocfin 23560	The set of singletons is l...
locfindis 23561	The locally finite covers ...
locfincf 23562	A locally finite cover in ...
comppfsc 23563	A space where every open c...
kgenval 23566	Value of the compact gener...
elkgen 23567	Value of the compact gener...
kgeni 23568	Property of the open sets ...
kgentopon 23569	The compact generator gene...
kgenuni 23570	The base set of the compac...
kgenftop 23571	The compact generator gene...
kgenf 23572	The compact generator is a...
kgentop 23573	A compactly generated spac...
kgenss 23574	The compact generator gene...
kgenhaus 23575	The compact generator gene...
kgencmp 23576	The compact generator topo...
kgencmp2 23577	The compact generator topo...
kgenidm 23578	The compact generator is i...
iskgen2 23579	A space is compactly gener...
iskgen3 23580	Derive the usual definitio...
llycmpkgen2 23581	A locally compact space is...
cmpkgen 23582	A compact space is compact...
llycmpkgen 23583	A locally compact space is...
1stckgenlem 23584	The one-point compactifica...
1stckgen 23585	A first-countable space is...
kgen2ss 23586	The compact generator pres...
kgencn 23587	A function from a compactl...
kgencn2 23588	A function ` F : J --> K `...
kgencn3 23589	The set of continuous func...
kgen2cn 23590	A continuous function is a...
txval 23595	Value of the binary topolo...
txuni2 23596	The underlying set of the ...
txbasex 23597	The basis for the product ...
txbas 23598	The set of Cartesian produ...
eltx 23599	A set in a product is open...
txtop 23600	The product of two topolog...
ptval 23601	The value of the product t...
ptpjpre1 23602	The preimage of a projecti...
elpt 23603	Elementhood in the bases o...
elptr 23604	A basic open set in the pr...
elptr2 23605	A basic open set in the pr...
ptbasid 23606	The base set of the produc...
ptuni2 23607	The base set for the produ...
ptbasin 23608	The basis for a product to...
ptbasin2 23609	The basis for a product to...
ptbas 23610	The basis for a product to...
ptpjpre2 23611	The basis for a product to...
ptbasfi 23612	The basis for the product ...
pttop 23613	The product topology is a ...
ptopn 23614	A basic open set in the pr...
ptopn2 23615	A sub-basic open set in th...
xkotf 23616	Functionality of function ...
xkobval 23617	Alternative expression for...
xkoval 23618	Value of the compact-open ...
xkotop 23619	The compact-open topology ...
xkoopn 23620	A basic open set of the co...
txtopi 23621	The product of two topolog...
txtopon 23622	The underlying set of the ...
txuni 23623	The underlying set of the ...
txunii 23624	The underlying set of the ...
ptuni 23625	The base set for the produ...
ptunimpt 23626	Base set of a product topo...
pttopon 23627	The base set for the produ...
pttoponconst 23628	The base set for a product...
ptuniconst 23629	The base set for a product...
xkouni 23630	The base set of the compac...
xkotopon 23631	The base set of the compac...
ptval2 23632	The value of the product t...
txopn 23633	The product of two open se...
txcld 23634	The product of two closed ...
txcls 23635	Closure of a rectangle in ...
txss12 23636	Subset property of the top...
txbasval 23637	It is sufficient to consid...
neitx 23638	The Cartesian product of t...
txcnpi 23639	Continuity of a two-argume...
tx1cn 23640	Continuity of the first pr...
tx2cn 23641	Continuity of the second p...
ptpjcn 23642	Continuity of a projection...
ptpjopn 23643	The projection map is an o...
ptcld 23644	A closed box in the produc...
ptcldmpt 23645	A closed box in the produc...
ptclsg 23646	The closure of a box in th...
ptcls 23647	The closure of a box in th...
dfac14lem 23648	Lemma for ~ dfac14 . By e...
dfac14 23649	Theorem ~ ptcls is an equi...
xkoccn 23650	The "constant function" fu...
txcnp 23651	If two functions are conti...
ptcnplem 23652	Lemma for ~ ptcnp . (Cont...
ptcnp 23653	If every projection of a f...
upxp 23654	Universal property of the ...
txcnmpt 23655	A map into the product of ...
uptx 23656	Universal property of the ...
txcn 23657	A map into the product of ...
ptcn 23658	If every projection of a f...
prdstopn 23659	Topology of a structure pr...
prdstps 23660	A structure product of top...
pwstps 23661	A structure power of a top...
txrest 23662	The subspace of a topologi...
txdis 23663	The topological product of...
txindislem 23664	Lemma for ~ txindis . (Co...
txindis 23665	The topological product of...
txdis1cn 23666	A function is jointly cont...
txlly 23667	If the property ` A ` is p...
txnlly 23668	If the property ` A ` is p...
pthaus 23669	The product of a collectio...
ptrescn 23670	Restriction is a continuou...
txtube 23671	The "tube lemma". If ` X ...
txcmplem1 23672	Lemma for ~ txcmp . (Cont...
txcmplem2 23673	Lemma for ~ txcmp . (Cont...
txcmp 23674	The topological product of...
txcmpb 23675	The topological product of...
hausdiag 23676	A topology is Hausdorff if...
hauseqlcld 23677	In a Hausdorff topology, t...
txhaus 23678	The topological product of...
txlm 23679	Two sequences converge iff...
lmcn2 23680	The image of a convergent ...
tx1stc 23681	The topological product of...
tx2ndc 23682	The topological product of...
txkgen 23683	The topological product of...
xkohaus 23684	If the codomain space is H...
xkoptsub 23685	The compact-open topology ...
xkopt 23686	The compact-open topology ...
xkopjcn 23687	Continuity of a projection...
xkoco1cn 23688	If ` F ` is a continuous f...
xkoco2cn 23689	If ` F ` is a continuous f...
xkococnlem 23690	Continuity of the composit...
xkococn 23691	Continuity of the composit...
cnmptid 23692	The identity function is c...
cnmptc 23693	A constant function is con...
cnmpt11 23694	The composition of continu...
cnmpt11f 23695	The composition of continu...
cnmpt1t 23696	The composition of continu...
cnmpt12f 23697	The composition of continu...
cnmpt12 23698	The composition of continu...
cnmpt1st 23699	The projection onto the fi...
cnmpt2nd 23700	The projection onto the se...
cnmpt2c 23701	A constant function is con...
cnmpt21 23702	The composition of continu...
cnmpt21f 23703	The composition of continu...
cnmpt2t 23704	The composition of continu...
cnmpt22 23705	The composition of continu...
cnmpt22f 23706	The composition of continu...
cnmpt1res 23707	The restriction of a conti...
cnmpt2res 23708	The restriction of a conti...
cnmptcom 23709	The argument converse of a...
cnmptkc 23710	The curried first projecti...
cnmptkp 23711	The evaluation of the inne...
cnmptk1 23712	The composition of a curri...
cnmpt1k 23713	The composition of a one-a...
cnmptkk 23714	The composition of two cur...
xkofvcn 23715	Joint continuity of the fu...
cnmptk1p 23716	The evaluation of a currie...
cnmptk2 23717	The uncurrying of a currie...
xkoinjcn 23718	Continuity of "injection",...
cnmpt2k 23719	The currying of a two-argu...
txconn 23720	The topological product of...
imasnopn 23721	If a relation graph is ope...
imasncld 23722	If a relation graph is clo...
imasncls 23723	If a relation graph is clo...
qtopval 23726	Value of the quotient topo...
qtopval2 23727	Value of the quotient topo...
elqtop 23728	Value of the quotient topo...
qtopres 23729	The quotient topology is u...
qtoptop2 23730	The quotient topology is a...
qtoptop 23731	The quotient topology is a...
elqtop2 23732	Value of the quotient topo...
qtopuni 23733	The base set of the quotie...
elqtop3 23734	Value of the quotient topo...
qtoptopon 23735	The base set of the quotie...
qtopid 23736	A quotient map is a contin...
idqtop 23737	The quotient topology indu...
qtopcmplem 23738	Lemma for ~ qtopcmp and ~ ...
qtopcmp 23739	A quotient of a compact sp...
qtopconn 23740	A quotient of a connected ...
qtopkgen 23741	A quotient of a compactly ...
basqtop 23742	An injection maps bases to...
tgqtop 23743	An injection maps generate...
qtopcld 23744	The property of being a cl...
qtopcn 23745	Universal property of a qu...
qtopss 23746	A surjective continuous fu...
qtopeu 23747	Universal property of the ...
qtoprest 23748	If ` A ` is a saturated op...
qtopomap 23749	If ` F ` is a surjective c...
qtopcmap 23750	If ` F ` is a surjective c...
imastopn 23751	The topology of an image s...
imastps 23752	The image of a topological...
qustps 23753	A quotient structure is a ...
kqfval 23754	Value of the function appe...
kqfeq 23755	Two points in the Kolmogor...
kqffn 23756	The topological indistingu...
kqval 23757	Value of the quotient topo...
kqtopon 23758	The Kolmogorov quotient is...
kqid 23759	The topological indistingu...
ist0-4 23760	The topological indistingu...
kqfvima 23761	When the image set is open...
kqsat 23762	Any open set is saturated ...
kqdisj 23763	A version of ~ imain for t...
kqcldsat 23764	Any closed set is saturate...
kqopn 23765	The topological indistingu...
kqcld 23766	The topological indistingu...
kqt0lem 23767	Lemma for ~ kqt0 . (Contr...
isr0 23768	The property " ` J ` is an...
r0cld 23769	The analogue of the T_1 ax...
regr1lem 23770	Lemma for ~ regr1 . (Cont...
regr1lem2 23771	A Kolmogorov quotient of a...
kqreglem1 23772	A Kolmogorov quotient of a...
kqreglem2 23773	If the Kolmogorov quotient...
kqnrmlem1 23774	A Kolmogorov quotient of a...
kqnrmlem2 23775	If the Kolmogorov quotient...
kqtop 23776	The Kolmogorov quotient is...
kqt0 23777	The Kolmogorov quotient is...
kqf 23778	The Kolmogorov quotient is...
r0sep 23779	The separation property of...
nrmr0reg 23780	A normal R_0 space is also...
regr1 23781	A regular space is R_1, wh...
kqreg 23782	The Kolmogorov quotient of...
kqnrm 23783	The Kolmogorov quotient of...
hmeofn 23788	The set of homeomorphisms ...
hmeofval 23789	The set of all the homeomo...
ishmeo 23790	The predicate F is a homeo...
hmeocn 23791	A homeomorphism is continu...
hmeocnvcn 23792	The converse of a homeomor...
hmeocnv 23793	The converse of a homeomor...
hmeof1o2 23794	A homeomorphism is a 1-1-o...
hmeof1o 23795	A homeomorphism is a 1-1-o...
hmeoima 23796	The image of an open set b...
hmeoopn 23797	Homeomorphisms preserve op...
hmeocld 23798	Homeomorphisms preserve cl...
hmeocls 23799	Homeomorphisms preserve cl...
hmeontr 23800	Homeomorphisms preserve in...
hmeoimaf1o 23801	The function mapping open ...
hmeores 23802	The restriction of a homeo...
hmeoco 23803	The composite of two homeo...
idhmeo 23804	The identity function is a...
hmeocnvb 23805	The converse of a homeomor...
hmeoqtop 23806	A homeomorphism is a quoti...
hmph 23807	Express the predicate ` J ...
hmphi 23808	If there is a homeomorphis...
hmphtop 23809	Reverse closure for the ho...
hmphtop1 23810	The relation "being homeom...
hmphtop2 23811	The relation "being homeom...
hmphref 23812	"Is homeomorphic to" is re...
hmphsym 23813	"Is homeomorphic to" is sy...
hmphtr 23814	"Is homeomorphic to" is tr...
hmpher 23815	"Is homeomorphic to" is an...
hmphen 23816	Homeomorphisms preserve th...
hmphsymb 23817	"Is homeomorphic to" is sy...
haushmphlem 23818	Lemma for ~ haushmph and s...
cmphmph 23819	Compactness is a topologic...
connhmph 23820	Connectedness is a topolog...
t0hmph 23821	T_0 is a topological prope...
t1hmph 23822	T_1 is a topological prope...
haushmph 23823	Hausdorff-ness is a topolo...
reghmph 23824	Regularity is a topologica...
nrmhmph 23825	Normality is a topological...
hmph0 23826	A topology homeomorphic to...
hmphdis 23827	Homeomorphisms preserve to...
hmphindis 23828	Homeomorphisms preserve to...
indishmph 23829	Equinumerous sets equipped...
hmphen2 23830	Homeomorphisms preserve th...
cmphaushmeo 23831	A continuous bijection fro...
ordthmeolem 23832	Lemma for ~ ordthmeo . (C...
ordthmeo 23833	An order isomorphism is a ...
txhmeo 23834	Lift a pair of homeomorphi...
txswaphmeolem 23835	Show inverse for the "swap...
txswaphmeo 23836	There is a homeomorphism f...
pt1hmeo 23837	The canonical homeomorphis...
ptuncnv 23838	Exhibit the converse funct...
ptunhmeo 23839	Define a homeomorphism fro...
xpstopnlem1 23840	The function ` F ` used in...
xpstps 23841	A binary product of topolo...
xpstopnlem2 23842	Lemma for ~ xpstopn . (Co...
xpstopn 23843	The topology on a binary p...
ptcmpfi 23844	A topological product of f...
xkocnv 23845	The inverse of the "curryi...
xkohmeo 23846	The Exponential Law for to...
qtopf1 23847	If a quotient map is injec...
qtophmeo 23848	If two functions on a base...
t0kq 23849	A topological space is T_0...
kqhmph 23850	A topological space is T_0...
ist1-5lem 23851	Lemma for ~ ist1-5 and sim...
t1r0 23852	A T_1 space is R_0. That ...
ist1-5 23853	A topological space is T_1...
ishaus3 23854	A topological space is Hau...
nrmreg 23855	A normal T_1 space is regu...
reghaus 23856	A regular T_0 space is Hau...
nrmhaus 23857	A T_1 normal space is Haus...
elmptrab 23858	Membership in a one-parame...
elmptrab2 23859	Membership in a one-parame...
isfbas 23860	The predicate " ` F ` is a...
fbasne0 23861	There are no empty filter ...
0nelfb 23862	No filter base contains th...
fbsspw 23863	A filter base on a set is ...
fbelss 23864	An element of the filter b...
fbdmn0 23865	The domain of a filter bas...
isfbas2 23866	The predicate " ` F ` is a...
fbasssin 23867	A filter base contains sub...
fbssfi 23868	A filter base contains sub...
fbssint 23869	A filter base contains sub...
fbncp 23870	A filter base does not con...
fbun 23871	A necessary and sufficient...
fbfinnfr 23872	No filter base containing ...
opnfbas 23873	The collection of open sup...
trfbas2 23874	Conditions for the trace o...
trfbas 23875	Conditions for the trace o...
isfil 23878	The predicate "is a filter...
filfbas 23879	A filter is a filter base....
0nelfil 23880	The empty set doesn't belo...
fileln0 23881	An element of a filter is ...
filsspw 23882	A filter is a subset of th...
filelss 23883	An element of a filter is ...
filss 23884	A filter is closed under t...
filin 23885	A filter is closed under t...
filtop 23886	The underlying set belongs...
isfil2 23887	Derive the standard axioms...
isfildlem 23888	Lemma for ~ isfild . (Con...
isfild 23889	Sufficient condition for a...
filfi 23890	A filter is closed under t...
filinn0 23891	The intersection of two el...
filintn0 23892	A filter has the finite in...
filn0 23893	The empty set is not a fil...
infil 23894	The intersection of two fi...
snfil 23895	A singleton is a filter. ...
fbasweak 23896	A filter base on any set i...
snfbas 23897	Condition for a singleton ...
fsubbas 23898	A condition for a set to g...
fbasfip 23899	A filter base has the fini...
fbunfip 23900	A helpful lemma for showin...
fgval 23901	The filter generating clas...
elfg 23902	A condition for elements o...
ssfg 23903	A filter base is a subset ...
fgss 23904	A bigger base generates a ...
fgss2 23905	A condition for a filter t...
fgfil 23906	A filter generates itself....
elfilss 23907	An element belongs to a fi...
filfinnfr 23908	No filter containing a fin...
fgcl 23909	A generated filter is a fi...
fgabs 23910	Absorption law for filter ...
neifil 23911	The neighborhoods of a non...
filunibas 23912	Recover the base set from ...
filunirn 23913	Two ways to express a filt...
filconn 23914	A filter gives rise to a c...
fbasrn 23915	Given a filter on a domain...
filuni 23916	The union of a nonempty se...
trfil1 23917	Conditions for the trace o...
trfil2 23918	Conditions for the trace o...
trfil3 23919	Conditions for the trace o...
trfilss 23920	If ` A ` is a member of th...
fgtr 23921	If ` A ` is a member of th...
trfg 23922	The trace operation and th...
trnei 23923	The trace, over a set ` A ...
cfinfil 23924	Relative complements of th...
csdfil 23925	The set of all elements wh...
supfil 23926	The supersets of a nonempt...
zfbas 23927	The set of upper sets of i...
uzrest 23928	The restriction of the set...
uzfbas 23929	The set of upper sets of i...
isufil 23934	The property of being an u...
ufilfil 23935	An ultrafilter is a filter...
ufilss 23936	For any subset of the base...
ufilb 23937	The complement is in an ul...
ufilmax 23938	Any filter finer than an u...
isufil2 23939	The maximal property of an...
ufprim 23940	An ultrafilter is a prime ...
trufil 23941	Conditions for the trace o...
filssufilg 23942	A filter is contained in s...
filssufil 23943	A filter is contained in s...
isufl 23944	Define the (strong) ultraf...
ufli 23945	Property of a set that sat...
numufl 23946	Consequence of ~ filssufil...
fiufl 23947	A finite set satisfies the...
acufl 23948	The axiom of choice implie...
ssufl 23949	If ` Y ` is a subset of ` ...
ufileu 23950	If the ultrafilter contain...
filufint 23951	A filter is equal to the i...
uffix 23952	Lemma for ~ fixufil and ~ ...
fixufil 23953	The condition describing a...
uffixfr 23954	An ultrafilter is either f...
uffix2 23955	A classification of fixed ...
uffixsn 23956	The singleton of the gener...
ufildom1 23957	An ultrafilter is generate...
uffinfix 23958	An ultrafilter containing ...
cfinufil 23959	An ultrafilter is free iff...
ufinffr 23960	An infinite subset is cont...
ufilen 23961	Any infinite set has an ul...
ufildr 23962	An ultrafilter gives rise ...
fin1aufil 23963	There are no definable fre...
fmval 23974	Introduce a function that ...
fmfil 23975	A mapping filter is a filt...
fmf 23976	Pushing-forward via a func...
fmss 23977	A finer filter produces a ...
elfm 23978	An element of a mapping fi...
elfm2 23979	An element of a mapping fi...
fmfg 23980	The image filter of a filt...
elfm3 23981	An alternate formulation o...
imaelfm 23982	An image of a filter eleme...
rnelfmlem 23983	Lemma for ~ rnelfm . (Con...
rnelfm 23984	A condition for a filter t...
fmfnfmlem1 23985	Lemma for ~ fmfnfm . (Con...
fmfnfmlem2 23986	Lemma for ~ fmfnfm . (Con...
fmfnfmlem3 23987	Lemma for ~ fmfnfm . (Con...
fmfnfmlem4 23988	Lemma for ~ fmfnfm . (Con...
fmfnfm 23989	A filter finer than an ima...
fmufil 23990	An image filter of an ultr...
fmid 23991	The filter map applied to ...
fmco 23992	Composition of image filte...
ufldom 23993	The ultrafilter lemma prop...
flimval 23994	The set of limit points of...
elflim2 23995	The predicate "is a limit ...
flimtop 23996	Reverse closure for the li...
flimneiss 23997	A filter contains the neig...
flimnei 23998	A filter contains all of t...
flimelbas 23999	A limit point of a filter ...
flimfil 24000	Reverse closure for the li...
flimtopon 24001	Reverse closure for the li...
elflim 24002	The predicate "is a limit ...
flimss2 24003	A limit point of a filter ...
flimss1 24004	A limit point of a filter ...
neiflim 24005	A point is a limit point o...
flimopn 24006	The condition for being a ...
fbflim 24007	A condition for a filter t...
fbflim2 24008	A condition for a filter b...
flimclsi 24009	The convergent points of a...
hausflimlem 24010	If ` A ` and ` B ` are bot...
hausflimi 24011	One direction of ~ hausfli...
hausflim 24012	A condition for a topology...
flimcf 24013	Fineness is properly chara...
flimrest 24014	The set of limit points in...
flimclslem 24015	Lemma for ~ flimcls . (Co...
flimcls 24016	Closure in terms of filter...
flimsncls 24017	If ` A ` is a limit point ...
hauspwpwf1 24018	Lemma for ~ hauspwpwdom . ...
hauspwpwdom 24019	If ` X ` is a Hausdorff sp...
flffval 24020	Given a topology and a fil...
flfval 24021	Given a function from a fi...
flfnei 24022	The property of being a li...
flfneii 24023	A neighborhood of a limit ...
isflf 24024	The property of being a li...
flfelbas 24025	A limit point of a functio...
flffbas 24026	Limit points of a function...
flftg 24027	Limit points of a function...
hausflf 24028	If a function has its valu...
hausflf2 24029	If a convergent function h...
cnpflfi 24030	Forward direction of ~ cnp...
cnpflf2 24031	` F ` is continuous at poi...
cnpflf 24032	Continuity of a function a...
cnflf 24033	A function is continuous i...
cnflf2 24034	A function is continuous i...
flfcnp 24035	A continuous function pres...
lmflf 24036	The topological limit rela...
txflf 24037	Two sequences converge in ...
flfcnp2 24038	The image of a convergent ...
fclsval 24039	The set of all cluster poi...
isfcls 24040	A cluster point of a filte...
fclsfil 24041	Reverse closure for the cl...
fclstop 24042	Reverse closure for the cl...
fclstopon 24043	Reverse closure for the cl...
isfcls2 24044	A cluster point of a filte...
fclsopn 24045	Write the cluster point co...
fclsopni 24046	An open neighborhood of a ...
fclselbas 24047	A cluster point is in the ...
fclsneii 24048	A neighborhood of a cluste...
fclssscls 24049	The set of cluster points ...
fclsnei 24050	Cluster points in terms of...
supnfcls 24051	The filter of supersets of...
fclsbas 24052	Cluster points in terms of...
fclsss1 24053	A finer topology has fewer...
fclsss2 24054	A finer filter has fewer c...
fclsrest 24055	The set of cluster points ...
fclscf 24056	Characterization of finene...
flimfcls 24057	A limit point is a cluster...
fclsfnflim 24058	A filter clusters at a poi...
flimfnfcls 24059	A filter converges to a po...
fclscmpi 24060	Forward direction of ~ fcl...
fclscmp 24061	A space is compact iff eve...
uffclsflim 24062	The cluster points of an u...
ufilcmp 24063	A space is compact iff eve...
fcfval 24064	The set of cluster points ...
isfcf 24065	The property of being a cl...
fcfnei 24066	The property of being a cl...
fcfelbas 24067	A cluster point of a funct...
fcfneii 24068	A neighborhood of a cluste...
flfssfcf 24069	A limit point of a functio...
uffcfflf 24070	If the domain filter is an...
cnpfcfi 24071	Lemma for ~ cnpfcf . If a...
cnpfcf 24072	A function ` F ` is contin...
cnfcf 24073	Continuity of a function i...
flfcntr 24074	A continuous function's va...
alexsublem 24075	Lemma for ~ alexsub . (Co...
alexsub 24076	The Alexander Subbase Theo...
alexsubb 24077	Biconditional form of the ...
alexsubALTlem1 24078	Lemma for ~ alexsubALT . ...
alexsubALTlem2 24079	Lemma for ~ alexsubALT . ...
alexsubALTlem3 24080	Lemma for ~ alexsubALT . ...
alexsubALTlem4 24081	Lemma for ~ alexsubALT . ...
alexsubALT 24082	The Alexander Subbase Theo...
ptcmplem1 24083	Lemma for ~ ptcmp . (Cont...
ptcmplem2 24084	Lemma for ~ ptcmp . (Cont...
ptcmplem3 24085	Lemma for ~ ptcmp . (Cont...
ptcmplem4 24086	Lemma for ~ ptcmp . (Cont...
ptcmplem5 24087	Lemma for ~ ptcmp . (Cont...
ptcmpg 24088	Tychonoff's theorem: The ...
ptcmp 24089	Tychonoff's theorem: The ...
cnextval 24092	The function applying cont...
cnextfval 24093	The continuous extension o...
cnextrel 24094	In the general case, a con...
cnextfun 24095	If the target space is Hau...
cnextfvval 24096	The value of the continuou...
cnextf 24097	Extension by continuity. ...
cnextcn 24098	Extension by continuity. ...
cnextfres1 24099	` F ` and its extension by...
cnextfres 24100	` F ` and its extension by...
istmd 24105	The predicate "is a topolo...
tmdmnd 24106	A topological monoid is a ...
tmdtps 24107	A topological monoid is a ...
istgp 24108	The predicate "is a topolo...
tgpgrp 24109	A topological group is a g...
tgptmd 24110	A topological group is a t...
tgptps 24111	A topological group is a t...
tmdtopon 24112	The topology of a topologi...
tgptopon 24113	The topology of a topologi...
tmdcn 24114	In a topological monoid, t...
tgpcn 24115	In a topological group, th...
tgpinv 24116	In a topological group, th...
grpinvhmeo 24117	The inverse function in a ...
cnmpt1plusg 24118	Continuity of the group su...
cnmpt2plusg 24119	Continuity of the group su...
tmdcn2 24120	Write out the definition o...
tgpsubcn 24121	In a topological group, th...
istgp2 24122	A group with a topology is...
tmdmulg 24123	In a topological monoid, t...
tgpmulg 24124	In a topological group, th...
tgpmulg2 24125	In a topological monoid, t...
tmdgsum 24126	In a topological monoid, t...
tmdgsum2 24127	For any neighborhood ` U `...
oppgtmd 24128	The opposite of a topologi...
oppgtgp 24129	The opposite of a topologi...
distgp 24130	Any group equipped with th...
indistgp 24131	Any group equipped with th...
efmndtmd 24132	The monoid of endofunction...
tmdlactcn 24133	The left group action of e...
tgplacthmeo 24134	The left group action of e...
submtmd 24135	A submonoid of a topologic...
subgtgp 24136	A subgroup of a topologica...
symgtgp 24137	The symmetric group is a t...
subgntr 24138	A subgroup of a topologica...
opnsubg 24139	An open subgroup of a topo...
clssubg 24140	The closure of a subgroup ...
clsnsg 24141	The closure of a normal su...
cldsubg 24142	A subgroup of finite index...
tgpconncompeqg 24143	The connected component co...
tgpconncomp 24144	The identity component, th...
tgpconncompss 24145	The identity component is ...
ghmcnp 24146	A group homomorphism on to...
snclseqg 24147	The coset of the closure o...
tgphaus 24148	A topological group is Hau...
tgpt1 24149	Hausdorff and T1 are equiv...
tgpt0 24150	Hausdorff and T0 are equiv...
qustgpopn 24151	A quotient map in a topolo...
qustgplem 24152	Lemma for ~ qustgp . (Con...
qustgp 24153	The quotient of a topologi...
qustgphaus 24154	The quotient of a topologi...
prdstmdd 24155	The product of a family of...
prdstgpd 24156	The product of a family of...
tsmsfbas 24159	The collection of all sets...
tsmslem1 24160	The finite partial sums of...
tsmsval2 24161	Definition of the topologi...
tsmsval 24162	Definition of the topologi...
tsmspropd 24163	The group sum depends only...
eltsms 24164	The property of being a su...
tsmsi 24165	The property of being a su...
tsmscl 24166	A sum in a topological gro...
haustsms 24167	In a Hausdorff topological...
haustsms2 24168	In a Hausdorff topological...
tsmscls 24169	One half of ~ tgptsmscls ,...
tsmsgsum 24170	The convergent points of a...
tsmsid 24171	If a sum is finite, the us...
haustsmsid 24172	In a Hausdorff topological...
tsms0 24173	The sum of zero is zero. ...
tsmssubm 24174	Evaluate an infinite group...
tsmsres 24175	Extend an infinite group s...
tsmsf1o 24176	Re-index an infinite group...
tsmsmhm 24177	Apply a continuous group h...
tsmsadd 24178	The sum of two infinite gr...
tsmsinv 24179	Inverse of an infinite gro...
tsmssub 24180	The difference of two infi...
tgptsmscls 24181	A sum in a topological gro...
tgptsmscld 24182	The set of limit points to...
tsmssplit 24183	Split a topological group ...
tsmsxplem1 24184	Lemma for ~ tsmsxp . (Con...
tsmsxplem2 24185	Lemma for ~ tsmsxp . (Con...
tsmsxp 24186	Write a sum over a two-dim...
istrg 24195	Express the predicate " ` ...
trgtmd 24196	The multiplicative monoid ...
istdrg 24197	Express the predicate " ` ...
tdrgunit 24198	The unit group of a topolo...
trgtgp 24199	A topological ring is a to...
trgtmd2 24200	A topological ring is a to...
trgtps 24201	A topological ring is a to...
trgring 24202	A topological ring is a ri...
trggrp 24203	A topological ring is a gr...
tdrgtrg 24204	A topological division rin...
tdrgdrng 24205	A topological division rin...
tdrgring 24206	A topological division rin...
tdrgtmd 24207	A topological division rin...
tdrgtps 24208	A topological division rin...
istdrg2 24209	A topological-ring divisio...
mulrcn 24210	The functionalization of t...
invrcn2 24211	The multiplicative inverse...
invrcn 24212	The multiplicative inverse...
cnmpt1mulr 24213	Continuity of ring multipl...
cnmpt2mulr 24214	Continuity of ring multipl...
dvrcn 24215	The division function is c...
istlm 24216	The predicate " ` W ` is a...
vscacn 24217	The scalar multiplication ...
tlmtmd 24218	A topological module is a ...
tlmtps 24219	A topological module is a ...
tlmlmod 24220	A topological module is a ...
tlmtrg 24221	The scalar ring of a topol...
tlmscatps 24222	The scalar ring of a topol...
istvc 24223	A topological vector space...
tvctdrg 24224	The scalar field of a topo...
cnmpt1vsca 24225	Continuity of scalar multi...
cnmpt2vsca 24226	Continuity of scalar multi...
tlmtgp 24227	A topological vector space...
tvctlm 24228	A topological vector space...
tvclmod 24229	A topological vector space...
tvclvec 24230	A topological vector space...
ustfn 24233	The defined uniform struct...
ustval 24234	The class of all uniform s...
isust 24235	The predicate " ` U ` is a...
ustssxp 24236	Entourages are subsets of ...
ustssel 24237	A uniform structure is upw...
ustbasel 24238	The full set is always an ...
ustincl 24239	A uniform structure is clo...
ustdiag 24240	The diagonal set is includ...
ustinvel 24241	If ` V ` is an entourage, ...
ustexhalf 24242	For each entourage ` V ` t...
ustrel 24243	The elements of uniform st...
ustfilxp 24244	A uniform structure on a n...
ustne0 24245	A uniform structure cannot...
ustssco 24246	In an uniform structure, a...
ustexsym 24247	In an uniform structure, f...
ustex2sym 24248	In an uniform structure, f...
ustex3sym 24249	In an uniform structure, f...
ustref 24250	Any element of the base se...
ust0 24251	The unique uniform structu...
ustn0 24252	The empty set is not an un...
ustund 24253	If two intersecting sets `...
ustelimasn 24254	Any point ` A ` is near en...
ustneism 24255	For a point ` A ` in ` X `...
elrnustOLD 24256	Obsolete version of ~ elfv...
ustbas2 24257	Second direction for ~ ust...
ustuni 24258	The set union of a uniform...
ustbas 24259	Recover the base of an uni...
ustimasn 24260	Lemma for ~ ustuqtop . (C...
trust 24261	The trace of a uniform str...
utopval 24264	The topology induced by a ...
elutop 24265	Open sets in the topology ...
utoptop 24266	The topology induced by a ...
utopbas 24267	The base of the topology i...
utoptopon 24268	Topology induced by a unif...
restutop 24269	Restriction of a topology ...
restutopopn 24270	The restriction of the top...
ustuqtoplem 24271	Lemma for ~ ustuqtop . (C...
ustuqtop0 24272	Lemma for ~ ustuqtop . (C...
ustuqtop1 24273	Lemma for ~ ustuqtop , sim...
ustuqtop2 24274	Lemma for ~ ustuqtop . (C...
ustuqtop3 24275	Lemma for ~ ustuqtop , sim...
ustuqtop4 24276	Lemma for ~ ustuqtop . (C...
ustuqtop5 24277	Lemma for ~ ustuqtop . (C...
ustuqtop 24278	For a given uniform struct...
utopsnneiplem 24279	The neighborhoods of a poi...
utopsnneip 24280	The neighborhoods of a poi...
utopsnnei 24281	Images of singletons by en...
utop2nei 24282	For any symmetrical entour...
utop3cls 24283	Relation between a topolog...
utopreg 24284	All Hausdorff uniform spac...
ussval 24291	The uniform structure on u...
ussid 24292	In case the base of the ` ...
isusp 24293	The predicate ` W ` is a u...
ressuss 24294	Value of the uniform struc...
ressust 24295	The uniform structure of a...
ressusp 24296	The restriction of a unifo...
tusval 24297	The value of the uniform s...
tuslem 24298	Lemma for ~ tusbas , ~ tus...
tuslemOLD 24299	Obsolete proof of ~ tuslem...
tusbas 24300	The base set of a construc...
tusunif 24301	The uniform structure of a...
tususs 24302	The uniform structure of a...
tustopn 24303	The topology induced by a ...
tususp 24304	A constructed uniform spac...
tustps 24305	A constructed uniform spac...
uspreg 24306	If a uniform space is Haus...
ucnval 24309	The set of all uniformly c...
isucn 24310	The predicate " ` F ` is a...
isucn2 24311	The predicate " ` F ` is a...
ucnimalem 24312	Reformulate the ` G ` func...
ucnima 24313	An equivalent statement of...
ucnprima 24314	The preimage by a uniforml...
iducn 24315	The identity is uniformly ...
cstucnd 24316	A constant function is uni...
ucncn 24317	Uniform continuity implies...
iscfilu 24320	The predicate " ` F ` is a...
cfilufbas 24321	A Cauchy filter base is a ...
cfiluexsm 24322	For a Cauchy filter base a...
fmucndlem 24323	Lemma for ~ fmucnd . (Con...
fmucnd 24324	The image of a Cauchy filt...
cfilufg 24325	The filter generated by a ...
trcfilu 24326	Condition for the trace of...
cfiluweak 24327	A Cauchy filter base is al...
neipcfilu 24328	In an uniform space, a nei...
iscusp 24331	The predicate " ` W ` is a...
cuspusp 24332	A complete uniform space i...
cuspcvg 24333	In a complete uniform spac...
iscusp2 24334	The predicate " ` W ` is a...
cnextucn 24335	Extension by continuity. ...
ucnextcn 24336	Extension by continuity. ...
ispsmet 24337	Express the predicate " ` ...
psmetdmdm 24338	Recover the base set from ...
psmetf 24339	The distance function of a...
psmetcl 24340	Closure of the distance fu...
psmet0 24341	The distance function of a...
psmettri2 24342	Triangle inequality for th...
psmetsym 24343	The distance function of a...
psmettri 24344	Triangle inequality for th...
psmetge0 24345	The distance function of a...
psmetxrge0 24346	The distance function of a...
psmetres2 24347	Restriction of a pseudomet...
psmetlecl 24348	Real closure of an extende...
distspace 24349	A set ` X ` together with ...
ismet 24356	Express the predicate " ` ...
isxmet 24357	Express the predicate " ` ...
ismeti 24358	Properties that determine ...
isxmetd 24359	Properties that determine ...
isxmet2d 24360	It is safe to only require...
metflem 24361	Lemma for ~ metf and other...
xmetf 24362	Mapping of the distance fu...
metf 24363	Mapping of the distance fu...
xmetcl 24364	Closure of the distance fu...
metcl 24365	Closure of the distance fu...
ismet2 24366	An extended metric is a me...
metxmet 24367	A metric is an extended me...
xmetdmdm 24368	Recover the base set from ...
metdmdm 24369	Recover the base set from ...
xmetunirn 24370	Two ways to express an ext...
xmeteq0 24371	The value of an extended m...
meteq0 24372	The value of a metric is z...
xmettri2 24373	Triangle inequality for th...
mettri2 24374	Triangle inequality for th...
xmet0 24375	The distance function of a...
met0 24376	The distance function of a...
xmetge0 24377	The distance function of a...
metge0 24378	The distance function of a...
xmetlecl 24379	Real closure of an extende...
xmetsym 24380	The distance function of a...
xmetpsmet 24381	An extended metric is a ps...
xmettpos 24382	The distance function of a...
metsym 24383	The distance function of a...
xmettri 24384	Triangle inequality for th...
mettri 24385	Triangle inequality for th...
xmettri3 24386	Triangle inequality for th...
mettri3 24387	Triangle inequality for th...
xmetrtri 24388	One half of the reverse tr...
xmetrtri2 24389	The reverse triangle inequ...
metrtri 24390	Reverse triangle inequalit...
xmetgt0 24391	The distance function of a...
metgt0 24392	The distance function of a...
metn0 24393	A metric space is nonempty...
xmetres2 24394	Restriction of an extended...
metreslem 24395	Lemma for ~ metres . (Con...
metres2 24396	Lemma for ~ metres . (Con...
xmetres 24397	A restriction of an extend...
metres 24398	A restriction of a metric ...
0met 24399	The empty metric. (Contri...
prdsdsf 24400	The product metric is a fu...
prdsxmetlem 24401	The product metric is an e...
prdsxmet 24402	The product metric is an e...
prdsmet 24403	The product metric is a me...
ressprdsds 24404	Restriction of a product m...
resspwsds 24405	Restriction of a power met...
imasdsf1olem 24406	Lemma for ~ imasdsf1o . (...
imasdsf1o 24407	The distance function is t...
imasf1oxmet 24408	The image of an extended m...
imasf1omet 24409	The image of a metric is a...
xpsdsfn 24410	Closure of the metric in a...
xpsdsfn2 24411	Closure of the metric in a...
xpsxmetlem 24412	Lemma for ~ xpsxmet . (Co...
xpsxmet 24413	A product metric of extend...
xpsdsval 24414	Value of the metric in a b...
xpsmet 24415	The direct product of two ...
blfvalps 24416	The value of the ball func...
blfval 24417	The value of the ball func...
blvalps 24418	The ball around a point ` ...
blval 24419	The ball around a point ` ...
elblps 24420	Membership in a ball. (Co...
elbl 24421	Membership in a ball. (Co...
elbl2ps 24422	Membership in a ball. (Co...
elbl2 24423	Membership in a ball. (Co...
elbl3ps 24424	Membership in a ball, with...
elbl3 24425	Membership in a ball, with...
blcomps 24426	Commute the arguments to t...
blcom 24427	Commute the arguments to t...
xblpnfps 24428	The infinity ball in an ex...
xblpnf 24429	The infinity ball in an ex...
blpnf 24430	The infinity ball in a sta...
bldisj 24431	Two balls are disjoint if ...
blgt0 24432	A nonempty ball implies th...
bl2in 24433	Two balls are disjoint if ...
xblss2ps 24434	One ball is contained in a...
xblss2 24435	One ball is contained in a...
blss2ps 24436	One ball is contained in a...
blss2 24437	One ball is contained in a...
blhalf 24438	A ball of radius ` R / 2 `...
blfps 24439	Mapping of a ball. (Contr...
blf 24440	Mapping of a ball. (Contr...
blrnps 24441	Membership in the range of...
blrn 24442	Membership in the range of...
xblcntrps 24443	A ball contains its center...
xblcntr 24444	A ball contains its center...
blcntrps 24445	A ball contains its center...
blcntr 24446	A ball contains its center...
xbln0 24447	A ball is nonempty iff the...
bln0 24448	A ball is not empty. (Con...
blelrnps 24449	A ball belongs to the set ...
blelrn 24450	A ball belongs to the set ...
blssm 24451	A ball is a subset of the ...
unirnblps 24452	The union of the set of ba...
unirnbl 24453	The union of the set of ba...
blin 24454	The intersection of two ba...
ssblps 24455	The size of a ball increas...
ssbl 24456	The size of a ball increas...
blssps 24457	Any point ` P ` in a ball ...
blss 24458	Any point ` P ` in a ball ...
blssexps 24459	Two ways to express the ex...
blssex 24460	Two ways to express the ex...
ssblex 24461	A nested ball exists whose...
blin2 24462	Given any two balls and a ...
blbas 24463	The balls of a metric spac...
blres 24464	A ball in a restricted met...
xmeterval 24465	Value of the "finitely sep...
xmeter 24466	The "finitely separated" r...
xmetec 24467	The equivalence classes un...
blssec 24468	A ball centered at ` P ` i...
blpnfctr 24469	The infinity ball in an ex...
xmetresbl 24470	An extended metric restric...
mopnval 24471	An open set is a subset of...
mopntopon 24472	The set of open sets of a ...
mopntop 24473	The set of open sets of a ...
mopnuni 24474	The union of all open sets...
elmopn 24475	The defining property of a...
mopnfss 24476	The family of open sets of...
mopnm 24477	The base set of a metric s...
elmopn2 24478	A defining property of an ...
mopnss 24479	An open set of a metric sp...
isxms 24480	Express the predicate " ` ...
isxms2 24481	Express the predicate " ` ...
isms 24482	Express the predicate " ` ...
isms2 24483	Express the predicate " ` ...
xmstopn 24484	The topology component of ...
mstopn 24485	The topology component of ...
xmstps 24486	An extended metric space i...
msxms 24487	A metric space is an exten...
mstps 24488	A metric space is a topolo...
xmsxmet 24489	The distance function, sui...
msmet 24490	The distance function, sui...
msf 24491	The distance function of a...
xmsxmet2 24492	The distance function, sui...
msmet2 24493	The distance function, sui...
mscl 24494	Closure of the distance fu...
xmscl 24495	Closure of the distance fu...
xmsge0 24496	The distance function in a...
xmseq0 24497	The distance between two p...
xmssym 24498	The distance function in a...
xmstri2 24499	Triangle inequality for th...
mstri2 24500	Triangle inequality for th...
xmstri 24501	Triangle inequality for th...
mstri 24502	Triangle inequality for th...
xmstri3 24503	Triangle inequality for th...
mstri3 24504	Triangle inequality for th...
msrtri 24505	Reverse triangle inequalit...
xmspropd 24506	Property deduction for an ...
mspropd 24507	Property deduction for a m...
setsmsbas 24508	The base set of a construc...
setsmsbasOLD 24509	Obsolete proof of ~ setsms...
setsmsds 24510	The distance function of a...
setsmsdsOLD 24511	Obsolete proof of ~ setsms...
setsmstset 24512	The topology of a construc...
setsmstopn 24513	The topology of a construc...
setsxms 24514	The constructed metric spa...
setsms 24515	The constructed metric spa...
tmsval 24516	For any metric there is an...
tmslem 24517	Lemma for ~ tmsbas , ~ tms...
tmslemOLD 24518	Obsolete version of ~ tmsl...
tmsbas 24519	The base set of a construc...
tmsds 24520	The metric of a constructe...
tmstopn 24521	The topology of a construc...
tmsxms 24522	The constructed metric spa...
tmsms 24523	The constructed metric spa...
imasf1obl 24524	The image of a metric spac...
imasf1oxms 24525	The image of a metric spac...
imasf1oms 24526	The image of a metric spac...
prdsbl 24527	A ball in the product metr...
mopni 24528	An open set of a metric sp...
mopni2 24529	An open set of a metric sp...
mopni3 24530	An open set of a metric sp...
blssopn 24531	The balls of a metric spac...
unimopn 24532	The union of a collection ...
mopnin 24533	The intersection of two op...
mopn0 24534	The empty set is an open s...
rnblopn 24535	A ball of a metric space i...
blopn 24536	A ball of a metric space i...
neibl 24537	The neighborhoods around a...
blnei 24538	A ball around a point is a...
lpbl 24539	Every ball around a limit ...
blsscls2 24540	A smaller closed ball is c...
blcld 24541	A "closed ball" in a metri...
blcls 24542	The closure of an open bal...
blsscls 24543	If two concentric balls ha...
metss 24544	Two ways of saying that me...
metequiv 24545	Two ways of saying that tw...
metequiv2 24546	If there is a sequence of ...
metss2lem 24547	Lemma for ~ metss2 . (Con...
metss2 24548	If the metric ` D ` is "st...
comet 24549	The composition of an exte...
stdbdmetval 24550	Value of the standard boun...
stdbdxmet 24551	The standard bounded metri...
stdbdmet 24552	The standard bounded metri...
stdbdbl 24553	The standard bounded metri...
stdbdmopn 24554	The standard bounded metri...
mopnex 24555	The topology generated by ...
methaus 24556	The topology generated by ...
met1stc 24557	The topology generated by ...
met2ndci 24558	A separable metric space (...
met2ndc 24559	A metric space is second-c...
metrest 24560	Two alternate formulations...
ressxms 24561	The restriction of a metri...
ressms 24562	The restriction of a metri...
prdsmslem1 24563	Lemma for ~ prdsms . The ...
prdsxmslem1 24564	Lemma for ~ prdsms . The ...
prdsxmslem2 24565	Lemma for ~ prdsxms . The...
prdsxms 24566	The indexed product struct...
prdsms 24567	The indexed product struct...
pwsxms 24568	A power of an extended met...
pwsms 24569	A power of a metric space ...
xpsxms 24570	A binary product of metric...
xpsms 24571	A binary product of metric...
tmsxps 24572	Express the product of two...
tmsxpsmopn 24573	Express the product of two...
tmsxpsval 24574	Value of the product of tw...
tmsxpsval2 24575	Value of the product of tw...
metcnp3 24576	Two ways to express that `...
metcnp 24577	Two ways to say a mapping ...
metcnp2 24578	Two ways to say a mapping ...
metcn 24579	Two ways to say a mapping ...
metcnpi 24580	Epsilon-delta property of ...
metcnpi2 24581	Epsilon-delta property of ...
metcnpi3 24582	Epsilon-delta property of ...
txmetcnp 24583	Continuity of a binary ope...
txmetcn 24584	Continuity of a binary ope...
metuval 24585	Value of the uniform struc...
metustel 24586	Define a filter base ` F `...
metustss 24587	Range of the elements of t...
metustrel 24588	Elements of the filter bas...
metustto 24589	Any two elements of the fi...
metustid 24590	The identity diagonal is i...
metustsym 24591	Elements of the filter bas...
metustexhalf 24592	For any element ` A ` of t...
metustfbas 24593	The filter base generated ...
metust 24594	The uniform structure gene...
cfilucfil 24595	Given a metric ` D ` and a...
metuust 24596	The uniform structure gene...
cfilucfil2 24597	Given a metric ` D ` and a...
blval2 24598	The ball around a point ` ...
elbl4 24599	Membership in a ball, alte...
metuel 24600	Elementhood in the uniform...
metuel2 24601	Elementhood in the uniform...
metustbl 24602	The "section" image of an ...
psmetutop 24603	The topology induced by a ...
xmetutop 24604	The topology induced by a ...
xmsusp 24605	If the uniform set of a me...
restmetu 24606	The uniform structure gene...
metucn 24607	Uniform continuity in metr...
dscmet 24608	The discrete metric on any...
dscopn 24609	The discrete metric genera...
nrmmetd 24610	Show that a group norm gen...
abvmet 24611	An absolute value ` F ` ge...
nmfval 24624	The value of the norm func...
nmval 24625	The value of the norm as t...
nmfval0 24626	The value of the norm func...
nmfval2 24627	The value of the norm func...
nmval2 24628	The value of the norm on a...
nmf2 24629	The norm on a metric group...
nmpropd 24630	Weak property deduction fo...
nmpropd2 24631	Strong property deduction ...
isngp 24632	The property of being a no...
isngp2 24633	The property of being a no...
isngp3 24634	The property of being a no...
ngpgrp 24635	A normed group is a group....
ngpms 24636	A normed group is a metric...
ngpxms 24637	A normed group is an exten...
ngptps 24638	A normed group is a topolo...
ngpmet 24639	The (induced) metric of a ...
ngpds 24640	Value of the distance func...
ngpdsr 24641	Value of the distance func...
ngpds2 24642	Write the distance between...
ngpds2r 24643	Write the distance between...
ngpds3 24644	Write the distance between...
ngpds3r 24645	Write the distance between...
ngprcan 24646	Cancel right addition insi...
ngplcan 24647	Cancel left addition insid...
isngp4 24648	Express the property of be...
ngpinvds 24649	Two elements are the same ...
ngpsubcan 24650	Cancel right subtraction i...
nmf 24651	The norm on a normed group...
nmcl 24652	The norm of a normed group...
nmge0 24653	The norm of a normed group...
nmeq0 24654	The identity is the only e...
nmne0 24655	The norm of a nonzero elem...
nmrpcl 24656	The norm of a nonzero elem...
nminv 24657	The norm of a negated elem...
nmmtri 24658	The triangle inequality fo...
nmsub 24659	The norm of the difference...
nmrtri 24660	Reverse triangle inequalit...
nm2dif 24661	Inequality for the differe...
nmtri 24662	The triangle inequality fo...
nmtri2 24663	Triangle inequality for th...
ngpi 24664	The properties of a normed...
nm0 24665	Norm of the identity eleme...
nmgt0 24666	The norm of a nonzero elem...
sgrim 24667	The induced metric on a su...
sgrimval 24668	The induced metric on a su...
subgnm 24669	The norm in a subgroup. (...
subgnm2 24670	A substructure assigns the...
subgngp 24671	A normed group restricted ...
ngptgp 24672	A normed abelian group is ...
ngppropd 24673	Property deduction for a n...
reldmtng 24674	The function ` toNrmGrp ` ...
tngval 24675	Value of the function whic...
tnglem 24676	Lemma for ~ tngbas and sim...
tnglemOLD 24677	Obsolete version of ~ tngl...
tngbas 24678	The base set of a structur...
tngbasOLD 24679	Obsolete proof of ~ tngbas...
tngplusg 24680	The group addition of a st...
tngplusgOLD 24681	Obsolete proof of ~ tngplu...
tng0 24682	The group identity of a st...
tngmulr 24683	The ring multiplication of...
tngmulrOLD 24684	Obsolete proof of ~ tngmul...
tngsca 24685	The scalar ring of a struc...
tngscaOLD 24686	Obsolete proof of ~ tngsca...
tngvsca 24687	The scalar multiplication ...
tngvscaOLD 24688	Obsolete proof of ~ tngvsc...
tngip 24689	The inner product operatio...
tngipOLD 24690	Obsolete proof of ~ tngip ...
tngds 24691	The metric function of a s...
tngdsOLD 24692	Obsolete proof of ~ tngds ...
tngtset 24693	The topology generated by ...
tngtopn 24694	The topology generated by ...
tngnm 24695	The topology generated by ...
tngngp2 24696	A norm turns a group into ...
tngngpd 24697	Derive the axioms for a no...
tngngp 24698	Derive the axioms for a no...
tnggrpr 24699	If a structure equipped wi...
tngngp3 24700	Alternate definition of a ...
nrmtngdist 24701	The augmentation of a norm...
nrmtngnrm 24702	The augmentation of a norm...
tngngpim 24703	The induced metric of a no...
isnrg 24704	A normed ring is a ring wi...
nrgabv 24705	The norm of a normed ring ...
nrgngp 24706	A normed ring is a normed ...
nrgring 24707	A normed ring is a ring. ...
nmmul 24708	The norm of a product in a...
nrgdsdi 24709	Distribute a distance calc...
nrgdsdir 24710	Distribute a distance calc...
nm1 24711	The norm of one in a nonze...
unitnmn0 24712	The norm of a unit is nonz...
nminvr 24713	The norm of an inverse in ...
nmdvr 24714	The norm of a division in ...
nrgdomn 24715	A nonzero normed ring is a...
nrgtgp 24716	A normed ring is a topolog...
subrgnrg 24717	A normed ring restricted t...
tngnrg 24718	Given any absolute value o...
isnlm 24719	A normed (left) module is ...
nmvs 24720	Defining property of a nor...
nlmngp 24721	A normed module is a norme...
nlmlmod 24722	A normed module is a left ...
nlmnrg 24723	The scalar component of a ...
nlmngp2 24724	The scalar component of a ...
nlmdsdi 24725	Distribute a distance calc...
nlmdsdir 24726	Distribute a distance calc...
nlmmul0or 24727	If a scalar product is zer...
sranlm 24728	The subring algebra over a...
nlmvscnlem2 24729	Lemma for ~ nlmvscn . Com...
nlmvscnlem1 24730	Lemma for ~ nlmvscn . (Co...
nlmvscn 24731	The scalar multiplication ...
rlmnlm 24732	The ring module over a nor...
rlmnm 24733	The norm function in the r...
nrgtrg 24734	A normed ring is a topolog...
nrginvrcnlem 24735	Lemma for ~ nrginvrcn . C...
nrginvrcn 24736	The ring inverse function ...
nrgtdrg 24737	A normed division ring is ...
nlmtlm 24738	A normed module is a topol...
isnvc 24739	A normed vector space is j...
nvcnlm 24740	A normed vector space is a...
nvclvec 24741	A normed vector space is a...
nvclmod 24742	A normed vector space is a...
isnvc2 24743	A normed vector space is j...
nvctvc 24744	A normed vector space is a...
lssnlm 24745	A subspace of a normed mod...
lssnvc 24746	A subspace of a normed vec...
rlmnvc 24747	The ring module over a nor...
ngpocelbl 24748	Membership of an off-cente...
nmoffn 24755	The function producing ope...
reldmnghm 24756	Lemma for normed group hom...
reldmnmhm 24757	Lemma for module homomorph...
nmofval 24758	Value of the operator norm...
nmoval 24759	Value of the operator norm...
nmogelb 24760	Property of the operator n...
nmolb 24761	Any upper bound on the val...
nmolb2d 24762	Any upper bound on the val...
nmof 24763	The operator norm is a fun...
nmocl 24764	The operator norm of an op...
nmoge0 24765	The operator norm of an op...
nghmfval 24766	A normed group homomorphis...
isnghm 24767	A normed group homomorphis...
isnghm2 24768	A normed group homomorphis...
isnghm3 24769	A normed group homomorphis...
bddnghm 24770	A bounded group homomorphi...
nghmcl 24771	A normed group homomorphis...
nmoi 24772	The operator norm achieves...
nmoix 24773	The operator norm is a bou...
nmoi2 24774	The operator norm is a bou...
nmoleub 24775	The operator norm, defined...
nghmrcl1 24776	Reverse closure for a norm...
nghmrcl2 24777	Reverse closure for a norm...
nghmghm 24778	A normed group homomorphis...
nmo0 24779	The operator norm of the z...
nmoeq0 24780	The operator norm is zero ...
nmoco 24781	An upper bound on the oper...
nghmco 24782	The composition of normed ...
nmotri 24783	Triangle inequality for th...
nghmplusg 24784	The sum of two bounded lin...
0nghm 24785	The zero operator is a nor...
nmoid 24786	The operator norm of the i...
idnghm 24787	The identity operator is a...
nmods 24788	Upper bound for the distan...
nghmcn 24789	A normed group homomorphis...
isnmhm 24790	A normed module homomorphi...
nmhmrcl1 24791	Reverse closure for a norm...
nmhmrcl2 24792	Reverse closure for a norm...
nmhmlmhm 24793	A normed module homomorphi...
nmhmnghm 24794	A normed module homomorphi...
nmhmghm 24795	A normed module homomorphi...
isnmhm2 24796	A normed module homomorphi...
nmhmcl 24797	A normed module homomorphi...
idnmhm 24798	The identity operator is a...
0nmhm 24799	The zero operator is a bou...
nmhmco 24800	The composition of bounded...
nmhmplusg 24801	The sum of two bounded lin...
qtopbaslem 24802	The set of open intervals ...
qtopbas 24803	The set of open intervals ...
retopbas 24804	A basis for the standard t...
retop 24805	The standard topology on t...
uniretop 24806	The underlying set of the ...
retopon 24807	The standard topology on t...
retps 24808	The standard topological s...
iooretop 24809	Open intervals are open se...
icccld 24810	Closed intervals are close...
icopnfcld 24811	Right-unbounded closed int...
iocmnfcld 24812	Left-unbounded closed inte...
qdensere 24813	` QQ ` is dense in the sta...
cnmetdval 24814	Value of the distance func...
cnmet 24815	The absolute value metric ...
cnxmet 24816	The absolute value metric ...
cnbl0 24817	Two ways to write the open...
cnblcld 24818	Two ways to write the clos...
cnfldms 24819	The complex number field i...
cnfldxms 24820	The complex number field i...
cnfldtps 24821	The complex number field i...
cnfldnm 24822	The norm of the field of c...
cnngp 24823	The complex numbers form a...
cnnrg 24824	The complex numbers form a...
cnfldtopn 24825	The topology of the comple...
cnfldtopon 24826	The topology of the comple...
cnfldtop 24827	The topology of the comple...
cnfldhaus 24828	The topology of the comple...
unicntop 24829	The underlying set of the ...
cnopn 24830	The set of complex numbers...
zringnrg 24831	The ring of integers is a ...
remetdval 24832	Value of the distance func...
remet 24833	The absolute value metric ...
rexmet 24834	The absolute value metric ...
bl2ioo 24835	A ball in terms of an open...
ioo2bl 24836	An open interval of reals ...
ioo2blex 24837	An open interval of reals ...
blssioo 24838	The balls of the standard ...
tgioo 24839	The topology generated by ...
qdensere2 24840	` QQ ` is dense in ` RR ` ...
blcvx 24841	An open ball in the comple...
rehaus 24842	The standard topology on t...
tgqioo 24843	The topology generated by ...
re2ndc 24844	The standard topology on t...
resubmet 24845	The subspace topology indu...
tgioo2 24846	The standard topology on t...
rerest 24847	The subspace topology indu...
tgioo3 24848	The standard topology on t...
xrtgioo 24849	The topology on the extend...
xrrest 24850	The subspace topology indu...
xrrest2 24851	The subspace topology indu...
xrsxmet 24852	The metric on the extended...
xrsdsre 24853	The metric on the extended...
xrsblre 24854	Any ball of the metric of ...
xrsmopn 24855	The metric on the extended...
zcld 24856	The integers are a closed ...
recld2 24857	The real numbers are a clo...
zcld2 24858	The integers are a closed ...
zdis 24859	The integers are a discret...
sszcld 24860	Every subset of the intege...
reperflem 24861	A subset of the real numbe...
reperf 24862	The real numbers are a per...
cnperf 24863	The complex numbers are a ...
iccntr 24864	The interior of a closed i...
icccmplem1 24865	Lemma for ~ icccmp . (Con...
icccmplem2 24866	Lemma for ~ icccmp . (Con...
icccmplem3 24867	Lemma for ~ icccmp . (Con...
icccmp 24868	A closed interval in ` RR ...
reconnlem1 24869	Lemma for ~ reconn . Conn...
reconnlem2 24870	Lemma for ~ reconn . (Con...
reconn 24871	A subset of the reals is c...
retopconn 24872	Corollary of ~ reconn . T...
iccconn 24873	A closed interval is conne...
opnreen 24874	Every nonempty open set is...
rectbntr0 24875	A countable subset of the ...
xrge0gsumle 24876	A finite sum in the nonneg...
xrge0tsms 24877	Any finite or infinite sum...
xrge0tsms2 24878	Any finite or infinite sum...
metdcnlem 24879	The metric function of a m...
xmetdcn2 24880	The metric function of an ...
xmetdcn 24881	The metric function of an ...
metdcn2 24882	The metric function of a m...
metdcn 24883	The metric function of a m...
msdcn 24884	The metric function of a m...
cnmpt1ds 24885	Continuity of the metric f...
cnmpt2ds 24886	Continuity of the metric f...
nmcn 24887	The norm of a normed group...
ngnmcncn 24888	The norm of a normed group...
abscn 24889	The absolute value functio...
metdsval 24890	Value of the "distance to ...
metdsf 24891	The distance from a point ...
metdsge 24892	The distance from the poin...
metds0 24893	If a point is in a set, it...
metdstri 24894	A generalization of the tr...
metdsle 24895	The distance from a point ...
metdsre 24896	The distance from a point ...
metdseq0 24897	The distance from a point ...
metdscnlem 24898	Lemma for ~ metdscn . (Co...
metdscn 24899	The function ` F ` which g...
metdscn2 24900	The function ` F ` which g...
metnrmlem1a 24901	Lemma for ~ metnrm . (Con...
metnrmlem1 24902	Lemma for ~ metnrm . (Con...
metnrmlem2 24903	Lemma for ~ metnrm . (Con...
metnrmlem3 24904	Lemma for ~ metnrm . (Con...
metnrm 24905	A metric space is normal. ...
metreg 24906	A metric space is regular....
addcnlem 24907	Lemma for ~ addcn , ~ subc...
addcn 24908	Complex number addition is...
subcn 24909	Complex number subtraction...
mulcn 24910	Complex number multiplicat...
divcnOLD 24911	Obsolete version of ~ divc...
mpomulcn 24912	Complex number multiplicat...
divcn 24913	Complex number division is...
cnfldtgp 24914	The complex numbers form a...
fsumcn 24915	A finite sum of functions ...
fsum2cn 24916	Version of ~ fsumcn for tw...
expcn 24917	The power function on comp...
divccn 24918	Division by a nonzero cons...
expcnOLD 24919	Obsolete version of ~ expc...
divccnOLD 24920	Obsolete version of ~ divc...
sqcn 24921	The square function on com...
iitopon 24926	The unit interval is a top...
iitop 24927	The unit interval is a top...
iiuni 24928	The base set of the unit i...
dfii2 24929	Alternate definition of th...
dfii3 24930	Alternate definition of th...
dfii4 24931	Alternate definition of th...
dfii5 24932	The unit interval expresse...
iicmp 24933	The unit interval is compa...
iiconn 24934	The unit interval is conne...
cncfval 24935	The value of the continuou...
elcncf 24936	Membership in the set of c...
elcncf2 24937	Version of ~ elcncf with a...
cncfrss 24938	Reverse closure of the con...
cncfrss2 24939	Reverse closure of the con...
cncff 24940	A continuous complex funct...
cncfi 24941	Defining property of a con...
elcncf1di 24942	Membership in the set of c...
elcncf1ii 24943	Membership in the set of c...
rescncf 24944	A continuous complex funct...
cncfcdm 24945	Change the codomain of a c...
cncfss 24946	The set of continuous func...
climcncf 24947	Image of a limit under a c...
abscncf 24948	Absolute value is continuo...
recncf 24949	Real part is continuous. ...
imcncf 24950	Imaginary part is continuo...
cjcncf 24951	Complex conjugate is conti...
mulc1cncf 24952	Multiplication by a consta...
divccncf 24953	Division by a constant is ...
cncfco 24954	The composition of two con...
cncfcompt2 24955	Composition of continuous ...
cncfmet 24956	Relate complex function co...
cncfcn 24957	Relate complex function co...
cncfcn1 24958	Relate complex function co...
cncfmptc 24959	A constant function is a c...
cncfmptid 24960	The identity function is a...
cncfmpt1f 24961	Composition of continuous ...
cncfmpt2f 24962	Composition of continuous ...
cncfmpt2ss 24963	Composition of continuous ...
addccncf 24964	Adding a constant is a con...
idcncf 24965	The identity function is a...
sub1cncf 24966	Subtracting a constant is ...
sub2cncf 24967	Subtraction from a constan...
cdivcncf 24968	Division with a constant n...
negcncf 24969	The negative function is c...
negcncfOLD 24970	Obsolete version of ~ negc...
negfcncf 24971	The negative of a continuo...
abscncfALT 24972	Absolute value is continuo...
cncfcnvcn 24973	Rewrite ~ cmphaushmeo for ...
expcncf 24974	The power function on comp...
cnmptre 24975	Lemma for ~ iirevcn and re...
cnmpopc 24976	Piecewise definition of a ...
iirev 24977	Reverse the unit interval....
iirevcn 24978	The reversion function is ...
iihalf1 24979	Map the first half of ` II...
iihalf1cn 24980	The first half function is...
iihalf1cnOLD 24981	Obsolete version of ~ iiha...
iihalf2 24982	Map the second half of ` I...
iihalf2cn 24983	The second half function i...
iihalf2cnOLD 24984	Obsolete version of ~ iiha...
elii1 24985	Divide the unit interval i...
elii2 24986	Divide the unit interval i...
iimulcl 24987	The unit interval is close...
iimulcn 24988	Multiplication is a contin...
iimulcnOLD 24989	Obsolete version of ~ iimu...
icoopnst 24990	A half-open interval start...
iocopnst 24991	A half-open interval endin...
icchmeo 24992	The natural bijection from...
icchmeoOLD 24993	Obsolete version of ~ icch...
icopnfcnv 24994	Define a bijection from ` ...
icopnfhmeo 24995	The defined bijection from...
iccpnfcnv 24996	Define a bijection from ` ...
iccpnfhmeo 24997	The defined bijection from...
xrhmeo 24998	The bijection from ` [ -u ...
xrhmph 24999	The extended reals are hom...
xrcmp 25000	The topology of the extend...
xrconn 25001	The topology of the extend...
icccvx 25002	A linear combination of tw...
oprpiece1res1 25003	Restriction to the first p...
oprpiece1res2 25004	Restriction to the second ...
cnrehmeo 25005	The canonical bijection fr...
cnrehmeoOLD 25006	Obsolete version of ~ cnre...
cnheiborlem 25007	Lemma for ~ cnheibor . (C...
cnheibor 25008	Heine-Borel theorem for co...
cnllycmp 25009	The topology on the comple...
rellycmp 25010	The topology on the reals ...
bndth 25011	The Boundedness Theorem. ...
evth 25012	The Extreme Value Theorem....
evth2 25013	The Extreme Value Theorem,...
lebnumlem1 25014	Lemma for ~ lebnum . The ...
lebnumlem2 25015	Lemma for ~ lebnum . As a...
lebnumlem3 25016	Lemma for ~ lebnum . By t...
lebnum 25017	The Lebesgue number lemma,...
xlebnum 25018	Generalize ~ lebnum to ext...
lebnumii 25019	Specialize the Lebesgue nu...
ishtpy 25025	Membership in the class of...
htpycn 25026	A homotopy is a continuous...
htpyi 25027	A homotopy evaluated at it...
ishtpyd 25028	Deduction for membership i...
htpycom 25029	Given a homotopy from ` F ...
htpyid 25030	A homotopy from a function...
htpyco1 25031	Compose a homotopy with a ...
htpyco2 25032	Compose a homotopy with a ...
htpycc 25033	Concatenate two homotopies...
isphtpy 25034	Membership in the class of...
phtpyhtpy 25035	A path homotopy is a homot...
phtpycn 25036	A path homotopy is a conti...
phtpyi 25037	Membership in the class of...
phtpy01 25038	Two path-homotopic paths h...
isphtpyd 25039	Deduction for membership i...
isphtpy2d 25040	Deduction for membership i...
phtpycom 25041	Given a homotopy from ` F ...
phtpyid 25042	A homotopy from a path to ...
phtpyco2 25043	Compose a path homotopy wi...
phtpycc 25044	Concatenate two path homot...
phtpcrel 25046	The path homotopy relation...
isphtpc 25047	The relation "is path homo...
phtpcer 25048	Path homotopy is an equiva...
phtpc01 25049	Path homotopic paths have ...
reparphti 25050	Lemma for ~ reparpht . (C...
reparphtiOLD 25051	Obsolete version of ~ repa...
reparpht 25052	Reparametrization lemma. ...
phtpcco2 25053	Compose a path homotopy wi...
pcofval 25064	The value of the path conc...
pcoval 25065	The concatenation of two p...
pcovalg 25066	Evaluate the concatenation...
pcoval1 25067	Evaluate the concatenation...
pco0 25068	The starting point of a pa...
pco1 25069	The ending point of a path...
pcoval2 25070	Evaluate the concatenation...
pcocn 25071	The concatenation of two p...
copco 25072	The composition of a conca...
pcohtpylem 25073	Lemma for ~ pcohtpy . (Co...
pcohtpy 25074	Homotopy invariance of pat...
pcoptcl 25075	A constant function is a p...
pcopt 25076	Concatenation with a point...
pcopt2 25077	Concatenation with a point...
pcoass 25078	Order of concatenation doe...
pcorevcl 25079	Closure for a reversed pat...
pcorevlem 25080	Lemma for ~ pcorev . Prov...
pcorev 25081	Concatenation with the rev...
pcorev2 25082	Concatenation with the rev...
pcophtb 25083	The path homotopy equivale...
om1val 25084	The definition of the loop...
om1bas 25085	The base set of the loop s...
om1elbas 25086	Elementhood in the base se...
om1addcl 25087	Closure of the group opera...
om1plusg 25088	The group operation (which...
om1tset 25089	The topology of the loop s...
om1opn 25090	The topology of the loop s...
pi1val 25091	The definition of the fund...
pi1bas 25092	The base set of the fundam...
pi1blem 25093	Lemma for ~ pi1buni . (Co...
pi1buni 25094	Another way to write the l...
pi1bas2 25095	The base set of the fundam...
pi1eluni 25096	Elementhood in the base se...
pi1bas3 25097	The base set of the fundam...
pi1cpbl 25098	The group operation, loop ...
elpi1 25099	The elements of the fundam...
elpi1i 25100	The elements of the fundam...
pi1addf 25101	The group operation of ` p...
pi1addval 25102	The concatenation of two p...
pi1grplem 25103	Lemma for ~ pi1grp . (Con...
pi1grp 25104	The fundamental group is a...
pi1id 25105	The identity element of th...
pi1inv 25106	An inverse in the fundamen...
pi1xfrf 25107	Functionality of the loop ...
pi1xfrval 25108	The value of the loop tran...
pi1xfr 25109	Given a path ` F ` and its...
pi1xfrcnvlem 25110	Given a path ` F ` between...
pi1xfrcnv 25111	Given a path ` F ` between...
pi1xfrgim 25112	The mapping ` G ` between ...
pi1cof 25113	Functionality of the loop ...
pi1coval 25114	The value of the loop tran...
pi1coghm 25115	The mapping ` G ` between ...
isclm 25118	A subcomplex module is a l...
clmsca 25119	The ring of scalars ` F ` ...
clmsubrg 25120	The base set of the ring o...
clmlmod 25121	A subcomplex module is a l...
clmgrp 25122	A subcomplex module is an ...
clmabl 25123	A subcomplex module is an ...
clmring 25124	The scalar ring of a subco...
clmfgrp 25125	The scalar ring of a subco...
clm0 25126	The zero of the scalar rin...
clm1 25127	The identity of the scalar...
clmadd 25128	The addition of the scalar...
clmmul 25129	The multiplication of the ...
clmcj 25130	The conjugation of the sca...
isclmi 25131	Reverse direction of ~ isc...
clmzss 25132	The scalar ring of a subco...
clmsscn 25133	The scalar ring of a subco...
clmsub 25134	Subtraction in the scalar ...
clmneg 25135	Negation in the scalar rin...
clmneg1 25136	Minus one is in the scalar...
clmabs 25137	Norm in the scalar ring of...
clmacl 25138	Closure of ring addition f...
clmmcl 25139	Closure of ring multiplica...
clmsubcl 25140	Closure of ring subtractio...
lmhmclm 25141	The domain of a linear ope...
clmvscl 25142	Closure of scalar product ...
clmvsass 25143	Associative law for scalar...
clmvscom 25144	Commutative law for the sc...
clmvsdir 25145	Distributive law for scala...
clmvsdi 25146	Distributive law for scala...
clmvs1 25147	Scalar product with ring u...
clmvs2 25148	A vector plus itself is tw...
clm0vs 25149	Zero times a vector is the...
clmopfne 25150	The (functionalized) opera...
isclmp 25151	The predicate "is a subcom...
isclmi0 25152	Properties that determine ...
clmvneg1 25153	Minus 1 times a vector is ...
clmvsneg 25154	Multiplication of a vector...
clmmulg 25155	The group multiple functio...
clmsubdir 25156	Scalar multiplication dist...
clmpm1dir 25157	Subtractive distributive l...
clmnegneg 25158	Double negative of a vecto...
clmnegsubdi2 25159	Distribution of negative o...
clmsub4 25160	Rearrangement of 4 terms i...
clmvsrinv 25161	A vector minus itself. (C...
clmvslinv 25162	Minus a vector plus itself...
clmvsubval 25163	Value of vector subtractio...
clmvsubval2 25164	Value of vector subtractio...
clmvz 25165	Two ways to express the ne...
zlmclm 25166	The ` ZZ ` -module operati...
clmzlmvsca 25167	The scalar product of a su...
nmoleub2lem 25168	Lemma for ~ nmoleub2a and ...
nmoleub2lem3 25169	Lemma for ~ nmoleub2a and ...
nmoleub2lem2 25170	Lemma for ~ nmoleub2a and ...
nmoleub2a 25171	The operator norm is the s...
nmoleub2b 25172	The operator norm is the s...
nmoleub3 25173	The operator norm is the s...
nmhmcn 25174	A linear operator over a n...
cmodscexp 25175	The powers of ` _i ` belon...
cmodscmulexp 25176	The scalar product of a ve...
cvslvec 25179	A subcomplex vector space ...
cvsclm 25180	A subcomplex vector space ...
iscvs 25181	A subcomplex vector space ...
iscvsp 25182	The predicate "is a subcom...
iscvsi 25183	Properties that determine ...
cvsi 25184	The properties of a subcom...
cvsunit 25185	Unit group of the scalar r...
cvsdiv 25186	Division of the scalar rin...
cvsdivcl 25187	The scalar field of a subc...
cvsmuleqdivd 25188	An equality involving rati...
cvsdiveqd 25189	An equality involving rati...
cnlmodlem1 25190	Lemma 1 for ~ cnlmod . (C...
cnlmodlem2 25191	Lemma 2 for ~ cnlmod . (C...
cnlmodlem3 25192	Lemma 3 for ~ cnlmod . (C...
cnlmod4 25193	Lemma 4 for ~ cnlmod . (C...
cnlmod 25194	The set of complex numbers...
cnstrcvs 25195	The set of complex numbers...
cnrbas 25196	The set of complex numbers...
cnrlmod 25197	The complex left module of...
cnrlvec 25198	The complex left module of...
cncvs 25199	The complex left module of...
recvs 25200	The field of the real numb...
recvsOLD 25201	Obsolete version of ~ recv...
qcvs 25202	The field of rational numb...
zclmncvs 25203	The ring of integers as le...
isncvsngp 25204	A normed subcomplex vector...
isncvsngpd 25205	Properties that determine ...
ncvsi 25206	The properties of a normed...
ncvsprp 25207	Proportionality property o...
ncvsge0 25208	The norm of a scalar produ...
ncvsm1 25209	The norm of the opposite o...
ncvsdif 25210	The norm of the difference...
ncvspi 25211	The norm of a vector plus ...
ncvs1 25212	From any nonzero vector of...
cnrnvc 25213	The module of complex numb...
cnncvs 25214	The module of complex numb...
cnnm 25215	The norm of the normed sub...
ncvspds 25216	Value of the distance func...
cnindmet 25217	The metric induced on the ...
cnncvsaddassdemo 25218	Derive the associative law...
cnncvsmulassdemo 25219	Derive the associative law...
cnncvsabsnegdemo 25220	Derive the absolute value ...
iscph 25225	A subcomplex pre-Hilbert s...
cphphl 25226	A subcomplex pre-Hilbert s...
cphnlm 25227	A subcomplex pre-Hilbert s...
cphngp 25228	A subcomplex pre-Hilbert s...
cphlmod 25229	A subcomplex pre-Hilbert s...
cphlvec 25230	A subcomplex pre-Hilbert s...
cphnvc 25231	A subcomplex pre-Hilbert s...
cphsubrglem 25232	Lemma for ~ cphsubrg . (C...
cphreccllem 25233	Lemma for ~ cphreccl . (C...
cphsca 25234	A subcomplex pre-Hilbert s...
cphsubrg 25235	The scalar field of a subc...
cphreccl 25236	The scalar field of a subc...
cphdivcl 25237	The scalar field of a subc...
cphcjcl 25238	The scalar field of a subc...
cphsqrtcl 25239	The scalar field of a subc...
cphabscl 25240	The scalar field of a subc...
cphsqrtcl2 25241	The scalar field of a subc...
cphsqrtcl3 25242	If the scalar field of a s...
cphqss 25243	The scalar field of a subc...
cphclm 25244	A subcomplex pre-Hilbert s...
cphnmvs 25245	Norm of a scalar product. ...
cphipcl 25246	An inner product is a memb...
cphnmfval 25247	The value of the norm in a...
cphnm 25248	The square of the norm is ...
nmsq 25249	The square of the norm is ...
cphnmf 25250	The norm of a vector is a ...
cphnmcl 25251	The norm of a vector is a ...
reipcl 25252	An inner product of an ele...
ipge0 25253	The inner product in a sub...
cphipcj 25254	Conjugate of an inner prod...
cphipipcj 25255	An inner product times its...
cphorthcom 25256	Orthogonality (meaning inn...
cphip0l 25257	Inner product with a zero ...
cphip0r 25258	Inner product with a zero ...
cphipeq0 25259	The inner product of a vec...
cphdir 25260	Distributive law for inner...
cphdi 25261	Distributive law for inner...
cph2di 25262	Distributive law for inner...
cphsubdir 25263	Distributive law for inner...
cphsubdi 25264	Distributive law for inner...
cph2subdi 25265	Distributive law for inner...
cphass 25266	Associative law for inner ...
cphassr 25267	"Associative" law for seco...
cph2ass 25268	Move scalar multiplication...
cphassi 25269	Associative law for the fi...
cphassir 25270	"Associative" law for the ...
cphpyth 25271	The pythagorean theorem fo...
tcphex 25272	Lemma for ~ tcphbas and si...
tcphval 25273	Define a function to augme...
tcphbas 25274	The base set of a subcompl...
tchplusg 25275	The addition operation of ...
tcphsub 25276	The subtraction operation ...
tcphmulr 25277	The ring operation of a su...
tcphsca 25278	The scalar field of a subc...
tcphvsca 25279	The scalar multiplication ...
tcphip 25280	The inner product of a sub...
tcphtopn 25281	The topology of a subcompl...
tcphphl 25282	Augmentation of a subcompl...
tchnmfval 25283	The norm of a subcomplex p...
tcphnmval 25284	The norm of a subcomplex p...
cphtcphnm 25285	The norm of a norm-augment...
tcphds 25286	The distance of a pre-Hilb...
phclm 25287	A pre-Hilbert space whose ...
tcphcphlem3 25288	Lemma for ~ tcphcph : real...
ipcau2 25289	The Cauchy-Schwarz inequal...
tcphcphlem1 25290	Lemma for ~ tcphcph : the ...
tcphcphlem2 25291	Lemma for ~ tcphcph : homo...
tcphcph 25292	The standard definition of...
ipcau 25293	The Cauchy-Schwarz inequal...
nmparlem 25294	Lemma for ~ nmpar . (Cont...
nmpar 25295	A subcomplex pre-Hilbert s...
cphipval2 25296	Value of the inner product...
4cphipval2 25297	Four times the inner produ...
cphipval 25298	Value of the inner product...
ipcnlem2 25299	The inner product operatio...
ipcnlem1 25300	The inner product operatio...
ipcn 25301	The inner product operatio...
cnmpt1ip 25302	Continuity of inner produc...
cnmpt2ip 25303	Continuity of inner produc...
csscld 25304	A "closed subspace" in a s...
clsocv 25305	The orthogonal complement ...
cphsscph 25306	A subspace of a subcomplex...
lmmbr 25313	Express the binary relatio...
lmmbr2 25314	Express the binary relatio...
lmmbr3 25315	Express the binary relatio...
lmmcvg 25316	Convergence property of a ...
lmmbrf 25317	Express the binary relatio...
lmnn 25318	A condition that implies c...
cfilfval 25319	The set of Cauchy filters ...
iscfil 25320	The property of being a Ca...
iscfil2 25321	The property of being a Ca...
cfilfil 25322	A Cauchy filter is a filte...
cfili 25323	Property of a Cauchy filte...
cfil3i 25324	A Cauchy filter contains b...
cfilss 25325	A filter finer than a Cauc...
fgcfil 25326	The Cauchy filter conditio...
fmcfil 25327	The Cauchy filter conditio...
iscfil3 25328	A filter is Cauchy iff it ...
cfilfcls 25329	Similar to ultrafilters ( ...
caufval 25330	The set of Cauchy sequence...
iscau 25331	Express the property " ` F...
iscau2 25332	Express the property " ` F...
iscau3 25333	Express the Cauchy sequenc...
iscau4 25334	Express the property " ` F...
iscauf 25335	Express the property " ` F...
caun0 25336	A metric with a Cauchy seq...
caufpm 25337	Inclusion of a Cauchy sequ...
caucfil 25338	A Cauchy sequence predicat...
iscmet 25339	The property " ` D ` is a ...
cmetcvg 25340	The convergence of a Cauch...
cmetmet 25341	A complete metric space is...
cmetmeti 25342	A complete metric space is...
cmetcaulem 25343	Lemma for ~ cmetcau . (Co...
cmetcau 25344	The convergence of a Cauch...
iscmet3lem3 25345	Lemma for ~ iscmet3 . (Co...
iscmet3lem1 25346	Lemma for ~ iscmet3 . (Co...
iscmet3lem2 25347	Lemma for ~ iscmet3 . (Co...
iscmet3 25348	The property " ` D ` is a ...
iscmet2 25349	A metric ` D ` is complete...
cfilresi 25350	A Cauchy filter on a metri...
cfilres 25351	Cauchy filter on a metric ...
caussi 25352	Cauchy sequence on a metri...
causs 25353	Cauchy sequence on a metri...
equivcfil 25354	If the metric ` D ` is "st...
equivcau 25355	If the metric ` D ` is "st...
lmle 25356	If the distance from each ...
nglmle 25357	If the norm of each member...
lmclim 25358	Relate a limit on the metr...
lmclimf 25359	Relate a limit on the metr...
metelcls 25360	A point belongs to the clo...
metcld 25361	A subset of a metric space...
metcld2 25362	A subset of a metric space...
caubl 25363	Sufficient condition to en...
caublcls 25364	The convergent point of a ...
metcnp4 25365	Two ways to say a mapping ...
metcn4 25366	Two ways to say a mapping ...
iscmet3i 25367	Properties that determine ...
lmcau 25368	Every convergent sequence ...
flimcfil 25369	Every convergent filter in...
metsscmetcld 25370	A complete subspace of a m...
cmetss 25371	A subspace of a complete m...
equivcmet 25372	If two metrics are strongl...
relcmpcmet 25373	If ` D ` is a metric space...
cmpcmet 25374	A compact metric space is ...
cfilucfil3 25375	Given a metric ` D ` and a...
cfilucfil4 25376	Given a metric ` D ` and a...
cncmet 25377	The set of complex numbers...
recmet 25378	The real numbers are a com...
bcthlem1 25379	Lemma for ~ bcth . Substi...
bcthlem2 25380	Lemma for ~ bcth . The ba...
bcthlem3 25381	Lemma for ~ bcth . The li...
bcthlem4 25382	Lemma for ~ bcth . Given ...
bcthlem5 25383	Lemma for ~ bcth . The pr...
bcth 25384	Baire's Category Theorem. ...
bcth2 25385	Baire's Category Theorem, ...
bcth3 25386	Baire's Category Theorem, ...
isbn 25393	A Banach space is a normed...
bnsca 25394	The scalar field of a Bana...
bnnvc 25395	A Banach space is a normed...
bnnlm 25396	A Banach space is a normed...
bnngp 25397	A Banach space is a normed...
bnlmod 25398	A Banach space is a left m...
bncms 25399	A Banach space is a comple...
iscms 25400	A complete metric space is...
cmscmet 25401	The induced metric on a co...
bncmet 25402	The induced metric on Bana...
cmsms 25403	A complete metric space is...
cmspropd 25404	Property deduction for a c...
cmssmscld 25405	The restriction of a metri...
cmsss 25406	The restriction of a compl...
lssbn 25407	A subspace of a Banach spa...
cmetcusp1 25408	If the uniform set of a co...
cmetcusp 25409	The uniform space generate...
cncms 25410	The field of complex numbe...
cnflduss 25411	The uniform structure of t...
cnfldcusp 25412	The field of complex numbe...
resscdrg 25413	The real numbers are a sub...
cncdrg 25414	The only complete subfield...
srabn 25415	The subring algebra over a...
rlmbn 25416	The ring module over a com...
ishl 25417	The predicate "is a subcom...
hlbn 25418	Every subcomplex Hilbert s...
hlcph 25419	Every subcomplex Hilbert s...
hlphl 25420	Every subcomplex Hilbert s...
hlcms 25421	Every subcomplex Hilbert s...
hlprlem 25422	Lemma for ~ hlpr . (Contr...
hlress 25423	The scalar field of a subc...
hlpr 25424	The scalar field of a subc...
ishl2 25425	A Hilbert space is a compl...
cphssphl 25426	A Banach subspace of a sub...
cmslssbn 25427	A complete linear subspace...
cmscsscms 25428	A closed subspace of a com...
bncssbn 25429	A closed subspace of a Ban...
cssbn 25430	A complete subspace of a n...
csschl 25431	A complete subspace of a c...
cmslsschl 25432	A complete linear subspace...
chlcsschl 25433	A closed subspace of a sub...
retopn 25434	The topology of the real n...
recms 25435	The real numbers form a co...
reust 25436	The Uniform structure of t...
recusp 25437	The real numbers form a co...
rrxval 25442	Value of the generalized E...
rrxbase 25443	The base of the generalize...
rrxprds 25444	Expand the definition of t...
rrxip 25445	The inner product of the g...
rrxnm 25446	The norm of the generalize...
rrxcph 25447	Generalized Euclidean real...
rrxds 25448	The distance over generali...
rrxvsca 25449	The scalar product over ge...
rrxplusgvscavalb 25450	The result of the addition...
rrxsca 25451	The field of real numbers ...
rrx0 25452	The zero ("origin") in a g...
rrx0el 25453	The zero ("origin") in a g...
csbren 25454	Cauchy-Schwarz-Bunjakovsky...
trirn 25455	Triangle inequality in R^n...
rrxf 25456	Euclidean vectors as funct...
rrxfsupp 25457	Euclidean vectors are of f...
rrxsuppss 25458	Support of Euclidean vecto...
rrxmvallem 25459	Support of the function us...
rrxmval 25460	The value of the Euclidean...
rrxmfval 25461	The value of the Euclidean...
rrxmetlem 25462	Lemma for ~ rrxmet . (Con...
rrxmet 25463	Euclidean space is a metri...
rrxdstprj1 25464	The distance between two p...
rrxbasefi 25465	The base of the generalize...
rrxdsfi 25466	The distance over generali...
rrxmetfi 25467	Euclidean space is a metri...
rrxdsfival 25468	The value of the Euclidean...
ehlval 25469	Value of the Euclidean spa...
ehlbase 25470	The base of the Euclidean ...
ehl0base 25471	The base of the Euclidean ...
ehl0 25472	The Euclidean space of dim...
ehleudis 25473	The Euclidean distance fun...
ehleudisval 25474	The value of the Euclidean...
ehl1eudis 25475	The Euclidean distance fun...
ehl1eudisval 25476	The value of the Euclidean...
ehl2eudis 25477	The Euclidean distance fun...
ehl2eudisval 25478	The value of the Euclidean...
minveclem1 25479	Lemma for ~ minvec . The ...
minveclem4c 25480	Lemma for ~ minvec . The ...
minveclem2 25481	Lemma for ~ minvec . Any ...
minveclem3a 25482	Lemma for ~ minvec . ` D `...
minveclem3b 25483	Lemma for ~ minvec . The ...
minveclem3 25484	Lemma for ~ minvec . The ...
minveclem4a 25485	Lemma for ~ minvec . ` F `...
minveclem4b 25486	Lemma for ~ minvec . The ...
minveclem4 25487	Lemma for ~ minvec . The ...
minveclem5 25488	Lemma for ~ minvec . Disc...
minveclem6 25489	Lemma for ~ minvec . Any ...
minveclem7 25490	Lemma for ~ minvec . Sinc...
minvec 25491	Minimizing vector theorem,...
pjthlem1 25492	Lemma for ~ pjth . (Contr...
pjthlem2 25493	Lemma for ~ pjth . (Contr...
pjth 25494	Projection Theorem: Any H...
pjth2 25495	Projection Theorem with ab...
cldcss 25496	Corollary of the Projectio...
cldcss2 25497	Corollary of the Projectio...
hlhil 25498	Corollary of the Projectio...
addcncf 25499	The addition of two contin...
subcncf 25500	The subtraction of two con...
mulcncf 25501	The multiplication of two ...
mulcncfOLD 25502	Obsolete version of ~ mulc...
divcncf 25503	The quotient of two contin...
pmltpclem1 25504	Lemma for ~ pmltpc . (Con...
pmltpclem2 25505	Lemma for ~ pmltpc . (Con...
pmltpc 25506	Any function on the reals ...
ivthlem1 25507	Lemma for ~ ivth . The se...
ivthlem2 25508	Lemma for ~ ivth . Show t...
ivthlem3 25509	Lemma for ~ ivth , the int...
ivth 25510	The intermediate value the...
ivth2 25511	The intermediate value the...
ivthle 25512	The intermediate value the...
ivthle2 25513	The intermediate value the...
ivthicc 25514	The interval between any t...
evthicc 25515	Specialization of the Extr...
evthicc2 25516	Combine ~ ivthicc with ~ e...
cniccbdd 25517	A continuous function on a...
ovolfcl 25522	Closure for the interval e...
ovolfioo 25523	Unpack the interval coveri...
ovolficc 25524	Unpack the interval coveri...
ovolficcss 25525	Any (closed) interval cove...
ovolfsval 25526	The value of the interval ...
ovolfsf 25527	Closure for the interval l...
ovolsf 25528	Closure for the partial su...
ovolval 25529	The value of the outer mea...
elovolmlem 25530	Lemma for ~ elovolm and re...
elovolm 25531	Elementhood in the set ` M...
elovolmr 25532	Sufficient condition for e...
ovolmge0 25533	The set ` M ` is composed ...
ovolcl 25534	The volume of a set is an ...
ovollb 25535	The outer volume is a lowe...
ovolgelb 25536	The outer volume is the gr...
ovolge0 25537	The volume of a set is alw...
ovolf 25538	The domain and codomain of...
ovollecl 25539	If an outer volume is boun...
ovolsslem 25540	Lemma for ~ ovolss . (Con...
ovolss 25541	The volume of a set is mon...
ovolsscl 25542	If a set is contained in a...
ovolssnul 25543	A subset of a nullset is n...
ovollb2lem 25544	Lemma for ~ ovollb2 . (Co...
ovollb2 25545	It is often more convenien...
ovolctb 25546	The volume of a denumerabl...
ovolq 25547	The rational numbers have ...
ovolctb2 25548	The volume of a countable ...
ovol0 25549	The empty set has 0 outer ...
ovolfi 25550	A finite set has 0 outer L...
ovolsn 25551	A singleton has 0 outer Le...
ovolunlem1a 25552	Lemma for ~ ovolun . (Con...
ovolunlem1 25553	Lemma for ~ ovolun . (Con...
ovolunlem2 25554	Lemma for ~ ovolun . (Con...
ovolun 25555	The Lebesgue outer measure...
ovolunnul 25556	Adding a nullset does not ...
ovolfiniun 25557	The Lebesgue outer measure...
ovoliunlem1 25558	Lemma for ~ ovoliun . (Co...
ovoliunlem2 25559	Lemma for ~ ovoliun . (Co...
ovoliunlem3 25560	Lemma for ~ ovoliun . (Co...
ovoliun 25561	The Lebesgue outer measure...
ovoliun2 25562	The Lebesgue outer measure...
ovoliunnul 25563	A countable union of nulls...
shft2rab 25564	If ` B ` is a shift of ` A...
ovolshftlem1 25565	Lemma for ~ ovolshft . (C...
ovolshftlem2 25566	Lemma for ~ ovolshft . (C...
ovolshft 25567	The Lebesgue outer measure...
sca2rab 25568	If ` B ` is a scale of ` A...
ovolscalem1 25569	Lemma for ~ ovolsca . (Co...
ovolscalem2 25570	Lemma for ~ ovolshft . (C...
ovolsca 25571	The Lebesgue outer measure...
ovolicc1 25572	The measure of a closed in...
ovolicc2lem1 25573	Lemma for ~ ovolicc2 . (C...
ovolicc2lem2 25574	Lemma for ~ ovolicc2 . (C...
ovolicc2lem3 25575	Lemma for ~ ovolicc2 . (C...
ovolicc2lem4 25576	Lemma for ~ ovolicc2 . (C...
ovolicc2lem5 25577	Lemma for ~ ovolicc2 . (C...
ovolicc2 25578	The measure of a closed in...
ovolicc 25579	The measure of a closed in...
ovolicopnf 25580	The measure of a right-unb...
ovolre 25581	The measure of the real nu...
ismbl 25582	The predicate " ` A ` is L...
ismbl2 25583	From ~ ovolun , it suffice...
volres 25584	A self-referencing abbrevi...
volf 25585	The domain and codomain of...
mblvol 25586	The volume of a measurable...
mblss 25587	A measurable set is a subs...
mblsplit 25588	The defining property of m...
volss 25589	The Lebesgue measure is mo...
cmmbl 25590	The complement of a measur...
nulmbl 25591	A nullset is measurable. ...
nulmbl2 25592	A set of outer measure zer...
unmbl 25593	A union of measurable sets...
shftmbl 25594	A shift of a measurable se...
0mbl 25595	The empty set is measurabl...
rembl 25596	The set of all real number...
unidmvol 25597	The union of the Lebesgue ...
inmbl 25598	An intersection of measura...
difmbl 25599	A difference of measurable...
finiunmbl 25600	A finite union of measurab...
volun 25601	The Lebesgue measure funct...
volinun 25602	Addition of non-disjoint s...
volfiniun 25603	The volume of a disjoint f...
iundisj 25604	Rewrite a countable union ...
iundisj2 25605	A disjoint union is disjoi...
voliunlem1 25606	Lemma for ~ voliun . (Con...
voliunlem2 25607	Lemma for ~ voliun . (Con...
voliunlem3 25608	Lemma for ~ voliun . (Con...
iunmbl 25609	The measurable sets are cl...
voliun 25610	The Lebesgue measure funct...
volsuplem 25611	Lemma for ~ volsup . (Con...
volsup 25612	The volume of the limit of...
iunmbl2 25613	The measurable sets are cl...
ioombl1lem1 25614	Lemma for ~ ioombl1 . (Co...
ioombl1lem2 25615	Lemma for ~ ioombl1 . (Co...
ioombl1lem3 25616	Lemma for ~ ioombl1 . (Co...
ioombl1lem4 25617	Lemma for ~ ioombl1 . (Co...
ioombl1 25618	An open right-unbounded in...
icombl1 25619	A closed unbounded-above i...
icombl 25620	A closed-below, open-above...
ioombl 25621	An open real interval is m...
iccmbl 25622	A closed real interval is ...
iccvolcl 25623	A closed real interval has...
ovolioo 25624	The measure of an open int...
volioo 25625	The measure of an open int...
ioovolcl 25626	An open real interval has ...
ovolfs2 25627	Alternative expression for...
ioorcl2 25628	An open interval with fini...
ioorf 25629	Define a function from ope...
ioorval 25630	Define a function from ope...
ioorinv2 25631	The function ` F ` is an "...
ioorinv 25632	The function ` F ` is an "...
ioorcl 25633	The function ` F ` does no...
uniiccdif 25634	A union of closed interval...
uniioovol 25635	A disjoint union of open i...
uniiccvol 25636	An almost-disjoint union o...
uniioombllem1 25637	Lemma for ~ uniioombl . (...
uniioombllem2a 25638	Lemma for ~ uniioombl . (...
uniioombllem2 25639	Lemma for ~ uniioombl . (...
uniioombllem3a 25640	Lemma for ~ uniioombl . (...
uniioombllem3 25641	Lemma for ~ uniioombl . (...
uniioombllem4 25642	Lemma for ~ uniioombl . (...
uniioombllem5 25643	Lemma for ~ uniioombl . (...
uniioombllem6 25644	Lemma for ~ uniioombl . (...
uniioombl 25645	A disjoint union of open i...
uniiccmbl 25646	An almost-disjoint union o...
dyadf 25647	The function ` F ` returns...
dyadval 25648	Value of the dyadic ration...
dyadovol 25649	Volume of a dyadic rationa...
dyadss 25650	Two closed dyadic rational...
dyaddisjlem 25651	Lemma for ~ dyaddisj . (C...
dyaddisj 25652	Two closed dyadic rational...
dyadmaxlem 25653	Lemma for ~ dyadmax . (Co...
dyadmax 25654	Any nonempty set of dyadic...
dyadmbllem 25655	Lemma for ~ dyadmbl . (Co...
dyadmbl 25656	Any union of dyadic ration...
opnmbllem 25657	Lemma for ~ opnmbl . (Con...
opnmbl 25658	All open sets are measurab...
opnmblALT 25659	All open sets are measurab...
subopnmbl 25660	Sets which are open in a m...
volsup2 25661	The volume of ` A ` is the...
volcn 25662	The function formed by res...
volivth 25663	The Intermediate Value The...
vitalilem1 25664	Lemma for ~ vitali . (Con...
vitalilem2 25665	Lemma for ~ vitali . (Con...
vitalilem3 25666	Lemma for ~ vitali . (Con...
vitalilem4 25667	Lemma for ~ vitali . (Con...
vitalilem5 25668	Lemma for ~ vitali . (Con...
vitali 25669	If the reals can be well-o...
ismbf1 25680	The predicate " ` F ` is a...
mbff 25681	A measurable function is a...
mbfdm 25682	The domain of a measurable...
mbfconstlem 25683	Lemma for ~ mbfconst and r...
ismbf 25684	The predicate " ` F ` is a...
ismbfcn 25685	A complex function is meas...
mbfima 25686	Definitional property of a...
mbfimaicc 25687	The preimage of any closed...
mbfimasn 25688	The preimage of a point un...
mbfconst 25689	A constant function is mea...
mbf0 25690	The empty function is meas...
mbfid 25691	The identity function is m...
mbfmptcl 25692	Lemma for the ` MblFn ` pr...
mbfdm2 25693	The domain of a measurable...
ismbfcn2 25694	A complex function is meas...
ismbfd 25695	Deduction to prove measura...
ismbf2d 25696	Deduction to prove measura...
mbfeqalem1 25697	Lemma for ~ mbfeqalem2 . ...
mbfeqalem2 25698	Lemma for ~ mbfeqa . (Con...
mbfeqa 25699	If two functions are equal...
mbfres 25700	The restriction of a measu...
mbfres2 25701	Measurability of a piecewi...
mbfss 25702	Change the domain of a mea...
mbfmulc2lem 25703	Multiplication by a consta...
mbfmulc2re 25704	Multiplication by a consta...
mbfmax 25705	The maximum of two functio...
mbfneg 25706	The negative of a measurab...
mbfpos 25707	The positive part of a mea...
mbfposr 25708	Converse to ~ mbfpos . (C...
mbfposb 25709	A function is measurable i...
ismbf3d 25710	Simplified form of ~ ismbf...
mbfimaopnlem 25711	Lemma for ~ mbfimaopn . (...
mbfimaopn 25712	The preimage of any open s...
mbfimaopn2 25713	The preimage of any set op...
cncombf 25714	The composition of a conti...
cnmbf 25715	A continuous function is m...
mbfaddlem 25716	The sum of two measurable ...
mbfadd 25717	The sum of two measurable ...
mbfsub 25718	The difference of two meas...
mbfmulc2 25719	A complex constant times a...
mbfsup 25720	The supremum of a sequence...
mbfinf 25721	The infimum of a sequence ...
mbflimsup 25722	The limit supremum of a se...
mbflimlem 25723	The pointwise limit of a s...
mbflim 25724	The pointwise limit of a s...
0pval 25727	The zero function evaluate...
0plef 25728	Two ways to say that the f...
0pledm 25729	Adjust the domain of the l...
isi1f 25730	The predicate " ` F ` is a...
i1fmbf 25731	Simple functions are measu...
i1ff 25732	A simple function is a fun...
i1frn 25733	A simple function has fini...
i1fima 25734	Any preimage of a simple f...
i1fima2 25735	Any preimage of a simple f...
i1fima2sn 25736	Preimage of a singleton. ...
i1fd 25737	A simplified set of assump...
i1f0rn 25738	Any simple function takes ...
itg1val 25739	The value of the integral ...
itg1val2 25740	The value of the integral ...
itg1cl 25741	Closure of the integral on...
itg1ge0 25742	Closure of the integral on...
i1f0 25743	The zero function is simpl...
itg10 25744	The zero function has zero...
i1f1lem 25745	Lemma for ~ i1f1 and ~ itg...
i1f1 25746	Base case simple functions...
itg11 25747	The integral of an indicat...
itg1addlem1 25748	Decompose a preimage, whic...
i1faddlem 25749	Decompose the preimage of ...
i1fmullem 25750	Decompose the preimage of ...
i1fadd 25751	The sum of two simple func...
i1fmul 25752	The pointwise product of t...
itg1addlem2 25753	Lemma for ~ itg1add . The...
itg1addlem3 25754	Lemma for ~ itg1add . (Co...
itg1addlem4 25755	Lemma for ~ itg1add . (Co...
itg1addlem4OLD 25756	Obsolete version of ~ itg1...
itg1addlem5 25757	Lemma for ~ itg1add . (Co...
itg1add 25758	The integral of a sum of s...
i1fmulclem 25759	Decompose the preimage of ...
i1fmulc 25760	A nonnegative constant tim...
itg1mulc 25761	The integral of a constant...
i1fres 25762	The "restriction" of a sim...
i1fpos 25763	The positive part of a sim...
i1fposd 25764	Deduction form of ~ i1fpos...
i1fsub 25765	The difference of two simp...
itg1sub 25766	The integral of a differen...
itg10a 25767	The integral of a simple f...
itg1ge0a 25768	The integral of an almost ...
itg1lea 25769	Approximate version of ~ i...
itg1le 25770	If one simple function dom...
itg1climres 25771	Restricting the simple fun...
mbfi1fseqlem1 25772	Lemma for ~ mbfi1fseq . (...
mbfi1fseqlem2 25773	Lemma for ~ mbfi1fseq . (...
mbfi1fseqlem3 25774	Lemma for ~ mbfi1fseq . (...
mbfi1fseqlem4 25775	Lemma for ~ mbfi1fseq . T...
mbfi1fseqlem5 25776	Lemma for ~ mbfi1fseq . V...
mbfi1fseqlem6 25777	Lemma for ~ mbfi1fseq . V...
mbfi1fseq 25778	A characterization of meas...
mbfi1flimlem 25779	Lemma for ~ mbfi1flim . (...
mbfi1flim 25780	Any real measurable functi...
mbfmullem2 25781	Lemma for ~ mbfmul . (Con...
mbfmullem 25782	Lemma for ~ mbfmul . (Con...
mbfmul 25783	The product of two measura...
itg2lcl 25784	The set of lower sums is a...
itg2val 25785	Value of the integral on n...
itg2l 25786	Elementhood in the set ` L...
itg2lr 25787	Sufficient condition for e...
xrge0f 25788	A real function is a nonne...
itg2cl 25789	The integral of a nonnegat...
itg2ub 25790	The integral of a nonnegat...
itg2leub 25791	Any upper bound on the int...
itg2ge0 25792	The integral of a nonnegat...
itg2itg1 25793	The integral of a nonnegat...
itg20 25794	The integral of the zero f...
itg2lecl 25795	If an ` S.2 ` integral is ...
itg2le 25796	If one function dominates ...
itg2const 25797	Integral of a constant fun...
itg2const2 25798	When the base set of a con...
itg2seq 25799	Definitional property of t...
itg2uba 25800	Approximate version of ~ i...
itg2lea 25801	Approximate version of ~ i...
itg2eqa 25802	Approximate equality of in...
itg2mulclem 25803	Lemma for ~ itg2mulc . (C...
itg2mulc 25804	The integral of a nonnegat...
itg2splitlem 25805	Lemma for ~ itg2split . (...
itg2split 25806	The ` S.2 ` integral split...
itg2monolem1 25807	Lemma for ~ itg2mono . We...
itg2monolem2 25808	Lemma for ~ itg2mono . (C...
itg2monolem3 25809	Lemma for ~ itg2mono . (C...
itg2mono 25810	The Monotone Convergence T...
itg2i1fseqle 25811	Subject to the conditions ...
itg2i1fseq 25812	Subject to the conditions ...
itg2i1fseq2 25813	In an extension to the res...
itg2i1fseq3 25814	Special case of ~ itg2i1fs...
itg2addlem 25815	Lemma for ~ itg2add . (Co...
itg2add 25816	The ` S.2 ` integral is li...
itg2gt0 25817	If the function ` F ` is s...
itg2cnlem1 25818	Lemma for ~ itgcn . (Cont...
itg2cnlem2 25819	Lemma for ~ itgcn . (Cont...
itg2cn 25820	A sort of absolute continu...
ibllem 25821	Conditioned equality theor...
isibl 25822	The predicate " ` F ` is i...
isibl2 25823	The predicate " ` F ` is i...
iblmbf 25824	An integrable function is ...
iblitg 25825	If a function is integrabl...
dfitg 25826	Evaluate the class substit...
itgex 25827	An integral is a set. (Co...
itgeq1f 25828	Equality theorem for an in...
itgeq1fOLD 25829	Obsolete version of ~ itge...
itgeq1 25830	Equality theorem for an in...
nfitg1 25831	Bound-variable hypothesis ...
nfitg 25832	Bound-variable hypothesis ...
cbvitg 25833	Change bound variable in a...
cbvitgv 25834	Change bound variable in a...
itgeq2 25835	Equality theorem for an in...
itgresr 25836	The domain of an integral ...
itg0 25837	The integral of anything o...
itgz 25838	The integral of zero on an...
itgeq2dv 25839	Equality theorem for an in...
itgmpt 25840	Change bound variable in a...
itgcl 25841	The integral of an integra...
itgvallem 25842	Substitution lemma. (Cont...
itgvallem3 25843	Lemma for ~ itgposval and ...
ibl0 25844	The zero function is integ...
iblcnlem1 25845	Lemma for ~ iblcnlem . (C...
iblcnlem 25846	Expand out the universal q...
itgcnlem 25847	Expand out the sum in ~ df...
iblrelem 25848	Integrability of a real fu...
iblposlem 25849	Lemma for ~ iblpos . (Con...
iblpos 25850	Integrability of a nonnega...
iblre 25851	Integrability of a real fu...
itgrevallem1 25852	Lemma for ~ itgposval and ...
itgposval 25853	The integral of a nonnegat...
itgreval 25854	Decompose the integral of ...
itgrecl 25855	Real closure of an integra...
iblcn 25856	Integrability of a complex...
itgcnval 25857	Decompose the integral of ...
itgre 25858	Real part of an integral. ...
itgim 25859	Imaginary part of an integ...
iblneg 25860	The negative of an integra...
itgneg 25861	Negation of an integral. ...
iblss 25862	A subset of an integrable ...
iblss2 25863	Change the domain of an in...
itgitg2 25864	Transfer an integral using...
i1fibl 25865	A simple function is integ...
itgitg1 25866	Transfer an integral using...
itgle 25867	Monotonicity of an integra...
itgge0 25868	The integral of a positive...
itgss 25869	Expand the set of an integ...
itgss2 25870	Expand the set of an integ...
itgeqa 25871	Approximate equality of in...
itgss3 25872	Expand the set of an integ...
itgioo 25873	Equality of integrals on o...
itgless 25874	Expand the integral of a n...
iblconst 25875	A constant function is int...
itgconst 25876	Integral of a constant fun...
ibladdlem 25877	Lemma for ~ ibladd . (Con...
ibladd 25878	Add two integrals over the...
iblsub 25879	Subtract two integrals ove...
itgaddlem1 25880	Lemma for ~ itgadd . (Con...
itgaddlem2 25881	Lemma for ~ itgadd . (Con...
itgadd 25882	Add two integrals over the...
itgsub 25883	Subtract two integrals ove...
itgfsum 25884	Take a finite sum of integ...
iblabslem 25885	Lemma for ~ iblabs . (Con...
iblabs 25886	The absolute value of an i...
iblabsr 25887	A measurable function is i...
iblmulc2 25888	Multiply an integral by a ...
itgmulc2lem1 25889	Lemma for ~ itgmulc2 : pos...
itgmulc2lem2 25890	Lemma for ~ itgmulc2 : rea...
itgmulc2 25891	Multiply an integral by a ...
itgabs 25892	The triangle inequality fo...
itgsplit 25893	The ` S. ` integral splits...
itgspliticc 25894	The ` S. ` integral splits...
itgsplitioo 25895	The ` S. ` integral splits...
bddmulibl 25896	A bounded function times a...
bddibl 25897	A bounded function is inte...
cniccibl 25898	A continuous function on a...
bddiblnc 25899	Choice-free proof of ~ bdd...
cnicciblnc 25900	Choice-free proof of ~ cni...
itggt0 25901	The integral of a strictly...
itgcn 25902	Transfer ~ itg2cn to the f...
ditgeq1 25905	Equality theorem for the d...
ditgeq2 25906	Equality theorem for the d...
ditgeq3 25907	Equality theorem for the d...
ditgeq3dv 25908	Equality theorem for the d...
ditgex 25909	A directed integral is a s...
ditg0 25910	Value of the directed inte...
cbvditg 25911	Change bound variable in a...
cbvditgv 25912	Change bound variable in a...
ditgpos 25913	Value of the directed inte...
ditgneg 25914	Value of the directed inte...
ditgcl 25915	Closure of a directed inte...
ditgswap 25916	Reverse a directed integra...
ditgsplitlem 25917	Lemma for ~ ditgsplit . (...
ditgsplit 25918	This theorem is the raison...
reldv 25927	The derivative function is...
limcvallem 25928	Lemma for ~ ellimc . (Con...
limcfval 25929	Value and set bounds on th...
ellimc 25930	Value of the limit predica...
limcrcl 25931	Reverse closure for the li...
limccl 25932	Closure of the limit opera...
limcdif 25933	It suffices to consider fu...
ellimc2 25934	Write the definition of a ...
limcnlp 25935	If ` B ` is not a limit po...
ellimc3 25936	Write the epsilon-delta de...
limcflflem 25937	Lemma for ~ limcflf . (Co...
limcflf 25938	The limit operator can be ...
limcmo 25939	If ` B ` is a limit point ...
limcmpt 25940	Express the limit operator...
limcmpt2 25941	Express the limit operator...
limcresi 25942	Any limit of ` F ` is also...
limcres 25943	If ` B ` is an interior po...
cnplimc 25944	A function is continuous a...
cnlimc 25945	` F ` is a continuous func...
cnlimci 25946	If ` F ` is a continuous f...
cnmptlimc 25947	If ` F ` is a continuous f...
limccnp 25948	If the limit of ` F ` at `...
limccnp2 25949	The image of a convergent ...
limcco 25950	Composition of two limits....
limciun 25951	A point is a limit of ` F ...
limcun 25952	A point is a limit of ` F ...
dvlem 25953	Closure for a difference q...
dvfval 25954	Value and set bounds on th...
eldv 25955	The differentiable predica...
dvcl 25956	The derivative function ta...
dvbssntr 25957	The set of differentiable ...
dvbss 25958	The set of differentiable ...
dvbsss 25959	The set of differentiable ...
perfdvf 25960	The derivative is a functi...
recnprss 25961	Both ` RR ` and ` CC ` are...
recnperf 25962	Both ` RR ` and ` CC ` are...
dvfg 25963	Explicitly write out the f...
dvf 25964	The derivative is a functi...
dvfcn 25965	The derivative is a functi...
dvreslem 25966	Lemma for ~ dvres . (Cont...
dvres2lem 25967	Lemma for ~ dvres2 . (Con...
dvres 25968	Restriction of a derivativ...
dvres2 25969	Restriction of the base se...
dvres3 25970	Restriction of a complex d...
dvres3a 25971	Restriction of a complex d...
dvidlem 25972	Lemma for ~ dvid and ~ dvc...
dvmptresicc 25973	Derivative of a function r...
dvconst 25974	Derivative of a constant f...
dvid 25975	Derivative of the identity...
dvcnp 25976	The difference quotient is...
dvcnp2 25977	A function is continuous a...
dvcnp2OLD 25978	Obsolete version of ~ dvcn...
dvcn 25979	A differentiable function ...
dvnfval 25980	Value of the iterated deri...
dvnff 25981	The iterated derivative is...
dvn0 25982	Zero times iterated deriva...
dvnp1 25983	Successor iterated derivat...
dvn1 25984	One times iterated derivat...
dvnf 25985	The N-times derivative is ...
dvnbss 25986	The set of N-times differe...
dvnadd 25987	The ` N ` -th derivative o...
dvn2bss 25988	An N-times differentiable ...
dvnres 25989	Multiple derivative versio...
cpnfval 25990	Condition for n-times cont...
fncpn 25991	The ` C^n ` object is a fu...
elcpn 25992	Condition for n-times cont...
cpnord 25993	` C^n ` conditions are ord...
cpncn 25994	A ` C^n ` function is cont...
cpnres 25995	The restriction of a ` C^n...
dvaddbr 25996	The sum rule for derivativ...
dvmulbr 25997	The product rule for deriv...
dvmulbrOLD 25998	Obsolete version of ~ dvmu...
dvadd 25999	The sum rule for derivativ...
dvmul 26000	The product rule for deriv...
dvaddf 26001	The sum rule for everywher...
dvmulf 26002	The product rule for every...
dvcmul 26003	The product rule when one ...
dvcmulf 26004	The product rule when one ...
dvcobr 26005	The chain rule for derivat...
dvcobrOLD 26006	Obsolete version of ~ dvco...
dvco 26007	The chain rule for derivat...
dvcof 26008	The chain rule for everywh...
dvcjbr 26009	The derivative of the conj...
dvcj 26010	The derivative of the conj...
dvfre 26011	The derivative of a real f...
dvnfre 26012	The ` N ` -th derivative o...
dvexp 26013	Derivative of a power func...
dvexp2 26014	Derivative of an exponenti...
dvrec 26015	Derivative of the reciproc...
dvmptres3 26016	Function-builder for deriv...
dvmptid 26017	Function-builder for deriv...
dvmptc 26018	Function-builder for deriv...
dvmptcl 26019	Closure lemma for ~ dvmptc...
dvmptadd 26020	Function-builder for deriv...
dvmptmul 26021	Function-builder for deriv...
dvmptres2 26022	Function-builder for deriv...
dvmptres 26023	Function-builder for deriv...
dvmptcmul 26024	Function-builder for deriv...
dvmptdivc 26025	Function-builder for deriv...
dvmptneg 26026	Function-builder for deriv...
dvmptsub 26027	Function-builder for deriv...
dvmptcj 26028	Function-builder for deriv...
dvmptre 26029	Function-builder for deriv...
dvmptim 26030	Function-builder for deriv...
dvmptntr 26031	Function-builder for deriv...
dvmptco 26032	Function-builder for deriv...
dvrecg 26033	Derivative of the reciproc...
dvmptdiv 26034	Function-builder for deriv...
dvmptfsum 26035	Function-builder for deriv...
dvcnvlem 26036	Lemma for ~ dvcnvre . (Co...
dvcnv 26037	A weak version of ~ dvcnvr...
dvexp3 26038	Derivative of an exponenti...
dveflem 26039	Derivative of the exponent...
dvef 26040	Derivative of the exponent...
dvsincos 26041	Derivative of the sine and...
dvsin 26042	Derivative of the sine fun...
dvcos 26043	Derivative of the cosine f...
dvferm1lem 26044	Lemma for ~ dvferm . (Con...
dvferm1 26045	One-sided version of ~ dvf...
dvferm2lem 26046	Lemma for ~ dvferm . (Con...
dvferm2 26047	One-sided version of ~ dvf...
dvferm 26048	Fermat's theorem on statio...
rollelem 26049	Lemma for ~ rolle . (Cont...
rolle 26050	Rolle's theorem. If ` F `...
cmvth 26051	Cauchy's Mean Value Theore...
cmvthOLD 26052	Obsolete version of ~ cmvt...
mvth 26053	The Mean Value Theorem. I...
dvlip 26054	A function with derivative...
dvlipcn 26055	A complex function with de...
dvlip2 26056	Combine the results of ~ d...
c1liplem1 26057	Lemma for ~ c1lip1 . (Con...
c1lip1 26058	C^1 functions are Lipschit...
c1lip2 26059	C^1 functions are Lipschit...
c1lip3 26060	C^1 functions are Lipschit...
dveq0 26061	If a continuous function h...
dv11cn 26062	Two functions defined on a...
dvgt0lem1 26063	Lemma for ~ dvgt0 and ~ dv...
dvgt0lem2 26064	Lemma for ~ dvgt0 and ~ dv...
dvgt0 26065	A function on a closed int...
dvlt0 26066	A function on a closed int...
dvge0 26067	A function on a closed int...
dvle 26068	If ` A ( x ) , C ( x ) ` a...
dvivthlem1 26069	Lemma for ~ dvivth . (Con...
dvivthlem2 26070	Lemma for ~ dvivth . (Con...
dvivth 26071	Darboux' theorem, or the i...
dvne0 26072	A function on a closed int...
dvne0f1 26073	A function on a closed int...
lhop1lem 26074	Lemma for ~ lhop1 . (Cont...
lhop1 26075	L'Hôpital's Rule for...
lhop2 26076	L'Hôpital's Rule for...
lhop 26077	L'Hôpital's Rule. I...
dvcnvrelem1 26078	Lemma for ~ dvcnvre . (Co...
dvcnvrelem2 26079	Lemma for ~ dvcnvre . (Co...
dvcnvre 26080	The derivative rule for in...
dvcvx 26081	A real function with stric...
dvfsumle 26082	Compare a finite sum to an...
dvfsumleOLD 26083	Obsolete version of ~ dvfs...
dvfsumge 26084	Compare a finite sum to an...
dvfsumabs 26085	Compare a finite sum to an...
dvmptrecl 26086	Real closure of a derivati...
dvfsumrlimf 26087	Lemma for ~ dvfsumrlim . ...
dvfsumlem1 26088	Lemma for ~ dvfsumrlim . ...
dvfsumlem2 26089	Lemma for ~ dvfsumrlim . ...
dvfsumlem2OLD 26090	Obsolete version of ~ dvfs...
dvfsumlem3 26091	Lemma for ~ dvfsumrlim . ...
dvfsumlem4 26092	Lemma for ~ dvfsumrlim . ...
dvfsumrlimge0 26093	Lemma for ~ dvfsumrlim . ...
dvfsumrlim 26094	Compare a finite sum to an...
dvfsumrlim2 26095	Compare a finite sum to an...
dvfsumrlim3 26096	Conjoin the statements of ...
dvfsum2 26097	The reverse of ~ dvfsumrli...
ftc1lem1 26098	Lemma for ~ ftc1a and ~ ft...
ftc1lem2 26099	Lemma for ~ ftc1 . (Contr...
ftc1a 26100	The Fundamental Theorem of...
ftc1lem3 26101	Lemma for ~ ftc1 . (Contr...
ftc1lem4 26102	Lemma for ~ ftc1 . (Contr...
ftc1lem5 26103	Lemma for ~ ftc1 . (Contr...
ftc1lem6 26104	Lemma for ~ ftc1 . (Contr...
ftc1 26105	The Fundamental Theorem of...
ftc1cn 26106	Strengthen the assumptions...
ftc2 26107	The Fundamental Theorem of...
ftc2ditglem 26108	Lemma for ~ ftc2ditg . (C...
ftc2ditg 26109	Directed integral analogue...
itgparts 26110	Integration by parts. If ...
itgsubstlem 26111	Lemma for ~ itgsubst . (C...
itgsubst 26112	Integration by ` u ` -subs...
itgpowd 26113	The integral of a monomial...
reldmmdeg 26118	Multivariate degree is a b...
tdeglem1 26119	Functionality of the total...
tdeglem3 26120	Additivity of the total de...
tdeglem4 26121	There is only one multi-in...
tdeglem2 26122	Simplification of total de...
mdegfval 26123	Value of the multivariate ...
mdegval 26124	Value of the multivariate ...
mdegleb 26125	Property of being of limit...
mdeglt 26126	If there is an upper limit...
mdegldg 26127	A nonzero polynomial has s...
mdegxrcl 26128	Closure of polynomial degr...
mdegxrf 26129	Functionality of polynomia...
mdegcl 26130	Sharp closure for multivar...
mdeg0 26131	Degree of the zero polynom...
mdegnn0cl 26132	Degree of a nonzero polyno...
degltlem1 26133	Theorem on arithmetic of e...
degltp1le 26134	Theorem on arithmetic of e...
mdegaddle 26135	The degree of a sum is at ...
mdegvscale 26136	The degree of a scalar mul...
mdegvsca 26137	The degree of a scalar mul...
mdegle0 26138	A polynomial has nonpositi...
mdegmullem 26139	Lemma for ~ mdegmulle2 . ...
mdegmulle2 26140	The multivariate degree of...
deg1fval 26141	Relate univariate polynomi...
deg1xrf 26142	Functionality of univariat...
deg1xrcl 26143	Closure of univariate poly...
deg1cl 26144	Sharp closure of univariat...
mdegpropd 26145	Property deduction for pol...
deg1fvi 26146	Univariate polynomial degr...
deg1propd 26147	Property deduction for pol...
deg1z 26148	Degree of the zero univari...
deg1nn0cl 26149	Degree of a nonzero univar...
deg1n0ima 26150	Degree image of a set of p...
deg1nn0clb 26151	A polynomial is nonzero if...
deg1lt0 26152	A polynomial is zero iff i...
deg1ldg 26153	A nonzero univariate polyn...
deg1ldgn 26154	An index at which a polyno...
deg1ldgdomn 26155	A nonzero univariate polyn...
deg1leb 26156	Property of being of limit...
deg1val 26157	Value of the univariate de...
deg1lt 26158	If the degree of a univari...
deg1ge 26159	Conversely, a nonzero coef...
coe1mul3 26160	The coefficient vector of ...
coe1mul4 26161	Value of the "leading" coe...
deg1addle 26162	The degree of a sum is at ...
deg1addle2 26163	If both factors have degre...
deg1add 26164	Exact degree of a sum of t...
deg1vscale 26165	The degree of a scalar tim...
deg1vsca 26166	The degree of a scalar tim...
deg1invg 26167	The degree of the negated ...
deg1suble 26168	The degree of a difference...
deg1sub 26169	Exact degree of a differen...
deg1mulle2 26170	Produce a bound on the pro...
deg1sublt 26171	Subtraction of two polynom...
deg1le0 26172	A polynomial has nonpositi...
deg1sclle 26173	A scalar polynomial has no...
deg1scl 26174	A nonzero scalar polynomia...
deg1mul2 26175	Degree of multiplication o...
deg1mul 26176	Degree of multiplication o...
deg1mul3 26177	Degree of multiplication o...
deg1mul3le 26178	Degree of multiplication o...
deg1tmle 26179	Limiting degree of a polyn...
deg1tm 26180	Exact degree of a polynomi...
deg1pwle 26181	Limiting degree of a varia...
deg1pw 26182	Exact degree of a variable...
ply1nz 26183	Univariate polynomials ove...
ply1nzb 26184	Univariate polynomials are...
ply1domn 26185	Corollary of ~ deg1mul2 : ...
ply1idom 26186	The ring of univariate pol...
ply1divmo 26197	Uniqueness of a quotient i...
ply1divex 26198	Lemma for ~ ply1divalg : e...
ply1divalg 26199	The division algorithm for...
ply1divalg2 26200	Reverse the order of multi...
uc1pval 26201	Value of the set of unitic...
isuc1p 26202	Being a unitic polynomial....
mon1pval 26203	Value of the set of monic ...
ismon1p 26204	Being a monic polynomial. ...
uc1pcl 26205	Unitic polynomials are pol...
mon1pcl 26206	Monic polynomials are poly...
uc1pn0 26207	Unitic polynomials are not...
mon1pn0 26208	Monic polynomials are not ...
uc1pdeg 26209	Unitic polynomials have no...
uc1pldg 26210	Unitic polynomials have un...
mon1pldg 26211	Unitic polynomials have on...
mon1puc1p 26212	Monic polynomials are unit...
uc1pmon1p 26213	Make a unitic polynomial m...
deg1submon1p 26214	The difference of two moni...
mon1pid 26215	Monicity and degree of the...
q1pval 26216	Value of the univariate po...
q1peqb 26217	Characterizing property of...
q1pcl 26218	Closure of the quotient by...
r1pval 26219	Value of the polynomial re...
r1pcl 26220	Closure of remainder follo...
r1pdeglt 26221	The remainder has a degree...
r1pid 26222	Express the original polyn...
r1pid2 26223	Identity law for polynomia...
dvdsq1p 26224	Divisibility in a polynomi...
dvdsr1p 26225	Divisibility in a polynomi...
ply1remlem 26226	A term of the form ` x - N...
ply1rem 26227	The polynomial remainder t...
facth1 26228	The factor theorem and its...
fta1glem1 26229	Lemma for ~ fta1g . (Cont...
fta1glem2 26230	Lemma for ~ fta1g . (Cont...
fta1g 26231	The one-sided fundamental ...
fta1blem 26232	Lemma for ~ fta1b . (Cont...
fta1b 26233	The assumption that ` R ` ...
idomrootle 26234	No element of an integral ...
drnguc1p 26235	Over a division ring, all ...
ig1peu 26236	There is a unique monic po...
ig1pval 26237	Substitutions for the poly...
ig1pval2 26238	Generator of the zero idea...
ig1pval3 26239	Characterizing properties ...
ig1pcl 26240	The monic generator of an ...
ig1pdvds 26241	The monic generator of an ...
ig1prsp 26242	Any ideal of polynomials o...
ply1lpir 26243	The ring of polynomials ov...
ply1pid 26244	The polynomials over a fie...
plyco0 26253	Two ways to say that a fun...
plyval 26254	Value of the polynomial se...
plybss 26255	Reverse closure of the par...
elply 26256	Definition of a polynomial...
elply2 26257	The coefficient function c...
plyun0 26258	The set of polynomials is ...
plyf 26259	A polynomial is a function...
plyss 26260	The polynomial set functio...
plyssc 26261	Every polynomial ring is c...
elplyr 26262	Sufficient condition for e...
elplyd 26263	Sufficient condition for e...
ply1termlem 26264	Lemma for ~ ply1term . (C...
ply1term 26265	A one-term polynomial. (C...
plypow 26266	A power is a polynomial. ...
plyconst 26267	A constant function is a p...
ne0p 26268	A test to show that a poly...
ply0 26269	The zero function is a pol...
plyid 26270	The identity function is a...
plyeq0lem 26271	Lemma for ~ plyeq0 . If `...
plyeq0 26272	If a polynomial is zero at...
plypf1 26273	Write the set of complex p...
plyaddlem1 26274	Derive the coefficient fun...
plymullem1 26275	Derive the coefficient fun...
plyaddlem 26276	Lemma for ~ plyadd . (Con...
plymullem 26277	Lemma for ~ plymul . (Con...
plyadd 26278	The sum of two polynomials...
plymul 26279	The product of two polynom...
plysub 26280	The difference of two poly...
plyaddcl 26281	The sum of two polynomials...
plymulcl 26282	The product of two polynom...
plysubcl 26283	The difference of two poly...
coeval 26284	Value of the coefficient f...
coeeulem 26285	Lemma for ~ coeeu . (Cont...
coeeu 26286	Uniqueness of the coeffici...
coelem 26287	Lemma for properties of th...
coeeq 26288	If ` A ` satisfies the pro...
dgrval 26289	Value of the degree functi...
dgrlem 26290	Lemma for ~ dgrcl and simi...
coef 26291	The domain and codomain of...
coef2 26292	The domain and codomain of...
coef3 26293	The domain and codomain of...
dgrcl 26294	The degree of any polynomi...
dgrub 26295	If the ` M ` -th coefficie...
dgrub2 26296	All the coefficients above...
dgrlb 26297	If all the coefficients ab...
coeidlem 26298	Lemma for ~ coeid . (Cont...
coeid 26299	Reconstruct a polynomial a...
coeid2 26300	Reconstruct a polynomial a...
coeid3 26301	Reconstruct a polynomial a...
plyco 26302	The composition of two pol...
coeeq2 26303	Compute the coefficient fu...
dgrle 26304	Given an explicit expressi...
dgreq 26305	If the highest term in a p...
0dgr 26306	A constant function has de...
0dgrb 26307	A function has degree zero...
dgrnznn 26308	A nonzero polynomial with ...
coefv0 26309	The result of evaluating a...
coeaddlem 26310	Lemma for ~ coeadd and ~ d...
coemullem 26311	Lemma for ~ coemul and ~ d...
coeadd 26312	The coefficient function o...
coemul 26313	A coefficient of a product...
coe11 26314	The coefficient function i...
coemulhi 26315	The leading coefficient of...
coemulc 26316	The coefficient function i...
coe0 26317	The coefficients of the ze...
coesub 26318	The coefficient function o...
coe1termlem 26319	The coefficient function o...
coe1term 26320	The coefficient function o...
dgr1term 26321	The degree of a monomial. ...
plycn 26322	A polynomial is a continuo...
plycnOLD 26323	Obsolete version of ~ plyc...
dgr0 26324	The degree of the zero pol...
coeidp 26325	The coefficients of the id...
dgrid 26326	The degree of the identity...
dgreq0 26327	The leading coefficient of...
dgrlt 26328	Two ways to say that the d...
dgradd 26329	The degree of a sum of pol...
dgradd2 26330	The degree of a sum of pol...
dgrmul2 26331	The degree of a product of...
dgrmul 26332	The degree of a product of...
dgrmulc 26333	Scalar multiplication by a...
dgrsub 26334	The degree of a difference...
dgrcolem1 26335	The degree of a compositio...
dgrcolem2 26336	Lemma for ~ dgrco . (Cont...
dgrco 26337	The degree of a compositio...
plycjlem 26338	Lemma for ~ plycj and ~ co...
plycj 26339	The double conjugation of ...
coecj 26340	Double conjugation of a po...
plyrecj 26341	A polynomial with real coe...
plymul0or 26342	Polynomial multiplication ...
ofmulrt 26343	The set of roots of a prod...
plyreres 26344	Real-coefficient polynomia...
dvply1 26345	Derivative of a polynomial...
dvply2g 26346	The derivative of a polyno...
dvply2gOLD 26347	Obsolete version of ~ dvpl...
dvply2 26348	The derivative of a polyno...
dvnply2 26349	Polynomials have polynomia...
dvnply 26350	Polynomials have polynomia...
plycpn 26351	Polynomials are smooth. (...
quotval 26354	Value of the quotient func...
plydivlem1 26355	Lemma for ~ plydivalg . (...
plydivlem2 26356	Lemma for ~ plydivalg . (...
plydivlem3 26357	Lemma for ~ plydivex . Ba...
plydivlem4 26358	Lemma for ~ plydivex . In...
plydivex 26359	Lemma for ~ plydivalg . (...
plydiveu 26360	Lemma for ~ plydivalg . (...
plydivalg 26361	The division algorithm on ...
quotlem 26362	Lemma for properties of th...
quotcl 26363	The quotient of two polyno...
quotcl2 26364	Closure of the quotient fu...
quotdgr 26365	Remainder property of the ...
plyremlem 26366	Closure of a linear factor...
plyrem 26367	The polynomial remainder t...
facth 26368	The factor theorem. If a ...
fta1lem 26369	Lemma for ~ fta1 . (Contr...
fta1 26370	The easy direction of the ...
quotcan 26371	Exact division with a mult...
vieta1lem1 26372	Lemma for ~ vieta1 . (Con...
vieta1lem2 26373	Lemma for ~ vieta1 : induc...
vieta1 26374	The first-order Vieta's fo...
plyexmo 26375	An infinite set of values ...
elaa 26378	Elementhood in the set of ...
aacn 26379	An algebraic number is a c...
aasscn 26380	The algebraic numbers are ...
elqaalem1 26381	Lemma for ~ elqaa . The f...
elqaalem2 26382	Lemma for ~ elqaa . (Cont...
elqaalem3 26383	Lemma for ~ elqaa . (Cont...
elqaa 26384	The set of numbers generat...
qaa 26385	Every rational number is a...
qssaa 26386	The rational numbers are c...
iaa 26387	The imaginary unit is alge...
aareccl 26388	The reciprocal of an algeb...
aacjcl 26389	The conjugate of an algebr...
aannenlem1 26390	Lemma for ~ aannen . (Con...
aannenlem2 26391	Lemma for ~ aannen . (Con...
aannenlem3 26392	The algebraic numbers are ...
aannen 26393	The algebraic numbers are ...
aalioulem1 26394	Lemma for ~ aaliou . An i...
aalioulem2 26395	Lemma for ~ aaliou . (Con...
aalioulem3 26396	Lemma for ~ aaliou . (Con...
aalioulem4 26397	Lemma for ~ aaliou . (Con...
aalioulem5 26398	Lemma for ~ aaliou . (Con...
aalioulem6 26399	Lemma for ~ aaliou . (Con...
aaliou 26400	Liouville's theorem on dio...
geolim3 26401	Geometric series convergen...
aaliou2 26402	Liouville's approximation ...
aaliou2b 26403	Liouville's approximation ...
aaliou3lem1 26404	Lemma for ~ aaliou3 . (Co...
aaliou3lem2 26405	Lemma for ~ aaliou3 . (Co...
aaliou3lem3 26406	Lemma for ~ aaliou3 . (Co...
aaliou3lem8 26407	Lemma for ~ aaliou3 . (Co...
aaliou3lem4 26408	Lemma for ~ aaliou3 . (Co...
aaliou3lem5 26409	Lemma for ~ aaliou3 . (Co...
aaliou3lem6 26410	Lemma for ~ aaliou3 . (Co...
aaliou3lem7 26411	Lemma for ~ aaliou3 . (Co...
aaliou3lem9 26412	Example of a "Liouville nu...
aaliou3 26413	Example of a "Liouville nu...
taylfvallem1 26418	Lemma for ~ taylfval . (C...
taylfvallem 26419	Lemma for ~ taylfval . (C...
taylfval 26420	Define the Taylor polynomi...
eltayl 26421	Value of the Taylor series...
taylf 26422	The Taylor series defines ...
tayl0 26423	The Taylor series is alway...
taylplem1 26424	Lemma for ~ taylpfval and ...
taylplem2 26425	Lemma for ~ taylpfval and ...
taylpfval 26426	Define the Taylor polynomi...
taylpf 26427	The Taylor polynomial is a...
taylpval 26428	Value of the Taylor polyno...
taylply2 26429	The Taylor polynomial is a...
taylply2OLD 26430	Obsolete version of ~ tayl...
taylply 26431	The Taylor polynomial is a...
dvtaylp 26432	The derivative of the Tayl...
dvntaylp 26433	The ` M ` -th derivative o...
dvntaylp0 26434	The first ` N ` derivative...
taylthlem1 26435	Lemma for ~ taylth . This...
taylthlem2 26436	Lemma for ~ taylth . (Con...
taylthlem2OLD 26437	Obsolete version of ~ tayl...
taylth 26438	Taylor's theorem. The Tay...
ulmrel 26441	The uniform limit relation...
ulmscl 26442	Closure of the base set in...
ulmval 26443	Express the predicate: Th...
ulmcl 26444	Closure of a uniform limit...
ulmf 26445	Closure of a uniform limit...
ulmpm 26446	Closure of a uniform limit...
ulmf2 26447	Closure of a uniform limit...
ulm2 26448	Simplify ~ ulmval when ` F...
ulmi 26449	The uniform limit property...
ulmclm 26450	A uniform limit of functio...
ulmres 26451	A sequence of functions co...
ulmshftlem 26452	Lemma for ~ ulmshft . (Co...
ulmshft 26453	A sequence of functions co...
ulm0 26454	Every function converges u...
ulmuni 26455	A sequence of functions un...
ulmdm 26456	Two ways to express that a...
ulmcaulem 26457	Lemma for ~ ulmcau and ~ u...
ulmcau 26458	A sequence of functions co...
ulmcau2 26459	A sequence of functions co...
ulmss 26460	A uniform limit of functio...
ulmbdd 26461	A uniform limit of bounded...
ulmcn 26462	A uniform limit of continu...
ulmdvlem1 26463	Lemma for ~ ulmdv . (Cont...
ulmdvlem2 26464	Lemma for ~ ulmdv . (Cont...
ulmdvlem3 26465	Lemma for ~ ulmdv . (Cont...
ulmdv 26466	If ` F ` is a sequence of ...
mtest 26467	The Weierstrass M-test. I...
mtestbdd 26468	Given the hypotheses of th...
mbfulm 26469	A uniform limit of measura...
iblulm 26470	A uniform limit of integra...
itgulm 26471	A uniform limit of integra...
itgulm2 26472	A uniform limit of integra...
pserval 26473	Value of the function ` G ...
pserval2 26474	Value of the function ` G ...
psergf 26475	The sequence of terms in t...
radcnvlem1 26476	Lemma for ~ radcnvlt1 , ~ ...
radcnvlem2 26477	Lemma for ~ radcnvlt1 , ~ ...
radcnvlem3 26478	Lemma for ~ radcnvlt1 , ~ ...
radcnv0 26479	Zero is always a convergen...
radcnvcl 26480	The radius of convergence ...
radcnvlt1 26481	If ` X ` is within the ope...
radcnvlt2 26482	If ` X ` is within the ope...
radcnvle 26483	If ` X ` is a convergent p...
dvradcnv 26484	The radius of convergence ...
pserulm 26485	If ` S ` is a region conta...
psercn2 26486	Since by ~ pserulm the ser...
psercn2OLD 26487	Obsolete version of ~ pser...
psercnlem2 26488	Lemma for ~ psercn . (Con...
psercnlem1 26489	Lemma for ~ psercn . (Con...
psercn 26490	An infinite series converg...
pserdvlem1 26491	Lemma for ~ pserdv . (Con...
pserdvlem2 26492	Lemma for ~ pserdv . (Con...
pserdv 26493	The derivative of a power ...
pserdv2 26494	The derivative of a power ...
abelthlem1 26495	Lemma for ~ abelth . (Con...
abelthlem2 26496	Lemma for ~ abelth . The ...
abelthlem3 26497	Lemma for ~ abelth . (Con...
abelthlem4 26498	Lemma for ~ abelth . (Con...
abelthlem5 26499	Lemma for ~ abelth . (Con...
abelthlem6 26500	Lemma for ~ abelth . (Con...
abelthlem7a 26501	Lemma for ~ abelth . (Con...
abelthlem7 26502	Lemma for ~ abelth . (Con...
abelthlem8 26503	Lemma for ~ abelth . (Con...
abelthlem9 26504	Lemma for ~ abelth . By a...
abelth 26505	Abel's theorem. If the po...
abelth2 26506	Abel's theorem, restricted...
efcn 26507	The exponential function i...
sincn 26508	Sine is continuous. (Cont...
coscn 26509	Cosine is continuous. (Co...
reeff1olem 26510	Lemma for ~ reeff1o . (Co...
reeff1o 26511	The real exponential funct...
reefiso 26512	The exponential function o...
efcvx 26513	The exponential function o...
reefgim 26514	The exponential function i...
pilem1 26515	Lemma for ~ pire , ~ pigt2...
pilem2 26516	Lemma for ~ pire , ~ pigt2...
pilem3 26517	Lemma for ~ pire , ~ pigt2...
pigt2lt4 26518	` _pi ` is between 2 and 4...
sinpi 26519	The sine of ` _pi ` is 0. ...
pire 26520	` _pi ` is a real number. ...
picn 26521	` _pi ` is a complex numbe...
pipos 26522	` _pi ` is positive. (Con...
pirp 26523	` _pi ` is a positive real...
negpicn 26524	` -u _pi ` is a real numbe...
sinhalfpilem 26525	Lemma for ~ sinhalfpi and ...
halfpire 26526	` _pi / 2 ` is real. (Con...
neghalfpire 26527	` -u _pi / 2 ` is real. (...
neghalfpirx 26528	` -u _pi / 2 ` is an exten...
pidiv2halves 26529	Adding ` _pi / 2 ` to itse...
sinhalfpi 26530	The sine of ` _pi / 2 ` is...
coshalfpi 26531	The cosine of ` _pi / 2 ` ...
cosneghalfpi 26532	The cosine of ` -u _pi / 2...
efhalfpi 26533	The exponential of ` _i _p...
cospi 26534	The cosine of ` _pi ` is `...
efipi 26535	The exponential of ` _i x....
eulerid 26536	Euler's identity. (Contri...
sin2pi 26537	The sine of ` 2 _pi ` is 0...
cos2pi 26538	The cosine of ` 2 _pi ` is...
ef2pi 26539	The exponential of ` 2 _pi...
ef2kpi 26540	If ` K ` is an integer, th...
efper 26541	The exponential function i...
sinperlem 26542	Lemma for ~ sinper and ~ c...
sinper 26543	The sine function is perio...
cosper 26544	The cosine function is per...
sin2kpi 26545	If ` K ` is an integer, th...
cos2kpi 26546	If ` K ` is an integer, th...
sin2pim 26547	Sine of a number subtracte...
cos2pim 26548	Cosine of a number subtrac...
sinmpi 26549	Sine of a number less ` _p...
cosmpi 26550	Cosine of a number less ` ...
sinppi 26551	Sine of a number plus ` _p...
cosppi 26552	Cosine of a number plus ` ...
efimpi 26553	The exponential function a...
sinhalfpip 26554	The sine of ` _pi / 2 ` pl...
sinhalfpim 26555	The sine of ` _pi / 2 ` mi...
coshalfpip 26556	The cosine of ` _pi / 2 ` ...
coshalfpim 26557	The cosine of ` _pi / 2 ` ...
ptolemy 26558	Ptolemy's Theorem. This t...
sincosq1lem 26559	Lemma for ~ sincosq1sgn . ...
sincosq1sgn 26560	The signs of the sine and ...
sincosq2sgn 26561	The signs of the sine and ...
sincosq3sgn 26562	The signs of the sine and ...
sincosq4sgn 26563	The signs of the sine and ...
coseq00topi 26564	Location of the zeroes of ...
coseq0negpitopi 26565	Location of the zeroes of ...
tanrpcl 26566	Positive real closure of t...
tangtx 26567	The tangent function is gr...
tanabsge 26568	The tangent function is gr...
sinq12gt0 26569	The sine of a number stric...
sinq12ge0 26570	The sine of a number betwe...
sinq34lt0t 26571	The sine of a number stric...
cosq14gt0 26572	The cosine of a number str...
cosq14ge0 26573	The cosine of a number bet...
sincosq1eq 26574	Complementarity of the sin...
sincos4thpi 26575	The sine and cosine of ` _...
tan4thpi 26576	The tangent of ` _pi / 4 `...
tan4thpiOLD 26577	Obsolete version of ~ tan4...
sincos6thpi 26578	The sine and cosine of ` _...
sincos3rdpi 26579	The sine and cosine of ` _...
pigt3 26580	` _pi ` is greater than 3....
pige3 26581	` _pi ` is greater than or...
pige3ALT 26582	Alternate proof of ~ pige3...
abssinper 26583	The absolute value of sine...
sinkpi 26584	The sine of an integer mul...
coskpi 26585	The absolute value of the ...
sineq0 26586	A complex number whose sin...
coseq1 26587	A complex number whose cos...
cos02pilt1 26588	Cosine is less than one be...
cosq34lt1 26589	Cosine is less than one in...
efeq1 26590	A complex number whose exp...
cosne0 26591	The cosine function has no...
cosordlem 26592	Lemma for ~ cosord . (Con...
cosord 26593	Cosine is decreasing over ...
cos0pilt1 26594	Cosine is between minus on...
cos11 26595	Cosine is one-to-one over ...
sinord 26596	Sine is increasing over th...
recosf1o 26597	The cosine function is a b...
resinf1o 26598	The sine function is a bij...
tanord1 26599	The tangent function is st...
tanord 26600	The tangent function is st...
tanregt0 26601	The real part of the tange...
negpitopissre 26602	The interval ` ( -u _pi (,...
efgh 26603	The exponential function o...
efif1olem1 26604	Lemma for ~ efif1o . (Con...
efif1olem2 26605	Lemma for ~ efif1o . (Con...
efif1olem3 26606	Lemma for ~ efif1o . (Con...
efif1olem4 26607	The exponential function o...
efif1o 26608	The exponential function o...
efifo 26609	The exponential function o...
eff1olem 26610	The exponential function m...
eff1o 26611	The exponential function m...
efabl 26612	The image of a subgroup of...
efsubm 26613	The image of a subgroup of...
circgrp 26614	The circle group ` T ` is ...
circsubm 26615	The circle group ` T ` is ...
logrn 26620	The range of the natural l...
ellogrn 26621	Write out the property ` A...
dflog2 26622	The natural logarithm func...
relogrn 26623	The range of the natural l...
logrncn 26624	The range of the natural l...
eff1o2 26625	The exponential function r...
logf1o 26626	The natural logarithm func...
dfrelog 26627	The natural logarithm func...
relogf1o 26628	The natural logarithm func...
logrncl 26629	Closure of the natural log...
logcl 26630	Closure of the natural log...
logimcl 26631	Closure of the imaginary p...
logcld 26632	The logarithm of a nonzero...
logimcld 26633	The imaginary part of the ...
logimclad 26634	The imaginary part of the ...
abslogimle 26635	The imaginary part of the ...
logrnaddcl 26636	The range of the natural l...
relogcl 26637	Closure of the natural log...
eflog 26638	Relationship between the n...
logeq0im1 26639	If the logarithm of a numb...
logccne0 26640	The logarithm isn't 0 if i...
logne0 26641	Logarithm of a non-1 posit...
reeflog 26642	Relationship between the n...
logef 26643	Relationship between the n...
relogef 26644	Relationship between the n...
logeftb 26645	Relationship between the n...
relogeftb 26646	Relationship between the n...
log1 26647	The natural logarithm of `...
loge 26648	The natural logarithm of `...
logi 26649	The natural logarithm of `...
logneg 26650	The natural logarithm of a...
logm1 26651	The natural logarithm of n...
lognegb 26652	If a number has imaginary ...
relogoprlem 26653	Lemma for ~ relogmul and ~...
relogmul 26654	The natural logarithm of t...
relogdiv 26655	The natural logarithm of t...
explog 26656	Exponentiation of a nonzer...
reexplog 26657	Exponentiation of a positi...
relogexp 26658	The natural logarithm of p...
relog 26659	Real part of a logarithm. ...
relogiso 26660	The natural logarithm func...
reloggim 26661	The natural logarithm is a...
logltb 26662	The natural logarithm func...
logfac 26663	The logarithm of a factori...
eflogeq 26664	Solve an equation involvin...
logleb 26665	Natural logarithm preserve...
rplogcl 26666	Closure of the logarithm f...
logge0 26667	The logarithm of a number ...
logcj 26668	The natural logarithm dist...
efiarg 26669	The exponential of the "ar...
cosargd 26670	The cosine of the argument...
cosarg0d 26671	The cosine of the argument...
argregt0 26672	Closure of the argument of...
argrege0 26673	Closure of the argument of...
argimgt0 26674	Closure of the argument of...
argimlt0 26675	Closure of the argument of...
logimul 26676	Multiplying a number by ` ...
logneg2 26677	The logarithm of the negat...
logmul2 26678	Generalization of ~ relogm...
logdiv2 26679	Generalization of ~ relogd...
abslogle 26680	Bound on the magnitude of ...
tanarg 26681	The basic relation between...
logdivlti 26682	The ` log x / x ` function...
logdivlt 26683	The ` log x / x ` function...
logdivle 26684	The ` log x / x ` function...
relogcld 26685	Closure of the natural log...
reeflogd 26686	Relationship between the n...
relogmuld 26687	The natural logarithm of t...
relogdivd 26688	The natural logarithm of t...
logled 26689	Natural logarithm preserve...
relogefd 26690	Relationship between the n...
rplogcld 26691	Closure of the logarithm f...
logge0d 26692	The logarithm of a number ...
logge0b 26693	The logarithm of a number ...
loggt0b 26694	The logarithm of a number ...
logle1b 26695	The logarithm of a number ...
loglt1b 26696	The logarithm of a number ...
divlogrlim 26697	The inverse logarithm func...
logno1 26698	The logarithm function is ...
dvrelog 26699	The derivative of the real...
relogcn 26700	The real logarithm functio...
ellogdm 26701	Elementhood in the "contin...
logdmn0 26702	A number in the continuous...
logdmnrp 26703	A number in the continuous...
logdmss 26704	The continuity domain of `...
logcnlem2 26705	Lemma for ~ logcn . (Cont...
logcnlem3 26706	Lemma for ~ logcn . (Cont...
logcnlem4 26707	Lemma for ~ logcn . (Cont...
logcnlem5 26708	Lemma for ~ logcn . (Cont...
logcn 26709	The logarithm function is ...
dvloglem 26710	Lemma for ~ dvlog . (Cont...
logdmopn 26711	The "continuous domain" of...
logf1o2 26712	The logarithm maps its con...
dvlog 26713	The derivative of the comp...
dvlog2lem 26714	Lemma for ~ dvlog2 . (Con...
dvlog2 26715	The derivative of the comp...
advlog 26716	The antiderivative of the ...
advlogexp 26717	The antiderivative of a po...
efopnlem1 26718	Lemma for ~ efopn . (Cont...
efopnlem2 26719	Lemma for ~ efopn . (Cont...
efopn 26720	The exponential map is an ...
logtayllem 26721	Lemma for ~ logtayl . (Co...
logtayl 26722	The Taylor series for ` -u...
logtaylsum 26723	The Taylor series for ` -u...
logtayl2 26724	Power series expression fo...
logccv 26725	The natural logarithm func...
cxpval 26726	Value of the complex power...
cxpef 26727	Value of the complex power...
0cxp 26728	Value of the complex power...
cxpexpz 26729	Relate the complex power f...
cxpexp 26730	Relate the complex power f...
logcxp 26731	Logarithm of a complex pow...
cxp0 26732	Value of the complex power...
cxp1 26733	Value of the complex power...
1cxp 26734	Value of the complex power...
ecxp 26735	Write the exponential func...
cxpcl 26736	Closure of the complex pow...
recxpcl 26737	Real closure of the comple...
rpcxpcl 26738	Positive real closure of t...
cxpne0 26739	Complex exponentiation is ...
cxpeq0 26740	Complex exponentiation is ...
cxpadd 26741	Sum of exponents law for c...
cxpp1 26742	Value of a nonzero complex...
cxpneg 26743	Value of a complex number ...
cxpsub 26744	Exponent subtraction law f...
cxpge0 26745	Nonnegative exponentiation...
mulcxplem 26746	Lemma for ~ mulcxp . (Con...
mulcxp 26747	Complex exponentiation of ...
cxprec 26748	Complex exponentiation of ...
divcxp 26749	Complex exponentiation of ...
cxpmul 26750	Product of exponents law f...
cxpmul2 26751	Product of exponents law f...
cxproot 26752	The complex power function...
cxpmul2z 26753	Generalize ~ cxpmul2 to ne...
abscxp 26754	Absolute value of a power,...
abscxp2 26755	Absolute value of a power,...
cxplt 26756	Ordering property for comp...
cxple 26757	Ordering property for comp...
cxplea 26758	Ordering property for comp...
cxple2 26759	Ordering property for comp...
cxplt2 26760	Ordering property for comp...
cxple2a 26761	Ordering property for comp...
cxplt3 26762	Ordering property for comp...
cxple3 26763	Ordering property for comp...
cxpsqrtlem 26764	Lemma for ~ cxpsqrt . (Co...
cxpsqrt 26765	The complex exponential fu...
logsqrt 26766	Logarithm of a square root...
cxp0d 26767	Value of the complex power...
cxp1d 26768	Value of the complex power...
1cxpd 26769	Value of the complex power...
cxpcld 26770	Closure of the complex pow...
cxpmul2d 26771	Product of exponents law f...
0cxpd 26772	Value of the complex power...
cxpexpzd 26773	Relate the complex power f...
cxpefd 26774	Value of the complex power...
cxpne0d 26775	Complex exponentiation is ...
cxpp1d 26776	Value of a nonzero complex...
cxpnegd 26777	Value of a complex number ...
cxpmul2zd 26778	Generalize ~ cxpmul2 to ne...
cxpaddd 26779	Sum of exponents law for c...
cxpsubd 26780	Exponent subtraction law f...
cxpltd 26781	Ordering property for comp...
cxpled 26782	Ordering property for comp...
cxplead 26783	Ordering property for comp...
divcxpd 26784	Complex exponentiation of ...
recxpcld 26785	Positive real closure of t...
cxpge0d 26786	Nonnegative exponentiation...
cxple2ad 26787	Ordering property for comp...
cxplt2d 26788	Ordering property for comp...
cxple2d 26789	Ordering property for comp...
mulcxpd 26790	Complex exponentiation of ...
recxpf1lem 26791	Complex exponentiation on ...
cxpsqrtth 26792	Square root theorem over t...
2irrexpq 26793	There exist irrational num...
cxprecd 26794	Complex exponentiation of ...
rpcxpcld 26795	Positive real closure of t...
logcxpd 26796	Logarithm of a complex pow...
cxplt3d 26797	Ordering property for comp...
cxple3d 26798	Ordering property for comp...
cxpmuld 26799	Product of exponents law f...
cxpgt0d 26800	A positive real raised to ...
cxpcom 26801	Commutative law for real e...
dvcxp1 26802	The derivative of a comple...
dvcxp2 26803	The derivative of a comple...
dvsqrt 26804	The derivative of the real...
dvcncxp1 26805	Derivative of complex powe...
dvcnsqrt 26806	Derivative of square root ...
cxpcn 26807	Domain of continuity of th...
cxpcnOLD 26808	Obsolete version of ~ cxpc...
cxpcn2 26809	Continuity of the complex ...
cxpcn3lem 26810	Lemma for ~ cxpcn3 . (Con...
cxpcn3 26811	Extend continuity of the c...
resqrtcn 26812	Continuity of the real squ...
sqrtcn 26813	Continuity of the square r...
cxpaddlelem 26814	Lemma for ~ cxpaddle . (C...
cxpaddle 26815	Ordering property for comp...
abscxpbnd 26816	Bound on the absolute valu...
root1id 26817	Property of an ` N ` -th r...
root1eq1 26818	The only powers of an ` N ...
root1cj 26819	Within the ` N ` -th roots...
cxpeq 26820	Solve an equation involvin...
zrtelqelz 26821	If the ` N ` -th root of a...
zrtdvds 26822	A positive integer root di...
rtprmirr 26823	The root of a prime number...
loglesqrt 26824	An upper bound on the loga...
logreclem 26825	Symmetry of the natural lo...
logrec 26826	Logarithm of a reciprocal ...
logbval 26829	Define the value of the ` ...
logbcl 26830	General logarithm closure....
logbid1 26831	General logarithm is 1 whe...
logb1 26832	The logarithm of ` 1 ` to ...
elogb 26833	The general logarithm of a...
logbchbase 26834	Change of base for logarit...
relogbval 26835	Value of the general logar...
relogbcl 26836	Closure of the general log...
relogbzcl 26837	Closure of the general log...
relogbreexp 26838	Power law for the general ...
relogbzexp 26839	Power law for the general ...
relogbmul 26840	The logarithm of the produ...
relogbmulexp 26841	The logarithm of the produ...
relogbdiv 26842	The logarithm of the quoti...
relogbexp 26843	Identity law for general l...
nnlogbexp 26844	Identity law for general l...
logbrec 26845	Logarithm of a reciprocal ...
logbleb 26846	The general logarithm func...
logblt 26847	The general logarithm func...
relogbcxp 26848	Identity law for the gener...
cxplogb 26849	Identity law for the gener...
relogbcxpb 26850	The logarithm is the inver...
logbmpt 26851	The general logarithm to a...
logbf 26852	The general logarithm to a...
logbfval 26853	The general logarithm of a...
relogbf 26854	The general logarithm to a...
logblog 26855	The general logarithm to t...
logbgt0b 26856	The logarithm of a positiv...
logbgcd1irr 26857	The logarithm of an intege...
2logb9irr 26858	Example for ~ logbgcd1irr ...
logbprmirr 26859	The logarithm of a prime t...
2logb3irr 26860	Example for ~ logbprmirr ....
2logb9irrALT 26861	Alternate proof of ~ 2logb...
sqrt2cxp2logb9e3 26862	The square root of two to ...
2irrexpqALT 26863	Alternate proof of ~ 2irre...
angval 26864	Define the angle function,...
angcan 26865	Cancel a constant multipli...
angneg 26866	Cancel a negative sign in ...
angvald 26867	The (signed) angle between...
angcld 26868	The (signed) angle between...
angrteqvd 26869	Two vectors are at a right...
cosangneg2d 26870	The cosine of the angle be...
angrtmuld 26871	Perpendicularity of two ve...
ang180lem1 26872	Lemma for ~ ang180 . Show...
ang180lem2 26873	Lemma for ~ ang180 . Show...
ang180lem3 26874	Lemma for ~ ang180 . Sinc...
ang180lem4 26875	Lemma for ~ ang180 . Redu...
ang180lem5 26876	Lemma for ~ ang180 : Redu...
ang180 26877	The sum of angles ` m A B ...
lawcoslem1 26878	Lemma for ~ lawcos . Here...
lawcos 26879	Law of cosines (also known...
pythag 26880	Pythagorean theorem. Give...
isosctrlem1 26881	Lemma for ~ isosctr . (Co...
isosctrlem2 26882	Lemma for ~ isosctr . Cor...
isosctrlem3 26883	Lemma for ~ isosctr . Cor...
isosctr 26884	Isosceles triangle theorem...
ssscongptld 26885	If two triangles have equa...
affineequiv 26886	Equivalence between two wa...
affineequiv2 26887	Equivalence between two wa...
affineequiv3 26888	Equivalence between two wa...
affineequiv4 26889	Equivalence between two wa...
affineequivne 26890	Equivalence between two wa...
angpieqvdlem 26891	Equivalence used in the pr...
angpieqvdlem2 26892	Equivalence used in ~ angp...
angpined 26893	If the angle at ABC is ` _...
angpieqvd 26894	The angle ABC is ` _pi ` i...
chordthmlem 26895	If ` M ` is the midpoint o...
chordthmlem2 26896	If M is the midpoint of AB...
chordthmlem3 26897	If M is the midpoint of AB...
chordthmlem4 26898	If P is on the segment AB ...
chordthmlem5 26899	If P is on the segment AB ...
chordthm 26900	The intersecting chords th...
heron 26901	Heron's formula gives the ...
quad2 26902	The quadratic equation, wi...
quad 26903	The quadratic equation. (...
1cubrlem 26904	The cube roots of unity. ...
1cubr 26905	The cube roots of unity. ...
dcubic1lem 26906	Lemma for ~ dcubic1 and ~ ...
dcubic2 26907	Reverse direction of ~ dcu...
dcubic1 26908	Forward direction of ~ dcu...
dcubic 26909	Solutions to the depressed...
mcubic 26910	Solutions to a monic cubic...
cubic2 26911	The solution to the genera...
cubic 26912	The cubic equation, which ...
binom4 26913	Work out a quartic binomia...
dquartlem1 26914	Lemma for ~ dquart . (Con...
dquartlem2 26915	Lemma for ~ dquart . (Con...
dquart 26916	Solve a depressed quartic ...
quart1cl 26917	Closure lemmas for ~ quart...
quart1lem 26918	Lemma for ~ quart1 . (Con...
quart1 26919	Depress a quartic equation...
quartlem1 26920	Lemma for ~ quart . (Cont...
quartlem2 26921	Closure lemmas for ~ quart...
quartlem3 26922	Closure lemmas for ~ quart...
quartlem4 26923	Closure lemmas for ~ quart...
quart 26924	The quartic equation, writ...
asinlem 26931	The argument to the logari...
asinlem2 26932	The argument to the logari...
asinlem3a 26933	Lemma for ~ asinlem3 . (C...
asinlem3 26934	The argument to the logari...
asinf 26935	Domain and codomain of the...
asincl 26936	Closure for the arcsin fun...
acosf 26937	Domain and codoamin of the...
acoscl 26938	Closure for the arccos fun...
atandm 26939	Since the property is a li...
atandm2 26940	This form of ~ atandm is a...
atandm3 26941	A compact form of ~ atandm...
atandm4 26942	A compact form of ~ atandm...
atanf 26943	Domain and codoamin of the...
atancl 26944	Closure for the arctan fun...
asinval 26945	Value of the arcsin functi...
acosval 26946	Value of the arccos functi...
atanval 26947	Value of the arctan functi...
atanre 26948	A real number is in the do...
asinneg 26949	The arcsine function is od...
acosneg 26950	The negative symmetry rela...
efiasin 26951	The exponential of the arc...
sinasin 26952	The arcsine function is an...
cosacos 26953	The arccosine function is ...
asinsinlem 26954	Lemma for ~ asinsin . (Co...
asinsin 26955	The arcsine function compo...
acoscos 26956	The arccosine function is ...
asin1 26957	The arcsine of ` 1 ` is ` ...
acos1 26958	The arccosine of ` 1 ` is ...
reasinsin 26959	The arcsine function compo...
asinsinb 26960	Relationship between sine ...
acoscosb 26961	Relationship between cosin...
asinbnd 26962	The arcsine function has r...
acosbnd 26963	The arccosine function has...
asinrebnd 26964	Bounds on the arcsine func...
asinrecl 26965	The arcsine function is re...
acosrecl 26966	The arccosine function is ...
cosasin 26967	The cosine of the arcsine ...
sinacos 26968	The sine of the arccosine ...
atandmneg 26969	The domain of the arctange...
atanneg 26970	The arctangent function is...
atan0 26971	The arctangent of zero is ...
atandmcj 26972	The arctangent function di...
atancj 26973	The arctangent function di...
atanrecl 26974	The arctangent function is...
efiatan 26975	Value of the exponential o...
atanlogaddlem 26976	Lemma for ~ atanlogadd . ...
atanlogadd 26977	The rule ` sqrt ( z w ) = ...
atanlogsublem 26978	Lemma for ~ atanlogsub . ...
atanlogsub 26979	A variation on ~ atanlogad...
efiatan2 26980	Value of the exponential o...
2efiatan 26981	Value of the exponential o...
tanatan 26982	The arctangent function is...
atandmtan 26983	The tangent function has r...
cosatan 26984	The cosine of an arctangen...
cosatanne0 26985	The arctangent function ha...
atantan 26986	The arctangent function is...
atantanb 26987	Relationship between tange...
atanbndlem 26988	Lemma for ~ atanbnd . (Co...
atanbnd 26989	The arctangent function is...
atanord 26990	The arctangent function is...
atan1 26991	The arctangent of ` 1 ` is...
bndatandm 26992	A point in the open unit d...
atans 26993	The "domain of continuity"...
atans2 26994	It suffices to show that `...
atansopn 26995	The domain of continuity o...
atansssdm 26996	The domain of continuity o...
ressatans 26997	The real number line is a ...
dvatan 26998	The derivative of the arct...
atancn 26999	The arctangent is a contin...
atantayl 27000	The Taylor series for ` ar...
atantayl2 27001	The Taylor series for ` ar...
atantayl3 27002	The Taylor series for ` ar...
leibpilem1 27003	Lemma for ~ leibpi . (Con...
leibpilem2 27004	The Leibniz formula for ` ...
leibpi 27005	The Leibniz formula for ` ...
leibpisum 27006	The Leibniz formula for ` ...
log2cnv 27007	Using the Taylor series fo...
log2tlbnd 27008	Bound the error term in th...
log2ublem1 27009	Lemma for ~ log2ub . The ...
log2ublem2 27010	Lemma for ~ log2ub . (Con...
log2ublem3 27011	Lemma for ~ log2ub . In d...
log2ub 27012	` log 2 ` is less than ` 2...
log2le1 27013	` log 2 ` is less than ` 1...
birthdaylem1 27014	Lemma for ~ birthday . (C...
birthdaylem2 27015	For general ` N ` and ` K ...
birthdaylem3 27016	For general ` N ` and ` K ...
birthday 27017	The Birthday Problem. The...
dmarea 27020	The domain of the area fun...
areambl 27021	The fibers of a measurable...
areass 27022	A measurable region is a s...
dfarea 27023	Rewrite ~ df-area self-ref...
areaf 27024	Area measurement is a func...
areacl 27025	The area of a measurable r...
areage0 27026	The area of a measurable r...
areaval 27027	The area of a measurable r...
rlimcnp 27028	Relate a limit of a real-v...
rlimcnp2 27029	Relate a limit of a real-v...
rlimcnp3 27030	Relate a limit of a real-v...
xrlimcnp 27031	Relate a limit of a real-v...
efrlim 27032	The limit of the sequence ...
efrlimOLD 27033	Obsolete version of ~ efrl...
dfef2 27034	The limit of the sequence ...
cxplim 27035	A power to a negative expo...
sqrtlim 27036	The inverse square root fu...
rlimcxp 27037	Any power to a positive ex...
o1cxp 27038	An eventually bounded func...
cxp2limlem 27039	A linear factor grows slow...
cxp2lim 27040	Any power grows slower tha...
cxploglim 27041	The logarithm grows slower...
cxploglim2 27042	Every power of the logarit...
divsqrtsumlem 27043	Lemma for ~ divsqrsum and ...
divsqrsumf 27044	The function ` F ` used in...
divsqrsum 27045	The sum ` sum_ n <_ x ( 1 ...
divsqrtsum2 27046	A bound on the distance of...
divsqrtsumo1 27047	The sum ` sum_ n <_ x ( 1 ...
cvxcl 27048	Closure of a 0-1 linear co...
scvxcvx 27049	A strictly convex function...
jensenlem1 27050	Lemma for ~ jensen . (Con...
jensenlem2 27051	Lemma for ~ jensen . (Con...
jensen 27052	Jensen's inequality, a fin...
amgmlem 27053	Lemma for ~ amgm . (Contr...
amgm 27054	Inequality of arithmetic a...
logdifbnd 27057	Bound on the difference of...
logdiflbnd 27058	Lower bound on the differe...
emcllem1 27059	Lemma for ~ emcl . The se...
emcllem2 27060	Lemma for ~ emcl . ` F ` i...
emcllem3 27061	Lemma for ~ emcl . The fu...
emcllem4 27062	Lemma for ~ emcl . The di...
emcllem5 27063	Lemma for ~ emcl . The pa...
emcllem6 27064	Lemma for ~ emcl . By the...
emcllem7 27065	Lemma for ~ emcl and ~ har...
emcl 27066	Closure and bounds for the...
harmonicbnd 27067	A bound on the harmonic se...
harmonicbnd2 27068	A bound on the harmonic se...
emre 27069	The Euler-Mascheroni const...
emgt0 27070	The Euler-Mascheroni const...
harmonicbnd3 27071	A bound on the harmonic se...
harmoniclbnd 27072	A bound on the harmonic se...
harmonicubnd 27073	A bound on the harmonic se...
harmonicbnd4 27074	The asymptotic behavior of...
fsumharmonic 27075	Bound a finite sum based o...
zetacvg 27078	The zeta series is converg...
eldmgm 27085	Elementhood in the set of ...
dmgmaddn0 27086	If ` A ` is not a nonposit...
dmlogdmgm 27087	If ` A ` is in the continu...
rpdmgm 27088	A positive real number is ...
dmgmn0 27089	If ` A ` is not a nonposit...
dmgmaddnn0 27090	If ` A ` is not a nonposit...
dmgmdivn0 27091	Lemma for ~ lgamf . (Cont...
lgamgulmlem1 27092	Lemma for ~ lgamgulm . (C...
lgamgulmlem2 27093	Lemma for ~ lgamgulm . (C...
lgamgulmlem3 27094	Lemma for ~ lgamgulm . (C...
lgamgulmlem4 27095	Lemma for ~ lgamgulm . (C...
lgamgulmlem5 27096	Lemma for ~ lgamgulm . (C...
lgamgulmlem6 27097	The series ` G ` is unifor...
lgamgulm 27098	The series ` G ` is unifor...
lgamgulm2 27099	Rewrite the limit of the s...
lgambdd 27100	The log-Gamma function is ...
lgamucov 27101	The ` U ` regions used in ...
lgamucov2 27102	The ` U ` regions used in ...
lgamcvglem 27103	Lemma for ~ lgamf and ~ lg...
lgamcl 27104	The log-Gamma function is ...
lgamf 27105	The log-Gamma function is ...
gamf 27106	The Gamma function is a co...
gamcl 27107	The exponential of the log...
eflgam 27108	The exponential of the log...
gamne0 27109	The Gamma function is neve...
igamval 27110	Value of the inverse Gamma...
igamz 27111	Value of the inverse Gamma...
igamgam 27112	Value of the inverse Gamma...
igamlgam 27113	Value of the inverse Gamma...
igamf 27114	Closure of the inverse Gam...
igamcl 27115	Closure of the inverse Gam...
gamigam 27116	The Gamma function is the ...
lgamcvg 27117	The series ` G ` converges...
lgamcvg2 27118	The series ` G ` converges...
gamcvg 27119	The pointwise exponential ...
lgamp1 27120	The functional equation of...
gamp1 27121	The functional equation of...
gamcvg2lem 27122	Lemma for ~ gamcvg2 . (Co...
gamcvg2 27123	An infinite product expres...
regamcl 27124	The Gamma function is real...
relgamcl 27125	The log-Gamma function is ...
rpgamcl 27126	The log-Gamma function is ...
lgam1 27127	The log-Gamma function at ...
gam1 27128	The log-Gamma function at ...
facgam 27129	The Gamma function general...
gamfac 27130	The Gamma function general...
wilthlem1 27131	The only elements that are...
wilthlem2 27132	Lemma for ~ wilth : induct...
wilthlem3 27133	Lemma for ~ wilth . Here ...
wilth 27134	Wilson's theorem. A numbe...
wilthimp 27135	The forward implication of...
ftalem1 27136	Lemma for ~ fta : "growth...
ftalem2 27137	Lemma for ~ fta . There e...
ftalem3 27138	Lemma for ~ fta . There e...
ftalem4 27139	Lemma for ~ fta : Closure...
ftalem5 27140	Lemma for ~ fta : Main pr...
ftalem6 27141	Lemma for ~ fta : Dischar...
ftalem7 27142	Lemma for ~ fta . Shift t...
fta 27143	The Fundamental Theorem of...
basellem1 27144	Lemma for ~ basel . Closu...
basellem2 27145	Lemma for ~ basel . Show ...
basellem3 27146	Lemma for ~ basel . Using...
basellem4 27147	Lemma for ~ basel . By ~ ...
basellem5 27148	Lemma for ~ basel . Using...
basellem6 27149	Lemma for ~ basel . The f...
basellem7 27150	Lemma for ~ basel . The f...
basellem8 27151	Lemma for ~ basel . The f...
basellem9 27152	Lemma for ~ basel . Since...
basel 27153	The sum of the inverse squ...
efnnfsumcl 27166	Finite sum closure in the ...
ppisval 27167	The set of primes less tha...
ppisval2 27168	The set of primes less tha...
ppifi 27169	The set of primes less tha...
prmdvdsfi 27170	The set of prime divisors ...
chtf 27171	Domain and codoamin of the...
chtcl 27172	Real closure of the Chebys...
chtval 27173	Value of the Chebyshev fun...
efchtcl 27174	The Chebyshev function is ...
chtge0 27175	The Chebyshev function is ...
vmaval 27176	Value of the von Mangoldt ...
isppw 27177	Two ways to say that ` A `...
isppw2 27178	Two ways to say that ` A `...
vmappw 27179	Value of the von Mangoldt ...
vmaprm 27180	Value of the von Mangoldt ...
vmacl 27181	Closure for the von Mangol...
vmaf 27182	Functionality of the von M...
efvmacl 27183	The von Mangoldt is closed...
vmage0 27184	The von Mangoldt function ...
chpval 27185	Value of the second Chebys...
chpf 27186	Functionality of the secon...
chpcl 27187	Closure for the second Che...
efchpcl 27188	The second Chebyshev funct...
chpge0 27189	The second Chebyshev funct...
ppival 27190	Value of the prime-countin...
ppival2 27191	Value of the prime-countin...
ppival2g 27192	Value of the prime-countin...
ppif 27193	Domain and codomain of the...
ppicl 27194	Real closure of the prime-...
muval 27195	The value of the Möbi...
muval1 27196	The value of the Möbi...
muval2 27197	The value of the Möbi...
isnsqf 27198	Two ways to say that a num...
issqf 27199	Two ways to say that a num...
sqfpc 27200	The prime count of a squar...
dvdssqf 27201	A divisor of a squarefree ...
sqf11 27202	A squarefree number is com...
muf 27203	The Möbius function i...
mucl 27204	Closure of the Möbius...
sgmval 27205	The value of the divisor f...
sgmval2 27206	The value of the divisor f...
0sgm 27207	The value of the sum-of-di...
sgmf 27208	The divisor function is a ...
sgmcl 27209	Closure of the divisor fun...
sgmnncl 27210	Closure of the divisor fun...
mule1 27211	The Möbius function t...
chtfl 27212	The Chebyshev function doe...
chpfl 27213	The second Chebyshev funct...
ppiprm 27214	The prime-counting functio...
ppinprm 27215	The prime-counting functio...
chtprm 27216	The Chebyshev function at ...
chtnprm 27217	The Chebyshev function at ...
chpp1 27218	The second Chebyshev funct...
chtwordi 27219	The Chebyshev function is ...
chpwordi 27220	The second Chebyshev funct...
chtdif 27221	The difference of the Cheb...
efchtdvds 27222	The exponentiated Chebyshe...
ppifl 27223	The prime-counting functio...
ppip1le 27224	The prime-counting functio...
ppiwordi 27225	The prime-counting functio...
ppidif 27226	The difference of the prim...
ppi1 27227	The prime-counting functio...
cht1 27228	The Chebyshev function at ...
vma1 27229	The von Mangoldt function ...
chp1 27230	The second Chebyshev funct...
ppi1i 27231	Inference form of ~ ppiprm...
ppi2i 27232	Inference form of ~ ppinpr...
ppi2 27233	The prime-counting functio...
ppi3 27234	The prime-counting functio...
cht2 27235	The Chebyshev function at ...
cht3 27236	The Chebyshev function at ...
ppinncl 27237	Closure of the prime-count...
chtrpcl 27238	Closure of the Chebyshev f...
ppieq0 27239	The prime-counting functio...
ppiltx 27240	The prime-counting functio...
prmorcht 27241	Relate the primorial (prod...
mumullem1 27242	Lemma for ~ mumul . A mul...
mumullem2 27243	Lemma for ~ mumul . The p...
mumul 27244	The Möbius function i...
sqff1o 27245	There is a bijection from ...
fsumdvdsdiaglem 27246	A "diagonal commutation" o...
fsumdvdsdiag 27247	A "diagonal commutation" o...
fsumdvdscom 27248	A double commutation of di...
dvdsppwf1o 27249	A bijection from the divis...
dvdsflf1o 27250	A bijection from the numbe...
dvdsflsumcom 27251	A sum commutation from ` s...
fsumfldivdiaglem 27252	Lemma for ~ fsumfldivdiag ...
fsumfldivdiag 27253	The right-hand side of ~ d...
musum 27254	The sum of the Möbius...
musumsum 27255	Evaluate a collapsing sum ...
muinv 27256	The Möbius inversion ...
mpodvdsmulf1o 27257	If ` M ` and ` N ` are two...
fsumdvdsmul 27258	Product of two divisor sum...
dvdsmulf1o 27259	If ` M ` and ` N ` are two...
fsumdvdsmulOLD 27260	Obsolete version of ~ fsum...
sgmppw 27261	The value of the divisor f...
0sgmppw 27262	A prime power ` P ^ K ` ha...
1sgmprm 27263	The sum of divisors for a ...
1sgm2ppw 27264	The sum of the divisors of...
sgmmul 27265	The divisor function for f...
ppiublem1 27266	Lemma for ~ ppiub . (Cont...
ppiublem2 27267	A prime greater than ` 3 `...
ppiub 27268	An upper bound on the prim...
vmalelog 27269	The von Mangoldt function ...
chtlepsi 27270	The first Chebyshev functi...
chprpcl 27271	Closure of the second Cheb...
chpeq0 27272	The second Chebyshev funct...
chteq0 27273	The first Chebyshev functi...
chtleppi 27274	Upper bound on the ` theta...
chtublem 27275	Lemma for ~ chtub . (Cont...
chtub 27276	An upper bound on the Cheb...
fsumvma 27277	Rewrite a sum over the von...
fsumvma2 27278	Apply ~ fsumvma for the co...
pclogsum 27279	The logarithmic analogue o...
vmasum 27280	The sum of the von Mangold...
logfac2 27281	Another expression for the...
chpval2 27282	Express the second Chebysh...
chpchtsum 27283	The second Chebyshev funct...
chpub 27284	An upper bound on the seco...
logfacubnd 27285	A simple upper bound on th...
logfaclbnd 27286	A lower bound on the logar...
logfacbnd3 27287	Show the stronger statemen...
logfacrlim 27288	Combine the estimates ~ lo...
logexprlim 27289	The sum ` sum_ n <_ x , lo...
logfacrlim2 27290	Write out ~ logfacrlim as ...
mersenne 27291	A Mersenne prime is a prim...
perfect1 27292	Euclid's contribution to t...
perfectlem1 27293	Lemma for ~ perfect . (Co...
perfectlem2 27294	Lemma for ~ perfect . (Co...
perfect 27295	The Euclid-Euler theorem, ...
dchrval 27298	Value of the group of Diri...
dchrbas 27299	Base set of the group of D...
dchrelbas 27300	A Dirichlet character is a...
dchrelbas2 27301	A Dirichlet character is a...
dchrelbas3 27302	A Dirichlet character is a...
dchrelbasd 27303	A Dirichlet character is a...
dchrrcl 27304	Reverse closure for a Diri...
dchrmhm 27305	A Dirichlet character is a...
dchrf 27306	A Dirichlet character is a...
dchrelbas4 27307	A Dirichlet character is a...
dchrzrh1 27308	Value of a Dirichlet chara...
dchrzrhcl 27309	A Dirichlet character take...
dchrzrhmul 27310	A Dirichlet character is c...
dchrplusg 27311	Group operation on the gro...
dchrmul 27312	Group operation on the gro...
dchrmulcl 27313	Closure of the group opera...
dchrn0 27314	A Dirichlet character is n...
dchr1cl 27315	Closure of the principal D...
dchrmullid 27316	Left identity for the prin...
dchrinvcl 27317	Closure of the group inver...
dchrabl 27318	The set of Dirichlet chara...
dchrfi 27319	The group of Dirichlet cha...
dchrghm 27320	A Dirichlet character rest...
dchr1 27321	Value of the principal Dir...
dchreq 27322	A Dirichlet character is d...
dchrresb 27323	A Dirichlet character is d...
dchrabs 27324	A Dirichlet character take...
dchrinv 27325	The inverse of a Dirichlet...
dchrabs2 27326	A Dirichlet character take...
dchr1re 27327	The principal Dirichlet ch...
dchrptlem1 27328	Lemma for ~ dchrpt . (Con...
dchrptlem2 27329	Lemma for ~ dchrpt . (Con...
dchrptlem3 27330	Lemma for ~ dchrpt . (Con...
dchrpt 27331	For any element other than...
dchrsum2 27332	An orthogonality relation ...
dchrsum 27333	An orthogonality relation ...
sumdchr2 27334	Lemma for ~ sumdchr . (Co...
dchrhash 27335	There are exactly ` phi ( ...
sumdchr 27336	An orthogonality relation ...
dchr2sum 27337	An orthogonality relation ...
sum2dchr 27338	An orthogonality relation ...
bcctr 27339	Value of the central binom...
pcbcctr 27340	Prime count of a central b...
bcmono 27341	The binomial coefficient i...
bcmax 27342	The binomial coefficient t...
bcp1ctr 27343	Ratio of two central binom...
bclbnd 27344	A bound on the binomial co...
efexple 27345	Convert a bound on a power...
bpos1lem 27346	Lemma for ~ bpos1 . (Cont...
bpos1 27347	Bertrand's postulate, chec...
bposlem1 27348	An upper bound on the prim...
bposlem2 27349	There are no odd primes in...
bposlem3 27350	Lemma for ~ bpos . Since ...
bposlem4 27351	Lemma for ~ bpos . (Contr...
bposlem5 27352	Lemma for ~ bpos . Bound ...
bposlem6 27353	Lemma for ~ bpos . By usi...
bposlem7 27354	Lemma for ~ bpos . The fu...
bposlem8 27355	Lemma for ~ bpos . Evalua...
bposlem9 27356	Lemma for ~ bpos . Derive...
bpos 27357	Bertrand's postulate: ther...
zabsle1 27360	` { -u 1 , 0 , 1 } ` is th...
lgslem1 27361	When ` a ` is coprime to t...
lgslem2 27362	The set ` Z ` of all integ...
lgslem3 27363	The set ` Z ` of all integ...
lgslem4 27364	Lemma for ~ lgsfcl2 . (Co...
lgsval 27365	Value of the Legendre symb...
lgsfval 27366	Value of the function ` F ...
lgsfcl2 27367	The function ` F ` is clos...
lgscllem 27368	The Legendre symbol is an ...
lgsfcl 27369	Closure of the function ` ...
lgsfle1 27370	The function ` F ` has mag...
lgsval2lem 27371	Lemma for ~ lgsval2 . (Co...
lgsval4lem 27372	Lemma for ~ lgsval4 . (Co...
lgscl2 27373	The Legendre symbol is an ...
lgs0 27374	The Legendre symbol when t...
lgscl 27375	The Legendre symbol is an ...
lgsle1 27376	The Legendre symbol has ab...
lgsval2 27377	The Legendre symbol at a p...
lgs2 27378	The Legendre symbol at ` 2...
lgsval3 27379	The Legendre symbol at an ...
lgsvalmod 27380	The Legendre symbol is equ...
lgsval4 27381	Restate ~ lgsval for nonze...
lgsfcl3 27382	Closure of the function ` ...
lgsval4a 27383	Same as ~ lgsval4 for posi...
lgscl1 27384	The value of the Legendre ...
lgsneg 27385	The Legendre symbol is eit...
lgsneg1 27386	The Legendre symbol for no...
lgsmod 27387	The Legendre (Jacobi) symb...
lgsdilem 27388	Lemma for ~ lgsdi and ~ lg...
lgsdir2lem1 27389	Lemma for ~ lgsdir2 . (Co...
lgsdir2lem2 27390	Lemma for ~ lgsdir2 . (Co...
lgsdir2lem3 27391	Lemma for ~ lgsdir2 . (Co...
lgsdir2lem4 27392	Lemma for ~ lgsdir2 . (Co...
lgsdir2lem5 27393	Lemma for ~ lgsdir2 . (Co...
lgsdir2 27394	The Legendre symbol is com...
lgsdirprm 27395	The Legendre symbol is com...
lgsdir 27396	The Legendre symbol is com...
lgsdilem2 27397	Lemma for ~ lgsdi . (Cont...
lgsdi 27398	The Legendre symbol is com...
lgsne0 27399	The Legendre symbol is non...
lgsabs1 27400	The Legendre symbol is non...
lgssq 27401	The Legendre symbol at a s...
lgssq2 27402	The Legendre symbol at a s...
lgsprme0 27403	The Legendre symbol at any...
1lgs 27404	The Legendre symbol at ` 1...
lgs1 27405	The Legendre symbol at ` 1...
lgsmodeq 27406	The Legendre (Jacobi) symb...
lgsmulsqcoprm 27407	The Legendre (Jacobi) symb...
lgsdirnn0 27408	Variation on ~ lgsdir vali...
lgsdinn0 27409	Variation on ~ lgsdi valid...
lgsqrlem1 27410	Lemma for ~ lgsqr . (Cont...
lgsqrlem2 27411	Lemma for ~ lgsqr . (Cont...
lgsqrlem3 27412	Lemma for ~ lgsqr . (Cont...
lgsqrlem4 27413	Lemma for ~ lgsqr . (Cont...
lgsqrlem5 27414	Lemma for ~ lgsqr . (Cont...
lgsqr 27415	The Legendre symbol for od...
lgsqrmod 27416	If the Legendre symbol of ...
lgsqrmodndvds 27417	If the Legendre symbol of ...
lgsdchrval 27418	The Legendre symbol functi...
lgsdchr 27419	The Legendre symbol functi...
gausslemma2dlem0a 27420	Auxiliary lemma 1 for ~ ga...
gausslemma2dlem0b 27421	Auxiliary lemma 2 for ~ ga...
gausslemma2dlem0c 27422	Auxiliary lemma 3 for ~ ga...
gausslemma2dlem0d 27423	Auxiliary lemma 4 for ~ ga...
gausslemma2dlem0e 27424	Auxiliary lemma 5 for ~ ga...
gausslemma2dlem0f 27425	Auxiliary lemma 6 for ~ ga...
gausslemma2dlem0g 27426	Auxiliary lemma 7 for ~ ga...
gausslemma2dlem0h 27427	Auxiliary lemma 8 for ~ ga...
gausslemma2dlem0i 27428	Auxiliary lemma 9 for ~ ga...
gausslemma2dlem1a 27429	Lemma for ~ gausslemma2dle...
gausslemma2dlem1 27430	Lemma 1 for ~ gausslemma2d...
gausslemma2dlem2 27431	Lemma 2 for ~ gausslemma2d...
gausslemma2dlem3 27432	Lemma 3 for ~ gausslemma2d...
gausslemma2dlem4 27433	Lemma 4 for ~ gausslemma2d...
gausslemma2dlem5a 27434	Lemma for ~ gausslemma2dle...
gausslemma2dlem5 27435	Lemma 5 for ~ gausslemma2d...
gausslemma2dlem6 27436	Lemma 6 for ~ gausslemma2d...
gausslemma2dlem7 27437	Lemma 7 for ~ gausslemma2d...
gausslemma2d 27438	Gauss' Lemma (see also the...
lgseisenlem1 27439	Lemma for ~ lgseisen . If...
lgseisenlem2 27440	Lemma for ~ lgseisen . Th...
lgseisenlem3 27441	Lemma for ~ lgseisen . (C...
lgseisenlem4 27442	Lemma for ~ lgseisen . (C...
lgseisen 27443	Eisenstein's lemma, an exp...
lgsquadlem1 27444	Lemma for ~ lgsquad . Cou...
lgsquadlem2 27445	Lemma for ~ lgsquad . Cou...
lgsquadlem3 27446	Lemma for ~ lgsquad . (Co...
lgsquad 27447	The Law of Quadratic Recip...
lgsquad2lem1 27448	Lemma for ~ lgsquad2 . (C...
lgsquad2lem2 27449	Lemma for ~ lgsquad2 . (C...
lgsquad2 27450	Extend ~ lgsquad to coprim...
lgsquad3 27451	Extend ~ lgsquad2 to integ...
m1lgs 27452	The first supplement to th...
2lgslem1a1 27453	Lemma 1 for ~ 2lgslem1a . ...
2lgslem1a2 27454	Lemma 2 for ~ 2lgslem1a . ...
2lgslem1a 27455	Lemma 1 for ~ 2lgslem1 . ...
2lgslem1b 27456	Lemma 2 for ~ 2lgslem1 . ...
2lgslem1c 27457	Lemma 3 for ~ 2lgslem1 . ...
2lgslem1 27458	Lemma 1 for ~ 2lgs . (Con...
2lgslem2 27459	Lemma 2 for ~ 2lgs . (Con...
2lgslem3a 27460	Lemma for ~ 2lgslem3a1 . ...
2lgslem3b 27461	Lemma for ~ 2lgslem3b1 . ...
2lgslem3c 27462	Lemma for ~ 2lgslem3c1 . ...
2lgslem3d 27463	Lemma for ~ 2lgslem3d1 . ...
2lgslem3a1 27464	Lemma 1 for ~ 2lgslem3 . ...
2lgslem3b1 27465	Lemma 2 for ~ 2lgslem3 . ...
2lgslem3c1 27466	Lemma 3 for ~ 2lgslem3 . ...
2lgslem3d1 27467	Lemma 4 for ~ 2lgslem3 . ...
2lgslem3 27468	Lemma 3 for ~ 2lgs . (Con...
2lgs2 27469	The Legendre symbol for ` ...
2lgslem4 27470	Lemma 4 for ~ 2lgs : speci...
2lgs 27471	The second supplement to t...
2lgsoddprmlem1 27472	Lemma 1 for ~ 2lgsoddprm ....
2lgsoddprmlem2 27473	Lemma 2 for ~ 2lgsoddprm ....
2lgsoddprmlem3a 27474	Lemma 1 for ~ 2lgsoddprmle...
2lgsoddprmlem3b 27475	Lemma 2 for ~ 2lgsoddprmle...
2lgsoddprmlem3c 27476	Lemma 3 for ~ 2lgsoddprmle...
2lgsoddprmlem3d 27477	Lemma 4 for ~ 2lgsoddprmle...
2lgsoddprmlem3 27478	Lemma 3 for ~ 2lgsoddprm ....
2lgsoddprmlem4 27479	Lemma 4 for ~ 2lgsoddprm ....
2lgsoddprm 27480	The second supplement to t...
2sqlem1 27481	Lemma for ~ 2sq . (Contri...
2sqlem2 27482	Lemma for ~ 2sq . (Contri...
mul2sq 27483	Fibonacci's identity (actu...
2sqlem3 27484	Lemma for ~ 2sqlem5 . (Co...
2sqlem4 27485	Lemma for ~ 2sqlem5 . (Co...
2sqlem5 27486	Lemma for ~ 2sq . If a nu...
2sqlem6 27487	Lemma for ~ 2sq . If a nu...
2sqlem7 27488	Lemma for ~ 2sq . (Contri...
2sqlem8a 27489	Lemma for ~ 2sqlem8 . (Co...
2sqlem8 27490	Lemma for ~ 2sq . (Contri...
2sqlem9 27491	Lemma for ~ 2sq . (Contri...
2sqlem10 27492	Lemma for ~ 2sq . Every f...
2sqlem11 27493	Lemma for ~ 2sq . (Contri...
2sq 27494	All primes of the form ` 4...
2sqblem 27495	Lemma for ~ 2sqb . (Contr...
2sqb 27496	The converse to ~ 2sq . (...
2sq2 27497	` 2 ` is the sum of square...
2sqn0 27498	If the sum of two squares ...
2sqcoprm 27499	If the sum of two squares ...
2sqmod 27500	Given two decompositions o...
2sqmo 27501	There exists at most one d...
2sqnn0 27502	All primes of the form ` 4...
2sqnn 27503	All primes of the form ` 4...
addsq2reu 27504	For each complex number ` ...
addsqn2reu 27505	For each complex number ` ...
addsqrexnreu 27506	For each complex number, t...
addsqnreup 27507	There is no unique decompo...
addsq2nreurex 27508	For each complex number ` ...
addsqn2reurex2 27509	For each complex number ` ...
2sqreulem1 27510	Lemma 1 for ~ 2sqreu . (C...
2sqreultlem 27511	Lemma for ~ 2sqreult . (C...
2sqreultblem 27512	Lemma for ~ 2sqreultb . (...
2sqreunnlem1 27513	Lemma 1 for ~ 2sqreunn . ...
2sqreunnltlem 27514	Lemma for ~ 2sqreunnlt . ...
2sqreunnltblem 27515	Lemma for ~ 2sqreunnltb . ...
2sqreulem2 27516	Lemma 2 for ~ 2sqreu etc. ...
2sqreulem3 27517	Lemma 3 for ~ 2sqreu etc. ...
2sqreulem4 27518	Lemma 4 for ~ 2sqreu et. ...
2sqreunnlem2 27519	Lemma 2 for ~ 2sqreunn . ...
2sqreu 27520	There exists a unique deco...
2sqreunn 27521	There exists a unique deco...
2sqreult 27522	There exists a unique deco...
2sqreultb 27523	There exists a unique deco...
2sqreunnlt 27524	There exists a unique deco...
2sqreunnltb 27525	There exists a unique deco...
2sqreuop 27526	There exists a unique deco...
2sqreuopnn 27527	There exists a unique deco...
2sqreuoplt 27528	There exists a unique deco...
2sqreuopltb 27529	There exists a unique deco...
2sqreuopnnlt 27530	There exists a unique deco...
2sqreuopnnltb 27531	There exists a unique deco...
2sqreuopb 27532	There exists a unique deco...
chebbnd1lem1 27533	Lemma for ~ chebbnd1 : sho...
chebbnd1lem2 27534	Lemma for ~ chebbnd1 : Sh...
chebbnd1lem3 27535	Lemma for ~ chebbnd1 : get...
chebbnd1 27536	The Chebyshev bound: The ...
chtppilimlem1 27537	Lemma for ~ chtppilim . (...
chtppilimlem2 27538	Lemma for ~ chtppilim . (...
chtppilim 27539	The ` theta ` function is ...
chto1ub 27540	The ` theta ` function is ...
chebbnd2 27541	The Chebyshev bound, part ...
chto1lb 27542	The ` theta ` function is ...
chpchtlim 27543	The ` psi ` and ` theta ` ...
chpo1ub 27544	The ` psi ` function is up...
chpo1ubb 27545	The ` psi ` function is up...
vmadivsum 27546	The sum of the von Mangold...
vmadivsumb 27547	Give a total bound on the ...
rplogsumlem1 27548	Lemma for ~ rplogsum . (C...
rplogsumlem2 27549	Lemma for ~ rplogsum . Eq...
dchrisum0lem1a 27550	Lemma for ~ dchrisum0lem1 ...
rpvmasumlem 27551	Lemma for ~ rpvmasum . Ca...
dchrisumlema 27552	Lemma for ~ dchrisum . Le...
dchrisumlem1 27553	Lemma for ~ dchrisum . Le...
dchrisumlem2 27554	Lemma for ~ dchrisum . Le...
dchrisumlem3 27555	Lemma for ~ dchrisum . Le...
dchrisum 27556	If ` n e. [ M , +oo ) |-> ...
dchrmusumlema 27557	Lemma for ~ dchrmusum and ...
dchrmusum2 27558	The sum of the Möbius...
dchrvmasumlem1 27559	An alternative expression ...
dchrvmasum2lem 27560	Give an expression for ` l...
dchrvmasum2if 27561	Combine the results of ~ d...
dchrvmasumlem2 27562	Lemma for ~ dchrvmasum . ...
dchrvmasumlem3 27563	Lemma for ~ dchrvmasum . ...
dchrvmasumlema 27564	Lemma for ~ dchrvmasum and...
dchrvmasumiflem1 27565	Lemma for ~ dchrvmasumif ....
dchrvmasumiflem2 27566	Lemma for ~ dchrvmasum . ...
dchrvmasumif 27567	An asymptotic approximatio...
dchrvmaeq0 27568	The set ` W ` is the colle...
dchrisum0fval 27569	Value of the function ` F ...
dchrisum0fmul 27570	The function ` F ` , the d...
dchrisum0ff 27571	The function ` F ` is a re...
dchrisum0flblem1 27572	Lemma for ~ dchrisum0flb ....
dchrisum0flblem2 27573	Lemma for ~ dchrisum0flb ....
dchrisum0flb 27574	The divisor sum of a real ...
dchrisum0fno1 27575	The sum ` sum_ k <_ x , F ...
rpvmasum2 27576	A partial result along the...
dchrisum0re 27577	Suppose ` X ` is a non-pri...
dchrisum0lema 27578	Lemma for ~ dchrisum0 . A...
dchrisum0lem1b 27579	Lemma for ~ dchrisum0lem1 ...
dchrisum0lem1 27580	Lemma for ~ dchrisum0 . (...
dchrisum0lem2a 27581	Lemma for ~ dchrisum0 . (...
dchrisum0lem2 27582	Lemma for ~ dchrisum0 . (...
dchrisum0lem3 27583	Lemma for ~ dchrisum0 . (...
dchrisum0 27584	The sum ` sum_ n e. NN , X...
dchrisumn0 27585	The sum ` sum_ n e. NN , X...
dchrmusumlem 27586	The sum of the Möbius...
dchrvmasumlem 27587	The sum of the Möbius...
dchrmusum 27588	The sum of the Möbius...
dchrvmasum 27589	The sum of the von Mangold...
rpvmasum 27590	The sum of the von Mangold...
rplogsum 27591	The sum of ` log p / p ` o...
dirith2 27592	Dirichlet's theorem: there...
dirith 27593	Dirichlet's theorem: there...
mudivsum 27594	Asymptotic formula for ` s...
mulogsumlem 27595	Lemma for ~ mulogsum . (C...
mulogsum 27596	Asymptotic formula for ...
logdivsum 27597	Asymptotic analysis of ...
mulog2sumlem1 27598	Asymptotic formula for ...
mulog2sumlem2 27599	Lemma for ~ mulog2sum . (...
mulog2sumlem3 27600	Lemma for ~ mulog2sum . (...
mulog2sum 27601	Asymptotic formula for ...
vmalogdivsum2 27602	The sum ` sum_ n <_ x , La...
vmalogdivsum 27603	The sum ` sum_ n <_ x , La...
2vmadivsumlem 27604	Lemma for ~ 2vmadivsum . ...
2vmadivsum 27605	The sum ` sum_ m n <_ x , ...
logsqvma 27606	A formula for ` log ^ 2 ( ...
logsqvma2 27607	The Möbius inverse of...
log2sumbnd 27608	Bound on the difference be...
selberglem1 27609	Lemma for ~ selberg . Est...
selberglem2 27610	Lemma for ~ selberg . (Co...
selberglem3 27611	Lemma for ~ selberg . Est...
selberg 27612	Selberg's symmetry formula...
selbergb 27613	Convert eventual boundedne...
selberg2lem 27614	Lemma for ~ selberg2 . Eq...
selberg2 27615	Selberg's symmetry formula...
selberg2b 27616	Convert eventual boundedne...
chpdifbndlem1 27617	Lemma for ~ chpdifbnd . (...
chpdifbndlem2 27618	Lemma for ~ chpdifbnd . (...
chpdifbnd 27619	A bound on the difference ...
logdivbnd 27620	A bound on a sum of logs, ...
selberg3lem1 27621	Introduce a log weighting ...
selberg3lem2 27622	Lemma for ~ selberg3 . Eq...
selberg3 27623	Introduce a log weighting ...
selberg4lem1 27624	Lemma for ~ selberg4 . Eq...
selberg4 27625	The Selberg symmetry formu...
pntrval 27626	Define the residual of the...
pntrf 27627	Functionality of the resid...
pntrmax 27628	There is a bound on the re...
pntrsumo1 27629	A bound on a sum over ` R ...
pntrsumbnd 27630	A bound on a sum over ` R ...
pntrsumbnd2 27631	A bound on a sum over ` R ...
selbergr 27632	Selberg's symmetry formula...
selberg3r 27633	Selberg's symmetry formula...
selberg4r 27634	Selberg's symmetry formula...
selberg34r 27635	The sum of ~ selberg3r and...
pntsval 27636	Define the "Selberg functi...
pntsf 27637	Functionality of the Selbe...
selbergs 27638	Selberg's symmetry formula...
selbergsb 27639	Selberg's symmetry formula...
pntsval2 27640	The Selberg function can b...
pntrlog2bndlem1 27641	The sum of ~ selberg3r and...
pntrlog2bndlem2 27642	Lemma for ~ pntrlog2bnd . ...
pntrlog2bndlem3 27643	Lemma for ~ pntrlog2bnd . ...
pntrlog2bndlem4 27644	Lemma for ~ pntrlog2bnd . ...
pntrlog2bndlem5 27645	Lemma for ~ pntrlog2bnd . ...
pntrlog2bndlem6a 27646	Lemma for ~ pntrlog2bndlem...
pntrlog2bndlem6 27647	Lemma for ~ pntrlog2bnd . ...
pntrlog2bnd 27648	A bound on ` R ( x ) log ^...
pntpbnd1a 27649	Lemma for ~ pntpbnd . (Co...
pntpbnd1 27650	Lemma for ~ pntpbnd . (Co...
pntpbnd2 27651	Lemma for ~ pntpbnd . (Co...
pntpbnd 27652	Lemma for ~ pnt . Establi...
pntibndlem1 27653	Lemma for ~ pntibnd . (Co...
pntibndlem2a 27654	Lemma for ~ pntibndlem2 . ...
pntibndlem2 27655	Lemma for ~ pntibnd . The...
pntibndlem3 27656	Lemma for ~ pntibnd . Pac...
pntibnd 27657	Lemma for ~ pnt . Establi...
pntlemd 27658	Lemma for ~ pnt . Closure...
pntlemc 27659	Lemma for ~ pnt . Closure...
pntlema 27660	Lemma for ~ pnt . Closure...
pntlemb 27661	Lemma for ~ pnt . Unpack ...
pntlemg 27662	Lemma for ~ pnt . Closure...
pntlemh 27663	Lemma for ~ pnt . Bounds ...
pntlemn 27664	Lemma for ~ pnt . The "na...
pntlemq 27665	Lemma for ~ pntlemj . (Co...
pntlemr 27666	Lemma for ~ pntlemj . (Co...
pntlemj 27667	Lemma for ~ pnt . The ind...
pntlemi 27668	Lemma for ~ pnt . Elimina...
pntlemf 27669	Lemma for ~ pnt . Add up ...
pntlemk 27670	Lemma for ~ pnt . Evaluat...
pntlemo 27671	Lemma for ~ pnt . Combine...
pntleme 27672	Lemma for ~ pnt . Package...
pntlem3 27673	Lemma for ~ pnt . Equatio...
pntlemp 27674	Lemma for ~ pnt . Wrappin...
pntleml 27675	Lemma for ~ pnt . Equatio...
pnt3 27676	The Prime Number Theorem, ...
pnt2 27677	The Prime Number Theorem, ...
pnt 27678	The Prime Number Theorem: ...
abvcxp 27679	Raising an absolute value ...
padicfval 27680	Value of the p-adic absolu...
padicval 27681	Value of the p-adic absolu...
ostth2lem1 27682	Lemma for ~ ostth2 , altho...
qrngbas 27683	The base set of the field ...
qdrng 27684	The rationals form a divis...
qrng0 27685	The zero element of the fi...
qrng1 27686	The unity element of the f...
qrngneg 27687	The additive inverse in th...
qrngdiv 27688	The division operation in ...
qabvle 27689	By using induction on ` N ...
qabvexp 27690	Induct the product rule ~ ...
ostthlem1 27691	Lemma for ~ ostth . If tw...
ostthlem2 27692	Lemma for ~ ostth . Refin...
qabsabv 27693	The regular absolute value...
padicabv 27694	The p-adic absolute value ...
padicabvf 27695	The p-adic absolute value ...
padicabvcxp 27696	All positive powers of the...
ostth1 27697	- Lemma for ~ ostth : triv...
ostth2lem2 27698	Lemma for ~ ostth2 . (Con...
ostth2lem3 27699	Lemma for ~ ostth2 . (Con...
ostth2lem4 27700	Lemma for ~ ostth2 . (Con...
ostth2 27701	- Lemma for ~ ostth : regu...
ostth3 27702	- Lemma for ~ ostth : p-ad...
ostth 27703	Ostrowski's theorem, which...
elno 27710	Membership in the surreals...
elnoOLD 27711	Obsolete version of ~ elno...
sltval 27712	The value of the surreal l...
bdayval 27713	The value of the birthday ...
nofun 27714	A surreal is a function. ...
nodmon 27715	The domain of a surreal is...
norn 27716	The range of a surreal is ...
nofnbday 27717	A surreal is a function ov...
nodmord 27718	The domain of a surreal ha...
elno2 27719	An alternative condition f...
elno3 27720	Another condition for memb...
sltval2 27721	Alternate expression for s...
nofv 27722	The function value of a su...
nosgnn0 27723	` (/) ` is not a surreal s...
nosgnn0i 27724	If ` X ` is a surreal sign...
noreson 27725	The restriction of a surre...
sltintdifex 27726	If ` A
sltres 27727	If the restrictions of two...
noxp1o 27728	The Cartesian product of a...
noseponlem 27729	Lemma for ~ nosepon . Con...
nosepon 27730	Given two unequal surreals...
noextend 27731	Extending a surreal by one...
noextendseq 27732	Extend a surreal by a sequ...
noextenddif 27733	Calculate the place where ...
noextendlt 27734	Extending a surreal with a...
noextendgt 27735	Extending a surreal with a...
nolesgn2o 27736	Given ` A ` less-than or e...
nolesgn2ores 27737	Given ` A ` less-than or e...
nogesgn1o 27738	Given ` A ` greater than o...
nogesgn1ores 27739	Given ` A ` greater than o...
sltsolem1 27740	Lemma for ~ sltso . The "...
sltso 27741	Less-than totally orders t...
bdayfo 27742	The birthday function maps...
fvnobday 27743	The value of a surreal at ...
nosepnelem 27744	Lemma for ~ nosepne . (Co...
nosepne 27745	The value of two non-equal...
nosep1o 27746	If the value of a surreal ...
nosep2o 27747	If the value of a surreal ...
nosepdmlem 27748	Lemma for ~ nosepdm . (Co...
nosepdm 27749	The first place two surrea...
nosepeq 27750	The values of two surreals...
nosepssdm 27751	Given two non-equal surrea...
nodenselem4 27752	Lemma for ~ nodense . Sho...
nodenselem5 27753	Lemma for ~ nodense . If ...
nodenselem6 27754	The restriction of a surre...
nodenselem7 27755	Lemma for ~ nodense . ` A ...
nodenselem8 27756	Lemma for ~ nodense . Giv...
nodense 27757	Given two distinct surreal...
bdayimaon 27758	Lemma for full-eta propert...
nolt02olem 27759	Lemma for ~ nolt02o . If ...
nolt02o 27760	Given ` A ` less-than ` B ...
nogt01o 27761	Given ` A ` greater than `...
noresle 27762	Restriction law for surrea...
nomaxmo 27763	A class of surreals has at...
nominmo 27764	A class of surreals has at...
nosupprefixmo 27765	In any class of surreals, ...
noinfprefixmo 27766	In any class of surreals, ...
nosupcbv 27767	Lemma to change bound vari...
nosupno 27768	The next several theorems ...
nosupdm 27769	The domain of the surreal ...
nosupbday 27770	Birthday bounding law for ...
nosupfv 27771	The value of surreal supre...
nosupres 27772	A restriction law for surr...
nosupbnd1lem1 27773	Lemma for ~ nosupbnd1 . E...
nosupbnd1lem2 27774	Lemma for ~ nosupbnd1 . W...
nosupbnd1lem3 27775	Lemma for ~ nosupbnd1 . I...
nosupbnd1lem4 27776	Lemma for ~ nosupbnd1 . I...
nosupbnd1lem5 27777	Lemma for ~ nosupbnd1 . I...
nosupbnd1lem6 27778	Lemma for ~ nosupbnd1 . E...
nosupbnd1 27779	Bounding law from below fo...
nosupbnd2lem1 27780	Bounding law from above wh...
nosupbnd2 27781	Bounding law from above fo...
noinfcbv 27782	Change bound variables for...
noinfno 27783	The next several theorems ...
noinfdm 27784	Next, we calculate the dom...
noinfbday 27785	Birthday bounding law for ...
noinffv 27786	The value of surreal infim...
noinfres 27787	The restriction of surreal...
noinfbnd1lem1 27788	Lemma for ~ noinfbnd1 . E...
noinfbnd1lem2 27789	Lemma for ~ noinfbnd1 . W...
noinfbnd1lem3 27790	Lemma for ~ noinfbnd1 . I...
noinfbnd1lem4 27791	Lemma for ~ noinfbnd1 . I...
noinfbnd1lem5 27792	Lemma for ~ noinfbnd1 . I...
noinfbnd1lem6 27793	Lemma for ~ noinfbnd1 . E...
noinfbnd1 27794	Bounding law from above fo...
noinfbnd2lem1 27795	Bounding law from below wh...
noinfbnd2 27796	Bounding law from below fo...
nosupinfsep 27797	Given two sets of surreals...
noetasuplem1 27798	Lemma for ~ noeta . Estab...
noetasuplem2 27799	Lemma for ~ noeta . The r...
noetasuplem3 27800	Lemma for ~ noeta . ` Z ` ...
noetasuplem4 27801	Lemma for ~ noeta . When ...
noetainflem1 27802	Lemma for ~ noeta . Estab...
noetainflem2 27803	Lemma for ~ noeta . The r...
noetainflem3 27804	Lemma for ~ noeta . ` W ` ...
noetainflem4 27805	Lemma for ~ noeta . If ` ...
noetalem1 27806	Lemma for ~ noeta . Eithe...
noetalem2 27807	Lemma for ~ noeta . The f...
noeta 27808	The full-eta axiom for the...
sltirr 27811	Surreal less-than is irref...
slttr 27812	Surreal less-than is trans...
sltasym 27813	Surreal less-than is asymm...
sltlin 27814	Surreal less-than obeys tr...
slttrieq2 27815	Trichotomy law for surreal...
slttrine 27816	Trichotomy law for surreal...
slenlt 27817	Surreal less-than or equal...
sltnle 27818	Surreal less-than in terms...
sleloe 27819	Surreal less-than or equal...
sletri3 27820	Trichotomy law for surreal...
sltletr 27821	Surreal transitive law. (...
slelttr 27822	Surreal transitive law. (...
sletr 27823	Surreal transitive law. (...
slttrd 27824	Surreal less-than is trans...
sltletrd 27825	Surreal less-than is trans...
slelttrd 27826	Surreal less-than is trans...
sletrd 27827	Surreal less-than or equal...
slerflex 27828	Surreal less-than or equal...
sletric 27829	Surreal trichotomy law. (...
maxs1 27830	A surreal is less than or ...
maxs2 27831	A surreal is less than or ...
mins1 27832	The minimum of two surreal...
mins2 27833	The minimum of two surreal...
sltled 27834	Surreal less-than implies ...
sltne 27835	Surreal less-than implies ...
sltlend 27836	Surreal less-than in terms...
bdayfun 27837	The birthday function is a...
bdayfn 27838	The birthday function is a...
bdaydm 27839	The birthday function's do...
bdayrn 27840	The birthday function's ra...
bdayelon 27841	The value of the birthday ...
nocvxminlem 27842	Lemma for ~ nocvxmin . Gi...
nocvxmin 27843	Given a nonempty convex cl...
noprc 27844	The surreal numbers are a ...
noeta2 27849	A version of ~ noeta with ...
brsslt 27850	Binary relation form of th...
ssltex1 27851	The first argument of surr...
ssltex2 27852	The second argument of sur...
ssltss1 27853	The first argument of surr...
ssltss2 27854	The second argument of sur...
ssltsep 27855	The separation property of...
ssltd 27856	Deduce surreal set less-th...
ssltsn 27857	Surreal set less-than of t...
ssltsepc 27858	Two elements of separated ...
ssltsepcd 27859	Two elements of separated ...
sssslt1 27860	Relation between surreal s...
sssslt2 27861	Relation between surreal s...
nulsslt 27862	The empty set is less-than...
nulssgt 27863	The empty set is greater t...
conway 27864	Conway's Simplicity Theore...
scutval 27865	The value of the surreal c...
scutcut 27866	Cut properties of the surr...
scutcl 27867	Closure law for surreal cu...
scutcld 27868	Closure law for surreal cu...
scutbday 27869	The birthday of the surrea...
eqscut 27870	Condition for equality to ...
eqscut2 27871	Condition for equality to ...
sslttr 27872	Transitive law for surreal...
ssltun1 27873	Union law for surreal set ...
ssltun2 27874	Union law for surreal set ...
scutun12 27875	Union law for surreal cuts...
dmscut 27876	The domain of the surreal ...
scutf 27877	Functionality statement fo...
etasslt 27878	A restatement of ~ noeta u...
etasslt2 27879	A version of ~ etasslt wit...
scutbdaybnd 27880	An upper bound on the birt...
scutbdaybnd2 27881	An upper bound on the birt...
scutbdaybnd2lim 27882	An upper bound on the birt...
scutbdaylt 27883	If a surreal lies in a gap...
slerec 27884	A comparison law for surre...
sltrec 27885	A comparison law for surre...
ssltdisj 27886	If ` A ` preceeds ` B ` , ...
0sno 27891	Surreal zero is a surreal....
1sno 27892	Surreal one is a surreal. ...
bday0s 27893	Calculate the birthday of ...
0slt1s 27894	Surreal zero is less than ...
bday0b 27895	The only surreal with birt...
bday1s 27896	The birthday of surreal on...
cuteq0 27897	Condition for a surreal cu...
cuteq1 27898	Condition for a surreal cu...
sgt0ne0 27899	A positive surreal is not ...
sgt0ne0d 27900	A positive surreal is not ...
madeval 27911	The value of the made by f...
madeval2 27912	Alternative characterizati...
oldval 27913	The value of the old optio...
newval 27914	The value of the new optio...
madef 27915	The made function is a fun...
oldf 27916	The older function is a fu...
newf 27917	The new function is a func...
old0 27918	No surreal is older than `...
madessno 27919	Made sets are surreals. (...
oldssno 27920	Old sets are surreals. (C...
newssno 27921	New sets are surreals. (C...
leftval 27922	The value of the left opti...
rightval 27923	The value of the right opt...
leftf 27924	The functionality of the l...
rightf 27925	The functionality of the r...
elmade 27926	Membership in the made fun...
elmade2 27927	Membership in the made fun...
elold 27928	Membership in an old set. ...
ssltleft 27929	A surreal is greater than ...
ssltright 27930	A surreal is less than its...
lltropt 27931	The left options of a surr...
made0 27932	The only surreal made on d...
new0 27933	The only surreal new on da...
old1 27934	The only surreal older tha...
madess 27935	If ` A ` is less than or e...
oldssmade 27936	The older-than set is a su...
leftssold 27937	The left options are a sub...
rightssold 27938	The right options are a su...
leftssno 27939	The left set of a surreal ...
rightssno 27940	The right set of a surreal...
madecut 27941	Given a section that is a ...
madeun 27942	The made set is the union ...
madeoldsuc 27943	The made set is the old se...
oldsuc 27944	The value of the old set a...
oldlim 27945	The value of the old set a...
madebdayim 27946	If a surreal is a member o...
oldbdayim 27947	If ` X ` is in the old set...
oldirr 27948	No surreal is a member of ...
leftirr 27949	No surreal is a member of ...
rightirr 27950	No surreal is a member of ...
left0s 27951	The left set of ` 0s ` is ...
right0s 27952	The right set of ` 0s ` is...
left1s 27953	The left set of ` 1s ` is ...
right1s 27954	The right set of ` 1s ` is...
lrold 27955	The union of the left and ...
madebdaylemold 27956	Lemma for ~ madebday . If...
madebdaylemlrcut 27957	Lemma for ~ madebday . If...
madebday 27958	A surreal is part of the s...
oldbday 27959	A surreal is part of the s...
newbday 27960	A surreal is an element of...
lrcut 27961	A surreal is equal to the ...
scutfo 27962	The surreal cut function i...
sltn0 27963	If ` X ` is less than ` Y ...
lruneq 27964	If two surreals share a bi...
sltlpss 27965	If two surreals share a bi...
slelss 27966	If two surreals ` A ` and ...
0elold 27967	Zero is in the old set of ...
0elleft 27968	Zero is in the left set of...
0elright 27969	Zero is in the right set o...
madefi 27970	The made set of an ordinal...
oldfi 27971	The old set of an ordinal ...
cofsslt 27972	If every element of ` A ` ...
coinitsslt 27973	If ` B ` is coinitial with...
cofcut1 27974	If ` C ` is cofinal with `...
cofcut1d 27975	If ` C ` is cofinal with `...
cofcut2 27976	If ` A ` and ` C ` are mut...
cofcut2d 27977	If ` A ` and ` C ` are mut...
cofcutr 27978	If ` X ` is the cut of ` A...
cofcutr1d 27979	If ` X ` is the cut of ` A...
cofcutr2d 27980	If ` X ` is the cut of ` A...
cofcutrtime 27981	If ` X ` is the cut of ` A...
cofcutrtime1d 27982	If ` X ` is a timely cut o...
cofcutrtime2d 27983	If ` X ` is a timely cut o...
cofss 27984	Cofinality for a subset. ...
coiniss 27985	Coinitiality for a subset....
cutlt 27986	Eliminating all elements b...
cutpos 27987	Reduce the elements of a c...
cutmax 27988	If ` A ` has a maximum, th...
cutmin 27989	If ` B ` has a minimum, th...
lrrecval 27992	The next step in the devel...
lrrecval2 27993	Next, we establish an alte...
lrrecpo 27994	Now, we establish that ` R...
lrrecse 27995	Next, we show that ` R ` i...
lrrecfr 27996	Now we show that ` R ` is ...
lrrecpred 27997	Finally, we calculate the ...
noinds 27998	Induction principle for a ...
norecfn 27999	Surreal recursion over one...
norecov 28000	Calculate the value of the...
noxpordpo 28003	To get through most of the...
noxpordfr 28004	Next we establish the foun...
noxpordse 28005	Next we establish the set-...
noxpordpred 28006	Next we calculate the pred...
no2indslem 28007	Double induction on surrea...
no2inds 28008	Double induction on surrea...
norec2fn 28009	The double-recursion opera...
norec2ov 28010	The value of the double-re...
no3inds 28011	Triple induction over surr...
addsfn 28014	Surreal addition is a func...
addsval 28015	The value of surreal addit...
addsval2 28016	The value of surreal addit...
addsrid 28017	Surreal addition to zero i...
addsridd 28018	Surreal addition to zero i...
addscom 28019	Surreal addition commutes....
addscomd 28020	Surreal addition commutes....
addslid 28021	Surreal addition to zero i...
addsproplem1 28022	Lemma for surreal addition...
addsproplem2 28023	Lemma for surreal addition...
addsproplem3 28024	Lemma for surreal addition...
addsproplem4 28025	Lemma for surreal addition...
addsproplem5 28026	Lemma for surreal addition...
addsproplem6 28027	Lemma for surreal addition...
addsproplem7 28028	Lemma for surreal addition...
addsprop 28029	Inductively show that surr...
addscutlem 28030	Lemma for ~ addscut . Sho...
addscut 28031	Demonstrate the cut proper...
addscut2 28032	Show that the cut involved...
addscld 28033	Surreal numbers are closed...
addscl 28034	Surreal numbers are closed...
addsf 28035	Function statement for sur...
addsfo 28036	Surreal addition is onto. ...
peano2no 28037	A theorem for surreals tha...
sltadd1im 28038	Surreal less-than is prese...
sltadd2im 28039	Surreal less-than is prese...
sleadd1im 28040	Surreal less-than or equal...
sleadd2im 28041	Surreal less-than or equal...
sleadd1 28042	Addition to both sides of ...
sleadd2 28043	Addition to both sides of ...
sltadd2 28044	Addition to both sides of ...
sltadd1 28045	Addition to both sides of ...
addscan2 28046	Cancellation law for surre...
addscan1 28047	Cancellation law for surre...
sleadd1d 28048	Addition to both sides of ...
sleadd2d 28049	Addition to both sides of ...
sltadd2d 28050	Addition to both sides of ...
sltadd1d 28051	Addition to both sides of ...
addscan2d 28052	Cancellation law for surre...
addscan1d 28053	Cancellation law for surre...
addsuniflem 28054	Lemma for ~ addsunif . St...
addsunif 28055	Uniformity theorem for sur...
addsasslem1 28056	Lemma for addition associa...
addsasslem2 28057	Lemma for addition associa...
addsass 28058	Surreal addition is associ...
addsassd 28059	Surreal addition is associ...
adds32d 28060	Commutative/associative la...
adds12d 28061	Commutative/associative la...
adds4d 28062	Rearrangement of four term...
adds42d 28063	Rearrangement of four term...
sltaddpos1d 28064	Addition of a positive num...
sltaddpos2d 28065	Addition of a positive num...
slt2addd 28066	Adding both sides of two s...
addsgt0d 28067	The sum of two positive su...
sltp1d 28068	A surreal is less than its...
addsbdaylem 28069	Lemma for ~ addsbday . (C...
addsbday 28070	The birthday of the sum of...
negsfn 28075	Surreal negation is a func...
subsfn 28076	Surreal subtraction is a f...
negsval 28077	The value of the surreal n...
negs0s 28078	Negative surreal zero is s...
negs1s 28079	An expression for negative...
negsproplem1 28080	Lemma for surreal negation...
negsproplem2 28081	Lemma for surreal negation...
negsproplem3 28082	Lemma for surreal negation...
negsproplem4 28083	Lemma for surreal negation...
negsproplem5 28084	Lemma for surreal negation...
negsproplem6 28085	Lemma for surreal negation...
negsproplem7 28086	Lemma for surreal negation...
negsprop 28087	Show closure and ordering ...
negscl 28088	The surreals are closed un...
negscld 28089	The surreals are closed un...
sltnegim 28090	The forward direction of t...
negscut 28091	The cut properties of surr...
negscut2 28092	The cut that defines surre...
negsid 28093	Surreal addition of a numb...
negsidd 28094	Surreal addition of a numb...
negsex 28095	Every surreal has a negati...
negnegs 28096	A surreal is equal to the ...
sltneg 28097	Negative of both sides of ...
sleneg 28098	Negative of both sides of ...
sltnegd 28099	Negative of both sides of ...
slenegd 28100	Negative of both sides of ...
negs11 28101	Surreal negation is one-to...
negsdi 28102	Distribution of surreal ne...
slt0neg2d 28103	Comparison of a surreal an...
negsf 28104	Function statement for sur...
negsfo 28105	Function statement for sur...
negsf1o 28106	Surreal negation is a bije...
negsunif 28107	Uniformity property for su...
negsbdaylem 28108	Lemma for ~ negsbday . Bo...
negsbday 28109	Negation of a surreal numb...
subsval 28110	The value of surreal subtr...
subsvald 28111	The value of surreal subtr...
subscl 28112	Closure law for surreal su...
subscld 28113	Closure law for surreal su...
subsf 28114	Function statement for sur...
subsfo 28115	Surreal subtraction is an ...
negsval2 28116	Surreal negation in terms ...
negsval2d 28117	Surreal negation in terms ...
subsid1 28118	Identity law for subtracti...
subsid 28119	Subtraction of a surreal f...
subadds 28120	Relationship between addit...
subaddsd 28121	Relationship between addit...
pncans 28122	Cancellation law for surre...
pncan3s 28123	Subtraction and addition o...
pncan2s 28124	Cancellation law for surre...
npcans 28125	Cancellation law for surre...
sltsub1 28126	Subtraction from both side...
sltsub2 28127	Subtraction from both side...
sltsub1d 28128	Subtraction from both side...
sltsub2d 28129	Subtraction from both side...
negsubsdi2d 28130	Distribution of negative o...
addsubsassd 28131	Associative-type law for s...
addsubsd 28132	Law for surreal addition a...
sltsubsubbd 28133	Equivalence for the surrea...
sltsubsub2bd 28134	Equivalence for the surrea...
sltsubsub3bd 28135	Equivalence for the surrea...
slesubsubbd 28136	Equivalence for the surrea...
slesubsub2bd 28137	Equivalence for the surrea...
slesubsub3bd 28138	Equivalence for the surrea...
sltsubaddd 28139	Surreal less-than relation...
sltsubadd2d 28140	Surreal less-than relation...
sltaddsubd 28141	Surreal less-than relation...
sltaddsub2d 28142	Surreal less-than relation...
slesubaddd 28143	Surreal less-than or equal...
subsubs4d 28144	Law for double surreal sub...
subsubs2d 28145	Law for double surreal sub...
nncansd 28146	Cancellation law for surre...
posdifsd 28147	Comparison of two surreals...
sltsubposd 28148	Subtraction of a positive ...
subsge0d 28149	Non-negative subtraction. ...
addsubs4d 28150	Rearrangement of four term...
sltm1d 28151	A surreal is greater than ...
mulsfn 28154	Surreal multiplication is ...
mulsval 28155	The value of surreal multi...
mulsval2lem 28156	Lemma for ~ mulsval2 . Ch...
mulsval2 28157	The value of surreal multi...
muls01 28158	Surreal multiplication by ...
mulsrid 28159	Surreal one is a right ide...
mulsridd 28160	Surreal one is a right ide...
mulsproplemcbv 28161	Lemma for surreal multipli...
mulsproplem1 28162	Lemma for surreal multipli...
mulsproplem2 28163	Lemma for surreal multipli...
mulsproplem3 28164	Lemma for surreal multipli...
mulsproplem4 28165	Lemma for surreal multipli...
mulsproplem5 28166	Lemma for surreal multipli...
mulsproplem6 28167	Lemma for surreal multipli...
mulsproplem7 28168	Lemma for surreal multipli...
mulsproplem8 28169	Lemma for surreal multipli...
mulsproplem9 28170	Lemma for surreal multipli...
mulsproplem10 28171	Lemma for surreal multipli...
mulsproplem11 28172	Lemma for surreal multipli...
mulsproplem12 28173	Lemma for surreal multipli...
mulsproplem13 28174	Lemma for surreal multipli...
mulsproplem14 28175	Lemma for surreal multipli...
mulsprop 28176	Surreals are closed under ...
mulscutlem 28177	Lemma for ~ mulscut . Sta...
mulscut 28178	Show the cut properties of...
mulscut2 28179	Show that the cut involved...
mulscl 28180	The surreals are closed un...
mulscld 28181	The surreals are closed un...
sltmul 28182	An ordering relationship f...
sltmuld 28183	An ordering relationship f...
slemuld 28184	An ordering relationship f...
mulscom 28185	Surreal multiplication com...
mulscomd 28186	Surreal multiplication com...
muls02 28187	Surreal multiplication by ...
mulslid 28188	Surreal one is a left iden...
mulslidd 28189	Surreal one is a left iden...
mulsgt0 28190	The product of two positiv...
mulsgt0d 28191	The product of two positiv...
mulsge0d 28192	The product of two non-neg...
ssltmul1 28193	One surreal set less-than ...
ssltmul2 28194	One surreal set less-than ...
mulsuniflem 28195	Lemma for ~ mulsunif . St...
mulsunif 28196	Surreal multiplication has...
addsdilem1 28197	Lemma for surreal distribu...
addsdilem2 28198	Lemma for surreal distribu...
addsdilem3 28199	Lemma for ~ addsdi . Show...
addsdilem4 28200	Lemma for ~ addsdi . Show...
addsdi 28201	Distributive law for surre...
addsdid 28202	Distributive law for surre...
addsdird 28203	Distributive law for surre...
subsdid 28204	Distribution of surreal mu...
subsdird 28205	Distribution of surreal mu...
mulnegs1d 28206	Product with negative is n...
mulnegs2d 28207	Product with negative is n...
mul2negsd 28208	Surreal product of two neg...
mulsasslem1 28209	Lemma for ~ mulsass . Exp...
mulsasslem2 28210	Lemma for ~ mulsass . Exp...
mulsasslem3 28211	Lemma for ~ mulsass . Dem...
mulsass 28212	Associative law for surrea...
mulsassd 28213	Associative law for surrea...
muls4d 28214	Rearrangement of four surr...
mulsunif2lem 28215	Lemma for ~ mulsunif2 . S...
mulsunif2 28216	Alternate expression for s...
sltmul2 28217	Multiplication of both sid...
sltmul2d 28218	Multiplication of both sid...
sltmul1d 28219	Multiplication of both sid...
slemul2d 28220	Multiplication of both sid...
slemul1d 28221	Multiplication of both sid...
sltmulneg1d 28222	Multiplication of both sid...
sltmulneg2d 28223	Multiplication of both sid...
mulscan2dlem 28224	Lemma for ~ mulscan2d . C...
mulscan2d 28225	Cancellation of surreal mu...
mulscan1d 28226	Cancellation of surreal mu...
muls12d 28227	Commutative/associative la...
slemul1ad 28228	Multiplication of both sid...
sltmul12ad 28229	Comparison of the product ...
divsmo 28230	Uniqueness of surreal inve...
muls0ord 28231	If a surreal product is ze...
mulsne0bd 28232	The product of two non-zer...
divsval 28235	The value of surreal divis...
norecdiv 28236	If a surreal has a recipro...
noreceuw 28237	If a surreal has a recipro...
divsmulw 28238	Relationship between surre...
divsmulwd 28239	Relationship between surre...
divsclw 28240	Weak division closure law....
divsclwd 28241	Weak division closure law....
divscan2wd 28242	A weak cancellation law fo...
divscan1wd 28243	A weak cancellation law fo...
sltdivmulwd 28244	Surreal less-than relation...
sltdivmul2wd 28245	Surreal less-than relation...
sltmuldivwd 28246	Surreal less-than relation...
sltmuldiv2wd 28247	Surreal less-than relation...
divsasswd 28248	An associative law for sur...
divs1 28249	A surreal divided by one i...
precsexlemcbv 28250	Lemma for surreal reciproc...
precsexlem1 28251	Lemma for surreal reciproc...
precsexlem2 28252	Lemma for surreal reciproc...
precsexlem3 28253	Lemma for surreal reciproc...
precsexlem4 28254	Lemma for surreal reciproc...
precsexlem5 28255	Lemma for surreal reciproc...
precsexlem6 28256	Lemma for surreal reciproc...
precsexlem7 28257	Lemma for surreal reciproc...
precsexlem8 28258	Lemma for surreal reciproc...
precsexlem9 28259	Lemma for surreal reciproc...
precsexlem10 28260	Lemma for surreal reciproc...
precsexlem11 28261	Lemma for surreal reciproc...
precsex 28262	Every positive surreal has...
recsex 28263	A non-zero surreal has a r...
recsexd 28264	A non-zero surreal has a r...
divsmul 28265	Relationship between surre...
divsmuld 28266	Relationship between surre...
divscl 28267	Surreal division closure l...
divscld 28268	Surreal division closure l...
divscan2d 28269	A cancellation law for sur...
divscan1d 28270	A cancellation law for sur...
sltdivmuld 28271	Surreal less-than relation...
sltdivmul2d 28272	Surreal less-than relation...
sltmuldivd 28273	Surreal less-than relation...
sltmuldiv2d 28274	Surreal less-than relation...
divsassd 28275	An associative law for sur...
divmuldivsd 28276	Multiplication of two surr...
divdivs1d 28277	Surreal division into a fr...
divsrecd 28278	Relationship between surre...
divsdird 28279	Distribution of surreal di...
divscan3d 28280	A cancellation law for sur...
abssval 28283	The value of surreal absol...
absscl 28284	Closure law for surreal ab...
abssid 28285	The absolute value of a no...
abs0s 28286	The absolute value of surr...
abssnid 28287	For a negative surreal, it...
absmuls 28288	Surreal absolute value dis...
abssge0 28289	The absolute value of a su...
abssor 28290	The absolute value of a su...
abssneg 28291	Surreal absolute value of ...
sleabs 28292	A surreal is less than or ...
absslt 28293	Surreal absolute value and...
elons 28296	Membership in the class of...
onssno 28297	The surreal ordinals are a...
onsno 28298	A surreal ordinal is a sur...
0ons 28299	Surreal zero is a surreal ...
1ons 28300	Surreal one is a surreal o...
elons2 28301	A surreal is ordinal iff i...
elons2d 28302	The cut of any set of surr...
sltonold 28303	The class of ordinals less...
sltonex 28304	The class of ordinals less...
onscutleft 28305	A surreal ordinal is equal...
onaddscl 28306	The surreal ordinals are c...
onmulscl 28307	The surreal ordinals are c...
peano2ons 28308	The successor of a surreal...
seqsex 28311	Existence of the surreal s...
seqseq123d 28312	Equality deduction for the...
nfseqs 28313	Hypothesis builder for the...
seqsval 28314	The value of the surreal s...
noseqex 28315	The next several theorems ...
noseq0 28316	The surreal ` A ` is a mem...
noseqp1 28317	One plus an element of ` Z...
noseqind 28318	Peano's inductive postulat...
noseqinds 28319	Induction schema for surre...
noseqssno 28320	A surreal sequence is a su...
noseqno 28321	An element of a surreal se...
om2noseq0 28322	The mapping ` G ` is a one...
om2noseqsuc 28323	The value of ` G ` at a su...
om2noseqfo 28324	Function statement for ` G...
om2noseqlt 28325	Surreal less-than relation...
om2noseqlt2 28326	The mapping ` G ` preserve...
om2noseqf1o 28327	` G ` is a bijection. (Co...
om2noseqiso 28328	` G ` is an isomorphism fr...
om2noseqoi 28329	An alternative definition ...
om2noseqrdg 28330	A helper lemma for the val...
noseqrdglem 28331	A helper lemma for the val...
noseqrdgfn 28332	The recursive definition g...
noseqrdg0 28333	Initial value of a recursi...
noseqrdgsuc 28334	Successor value of a recur...
seqsfn 28335	The surreal sequence build...
seqs1 28336	The value of the surreal s...
seqsp1 28337	The value of the surreal s...
n0sex 28342	The set of all non-negativ...
nnsex 28343	The set of all positive su...
peano5n0s 28344	Peano's inductive postulat...
n0ssno 28345	The non-negative surreal i...
nnssn0s 28346	The positive surreal integ...
nnssno 28347	The positive surreal integ...
n0sno 28348	A non-negative surreal int...
nnsno 28349	A positive surreal integer...
n0snod 28350	A non-negative surreal int...
nnsnod 28351	A positive surreal integer...
nnn0s 28352	A positive surreal integer...
nnn0sd 28353	A positive surreal integer...
0n0s 28354	Peano postulate: ` 0s ` is...
peano2n0s 28355	Peano postulate: the succe...
dfn0s2 28356	Alternate definition of th...
n0sind 28357	Principle of Mathematical ...
n0scut 28358	A cut form for surreal nat...
n0ons 28359	A surreal natural is a sur...
nnne0s 28360	A surreal positive integer...
n0sge0 28361	A non-negative integer is ...
nnsgt0 28362	A positive integer is grea...
elnns 28363	Membership in the positive...
elnns2 28364	A positive surreal integer...
n0s0suc 28365	A non-negative surreal int...
nnsge1 28366	A positive surreal integer...
n0addscl 28367	The non-negative surreal i...
n0mulscl 28368	The non-negative surreal i...
nnaddscl 28369	The positive surreal integ...
nnmulscl 28370	The positive surreal integ...
1n0s 28371	Surreal one is a non-negat...
1nns 28372	Surreal one is a positive ...
peano2nns 28373	Peano postulate for positi...
n0sbday 28374	A non-negative surreal int...
n0ssold 28375	The non-negative surreal i...
nnsrecgt0d 28376	The reciprocal of a positi...
seqn0sfn 28377	The surreal sequence build...
eln0s 28378	A non-negative surreal int...
n0s0m1 28379	Every non-negative surreal...
n0subs 28380	Subtraction of non-negativ...
n0p1nns 28381	One plus a non-negative su...
dfnns2 28382	Alternate definition of th...
nnsind 28383	Principle of Mathematical ...
zsex 28386	The surreal integers form ...
zssno 28387	The surreal integers are a...
zno 28388	A surreal integer is a sur...
znod 28389	A surreal integer is a sur...
elzs 28390	Membership in the set of s...
nnzsubs 28391	The difference of two surr...
nnzs 28392	A positive surreal integer...
nnzsd 28393	A positive surreal integer...
0zs 28394	Zero is a surreal integer....
n0zs 28395	A non-negative surreal int...
n0zsd 28396	A non-negative surreal int...
1zs 28397	One is a surreal integer. ...
znegscl 28398	The surreal integers are c...
znegscld 28399	The surreal integers are c...
zaddscl 28400	The surreal integers are c...
zaddscld 28401	The surreal integers are c...
zsubscld 28402	The surreal integers are c...
zmulscld 28403	The surreal integers are c...
elzn0s 28404	A surreal integer is a sur...
elzs2 28405	A surreal integer is eithe...
eln0zs 28406	Non-negative surreal integ...
elnnzs 28407	Positive surreal integer p...
elznns 28408	Surreal integer property e...
zn0subs 28409	The non-negative differenc...
peano5uzs 28410	Peano's inductive postulat...
uzsind 28411	Induction on the upper sur...
zsbday 28412	A surreal integer has a fi...
zscut 28413	A cut expression for surre...
1p1e2s 28420	One plus one is two. Surr...
no2times 28421	Version of ~ 2times for su...
2nns 28422	Surreal two is a surreal n...
2sno 28423	Surreal two is a surreal n...
2ne0s 28424	Surreal two is non-zero. ...
n0seo 28425	A non-negative surreal int...
zseo 28426	A surreal integer is eithe...
nohalf 28427	An explicit expression for...
expsval 28428	The value of surreal expon...
expsnnval 28429	Value of surreal exponenti...
exps0 28430	Surreal exponentiation to ...
exps1 28431	Surreal exponentiation to ...
expsp1 28432	Value of a surreal number ...
expscl 28433	Closure law for surreal ex...
expsne0 28434	A non-negative surreal int...
expsgt0 28435	A non-negative surreal int...
halfcut 28436	Relate the cut of twice of...
cutpw2 28437	A cut expression for inver...
pw2bday 28438	The inverses of powers of ...
addhalfcut 28439	The cut of a surreal non-n...
pw2cut 28440	Extend ~ halfcut to arbitr...
elzs12 28441	Membership in the dyadic f...
zs12ex 28442	The class of dyadic fracti...
zzs12 28443	A surreal integer is a dya...
zs12bday 28444	A dyadic fraction has a fi...
elreno 28447	Membership in the set of s...
recut 28448	The cut involved in defini...
0reno 28449	Surreal zero is a surreal ...
renegscl 28450	The surreal reals are clos...
readdscl 28451	The surreal reals are clos...
remulscllem1 28452	Lemma for ~ remulscl . Sp...
remulscllem2 28453	Lemma for ~ remulscl . Bo...
remulscl 28454	The surreal reals are clos...
itvndx 28465	Index value of the Interva...
lngndx 28466	Index value of the "line" ...
itvid 28467	Utility theorem: index-ind...
lngid 28468	Utility theorem: index-ind...
slotsinbpsd 28469	The slots ` Base ` , ` +g ...
slotslnbpsd 28470	The slots ` Base ` , ` +g ...
lngndxnitvndx 28471	The slot for the line is n...
trkgstr 28472	Functionality of a Tarski ...
trkgbas 28473	The base set of a Tarski g...
trkgdist 28474	The measure of a distance ...
trkgitv 28475	The congruence relation in...
istrkgc 28482	Property of being a Tarski...
istrkgb 28483	Property of being a Tarski...
istrkgcb 28484	Property of being a Tarski...
istrkge 28485	Property of fulfilling Euc...
istrkgl 28486	Building lines from the se...
istrkgld 28487	Property of fulfilling the...
istrkg2ld 28488	Property of fulfilling the...
istrkg3ld 28489	Property of fulfilling the...
axtgcgrrflx 28490	Axiom of reflexivity of co...
axtgcgrid 28491	Axiom of identity of congr...
axtgsegcon 28492	Axiom of segment construct...
axtg5seg 28493	Five segments axiom, Axiom...
axtgbtwnid 28494	Identity of Betweenness. ...
axtgpasch 28495	Axiom of (Inner) Pasch, Ax...
axtgcont1 28496	Axiom of Continuity. Axio...
axtgcont 28497	Axiom of Continuity. Axio...
axtglowdim2 28498	Lower dimension axiom for ...
axtgupdim2 28499	Upper dimension axiom for ...
axtgeucl 28500	Euclid's Axiom. Axiom A10...
tgjustf 28501	Given any function ` F ` ,...
tgjustr 28502	Given any equivalence rela...
tgjustc1 28503	A justification for using ...
tgjustc2 28504	A justification for using ...
tgcgrcomimp 28505	Congruence commutes on the...
tgcgrcomr 28506	Congruence commutes on the...
tgcgrcoml 28507	Congruence commutes on the...
tgcgrcomlr 28508	Congruence commutes on bot...
tgcgreqb 28509	Congruence and equality. ...
tgcgreq 28510	Congruence and equality. ...
tgcgrneq 28511	Congruence and equality. ...
tgcgrtriv 28512	Degenerate segments are co...
tgcgrextend 28513	Link congruence over a pai...
tgsegconeq 28514	Two points that satisfy th...
tgbtwntriv2 28515	Betweenness always holds f...
tgbtwncom 28516	Betweenness commutes. The...
tgbtwncomb 28517	Betweenness commutes, bico...
tgbtwnne 28518	Betweenness and inequality...
tgbtwntriv1 28519	Betweenness always holds f...
tgbtwnswapid 28520	If you can swap the first ...
tgbtwnintr 28521	Inner transitivity law for...
tgbtwnexch3 28522	Exchange the first endpoin...
tgbtwnouttr2 28523	Outer transitivity law for...
tgbtwnexch2 28524	Exchange the outer point o...
tgbtwnouttr 28525	Outer transitivity law for...
tgbtwnexch 28526	Outer transitivity law for...
tgtrisegint 28527	A line segment between two...
tglowdim1 28528	Lower dimension axiom for ...
tglowdim1i 28529	Lower dimension axiom for ...
tgldimor 28530	Excluded-middle like state...
tgldim0eq 28531	In dimension zero, any two...
tgldim0itv 28532	In dimension zero, any two...
tgldim0cgr 28533	In dimension zero, any two...
tgbtwndiff 28534	There is always a ` c ` di...
tgdim01 28535	In geometries of dimension...
tgifscgr 28536	Inner five segment congrue...
tgcgrsub 28537	Removing identical parts f...
iscgrg 28540	The congruence property fo...
iscgrgd 28541	The property for two seque...
iscgrglt 28542	The property for two seque...
trgcgrg 28543	The property for two trian...
trgcgr 28544	Triangle congruence. (Con...
ercgrg 28545	The shape congruence relat...
tgcgrxfr 28546	A line segment can be divi...
cgr3id 28547	Reflexivity law for three-...
cgr3simp1 28548	Deduce segment congruence ...
cgr3simp2 28549	Deduce segment congruence ...
cgr3simp3 28550	Deduce segment congruence ...
cgr3swap12 28551	Permutation law for three-...
cgr3swap23 28552	Permutation law for three-...
cgr3swap13 28553	Permutation law for three-...
cgr3rotr 28554	Permutation law for three-...
cgr3rotl 28555	Permutation law for three-...
trgcgrcom 28556	Commutative law for three-...
cgr3tr 28557	Transitivity law for three...
tgbtwnxfr 28558	A condition for extending ...
tgcgr4 28559	Two quadrilaterals to be c...
isismt 28562	Property of being an isome...
ismot 28563	Property of being an isome...
motcgr 28564	Property of a motion: dist...
idmot 28565	The identity is a motion. ...
motf1o 28566	Motions are bijections. (...
motcl 28567	Closure of motions. (Cont...
motco 28568	The composition of two mot...
cnvmot 28569	The converse of a motion i...
motplusg 28570	The operation for motions ...
motgrp 28571	The motions of a geometry ...
motcgrg 28572	Property of a motion: dist...
motcgr3 28573	Property of a motion: dist...
tglng 28574	Lines of a Tarski Geometry...
tglnfn 28575	Lines as functions. (Cont...
tglnunirn 28576	Lines are sets of points. ...
tglnpt 28577	Lines are sets of points. ...
tglngne 28578	It takes two different poi...
tglngval 28579	The line going through poi...
tglnssp 28580	Lines are subset of the ge...
tgellng 28581	Property of lying on the l...
tgcolg 28582	We choose the notation ` (...
btwncolg1 28583	Betweenness implies coline...
btwncolg2 28584	Betweenness implies coline...
btwncolg3 28585	Betweenness implies coline...
colcom 28586	Swapping the points defini...
colrot1 28587	Rotating the points defini...
colrot2 28588	Rotating the points defini...
ncolcom 28589	Swapping non-colinear poin...
ncolrot1 28590	Rotating non-colinear poin...
ncolrot2 28591	Rotating non-colinear poin...
tgdim01ln 28592	In geometries of dimension...
ncoltgdim2 28593	If there are three non-col...
lnxfr 28594	Transfer law for colineari...
lnext 28595	Extend a line with a missi...
tgfscgr 28596	Congruence law for the gen...
lncgr 28597	Congruence rule for lines....
lnid 28598	Identity law for points on...
tgidinside 28599	Law for finding a point in...
tgbtwnconn1lem1 28600	Lemma for ~ tgbtwnconn1 . ...
tgbtwnconn1lem2 28601	Lemma for ~ tgbtwnconn1 . ...
tgbtwnconn1lem3 28602	Lemma for ~ tgbtwnconn1 . ...
tgbtwnconn1 28603	Connectivity law for betwe...
tgbtwnconn2 28604	Another connectivity law f...
tgbtwnconn3 28605	Inner connectivity law for...
tgbtwnconnln3 28606	Derive colinearity from be...
tgbtwnconn22 28607	Double connectivity law fo...
tgbtwnconnln1 28608	Derive colinearity from be...
tgbtwnconnln2 28609	Derive colinearity from be...
legval 28612	Value of the less-than rel...
legov 28613	Value of the less-than rel...
legov2 28614	An equivalent definition o...
legid 28615	Reflexivity of the less-th...
btwnleg 28616	Betweenness implies less-t...
legtrd 28617	Transitivity of the less-t...
legtri3 28618	Equality from the less-tha...
legtrid 28619	Trichotomy law for the les...
leg0 28620	Degenerated (zero-length) ...
legeq 28621	Deduce equality from "less...
legbtwn 28622	Deduce betweenness from "l...
tgcgrsub2 28623	Removing identical parts f...
ltgseg 28624	The set ` E ` denotes the ...
ltgov 28625	Strict "shorter than" geom...
legov3 28626	An equivalent definition o...
legso 28627	The "shorter than" relatio...
ishlg 28630	Rays : Definition 6.1 of ...
hlcomb 28631	The half-line relation com...
hlcomd 28632	The half-line relation com...
hlne1 28633	The half-line relation imp...
hlne2 28634	The half-line relation imp...
hlln 28635	The half-line relation imp...
hleqnid 28636	The endpoint does not belo...
hlid 28637	The half-line relation is ...
hltr 28638	The half-line relation is ...
hlbtwn 28639	Betweenness is a sufficien...
btwnhl1 28640	Deduce half-line from betw...
btwnhl2 28641	Deduce half-line from betw...
btwnhl 28642	Swap betweenness for a hal...
lnhl 28643	Either a point ` C ` on th...
hlcgrex 28644	Construct a point on a hal...
hlcgreulem 28645	Lemma for ~ hlcgreu . (Co...
hlcgreu 28646	The point constructed in ~...
btwnlng1 28647	Betweenness implies coline...
btwnlng2 28648	Betweenness implies coline...
btwnlng3 28649	Betweenness implies coline...
lncom 28650	Swapping the points defini...
lnrot1 28651	Rotating the points defini...
lnrot2 28652	Rotating the points defini...
ncolne1 28653	Non-colinear points are di...
ncolne2 28654	Non-colinear points are di...
tgisline 28655	The property of being a pr...
tglnne 28656	It takes two different poi...
tglndim0 28657	There are no lines in dime...
tgelrnln 28658	The property of being a pr...
tglineeltr 28659	Transitivity law for lines...
tglineelsb2 28660	If ` S ` lies on PQ , then...
tglinerflx1 28661	Reflexivity law for line m...
tglinerflx2 28662	Reflexivity law for line m...
tglinecom 28663	Commutativity law for line...
tglinethru 28664	If ` A ` is a line contain...
tghilberti1 28665	There is a line through an...
tghilberti2 28666	There is at most one line ...
tglinethrueu 28667	There is a unique line goi...
tglnne0 28668	A line ` A ` has at least ...
tglnpt2 28669	Find a second point on a l...
tglineintmo 28670	Two distinct lines interse...
tglineineq 28671	Two distinct lines interse...
tglineneq 28672	Given three non-colinear p...
tglineinteq 28673	Two distinct lines interse...
ncolncol 28674	Deduce non-colinearity fro...
coltr 28675	A transitivity law for col...
coltr3 28676	A transitivity law for col...
colline 28677	Three points are colinear ...
tglowdim2l 28678	Reformulation of the lower...
tglowdim2ln 28679	There is always one point ...
mirreu3 28682	Existential uniqueness of ...
mirval 28683	Value of the point inversi...
mirfv 28684	Value of the point inversi...
mircgr 28685	Property of the image by t...
mirbtwn 28686	Property of the image by t...
ismir 28687	Property of the image by t...
mirf 28688	Point inversion as functio...
mircl 28689	Closure of the point inver...
mirmir 28690	The point inversion functi...
mircom 28691	Variation on ~ mirmir . (...
mirreu 28692	Any point has a unique ant...
mireq 28693	Equality deduction for poi...
mirinv 28694	The only invariant point o...
mirne 28695	Mirror of non-center point...
mircinv 28696	The center point is invari...
mirf1o 28697	The point inversion functi...
miriso 28698	The point inversion functi...
mirbtwni 28699	Point inversion preserves ...
mirbtwnb 28700	Point inversion preserves ...
mircgrs 28701	Point inversion preserves ...
mirmir2 28702	Point inversion of a point...
mirmot 28703	Point investion is a motio...
mirln 28704	If two points are on the s...
mirln2 28705	If a point and its mirror ...
mirconn 28706	Point inversion of connect...
mirhl 28707	If two points ` X ` and ` ...
mirbtwnhl 28708	If the center of the point...
mirhl2 28709	Deduce half-line relation ...
mircgrextend 28710	Link congruence over a pai...
mirtrcgr 28711	Point inversion of one poi...
mirauto 28712	Point inversion preserves ...
miduniq 28713	Uniqueness of the middle p...
miduniq1 28714	Uniqueness of the middle p...
miduniq2 28715	If two point inversions co...
colmid 28716	Colinearity and equidistan...
symquadlem 28717	Lemma of the symetrial qua...
krippenlem 28718	Lemma for ~ krippen . We ...
krippen 28719	Krippenlemma (German for c...
midexlem 28720	Lemma for the existence of...
israg 28725	Property for 3 points A, B...
ragcom 28726	Commutative rule for right...
ragcol 28727	The right angle property i...
ragmir 28728	Right angle property is pr...
mirrag 28729	Right angle is conserved b...
ragtrivb 28730	Trivial right angle. Theo...
ragflat2 28731	Deduce equality from two r...
ragflat 28732	Deduce equality from two r...
ragtriva 28733	Trivial right angle. Theo...
ragflat3 28734	Right angle and colinearit...
ragcgr 28735	Right angle and colinearit...
motrag 28736	Right angles are preserved...
ragncol 28737	Right angle implies non-co...
perpln1 28738	Derive a line from perpend...
perpln2 28739	Derive a line from perpend...
isperp 28740	Property for 2 lines A, B ...
perpcom 28741	The "perpendicular" relati...
perpneq 28742	Two perpendicular lines ar...
isperp2 28743	Property for 2 lines A, B,...
isperp2d 28744	One direction of ~ isperp2...
ragperp 28745	Deduce that two lines are ...
footexALT 28746	Alternative version of ~ f...
footexlem1 28747	Lemma for ~ footex . (Con...
footexlem2 28748	Lemma for ~ footex . (Con...
footex 28749	From a point ` C ` outside...
foot 28750	From a point ` C ` outside...
footne 28751	Uniqueness of the foot poi...
footeq 28752	Uniqueness of the foot poi...
hlperpnel 28753	A point on a half-line whi...
perprag 28754	Deduce a right angle from ...
perpdragALT 28755	Deduce a right angle from ...
perpdrag 28756	Deduce a right angle from ...
colperp 28757	Deduce a perpendicularity ...
colperpexlem1 28758	Lemma for ~ colperp . Fir...
colperpexlem2 28759	Lemma for ~ colperpex . S...
colperpexlem3 28760	Lemma for ~ colperpex . C...
colperpex 28761	In dimension 2 and above, ...
mideulem2 28762	Lemma for ~ opphllem , whi...
opphllem 28763	Lemma 8.24 of [Schwabhause...
mideulem 28764	Lemma for ~ mideu . We ca...
midex 28765	Existence of the midpoint,...
mideu 28766	Existence and uniqueness o...
islnopp 28767	The property for two point...
islnoppd 28768	Deduce that ` A ` and ` B ...
oppne1 28769	Points lying on opposite s...
oppne2 28770	Points lying on opposite s...
oppne3 28771	Points lying on opposite s...
oppcom 28772	Commutativity rule for "op...
opptgdim2 28773	If two points opposite to ...
oppnid 28774	The "opposite to a line" r...
opphllem1 28775	Lemma for ~ opphl . (Cont...
opphllem2 28776	Lemma for ~ opphl . Lemma...
opphllem3 28777	Lemma for ~ opphl : We as...
opphllem4 28778	Lemma for ~ opphl . (Cont...
opphllem5 28779	Second part of Lemma 9.4 o...
opphllem6 28780	First part of Lemma 9.4 of...
oppperpex 28781	Restating ~ colperpex usin...
opphl 28782	If two points ` A ` and ` ...
outpasch 28783	Axiom of Pasch, outer form...
hlpasch 28784	An application of the axio...
ishpg 28787	Value of the half-plane re...
hpgbr 28788	Half-planes : property for...
hpgne1 28789	Points on the open half pl...
hpgne2 28790	Points on the open half pl...
lnopp2hpgb 28791	Theorem 9.8 of [Schwabhaus...
lnoppnhpg 28792	If two points lie on the o...
hpgerlem 28793	Lemma for the proof that t...
hpgid 28794	The half-plane relation is...
hpgcom 28795	The half-plane relation co...
hpgtr 28796	The half-plane relation is...
colopp 28797	Opposite sides of a line f...
colhp 28798	Half-plane relation for co...
hphl 28799	If two points are on the s...
midf 28804	Midpoint as a function. (...
midcl 28805	Closure of the midpoint. ...
ismidb 28806	Property of the midpoint. ...
midbtwn 28807	Betweenness of midpoint. ...
midcgr 28808	Congruence of midpoint. (...
midid 28809	Midpoint of a null segment...
midcom 28810	Commutativity rule for the...
mirmid 28811	Point inversion preserves ...
lmieu 28812	Uniqueness of the line mir...
lmif 28813	Line mirror as a function....
lmicl 28814	Closure of the line mirror...
islmib 28815	Property of the line mirro...
lmicom 28816	The line mirroring functio...
lmilmi 28817	Line mirroring is an invol...
lmireu 28818	Any point has a unique ant...
lmieq 28819	Equality deduction for lin...
lmiinv 28820	The invariants of the line...
lmicinv 28821	The mirroring line is an i...
lmimid 28822	If we have a right angle, ...
lmif1o 28823	The line mirroring functio...
lmiisolem 28824	Lemma for ~ lmiiso . (Con...
lmiiso 28825	The line mirroring functio...
lmimot 28826	Line mirroring is a motion...
hypcgrlem1 28827	Lemma for ~ hypcgr , case ...
hypcgrlem2 28828	Lemma for ~ hypcgr , case ...
hypcgr 28829	If the catheti of two righ...
lmiopp 28830	Line mirroring produces po...
lnperpex 28831	Existence of a perpendicul...
trgcopy 28832	Triangle construction: a c...
trgcopyeulem 28833	Lemma for ~ trgcopyeu . (...
trgcopyeu 28834	Triangle construction: a c...
iscgra 28837	Property for two angles AB...
iscgra1 28838	A special version of ~ isc...
iscgrad 28839	Sufficient conditions for ...
cgrane1 28840	Angles imply inequality. ...
cgrane2 28841	Angles imply inequality. ...
cgrane3 28842	Angles imply inequality. ...
cgrane4 28843	Angles imply inequality. ...
cgrahl1 28844	Angle congruence is indepe...
cgrahl2 28845	Angle congruence is indepe...
cgracgr 28846	First direction of proposi...
cgraid 28847	Angle congruence is reflex...
cgraswap 28848	Swap rays in a congruence ...
cgrcgra 28849	Triangle congruence implie...
cgracom 28850	Angle congruence commutes....
cgratr 28851	Angle congruence is transi...
flatcgra 28852	Flat angles are congruent....
cgraswaplr 28853	Swap both side of angle co...
cgrabtwn 28854	Angle congruence preserves...
cgrahl 28855	Angle congruence preserves...
cgracol 28856	Angle congruence preserves...
cgrancol 28857	Angle congruence preserves...
dfcgra2 28858	This is the full statement...
sacgr 28859	Supplementary angles of co...
oacgr 28860	Vertical angle theorem. V...
acopy 28861	Angle construction. Theor...
acopyeu 28862	Angle construction. Theor...
isinag 28866	Property for point ` X ` t...
isinagd 28867	Sufficient conditions for ...
inagflat 28868	Any point lies in a flat a...
inagswap 28869	Swap the order of the half...
inagne1 28870	Deduce inequality from the...
inagne2 28871	Deduce inequality from the...
inagne3 28872	Deduce inequality from the...
inaghl 28873	The "point lie in angle" r...
isleag 28875	Geometrical "less than" pr...
isleagd 28876	Sufficient condition for "...
leagne1 28877	Deduce inequality from the...
leagne2 28878	Deduce inequality from the...
leagne3 28879	Deduce inequality from the...
leagne4 28880	Deduce inequality from the...
cgrg3col4 28881	Lemma 11.28 of [Schwabhaus...
tgsas1 28882	First congruence theorem: ...
tgsas 28883	First congruence theorem: ...
tgsas2 28884	First congruence theorem: ...
tgsas3 28885	First congruence theorem: ...
tgasa1 28886	Second congruence theorem:...
tgasa 28887	Second congruence theorem:...
tgsss1 28888	Third congruence theorem: ...
tgsss2 28889	Third congruence theorem: ...
tgsss3 28890	Third congruence theorem: ...
dfcgrg2 28891	Congruence for two triangl...
isoas 28892	Congruence theorem for iso...
iseqlg 28895	Property of a triangle bei...
iseqlgd 28896	Condition for a triangle t...
f1otrgds 28897	Convenient lemma for ~ f1o...
f1otrgitv 28898	Convenient lemma for ~ f1o...
f1otrg 28899	A bijection between bases ...
f1otrge 28900	A bijection between bases ...
ttgval 28903	Define a function to augme...
ttgvalOLD 28904	Obsolete proof of ~ ttgval...
ttglem 28905	Lemma for ~ ttgbas , ~ ttg...
ttglemOLD 28906	Obsolete version of ~ ttgl...
ttgbas 28907	The base set of a subcompl...
ttgbasOLD 28908	Obsolete proof of ~ ttgbas...
ttgplusg 28909	The addition operation of ...
ttgplusgOLD 28910	Obsolete proof of ~ ttgplu...
ttgsub 28911	The subtraction operation ...
ttgvsca 28912	The scalar product of a su...
ttgvscaOLD 28913	Obsolete proof of ~ ttgvsc...
ttgds 28914	The metric of a subcomplex...
ttgdsOLD 28915	Obsolete proof of ~ ttgds ...
ttgitvval 28916	Betweenness for a subcompl...
ttgelitv 28917	Betweenness for a subcompl...
ttgbtwnid 28918	Any subcomplex module equi...
ttgcontlem1 28919	Lemma for % ttgcont . (Co...
xmstrkgc 28920	Any metric space fulfills ...
cchhllem 28921	Lemma for chlbas and chlvs...
cchhllemOLD 28922	Obsolete version of ~ cchh...
elee 28929	Membership in a Euclidean ...
mptelee 28930	A condition for a mapping ...
eleenn 28931	If ` A ` is in ` ( EE `` N...
eleei 28932	The forward direction of ~...
eedimeq 28933	A point belongs to at most...
brbtwn 28934	The binary relation form o...
brcgr 28935	The binary relation form o...
fveere 28936	The function value of a po...
fveecn 28937	The function value of a po...
eqeefv 28938	Two points are equal iff t...
eqeelen 28939	Two points are equal iff t...
brbtwn2 28940	Alternate characterization...
colinearalglem1 28941	Lemma for ~ colinearalg . ...
colinearalglem2 28942	Lemma for ~ colinearalg . ...
colinearalglem3 28943	Lemma for ~ colinearalg . ...
colinearalglem4 28944	Lemma for ~ colinearalg . ...
colinearalg 28945	An algebraic characterizat...
eleesub 28946	Membership of a subtractio...
eleesubd 28947	Membership of a subtractio...
axdimuniq 28948	The unique dimension axiom...
axcgrrflx 28949	` A ` is as far from ` B `...
axcgrtr 28950	Congruence is transitive. ...
axcgrid 28951	If there is no distance be...
axsegconlem1 28952	Lemma for ~ axsegcon . Ha...
axsegconlem2 28953	Lemma for ~ axsegcon . Sh...
axsegconlem3 28954	Lemma for ~ axsegcon . Sh...
axsegconlem4 28955	Lemma for ~ axsegcon . Sh...
axsegconlem5 28956	Lemma for ~ axsegcon . Sh...
axsegconlem6 28957	Lemma for ~ axsegcon . Sh...
axsegconlem7 28958	Lemma for ~ axsegcon . Sh...
axsegconlem8 28959	Lemma for ~ axsegcon . Sh...
axsegconlem9 28960	Lemma for ~ axsegcon . Sh...
axsegconlem10 28961	Lemma for ~ axsegcon . Sh...
axsegcon 28962	Any segment ` A B ` can be...
ax5seglem1 28963	Lemma for ~ ax5seg . Rexp...
ax5seglem2 28964	Lemma for ~ ax5seg . Rexp...
ax5seglem3a 28965	Lemma for ~ ax5seg . (Con...
ax5seglem3 28966	Lemma for ~ ax5seg . Comb...
ax5seglem4 28967	Lemma for ~ ax5seg . Give...
ax5seglem5 28968	Lemma for ~ ax5seg . If `...
ax5seglem6 28969	Lemma for ~ ax5seg . Give...
ax5seglem7 28970	Lemma for ~ ax5seg . An a...
ax5seglem8 28971	Lemma for ~ ax5seg . Use ...
ax5seglem9 28972	Lemma for ~ ax5seg . Take...
ax5seg 28973	The five segment axiom. T...
axbtwnid 28974	Points are indivisible. T...
axpaschlem 28975	Lemma for ~ axpasch . Set...
axpasch 28976	The inner Pasch axiom. Ta...
axlowdimlem1 28977	Lemma for ~ axlowdim . Es...
axlowdimlem2 28978	Lemma for ~ axlowdim . Sh...
axlowdimlem3 28979	Lemma for ~ axlowdim . Se...
axlowdimlem4 28980	Lemma for ~ axlowdim . Se...
axlowdimlem5 28981	Lemma for ~ axlowdim . Sh...
axlowdimlem6 28982	Lemma for ~ axlowdim . Sh...
axlowdimlem7 28983	Lemma for ~ axlowdim . Se...
axlowdimlem8 28984	Lemma for ~ axlowdim . Ca...
axlowdimlem9 28985	Lemma for ~ axlowdim . Ca...
axlowdimlem10 28986	Lemma for ~ axlowdim . Se...
axlowdimlem11 28987	Lemma for ~ axlowdim . Ca...
axlowdimlem12 28988	Lemma for ~ axlowdim . Ca...
axlowdimlem13 28989	Lemma for ~ axlowdim . Es...
axlowdimlem14 28990	Lemma for ~ axlowdim . Ta...
axlowdimlem15 28991	Lemma for ~ axlowdim . Se...
axlowdimlem16 28992	Lemma for ~ axlowdim . Se...
axlowdimlem17 28993	Lemma for ~ axlowdim . Es...
axlowdim1 28994	The lower dimension axiom ...
axlowdim2 28995	The lower two-dimensional ...
axlowdim 28996	The general lower dimensio...
axeuclidlem 28997	Lemma for ~ axeuclid . Ha...
axeuclid 28998	Euclid's axiom. Take an a...
axcontlem1 28999	Lemma for ~ axcont . Chan...
axcontlem2 29000	Lemma for ~ axcont . The ...
axcontlem3 29001	Lemma for ~ axcont . Give...
axcontlem4 29002	Lemma for ~ axcont . Give...
axcontlem5 29003	Lemma for ~ axcont . Comp...
axcontlem6 29004	Lemma for ~ axcont . Stat...
axcontlem7 29005	Lemma for ~ axcont . Give...
axcontlem8 29006	Lemma for ~ axcont . A po...
axcontlem9 29007	Lemma for ~ axcont . Give...
axcontlem10 29008	Lemma for ~ axcont . Give...
axcontlem11 29009	Lemma for ~ axcont . Elim...
axcontlem12 29010	Lemma for ~ axcont . Elim...
axcont 29011	The axiom of continuity. ...
eengv 29014	The value of the Euclidean...
eengstr 29015	The Euclidean geometry as ...
eengbas 29016	The Base of the Euclidean ...
ebtwntg 29017	The betweenness relation u...
ecgrtg 29018	The congruence relation us...
elntg 29019	The line definition in the...
elntg2 29020	The line definition in the...
eengtrkg 29021	The geometry structure for...
eengtrkge 29022	The geometry structure for...
edgfid 29025	Utility theorem: index-ind...
edgfndx 29026	Index value of the ~ df-ed...
edgfndxnn 29027	The index value of the edg...
edgfndxid 29028	The value of the edge func...
edgfndxidOLD 29029	Obsolete version of ~ edgf...
basendxltedgfndx 29030	The index value of the ` B...
baseltedgfOLD 29031	Obsolete proof of ~ basend...
basendxnedgfndx 29032	The slots ` Base ` and ` ....
vtxval 29037	The set of vertices of a g...
iedgval 29038	The set of indexed edges o...
1vgrex 29039	A graph with at least one ...
opvtxval 29040	The set of vertices of a g...
opvtxfv 29041	The set of vertices of a g...
opvtxov 29042	The set of vertices of a g...
opiedgval 29043	The set of indexed edges o...
opiedgfv 29044	The set of indexed edges o...
opiedgov 29045	The set of indexed edges o...
opvtxfvi 29046	The set of vertices of a g...
opiedgfvi 29047	The set of indexed edges o...
funvtxdmge2val 29048	The set of vertices of an ...
funiedgdmge2val 29049	The set of indexed edges o...
funvtxdm2val 29050	The set of vertices of an ...
funiedgdm2val 29051	The set of indexed edges o...
funvtxval0 29052	The set of vertices of an ...
basvtxval 29053	The set of vertices of a g...
edgfiedgval 29054	The set of indexed edges o...
funvtxval 29055	The set of vertices of a g...
funiedgval 29056	The set of indexed edges o...
structvtxvallem 29057	Lemma for ~ structvtxval a...
structvtxval 29058	The set of vertices of an ...
structiedg0val 29059	The set of indexed edges o...
structgrssvtxlem 29060	Lemma for ~ structgrssvtx ...
structgrssvtx 29061	The set of vertices of a g...
structgrssiedg 29062	The set of indexed edges o...
struct2grstr 29063	A graph represented as an ...
struct2grvtx 29064	The set of vertices of a g...
struct2griedg 29065	The set of indexed edges o...
graop 29066	Any representation of a gr...
grastruct 29067	Any representation of a gr...
gropd 29068	If any representation of a...
grstructd 29069	If any representation of a...
gropeld 29070	If any representation of a...
grstructeld 29071	If any representation of a...
setsvtx 29072	The vertices of a structur...
setsiedg 29073	The (indexed) edges of a s...
snstrvtxval 29074	The set of vertices of a g...
snstriedgval 29075	The set of indexed edges o...
vtxval0 29076	Degenerated case 1 for ver...
iedgval0 29077	Degenerated case 1 for edg...
vtxvalsnop 29078	Degenerated case 2 for ver...
iedgvalsnop 29079	Degenerated case 2 for edg...
vtxval3sn 29080	Degenerated case 3 for ver...
iedgval3sn 29081	Degenerated case 3 for edg...
vtxvalprc 29082	Degenerated case 4 for ver...
iedgvalprc 29083	Degenerated case 4 for edg...
edgval 29086	The edges of a graph. (Co...
iedgedg 29087	An indexed edge is an edge...
edgopval 29088	The edges of a graph repre...
edgov 29089	The edges of a graph repre...
edgstruct 29090	The edges of a graph repre...
edgiedgb 29091	A set is an edge iff it is...
edg0iedg0 29092	There is no edge in a grap...
isuhgr 29097	The predicate "is an undir...
isushgr 29098	The predicate "is an undir...
uhgrf 29099	The edge function of an un...
ushgrf 29100	The edge function of an un...
uhgrss 29101	An edge is a subset of ver...
uhgreq12g 29102	If two sets have the same ...
uhgrfun 29103	The edge function of an un...
uhgrn0 29104	An edge is a nonempty subs...
lpvtx 29105	The endpoints of a loop (w...
ushgruhgr 29106	An undirected simple hyper...
isuhgrop 29107	The property of being an u...
uhgr0e 29108	The empty graph, with vert...
uhgr0vb 29109	The null graph, with no ve...
uhgr0 29110	The null graph represented...
uhgrun 29111	The union ` U ` of two (un...
uhgrunop 29112	The union of two (undirect...
ushgrun 29113	The union ` U ` of two (un...
ushgrunop 29114	The union of two (undirect...
uhgrstrrepe 29115	Replacing (or adding) the ...
incistruhgr 29116	An _incidence structure_ `...
isupgr 29121	The property of being an u...
wrdupgr 29122	The property of being an u...
upgrf 29123	The edge function of an un...
upgrfn 29124	The edge function of an un...
upgrss 29125	An edge is a subset of ver...
upgrn0 29126	An edge is a nonempty subs...
upgrle 29127	An edge of an undirected p...
upgrfi 29128	An edge is a finite subset...
upgrex 29129	An edge is an unordered pa...
upgrbi 29130	Show that an unordered pai...
upgrop 29131	A pseudograph represented ...
isumgr 29132	The property of being an u...
isumgrs 29133	The simplified property of...
wrdumgr 29134	The property of being an u...
umgrf 29135	The edge function of an un...
umgrfn 29136	The edge function of an un...
umgredg2 29137	An edge of a multigraph ha...
umgrbi 29138	Show that an unordered pai...
upgruhgr 29139	An undirected pseudograph ...
umgrupgr 29140	An undirected multigraph i...
umgruhgr 29141	An undirected multigraph i...
upgrle2 29142	An edge of an undirected p...
umgrnloopv 29143	In a multigraph, there is ...
umgredgprv 29144	In a multigraph, an edge i...
umgrnloop 29145	In a multigraph, there is ...
umgrnloop0 29146	A multigraph has no loops....
umgr0e 29147	The empty graph, with vert...
upgr0e 29148	The empty graph, with vert...
upgr1elem 29149	Lemma for ~ upgr1e and ~ u...
upgr1e 29150	A pseudograph with one edg...
upgr0eop 29151	The empty graph, with vert...
upgr1eop 29152	A pseudograph with one edg...
upgr0eopALT 29153	Alternate proof of ~ upgr0...
upgr1eopALT 29154	Alternate proof of ~ upgr1...
upgrun 29155	The union ` U ` of two pse...
upgrunop 29156	The union of two pseudogra...
umgrun 29157	The union ` U ` of two mul...
umgrunop 29158	The union of two multigrap...
umgrislfupgrlem 29159	Lemma for ~ umgrislfupgr a...
umgrislfupgr 29160	A multigraph is a loop-fre...
lfgredgge2 29161	An edge of a loop-free gra...
lfgrnloop 29162	A loop-free graph has no l...
uhgredgiedgb 29163	In a hypergraph, a set is ...
uhgriedg0edg0 29164	A hypergraph has no edges ...
uhgredgn0 29165	An edge of a hypergraph is...
edguhgr 29166	An edge of a hypergraph is...
uhgredgrnv 29167	An edge of a hypergraph co...
uhgredgss 29168	The set of edges of a hype...
upgredgss 29169	The set of edges of a pseu...
umgredgss 29170	The set of edges of a mult...
edgupgr 29171	Properties of an edge of a...
edgumgr 29172	Properties of an edge of a...
uhgrvtxedgiedgb 29173	In a hypergraph, a vertex ...
upgredg 29174	For each edge in a pseudog...
umgredg 29175	For each edge in a multigr...
upgrpredgv 29176	An edge of a pseudograph a...
umgrpredgv 29177	An edge of a multigraph al...
upgredg2vtx 29178	For a vertex incident to a...
upgredgpr 29179	If a proper pair (of verti...
edglnl 29180	The edges incident with a ...
numedglnl 29181	The number of edges incide...
umgredgne 29182	An edge of a multigraph al...
umgrnloop2 29183	A multigraph has no loops....
umgredgnlp 29184	An edge of a multigraph is...
isuspgr 29189	The property of being a si...
isusgr 29190	The property of being a si...
uspgrf 29191	The edge function of a sim...
usgrf 29192	The edge function of a sim...
isusgrs 29193	The property of being a si...
usgrfs 29194	The edge function of a sim...
usgrfun 29195	The edge function of a sim...
usgredgss 29196	The set of edges of a simp...
edgusgr 29197	An edge of a simple graph ...
isuspgrop 29198	The property of being an u...
isusgrop 29199	The property of being an u...
usgrop 29200	A simple graph represented...
isausgr 29201	The property of an unorder...
ausgrusgrb 29202	The equivalence of the def...
usgrausgri 29203	A simple graph represented...
ausgrumgri 29204	If an alternatively define...
ausgrusgri 29205	The equivalence of the def...
usgrausgrb 29206	The equivalence of the def...
usgredgop 29207	An edge of a simple graph ...
usgrf1o 29208	The edge function of a sim...
usgrf1 29209	The edge function of a sim...
uspgrf1oedg 29210	The edge function of a sim...
usgrss 29211	An edge is a subset of ver...
uspgredgiedg 29212	In a simple pseudograph, f...
uspgriedgedg 29213	In a simple pseudograph, f...
uspgrushgr 29214	A simple pseudograph is an...
uspgrupgr 29215	A simple pseudograph is an...
uspgrupgrushgr 29216	A graph is a simple pseudo...
usgruspgr 29217	A simple graph is a simple...
usgrumgr 29218	A simple graph is an undir...
usgrumgruspgr 29219	A graph is a simple graph ...
usgruspgrb 29220	A class is a simple graph ...
uspgruhgr 29221	An undirected simple pseud...
usgrupgr 29222	A simple graph is an undir...
usgruhgr 29223	A simple graph is an undir...
usgrislfuspgr 29224	A simple graph is a loop-f...
uspgrun 29225	The union ` U ` of two sim...
uspgrunop 29226	The union of two simple ps...
usgrun 29227	The union ` U ` of two sim...
usgrunop 29228	The union of two simple gr...
usgredg2 29229	The value of the "edge fun...
usgredg2ALT 29230	Alternate proof of ~ usgre...
usgredgprv 29231	In a simple graph, an edge...
usgredgprvALT 29232	Alternate proof of ~ usgre...
usgredgppr 29233	An edge of a simple graph ...
usgrpredgv 29234	An edge of a simple graph ...
edgssv2 29235	An edge of a simple graph ...
usgredg 29236	For each edge in a simple ...
usgrnloopv 29237	In a simple graph, there i...
usgrnloopvALT 29238	Alternate proof of ~ usgrn...
usgrnloop 29239	In a simple graph, there i...
usgrnloopALT 29240	Alternate proof of ~ usgrn...
usgrnloop0 29241	A simple graph has no loop...
usgrnloop0ALT 29242	Alternate proof of ~ usgrn...
usgredgne 29243	An edge of a simple graph ...
usgrf1oedg 29244	The edge function of a sim...
uhgr2edg 29245	If a vertex is adjacent to...
umgr2edg 29246	If a vertex is adjacent to...
usgr2edg 29247	If a vertex is adjacent to...
umgr2edg1 29248	If a vertex is adjacent to...
usgr2edg1 29249	If a vertex is adjacent to...
umgrvad2edg 29250	If a vertex is adjacent to...
umgr2edgneu 29251	If a vertex is adjacent to...
usgrsizedg 29252	In a simple graph, the siz...
usgredg3 29253	The value of the "edge fun...
usgredg4 29254	For a vertex incident to a...
usgredgreu 29255	For a vertex incident to a...
usgredg2vtx 29256	For a vertex incident to a...
uspgredg2vtxeu 29257	For a vertex incident to a...
usgredg2vtxeu 29258	For a vertex incident to a...
usgredg2vtxeuALT 29259	Alternate proof of ~ usgre...
uspgredg2vlem 29260	Lemma for ~ uspgredg2v . ...
uspgredg2v 29261	In a simple pseudograph, t...
usgredg2vlem1 29262	Lemma 1 for ~ usgredg2v . ...
usgredg2vlem2 29263	Lemma 2 for ~ usgredg2v . ...
usgredg2v 29264	In a simple graph, the map...
usgriedgleord 29265	Alternate version of ~ usg...
ushgredgedg 29266	In a simple hypergraph the...
usgredgedg 29267	In a simple graph there is...
ushgredgedgloop 29268	In a simple hypergraph the...
uspgredgleord 29269	In a simple pseudograph th...
usgredgleord 29270	In a simple graph the numb...
usgredgleordALT 29271	Alternate proof for ~ usgr...
usgrstrrepe 29272	Replacing (or adding) the ...
usgr0e 29273	The empty graph, with vert...
usgr0vb 29274	The null graph, with no ve...
uhgr0v0e 29275	The null graph, with no ve...
uhgr0vsize0 29276	The size of a hypergraph w...
uhgr0edgfi 29277	A graph of order 0 (i.e. w...
usgr0v 29278	The null graph, with no ve...
uhgr0vusgr 29279	The null graph, with no ve...
usgr0 29280	The null graph represented...
uspgr1e 29281	A simple pseudograph with ...
usgr1e 29282	A simple graph with one ed...
usgr0eop 29283	The empty graph, with vert...
uspgr1eop 29284	A simple pseudograph with ...
uspgr1ewop 29285	A simple pseudograph with ...
uspgr1v1eop 29286	A simple pseudograph with ...
usgr1eop 29287	A simple graph with (at le...
uspgr2v1e2w 29288	A simple pseudograph with ...
usgr2v1e2w 29289	A simple graph with two ve...
edg0usgr 29290	A class without edges is a...
lfuhgr1v0e 29291	A loop-free hypergraph wit...
usgr1vr 29292	A simple graph with one ve...
usgr1v 29293	A class with one (or no) v...
usgr1v0edg 29294	A class with one (or no) v...
usgrexmpldifpr 29295	Lemma for ~ usgrexmpledg :...
usgrexmplef 29296	Lemma for ~ usgrexmpl . (...
usgrexmpllem 29297	Lemma for ~ usgrexmpl . (...
usgrexmplvtx 29298	The vertices ` 0 , 1 , 2 ,...
usgrexmpledg 29299	The edges ` { 0 , 1 } , { ...
usgrexmpl 29300	` G ` is a simple graph of...
griedg0prc 29301	The class of empty graphs ...
griedg0ssusgr 29302	The class of all simple gr...
usgrprc 29303	The class of simple graphs...
relsubgr 29306	The class of the subgraph ...
subgrv 29307	If a class is a subgraph o...
issubgr 29308	The property of a set to b...
issubgr2 29309	The property of a set to b...
subgrprop 29310	The properties of a subgra...
subgrprop2 29311	The properties of a subgra...
uhgrissubgr 29312	The property of a hypergra...
subgrprop3 29313	The properties of a subgra...
egrsubgr 29314	An empty graph consisting ...
0grsubgr 29315	The null graph (represente...
0uhgrsubgr 29316	The null graph (as hypergr...
uhgrsubgrself 29317	A hypergraph is a subgraph...
subgrfun 29318	The edge function of a sub...
subgruhgrfun 29319	The edge function of a sub...
subgreldmiedg 29320	An element of the domain o...
subgruhgredgd 29321	An edge of a subgraph of a...
subumgredg2 29322	An edge of a subgraph of a...
subuhgr 29323	A subgraph of a hypergraph...
subupgr 29324	A subgraph of a pseudograp...
subumgr 29325	A subgraph of a multigraph...
subusgr 29326	A subgraph of a simple gra...
uhgrspansubgrlem 29327	Lemma for ~ uhgrspansubgr ...
uhgrspansubgr 29328	A spanning subgraph ` S ` ...
uhgrspan 29329	A spanning subgraph ` S ` ...
upgrspan 29330	A spanning subgraph ` S ` ...
umgrspan 29331	A spanning subgraph ` S ` ...
usgrspan 29332	A spanning subgraph ` S ` ...
uhgrspanop 29333	A spanning subgraph of a h...
upgrspanop 29334	A spanning subgraph of a p...
umgrspanop 29335	A spanning subgraph of a m...
usgrspanop 29336	A spanning subgraph of a s...
uhgrspan1lem1 29337	Lemma 1 for ~ uhgrspan1 . ...
uhgrspan1lem2 29338	Lemma 2 for ~ uhgrspan1 . ...
uhgrspan1lem3 29339	Lemma 3 for ~ uhgrspan1 . ...
uhgrspan1 29340	The induced subgraph ` S `...
upgrreslem 29341	Lemma for ~ upgrres . (Co...
umgrreslem 29342	Lemma for ~ umgrres and ~ ...
upgrres 29343	A subgraph obtained by rem...
umgrres 29344	A subgraph obtained by rem...
usgrres 29345	A subgraph obtained by rem...
upgrres1lem1 29346	Lemma 1 for ~ upgrres1 . ...
umgrres1lem 29347	Lemma for ~ umgrres1 . (C...
upgrres1lem2 29348	Lemma 2 for ~ upgrres1 . ...
upgrres1lem3 29349	Lemma 3 for ~ upgrres1 . ...
upgrres1 29350	A pseudograph obtained by ...
umgrres1 29351	A multigraph obtained by r...
usgrres1 29352	Restricting a simple graph...
isfusgr 29355	The property of being a fi...
fusgrvtxfi 29356	A finite simple graph has ...
isfusgrf1 29357	The property of being a fi...
isfusgrcl 29358	The property of being a fi...
fusgrusgr 29359	A finite simple graph is a...
opfusgr 29360	A finite simple graph repr...
usgredgffibi 29361	The number of edges in a s...
fusgredgfi 29362	In a finite simple graph t...
usgr1v0e 29363	The size of a (finite) sim...
usgrfilem 29364	In a finite simple graph, ...
fusgrfisbase 29365	Induction base for ~ fusgr...
fusgrfisstep 29366	Induction step in ~ fusgrf...
fusgrfis 29367	A finite simple graph is o...
fusgrfupgrfs 29368	A finite simple graph is a...
nbgrprc0 29371	The set of neighbors is em...
nbgrcl 29372	If a class ` X ` has at le...
nbgrval 29373	The set of neighbors of a ...
dfnbgr2 29374	Alternate definition of th...
dfnbgr3 29375	Alternate definition of th...
nbgrnvtx0 29376	If a class ` X ` is not a ...
nbgrel 29377	Characterization of a neig...
nbgrisvtx 29378	Every neighbor ` N ` of a ...
nbgrssvtx 29379	The neighbors of a vertex ...
nbuhgr 29380	The set of neighbors of a ...
nbupgr 29381	The set of neighbors of a ...
nbupgrel 29382	A neighbor of a vertex in ...
nbumgrvtx 29383	The set of neighbors of a ...
nbumgr 29384	The set of neighbors of an...
nbusgrvtx 29385	The set of neighbors of a ...
nbusgr 29386	The set of neighbors of an...
nbgr2vtx1edg 29387	If a graph has two vertice...
nbuhgr2vtx1edgblem 29388	Lemma for ~ nbuhgr2vtx1edg...
nbuhgr2vtx1edgb 29389	If a hypergraph has two ve...
nbusgreledg 29390	A class/vertex is a neighb...
uhgrnbgr0nb 29391	A vertex which is not endp...
nbgr0vtx 29392	In a null graph (with no v...
nbgr0edglem 29393	Lemma for ~ nbgr0edg and ~...
nbgr0edg 29394	In an empty graph (with no...
nbgr1vtx 29395	In a graph with one vertex...
nbgrnself 29396	A vertex in a graph is not...
nbgrnself2 29397	A class ` X ` is not a nei...
nbgrssovtx 29398	The neighbors of a vertex ...
nbgrssvwo2 29399	The neighbors of a vertex ...
nbgrsym 29400	In a graph, the neighborho...
nbupgrres 29401	The neighborhood of a vert...
usgrnbcnvfv 29402	Applying the edge function...
nbusgredgeu 29403	For each neighbor of a ver...
edgnbusgreu 29404	For each edge incident to ...
nbusgredgeu0 29405	For each neighbor of a ver...
nbusgrf1o0 29406	The mapping of neighbors o...
nbusgrf1o1 29407	The set of neighbors of a ...
nbusgrf1o 29408	The set of neighbors of a ...
nbedgusgr 29409	The number of neighbors of...
edgusgrnbfin 29410	The number of neighbors of...
nbusgrfi 29411	The class of neighbors of ...
nbfiusgrfi 29412	The class of neighbors of ...
hashnbusgrnn0 29413	The number of neighbors of...
nbfusgrlevtxm1 29414	The number of neighbors of...
nbfusgrlevtxm2 29415	If there is a vertex which...
nbusgrvtxm1 29416	If the number of neighbors...
nb3grprlem1 29417	Lemma 1 for ~ nb3grpr . (...
nb3grprlem2 29418	Lemma 2 for ~ nb3grpr . (...
nb3grpr 29419	The neighbors of a vertex ...
nb3grpr2 29420	The neighbors of a vertex ...
nb3gr2nb 29421	If the neighbors of two ve...
uvtxval 29424	The set of all universal v...
uvtxel 29425	A universal vertex, i.e. a...
uvtxisvtx 29426	A universal vertex is a ve...
uvtxssvtx 29427	The set of the universal v...
vtxnbuvtx 29428	A universal vertex has all...
uvtxnbgrss 29429	A universal vertex has all...
uvtxnbgrvtx 29430	A universal vertex is neig...
uvtx0 29431	There is no universal vert...
isuvtx 29432	The set of all universal v...
uvtxel1 29433	Characterization of a univ...
uvtx01vtx 29434	If a graph/class has no ed...
uvtx2vtx1edg 29435	If a graph has two vertice...
uvtx2vtx1edgb 29436	If a hypergraph has two ve...
uvtxnbgr 29437	A universal vertex has all...
uvtxnbgrb 29438	A vertex is universal iff ...
uvtxusgr 29439	The set of all universal v...
uvtxusgrel 29440	A universal vertex, i.e. a...
uvtxnm1nbgr 29441	A universal vertex has ` n...
nbusgrvtxm1uvtx 29442	If the number of neighbors...
uvtxnbvtxm1 29443	A universal vertex has ` n...
nbupgruvtxres 29444	The neighborhood of a univ...
uvtxupgrres 29445	A universal vertex is univ...
cplgruvtxb 29450	A graph ` G ` is complete ...
prcliscplgr 29451	A proper class (representi...
iscplgr 29452	The property of being a co...
iscplgrnb 29453	A graph is complete iff al...
iscplgredg 29454	A graph ` G ` is complete ...
iscusgr 29455	The property of being a co...
cusgrusgr 29456	A complete simple graph is...
cusgrcplgr 29457	A complete simple graph is...
iscusgrvtx 29458	A simple graph is complete...
cusgruvtxb 29459	A simple graph is complete...
iscusgredg 29460	A simple graph is complete...
cusgredg 29461	In a complete simple graph...
cplgr0 29462	The null graph (with no ve...
cusgr0 29463	The null graph (with no ve...
cplgr0v 29464	A null graph (with no vert...
cusgr0v 29465	A graph with no vertices a...
cplgr1vlem 29466	Lemma for ~ cplgr1v and ~ ...
cplgr1v 29467	A graph with one vertex is...
cusgr1v 29468	A graph with one vertex an...
cplgr2v 29469	An undirected hypergraph w...
cplgr2vpr 29470	An undirected hypergraph w...
nbcplgr 29471	In a complete graph, each ...
cplgr3v 29472	A pseudograph with three (...
cusgr3vnbpr 29473	The neighbors of a vertex ...
cplgrop 29474	A complete graph represent...
cusgrop 29475	A complete simple graph re...
cusgrexilem1 29476	Lemma 1 for ~ cusgrexi . ...
usgrexilem 29477	Lemma for ~ usgrexi . (Co...
usgrexi 29478	An arbitrary set regarded ...
cusgrexilem2 29479	Lemma 2 for ~ cusgrexi . ...
cusgrexi 29480	An arbitrary set ` V ` reg...
cusgrexg 29481	For each set there is a se...
structtousgr 29482	Any (extensible) structure...
structtocusgr 29483	Any (extensible) structure...
cffldtocusgr 29484	The field of complex numbe...
cffldtocusgrOLD 29485	Obsolete version of ~ cffl...
cusgrres 29486	Restricting a complete sim...
cusgrsizeindb0 29487	Base case of the induction...
cusgrsizeindb1 29488	Base case of the induction...
cusgrsizeindslem 29489	Lemma for ~ cusgrsizeinds ...
cusgrsizeinds 29490	Part 1 of induction step i...
cusgrsize2inds 29491	Induction step in ~ cusgrs...
cusgrsize 29492	The size of a finite compl...
cusgrfilem1 29493	Lemma 1 for ~ cusgrfi . (...
cusgrfilem2 29494	Lemma 2 for ~ cusgrfi . (...
cusgrfilem3 29495	Lemma 3 for ~ cusgrfi . (...
cusgrfi 29496	If the size of a complete ...
usgredgsscusgredg 29497	A simple graph is a subgra...
usgrsscusgr 29498	A simple graph is a subgra...
sizusglecusglem1 29499	Lemma 1 for ~ sizusglecusg...
sizusglecusglem2 29500	Lemma 2 for ~ sizusglecusg...
sizusglecusg 29501	The size of a simple graph...
fusgrmaxsize 29502	The maximum size of a fini...
vtxdgfval 29505	The value of the vertex de...
vtxdgval 29506	The degree of a vertex. (...
vtxdgfival 29507	The degree of a vertex for...
vtxdgop 29508	The vertex degree expresse...
vtxdgf 29509	The vertex degree function...
vtxdgelxnn0 29510	The degree of a vertex is ...
vtxdg0v 29511	The degree of a vertex in ...
vtxdg0e 29512	The degree of a vertex in ...
vtxdgfisnn0 29513	The degree of a vertex in ...
vtxdgfisf 29514	The vertex degree function...
vtxdeqd 29515	Equality theorem for the v...
vtxduhgr0e 29516	The degree of a vertex in ...
vtxdlfuhgr1v 29517	The degree of the vertex i...
vdumgr0 29518	A vertex in a multigraph h...
vtxdun 29519	The degree of a vertex in ...
vtxdfiun 29520	The degree of a vertex in ...
vtxduhgrun 29521	The degree of a vertex in ...
vtxduhgrfiun 29522	The degree of a vertex in ...
vtxdlfgrval 29523	The value of the vertex de...
vtxdumgrval 29524	The value of the vertex de...
vtxdusgrval 29525	The value of the vertex de...
vtxd0nedgb 29526	A vertex has degree 0 iff ...
vtxdushgrfvedglem 29527	Lemma for ~ vtxdushgrfvedg...
vtxdushgrfvedg 29528	The value of the vertex de...
vtxdusgrfvedg 29529	The value of the vertex de...
vtxduhgr0nedg 29530	If a vertex in a hypergrap...
vtxdumgr0nedg 29531	If a vertex in a multigrap...
vtxduhgr0edgnel 29532	A vertex in a hypergraph h...
vtxdusgr0edgnel 29533	A vertex in a simple graph...
vtxdusgr0edgnelALT 29534	Alternate proof of ~ vtxdu...
vtxdgfusgrf 29535	The vertex degree function...
vtxdgfusgr 29536	In a finite simple graph, ...
fusgrn0degnn0 29537	In a nonempty, finite grap...
1loopgruspgr 29538	A graph with one edge whic...
1loopgredg 29539	The set of edges in a grap...
1loopgrnb0 29540	In a graph (simple pseudog...
1loopgrvd2 29541	The vertex degree of a one...
1loopgrvd0 29542	The vertex degree of a one...
1hevtxdg0 29543	The vertex degree of verte...
1hevtxdg1 29544	The vertex degree of verte...
1hegrvtxdg1 29545	The vertex degree of a gra...
1hegrvtxdg1r 29546	The vertex degree of a gra...
1egrvtxdg1 29547	The vertex degree of a one...
1egrvtxdg1r 29548	The vertex degree of a one...
1egrvtxdg0 29549	The vertex degree of a one...
p1evtxdeqlem 29550	Lemma for ~ p1evtxdeq and ...
p1evtxdeq 29551	If an edge ` E ` which doe...
p1evtxdp1 29552	If an edge ` E ` (not bein...
uspgrloopvtx 29553	The set of vertices in a g...
uspgrloopvtxel 29554	A vertex in a graph (simpl...
uspgrloopiedg 29555	The set of edges in a grap...
uspgrloopedg 29556	The set of edges in a grap...
uspgrloopnb0 29557	In a graph (simple pseudog...
uspgrloopvd2 29558	The vertex degree of a one...
umgr2v2evtx 29559	The set of vertices in a m...
umgr2v2evtxel 29560	A vertex in a multigraph w...
umgr2v2eiedg 29561	The edge function in a mul...
umgr2v2eedg 29562	The set of edges in a mult...
umgr2v2e 29563	A multigraph with two edge...
umgr2v2enb1 29564	In a multigraph with two e...
umgr2v2evd2 29565	In a multigraph with two e...
hashnbusgrvd 29566	In a simple graph, the num...
usgruvtxvdb 29567	In a finite simple graph w...
vdiscusgrb 29568	A finite simple graph with...
vdiscusgr 29569	In a finite complete simpl...
vtxdusgradjvtx 29570	The degree of a vertex in ...
usgrvd0nedg 29571	If a vertex in a simple gr...
uhgrvd00 29572	If every vertex in a hyper...
usgrvd00 29573	If every vertex in a simpl...
vdegp1ai 29574	The induction step for a v...
vdegp1bi 29575	The induction step for a v...
vdegp1ci 29576	The induction step for a v...
vtxdginducedm1lem1 29577	Lemma 1 for ~ vtxdginduced...
vtxdginducedm1lem2 29578	Lemma 2 for ~ vtxdginduced...
vtxdginducedm1lem3 29579	Lemma 3 for ~ vtxdginduced...
vtxdginducedm1lem4 29580	Lemma 4 for ~ vtxdginduced...
vtxdginducedm1 29581	The degree of a vertex ` v...
vtxdginducedm1fi 29582	The degree of a vertex ` v...
finsumvtxdg2ssteplem1 29583	Lemma for ~ finsumvtxdg2ss...
finsumvtxdg2ssteplem2 29584	Lemma for ~ finsumvtxdg2ss...
finsumvtxdg2ssteplem3 29585	Lemma for ~ finsumvtxdg2ss...
finsumvtxdg2ssteplem4 29586	Lemma for ~ finsumvtxdg2ss...
finsumvtxdg2sstep 29587	Induction step of ~ finsum...
finsumvtxdg2size 29588	The sum of the degrees of ...
fusgr1th 29589	The sum of the degrees of ...
finsumvtxdgeven 29590	The sum of the degrees of ...
vtxdgoddnumeven 29591	The number of vertices of ...
fusgrvtxdgonume 29592	The number of vertices of ...
isrgr 29597	The property of a class be...
rgrprop 29598	The properties of a k-regu...
isrusgr 29599	The property of being a k-...
rusgrprop 29600	The properties of a k-regu...
rusgrrgr 29601	A k-regular simple graph i...
rusgrusgr 29602	A k-regular simple graph i...
finrusgrfusgr 29603	A finite regular simple gr...
isrusgr0 29604	The property of being a k-...
rusgrprop0 29605	The properties of a k-regu...
usgreqdrusgr 29606	If all vertices in a simpl...
fusgrregdegfi 29607	In a nonempty finite simpl...
fusgrn0eqdrusgr 29608	If all vertices in a nonem...
frusgrnn0 29609	In a nonempty finite k-reg...
0edg0rgr 29610	A graph is 0-regular if it...
uhgr0edg0rgr 29611	A hypergraph is 0-regular ...
uhgr0edg0rgrb 29612	A hypergraph is 0-regular ...
usgr0edg0rusgr 29613	A simple graph is 0-regula...
0vtxrgr 29614	A null graph (with no vert...
0vtxrusgr 29615	A graph with no vertices a...
0uhgrrusgr 29616	The null graph as hypergra...
0grrusgr 29617	The null graph represented...
0grrgr 29618	The null graph represented...
cusgrrusgr 29619	A complete simple graph wi...
cusgrm1rusgr 29620	A finite simple graph with...
rusgrpropnb 29621	The properties of a k-regu...
rusgrpropedg 29622	The properties of a k-regu...
rusgrpropadjvtx 29623	The properties of a k-regu...
rusgrnumwrdl2 29624	In a k-regular simple grap...
rusgr1vtxlem 29625	Lemma for ~ rusgr1vtx . (...
rusgr1vtx 29626	If a k-regular simple grap...
rgrusgrprc 29627	The class of 0-regular sim...
rusgrprc 29628	The class of 0-regular sim...
rgrprc 29629	The class of 0-regular gra...
rgrprcx 29630	The class of 0-regular gra...
rgrx0ndm 29631	0 is not in the domain of ...
rgrx0nd 29632	The potentially alternativ...
ewlksfval 29639	The set of s-walks of edge...
isewlk 29640	Conditions for a function ...
ewlkprop 29641	Properties of an s-walk of...
ewlkinedg 29642	The intersection (common v...
ewlkle 29643	An s-walk of edges is also...
upgrewlkle2 29644	In a pseudograph, there is...
wkslem1 29645	Lemma 1 for walks to subst...
wkslem2 29646	Lemma 2 for walks to subst...
wksfval 29647	The set of walks (in an un...
iswlk 29648	Properties of a pair of fu...
wlkprop 29649	Properties of a walk. (Co...
wlkv 29650	The classes involved in a ...
iswlkg 29651	Generalization of ~ iswlk ...
wlkf 29652	The mapping enumerating th...
wlkcl 29653	A walk has length ` # ( F ...
wlkp 29654	The mapping enumerating th...
wlkpwrd 29655	The sequence of vertices o...
wlklenvp1 29656	The number of vertices of ...
wksv 29657	The class of walks is a se...
wksvOLD 29658	Obsolete version of ~ wksv...
wlkn0 29659	The sequence of vertices o...
wlklenvm1 29660	The number of edges of a w...
ifpsnprss 29661	Lemma for ~ wlkvtxeledg : ...
wlkvtxeledg 29662	Each pair of adjacent vert...
wlkvtxiedg 29663	The vertices of a walk are...
relwlk 29664	The set ` ( Walks `` G ) `...
wlkvv 29665	If there is at least one w...
wlkop 29666	A walk is an ordered pair....
wlkcpr 29667	A walk as class with two c...
wlk2f 29668	If there is a walk ` W ` t...
wlkcomp 29669	A walk expressed by proper...
wlkcompim 29670	Implications for the prope...
wlkelwrd 29671	The components of a walk a...
wlkeq 29672	Conditions for two walks (...
edginwlk 29673	The value of the edge func...
upgredginwlk 29674	The value of the edge func...
iedginwlk 29675	The value of the edge func...
wlkl1loop 29676	A walk of length 1 from a ...
wlk1walk 29677	A walk is a 1-walk "on the...
wlk1ewlk 29678	A walk is an s-walk "on th...
upgriswlk 29679	Properties of a pair of fu...
upgrwlkedg 29680	The edges of a walk in a p...
upgrwlkcompim 29681	Implications for the prope...
wlkvtxedg 29682	The vertices of a walk are...
upgrwlkvtxedg 29683	The pairs of connected ver...
uspgr2wlkeq 29684	Conditions for two walks w...
uspgr2wlkeq2 29685	Conditions for two walks w...
uspgr2wlkeqi 29686	Conditions for two walks w...
umgrwlknloop 29687	In a multigraph, each walk...
wlkResOLD 29688	Obsolete version of ~ opab...
wlkv0 29689	If there is a walk in the ...
g0wlk0 29690	There is no walk in a null...
0wlk0 29691	There is no walk for the e...
wlk0prc 29692	There is no walk in a null...
wlklenvclwlk 29693	The number of vertices in ...
wlkson 29694	The set of walks between t...
iswlkon 29695	Properties of a pair of fu...
wlkonprop 29696	Properties of a walk betwe...
wlkpvtx 29697	A walk connects vertices. ...
wlkepvtx 29698	The endpoints of a walk ar...
wlkoniswlk 29699	A walk between two vertice...
wlkonwlk 29700	A walk is a walk between i...
wlkonwlk1l 29701	A walk is a walk from its ...
wlksoneq1eq2 29702	Two walks with identical s...
wlkonl1iedg 29703	If there is a walk between...
wlkon2n0 29704	The length of a walk betwe...
2wlklem 29705	Lemma for theorems for wal...
upgr2wlk 29706	Properties of a pair of fu...
wlkreslem 29707	Lemma for ~ wlkres . (Con...
wlkres 29708	The restriction ` <. H , Q...
redwlklem 29709	Lemma for ~ redwlk . (Con...
redwlk 29710	A walk ending at the last ...
wlkp1lem1 29711	Lemma for ~ wlkp1 . (Cont...
wlkp1lem2 29712	Lemma for ~ wlkp1 . (Cont...
wlkp1lem3 29713	Lemma for ~ wlkp1 . (Cont...
wlkp1lem4 29714	Lemma for ~ wlkp1 . (Cont...
wlkp1lem5 29715	Lemma for ~ wlkp1 . (Cont...
wlkp1lem6 29716	Lemma for ~ wlkp1 . (Cont...
wlkp1lem7 29717	Lemma for ~ wlkp1 . (Cont...
wlkp1lem8 29718	Lemma for ~ wlkp1 . (Cont...
wlkp1 29719	Append one path segment (e...
wlkdlem1 29720	Lemma 1 for ~ wlkd . (Con...
wlkdlem2 29721	Lemma 2 for ~ wlkd . (Con...
wlkdlem3 29722	Lemma 3 for ~ wlkd . (Con...
wlkdlem4 29723	Lemma 4 for ~ wlkd . (Con...
wlkd 29724	Two words representing a w...
lfgrwlkprop 29725	Two adjacent vertices in a...
lfgriswlk 29726	Conditions for a pair of f...
lfgrwlknloop 29727	In a loop-free graph, each...
reltrls 29732	The set ` ( Trails `` G ) ...
trlsfval 29733	The set of trails (in an u...
istrl 29734	Conditions for a pair of c...
trliswlk 29735	A trail is a walk. (Contr...
trlf1 29736	The enumeration ` F ` of a...
trlreslem 29737	Lemma for ~ trlres . Form...
trlres 29738	The restriction ` <. H , Q...
upgrtrls 29739	The set of trails in a pse...
upgristrl 29740	Properties of a pair of fu...
upgrf1istrl 29741	Properties of a pair of a ...
wksonproplem 29742	Lemma for theorems for pro...
wksonproplemOLD 29743	Obsolete version of ~ wkso...
trlsonfval 29744	The set of trails between ...
istrlson 29745	Properties of a pair of fu...
trlsonprop 29746	Properties of a trail betw...
trlsonistrl 29747	A trail between two vertic...
trlsonwlkon 29748	A trail between two vertic...
trlontrl 29749	A trail is a trail between...
relpths 29758	The set ` ( Paths `` G ) `...
pthsfval 29759	The set of paths (in an un...
spthsfval 29760	The set of simple paths (i...
ispth 29761	Conditions for a pair of c...
isspth 29762	Conditions for a pair of c...
pthistrl 29763	A path is a trail (in an u...
spthispth 29764	A simple path is a path (i...
pthiswlk 29765	A path is a walk (in an un...
spthiswlk 29766	A simple path is a walk (i...
pthdivtx 29767	The inner vertices of a pa...
pthdadjvtx 29768	The adjacent vertices of a...
2pthnloop 29769	A path of length at least ...
upgr2pthnlp 29770	A path of length at least ...
spthdifv 29771	The vertices of a simple p...
spthdep 29772	A simple path (at least of...
pthdepisspth 29773	A path with different star...
upgrwlkdvdelem 29774	Lemma for ~ upgrwlkdvde . ...
upgrwlkdvde 29775	In a pseudograph, all edge...
upgrspthswlk 29776	The set of simple paths in...
upgrwlkdvspth 29777	A walk consisting of diffe...
pthsonfval 29778	The set of paths between t...
spthson 29779	The set of simple paths be...
ispthson 29780	Properties of a pair of fu...
isspthson 29781	Properties of a pair of fu...
pthsonprop 29782	Properties of a path betwe...
spthonprop 29783	Properties of a simple pat...
pthonispth 29784	A path between two vertice...
pthontrlon 29785	A path between two vertice...
pthonpth 29786	A path is a path between i...
isspthonpth 29787	A pair of functions is a s...
spthonisspth 29788	A simple path between to v...
spthonpthon 29789	A simple path between two ...
spthonepeq 29790	The endpoints of a simple ...
uhgrwkspthlem1 29791	Lemma 1 for ~ uhgrwkspth ....
uhgrwkspthlem2 29792	Lemma 2 for ~ uhgrwkspth ....
uhgrwkspth 29793	Any walk of length 1 betwe...
usgr2wlkneq 29794	The vertices and edges are...
usgr2wlkspthlem1 29795	Lemma 1 for ~ usgr2wlkspth...
usgr2wlkspthlem2 29796	Lemma 2 for ~ usgr2wlkspth...
usgr2wlkspth 29797	In a simple graph, any wal...
usgr2trlncl 29798	In a simple graph, any tra...
usgr2trlspth 29799	In a simple graph, any tra...
usgr2pthspth 29800	In a simple graph, any pat...
usgr2pthlem 29801	Lemma for ~ usgr2pth . (C...
usgr2pth 29802	In a simple graph, there i...
usgr2pth0 29803	In a simply graph, there i...
pthdlem1 29804	Lemma 1 for ~ pthd . (Con...
pthdlem2lem 29805	Lemma for ~ pthdlem2 . (C...
pthdlem2 29806	Lemma 2 for ~ pthd . (Con...
pthd 29807	Two words representing a t...
clwlks 29810	The set of closed walks (i...
isclwlk 29811	A pair of functions repres...
clwlkiswlk 29812	A closed walk is a walk (i...
clwlkwlk 29813	Closed walks are walks (in...
clwlkswks 29814	Closed walks are walks (in...
isclwlke 29815	Properties of a pair of fu...
isclwlkupgr 29816	Properties of a pair of fu...
clwlkcomp 29817	A closed walk expressed by...
clwlkcompim 29818	Implications for the prope...
upgrclwlkcompim 29819	Implications for the prope...
clwlkcompbp 29820	Basic properties of the co...
clwlkl1loop 29821	A closed walk of length 1 ...
crcts 29826	The set of circuits (in an...
cycls 29827	The set of cycles (in an u...
iscrct 29828	Sufficient and necessary c...
iscycl 29829	Sufficient and necessary c...
crctprop 29830	The properties of a circui...
cyclprop 29831	The properties of a cycle:...
crctisclwlk 29832	A circuit is a closed walk...
crctistrl 29833	A circuit is a trail. (Co...
crctiswlk 29834	A circuit is a walk. (Con...
cyclispth 29835	A cycle is a path. (Contr...
cycliswlk 29836	A cycle is a walk. (Contr...
cycliscrct 29837	A cycle is a circuit. (Co...
cyclnspth 29838	A (non-trivial) cycle is n...
cyclispthon 29839	A cycle is a path starting...
lfgrn1cycl 29840	In a loop-free graph there...
usgr2trlncrct 29841	In a simple graph, any tra...
umgrn1cycl 29842	In a multigraph graph (wit...
uspgrn2crct 29843	In a simple pseudograph th...
usgrn2cycl 29844	In a simple graph there ar...
crctcshwlkn0lem1 29845	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem2 29846	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem3 29847	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem4 29848	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem5 29849	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem6 29850	Lemma for ~ crctcshwlkn0 ....
crctcshwlkn0lem7 29851	Lemma for ~ crctcshwlkn0 ....
crctcshlem1 29852	Lemma for ~ crctcsh . (Co...
crctcshlem2 29853	Lemma for ~ crctcsh . (Co...
crctcshlem3 29854	Lemma for ~ crctcsh . (Co...
crctcshlem4 29855	Lemma for ~ crctcsh . (Co...
crctcshwlkn0 29856	Cyclically shifting the in...
crctcshwlk 29857	Cyclically shifting the in...
crctcshtrl 29858	Cyclically shifting the in...
crctcsh 29859	Cyclically shifting the in...
wwlks 29870	The set of walks (in an un...
iswwlks 29871	A word over the set of ver...
wwlksn 29872	The set of walks (in an un...
iswwlksn 29873	A word over the set of ver...
wwlksnprcl 29874	Derivation of the length o...
iswwlksnx 29875	Properties of a word to re...
wwlkbp 29876	Basic properties of a walk...
wwlknbp 29877	Basic properties of a walk...
wwlknp 29878	Properties of a set being ...
wwlknbp1 29879	Other basic properties of ...
wwlknvtx 29880	The symbols of a word ` W ...
wwlknllvtx 29881	If a word ` W ` represents...
wwlknlsw 29882	If a word represents a wal...
wspthsn 29883	The set of simple paths of...
iswspthn 29884	An element of the set of s...
wspthnp 29885	Properties of a set being ...
wwlksnon 29886	The set of walks of a fixe...
wspthsnon 29887	The set of simple paths of...
iswwlksnon 29888	The set of walks of a fixe...
wwlksnon0 29889	Sufficient conditions for ...
wwlksonvtx 29890	If a word ` W ` represents...
iswspthsnon 29891	The set of simple paths of...
wwlknon 29892	An element of the set of w...
wspthnon 29893	An element of the set of s...
wspthnonp 29894	Properties of a set being ...
wspthneq1eq2 29895	Two simple paths with iden...
wwlksn0s 29896	The set of all walks as wo...
wwlkssswrd 29897	Walks (represented by word...
wwlksn0 29898	A walk of length 0 is repr...
0enwwlksnge1 29899	In graphs without edges, t...
wwlkswwlksn 29900	A walk of a fixed length a...
wwlkssswwlksn 29901	The walks of a fixed lengt...
wlkiswwlks1 29902	The sequence of vertices i...
wlklnwwlkln1 29903	The sequence of vertices i...
wlkiswwlks2lem1 29904	Lemma 1 for ~ wlkiswwlks2 ...
wlkiswwlks2lem2 29905	Lemma 2 for ~ wlkiswwlks2 ...
wlkiswwlks2lem3 29906	Lemma 3 for ~ wlkiswwlks2 ...
wlkiswwlks2lem4 29907	Lemma 4 for ~ wlkiswwlks2 ...
wlkiswwlks2lem5 29908	Lemma 5 for ~ wlkiswwlks2 ...
wlkiswwlks2lem6 29909	Lemma 6 for ~ wlkiswwlks2 ...
wlkiswwlks2 29910	A walk as word corresponds...
wlkiswwlks 29911	A walk as word corresponds...
wlkiswwlksupgr2 29912	A walk as word corresponds...
wlkiswwlkupgr 29913	A walk as word corresponds...
wlkswwlksf1o 29914	The mapping of (ordinary) ...
wlkswwlksen 29915	The set of walks as words ...
wwlksm1edg 29916	Removing the trailing edge...
wlklnwwlkln2lem 29917	Lemma for ~ wlklnwwlkln2 a...
wlklnwwlkln2 29918	A walk of length ` N ` as ...
wlklnwwlkn 29919	A walk of length ` N ` as ...
wlklnwwlklnupgr2 29920	A walk of length ` N ` as ...
wlklnwwlknupgr 29921	A walk of length ` N ` as ...
wlknewwlksn 29922	If a walk in a pseudograph...
wlknwwlksnbij 29923	The mapping ` ( t e. T |->...
wlknwwlksnen 29924	In a simple pseudograph, t...
wlknwwlksneqs 29925	The set of walks of a fixe...
wwlkseq 29926	Equality of two walks (as ...
wwlksnred 29927	Reduction of a walk (as wo...
wwlksnext 29928	Extension of a walk (as wo...
wwlksnextbi 29929	Extension of a walk (as wo...
wwlksnredwwlkn 29930	For each walk (as word) of...
wwlksnredwwlkn0 29931	For each walk (as word) of...
wwlksnextwrd 29932	Lemma for ~ wwlksnextbij ....
wwlksnextfun 29933	Lemma for ~ wwlksnextbij ....
wwlksnextinj 29934	Lemma for ~ wwlksnextbij ....
wwlksnextsurj 29935	Lemma for ~ wwlksnextbij ....
wwlksnextbij0 29936	Lemma for ~ wwlksnextbij ....
wwlksnextbij 29937	There is a bijection betwe...
wwlksnexthasheq 29938	The number of the extensio...
disjxwwlksn 29939	Sets of walks (as words) e...
wwlksnndef 29940	Conditions for ` WWalksN `...
wwlksnfi 29941	The number of walks repres...
wlksnfi 29942	The number of walks of fix...
wlksnwwlknvbij 29943	There is a bijection betwe...
wwlksnextproplem1 29944	Lemma 1 for ~ wwlksnextpro...
wwlksnextproplem2 29945	Lemma 2 for ~ wwlksnextpro...
wwlksnextproplem3 29946	Lemma 3 for ~ wwlksnextpro...
wwlksnextprop 29947	Adding additional properti...
disjxwwlkn 29948	Sets of walks (as words) e...
hashwwlksnext 29949	Number of walks (as words)...
wwlksnwwlksnon 29950	A walk of fixed length is ...
wspthsnwspthsnon 29951	A simple path of fixed len...
wspthsnonn0vne 29952	If the set of simple paths...
wspthsswwlkn 29953	The set of simple paths of...
wspthnfi 29954	In a finite graph, the set...
wwlksnonfi 29955	In a finite graph, the set...
wspthsswwlknon 29956	The set of simple paths of...
wspthnonfi 29957	In a finite graph, the set...
wspniunwspnon 29958	The set of nonempty simple...
wspn0 29959	If there are no vertices, ...
2wlkdlem1 29960	Lemma 1 for ~ 2wlkd . (Co...
2wlkdlem2 29961	Lemma 2 for ~ 2wlkd . (Co...
2wlkdlem3 29962	Lemma 3 for ~ 2wlkd . (Co...
2wlkdlem4 29963	Lemma 4 for ~ 2wlkd . (Co...
2wlkdlem5 29964	Lemma 5 for ~ 2wlkd . (Co...
2pthdlem1 29965	Lemma 1 for ~ 2pthd . (Co...
2wlkdlem6 29966	Lemma 6 for ~ 2wlkd . (Co...
2wlkdlem7 29967	Lemma 7 for ~ 2wlkd . (Co...
2wlkdlem8 29968	Lemma 8 for ~ 2wlkd . (Co...
2wlkdlem9 29969	Lemma 9 for ~ 2wlkd . (Co...
2wlkdlem10 29970	Lemma 10 for ~ 3wlkd . (C...
2wlkd 29971	Construction of a walk fro...
2wlkond 29972	A walk of length 2 from on...
2trld 29973	Construction of a trail fr...
2trlond 29974	A trail of length 2 from o...
2pthd 29975	A path of length 2 from on...
2spthd 29976	A simple path of length 2 ...
2pthond 29977	A simple path of length 2 ...
2pthon3v 29978	For a vertex adjacent to t...
umgr2adedgwlklem 29979	Lemma for ~ umgr2adedgwlk ...
umgr2adedgwlk 29980	In a multigraph, two adjac...
umgr2adedgwlkon 29981	In a multigraph, two adjac...
umgr2adedgwlkonALT 29982	Alternate proof for ~ umgr...
umgr2adedgspth 29983	In a multigraph, two adjac...
umgr2wlk 29984	In a multigraph, there is ...
umgr2wlkon 29985	For each pair of adjacent ...
elwwlks2s3 29986	A walk of length 2 as word...
midwwlks2s3 29987	There is a vertex between ...
wwlks2onv 29988	If a length 3 string repre...
elwwlks2ons3im 29989	A walk as word of length 2...
elwwlks2ons3 29990	For each walk of length 2 ...
s3wwlks2on 29991	A length 3 string which re...
umgrwwlks2on 29992	A walk of length 2 between...
wwlks2onsym 29993	There is a walk of length ...
elwwlks2on 29994	A walk of length 2 between...
elwspths2on 29995	A simple path of length 2 ...
wpthswwlks2on 29996	For two different vertices...
2wspdisj 29997	All simple paths of length...
2wspiundisj 29998	All simple paths of length...
usgr2wspthons3 29999	A simple path of length 2 ...
usgr2wspthon 30000	A simple path of length 2 ...
elwwlks2 30001	A walk of length 2 between...
elwspths2spth 30002	A simple path of length 2 ...
rusgrnumwwlkl1 30003	In a k-regular graph, ther...
rusgrnumwwlkslem 30004	Lemma for ~ rusgrnumwwlks ...
rusgrnumwwlklem 30005	Lemma for ~ rusgrnumwwlk e...
rusgrnumwwlkb0 30006	Induction base 0 for ~ rus...
rusgrnumwwlkb1 30007	Induction base 1 for ~ rus...
rusgr0edg 30008	Special case for graphs wi...
rusgrnumwwlks 30009	Induction step for ~ rusgr...
rusgrnumwwlk 30010	In a ` K `-regular graph, ...
rusgrnumwwlkg 30011	In a ` K `-regular graph, ...
rusgrnumwlkg 30012	In a k-regular graph, the ...
clwwlknclwwlkdif 30013	The set ` A ` of walks of ...
clwwlknclwwlkdifnum 30014	In a ` K `-regular graph, ...
clwwlk 30017	The set of closed walks (i...
isclwwlk 30018	Properties of a word to re...
clwwlkbp 30019	Basic properties of a clos...
clwwlkgt0 30020	There is no empty closed w...
clwwlksswrd 30021	Closed walks (represented ...
clwwlk1loop 30022	A closed walk of length 1 ...
clwwlkccatlem 30023	Lemma for ~ clwwlkccat : i...
clwwlkccat 30024	The concatenation of two w...
umgrclwwlkge2 30025	A closed walk in a multigr...
clwlkclwwlklem2a1 30026	Lemma 1 for ~ clwlkclwwlkl...
clwlkclwwlklem2a2 30027	Lemma 2 for ~ clwlkclwwlkl...
clwlkclwwlklem2a3 30028	Lemma 3 for ~ clwlkclwwlkl...
clwlkclwwlklem2fv1 30029	Lemma 4a for ~ clwlkclwwlk...
clwlkclwwlklem2fv2 30030	Lemma 4b for ~ clwlkclwwlk...
clwlkclwwlklem2a4 30031	Lemma 4 for ~ clwlkclwwlkl...
clwlkclwwlklem2a 30032	Lemma for ~ clwlkclwwlklem...
clwlkclwwlklem1 30033	Lemma 1 for ~ clwlkclwwlk ...
clwlkclwwlklem2 30034	Lemma 2 for ~ clwlkclwwlk ...
clwlkclwwlklem3 30035	Lemma 3 for ~ clwlkclwwlk ...
clwlkclwwlk 30036	A closed walk as word of l...
clwlkclwwlk2 30037	A closed walk corresponds ...
clwlkclwwlkflem 30038	Lemma for ~ clwlkclwwlkf ....
clwlkclwwlkf1lem2 30039	Lemma 2 for ~ clwlkclwwlkf...
clwlkclwwlkf1lem3 30040	Lemma 3 for ~ clwlkclwwlkf...
clwlkclwwlkfolem 30041	Lemma for ~ clwlkclwwlkfo ...
clwlkclwwlkf 30042	` F ` is a function from t...
clwlkclwwlkfo 30043	` F ` is a function from t...
clwlkclwwlkf1 30044	` F ` is a one-to-one func...
clwlkclwwlkf1o 30045	` F ` is a bijection betwe...
clwlkclwwlken 30046	The set of the nonempty cl...
clwwisshclwwslemlem 30047	Lemma for ~ clwwisshclwwsl...
clwwisshclwwslem 30048	Lemma for ~ clwwisshclwws ...
clwwisshclwws 30049	Cyclically shifting a clos...
clwwisshclwwsn 30050	Cyclically shifting a clos...
erclwwlkrel 30051	` .~ ` is a relation. (Co...
erclwwlkeq 30052	Two classes are equivalent...
erclwwlkeqlen 30053	If two classes are equival...
erclwwlkref 30054	` .~ ` is a reflexive rela...
erclwwlksym 30055	` .~ ` is a symmetric rela...
erclwwlktr 30056	` .~ ` is a transitive rel...
erclwwlk 30057	` .~ ` is an equivalence r...
clwwlkn 30060	The set of closed walks of...
isclwwlkn 30061	A word over the set of ver...
clwwlkn0 30062	There is no closed walk of...
clwwlkneq0 30063	Sufficient conditions for ...
clwwlkclwwlkn 30064	A closed walk of a fixed l...
clwwlksclwwlkn 30065	The closed walks of a fixe...
clwwlknlen 30066	The length of a word repre...
clwwlknnn 30067	The length of a closed wal...
clwwlknwrd 30068	A closed walk of a fixed l...
clwwlknbp 30069	Basic properties of a clos...
isclwwlknx 30070	Characterization of a word...
clwwlknp 30071	Properties of a set being ...
clwwlknwwlksn 30072	A word representing a clos...
clwwlknlbonbgr1 30073	The last but one vertex in...
clwwlkinwwlk 30074	If the initial vertex of a...
clwwlkn1 30075	A closed walk of length 1 ...
loopclwwlkn1b 30076	The singleton word consist...
clwwlkn1loopb 30077	A word represents a closed...
clwwlkn2 30078	A closed walk of length 2 ...
clwwlknfi 30079	If there is only a finite ...
clwwlkel 30080	Obtaining a closed walk (a...
clwwlkf 30081	Lemma 1 for ~ clwwlkf1o : ...
clwwlkfv 30082	Lemma 2 for ~ clwwlkf1o : ...
clwwlkf1 30083	Lemma 3 for ~ clwwlkf1o : ...
clwwlkfo 30084	Lemma 4 for ~ clwwlkf1o : ...
clwwlkf1o 30085	F is a 1-1 onto function, ...
clwwlken 30086	The set of closed walks of...
clwwlknwwlkncl 30087	Obtaining a closed walk (a...
clwwlkwwlksb 30088	A nonempty word over verti...
clwwlknwwlksnb 30089	A word over vertices repre...
clwwlkext2edg 30090	If a word concatenated wit...
wwlksext2clwwlk 30091	If a word represents a wal...
wwlksubclwwlk 30092	Any prefix of a word repre...
clwwnisshclwwsn 30093	Cyclically shifting a clos...
eleclclwwlknlem1 30094	Lemma 1 for ~ eleclclwwlkn...
eleclclwwlknlem2 30095	Lemma 2 for ~ eleclclwwlkn...
clwwlknscsh 30096	The set of cyclical shifts...
clwwlknccat 30097	The concatenation of two w...
umgr2cwwk2dif 30098	If a word represents a clo...
umgr2cwwkdifex 30099	If a word represents a clo...
erclwwlknrel 30100	` .~ ` is a relation. (Co...
erclwwlkneq 30101	Two classes are equivalent...
erclwwlkneqlen 30102	If two classes are equival...
erclwwlknref 30103	` .~ ` is a reflexive rela...
erclwwlknsym 30104	` .~ ` is a symmetric rela...
erclwwlkntr 30105	` .~ ` is a transitive rel...
erclwwlkn 30106	` .~ ` is an equivalence r...
qerclwwlknfi 30107	The quotient set of the se...
hashclwwlkn0 30108	The number of closed walks...
eclclwwlkn1 30109	An equivalence class accor...
eleclclwwlkn 30110	A member of an equivalence...
hashecclwwlkn1 30111	The size of every equivale...
umgrhashecclwwlk 30112	The size of every equivale...
fusgrhashclwwlkn 30113	The size of the set of clo...
clwwlkndivn 30114	The size of the set of clo...
clwlknf1oclwwlknlem1 30115	Lemma 1 for ~ clwlknf1oclw...
clwlknf1oclwwlknlem2 30116	Lemma 2 for ~ clwlknf1oclw...
clwlknf1oclwwlknlem3 30117	Lemma 3 for ~ clwlknf1oclw...
clwlknf1oclwwlkn 30118	There is a one-to-one onto...
clwlkssizeeq 30119	The size of the set of clo...
clwlksndivn 30120	The size of the set of clo...
clwwlknonmpo 30123	` ( ClWWalksNOn `` G ) ` i...
clwwlknon 30124	The set of closed walks on...
isclwwlknon 30125	A word over the set of ver...
clwwlk0on0 30126	There is no word over the ...
clwwlknon0 30127	Sufficient conditions for ...
clwwlknonfin 30128	In a finite graph ` G ` , ...
clwwlknonel 30129	Characterization of a word...
clwwlknonccat 30130	The concatenation of two w...
clwwlknon1 30131	The set of closed walks on...
clwwlknon1loop 30132	If there is a loop at vert...
clwwlknon1nloop 30133	If there is no loop at ver...
clwwlknon1sn 30134	The set of (closed) walks ...
clwwlknon1le1 30135	There is at most one (clos...
clwwlknon2 30136	The set of closed walks on...
clwwlknon2x 30137	The set of closed walks on...
s2elclwwlknon2 30138	Sufficient conditions of a...
clwwlknon2num 30139	In a ` K `-regular graph `...
clwwlknonwwlknonb 30140	A word over vertices repre...
clwwlknonex2lem1 30141	Lemma 1 for ~ clwwlknonex2...
clwwlknonex2lem2 30142	Lemma 2 for ~ clwwlknonex2...
clwwlknonex2 30143	Extending a closed walk ` ...
clwwlknonex2e 30144	Extending a closed walk ` ...
clwwlknondisj 30145	The sets of closed walks o...
clwwlknun 30146	The set of closed walks of...
clwwlkvbij 30147	There is a bijection betwe...
0ewlk 30148	The empty set (empty seque...
1ewlk 30149	A sequence of 1 edge is an...
0wlk 30150	A pair of an empty set (of...
is0wlk 30151	A pair of an empty set (of...
0wlkonlem1 30152	Lemma 1 for ~ 0wlkon and ~...
0wlkonlem2 30153	Lemma 2 for ~ 0wlkon and ~...
0wlkon 30154	A walk of length 0 from a ...
0wlkons1 30155	A walk of length 0 from a ...
0trl 30156	A pair of an empty set (of...
is0trl 30157	A pair of an empty set (of...
0trlon 30158	A trail of length 0 from a...
0pth 30159	A pair of an empty set (of...
0spth 30160	A pair of an empty set (of...
0pthon 30161	A path of length 0 from a ...
0pthon1 30162	A path of length 0 from a ...
0pthonv 30163	For each vertex there is a...
0clwlk 30164	A pair of an empty set (of...
0clwlkv 30165	Any vertex (more precisely...
0clwlk0 30166	There is no closed walk in...
0crct 30167	A pair of an empty set (of...
0cycl 30168	A pair of an empty set (of...
1pthdlem1 30169	Lemma 1 for ~ 1pthd . (Co...
1pthdlem2 30170	Lemma 2 for ~ 1pthd . (Co...
1wlkdlem1 30171	Lemma 1 for ~ 1wlkd . (Co...
1wlkdlem2 30172	Lemma 2 for ~ 1wlkd . (Co...
1wlkdlem3 30173	Lemma 3 for ~ 1wlkd . (Co...
1wlkdlem4 30174	Lemma 4 for ~ 1wlkd . (Co...
1wlkd 30175	In a graph with two vertic...
1trld 30176	In a graph with two vertic...
1pthd 30177	In a graph with two vertic...
1pthond 30178	In a graph with two vertic...
upgr1wlkdlem1 30179	Lemma 1 for ~ upgr1wlkd . ...
upgr1wlkdlem2 30180	Lemma 2 for ~ upgr1wlkd . ...
upgr1wlkd 30181	In a pseudograph with two ...
upgr1trld 30182	In a pseudograph with two ...
upgr1pthd 30183	In a pseudograph with two ...
upgr1pthond 30184	In a pseudograph with two ...
lppthon 30185	A loop (which is an edge a...
lp1cycl 30186	A loop (which is an edge a...
1pthon2v 30187	For each pair of adjacent ...
1pthon2ve 30188	For each pair of adjacent ...
wlk2v2elem1 30189	Lemma 1 for ~ wlk2v2e : ` ...
wlk2v2elem2 30190	Lemma 2 for ~ wlk2v2e : T...
wlk2v2e 30191	In a graph with two vertic...
ntrl2v2e 30192	A walk which is not a trai...
3wlkdlem1 30193	Lemma 1 for ~ 3wlkd . (Co...
3wlkdlem2 30194	Lemma 2 for ~ 3wlkd . (Co...
3wlkdlem3 30195	Lemma 3 for ~ 3wlkd . (Co...
3wlkdlem4 30196	Lemma 4 for ~ 3wlkd . (Co...
3wlkdlem5 30197	Lemma 5 for ~ 3wlkd . (Co...
3pthdlem1 30198	Lemma 1 for ~ 3pthd . (Co...
3wlkdlem6 30199	Lemma 6 for ~ 3wlkd . (Co...
3wlkdlem7 30200	Lemma 7 for ~ 3wlkd . (Co...
3wlkdlem8 30201	Lemma 8 for ~ 3wlkd . (Co...
3wlkdlem9 30202	Lemma 9 for ~ 3wlkd . (Co...
3wlkdlem10 30203	Lemma 10 for ~ 3wlkd . (C...
3wlkd 30204	Construction of a walk fro...
3wlkond 30205	A walk of length 3 from on...
3trld 30206	Construction of a trail fr...
3trlond 30207	A trail of length 3 from o...
3pthd 30208	A path of length 3 from on...
3pthond 30209	A path of length 3 from on...
3spthd 30210	A simple path of length 3 ...
3spthond 30211	A simple path of length 3 ...
3cycld 30212	Construction of a 3-cycle ...
3cyclpd 30213	Construction of a 3-cycle ...
upgr3v3e3cycl 30214	If there is a cycle of len...
uhgr3cyclexlem 30215	Lemma for ~ uhgr3cyclex . ...
uhgr3cyclex 30216	If there are three differe...
umgr3cyclex 30217	If there are three (differ...
umgr3v3e3cycl 30218	If and only if there is a ...
upgr4cycl4dv4e 30219	If there is a cycle of len...
dfconngr1 30222	Alternative definition of ...
isconngr 30223	The property of being a co...
isconngr1 30224	The property of being a co...
cusconngr 30225	A complete hypergraph is c...
0conngr 30226	A graph without vertices i...
0vconngr 30227	A graph without vertices i...
1conngr 30228	A graph with (at most) one...
conngrv2edg 30229	A vertex in a connected gr...
vdn0conngrumgrv2 30230	A vertex in a connected mu...
releupth 30233	The set ` ( EulerPaths `` ...
eupths 30234	The Eulerian paths on the ...
iseupth 30235	The property " ` <. F , P ...
iseupthf1o 30236	The property " ` <. F , P ...
eupthi 30237	Properties of an Eulerian ...
eupthf1o 30238	The ` F ` function in an E...
eupthfi 30239	Any graph with an Eulerian...
eupthseg 30240	The ` N ` -th edge in an e...
upgriseupth 30241	The property " ` <. F , P ...
upgreupthi 30242	Properties of an Eulerian ...
upgreupthseg 30243	The ` N ` -th edge in an e...
eupthcl 30244	An Eulerian path has lengt...
eupthistrl 30245	An Eulerian path is a trai...
eupthiswlk 30246	An Eulerian path is a walk...
eupthpf 30247	The ` P ` function in an E...
eupth0 30248	There is an Eulerian path ...
eupthres 30249	The restriction ` <. H , Q...
eupthp1 30250	Append one path segment to...
eupth2eucrct 30251	Append one path segment to...
eupth2lem1 30252	Lemma for ~ eupth2 . (Con...
eupth2lem2 30253	Lemma for ~ eupth2 . (Con...
trlsegvdeglem1 30254	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem2 30255	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem3 30256	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem4 30257	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem5 30258	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem6 30259	Lemma for ~ trlsegvdeg . ...
trlsegvdeglem7 30260	Lemma for ~ trlsegvdeg . ...
trlsegvdeg 30261	Formerly part of proof of ...
eupth2lem3lem1 30262	Lemma for ~ eupth2lem3 . ...
eupth2lem3lem2 30263	Lemma for ~ eupth2lem3 . ...
eupth2lem3lem3 30264	Lemma for ~ eupth2lem3 , f...
eupth2lem3lem4 30265	Lemma for ~ eupth2lem3 , f...
eupth2lem3lem5 30266	Lemma for ~ eupth2 . (Con...
eupth2lem3lem6 30267	Formerly part of proof of ...
eupth2lem3lem7 30268	Lemma for ~ eupth2lem3 : ...
eupthvdres 30269	Formerly part of proof of ...
eupth2lem3 30270	Lemma for ~ eupth2 . (Con...
eupth2lemb 30271	Lemma for ~ eupth2 (induct...
eupth2lems 30272	Lemma for ~ eupth2 (induct...
eupth2 30273	The only vertices of odd d...
eulerpathpr 30274	A graph with an Eulerian p...
eulerpath 30275	A pseudograph with an Eule...
eulercrct 30276	A pseudograph with an Eule...
eucrctshift 30277	Cyclically shifting the in...
eucrct2eupth1 30278	Removing one edge ` ( I ``...
eucrct2eupth 30279	Removing one edge ` ( I ``...
konigsbergvtx 30280	The set of vertices of the...
konigsbergiedg 30281	The indexed edges of the K...
konigsbergiedgw 30282	The indexed edges of the K...
konigsbergssiedgwpr 30283	Each subset of the indexed...
konigsbergssiedgw 30284	Each subset of the indexed...
konigsbergumgr 30285	The Königsberg graph ...
konigsberglem1 30286	Lemma 1 for ~ konigsberg :...
konigsberglem2 30287	Lemma 2 for ~ konigsberg :...
konigsberglem3 30288	Lemma 3 for ~ konigsberg :...
konigsberglem4 30289	Lemma 4 for ~ konigsberg :...
konigsberglem5 30290	Lemma 5 for ~ konigsberg :...
konigsberg 30291	The Königsberg Bridge...
isfrgr 30294	The property of being a fr...
frgrusgr 30295	A friendship graph is a si...
frgr0v 30296	Any null graph (set with n...
frgr0vb 30297	Any null graph (without ve...
frgruhgr0v 30298	Any null graph (without ve...
frgr0 30299	The null graph (graph with...
frcond1 30300	The friendship condition: ...
frcond2 30301	The friendship condition: ...
frgreu 30302	Variant of ~ frcond2 : An...
frcond3 30303	The friendship condition, ...
frcond4 30304	The friendship condition, ...
frgr1v 30305	Any graph with (at most) o...
nfrgr2v 30306	Any graph with two (differ...
frgr3vlem1 30307	Lemma 1 for ~ frgr3v . (C...
frgr3vlem2 30308	Lemma 2 for ~ frgr3v . (C...
frgr3v 30309	Any graph with three verti...
1vwmgr 30310	Every graph with one verte...
3vfriswmgrlem 30311	Lemma for ~ 3vfriswmgr . ...
3vfriswmgr 30312	Every friendship graph wit...
1to2vfriswmgr 30313	Every friendship graph wit...
1to3vfriswmgr 30314	Every friendship graph wit...
1to3vfriendship 30315	The friendship theorem for...
2pthfrgrrn 30316	Between any two (different...
2pthfrgrrn2 30317	Between any two (different...
2pthfrgr 30318	Between any two (different...
3cyclfrgrrn1 30319	Every vertex in a friendsh...
3cyclfrgrrn 30320	Every vertex in a friendsh...
3cyclfrgrrn2 30321	Every vertex in a friendsh...
3cyclfrgr 30322	Every vertex in a friendsh...
4cycl2v2nb 30323	In a (maybe degenerate) 4-...
4cycl2vnunb 30324	In a 4-cycle, two distinct...
n4cyclfrgr 30325	There is no 4-cycle in a f...
4cyclusnfrgr 30326	A graph with a 4-cycle is ...
frgrnbnb 30327	If two neighbors ` U ` and...
frgrconngr 30328	A friendship graph is conn...
vdgn0frgrv2 30329	A vertex in a friendship g...
vdgn1frgrv2 30330	Any vertex in a friendship...
vdgn1frgrv3 30331	Any vertex in a friendship...
vdgfrgrgt2 30332	Any vertex in a friendship...
frgrncvvdeqlem1 30333	Lemma 1 for ~ frgrncvvdeq ...
frgrncvvdeqlem2 30334	Lemma 2 for ~ frgrncvvdeq ...
frgrncvvdeqlem3 30335	Lemma 3 for ~ frgrncvvdeq ...
frgrncvvdeqlem4 30336	Lemma 4 for ~ frgrncvvdeq ...
frgrncvvdeqlem5 30337	Lemma 5 for ~ frgrncvvdeq ...
frgrncvvdeqlem6 30338	Lemma 6 for ~ frgrncvvdeq ...
frgrncvvdeqlem7 30339	Lemma 7 for ~ frgrncvvdeq ...
frgrncvvdeqlem8 30340	Lemma 8 for ~ frgrncvvdeq ...
frgrncvvdeqlem9 30341	Lemma 9 for ~ frgrncvvdeq ...
frgrncvvdeqlem10 30342	Lemma 10 for ~ frgrncvvdeq...
frgrncvvdeq 30343	In a friendship graph, two...
frgrwopreglem4a 30344	In a friendship graph any ...
frgrwopreglem5a 30345	If a friendship graph has ...
frgrwopreglem1 30346	Lemma 1 for ~ frgrwopreg :...
frgrwopreglem2 30347	Lemma 2 for ~ frgrwopreg ....
frgrwopreglem3 30348	Lemma 3 for ~ frgrwopreg ....
frgrwopreglem4 30349	Lemma 4 for ~ frgrwopreg ....
frgrwopregasn 30350	According to statement 5 i...
frgrwopregbsn 30351	According to statement 5 i...
frgrwopreg1 30352	According to statement 5 i...
frgrwopreg2 30353	According to statement 5 i...
frgrwopreglem5lem 30354	Lemma for ~ frgrwopreglem5...
frgrwopreglem5 30355	Lemma 5 for ~ frgrwopreg ....
frgrwopreglem5ALT 30356	Alternate direct proof of ...
frgrwopreg 30357	In a friendship graph ther...
frgrregorufr0 30358	In a friendship graph ther...
frgrregorufr 30359	If there is a vertex havin...
frgrregorufrg 30360	If there is a vertex havin...
frgr2wwlkeu 30361	For two different vertices...
frgr2wwlkn0 30362	In a friendship graph, the...
frgr2wwlk1 30363	In a friendship graph, the...
frgr2wsp1 30364	In a friendship graph, the...
frgr2wwlkeqm 30365	If there is a (simple) pat...
frgrhash2wsp 30366	The number of simple paths...
fusgreg2wsplem 30367	Lemma for ~ fusgreg2wsp an...
fusgr2wsp2nb 30368	The set of paths of length...
fusgreghash2wspv 30369	According to statement 7 i...
fusgreg2wsp 30370	In a finite simple graph, ...
2wspmdisj 30371	The sets of paths of lengt...
fusgreghash2wsp 30372	In a finite k-regular grap...
frrusgrord0lem 30373	Lemma for ~ frrusgrord0 . ...
frrusgrord0 30374	If a nonempty finite frien...
frrusgrord 30375	If a nonempty finite frien...
numclwwlk2lem1lem 30376	Lemma for ~ numclwwlk2lem1...
2clwwlklem 30377	Lemma for ~ clwwnonrepclww...
clwwnrepclwwn 30378	If the initial vertex of a...
clwwnonrepclwwnon 30379	If the initial vertex of a...
2clwwlk2clwwlklem 30380	Lemma for ~ 2clwwlk2clwwlk...
2clwwlk 30381	Value of operation ` C ` ,...
2clwwlk2 30382	The set ` ( X C 2 ) ` of d...
2clwwlkel 30383	Characterization of an ele...
2clwwlk2clwwlk 30384	An element of the value of...
numclwwlk1lem2foalem 30385	Lemma for ~ numclwwlk1lem2...
extwwlkfab 30386	The set ` ( X C N ) ` of d...
extwwlkfabel 30387	Characterization of an ele...
numclwwlk1lem2foa 30388	Going forth and back from ...
numclwwlk1lem2f 30389	` T ` is a function, mappi...
numclwwlk1lem2fv 30390	Value of the function ` T ...
numclwwlk1lem2f1 30391	` T ` is a 1-1 function. ...
numclwwlk1lem2fo 30392	` T ` is an onto function....
numclwwlk1lem2f1o 30393	` T ` is a 1-1 onto functi...
numclwwlk1lem2 30394	The set of double loops of...
numclwwlk1 30395	Statement 9 in [Huneke] p....
clwwlknonclwlknonf1o 30396	` F ` is a bijection betwe...
clwwlknonclwlknonen 30397	The sets of the two repres...
dlwwlknondlwlknonf1olem1 30398	Lemma 1 for ~ dlwwlknondlw...
dlwwlknondlwlknonf1o 30399	` F ` is a bijection betwe...
dlwwlknondlwlknonen 30400	The sets of the two repres...
wlkl0 30401	There is exactly one walk ...
clwlknon2num 30402	There are k walks of lengt...
numclwlk1lem1 30403	Lemma 1 for ~ numclwlk1 (S...
numclwlk1lem2 30404	Lemma 2 for ~ numclwlk1 (S...
numclwlk1 30405	Statement 9 in [Huneke] p....
numclwwlkovh0 30406	Value of operation ` H ` ,...
numclwwlkovh 30407	Value of operation ` H ` ,...
numclwwlkovq 30408	Value of operation ` Q ` ,...
numclwwlkqhash 30409	In a ` K `-regular graph, ...
numclwwlk2lem1 30410	In a friendship graph, for...
numclwlk2lem2f 30411	` R ` is a function mappin...
numclwlk2lem2fv 30412	Value of the function ` R ...
numclwlk2lem2f1o 30413	` R ` is a 1-1 onto functi...
numclwwlk2lem3 30414	In a friendship graph, the...
numclwwlk2 30415	Statement 10 in [Huneke] p...
numclwwlk3lem1 30416	Lemma 2 for ~ numclwwlk3 ....
numclwwlk3lem2lem 30417	Lemma for ~ numclwwlk3lem2...
numclwwlk3lem2 30418	Lemma 1 for ~ numclwwlk3 :...
numclwwlk3 30419	Statement 12 in [Huneke] p...
numclwwlk4 30420	The total number of closed...
numclwwlk5lem 30421	Lemma for ~ numclwwlk5 . ...
numclwwlk5 30422	Statement 13 in [Huneke] p...
numclwwlk7lem 30423	Lemma for ~ numclwwlk7 , ~...
numclwwlk6 30424	For a prime divisor ` P ` ...
numclwwlk7 30425	Statement 14 in [Huneke] p...
numclwwlk8 30426	The size of the set of clo...
frgrreggt1 30427	If a finite nonempty frien...
frgrreg 30428	If a finite nonempty frien...
frgrregord013 30429	If a finite friendship gra...
frgrregord13 30430	If a nonempty finite frien...
frgrogt3nreg 30431	If a finite friendship gra...
friendshipgt3 30432	The friendship theorem for...
friendship 30433	The friendship theorem: I...
conventions 30434	H...
conventions-labels 30435	...
conventions-comments 30436	...
natded 30437	Here are typical n...
ex-natded5.2 30438	Theorem 5.2 of [Clemente] ...
ex-natded5.2-2 30439	A more efficient proof of ...
ex-natded5.2i 30440	The same as ~ ex-natded5.2...
ex-natded5.3 30441	Theorem 5.3 of [Clemente] ...
ex-natded5.3-2 30442	A more efficient proof of ...
ex-natded5.3i 30443	The same as ~ ex-natded5.3...
ex-natded5.5 30444	Theorem 5.5 of [Clemente] ...
ex-natded5.7 30445	Theorem 5.7 of [Clemente] ...
ex-natded5.7-2 30446	A more efficient proof of ...
ex-natded5.8 30447	Theorem 5.8 of [Clemente] ...
ex-natded5.8-2 30448	A more efficient proof of ...
ex-natded5.13 30449	Theorem 5.13 of [Clemente]...
ex-natded5.13-2 30450	A more efficient proof of ...
ex-natded9.20 30451	Theorem 9.20 of [Clemente]...
ex-natded9.20-2 30452	A more efficient proof of ...
ex-natded9.26 30453	Theorem 9.26 of [Clemente]...
ex-natded9.26-2 30454	A more efficient proof of ...
ex-or 30455	Example for ~ df-or . Exa...
ex-an 30456	Example for ~ df-an . Exa...
ex-dif 30457	Example for ~ df-dif . Ex...
ex-un 30458	Example for ~ df-un . Exa...
ex-in 30459	Example for ~ df-in . Exa...
ex-uni 30460	Example for ~ df-uni . Ex...
ex-ss 30461	Example for ~ df-ss . Exa...
ex-pss 30462	Example for ~ df-pss . Ex...
ex-pw 30463	Example for ~ df-pw . Exa...
ex-pr 30464	Example for ~ df-pr . (Co...
ex-br 30465	Example for ~ df-br . Exa...
ex-opab 30466	Example for ~ df-opab . E...
ex-eprel 30467	Example for ~ df-eprel . ...
ex-id 30468	Example for ~ df-id . Exa...
ex-po 30469	Example for ~ df-po . Exa...
ex-xp 30470	Example for ~ df-xp . Exa...
ex-cnv 30471	Example for ~ df-cnv . Ex...
ex-co 30472	Example for ~ df-co . Exa...
ex-dm 30473	Example for ~ df-dm . Exa...
ex-rn 30474	Example for ~ df-rn . Exa...
ex-res 30475	Example for ~ df-res . Ex...
ex-ima 30476	Example for ~ df-ima . Ex...
ex-fv 30477	Example for ~ df-fv . Exa...
ex-1st 30478	Example for ~ df-1st . Ex...
ex-2nd 30479	Example for ~ df-2nd . Ex...
1kp2ke3k 30480	Example for ~ df-dec , 100...
ex-fl 30481	Example for ~ df-fl . Exa...
ex-ceil 30482	Example for ~ df-ceil . (...
ex-mod 30483	Example for ~ df-mod . (C...
ex-exp 30484	Example for ~ df-exp . (C...
ex-fac 30485	Example for ~ df-fac . (C...
ex-bc 30486	Example for ~ df-bc . (Co...
ex-hash 30487	Example for ~ df-hash . (...
ex-sqrt 30488	Example for ~ df-sqrt . (...
ex-abs 30489	Example for ~ df-abs . (C...
ex-dvds 30490	Example for ~ df-dvds : 3 ...
ex-gcd 30491	Example for ~ df-gcd . (C...
ex-lcm 30492	Example for ~ df-lcm . (C...
ex-prmo 30493	Example for ~ df-prmo : ` ...
aevdemo 30494	Proof illustrating the com...
ex-ind-dvds 30495	Example of a proof by indu...
ex-fpar 30496	Formalized example provide...
avril1 30497	Poisson d'Avril's Theorem....
2bornot2b 30498	The law of excluded middle...
helloworld 30499	The classic "Hello world" ...
1p1e2apr1 30500	One plus one equals two. ...
eqid1 30501	Law of identity (reflexivi...
1div0apr 30502	Division by zero is forbid...
topnfbey 30503	Nothing seems to be imposs...
9p10ne21 30504	9 + 10 is not equal to 21....
9p10ne21fool 30505	9 + 10 equals 21. This as...
nrt2irr 30507	The ` N ` -th root of 2 is...
isplig 30510	The predicate "is a planar...
ispligb 30511	The predicate "is a planar...
tncp 30512	In any planar incidence ge...
l2p 30513	For any line in a planar i...
lpni 30514	For any line in a planar i...
nsnlplig 30515	There is no "one-point lin...
nsnlpligALT 30516	Alternate version of ~ nsn...
n0lplig 30517	There is no "empty line" i...
n0lpligALT 30518	Alternate version of ~ n0l...
eulplig 30519	Through two distinct point...
pliguhgr 30520	Any planar incidence geome...
dummylink 30521	Alias for ~ a1ii that may ...
id1 30522	Alias for ~ idALT that may...
isgrpo 30531	The predicate "is a group ...
isgrpoi 30532	Properties that determine ...
grpofo 30533	A group operation maps ont...
grpocl 30534	Closure law for a group op...
grpolidinv 30535	A group has a left identit...
grpon0 30536	The base set of a group is...
grpoass 30537	A group operation is assoc...
grpoidinvlem1 30538	Lemma for ~ grpoidinv . (...
grpoidinvlem2 30539	Lemma for ~ grpoidinv . (...
grpoidinvlem3 30540	Lemma for ~ grpoidinv . (...
grpoidinvlem4 30541	Lemma for ~ grpoidinv . (...
grpoidinv 30542	A group has a left and rig...
grpoideu 30543	The left identity element ...
grporndm 30544	A group's range in terms o...
0ngrp 30545	The empty set is not a gro...
gidval 30546	The value of the identity ...
grpoidval 30547	Lemma for ~ grpoidcl and o...
grpoidcl 30548	The identity element of a ...
grpoidinv2 30549	A group's properties using...
grpolid 30550	The identity element of a ...
grporid 30551	The identity element of a ...
grporcan 30552	Right cancellation law for...
grpoinveu 30553	The left inverse element o...
grpoid 30554	Two ways of saying that an...
grporn 30555	The range of a group opera...
grpoinvfval 30556	The inverse function of a ...
grpoinvval 30557	The inverse of a group ele...
grpoinvcl 30558	A group element's inverse ...
grpoinv 30559	The properties of a group ...
grpolinv 30560	The left inverse of a grou...
grporinv 30561	The right inverse of a gro...
grpoinvid1 30562	The inverse of a group ele...
grpoinvid2 30563	The inverse of a group ele...
grpolcan 30564	Left cancellation law for ...
grpo2inv 30565	Double inverse law for gro...
grpoinvf 30566	Mapping of the inverse fun...
grpoinvop 30567	The inverse of the group o...
grpodivfval 30568	Group division (or subtrac...
grpodivval 30569	Group division (or subtrac...
grpodivinv 30570	Group division by an inver...
grpoinvdiv 30571	Inverse of a group divisio...
grpodivf 30572	Mapping for group division...
grpodivcl 30573	Closure of group division ...
grpodivdiv 30574	Double group division. (C...
grpomuldivass 30575	Associative-type law for m...
grpodivid 30576	Division of a group member...
grponpcan 30577	Cancellation law for group...
isablo 30580	The predicate "is an Abeli...
ablogrpo 30581	An Abelian group operation...
ablocom 30582	An Abelian group operation...
ablo32 30583	Commutative/associative la...
ablo4 30584	Commutative/associative la...
isabloi 30585	Properties that determine ...
ablomuldiv 30586	Law for group multiplicati...
ablodivdiv 30587	Law for double group divis...
ablodivdiv4 30588	Law for double group divis...
ablodiv32 30589	Swap the second and third ...
ablonncan 30590	Cancellation law for group...
ablonnncan1 30591	Cancellation law for group...
vcrel 30594	The class of all complex v...
vciOLD 30595	Obsolete version of ~ cvsi...
vcsm 30596	Functionality of th scalar...
vccl 30597	Closure of the scalar prod...
vcidOLD 30598	Identity element for the s...
vcdi 30599	Distributive law for the s...
vcdir 30600	Distributive law for the s...
vcass 30601	Associative law for the sc...
vc2OLD 30602	A vector plus itself is tw...
vcablo 30603	Vector addition is an Abel...
vcgrp 30604	Vector addition is a group...
vclcan 30605	Left cancellation law for ...
vczcl 30606	The zero vector is a vecto...
vc0rid 30607	The zero vector is a right...
vc0 30608	Zero times a vector is the...
vcz 30609	Anything times the zero ve...
vcm 30610	Minus 1 times a vector is ...
isvclem 30611	Lemma for ~ isvcOLD . (Co...
vcex 30612	The components of a comple...
isvcOLD 30613	The predicate "is a comple...
isvciOLD 30614	Properties that determine ...
cnaddabloOLD 30615	Obsolete version of ~ cnad...
cnidOLD 30616	Obsolete version of ~ cnad...
cncvcOLD 30617	Obsolete version of ~ cncv...
nvss 30627	Structure of the class of ...
nvvcop 30628	A normed complex vector sp...
nvrel 30636	The class of all normed co...
vafval 30637	Value of the function for ...
bafval 30638	Value of the function for ...
smfval 30639	Value of the function for ...
0vfval 30640	Value of the function for ...
nmcvfval 30641	Value of the norm function...
nvop2 30642	A normed complex vector sp...
nvvop 30643	The vector space component...
isnvlem 30644	Lemma for ~ isnv . (Contr...
nvex 30645	The components of a normed...
isnv 30646	The predicate "is a normed...
isnvi 30647	Properties that determine ...
nvi 30648	The properties of a normed...
nvvc 30649	The vector space component...
nvablo 30650	The vector addition operat...
nvgrp 30651	The vector addition operat...
nvgf 30652	Mapping for the vector add...
nvsf 30653	Mapping for the scalar mul...
nvgcl 30654	Closure law for the vector...
nvcom 30655	The vector addition (group...
nvass 30656	The vector addition (group...
nvadd32 30657	Commutative/associative la...
nvrcan 30658	Right cancellation law for...
nvadd4 30659	Rearrangement of 4 terms i...
nvscl 30660	Closure law for the scalar...
nvsid 30661	Identity element for the s...
nvsass 30662	Associative law for the sc...
nvscom 30663	Commutative law for the sc...
nvdi 30664	Distributive law for the s...
nvdir 30665	Distributive law for the s...
nv2 30666	A vector plus itself is tw...
vsfval 30667	Value of the function for ...
nvzcl 30668	Closure law for the zero v...
nv0rid 30669	The zero vector is a right...
nv0lid 30670	The zero vector is a left ...
nv0 30671	Zero times a vector is the...
nvsz 30672	Anything times the zero ve...
nvinv 30673	Minus 1 times a vector is ...
nvinvfval 30674	Function for the negative ...
nvm 30675	Vector subtraction in term...
nvmval 30676	Value of vector subtractio...
nvmval2 30677	Value of vector subtractio...
nvmfval 30678	Value of the function for ...
nvmf 30679	Mapping for the vector sub...
nvmcl 30680	Closure law for the vector...
nvnnncan1 30681	Cancellation law for vecto...
nvmdi 30682	Distributive law for scala...
nvnegneg 30683	Double negative of a vecto...
nvmul0or 30684	If a scalar product is zer...
nvrinv 30685	A vector minus itself. (C...
nvlinv 30686	Minus a vector plus itself...
nvpncan2 30687	Cancellation law for vecto...
nvpncan 30688	Cancellation law for vecto...
nvaddsub 30689	Commutative/associative la...
nvnpcan 30690	Cancellation law for a nor...
nvaddsub4 30691	Rearrangement of 4 terms i...
nvmeq0 30692	The difference between two...
nvmid 30693	A vector minus itself is t...
nvf 30694	Mapping for the norm funct...
nvcl 30695	The norm of a normed compl...
nvcli 30696	The norm of a normed compl...
nvs 30697	Proportionality property o...
nvsge0 30698	The norm of a scalar produ...
nvm1 30699	The norm of the negative o...
nvdif 30700	The norm of the difference...
nvpi 30701	The norm of a vector plus ...
nvz0 30702	The norm of a zero vector ...
nvz 30703	The norm of a vector is ze...
nvtri 30704	Triangle inequality for th...
nvmtri 30705	Triangle inequality for th...
nvabs 30706	Norm difference property o...
nvge0 30707	The norm of a normed compl...
nvgt0 30708	A nonzero norm is positive...
nv1 30709	From any nonzero vector, c...
nvop 30710	A complex inner product sp...
cnnv 30711	The set of complex numbers...
cnnvg 30712	The vector addition (group...
cnnvba 30713	The base set of the normed...
cnnvs 30714	The scalar product operati...
cnnvnm 30715	The norm operation of the ...
cnnvm 30716	The vector subtraction ope...
elimnv 30717	Hypothesis elimination lem...
elimnvu 30718	Hypothesis elimination lem...
imsval 30719	Value of the induced metri...
imsdval 30720	Value of the induced metri...
imsdval2 30721	Value of the distance func...
nvnd 30722	The norm of a normed compl...
imsdf 30723	Mapping for the induced me...
imsmetlem 30724	Lemma for ~ imsmet . (Con...
imsmet 30725	The induced metric of a no...
imsxmet 30726	The induced metric of a no...
cnims 30727	The metric induced on the ...
vacn 30728	Vector addition is jointly...
nmcvcn 30729	The norm of a normed compl...
nmcnc 30730	The norm of a normed compl...
smcnlem 30731	Lemma for ~ smcn . (Contr...
smcn 30732	Scalar multiplication is j...
vmcn 30733	Vector subtraction is join...
dipfval 30736	The inner product function...
ipval 30737	Value of the inner product...
ipval2lem2 30738	Lemma for ~ ipval3 . (Con...
ipval2lem3 30739	Lemma for ~ ipval3 . (Con...
ipval2lem4 30740	Lemma for ~ ipval3 . (Con...
ipval2 30741	Expansion of the inner pro...
4ipval2 30742	Four times the inner produ...
ipval3 30743	Expansion of the inner pro...
ipidsq 30744	The inner product of a vec...
ipnm 30745	Norm expressed in terms of...
dipcl 30746	An inner product is a comp...
ipf 30747	Mapping for the inner prod...
dipcj 30748	The complex conjugate of a...
ipipcj 30749	An inner product times its...
diporthcom 30750	Orthogonality (meaning inn...
dip0r 30751	Inner product with a zero ...
dip0l 30752	Inner product with a zero ...
ipz 30753	The inner product of a vec...
dipcn 30754	Inner product is jointly c...
sspval 30757	The set of all subspaces o...
isssp 30758	The predicate "is a subspa...
sspid 30759	A normed complex vector sp...
sspnv 30760	A subspace is a normed com...
sspba 30761	The base set of a subspace...
sspg 30762	Vector addition on a subsp...
sspgval 30763	Vector addition on a subsp...
ssps 30764	Scalar multiplication on a...
sspsval 30765	Scalar multiplication on a...
sspmlem 30766	Lemma for ~ sspm and other...
sspmval 30767	Vector addition on a subsp...
sspm 30768	Vector subtraction on a su...
sspz 30769	The zero vector of a subsp...
sspn 30770	The norm on a subspace is ...
sspnval 30771	The norm on a subspace in ...
sspimsval 30772	The induced metric on a su...
sspims 30773	The induced metric on a su...
lnoval 30786	The set of linear operator...
islno 30787	The predicate "is a linear...
lnolin 30788	Basic linearity property o...
lnof 30789	A linear operator is a map...
lno0 30790	The value of a linear oper...
lnocoi 30791	The composition of two lin...
lnoadd 30792	Addition property of a lin...
lnosub 30793	Subtraction property of a ...
lnomul 30794	Scalar multiplication prop...
nvo00 30795	Two ways to express a zero...
nmoofval 30796	The operator norm function...
nmooval 30797	The operator norm function...
nmosetre 30798	The set in the supremum of...
nmosetn0 30799	The set in the supremum of...
nmoxr 30800	The norm of an operator is...
nmooge0 30801	The norm of an operator is...
nmorepnf 30802	The norm of an operator is...
nmoreltpnf 30803	The norm of any operator i...
nmogtmnf 30804	The norm of an operator is...
nmoolb 30805	A lower bound for an opera...
nmoubi 30806	An upper bound for an oper...
nmoub3i 30807	An upper bound for an oper...
nmoub2i 30808	An upper bound for an oper...
nmobndi 30809	Two ways to express that a...
nmounbi 30810	Two ways two express that ...
nmounbseqi 30811	An unbounded operator dete...
nmounbseqiALT 30812	Alternate shorter proof of...
nmobndseqi 30813	A bounded sequence determi...
nmobndseqiALT 30814	Alternate shorter proof of...
bloval 30815	The class of bounded linea...
isblo 30816	The predicate "is a bounde...
isblo2 30817	The predicate "is a bounde...
bloln 30818	A bounded operator is a li...
blof 30819	A bounded operator is an o...
nmblore 30820	The norm of a bounded oper...
0ofval 30821	The zero operator between ...
0oval 30822	Value of the zero operator...
0oo 30823	The zero operator is an op...
0lno 30824	The zero operator is linea...
nmoo0 30825	The operator norm of the z...
0blo 30826	The zero operator is a bou...
nmlno0lem 30827	Lemma for ~ nmlno0i . (Co...
nmlno0i 30828	The norm of a linear opera...
nmlno0 30829	The norm of a linear opera...
nmlnoubi 30830	An upper bound for the ope...
nmlnogt0 30831	The norm of a nonzero line...
lnon0 30832	The domain of a nonzero li...
nmblolbii 30833	A lower bound for the norm...
nmblolbi 30834	A lower bound for the norm...
isblo3i 30835	The predicate "is a bounde...
blo3i 30836	Properties that determine ...
blometi 30837	Upper bound for the distan...
blocnilem 30838	Lemma for ~ blocni and ~ l...
blocni 30839	A linear operator is conti...
lnocni 30840	If a linear operator is co...
blocn 30841	A linear operator is conti...
blocn2 30842	A bounded linear operator ...
ajfval 30843	The adjoint function. (Co...
hmoval 30844	The set of Hermitian (self...
ishmo 30845	The predicate "is a hermit...
phnv 30848	Every complex inner produc...
phrel 30849	The class of all complex i...
phnvi 30850	Every complex inner produc...
isphg 30851	The predicate "is a comple...
phop 30852	A complex inner product sp...
cncph 30853	The set of complex numbers...
elimph 30854	Hypothesis elimination lem...
elimphu 30855	Hypothesis elimination lem...
isph 30856	The predicate "is an inner...
phpar2 30857	The parallelogram law for ...
phpar 30858	The parallelogram law for ...
ip0i 30859	A slight variant of Equati...
ip1ilem 30860	Lemma for ~ ip1i . (Contr...
ip1i 30861	Equation 6.47 of [Ponnusam...
ip2i 30862	Equation 6.48 of [Ponnusam...
ipdirilem 30863	Lemma for ~ ipdiri . (Con...
ipdiri 30864	Distributive law for inner...
ipasslem1 30865	Lemma for ~ ipassi . Show...
ipasslem2 30866	Lemma for ~ ipassi . Show...
ipasslem3 30867	Lemma for ~ ipassi . Show...
ipasslem4 30868	Lemma for ~ ipassi . Show...
ipasslem5 30869	Lemma for ~ ipassi . Show...
ipasslem7 30870	Lemma for ~ ipassi . Show...
ipasslem8 30871	Lemma for ~ ipassi . By ~...
ipasslem9 30872	Lemma for ~ ipassi . Conc...
ipasslem10 30873	Lemma for ~ ipassi . Show...
ipasslem11 30874	Lemma for ~ ipassi . Show...
ipassi 30875	Associative law for inner ...
dipdir 30876	Distributive law for inner...
dipdi 30877	Distributive law for inner...
ip2dii 30878	Inner product of two sums....
dipass 30879	Associative law for inner ...
dipassr 30880	"Associative" law for seco...
dipassr2 30881	"Associative" law for inne...
dipsubdir 30882	Distributive law for inner...
dipsubdi 30883	Distributive law for inner...
pythi 30884	The Pythagorean theorem fo...
siilem1 30885	Lemma for ~ sii . (Contri...
siilem2 30886	Lemma for ~ sii . (Contri...
siii 30887	Inference from ~ sii . (C...
sii 30888	Obsolete version of ~ ipca...
ipblnfi 30889	A function ` F ` generated...
ip2eqi 30890	Two vectors are equal iff ...
phoeqi 30891	A condition implying that ...
ajmoi 30892	Every operator has at most...
ajfuni 30893	The adjoint function is a ...
ajfun 30894	The adjoint function is a ...
ajval 30895	Value of the adjoint funct...
iscbn 30898	A complex Banach space is ...
cbncms 30899	The induced metric on comp...
bnnv 30900	Every complex Banach space...
bnrel 30901	The class of all complex B...
bnsscmcl 30902	A subspace of a Banach spa...
cnbn 30903	The set of complex numbers...
ubthlem1 30904	Lemma for ~ ubth . The fu...
ubthlem2 30905	Lemma for ~ ubth . Given ...
ubthlem3 30906	Lemma for ~ ubth . Prove ...
ubth 30907	Uniform Boundedness Theore...
minvecolem1 30908	Lemma for ~ minveco . The...
minvecolem2 30909	Lemma for ~ minveco . Any...
minvecolem3 30910	Lemma for ~ minveco . The...
minvecolem4a 30911	Lemma for ~ minveco . ` F ...
minvecolem4b 30912	Lemma for ~ minveco . The...
minvecolem4c 30913	Lemma for ~ minveco . The...
minvecolem4 30914	Lemma for ~ minveco . The...
minvecolem5 30915	Lemma for ~ minveco . Dis...
minvecolem6 30916	Lemma for ~ minveco . Any...
minvecolem7 30917	Lemma for ~ minveco . Sin...
minveco 30918	Minimizing vector theorem,...
ishlo 30921	The predicate "is a comple...
hlobn 30922	Every complex Hilbert spac...
hlph 30923	Every complex Hilbert spac...
hlrel 30924	The class of all complex H...
hlnv 30925	Every complex Hilbert spac...
hlnvi 30926	Every complex Hilbert spac...
hlvc 30927	Every complex Hilbert spac...
hlcmet 30928	The induced metric on a co...
hlmet 30929	The induced metric on a co...
hlpar2 30930	The parallelogram law sati...
hlpar 30931	The parallelogram law sati...
hlex 30932	The base set of a Hilbert ...
hladdf 30933	Mapping for Hilbert space ...
hlcom 30934	Hilbert space vector addit...
hlass 30935	Hilbert space vector addit...
hl0cl 30936	The Hilbert space zero vec...
hladdid 30937	Hilbert space addition wit...
hlmulf 30938	Mapping for Hilbert space ...
hlmulid 30939	Hilbert space scalar multi...
hlmulass 30940	Hilbert space scalar multi...
hldi 30941	Hilbert space scalar multi...
hldir 30942	Hilbert space scalar multi...
hlmul0 30943	Hilbert space scalar multi...
hlipf 30944	Mapping for Hilbert space ...
hlipcj 30945	Conjugate law for Hilbert ...
hlipdir 30946	Distributive law for Hilbe...
hlipass 30947	Associative law for Hilber...
hlipgt0 30948	The inner product of a Hil...
hlcompl 30949	Completeness of a Hilbert ...
cnchl 30950	The set of complex numbers...
htthlem 30951	Lemma for ~ htth . The co...
htth 30952	Hellinger-Toeplitz Theorem...
The list of syntax, axioms (ax-) and definitions (df-) for the Hilbert Space Explorer starts here
h2hva 31008	The group (addition) opera...
h2hsm 31009	The scalar product operati...
h2hnm 31010	The norm function of Hilbe...
h2hvs 31011	The vector subtraction ope...
h2hmetdval 31012	Value of the distance func...
h2hcau 31013	The Cauchy sequences of Hi...
h2hlm 31014	The limit sequences of Hil...
axhilex-zf 31015	Derive Axiom ~ ax-hilex fr...
axhfvadd-zf 31016	Derive Axiom ~ ax-hfvadd f...
axhvcom-zf 31017	Derive Axiom ~ ax-hvcom fr...
axhvass-zf 31018	Derive Axiom ~ ax-hvass fr...
axhv0cl-zf 31019	Derive Axiom ~ ax-hv0cl fr...
axhvaddid-zf 31020	Derive Axiom ~ ax-hvaddid ...
axhfvmul-zf 31021	Derive Axiom ~ ax-hfvmul f...
axhvmulid-zf 31022	Derive Axiom ~ ax-hvmulid ...
axhvmulass-zf 31023	Derive Axiom ~ ax-hvmulass...
axhvdistr1-zf 31024	Derive Axiom ~ ax-hvdistr1...
axhvdistr2-zf 31025	Derive Axiom ~ ax-hvdistr2...
axhvmul0-zf 31026	Derive Axiom ~ ax-hvmul0 f...
axhfi-zf 31027	Derive Axiom ~ ax-hfi from...
axhis1-zf 31028	Derive Axiom ~ ax-his1 fro...
axhis2-zf 31029	Derive Axiom ~ ax-his2 fro...
axhis3-zf 31030	Derive Axiom ~ ax-his3 fro...
axhis4-zf 31031	Derive Axiom ~ ax-his4 fro...
axhcompl-zf 31032	Derive Axiom ~ ax-hcompl f...
hvmulex 31045	The Hilbert space scalar p...
hvaddcl 31046	Closure of vector addition...
hvmulcl 31047	Closure of scalar multipli...
hvmulcli 31048	Closure inference for scal...
hvsubf 31049	Mapping domain and codomai...
hvsubval 31050	Value of vector subtractio...
hvsubcl 31051	Closure of vector subtract...
hvaddcli 31052	Closure of vector addition...
hvcomi 31053	Commutation of vector addi...
hvsubvali 31054	Value of vector subtractio...
hvsubcli 31055	Closure of vector subtract...
ifhvhv0 31056	Prove ` if ( A e. ~H , A ,...
hvaddlid 31057	Addition with the zero vec...
hvmul0 31058	Scalar multiplication with...
hvmul0or 31059	If a scalar product is zer...
hvsubid 31060	Subtraction of a vector fr...
hvnegid 31061	Addition of negative of a ...
hv2neg 31062	Two ways to express the ne...
hvaddlidi 31063	Addition with the zero vec...
hvnegidi 31064	Addition of negative of a ...
hv2negi 31065	Two ways to express the ne...
hvm1neg 31066	Convert minus one times a ...
hvaddsubval 31067	Value of vector addition i...
hvadd32 31068	Commutative/associative la...
hvadd12 31069	Commutative/associative la...
hvadd4 31070	Hilbert vector space addit...
hvsub4 31071	Hilbert vector space addit...
hvaddsub12 31072	Commutative/associative la...
hvpncan 31073	Addition/subtraction cance...
hvpncan2 31074	Addition/subtraction cance...
hvaddsubass 31075	Associativity of sum and d...
hvpncan3 31076	Subtraction and addition o...
hvmulcom 31077	Scalar multiplication comm...
hvsubass 31078	Hilbert vector space assoc...
hvsub32 31079	Hilbert vector space commu...
hvmulassi 31080	Scalar multiplication asso...
hvmulcomi 31081	Scalar multiplication comm...
hvmul2negi 31082	Double negative in scalar ...
hvsubdistr1 31083	Scalar multiplication dist...
hvsubdistr2 31084	Scalar multiplication dist...
hvdistr1i 31085	Scalar multiplication dist...
hvsubdistr1i 31086	Scalar multiplication dist...
hvassi 31087	Hilbert vector space assoc...
hvadd32i 31088	Hilbert vector space commu...
hvsubassi 31089	Hilbert vector space assoc...
hvsub32i 31090	Hilbert vector space commu...
hvadd12i 31091	Hilbert vector space commu...
hvadd4i 31092	Hilbert vector space addit...
hvsubsub4i 31093	Hilbert vector space addit...
hvsubsub4 31094	Hilbert vector space addit...
hv2times 31095	Two times a vector. (Cont...
hvnegdii 31096	Distribution of negative o...
hvsubeq0i 31097	If the difference between ...
hvsubcan2i 31098	Vector cancellation law. ...
hvaddcani 31099	Cancellation law for vecto...
hvsubaddi 31100	Relationship between vecto...
hvnegdi 31101	Distribution of negative o...
hvsubeq0 31102	If the difference between ...
hvaddeq0 31103	If the sum of two vectors ...
hvaddcan 31104	Cancellation law for vecto...
hvaddcan2 31105	Cancellation law for vecto...
hvmulcan 31106	Cancellation law for scala...
hvmulcan2 31107	Cancellation law for scala...
hvsubcan 31108	Cancellation law for vecto...
hvsubcan2 31109	Cancellation law for vecto...
hvsub0 31110	Subtraction of a zero vect...
hvsubadd 31111	Relationship between vecto...
hvaddsub4 31112	Hilbert vector space addit...
hicl 31114	Closure of inner product. ...
hicli 31115	Closure inference for inne...
his5 31120	Associative law for inner ...
his52 31121	Associative law for inner ...
his35 31122	Move scalar multiplication...
his35i 31123	Move scalar multiplication...
his7 31124	Distributive law for inner...
hiassdi 31125	Distributive/associative l...
his2sub 31126	Distributive law for inner...
his2sub2 31127	Distributive law for inner...
hire 31128	A necessary and sufficient...
hiidrcl 31129	Real closure of inner prod...
hi01 31130	Inner product with the 0 v...
hi02 31131	Inner product with the 0 v...
hiidge0 31132	Inner product with self is...
his6 31133	Zero inner product with se...
his1i 31134	Conjugate law for inner pr...
abshicom 31135	Commuted inner products ha...
hial0 31136	A vector whose inner produ...
hial02 31137	A vector whose inner produ...
hisubcomi 31138	Two vector subtractions si...
hi2eq 31139	Lemma used to prove equali...
hial2eq 31140	Two vectors whose inner pr...
hial2eq2 31141	Two vectors whose inner pr...
orthcom 31142	Orthogonality commutes. (...
normlem0 31143	Lemma used to derive prope...
normlem1 31144	Lemma used to derive prope...
normlem2 31145	Lemma used to derive prope...
normlem3 31146	Lemma used to derive prope...
normlem4 31147	Lemma used to derive prope...
normlem5 31148	Lemma used to derive prope...
normlem6 31149	Lemma used to derive prope...
normlem7 31150	Lemma used to derive prope...
normlem8 31151	Lemma used to derive prope...
normlem9 31152	Lemma used to derive prope...
normlem7tALT 31153	Lemma used to derive prope...
bcseqi 31154	Equality case of Bunjakova...
normlem9at 31155	Lemma used to derive prope...
dfhnorm2 31156	Alternate definition of th...
normf 31157	The norm function maps fro...
normval 31158	The value of the norm of a...
normcl 31159	Real closure of the norm o...
normge0 31160	The norm of a vector is no...
normgt0 31161	The norm of nonzero vector...
norm0 31162	The norm of a zero vector....
norm-i 31163	Theorem 3.3(i) of [Beran] ...
normne0 31164	A norm is nonzero iff its ...
normcli 31165	Real closure of the norm o...
normsqi 31166	The square of a norm. (Co...
norm-i-i 31167	Theorem 3.3(i) of [Beran] ...
normsq 31168	The square of a norm. (Co...
normsub0i 31169	Two vectors are equal iff ...
normsub0 31170	Two vectors are equal iff ...
norm-ii-i 31171	Triangle inequality for no...
norm-ii 31172	Triangle inequality for no...
norm-iii-i 31173	Theorem 3.3(iii) of [Beran...
norm-iii 31174	Theorem 3.3(iii) of [Beran...
normsubi 31175	Negative doesn't change th...
normpythi 31176	Analogy to Pythagorean the...
normsub 31177	Swapping order of subtract...
normneg 31178	The norm of a vector equal...
normpyth 31179	Analogy to Pythagorean the...
normpyc 31180	Corollary to Pythagorean t...
norm3difi 31181	Norm of differences around...
norm3adifii 31182	Norm of differences around...
norm3lem 31183	Lemma involving norm of di...
norm3dif 31184	Norm of differences around...
norm3dif2 31185	Norm of differences around...
norm3lemt 31186	Lemma involving norm of di...
norm3adifi 31187	Norm of differences around...
normpari 31188	Parallelogram law for norm...
normpar 31189	Parallelogram law for norm...
normpar2i 31190	Corollary of parallelogram...
polid2i 31191	Generalized polarization i...
polidi 31192	Polarization identity. Re...
polid 31193	Polarization identity. Re...
hilablo 31194	Hilbert space vector addit...
hilid 31195	The group identity element...
hilvc 31196	Hilbert space is a complex...
hilnormi 31197	Hilbert space norm in term...
hilhhi 31198	Deduce the structure of Hi...
hhnv 31199	Hilbert space is a normed ...
hhva 31200	The group (addition) opera...
hhba 31201	The base set of Hilbert sp...
hh0v 31202	The zero vector of Hilbert...
hhsm 31203	The scalar product operati...
hhvs 31204	The vector subtraction ope...
hhnm 31205	The norm function of Hilbe...
hhims 31206	The induced metric of Hilb...
hhims2 31207	Hilbert space distance met...
hhmet 31208	The induced metric of Hilb...
hhxmet 31209	The induced metric of Hilb...
hhmetdval 31210	Value of the distance func...
hhip 31211	The inner product operatio...
hhph 31212	The Hilbert space of the H...
bcsiALT 31213	Bunjakovaskij-Cauchy-Schwa...
bcsiHIL 31214	Bunjakovaskij-Cauchy-Schwa...
bcs 31215	Bunjakovaskij-Cauchy-Schwa...
bcs2 31216	Corollary of the Bunjakova...
bcs3 31217	Corollary of the Bunjakova...
hcau 31218	Member of the set of Cauch...
hcauseq 31219	A Cauchy sequences on a Hi...
hcaucvg 31220	A Cauchy sequence on a Hil...
seq1hcau 31221	A sequence on a Hilbert sp...
hlimi 31222	Express the predicate: Th...
hlimseqi 31223	A sequence with a limit on...
hlimveci 31224	Closure of the limit of a ...
hlimconvi 31225	Convergence of a sequence ...
hlim2 31226	The limit of a sequence on...
hlimadd 31227	Limit of the sum of two se...
hilmet 31228	The Hilbert space norm det...
hilxmet 31229	The Hilbert space norm det...
hilmetdval 31230	Value of the distance func...
hilims 31231	Hilbert space distance met...
hhcau 31232	The Cauchy sequences of Hi...
hhlm 31233	The limit sequences of Hil...
hhcmpl 31234	Lemma used for derivation ...
hilcompl 31235	Lemma used for derivation ...
hhcms 31237	The Hilbert space induced ...
hhhl 31238	The Hilbert space structur...
hilcms 31239	The Hilbert space norm det...
hilhl 31240	The Hilbert space of the H...
issh 31242	Subspace ` H ` of a Hilber...
issh2 31243	Subspace ` H ` of a Hilber...
shss 31244	A subspace is a subset of ...
shel 31245	A member of a subspace of ...
shex 31246	The set of subspaces of a ...
shssii 31247	A closed subspace of a Hil...
sheli 31248	A member of a subspace of ...
shelii 31249	A member of a subspace of ...
sh0 31250	The zero vector belongs to...
shaddcl 31251	Closure of vector addition...
shmulcl 31252	Closure of vector scalar m...
issh3 31253	Subspace ` H ` of a Hilber...
shsubcl 31254	Closure of vector subtract...
isch 31256	Closed subspace ` H ` of a...
isch2 31257	Closed subspace ` H ` of a...
chsh 31258	A closed subspace is a sub...
chsssh 31259	Closed subspaces are subsp...
chex 31260	The set of closed subspace...
chshii 31261	A closed subspace is a sub...
ch0 31262	The zero vector belongs to...
chss 31263	A closed subspace of a Hil...
chel 31264	A member of a closed subsp...
chssii 31265	A closed subspace of a Hil...
cheli 31266	A member of a closed subsp...
chelii 31267	A member of a closed subsp...
chlimi 31268	The limit property of a cl...
hlim0 31269	The zero sequence in Hilbe...
hlimcaui 31270	If a sequence in Hilbert s...
hlimf 31271	Function-like behavior of ...
hlimuni 31272	A Hilbert space sequence c...
hlimreui 31273	The limit of a Hilbert spa...
hlimeui 31274	The limit of a Hilbert spa...
isch3 31275	A Hilbert subspace is clos...
chcompl 31276	Completeness of a closed s...
helch 31277	The Hilbert lattice one (w...
ifchhv 31278	Prove ` if ( A e. CH , A ,...
helsh 31279	Hilbert space is a subspac...
shsspwh 31280	Subspaces are subsets of H...
chsspwh 31281	Closed subspaces are subse...
hsn0elch 31282	The zero subspace belongs ...
norm1 31283	From any nonzero Hilbert s...
norm1exi 31284	A normalized vector exists...
norm1hex 31285	A normalized vector can ex...
elch0 31288	Membership in zero for clo...
h0elch 31289	The zero subspace is a clo...
h0elsh 31290	The zero subspace is a sub...
hhssva 31291	The vector addition operat...
hhsssm 31292	The scalar multiplication ...
hhssnm 31293	The norm operation on a su...
issubgoilem 31294	Lemma for ~ hhssabloilem ....
hhssabloilem 31295	Lemma for ~ hhssabloi . F...
hhssabloi 31296	Abelian group property of ...
hhssablo 31297	Abelian group property of ...
hhssnv 31298	Normed complex vector spac...
hhssnvt 31299	Normed complex vector spac...
hhsst 31300	A member of ` SH ` is a su...
hhshsslem1 31301	Lemma for ~ hhsssh . (Con...
hhshsslem2 31302	Lemma for ~ hhsssh . (Con...
hhsssh 31303	The predicate " ` H ` is a...
hhsssh2 31304	The predicate " ` H ` is a...
hhssba 31305	The base set of a subspace...
hhssvs 31306	The vector subtraction ope...
hhssvsf 31307	Mapping of the vector subt...
hhssims 31308	Induced metric of a subspa...
hhssims2 31309	Induced metric of a subspa...
hhssmet 31310	Induced metric of a subspa...
hhssmetdval 31311	Value of the distance func...
hhsscms 31312	The induced metric of a cl...
hhssbnOLD 31313	Obsolete version of ~ cssb...
ocval 31314	Value of orthogonal comple...
ocel 31315	Membership in orthogonal c...
shocel 31316	Membership in orthogonal c...
ocsh 31317	The orthogonal complement ...
shocsh 31318	The orthogonal complement ...
ocss 31319	An orthogonal complement i...
shocss 31320	An orthogonal complement i...
occon 31321	Contraposition law for ort...
occon2 31322	Double contraposition for ...
occon2i 31323	Double contraposition for ...
oc0 31324	The zero vector belongs to...
ocorth 31325	Members of a subset and it...
shocorth 31326	Members of a subspace and ...
ococss 31327	Inclusion in complement of...
shococss 31328	Inclusion in complement of...
shorth 31329	Members of orthogonal subs...
ocin 31330	Intersection of a Hilbert ...
occon3 31331	Hilbert lattice contraposi...
ocnel 31332	A nonzero vector in the co...
chocvali 31333	Value of the orthogonal co...
shuni 31334	Two subspaces with trivial...
chocunii 31335	Lemma for uniqueness part ...
pjhthmo 31336	Projection Theorem, unique...
occllem 31337	Lemma for ~ occl . (Contr...
occl 31338	Closure of complement of H...
shoccl 31339	Closure of complement of H...
choccl 31340	Closure of complement of H...
choccli 31341	Closure of ` CH ` orthocom...
shsval 31346	Value of subspace sum of t...
shsss 31347	The subspace sum is a subs...
shsel 31348	Membership in the subspace...
shsel3 31349	Membership in the subspace...
shseli 31350	Membership in subspace sum...
shscli 31351	Closure of subspace sum. ...
shscl 31352	Closure of subspace sum. ...
shscom 31353	Commutative law for subspa...
shsva 31354	Vector sum belongs to subs...
shsel1 31355	A subspace sum contains a ...
shsel2 31356	A subspace sum contains a ...
shsvs 31357	Vector subtraction belongs...
shsub1 31358	Subspace sum is an upper b...
shsub2 31359	Subspace sum is an upper b...
choc0 31360	The orthocomplement of the...
choc1 31361	The orthocomplement of the...
chocnul 31362	Orthogonal complement of t...
shintcli 31363	Closure of intersection of...
shintcl 31364	The intersection of a none...
chintcli 31365	The intersection of a none...
chintcl 31366	The intersection (infimum)...
spanval 31367	Value of the linear span o...
hsupval 31368	Value of supremum of set o...
chsupval 31369	The value of the supremum ...
spancl 31370	The span of a subset of Hi...
elspancl 31371	A member of a span is a ve...
shsupcl 31372	Closure of the subspace su...
hsupcl 31373	Closure of supremum of set...
chsupcl 31374	Closure of supremum of sub...
hsupss 31375	Subset relation for suprem...
chsupss 31376	Subset relation for suprem...
hsupunss 31377	The union of a set of Hilb...
chsupunss 31378	The union of a set of clos...
spanss2 31379	A subset of Hilbert space ...
shsupunss 31380	The union of a set of subs...
spanid 31381	A subspace of Hilbert spac...
spanss 31382	Ordering relationship for ...
spanssoc 31383	The span of a subset of Hi...
sshjval 31384	Value of join for subsets ...
shjval 31385	Value of join in ` SH ` . ...
chjval 31386	Value of join in ` CH ` . ...
chjvali 31387	Value of join in ` CH ` . ...
sshjval3 31388	Value of join for subsets ...
sshjcl 31389	Closure of join for subset...
shjcl 31390	Closure of join in ` SH ` ...
chjcl 31391	Closure of join in ` CH ` ...
shjcom 31392	Commutative law for Hilber...
shless 31393	Subset implies subset of s...
shlej1 31394	Add disjunct to both sides...
shlej2 31395	Add disjunct to both sides...
shincli 31396	Closure of intersection of...
shscomi 31397	Commutative law for subspa...
shsvai 31398	Vector sum belongs to subs...
shsel1i 31399	A subspace sum contains a ...
shsel2i 31400	A subspace sum contains a ...
shsvsi 31401	Vector subtraction belongs...
shunssi 31402	Union is smaller than subs...
shunssji 31403	Union is smaller than Hilb...
shsleji 31404	Subspace sum is smaller th...
shjcomi 31405	Commutative law for join i...
shsub1i 31406	Subspace sum is an upper b...
shsub2i 31407	Subspace sum is an upper b...
shub1i 31408	Hilbert lattice join is an...
shjcli 31409	Closure of ` CH ` join. (...
shjshcli 31410	` SH ` closure of join. (...
shlessi 31411	Subset implies subset of s...
shlej1i 31412	Add disjunct to both sides...
shlej2i 31413	Add disjunct to both sides...
shslej 31414	Subspace sum is smaller th...
shincl 31415	Closure of intersection of...
shub1 31416	Hilbert lattice join is an...
shub2 31417	A subspace is a subset of ...
shsidmi 31418	Idempotent law for Hilbert...
shslubi 31419	The least upper bound law ...
shlesb1i 31420	Hilbert lattice ordering i...
shsval2i 31421	An alternate way to expres...
shsval3i 31422	An alternate way to expres...
shmodsi 31423	The modular law holds for ...
shmodi 31424	The modular law is implied...
pjhthlem1 31425	Lemma for ~ pjhth . (Cont...
pjhthlem2 31426	Lemma for ~ pjhth . (Cont...
pjhth 31427	Projection Theorem: Any H...
pjhtheu 31428	Projection Theorem: Any H...
pjhfval 31430	The value of the projectio...
pjhval 31431	Value of a projection. (C...
pjpreeq 31432	Equality with a projection...
pjeq 31433	Equality with a projection...
axpjcl 31434	Closure of a projection in...
pjhcl 31435	Closure of a projection in...
omlsilem 31436	Lemma for orthomodular law...
omlsii 31437	Subspace inference form of...
omlsi 31438	Subspace form of orthomodu...
ococi 31439	Complement of complement o...
ococ 31440	Complement of complement o...
dfch2 31441	Alternate definition of th...
ococin 31442	The double complement is t...
hsupval2 31443	Alternate definition of su...
chsupval2 31444	The value of the supremum ...
sshjval2 31445	Value of join in the set o...
chsupid 31446	A subspace is the supremum...
chsupsn 31447	Value of supremum of subse...
shlub 31448	Hilbert lattice join is th...
shlubi 31449	Hilbert lattice join is th...
pjhtheu2 31450	Uniqueness of ` y ` for th...
pjcli 31451	Closure of a projection in...
pjhcli 31452	Closure of a projection in...
pjpjpre 31453	Decomposition of a vector ...
axpjpj 31454	Decomposition of a vector ...
pjclii 31455	Closure of a projection in...
pjhclii 31456	Closure of a projection in...
pjpj0i 31457	Decomposition of a vector ...
pjpji 31458	Decomposition of a vector ...
pjpjhth 31459	Projection Theorem: Any H...
pjpjhthi 31460	Projection Theorem: Any H...
pjop 31461	Orthocomplement projection...
pjpo 31462	Projection in terms of ort...
pjopi 31463	Orthocomplement projection...
pjpoi 31464	Projection in terms of ort...
pjoc1i 31465	Projection of a vector in ...
pjchi 31466	Projection of a vector in ...
pjoccl 31467	The part of a vector that ...
pjoc1 31468	Projection of a vector in ...
pjomli 31469	Subspace form of orthomodu...
pjoml 31470	Subspace form of orthomodu...
pjococi 31471	Proof of orthocomplement t...
pjoc2i 31472	Projection of a vector in ...
pjoc2 31473	Projection of a vector in ...
sh0le 31474	The zero subspace is the s...
ch0le 31475	The zero subspace is the s...
shle0 31476	No subspace is smaller tha...
chle0 31477	No Hilbert lattice element...
chnlen0 31478	A Hilbert lattice element ...
ch0pss 31479	The zero subspace is a pro...
orthin 31480	The intersection of orthog...
ssjo 31481	The lattice join of a subs...
shne0i 31482	A nonzero subspace has a n...
shs0i 31483	Hilbert subspace sum with ...
shs00i 31484	Two subspaces are zero iff...
ch0lei 31485	The closed subspace zero i...
chle0i 31486	No Hilbert closed subspace...
chne0i 31487	A nonzero closed subspace ...
chocini 31488	Intersection of a closed s...
chj0i 31489	Join with lattice zero in ...
chm1i 31490	Meet with lattice one in `...
chjcli 31491	Closure of ` CH ` join. (...
chsleji 31492	Subspace sum is smaller th...
chseli 31493	Membership in subspace sum...
chincli 31494	Closure of Hilbert lattice...
chsscon3i 31495	Hilbert lattice contraposi...
chsscon1i 31496	Hilbert lattice contraposi...
chsscon2i 31497	Hilbert lattice contraposi...
chcon2i 31498	Hilbert lattice contraposi...
chcon1i 31499	Hilbert lattice contraposi...
chcon3i 31500	Hilbert lattice contraposi...
chunssji 31501	Union is smaller than ` CH...
chjcomi 31502	Commutative law for join i...
chub1i 31503	` CH ` join is an upper bo...
chub2i 31504	` CH ` join is an upper bo...
chlubi 31505	Hilbert lattice join is th...
chlubii 31506	Hilbert lattice join is th...
chlej1i 31507	Add join to both sides of ...
chlej2i 31508	Add join to both sides of ...
chlej12i 31509	Add join to both sides of ...
chlejb1i 31510	Hilbert lattice ordering i...
chdmm1i 31511	De Morgan's law for meet i...
chdmm2i 31512	De Morgan's law for meet i...
chdmm3i 31513	De Morgan's law for meet i...
chdmm4i 31514	De Morgan's law for meet i...
chdmj1i 31515	De Morgan's law for join i...
chdmj2i 31516	De Morgan's law for join i...
chdmj3i 31517	De Morgan's law for join i...
chdmj4i 31518	De Morgan's law for join i...
chnlei 31519	Equivalent expressions for...
chjassi 31520	Associative law for Hilber...
chj00i 31521	Two Hilbert lattice elemen...
chjoi 31522	The join of a closed subsp...
chj1i 31523	Join with Hilbert lattice ...
chm0i 31524	Meet with Hilbert lattice ...
chm0 31525	Meet with Hilbert lattice ...
shjshsi 31526	Hilbert lattice join equal...
shjshseli 31527	A closed subspace sum equa...
chne0 31528	A nonzero closed subspace ...
chocin 31529	Intersection of a closed s...
chssoc 31530	A closed subspace less tha...
chj0 31531	Join with Hilbert lattice ...
chslej 31532	Subspace sum is smaller th...
chincl 31533	Closure of Hilbert lattice...
chsscon3 31534	Hilbert lattice contraposi...
chsscon1 31535	Hilbert lattice contraposi...
chsscon2 31536	Hilbert lattice contraposi...
chpsscon3 31537	Hilbert lattice contraposi...
chpsscon1 31538	Hilbert lattice contraposi...
chpsscon2 31539	Hilbert lattice contraposi...
chjcom 31540	Commutative law for Hilber...
chub1 31541	Hilbert lattice join is gr...
chub2 31542	Hilbert lattice join is gr...
chlub 31543	Hilbert lattice join is th...
chlej1 31544	Add join to both sides of ...
chlej2 31545	Add join to both sides of ...
chlejb1 31546	Hilbert lattice ordering i...
chlejb2 31547	Hilbert lattice ordering i...
chnle 31548	Equivalent expressions for...
chjo 31549	The join of a closed subsp...
chabs1 31550	Hilbert lattice absorption...
chabs2 31551	Hilbert lattice absorption...
chabs1i 31552	Hilbert lattice absorption...
chabs2i 31553	Hilbert lattice absorption...
chjidm 31554	Idempotent law for Hilbert...
chjidmi 31555	Idempotent law for Hilbert...
chj12i 31556	A rearrangement of Hilbert...
chj4i 31557	Rearrangement of the join ...
chjjdiri 31558	Hilbert lattice join distr...
chdmm1 31559	De Morgan's law for meet i...
chdmm2 31560	De Morgan's law for meet i...
chdmm3 31561	De Morgan's law for meet i...
chdmm4 31562	De Morgan's law for meet i...
chdmj1 31563	De Morgan's law for join i...
chdmj2 31564	De Morgan's law for join i...
chdmj3 31565	De Morgan's law for join i...
chdmj4 31566	De Morgan's law for join i...
chjass 31567	Associative law for Hilber...
chj12 31568	A rearrangement of Hilbert...
chj4 31569	Rearrangement of the join ...
ledii 31570	An ortholattice is distrib...
lediri 31571	An ortholattice is distrib...
lejdii 31572	An ortholattice is distrib...
lejdiri 31573	An ortholattice is distrib...
ledi 31574	An ortholattice is distrib...
spansn0 31575	The span of the singleton ...
span0 31576	The span of the empty set ...
elspani 31577	Membership in the span of ...
spanuni 31578	The span of a union is the...
spanun 31579	The span of a union is the...
sshhococi 31580	The join of two Hilbert sp...
hne0 31581	Hilbert space has a nonzer...
chsup0 31582	The supremum of the empty ...
h1deoi 31583	Membership in orthocomplem...
h1dei 31584	Membership in 1-dimensiona...
h1did 31585	A generating vector belong...
h1dn0 31586	A nonzero vector generates...
h1de2i 31587	Membership in 1-dimensiona...
h1de2bi 31588	Membership in 1-dimensiona...
h1de2ctlem 31589	Lemma for ~ h1de2ci . (Co...
h1de2ci 31590	Membership in 1-dimensiona...
spansni 31591	The span of a singleton in...
elspansni 31592	Membership in the span of ...
spansn 31593	The span of a singleton in...
spansnch 31594	The span of a Hilbert spac...
spansnsh 31595	The span of a Hilbert spac...
spansnchi 31596	The span of a singleton in...
spansnid 31597	A vector belongs to the sp...
spansnmul 31598	A scalar product with a ve...
elspansncl 31599	A member of a span of a si...
elspansn 31600	Membership in the span of ...
elspansn2 31601	Membership in the span of ...
spansncol 31602	The singletons of collinea...
spansneleqi 31603	Membership relation implie...
spansneleq 31604	Membership relation that i...
spansnss 31605	The span of the singleton ...
elspansn3 31606	A member of the span of th...
elspansn4 31607	A span membership conditio...
elspansn5 31608	A vector belonging to both...
spansnss2 31609	The span of the singleton ...
normcan 31610	Cancellation-type law that...
pjspansn 31611	A projection on the span o...
spansnpji 31612	A subset of Hilbert space ...
spanunsni 31613	The span of the union of a...
spanpr 31614	The span of a pair of vect...
h1datomi 31615	A 1-dimensional subspace i...
h1datom 31616	A 1-dimensional subspace i...
cmbr 31618	Binary relation expressing...
pjoml2i 31619	Variation of orthomodular ...
pjoml3i 31620	Variation of orthomodular ...
pjoml4i 31621	Variation of orthomodular ...
pjoml5i 31622	The orthomodular law. Rem...
pjoml6i 31623	An equivalent of the ortho...
cmbri 31624	Binary relation expressing...
cmcmlem 31625	Commutation is symmetric. ...
cmcmi 31626	Commutation is symmetric. ...
cmcm2i 31627	Commutation with orthocomp...
cmcm3i 31628	Commutation with orthocomp...
cmcm4i 31629	Commutation with orthocomp...
cmbr2i 31630	Alternate definition of th...
cmcmii 31631	Commutation is symmetric. ...
cmcm2ii 31632	Commutation with orthocomp...
cmcm3ii 31633	Commutation with orthocomp...
cmbr3i 31634	Alternate definition for t...
cmbr4i 31635	Alternate definition for t...
lecmi 31636	Comparable Hilbert lattice...
lecmii 31637	Comparable Hilbert lattice...
cmj1i 31638	A Hilbert lattice element ...
cmj2i 31639	A Hilbert lattice element ...
cmm1i 31640	A Hilbert lattice element ...
cmm2i 31641	A Hilbert lattice element ...
cmbr3 31642	Alternate definition for t...
cm0 31643	The zero Hilbert lattice e...
cmidi 31644	The commutes relation is r...
pjoml2 31645	Variation of orthomodular ...
pjoml3 31646	Variation of orthomodular ...
pjoml5 31647	The orthomodular law. Rem...
cmcm 31648	Commutation is symmetric. ...
cmcm3 31649	Commutation with orthocomp...
cmcm2 31650	Commutation with orthocomp...
lecm 31651	Comparable Hilbert lattice...
fh1 31652	Foulis-Holland Theorem. I...
fh2 31653	Foulis-Holland Theorem. I...
cm2j 31654	A lattice element that com...
fh1i 31655	Foulis-Holland Theorem. I...
fh2i 31656	Foulis-Holland Theorem. I...
fh3i 31657	Variation of the Foulis-Ho...
fh4i 31658	Variation of the Foulis-Ho...
cm2ji 31659	A lattice element that com...
cm2mi 31660	A lattice element that com...
qlax1i 31661	One of the equations showi...
qlax2i 31662	One of the equations showi...
qlax3i 31663	One of the equations showi...
qlax4i 31664	One of the equations showi...
qlax5i 31665	One of the equations showi...
qlaxr1i 31666	One of the conditions show...
qlaxr2i 31667	One of the conditions show...
qlaxr4i 31668	One of the conditions show...
qlaxr5i 31669	One of the conditions show...
qlaxr3i 31670	A variation of the orthomo...
chscllem1 31671	Lemma for ~ chscl . (Cont...
chscllem2 31672	Lemma for ~ chscl . (Cont...
chscllem3 31673	Lemma for ~ chscl . (Cont...
chscllem4 31674	Lemma for ~ chscl . (Cont...
chscl 31675	The subspace sum of two cl...
osumi 31676	If two closed subspaces of...
osumcori 31677	Corollary of ~ osumi . (C...
osumcor2i 31678	Corollary of ~ osumi , sho...
osum 31679	If two closed subspaces of...
spansnji 31680	The subspace sum of a clos...
spansnj 31681	The subspace sum of a clos...
spansnscl 31682	The subspace sum of a clos...
sumspansn 31683	The sum of two vectors bel...
spansnm0i 31684	The meet of different one-...
nonbooli 31685	A Hilbert lattice with two...
spansncvi 31686	Hilbert space has the cove...
spansncv 31687	Hilbert space has the cove...
5oalem1 31688	Lemma for orthoarguesian l...
5oalem2 31689	Lemma for orthoarguesian l...
5oalem3 31690	Lemma for orthoarguesian l...
5oalem4 31691	Lemma for orthoarguesian l...
5oalem5 31692	Lemma for orthoarguesian l...
5oalem6 31693	Lemma for orthoarguesian l...
5oalem7 31694	Lemma for orthoarguesian l...
5oai 31695	Orthoarguesian law 5OA. Th...
3oalem1 31696	Lemma for 3OA (weak) ortho...
3oalem2 31697	Lemma for 3OA (weak) ortho...
3oalem3 31698	Lemma for 3OA (weak) ortho...
3oalem4 31699	Lemma for 3OA (weak) ortho...
3oalem5 31700	Lemma for 3OA (weak) ortho...
3oalem6 31701	Lemma for 3OA (weak) ortho...
3oai 31702	3OA (weak) orthoarguesian ...
pjorthi 31703	Projection components on o...
pjch1 31704	Property of identity proje...
pjo 31705	The orthogonal projection....
pjcompi 31706	Component of a projection....
pjidmi 31707	A projection is idempotent...
pjadjii 31708	A projection is self-adjoi...
pjaddii 31709	Projection of vector sum i...
pjinormii 31710	The inner product of a pro...
pjmulii 31711	Projection of (scalar) pro...
pjsubii 31712	Projection of vector diffe...
pjsslem 31713	Lemma for subset relations...
pjss2i 31714	Subset relationship for pr...
pjssmii 31715	Projection meet property. ...
pjssge0ii 31716	Theorem 4.5(iv)->(v) of [B...
pjdifnormii 31717	Theorem 4.5(v)<->(vi) of [...
pjcji 31718	The projection on a subspa...
pjadji 31719	A projection is self-adjoi...
pjaddi 31720	Projection of vector sum i...
pjinormi 31721	The inner product of a pro...
pjsubi 31722	Projection of vector diffe...
pjmuli 31723	Projection of scalar produ...
pjige0i 31724	The inner product of a pro...
pjige0 31725	The inner product of a pro...
pjcjt2 31726	The projection on a subspa...
pj0i 31727	The projection of the zero...
pjch 31728	Projection of a vector in ...
pjid 31729	The projection of a vector...
pjvec 31730	The set of vectors belongi...
pjocvec 31731	The set of vectors belongi...
pjocini 31732	Membership of projection i...
pjini 31733	Membership of projection i...
pjjsi 31734	A sufficient condition for...
pjfni 31735	Functionality of a project...
pjrni 31736	The range of a projection....
pjfoi 31737	A projection maps onto its...
pjfi 31738	The mapping of a projectio...
pjvi 31739	The value of a projection ...
pjhfo 31740	A projection maps onto its...
pjrn 31741	The range of a projection....
pjhf 31742	The mapping of a projectio...
pjfn 31743	Functionality of a project...
pjsumi 31744	The projection on a subspa...
pj11i 31745	One-to-one correspondence ...
pjdsi 31746	Vector decomposition into ...
pjds3i 31747	Vector decomposition into ...
pj11 31748	One-to-one correspondence ...
pjmfn 31749	Functionality of the proje...
pjmf1 31750	The projector function map...
pjoi0 31751	The inner product of proje...
pjoi0i 31752	The inner product of proje...
pjopythi 31753	Pythagorean theorem for pr...
pjopyth 31754	Pythagorean theorem for pr...
pjnormi 31755	The norm of the projection...
pjpythi 31756	Pythagorean theorem for pr...
pjneli 31757	If a vector does not belon...
pjnorm 31758	The norm of the projection...
pjpyth 31759	Pythagorean theorem for pr...
pjnel 31760	If a vector does not belon...
pjnorm2 31761	A vector belongs to the su...
mayete3i 31762	Mayet's equation E_3. Par...
mayetes3i 31763	Mayet's equation E^*_3, de...
hosmval 31769	Value of the sum of two Hi...
hommval 31770	Value of the scalar produc...
hodmval 31771	Value of the difference of...
hfsmval 31772	Value of the sum of two Hi...
hfmmval 31773	Value of the scalar produc...
hosval 31774	Value of the sum of two Hi...
homval 31775	Value of the scalar produc...
hodval 31776	Value of the difference of...
hfsval 31777	Value of the sum of two Hi...
hfmval 31778	Value of the scalar produc...
hoscl 31779	Closure of the sum of two ...
homcl 31780	Closure of the scalar prod...
hodcl 31781	Closure of the difference ...
ho0val 31784	Value of the zero Hilbert ...
ho0f 31785	Functionality of the zero ...
df0op2 31786	Alternate definition of Hi...
dfiop2 31787	Alternate definition of Hi...
hoif 31788	Functionality of the Hilbe...
hoival 31789	The value of the Hilbert s...
hoico1 31790	Composition with the Hilbe...
hoico2 31791	Composition with the Hilbe...
hoaddcl 31792	The sum of Hilbert space o...
homulcl 31793	The scalar product of a Hi...
hoeq 31794	Equality of Hilbert space ...
hoeqi 31795	Equality of Hilbert space ...
hoscli 31796	Closure of Hilbert space o...
hodcli 31797	Closure of Hilbert space o...
hocoi 31798	Composition of Hilbert spa...
hococli 31799	Closure of composition of ...
hocofi 31800	Mapping of composition of ...
hocofni 31801	Functionality of compositi...
hoaddcli 31802	Mapping of sum of Hilbert ...
hosubcli 31803	Mapping of difference of H...
hoaddfni 31804	Functionality of sum of Hi...
hosubfni 31805	Functionality of differenc...
hoaddcomi 31806	Commutativity of sum of Hi...
hosubcl 31807	Mapping of difference of H...
hoaddcom 31808	Commutativity of sum of Hi...
hodsi 31809	Relationship between Hilbe...
hoaddassi 31810	Associativity of sum of Hi...
hoadd12i 31811	Commutative/associative la...
hoadd32i 31812	Commutative/associative la...
hocadddiri 31813	Distributive law for Hilbe...
hocsubdiri 31814	Distributive law for Hilbe...
ho2coi 31815	Double composition of Hilb...
hoaddass 31816	Associativity of sum of Hi...
hoadd32 31817	Commutative/associative la...
hoadd4 31818	Rearrangement of 4 terms i...
hocsubdir 31819	Distributive law for Hilbe...
hoaddridi 31820	Sum of a Hilbert space ope...
hodidi 31821	Difference of a Hilbert sp...
ho0coi 31822	Composition of the zero op...
hoid1i 31823	Composition of Hilbert spa...
hoid1ri 31824	Composition of Hilbert spa...
hoaddrid 31825	Sum of a Hilbert space ope...
hodid 31826	Difference of a Hilbert sp...
hon0 31827	A Hilbert space operator i...
hodseqi 31828	Subtraction and addition o...
ho0subi 31829	Subtraction of Hilbert spa...
honegsubi 31830	Relationship between Hilbe...
ho0sub 31831	Subtraction of Hilbert spa...
hosubid1 31832	The zero operator subtract...
honegsub 31833	Relationship between Hilbe...
homullid 31834	An operator equals its sca...
homco1 31835	Associative law for scalar...
homulass 31836	Scalar product associative...
hoadddi 31837	Scalar product distributiv...
hoadddir 31838	Scalar product reverse dis...
homul12 31839	Swap first and second fact...
honegneg 31840	Double negative of a Hilbe...
hosubneg 31841	Relationship between opera...
hosubdi 31842	Scalar product distributiv...
honegdi 31843	Distribution of negative o...
honegsubdi 31844	Distribution of negative o...
honegsubdi2 31845	Distribution of negative o...
hosubsub2 31846	Law for double subtraction...
hosub4 31847	Rearrangement of 4 terms i...
hosubadd4 31848	Rearrangement of 4 terms i...
hoaddsubass 31849	Associative-type law for a...
hoaddsub 31850	Law for operator addition ...
hosubsub 31851	Law for double subtraction...
hosubsub4 31852	Law for double subtraction...
ho2times 31853	Two times a Hilbert space ...
hoaddsubassi 31854	Associativity of sum and d...
hoaddsubi 31855	Law for sum and difference...
hosd1i 31856	Hilbert space operator sum...
hosd2i 31857	Hilbert space operator sum...
hopncani 31858	Hilbert space operator can...
honpcani 31859	Hilbert space operator can...
hosubeq0i 31860	If the difference between ...
honpncani 31861	Hilbert space operator can...
ho01i 31862	A condition implying that ...
ho02i 31863	A condition implying that ...
hoeq1 31864	A condition implying that ...
hoeq2 31865	A condition implying that ...
adjmo 31866	Every Hilbert space operat...
adjsym 31867	Symmetry property of an ad...
eigrei 31868	A necessary and sufficient...
eigre 31869	A necessary and sufficient...
eigposi 31870	A sufficient condition (fi...
eigorthi 31871	A necessary and sufficient...
eigorth 31872	A necessary and sufficient...
nmopval 31890	Value of the norm of a Hil...
elcnop 31891	Property defining a contin...
ellnop 31892	Property defining a linear...
lnopf 31893	A linear Hilbert space ope...
elbdop 31894	Property defining a bounde...
bdopln 31895	A bounded linear Hilbert s...
bdopf 31896	A bounded linear Hilbert s...
nmopsetretALT 31897	The set in the supremum of...
nmopsetretHIL 31898	The set in the supremum of...
nmopsetn0 31899	The set in the supremum of...
nmopxr 31900	The norm of a Hilbert spac...
nmoprepnf 31901	The norm of a Hilbert spac...
nmopgtmnf 31902	The norm of a Hilbert spac...
nmopreltpnf 31903	The norm of a Hilbert spac...
nmopre 31904	The norm of a bounded oper...
elbdop2 31905	Property defining a bounde...
elunop 31906	Property defining a unitar...
elhmop 31907	Property defining a Hermit...
hmopf 31908	A Hermitian operator is a ...
hmopex 31909	The class of Hermitian ope...
nmfnval 31910	Value of the norm of a Hil...
nmfnsetre 31911	The set in the supremum of...
nmfnsetn0 31912	The set in the supremum of...
nmfnxr 31913	The norm of any Hilbert sp...
nmfnrepnf 31914	The norm of a Hilbert spac...
nlfnval 31915	Value of the null space of...
elcnfn 31916	Property defining a contin...
ellnfn 31917	Property defining a linear...
lnfnf 31918	A linear Hilbert space fun...
dfadj2 31919	Alternate definition of th...
funadj 31920	Functionality of the adjoi...
dmadjss 31921	The domain of the adjoint ...
dmadjop 31922	A member of the domain of ...
adjeu 31923	Elementhood in the domain ...
adjval 31924	Value of the adjoint funct...
adjval2 31925	Value of the adjoint funct...
cnvadj 31926	The adjoint function equal...
funcnvadj 31927	The converse of the adjoin...
adj1o 31928	The adjoint function maps ...
dmadjrn 31929	The adjoint of an operator...
eigvecval 31930	The set of eigenvectors of...
eigvalfval 31931	The eigenvalues of eigenve...
specval 31932	The value of the spectrum ...
speccl 31933	The spectrum of an operato...
hhlnoi 31934	The linear operators of Hi...
hhnmoi 31935	The norm of an operator in...
hhbloi 31936	A bounded linear operator ...
hh0oi 31937	The zero operator in Hilbe...
hhcno 31938	The continuous operators o...
hhcnf 31939	The continuous functionals...
dmadjrnb 31940	The adjoint of an operator...
nmoplb 31941	A lower bound for an opera...
nmopub 31942	An upper bound for an oper...
nmopub2tALT 31943	An upper bound for an oper...
nmopub2tHIL 31944	An upper bound for an oper...
nmopge0 31945	The norm of any Hilbert sp...
nmopgt0 31946	A linear Hilbert space ope...
cnopc 31947	Basic continuity property ...
lnopl 31948	Basic linearity property o...
unop 31949	Basic inner product proper...
unopf1o 31950	A unitary operator in Hilb...
unopnorm 31951	A unitary operator is idem...
cnvunop 31952	The inverse (converse) of ...
unopadj 31953	The inverse (converse) of ...
unoplin 31954	A unitary operator is line...
counop 31955	The composition of two uni...
hmop 31956	Basic inner product proper...
hmopre 31957	The inner product of the v...
nmfnlb 31958	A lower bound for a functi...
nmfnleub 31959	An upper bound for the nor...
nmfnleub2 31960	An upper bound for the nor...
nmfnge0 31961	The norm of any Hilbert sp...
elnlfn 31962	Membership in the null spa...
elnlfn2 31963	Membership in the null spa...
cnfnc 31964	Basic continuity property ...
lnfnl 31965	Basic linearity property o...
adjcl 31966	Closure of the adjoint of ...
adj1 31967	Property of an adjoint Hil...
adj2 31968	Property of an adjoint Hil...
adjeq 31969	A property that determines...
adjadj 31970	Double adjoint. Theorem 3...
adjvalval 31971	Value of the value of the ...
unopadj2 31972	The adjoint of a unitary o...
hmopadj 31973	A Hermitian operator is se...
hmdmadj 31974	Every Hermitian operator h...
hmopadj2 31975	An operator is Hermitian i...
hmoplin 31976	A Hermitian operator is li...
brafval 31977	The bra of a vector, expre...
braval 31978	A bra-ket juxtaposition, e...
braadd 31979	Linearity property of bra ...
bramul 31980	Linearity property of bra ...
brafn 31981	The bra function is a func...
bralnfn 31982	The Dirac bra function is ...
bracl 31983	Closure of the bra functio...
bra0 31984	The Dirac bra of the zero ...
brafnmul 31985	Anti-linearity property of...
kbfval 31986	The outer product of two v...
kbop 31987	The outer product of two v...
kbval 31988	The value of the operator ...
kbmul 31989	Multiplication property of...
kbpj 31990	If a vector ` A ` has norm...
eleigvec 31991	Membership in the set of e...
eleigvec2 31992	Membership in the set of e...
eleigveccl 31993	Closure of an eigenvector ...
eigvalval 31994	The eigenvalue of an eigen...
eigvalcl 31995	An eigenvalue is a complex...
eigvec1 31996	Property of an eigenvector...
eighmre 31997	The eigenvalues of a Hermi...
eighmorth 31998	Eigenvectors of a Hermitia...
nmopnegi 31999	Value of the norm of the n...
lnop0 32000	The value of a linear Hilb...
lnopmul 32001	Multiplicative property of...
lnopli 32002	Basic scalar product prope...
lnopfi 32003	A linear Hilbert space ope...
lnop0i 32004	The value of a linear Hilb...
lnopaddi 32005	Additive property of a lin...
lnopmuli 32006	Multiplicative property of...
lnopaddmuli 32007	Sum/product property of a ...
lnopsubi 32008	Subtraction property for a...
lnopsubmuli 32009	Subtraction/product proper...
lnopmulsubi 32010	Product/subtraction proper...
homco2 32011	Move a scalar product out ...
idunop 32012	The identity function (res...
0cnop 32013	The identically zero funct...
0cnfn 32014	The identically zero funct...
idcnop 32015	The identity function (res...
idhmop 32016	The Hilbert space identity...
0hmop 32017	The identically zero funct...
0lnop 32018	The identically zero funct...
0lnfn 32019	The identically zero funct...
nmop0 32020	The norm of the zero opera...
nmfn0 32021	The norm of the identicall...
hmopbdoptHIL 32022	A Hermitian operator is a ...
hoddii 32023	Distributive law for Hilbe...
hoddi 32024	Distributive law for Hilbe...
nmop0h 32025	The norm of any operator o...
idlnop 32026	The identity function (res...
0bdop 32027	The identically zero opera...
adj0 32028	Adjoint of the zero operat...
nmlnop0iALT 32029	A linear operator with a z...
nmlnop0iHIL 32030	A linear operator with a z...
nmlnopgt0i 32031	A linear Hilbert space ope...
nmlnop0 32032	A linear operator with a z...
nmlnopne0 32033	A linear operator with a n...
lnopmi 32034	The scalar product of a li...
lnophsi 32035	The sum of two linear oper...
lnophdi 32036	The difference of two line...
lnopcoi 32037	The composition of two lin...
lnopco0i 32038	The composition of a linea...
lnopeq0lem1 32039	Lemma for ~ lnopeq0i . Ap...
lnopeq0lem2 32040	Lemma for ~ lnopeq0i . (C...
lnopeq0i 32041	A condition implying that ...
lnopeqi 32042	Two linear Hilbert space o...
lnopeq 32043	Two linear Hilbert space o...
lnopunilem1 32044	Lemma for ~ lnopunii . (C...
lnopunilem2 32045	Lemma for ~ lnopunii . (C...
lnopunii 32046	If a linear operator (whos...
elunop2 32047	An operator is unitary iff...
nmopun 32048	Norm of a unitary Hilbert ...
unopbd 32049	A unitary operator is a bo...
lnophmlem1 32050	Lemma for ~ lnophmi . (Co...
lnophmlem2 32051	Lemma for ~ lnophmi . (Co...
lnophmi 32052	A linear operator is Hermi...
lnophm 32053	A linear operator is Hermi...
hmops 32054	The sum of two Hermitian o...
hmopm 32055	The scalar product of a He...
hmopd 32056	The difference of two Herm...
hmopco 32057	The composition of two com...
nmbdoplbi 32058	A lower bound for the norm...
nmbdoplb 32059	A lower bound for the norm...
nmcexi 32060	Lemma for ~ nmcopexi and ~...
nmcopexi 32061	The norm of a continuous l...
nmcoplbi 32062	A lower bound for the norm...
nmcopex 32063	The norm of a continuous l...
nmcoplb 32064	A lower bound for the norm...
nmophmi 32065	The norm of the scalar pro...
bdophmi 32066	The scalar product of a bo...
lnconi 32067	Lemma for ~ lnopconi and ~...
lnopconi 32068	A condition equivalent to ...
lnopcon 32069	A condition equivalent to ...
lnopcnbd 32070	A linear operator is conti...
lncnopbd 32071	A continuous linear operat...
lncnbd 32072	A continuous linear operat...
lnopcnre 32073	A linear operator is conti...
lnfnli 32074	Basic property of a linear...
lnfnfi 32075	A linear Hilbert space fun...
lnfn0i 32076	The value of a linear Hilb...
lnfnaddi 32077	Additive property of a lin...
lnfnmuli 32078	Multiplicative property of...
lnfnaddmuli 32079	Sum/product property of a ...
lnfnsubi 32080	Subtraction property for a...
lnfn0 32081	The value of a linear Hilb...
lnfnmul 32082	Multiplicative property of...
nmbdfnlbi 32083	A lower bound for the norm...
nmbdfnlb 32084	A lower bound for the norm...
nmcfnexi 32085	The norm of a continuous l...
nmcfnlbi 32086	A lower bound for the norm...
nmcfnex 32087	The norm of a continuous l...
nmcfnlb 32088	A lower bound of the norm ...
lnfnconi 32089	A condition equivalent to ...
lnfncon 32090	A condition equivalent to ...
lnfncnbd 32091	A linear functional is con...
imaelshi 32092	The image of a subspace un...
rnelshi 32093	The range of a linear oper...
nlelshi 32094	The null space of a linear...
nlelchi 32095	The null space of a contin...
riesz3i 32096	A continuous linear functi...
riesz4i 32097	A continuous linear functi...
riesz4 32098	A continuous linear functi...
riesz1 32099	Part 1 of the Riesz repres...
riesz2 32100	Part 2 of the Riesz repres...
cnlnadjlem1 32101	Lemma for ~ cnlnadji (Theo...
cnlnadjlem2 32102	Lemma for ~ cnlnadji . ` G...
cnlnadjlem3 32103	Lemma for ~ cnlnadji . By...
cnlnadjlem4 32104	Lemma for ~ cnlnadji . Th...
cnlnadjlem5 32105	Lemma for ~ cnlnadji . ` F...
cnlnadjlem6 32106	Lemma for ~ cnlnadji . ` F...
cnlnadjlem7 32107	Lemma for ~ cnlnadji . He...
cnlnadjlem8 32108	Lemma for ~ cnlnadji . ` F...
cnlnadjlem9 32109	Lemma for ~ cnlnadji . ` F...
cnlnadji 32110	Every continuous linear op...
cnlnadjeui 32111	Every continuous linear op...
cnlnadjeu 32112	Every continuous linear op...
cnlnadj 32113	Every continuous linear op...
cnlnssadj 32114	Every continuous linear Hi...
bdopssadj 32115	Every bounded linear Hilbe...
bdopadj 32116	Every bounded linear Hilbe...
adjbdln 32117	The adjoint of a bounded l...
adjbdlnb 32118	An operator is bounded and...
adjbd1o 32119	The mapping of adjoints of...
adjlnop 32120	The adjoint of an operator...
adjsslnop 32121	Every operator with an adj...
nmopadjlei 32122	Property of the norm of an...
nmopadjlem 32123	Lemma for ~ nmopadji . (C...
nmopadji 32124	Property of the norm of an...
adjeq0 32125	An operator is zero iff it...
adjmul 32126	The adjoint of the scalar ...
adjadd 32127	The adjoint of the sum of ...
nmoptrii 32128	Triangle inequality for th...
nmopcoi 32129	Upper bound for the norm o...
bdophsi 32130	The sum of two bounded lin...
bdophdi 32131	The difference between two...
bdopcoi 32132	The composition of two bou...
nmoptri2i 32133	Triangle-type inequality f...
adjcoi 32134	The adjoint of a compositi...
nmopcoadji 32135	The norm of an operator co...
nmopcoadj2i 32136	The norm of an operator co...
nmopcoadj0i 32137	An operator composed with ...
unierri 32138	If we approximate a chain ...
branmfn 32139	The norm of the bra functi...
brabn 32140	The bra of a vector is a b...
rnbra 32141	The set of bras equals the...
bra11 32142	The bra function maps vect...
bracnln 32143	A bra is a continuous line...
cnvbraval 32144	Value of the converse of t...
cnvbracl 32145	Closure of the converse of...
cnvbrabra 32146	The converse bra of the br...
bracnvbra 32147	The bra of the converse br...
bracnlnval 32148	The vector that a continuo...
cnvbramul 32149	Multiplication property of...
kbass1 32150	Dirac bra-ket associative ...
kbass2 32151	Dirac bra-ket associative ...
kbass3 32152	Dirac bra-ket associative ...
kbass4 32153	Dirac bra-ket associative ...
kbass5 32154	Dirac bra-ket associative ...
kbass6 32155	Dirac bra-ket associative ...
leopg 32156	Ordering relation for posi...
leop 32157	Ordering relation for oper...
leop2 32158	Ordering relation for oper...
leop3 32159	Operator ordering in terms...
leoppos 32160	Binary relation defining a...
leoprf2 32161	The ordering relation for ...
leoprf 32162	The ordering relation for ...
leopsq 32163	The square of a Hermitian ...
0leop 32164	The zero operator is a pos...
idleop 32165	The identity operator is a...
leopadd 32166	The sum of two positive op...
leopmuli 32167	The scalar product of a no...
leopmul 32168	The scalar product of a po...
leopmul2i 32169	Scalar product applied to ...
leoptri 32170	The positive operator orde...
leoptr 32171	The positive operator orde...
leopnmid 32172	A bounded Hermitian operat...
nmopleid 32173	A nonzero, bounded Hermiti...
opsqrlem1 32174	Lemma for opsqri . (Contr...
opsqrlem2 32175	Lemma for opsqri . ` F `` ...
opsqrlem3 32176	Lemma for opsqri . (Contr...
opsqrlem4 32177	Lemma for opsqri . (Contr...
opsqrlem5 32178	Lemma for opsqri . (Contr...
opsqrlem6 32179	Lemma for opsqri . (Contr...
pjhmopi 32180	A projector is a Hermitian...
pjlnopi 32181	A projector is a linear op...
pjnmopi 32182	The operator norm of a pro...
pjbdlni 32183	A projector is a bounded l...
pjhmop 32184	A projection is a Hermitia...
hmopidmchi 32185	An idempotent Hermitian op...
hmopidmpji 32186	An idempotent Hermitian op...
hmopidmch 32187	An idempotent Hermitian op...
hmopidmpj 32188	An idempotent Hermitian op...
pjsdii 32189	Distributive law for Hilbe...
pjddii 32190	Distributive law for Hilbe...
pjsdi2i 32191	Chained distributive law f...
pjcoi 32192	Composition of projections...
pjcocli 32193	Closure of composition of ...
pjcohcli 32194	Closure of composition of ...
pjadjcoi 32195	Adjoint of composition of ...
pjcofni 32196	Functionality of compositi...
pjss1coi 32197	Subset relationship for pr...
pjss2coi 32198	Subset relationship for pr...
pjssmi 32199	Projection meet property. ...
pjssge0i 32200	Theorem 4.5(iv)->(v) of [B...
pjdifnormi 32201	Theorem 4.5(v)<->(vi) of [...
pjnormssi 32202	Theorem 4.5(i)<->(vi) of [...
pjorthcoi 32203	Composition of projections...
pjscji 32204	The projection of orthogon...
pjssumi 32205	The projection on a subspa...
pjssposi 32206	Projector ordering can be ...
pjordi 32207	The definition of projecto...
pjssdif2i 32208	The projection subspace of...
pjssdif1i 32209	A necessary and sufficient...
pjimai 32210	The image of a projection....
pjidmcoi 32211	A projection is idempotent...
pjoccoi 32212	Composition of projections...
pjtoi 32213	Subspace sum of projection...
pjoci 32214	Projection of orthocomplem...
pjidmco 32215	A projection operator is i...
dfpjop 32216	Definition of projection o...
pjhmopidm 32217	Two ways to express the se...
elpjidm 32218	A projection operator is i...
elpjhmop 32219	A projection operator is H...
0leopj 32220	A projector is a positive ...
pjadj2 32221	A projector is self-adjoin...
pjadj3 32222	A projector is self-adjoin...
elpjch 32223	Reconstruction of the subs...
elpjrn 32224	Reconstruction of the subs...
pjinvari 32225	A closed subspace ` H ` wi...
pjin1i 32226	Lemma for Theorem 1.22 of ...
pjin2i 32227	Lemma for Theorem 1.22 of ...
pjin3i 32228	Lemma for Theorem 1.22 of ...
pjclem1 32229	Lemma for projection commu...
pjclem2 32230	Lemma for projection commu...
pjclem3 32231	Lemma for projection commu...
pjclem4a 32232	Lemma for projection commu...
pjclem4 32233	Lemma for projection commu...
pjci 32234	Two subspaces commute iff ...
pjcmul1i 32235	A necessary and sufficient...
pjcmul2i 32236	The projection subspace of...
pjcohocli 32237	Closure of composition of ...
pjadj2coi 32238	Adjoint of double composit...
pj2cocli 32239	Closure of double composit...
pj3lem1 32240	Lemma for projection tripl...
pj3si 32241	Stronger projection triple...
pj3i 32242	Projection triplet theorem...
pj3cor1i 32243	Projection triplet corolla...
pjs14i 32244	Theorem S-14 of Watanabe, ...
isst 32247	Property of a state. (Con...
ishst 32248	Property of a complex Hilb...
sticl 32249	` [ 0 , 1 ] ` closure of t...
stcl 32250	Real closure of the value ...
hstcl 32251	Closure of the value of a ...
hst1a 32252	Unit value of a Hilbert-sp...
hstel2 32253	Properties of a Hilbert-sp...
hstorth 32254	Orthogonality property of ...
hstosum 32255	Orthogonal sum property of...
hstoc 32256	Sum of a Hilbert-space-val...
hstnmoc 32257	Sum of norms of a Hilbert-...
stge0 32258	The value of a state is no...
stle1 32259	The value of a state is le...
hstle1 32260	The norm of the value of a...
hst1h 32261	The norm of a Hilbert-spac...
hst0h 32262	The norm of a Hilbert-spac...
hstpyth 32263	Pythagorean property of a ...
hstle 32264	Ordering property of a Hil...
hstles 32265	Ordering property of a Hil...
hstoh 32266	A Hilbert-space-valued sta...
hst0 32267	A Hilbert-space-valued sta...
sthil 32268	The value of a state at th...
stj 32269	The value of a state on a ...
sto1i 32270	The state of a subspace pl...
sto2i 32271	The state of the orthocomp...
stge1i 32272	If a state is greater than...
stle0i 32273	If a state is less than or...
stlei 32274	Ordering law for states. ...
stlesi 32275	Ordering law for states. ...
stji1i 32276	Join of components of Sasa...
stm1i 32277	State of component of unit...
stm1ri 32278	State of component of unit...
stm1addi 32279	Sum of states whose meet i...
staddi 32280	If the sum of 2 states is ...
stm1add3i 32281	Sum of states whose meet i...
stadd3i 32282	If the sum of 3 states is ...
st0 32283	The state of the zero subs...
strlem1 32284	Lemma for strong state the...
strlem2 32285	Lemma for strong state the...
strlem3a 32286	Lemma for strong state the...
strlem3 32287	Lemma for strong state the...
strlem4 32288	Lemma for strong state the...
strlem5 32289	Lemma for strong state the...
strlem6 32290	Lemma for strong state the...
stri 32291	Strong state theorem. The...
strb 32292	Strong state theorem (bidi...
hstrlem2 32293	Lemma for strong set of CH...
hstrlem3a 32294	Lemma for strong set of CH...
hstrlem3 32295	Lemma for strong set of CH...
hstrlem4 32296	Lemma for strong set of CH...
hstrlem5 32297	Lemma for strong set of CH...
hstrlem6 32298	Lemma for strong set of CH...
hstri 32299	Hilbert space admits a str...
hstrbi 32300	Strong CH-state theorem (b...
largei 32301	A Hilbert lattice admits a...
jplem1 32302	Lemma for Jauch-Piron theo...
jplem2 32303	Lemma for Jauch-Piron theo...
jpi 32304	The function ` S ` , that ...
golem1 32305	Lemma for Godowski's equat...
golem2 32306	Lemma for Godowski's equat...
goeqi 32307	Godowski's equation, shown...
stcltr1i 32308	Property of a strong class...
stcltr2i 32309	Property of a strong class...
stcltrlem1 32310	Lemma for strong classical...
stcltrlem2 32311	Lemma for strong classical...
stcltrthi 32312	Theorem for classically st...
cvbr 32316	Binary relation expressing...
cvbr2 32317	Binary relation expressing...
cvcon3 32318	Contraposition law for the...
cvpss 32319	The covers relation implie...
cvnbtwn 32320	The covers relation implie...
cvnbtwn2 32321	The covers relation implie...
cvnbtwn3 32322	The covers relation implie...
cvnbtwn4 32323	The covers relation implie...
cvnsym 32324	The covers relation is not...
cvnref 32325	The covers relation is not...
cvntr 32326	The covers relation is not...
spansncv2 32327	Hilbert space has the cove...
mdbr 32328	Binary relation expressing...
mdi 32329	Consequence of the modular...
mdbr2 32330	Binary relation expressing...
mdbr3 32331	Binary relation expressing...
mdbr4 32332	Binary relation expressing...
dmdbr 32333	Binary relation expressing...
dmdmd 32334	The dual modular pair prop...
mddmd 32335	The modular pair property ...
dmdi 32336	Consequence of the dual mo...
dmdbr2 32337	Binary relation expressing...
dmdi2 32338	Consequence of the dual mo...
dmdbr3 32339	Binary relation expressing...
dmdbr4 32340	Binary relation expressing...
dmdi4 32341	Consequence of the dual mo...
dmdbr5 32342	Binary relation expressing...
mddmd2 32343	Relationship between modul...
mdsl0 32344	A sublattice condition tha...
ssmd1 32345	Ordering implies the modul...
ssmd2 32346	Ordering implies the modul...
ssdmd1 32347	Ordering implies the dual ...
ssdmd2 32348	Ordering implies the dual ...
dmdsl3 32349	Sublattice mapping for a d...
mdsl3 32350	Sublattice mapping for a m...
mdslle1i 32351	Order preservation of the ...
mdslle2i 32352	Order preservation of the ...
mdslj1i 32353	Join preservation of the o...
mdslj2i 32354	Meet preservation of the r...
mdsl1i 32355	If the modular pair proper...
mdsl2i 32356	If the modular pair proper...
mdsl2bi 32357	If the modular pair proper...
cvmdi 32358	The covering property impl...
mdslmd1lem1 32359	Lemma for ~ mdslmd1i . (C...
mdslmd1lem2 32360	Lemma for ~ mdslmd1i . (C...
mdslmd1lem3 32361	Lemma for ~ mdslmd1i . (C...
mdslmd1lem4 32362	Lemma for ~ mdslmd1i . (C...
mdslmd1i 32363	Preservation of the modula...
mdslmd2i 32364	Preservation of the modula...
mdsldmd1i 32365	Preservation of the dual m...
mdslmd3i 32366	Modular pair conditions th...
mdslmd4i 32367	Modular pair condition tha...
csmdsymi 32368	Cross-symmetry implies M-s...
mdexchi 32369	An exchange lemma for modu...
cvmd 32370	The covering property impl...
cvdmd 32371	The covering property impl...
ela 32373	Atoms in a Hilbert lattice...
elat2 32374	Expanded membership relati...
elatcv0 32375	A Hilbert lattice element ...
atcv0 32376	An atom covers the zero su...
atssch 32377	Atoms are a subset of the ...
atelch 32378	An atom is a Hilbert latti...
atne0 32379	An atom is not the Hilbert...
atss 32380	A lattice element smaller ...
atsseq 32381	Two atoms in a subset rela...
atcveq0 32382	A Hilbert lattice element ...
h1da 32383	A 1-dimensional subspace i...
spansna 32384	The span of the singleton ...
sh1dle 32385	A 1-dimensional subspace i...
ch1dle 32386	A 1-dimensional subspace i...
atom1d 32387	The 1-dimensional subspace...
superpos 32388	Superposition Principle. ...
chcv1 32389	The Hilbert lattice has th...
chcv2 32390	The Hilbert lattice has th...
chjatom 32391	The join of a closed subsp...
shatomici 32392	The lattice of Hilbert sub...
hatomici 32393	The Hilbert lattice is ato...
hatomic 32394	A Hilbert lattice is atomi...
shatomistici 32395	The lattice of Hilbert sub...
hatomistici 32396	` CH ` is atomistic, i.e. ...
chpssati 32397	Two Hilbert lattice elemen...
chrelati 32398	The Hilbert lattice is rel...
chrelat2i 32399	A consequence of relative ...
cvati 32400	If a Hilbert lattice eleme...
cvbr4i 32401	An alternate way to expres...
cvexchlem 32402	Lemma for ~ cvexchi . (Co...
cvexchi 32403	The Hilbert lattice satisf...
chrelat2 32404	A consequence of relative ...
chrelat3 32405	A consequence of relative ...
chrelat3i 32406	A consequence of the relat...
chrelat4i 32407	A consequence of relative ...
cvexch 32408	The Hilbert lattice satisf...
cvp 32409	The Hilbert lattice satisf...
atnssm0 32410	The meet of a Hilbert latt...
atnemeq0 32411	The meet of distinct atoms...
atssma 32412	The meet with an atom's su...
atcv0eq 32413	Two atoms covering the zer...
atcv1 32414	Two atoms covering the zer...
atexch 32415	The Hilbert lattice satisf...
atomli 32416	An assertion holding in at...
atoml2i 32417	An assertion holding in at...
atordi 32418	An ordering law for a Hilb...
atcvatlem 32419	Lemma for ~ atcvati . (Co...
atcvati 32420	A nonzero Hilbert lattice ...
atcvat2i 32421	A Hilbert lattice element ...
atord 32422	An ordering law for a Hilb...
atcvat2 32423	A Hilbert lattice element ...
chirredlem1 32424	Lemma for ~ chirredi . (C...
chirredlem2 32425	Lemma for ~ chirredi . (C...
chirredlem3 32426	Lemma for ~ chirredi . (C...
chirredlem4 32427	Lemma for ~ chirredi . (C...
chirredi 32428	The Hilbert lattice is irr...
chirred 32429	The Hilbert lattice is irr...
atcvat3i 32430	A condition implying that ...
atcvat4i 32431	A condition implying exist...
atdmd 32432	Two Hilbert lattice elemen...
atmd 32433	Two Hilbert lattice elemen...
atmd2 32434	Two Hilbert lattice elemen...
atabsi 32435	Absorption of an incompara...
atabs2i 32436	Absorption of an incompara...
mdsymlem1 32437	Lemma for ~ mdsymi . (Con...
mdsymlem2 32438	Lemma for ~ mdsymi . (Con...
mdsymlem3 32439	Lemma for ~ mdsymi . (Con...
mdsymlem4 32440	Lemma for ~ mdsymi . This...
mdsymlem5 32441	Lemma for ~ mdsymi . (Con...
mdsymlem6 32442	Lemma for ~ mdsymi . This...
mdsymlem7 32443	Lemma for ~ mdsymi . Lemm...
mdsymlem8 32444	Lemma for ~ mdsymi . Lemm...
mdsymi 32445	M-symmetry of the Hilbert ...
mdsym 32446	M-symmetry of the Hilbert ...
dmdsym 32447	Dual M-symmetry of the Hil...
atdmd2 32448	Two Hilbert lattice elemen...
sumdmdii 32449	If the subspace sum of two...
cmmdi 32450	Commuting subspaces form a...
cmdmdi 32451	Commuting subspaces form a...
sumdmdlem 32452	Lemma for ~ sumdmdi . The...
sumdmdlem2 32453	Lemma for ~ sumdmdi . (Co...
sumdmdi 32454	The subspace sum of two Hi...
dmdbr4ati 32455	Dual modular pair property...
dmdbr5ati 32456	Dual modular pair property...
dmdbr6ati 32457	Dual modular pair property...
dmdbr7ati 32458	Dual modular pair property...
mdoc1i 32459	Orthocomplements form a mo...
mdoc2i 32460	Orthocomplements form a mo...
dmdoc1i 32461	Orthocomplements form a du...
dmdoc2i 32462	Orthocomplements form a du...
mdcompli 32463	A condition equivalent to ...
dmdcompli 32464	A condition equivalent to ...
mddmdin0i 32465	If dual modular implies mo...
cdjreui 32466	A member of the sum of dis...
cdj1i 32467	Two ways to express " ` A ...
cdj3lem1 32468	A property of " ` A ` and ...
cdj3lem2 32469	Lemma for ~ cdj3i . Value...
cdj3lem2a 32470	Lemma for ~ cdj3i . Closu...
cdj3lem2b 32471	Lemma for ~ cdj3i . The f...
cdj3lem3 32472	Lemma for ~ cdj3i . Value...
cdj3lem3a 32473	Lemma for ~ cdj3i . Closu...
cdj3lem3b 32474	Lemma for ~ cdj3i . The s...
cdj3i 32475	Two ways to express " ` A ...
The list of syntax, axioms (ax-) and definitions (df-) for the User Mathboxes starts here
mathbox 32476	(_This theorem is a dummy ...
sa-abvi 32477	A theorem about the univer...
xfree 32478	A partial converse to ~ 19...
xfree2 32479	A partial converse to ~ 19...
addltmulALT 32480	A proof readability experi...
an42ds 32481	Inference exchanging the l...
an52ds 32482	Inference exchanging the l...
an62ds 32483	Inference exchanging the l...
an72ds 32484	Inference exchanging the l...
an82ds 32485	Inference exchanging the l...
bian1d 32486	Adding a superfluous conju...
bian1dOLD 32487	Obsolete version of ~ bian...
bibiad 32488	Eliminate an hypothesis ` ...
orim12da 32489	Deduce a disjunction from ...
or3di 32490	Distributive law for disju...
or3dir 32491	Distributive law for disju...
3o1cs 32492	Deduction eliminating disj...
3o2cs 32493	Deduction eliminating disj...
3o3cs 32494	Deduction eliminating disj...
13an22anass 32495	Associative law for four c...
sbc2iedf 32496	Conversion of implicit sub...
rspc2daf 32497	Double restricted speciali...
ralcom4f 32498	Commutation of restricted ...
rexcom4f 32499	Commutation of restricted ...
19.9d2rf 32500	A deduction version of one...
19.9d2r 32501	A deduction version of one...
r19.29ffa 32502	A commonly used pattern ba...
n0limd 32503	Deduction rule for nonempt...
eqtrb 32504	A transposition of equalit...
eqelbid 32505	A variable elimination law...
opsbc2ie 32506	Conversion of implicit sub...
opreu2reuALT 32507	Correspondence between uni...
2reucom 32510	Double restricted existent...
2reu2rex1 32511	Double restricted existent...
2reureurex 32512	Double restricted existent...
2reu2reu2 32513	Double restricted existent...
opreu2reu1 32514	Equivalent definition of t...
sq2reunnltb 32515	There exists a unique deco...
addsqnot2reu 32516	For each complex number ` ...
sbceqbidf 32517	Equality theorem for class...
sbcies 32518	A special version of class...
mo5f 32519	Alternate definition of "a...
nmo 32520	Negation of "at most one"....
reuxfrdf 32521	Transfer existential uniqu...
rexunirn 32522	Restricted existential qua...
rmoxfrd 32523	Transfer "at most one" res...
rmoun 32524	"At most one" restricted e...
rmounid 32525	A case where an "at most o...
riotaeqbidva 32526	Equivalent wff's yield equ...
dmrab 32527	Domain of a restricted cla...
difrab2 32528	Difference of two restrict...
rabexgfGS 32529	Separation Scheme in terms...
rabsnel 32530	Truth implied by equality ...
rabsspr 32531	Conditions for a restricte...
rabsstp 32532	Conditions for a restricte...
3unrab 32533	Union of three restricted ...
foresf1o 32534	From a surjective function...
rabfodom 32535	Domination relation for re...
rabrexfi 32536	Conditions for a class abs...
abrexdomjm 32537	An indexed set is dominate...
abrexdom2jm 32538	An indexed set is dominate...
abrexexd 32539	Existence of a class abstr...
elabreximd 32540	Class substitution in an i...
elabreximdv 32541	Class substitution in an i...
abrexss 32542	A necessary condition for ...
elunsn 32543	Elementhood to a union wit...
nelun 32544	Negated membership for a u...
snsssng 32545	If a singleton is a subset...
n0nsnel 32546	If a class with one elemen...
inin 32547	Intersection with an inter...
inindif 32548	See ~ inundif . (Contribu...
difininv 32549	Condition for the intersec...
difeq 32550	Rewriting an equation with...
eqdif 32551	If both set differences of...
indifbi 32552	Two ways to express equali...
diffib 32553	Case where ~ diffi is a bi...
difxp1ss 32554	Difference law for Cartesi...
difxp2ss 32555	Difference law for Cartesi...
indifundif 32556	A remarkable equation with...
elpwincl1 32557	Closure of intersection wi...
elpwdifcl 32558	Closure of class differenc...
elpwiuncl 32559	Closure of indexed union w...
elpreq 32560	Equality wihin a pair. (C...
nelpr 32561	A set ` A ` not in a pair ...
inpr0 32562	Rewrite an empty intersect...
neldifpr1 32563	The first element of a pai...
neldifpr2 32564	The second element of a pa...
unidifsnel 32565	The other element of a pai...
unidifsnne 32566	The other element of a pai...
ifeqeqx 32567	An equality theorem tailor...
elimifd 32568	Elimination of a condition...
elim2if 32569	Elimination of two conditi...
elim2ifim 32570	Elimination of two conditi...
ifeq3da 32571	Given an expression ` C ` ...
ifnetrue 32572	Deduce truth from a condit...
ifnefals 32573	Deduce falsehood from a co...
ifnebib 32574	The converse of ~ ifbi hol...
uniinn0 32575	Sufficient and necessary c...
uniin1 32576	Union of intersection. Ge...
uniin2 32577	Union of intersection. Ge...
difuncomp 32578	Express a class difference...
elpwunicl 32579	Closure of a set union wit...
cbviunf 32580	Rule used to change the bo...
iuneq12daf 32581	Equality deduction for ind...
iunin1f 32582	Indexed union of intersect...
ssiun3 32583	Subset equivalence for an ...
ssiun2sf 32584	Subset relationship for an...
iuninc 32585	The union of an increasing...
iundifdifd 32586	The intersection of a set ...
iundifdif 32587	The intersection of a set ...
iunrdx 32588	Re-index an indexed union....
iunpreima 32589	Preimage of an indexed uni...
iunrnmptss 32590	A subset relation for an i...
iunxunsn 32591	Appending a set to an inde...
iunxunpr 32592	Appending two sets to an i...
iinabrex 32593	Rewriting an indexed inter...
disjnf 32594	In case ` x ` is not free ...
cbvdisjf 32595	Change bound variables in ...
disjss1f 32596	A subset of a disjoint col...
disjeq1f 32597	Equality theorem for disjo...
disjxun0 32598	Simplify a disjoint union....
disjdifprg 32599	A trivial partition into a...
disjdifprg2 32600	A trivial partition of a s...
disji2f 32601	Property of a disjoint col...
disjif 32602	Property of a disjoint col...
disjorf 32603	Two ways to say that a col...
disjorsf 32604	Two ways to say that a col...
disjif2 32605	Property of a disjoint col...
disjabrex 32606	Rewriting a disjoint colle...
disjabrexf 32607	Rewriting a disjoint colle...
disjpreima 32608	A preimage of a disjoint s...
disjrnmpt 32609	Rewriting a disjoint colle...
disjin 32610	If a collection is disjoin...
disjin2 32611	If a collection is disjoin...
disjxpin 32612	Derive a disjunction over ...
iundisjf 32613	Rewrite a countable union ...
iundisj2f 32614	A disjoint union is disjoi...
disjrdx 32615	Re-index a disjunct collec...
disjex 32616	Two ways to say that two c...
disjexc 32617	A variant of ~ disjex , ap...
disjunsn 32618	Append an element to a dis...
disjun0 32619	Adding the empty element p...
disjiunel 32620	A set of elements B of a d...
disjuniel 32621	A set of elements B of a d...
xpdisjres 32622	Restriction of a constant ...
opeldifid 32623	Ordered pair elementhood o...
difres 32624	Case when class difference...
imadifxp 32625	Image of the difference wi...
relfi 32626	A relation (set) is finite...
0res 32627	Restriction of the empty f...
fcoinver 32628	Build an equivalence relat...
fcoinvbr 32629	Binary relation for the eq...
copsex2dv 32630	Implicit substitution dedu...
brab2d 32631	Expressing that two sets a...
brabgaf 32632	The law of concretion for ...
brelg 32633	Two things in a binary rel...
br8d 32634	Substitution for an eight-...
opabdm 32635	Domain of an ordered-pair ...
opabrn 32636	Range of an ordered-pair c...
opabssi 32637	Sufficient condition for a...
opabid2ss 32638	One direction of ~ opabid2...
ssrelf 32639	A subclass relationship de...
eqrelrd2 32640	A version of ~ eqrelrdv2 w...
erbr3b 32641	Biconditional for equivale...
iunsnima 32642	Image of a singleton by an...
iunsnima2 32643	Version of ~ iunsnima with...
feq2dd 32644	Equality deduction for fun...
feq3dd 32645	Equality deduction for fun...
ac6sf2 32646	Alternate version of ~ ac6...
fnresin 32647	Restriction of a function ...
f1o3d 32648	Describe an implicit one-t...
eldmne0 32649	A function of nonempty dom...
f1rnen 32650	Equinumerosity of the rang...
rinvf1o 32651	Sufficient conditions for ...
fresf1o 32652	Conditions for a restricti...
nfpconfp 32653	The set of fixed points of...
fmptco1f1o 32654	The action of composing (t...
cofmpt2 32655	Express composition of a m...
f1mptrn 32656	Express injection for a ma...
dfimafnf 32657	Alternate definition of th...
funimass4f 32658	Membership relation for th...
suppss2f 32659	Show that the support of a...
ofrn 32660	The range of the function ...
ofrn2 32661	The range of the function ...
off2 32662	The function operation pro...
ofresid 32663	Applying an operation rest...
unipreima 32664	Preimage of a class union....
opfv 32665	Value of a function produc...
xppreima 32666	The preimage of a Cartesia...
2ndimaxp 32667	Image of a cartesian produ...
djussxp2 32668	Stronger version of ~ djus...
2ndresdju 32669	The ` 2nd ` function restr...
2ndresdjuf1o 32670	The ` 2nd ` function restr...
xppreima2 32671	The preimage of a Cartesia...
abfmpunirn 32672	Membership in a union of a...
rabfmpunirn 32673	Membership in a union of a...
abfmpeld 32674	Membership in an element o...
abfmpel 32675	Membership in an element o...
fmptdF 32676	Domain and codomain of the...
fmptcof2 32677	Composition of two functio...
fcomptf 32678	Express composition of two...
acunirnmpt 32679	Axiom of choice for the un...
acunirnmpt2 32680	Axiom of choice for the un...
acunirnmpt2f 32681	Axiom of choice for the un...
aciunf1lem 32682	Choice in an index union. ...
aciunf1 32683	Choice in an index union. ...
ofoprabco 32684	Function operation as a co...
ofpreima 32685	Express the preimage of a ...
ofpreima2 32686	Express the preimage of a ...
funcnvmpt 32687	Condition for a function i...
funcnv5mpt 32688	Two ways to say that a fun...
funcnv4mpt 32689	Two ways to say that a fun...
preimane 32690	Different elements have di...
fnpreimac 32691	Choose a set ` x ` contain...
fgreu 32692	Exactly one point of a fun...
fcnvgreu 32693	If the converse of a relat...
rnmposs 32694	The range of an operation ...
mptssALT 32695	Deduce subset relation of ...
dfcnv2 32696	Alternative definition of ...
mpomptxf 32697	Express a two-argument fun...
of0r 32698	Function operation with th...
suppovss 32699	A bound for the support of...
suppiniseg 32700	Relation between the suppo...
fsuppinisegfi 32701	The initial segment ` ( ``...
fressupp 32702	The restriction of a funct...
fdifsuppconst 32703	A function is a zero const...
ressupprn 32704	The range of a function re...
supppreima 32705	Express the support of a f...
fsupprnfi 32706	Finite support implies fin...
mptiffisupp 32707	Conditions for a mapping f...
cosnopne 32708	Composition of two ordered...
cosnop 32709	Composition of two ordered...
cnvprop 32710	Converse of a pair of orde...
brprop 32711	Binary relation for a pair...
mptprop 32712	Rewrite pairs of ordered p...
coprprop 32713	Composition of two pairs o...
gtiso 32714	Two ways to write a strict...
isoun 32715	Infer an isomorphism from ...
disjdsct 32716	A disjoint collection is d...
df1stres 32717	Definition for a restricti...
df2ndres 32718	Definition for a restricti...
1stpreimas 32719	The preimage of a singleto...
1stpreima 32720	The preimage by ` 1st ` is...
2ndpreima 32721	The preimage by ` 2nd ` is...
curry2ima 32722	The image of a curried fun...
preiman0 32723	The preimage of a nonempty...
intimafv 32724	The intersection of an ima...
supssd 32725	Inequality deduction for s...
infssd 32726	Inequality deduction for i...
imafi2 32727	The image by a finite set ...
unifi3 32728	If a union is finite, then...
snct 32729	A singleton is countable. ...
prct 32730	An unordered pair is count...
mpocti 32731	An operation is countable ...
abrexct 32732	An image set of a countabl...
mptctf 32733	A countable mapping set is...
abrexctf 32734	An image set of a countabl...
padct 32735	Index a countable set with...
cnvoprabOLD 32736	The converse of a class ab...
f1od2 32737	Sufficient condition for a...
fcobij 32738	Composing functions with a...
fcobijfs 32739	Composing finitely support...
suppss3 32740	Deduce a function's suppor...
fsuppcurry1 32741	Finite support of a currie...
fsuppcurry2 32742	Finite support of a currie...
offinsupp1 32743	Finite support for a funct...
ffs2 32744	Rewrite a function's suppo...
ffsrn 32745	The range of a finitely su...
resf1o 32746	Restriction of functions t...
maprnin 32747	Restricting the range of t...
fpwrelmapffslem 32748	Lemma for ~ fpwrelmapffs ....
fpwrelmap 32749	Define a canonical mapping...
fpwrelmapffs 32750	Define a canonical mapping...
creq0 32751	The real representation of...
1nei 32752	The imaginary unit ` _i ` ...
1neg1t1neg1 32753	An integer unit times itse...
nnmulge 32754	Multiplying by a positive ...
submuladdd 32755	The product of a differenc...
muldivdid 32756	Distribution of division o...
cjsubd 32757	Complex conjugate distribu...
re0cj 32758	The conjugate of a pure im...
quad3d 32759	Variant of quadratic equat...
lt2addrd 32760	If the right-hand side of ...
xrlelttric 32761	Trichotomy law for extende...
xaddeq0 32762	Two extended reals which a...
xrinfm 32763	The extended real numbers ...
le2halvesd 32764	A sum is less than the who...
xraddge02 32765	A number is less than or e...
xrge0addge 32766	A number is less than or e...
xlt2addrd 32767	If the right-hand side of ...
xrsupssd 32768	Inequality deduction for s...
xrge0infss 32769	Any subset of nonnegative ...
xrge0infssd 32770	Inequality deduction for i...
xrge0addcld 32771	Nonnegative extended reals...
xrge0subcld 32772	Condition for closure of n...
infxrge0lb 32773	A member of a set of nonne...
infxrge0glb 32774	The infimum of a set of no...
infxrge0gelb 32775	The infimum of a set of no...
xrofsup 32776	The supremum is preserved ...
supxrnemnf 32777	The supremum of a nonempty...
xnn0gt0 32778	Nonzero extended nonnegati...
xnn01gt 32779	An extended nonnegative in...
nn0xmulclb 32780	Finite multiplication in t...
joiniooico 32781	Disjoint joining an open i...
ubico 32782	A right-open interval does...
xeqlelt 32783	Equality in terms of 'less...
eliccelico 32784	Relate elementhood to a cl...
elicoelioo 32785	Relate elementhood to a cl...
iocinioc2 32786	Intersection between two o...
xrdifh 32787	Class difference of a half...
iocinif 32788	Relate intersection of two...
difioo 32789	The difference between two...
difico 32790	The difference between two...
uzssico 32791	Upper integer sets are a s...
fz2ssnn0 32792	A finite set of sequential...
nndiffz1 32793	Upper set of the positive ...
ssnnssfz 32794	For any finite subset of `...
fzne1 32795	Elementhood in a finite se...
fzm1ne1 32796	Elementhood of an integer ...
fzspl 32797	Split the last element of ...
fzdif2 32798	Split the last element of ...
fzodif2 32799	Split the last element of ...
fzodif1 32800	Set difference of two half...
fzsplit3 32801	Split a finite interval of...
bcm1n 32802	The proportion of one bino...
iundisjfi 32803	Rewrite a countable union ...
iundisj2fi 32804	A disjoint union is disjoi...
iundisjcnt 32805	Rewrite a countable union ...
iundisj2cnt 32806	A countable disjoint union...
fzone1 32807	Elementhood in a half-open...
fzom1ne1 32808	Elementhood in a half-open...
f1ocnt 32809	Given a countable set ` A ...
fz1nnct 32810	NN and integer ranges star...
fz1nntr 32811	NN and integer ranges star...
fzo0opth 32812	Equality for a half open i...
nn0difffzod 32813	A nonnegative integer that...
suppssnn0 32814	Show that the support of a...
hashunif 32815	The cardinality of a disjo...
hashxpe 32816	The size of the Cartesian ...
hashgt1 32817	Restate "set contains at l...
znumd 32818	Numerator of an integer. ...
zdend 32819	Denominator of an integer....
numdenneg 32820	Numerator and denominator ...
divnumden2 32821	Calculate the reduced form...
expgt0b 32822	A real number ` A ` raised...
nn0split01 32823	Split 0 and 1 from the non...
nn0disj01 32824	The pair ` { 0 , 1 } ` doe...
nnindf 32825	Principle of Mathematical ...
nn0min 32826	Extracting the minimum pos...
subne0nn 32827	A nonnegative difference i...
ltesubnnd 32828	Subtracting an integer num...
fprodeq02 32829	If one of the factors is z...
pr01ssre 32830	The range of the indicator...
fprodex01 32831	A product of factors equal...
prodpr 32832	A product over a pair is t...
prodtp 32833	A product over a triple is...
fsumub 32834	An upper bound for a term ...
fsumiunle 32835	Upper bound for a sum of n...
dfdec100 32836	Split the hundreds from a ...
dp2eq1 32839	Equality theorem for the d...
dp2eq2 32840	Equality theorem for the d...
dp2eq1i 32841	Equality theorem for the d...
dp2eq2i 32842	Equality theorem for the d...
dp2eq12i 32843	Equality theorem for the d...
dp20u 32844	Add a zero in the tenths (...
dp20h 32845	Add a zero in the unit pla...
dp2cl 32846	Closure for the decimal fr...
dp2clq 32847	Closure for a decimal frac...
rpdp2cl 32848	Closure for a decimal frac...
rpdp2cl2 32849	Closure for a decimal frac...
dp2lt10 32850	Decimal fraction builds re...
dp2lt 32851	Comparing two decimal frac...
dp2ltsuc 32852	Comparing a decimal fracti...
dp2ltc 32853	Comparing two decimal expa...
dpval 32856	Define the value of the de...
dpcl 32857	Prove that the closure of ...
dpfrac1 32858	Prove a simple equivalence...
dpval2 32859	Value of the decimal point...
dpval3 32860	Value of the decimal point...
dpmul10 32861	Multiply by 10 a decimal e...
decdiv10 32862	Divide a decimal number by...
dpmul100 32863	Multiply by 100 a decimal ...
dp3mul10 32864	Multiply by 10 a decimal e...
dpmul1000 32865	Multiply by 1000 a decimal...
dpval3rp 32866	Value of the decimal point...
dp0u 32867	Add a zero in the tenths p...
dp0h 32868	Remove a zero in the units...
rpdpcl 32869	Closure of the decimal poi...
dplt 32870	Comparing two decimal expa...
dplti 32871	Comparing a decimal expans...
dpgti 32872	Comparing a decimal expans...
dpltc 32873	Comparing two decimal inte...
dpexpp1 32874	Add one zero to the mantis...
0dp2dp 32875	Multiply by 10 a decimal e...
dpadd2 32876	Addition with one decimal,...
dpadd 32877	Addition with one decimal....
dpadd3 32878	Addition with two decimals...
dpmul 32879	Multiplication with one de...
dpmul4 32880	An upper bound to multipli...
threehalves 32881	Example theorem demonstrat...
1mhdrd 32882	Example theorem demonstrat...
xdivval 32885	Value of division: the (un...
xrecex 32886	Existence of reciprocal of...
xmulcand 32887	Cancellation law for exten...
xreceu 32888	Existential uniqueness of ...
xdivcld 32889	Closure law for the extend...
xdivcl 32890	Closure law for the extend...
xdivmul 32891	Relationship between divis...
rexdiv 32892	The extended real division...
xdivrec 32893	Relationship between divis...
xdivid 32894	A number divided by itself...
xdiv0 32895	Division into zero is zero...
xdiv0rp 32896	Division into zero is zero...
eliccioo 32897	Membership in a closed int...
elxrge02 32898	Elementhood in the set of ...
xdivpnfrp 32899	Plus infinity divided by a...
rpxdivcld 32900	Closure law for extended d...
xrpxdivcld 32901	Closure law for extended d...
wrdfd 32902	A word is a zero-based seq...
wrdres 32903	Condition for the restrict...
wrdsplex 32904	Existence of a split of a ...
wrdfsupp 32905	A word has finite support....
wrdpmcl 32906	Closure of a word with per...
pfx1s2 32907	The prefix of length 1 of ...
pfxrn2 32908	The range of a prefix of a...
pfxrn3 32909	Express the range of a pre...
pfxf1 32910	Condition for a prefix to ...
s1f1 32911	Conditions for a length 1 ...
s2rnOLD 32912	Obsolete version of ~ s2rn...
s2f1 32913	Conditions for a length 2 ...
s3rnOLD 32914	Obsolete version of ~ s2rn...
s3f1 32915	Conditions for a length 3 ...
s3clhash 32916	Closure of the words of le...
ccatf1 32917	Conditions for a concatena...
ccatdmss 32918	The domain of a concatenat...
pfxlsw2ccat 32919	Reconstruct a word from it...
ccatws1f1o 32920	Conditions for the concate...
ccatws1f1olast 32921	Two ways to reorder symbol...
wrdt2ind 32922	Perform an induction over ...
swrdrn2 32923	The range of a subword is ...
swrdrn3 32924	Express the range of a sub...
swrdf1 32925	Condition for a subword to...
swrdrndisj 32926	Condition for the range of...
splfv3 32927	Symbols to the right of a ...
1cshid 32928	Cyclically shifting a sing...
cshw1s2 32929	Cyclically shifting a leng...
cshwrnid 32930	Cyclically shifting a word...
cshf1o 32931	Condition for the cyclic s...
ressplusf 32932	The group operation functi...
ressnm 32933	The norm in a restricted s...
abvpropd2 32934	Weaker version of ~ abvpro...
oppgle 32935	less-than relation of an o...
oppgleOLD 32936	Obsolete version of ~ oppg...
oppglt 32937	less-than relation of an o...
ressprs 32938	The restriction of a prose...
oduprs 32939	Being a proset is a self-d...
posrasymb 32940	A poset ordering is asymet...
resspos 32941	The restriction of a Poset...
resstos 32942	The restriction of a Toset...
odutos 32943	Being a toset is a self-du...
tlt2 32944	In a Toset, two elements m...
tlt3 32945	In a Toset, two elements m...
trleile 32946	In a Toset, two elements m...
toslublem 32947	Lemma for ~ toslub and ~ x...
toslub 32948	In a toset, the lowest upp...
tosglblem 32949	Lemma for ~ tosglb and ~ x...
tosglb 32950	Same theorem as ~ toslub ,...
clatp0cl 32951	The poset zero of a comple...
clatp1cl 32952	The poset one of a complet...
mntoval 32957	Operation value of the mon...
ismnt 32958	Express the statement " ` ...
ismntd 32959	Property of being a monoto...
mntf 32960	A monotone function is a f...
mgcoval 32961	Operation value of the mon...
mgcval 32962	Monotone Galois connection...
mgcf1 32963	The lower adjoint ` F ` of...
mgcf2 32964	The upper adjoint ` G ` of...
mgccole1 32965	An inequality for the kern...
mgccole2 32966	Inequality for the closure...
mgcmnt1 32967	The lower adjoint ` F ` of...
mgcmnt2 32968	The upper adjoint ` G ` of...
mgcmntco 32969	A Galois connection like s...
dfmgc2lem 32970	Lemma for dfmgc2, backward...
dfmgc2 32971	Alternate definition of th...
mgcmnt1d 32972	Galois connection implies ...
mgcmnt2d 32973	Galois connection implies ...
mgccnv 32974	The inverse Galois connect...
pwrssmgc 32975	Given a function ` F ` , e...
mgcf1olem1 32976	Property of a Galois conne...
mgcf1olem2 32977	Property of a Galois conne...
mgcf1o 32978	Given a Galois connection,...
ischn 32981	Property of being a chain....
chnwrd 32982	A chain is an ordered sequ...
chnltm1 32983	Basic property of a chain....
pfxchn 32984	A prefix of a chain is sti...
chnind 32985	Induction over a chain. S...
chnub 32986	In a chain, the last eleme...
chnlt 32987	Compare any two elements i...
chnso 32988	A chain induces a total or...
xrs0 32991	The zero of the extended r...
xrslt 32992	The "strictly less than" r...
xrsinvgval 32993	The inversion operation in...
xrsmulgzz 32994	The "multiple" function in...
xrstos 32995	The extended real numbers ...
xrsclat 32996	The extended real numbers ...
xrsp0 32997	The poset 0 of the extende...
xrsp1 32998	The poset 1 of the extende...
xrge0base 32999	The base of the extended n...
xrge00 33000	The zero of the extended n...
xrge0plusg 33001	The additive law of the ex...
xrge0le 33002	The "less than or equal to...
xrge0mulgnn0 33003	The group multiple functio...
xrge0addass 33004	Associativity of extended ...
xrge0addgt0 33005	The sum of nonnegative and...
xrge0adddir 33006	Right-distributivity of ex...
xrge0adddi 33007	Left-distributivity of ext...
xrge0npcan 33008	Extended nonnegative real ...
fsumrp0cl 33009	Closure of a finite sum of...
mndcld 33010	Closure of the operation o...
mndassd 33011	A monoid operation is asso...
mndlrinv 33012	In a monoid, if an element...
mndlrinvb 33013	In a monoid, if an element...
mndlactf1 33014	If an element ` X ` of a m...
mndlactfo 33015	An element ` X ` of a mono...
mndractf1 33016	If an element ` X ` of a m...
mndractfo 33017	An element ` X ` of a mono...
mndlactf1o 33018	An element ` X ` of a mono...
mndractf1o 33019	An element ` X ` of a mono...
cmn4d 33020	Commutative/associative la...
cmn246135 33021	Rearrange terms in a commu...
cmn145236 33022	Rearrange terms in a commu...
submcld 33023	Submonoids are closed unde...
abliso 33024	The image of an Abelian gr...
lmhmghmd 33025	A module homomorphism is a...
mhmimasplusg 33026	Value of the operation of ...
lmhmimasvsca 33027	Value of the scalar produc...
grpsubcld 33028	Closure of group subtracti...
subgcld 33029	A subgroup is closed under...
subgsubcld 33030	A subgroup is closed under...
gsumsubg 33031	The group sum in a subgrou...
gsumsra 33032	The group sum in a subring...
gsummpt2co 33033	Split a finite sum into a ...
gsummpt2d 33034	Express a finite sum over ...
lmodvslmhm 33035	Scalar multiplication in a...
gsumvsmul1 33036	Pull a scalar multiplicati...
gsummptres 33037	Extend a finite group sum ...
gsummptres2 33038	Extend a finite group sum ...
gsumzresunsn 33039	Append an element to a fin...
gsumpart 33040	Express a group sum as a d...
gsumtp 33041	Group sum of an unordered ...
gsumhashmul 33042	Express a group sum by gro...
xrge0tsmsd 33043	Any finite or infinite sum...
xrge0tsmsbi 33044	Any limit of a finite or i...
xrge0tsmseq 33045	Any limit of a finite or i...
cntzun 33046	The centralizer of a union...
cntzsnid 33047	The centralizer of the ide...
cntrcrng 33048	The center of a ring is a ...
isomnd 33053	A (left) ordered monoid is...
isogrp 33054	A (left-)ordered group is ...
ogrpgrp 33055	A left-ordered group is a ...
omndmnd 33056	A left-ordered monoid is a...
omndtos 33057	A left-ordered monoid is a...
omndadd 33058	In an ordered monoid, the ...
omndaddr 33059	In a right ordered monoid,...
omndadd2d 33060	In a commutative left orde...
omndadd2rd 33061	In a left- and right- orde...
submomnd 33062	A submonoid of an ordered ...
xrge0omnd 33063	The nonnegative extended r...
omndmul2 33064	In an ordered monoid, the ...
omndmul3 33065	In an ordered monoid, the ...
omndmul 33066	In a commutative ordered m...
ogrpinv0le 33067	In an ordered group, the o...
ogrpsub 33068	In an ordered group, the o...
ogrpaddlt 33069	In an ordered group, stric...
ogrpaddltbi 33070	In a right ordered group, ...
ogrpaddltrd 33071	In a right ordered group, ...
ogrpaddltrbid 33072	In a right ordered group, ...
ogrpsublt 33073	In an ordered group, stric...
ogrpinv0lt 33074	In an ordered group, the o...
ogrpinvlt 33075	In an ordered group, the o...
gsumle 33076	A finite sum in an ordered...
symgfcoeu 33077	Uniqueness property of per...
symgcom 33078	Two permutations ` X ` and...
symgcom2 33079	Two permutations ` X ` and...
symgcntz 33080	All elements of a (finite)...
odpmco 33081	The composition of two odd...
symgsubg 33082	The value of the group sub...
pmtrprfv2 33083	In a transposition of two ...
pmtrcnel 33084	Composing a permutation ` ...
pmtrcnel2 33085	Variation on ~ pmtrcnel . ...
pmtrcnelor 33086	Composing a permutation ` ...
fzo0pmtrlast 33087	Reorder a half-open intege...
wrdpmtrlast 33088	Reorder a word, so that th...
pmtridf1o 33089	Transpositions of ` X ` an...
pmtridfv1 33090	Value at X of the transpos...
pmtridfv2 33091	Value at Y of the transpos...
psgnid 33092	Permutation sign of the id...
psgndmfi 33093	For a finite base set, the...
pmtrto1cl 33094	Useful lemma for the follo...
psgnfzto1stlem 33095	Lemma for ~ psgnfzto1st . ...
fzto1stfv1 33096	Value of our permutation `...
fzto1st1 33097	Special case where the per...
fzto1st 33098	The function moving one el...
fzto1stinvn 33099	Value of the inverse of ou...
psgnfzto1st 33100	The permutation sign for m...
tocycval 33103	Value of the cycle builder...
tocycfv 33104	Function value of a permut...
tocycfvres1 33105	A cyclic permutation is a ...
tocycfvres2 33106	A cyclic permutation is th...
cycpmfvlem 33107	Lemma for ~ cycpmfv1 and ~...
cycpmfv1 33108	Value of a cycle function ...
cycpmfv2 33109	Value of a cycle function ...
cycpmfv3 33110	Values outside of the orbi...
cycpmcl 33111	Cyclic permutations are pe...
tocycf 33112	The permutation cycle buil...
tocyc01 33113	Permutation cycles built f...
cycpm2tr 33114	A cyclic permutation of 2 ...
cycpm2cl 33115	Closure for the 2-cycles. ...
cyc2fv1 33116	Function value of a 2-cycl...
cyc2fv2 33117	Function value of a 2-cycl...
trsp2cyc 33118	Exhibit the word a transpo...
cycpmco2f1 33119	The word U used in ~ cycpm...
cycpmco2rn 33120	The orbit of the compositi...
cycpmco2lem1 33121	Lemma for ~ cycpmco2 . (C...
cycpmco2lem2 33122	Lemma for ~ cycpmco2 . (C...
cycpmco2lem3 33123	Lemma for ~ cycpmco2 . (C...
cycpmco2lem4 33124	Lemma for ~ cycpmco2 . (C...
cycpmco2lem5 33125	Lemma for ~ cycpmco2 . (C...
cycpmco2lem6 33126	Lemma for ~ cycpmco2 . (C...
cycpmco2lem7 33127	Lemma for ~ cycpmco2 . (C...
cycpmco2 33128	The composition of a cycli...
cyc2fvx 33129	Function value of a 2-cycl...
cycpm3cl 33130	Closure of the 3-cycles in...
cycpm3cl2 33131	Closure of the 3-cycles in...
cyc3fv1 33132	Function value of a 3-cycl...
cyc3fv2 33133	Function value of a 3-cycl...
cyc3fv3 33134	Function value of a 3-cycl...
cyc3co2 33135	Represent a 3-cycle as a c...
cycpmconjvlem 33136	Lemma for ~ cycpmconjv . ...
cycpmconjv 33137	A formula for computing co...
cycpmrn 33138	The range of the word used...
tocyccntz 33139	All elements of a (finite)...
evpmval 33140	Value of the set of even p...
cnmsgn0g 33141	The neutral element of the...
evpmsubg 33142	The alternating group is a...
evpmid 33143	The identity is an even pe...
altgnsg 33144	The alternating group ` ( ...
cyc3evpm 33145	3-Cycles are even permutat...
cyc3genpmlem 33146	Lemma for ~ cyc3genpm . (...
cyc3genpm 33147	The alternating group ` A ...
cycpmgcl 33148	Cyclic permutations are pe...
cycpmconjslem1 33149	Lemma for ~ cycpmconjs . ...
cycpmconjslem2 33150	Lemma for ~ cycpmconjs . ...
cycpmconjs 33151	All cycles of the same len...
cyc3conja 33152	All 3-cycles are conjugate...
sgnsv 33155	The sign mapping. (Contri...
sgnsval 33156	The sign value. (Contribu...
sgnsf 33157	The sign function. (Contr...
inftmrel 33162	The infinitesimal relation...
isinftm 33163	Express ` x ` is infinites...
isarchi 33164	Express the predicate " ` ...
pnfinf 33165	Plus infinity is an infini...
xrnarchi 33166	The completed real line is...
isarchi2 33167	Alternative way to express...
submarchi 33168	A submonoid is archimedean...
isarchi3 33169	This is the usual definiti...
archirng 33170	Property of Archimedean or...
archirngz 33171	Property of Archimedean le...
archiexdiv 33172	In an Archimedean group, g...
archiabllem1a 33173	Lemma for ~ archiabl : In...
archiabllem1b 33174	Lemma for ~ archiabl . (C...
archiabllem1 33175	Archimedean ordered groups...
archiabllem2a 33176	Lemma for ~ archiabl , whi...
archiabllem2c 33177	Lemma for ~ archiabl . (C...
archiabllem2b 33178	Lemma for ~ archiabl . (C...
archiabllem2 33179	Archimedean ordered groups...
archiabl 33180	Archimedean left- and righ...
isslmd 33183	The predicate "is a semimo...
slmdlema 33184	Lemma for properties of a ...
lmodslmd 33185	Left semimodules generaliz...
slmdcmn 33186	A semimodule is a commutat...
slmdmnd 33187	A semimodule is a monoid. ...
slmdsrg 33188	The scalar component of a ...
slmdbn0 33189	The base set of a semimodu...
slmdacl 33190	Closure of ring addition f...
slmdmcl 33191	Closure of ring multiplica...
slmdsn0 33192	The set of scalars in a se...
slmdvacl 33193	Closure of vector addition...
slmdass 33194	Semiring left module vecto...
slmdvscl 33195	Closure of scalar product ...
slmdvsdi 33196	Distributive law for scala...
slmdvsdir 33197	Distributive law for scala...
slmdvsass 33198	Associative law for scalar...
slmd0cl 33199	The ring zero in a semimod...
slmd1cl 33200	The ring unity in a semiri...
slmdvs1 33201	Scalar product with ring u...
slmd0vcl 33202	The zero vector is a vecto...
slmd0vlid 33203	Left identity law for the ...
slmd0vrid 33204	Right identity law for the...
slmd0vs 33205	Zero times a vector is the...
slmdvs0 33206	Anything times the zero ve...
gsumvsca1 33207	Scalar product of a finite...
gsumvsca2 33208	Scalar product of a finite...
prmsimpcyc 33209	A group of prime order is ...
cringmul32d 33210	Commutative/associative la...
ringdid 33211	Distributive law for the m...
ringdird 33212	Distributive law for the m...
ringdi22 33213	Expand the product of two ...
urpropd 33214	Sufficient condition for r...
subrgmcld 33215	A subring is closed under ...
ress1r 33216	` 1r ` is unaffected by re...
ringinvval 33217	The ring inverse expressed...
dvrcan5 33218	Cancellation law for commo...
subrgchr 33219	If ` A ` is a subring of `...
rmfsupp2 33220	A mapping of a multiplicat...
unitnz 33221	In a nonzero ring, a unit ...
isunit2 33222	Alternate definition of be...
isunit3 33223	Alternate definition of be...
irrednzr 33224	A ring with an irreducible...
0ringsubrg 33225	A subring of a zero ring i...
0ringcring 33226	The zero ring is commutati...
reldmrloc 33231	Ring localization is a pro...
erlval 33232	Value of the ring localiza...
rlocval 33233	Expand the value of the ri...
erlcl1 33234	Closure for the ring local...
erlcl2 33235	Closure for the ring local...
erldi 33236	Main property of the ring ...
erlbrd 33237	Deduce the ring localizati...
erlbr2d 33238	Deduce the ring localizati...
erler 33239	The relation used to build...
elrlocbasi 33240	Membership in the basis of...
rlocbas 33241	The base set of a ring loc...
rlocaddval 33242	Value of the addition in t...
rlocmulval 33243	Value of the addition in t...
rloccring 33244	The ring localization ` L ...
rloc0g 33245	The zero of a ring localiz...
rloc1r 33246	The multiplicative identit...
rlocf1 33247	The embedding ` F ` of a r...
domnmuln0rd 33248	In a domain, factors of a ...
domnprodn0 33249	In a domain, a finite prod...
idomrcan 33250	Right-cancellation law for...
domnlcanOLD 33251	Obsolete version of ~ domn...
domnlcanbOLD 33252	Obsolete version of ~ domn...
idomrcanOLD 33253	Obsolete version of ~ idom...
1rrg 33254	The multiplicative identit...
rrgsubm 33255	The left regular elements ...
subrdom 33256	A subring of a domain is a...
subridom 33257	A subring of an integral d...
subrfld 33258	A subring of a field is an...
eufndx 33261	Index value of the Euclide...
eufid 33262	Utility theorem: index-ind...
ringinveu 33265	If a ring unit element ` X...
isdrng4 33266	A division ring is a ring ...
rndrhmcl 33267	The image of a division ri...
sdrgdvcl 33268	A sub-division-ring is clo...
sdrginvcl 33269	A sub-division-ring is clo...
primefldchr 33270	The characteristic of a pr...
fracval 33273	Value of the field of frac...
fracbas 33274	The base of the field of f...
fracerl 33275	Rewrite the ring localizat...
fracf1 33276	The embedding of a commuta...
fracfld 33277	The field of fractions of ...
idomsubr 33278	Every integral domain is i...
fldgenval 33281	Value of the field generat...
fldgenssid 33282	The field generated by a s...
fldgensdrg 33283	A generated subfield is a ...
fldgenssv 33284	A generated subfield is a ...
fldgenss 33285	Generated subfields preser...
fldgenidfld 33286	The subfield generated by ...
fldgenssp 33287	The field generated by a s...
fldgenid 33288	The subfield of a field ` ...
fldgenfld 33289	A generated subfield is a ...
primefldgen1 33290	The prime field of a divis...
1fldgenq 33291	The field of rational numb...
isorng 33296	An ordered ring is a ring ...
orngring 33297	An ordered ring is a ring....
orngogrp 33298	An ordered ring is an orde...
isofld 33299	An ordered field is a fiel...
orngmul 33300	In an ordered ring, the or...
orngsqr 33301	In an ordered ring, all sq...
ornglmulle 33302	In an ordered ring, multip...
orngrmulle 33303	In an ordered ring, multip...
ornglmullt 33304	In an ordered ring, multip...
orngrmullt 33305	In an ordered ring, multip...
orngmullt 33306	In an ordered ring, the st...
ofldfld 33307	An ordered field is a fiel...
ofldtos 33308	An ordered field is a tota...
orng0le1 33309	In an ordered ring, the ri...
ofldlt1 33310	In an ordered field, the r...
ofldchr 33311	The characteristic of an o...
suborng 33312	Every subring of an ordere...
subofld 33313	Every subfield of an order...
isarchiofld 33314	Axiom of Archimedes : a ch...
rhmdvd 33315	A ring homomorphism preser...
kerunit 33316	If a unit element lies in ...
reldmresv 33319	The scalar restriction is ...
resvval 33320	Value of structure restric...
resvid2 33321	General behavior of trivia...
resvval2 33322	Value of nontrivial struct...
resvsca 33323	Base set of a structure re...
resvlem 33324	Other elements of a scalar...
resvlemOLD 33325	Obsolete version of ~ resv...
resvbas 33326	` Base ` is unaffected by ...
resvbasOLD 33327	Obsolete proof of ~ resvba...
resvplusg 33328	` +g ` is unaffected by sc...
resvplusgOLD 33329	Obsolete proof of ~ resvpl...
resvvsca 33330	` .s ` is unaffected by sc...
resvvscaOLD 33331	Obsolete proof of ~ resvvs...
resvmulr 33332	` .r ` is unaffected by sc...
resvmulrOLD 33333	Obsolete proof of ~ resvmu...
resv0g 33334	` 0g ` is unaffected by sc...
resv1r 33335	` 1r ` is unaffected by sc...
resvcmn 33336	Scalar restriction preserv...
gzcrng 33337	The gaussian integers form...
cnfldfld 33338	The complex numbers form a...
reofld 33339	The real numbers form an o...
nn0omnd 33340	The nonnegative integers f...
rearchi 33341	The field of the real numb...
nn0archi 33342	The monoid of the nonnegat...
xrge0slmod 33343	The extended nonnegative r...
qusker 33344	The kernel of a quotient m...
eqgvscpbl 33345	The left coset equivalence...
qusvscpbl 33346	The quotient map distribut...
qusvsval 33347	Value of the scalar multip...
imaslmod 33348	The image structure of a l...
imasmhm 33349	Given a function ` F ` wit...
imasghm 33350	Given a function ` F ` wit...
imasrhm 33351	Given a function ` F ` wit...
imaslmhm 33352	Given a function ` F ` wit...
quslmod 33353	If ` G ` is a submodule in...
quslmhm 33354	If ` G ` is a submodule of...
quslvec 33355	If ` S ` is a vector subsp...
ecxpid 33356	The equivalence class of a...
qsxpid 33357	The quotient set of a cart...
qusxpid 33358	The Group quotient equival...
qustriv 33359	The quotient of a group ` ...
qustrivr 33360	Converse of ~ qustriv . (...
znfermltl 33361	Fermat's little theorem in...
islinds5 33362	A set is linearly independ...
ellspds 33363	Variation on ~ ellspd . (...
0ellsp 33364	Zero is in all spans. (Co...
0nellinds 33365	The group identity cannot ...
rspsnid 33366	A principal ideal contains...
elrsp 33367	Write the elements of a ri...
ellpi 33368	Elementhood in a left prin...
lpirlidllpi 33369	In a principal ideal ring,...
rspidlid 33370	The ideal span of an ideal...
pidlnz 33371	A principal ideal generate...
lbslsp 33372	Any element of a left modu...
lindssn 33373	Any singleton of a nonzero...
lindflbs 33374	Conditions for an independ...
islbs5 33375	An equivalent formulation ...
linds2eq 33376	Deduce equality of element...
lindfpropd 33377	Property deduction for lin...
lindspropd 33378	Property deduction for lin...
dvdsruassoi 33379	If two elements ` X ` and ...
dvdsruasso 33380	Two elements ` X ` and ` Y...
dvdsruasso2 33381	A reformulation of ~ dvdsr...
dvdsrspss 33382	In a ring, an element ` X ...
rspsnasso 33383	Two elements ` X ` and ` Y...
unitprodclb 33384	A finite product is a unit...
elgrplsmsn 33385	Membership in a sumset wit...
lsmsnorb 33386	The sumset of a group with...
lsmsnorb2 33387	The sumset of a single ele...
elringlsm 33388	Membership in a product of...
elringlsmd 33389	Membership in a product of...
ringlsmss 33390	Closure of the product of ...
ringlsmss1 33391	The product of an ideal ` ...
ringlsmss2 33392	The product with an ideal ...
lsmsnpridl 33393	The product of the ring wi...
lsmsnidl 33394	The product of the ring wi...
lsmidllsp 33395	The sum of two ideals is t...
lsmidl 33396	The sum of two ideals is a...
lsmssass 33397	Group sum is associative, ...
grplsm0l 33398	Sumset with the identity s...
grplsmid 33399	The direct sum of an eleme...
quslsm 33400	Express the image by the q...
qusbas2 33401	Alternate definition of th...
qus0g 33402	The identity element of a ...
qusima 33403	The image of a subgroup by...
qusrn 33404	The natural map from eleme...
nsgqus0 33405	A normal subgroup ` N ` is...
nsgmgclem 33406	Lemma for ~ nsgmgc . (Con...
nsgmgc 33407	There is a monotone Galois...
nsgqusf1olem1 33408	Lemma for ~ nsgqusf1o . (...
nsgqusf1olem2 33409	Lemma for ~ nsgqusf1o . (...
nsgqusf1olem3 33410	Lemma for ~ nsgqusf1o . (...
nsgqusf1o 33411	The canonical projection h...
lmhmqusker 33412	A surjective module homomo...
lmicqusker 33413	The image ` H ` of a modul...
lidlmcld 33414	An ideal is closed under l...
intlidl 33415	The intersection of a none...
0ringidl 33416	The zero ideal is the only...
pidlnzb 33417	A principal ideal is nonze...
lidlunitel 33418	If an ideal ` I ` contains...
unitpidl1 33419	The ideal ` I ` generated ...
rhmquskerlem 33420	The mapping ` J ` induced ...
rhmqusker 33421	A surjective ring homomorp...
ricqusker 33422	The image ` H ` of a ring ...
elrspunidl 33423	Elementhood in the span of...
elrspunsn 33424	Membership to the span of ...
lidlincl 33425	Ideals are closed under in...
idlinsubrg 33426	The intersection between a...
rhmimaidl 33427	The image of an ideal ` I ...
drngidl 33428	A nonzero ring is a divisi...
drngidlhash 33429	A ring is a division ring ...
prmidlval 33432	The class of prime ideals ...
isprmidl 33433	The predicate "is a prime ...
prmidlnr 33434	A prime ideal is a proper ...
prmidl 33435	The main property of a pri...
prmidl2 33436	A condition that shows an ...
idlmulssprm 33437	Let ` P ` be a prime ideal...
pridln1 33438	A proper ideal cannot cont...
prmidlidl 33439	A prime ideal is an ideal....
prmidlssidl 33440	Prime ideals as a subset o...
cringm4 33441	Commutative/associative la...
isprmidlc 33442	The predicate "is prime id...
prmidlc 33443	Property of a prime ideal ...
0ringprmidl 33444	The trivial ring does not ...
prmidl0 33445	The zero ideal of a commut...
rhmpreimaprmidl 33446	The preimage of a prime id...
qsidomlem1 33447	If the quotient ring of a ...
qsidomlem2 33448	A quotient by a prime idea...
qsidom 33449	An ideal ` I ` in the comm...
qsnzr 33450	A quotient of a non-zero r...
ssdifidllem 33451	Lemma for ~ ssdifidl : Th...
ssdifidl 33452	Let ` R ` be a ring, and l...
ssdifidlprm 33453	If the set ` S ` of ~ ssdi...
mxidlval 33456	The set of maximal ideals ...
ismxidl 33457	The predicate "is a maxima...
mxidlidl 33458	A maximal ideal is an idea...
mxidlnr 33459	A maximal ideal is proper....
mxidlmax 33460	A maximal ideal is a maxim...
mxidln1 33461	One is not contained in an...
mxidlnzr 33462	A ring with a maximal idea...
mxidlmaxv 33463	An ideal ` I ` strictly co...
crngmxidl 33464	In a commutative ring, max...
mxidlprm 33465	Every maximal ideal is pri...
mxidlirredi 33466	In an integral domain, the...
mxidlirred 33467	In a principal ideal domai...
ssmxidllem 33468	The set ` P ` used in the ...
ssmxidl 33469	Let ` R ` be a ring, and l...
drnglidl1ne0 33470	In a nonzero ring, the zer...
drng0mxidl 33471	In a division ring, the ze...
drngmxidl 33472	The zero ideal is the only...
drngmxidlr 33473	If a ring's only maximal i...
krull 33474	Krull's theorem: Any nonz...
mxidlnzrb 33475	A ring is nonzero if and o...
krullndrng 33476	Krull's theorem for non-di...
opprabs 33477	The opposite ring of the o...
oppreqg 33478	Group coset equivalence re...
opprnsg 33479	Normal subgroups of the op...
opprlidlabs 33480	The ideals of the opposite...
oppr2idl 33481	Two sided ideal of the opp...
opprmxidlabs 33482	The maximal ideal of the o...
opprqusbas 33483	The base of the quotient o...
opprqusplusg 33484	The group operation of the...
opprqus0g 33485	The group identity element...
opprqusmulr 33486	The multiplication operati...
opprqus1r 33487	The ring unity of the quot...
opprqusdrng 33488	The quotient of the opposi...
qsdrngilem 33489	Lemma for ~ qsdrngi . (Co...
qsdrngi 33490	A quotient by a maximal le...
qsdrnglem2 33491	Lemma for ~ qsdrng . (Con...
qsdrng 33492	An ideal ` M ` is both lef...
qsfld 33493	An ideal ` M ` in the comm...
mxidlprmALT 33494	Every maximal ideal is pri...
idlsrgstr 33497	A constructed semiring of ...
idlsrgval 33498	Lemma for ~ idlsrgbas thro...
idlsrgbas 33499	Base of the ideals of a ri...
idlsrgplusg 33500	Additive operation of the ...
idlsrg0g 33501	The zero ideal is the addi...
idlsrgmulr 33502	Multiplicative operation o...
idlsrgtset 33503	Topology component of the ...
idlsrgmulrval 33504	Value of the ring multipli...
idlsrgmulrcl 33505	Ideals of a ring ` R ` are...
idlsrgmulrss1 33506	In a commutative ring, the...
idlsrgmulrss2 33507	The product of two ideals ...
idlsrgmulrssin 33508	In a commutative ring, the...
idlsrgmnd 33509	The ideals of a ring form ...
idlsrgcmnd 33510	The ideals of a ring form ...
rprmval 33511	The prime elements of a ri...
isrprm 33512	Property for ` P ` to be a...
rprmcl 33513	A ring prime is an element...
rprmdvds 33514	If a ring prime ` Q ` divi...
rprmnz 33515	A ring prime is nonzero. ...
rprmnunit 33516	A ring prime is not a unit...
rsprprmprmidl 33517	In a commutative ring, ide...
rsprprmprmidlb 33518	In an integral domain, an ...
rprmndvdsr1 33519	A ring prime element does ...
rprmasso 33520	In an integral domain, the...
rprmasso2 33521	In an integral domain, if ...
rprmasso3 33522	In an integral domain, if ...
unitmulrprm 33523	A ring unit multiplied by ...
rprmndvdsru 33524	A ring prime element does ...
rprmirredlem 33525	Lemma for ~ rprmirred . (...
rprmirred 33526	In an integral domain, rin...
rprmirredb 33527	In a principal ideal domai...
rprmdvdspow 33528	If a prime element divides...
rprmdvdsprod 33529	If a prime element ` Q ` d...
1arithidomlem1 33530	Lemma for ~ 1arithidom . ...
1arithidomlem2 33531	Lemma for ~ 1arithidom : i...
1arithidom 33532	Uniqueness of prime factor...
isufd 33535	The property of being a Un...
ufdprmidl 33536	In a unique factorization ...
ufdidom 33537	A nonzero unique factoriza...
pidufd 33538	Every principal ideal doma...
1arithufdlem1 33539	Lemma for ~ 1arithufd . T...
1arithufdlem2 33540	Lemma for ~ 1arithufd . T...
1arithufdlem3 33541	Lemma for ~ 1arithufd . I...
1arithufdlem4 33542	Lemma for ~ 1arithufd . N...
1arithufd 33543	Existence of a factorizati...
dfufd2lem 33544	Lemma for ~ dfufd2 . (Con...
dfufd2 33545	Alternative definition of ...
zringidom 33546	The ring of integers is an...
zringpid 33547	The ring of integers is a ...
dfprm3 33548	The (positive) prime eleme...
zringfrac 33549	The field of fractions of ...
0ringmon1p 33550	There are no monic polynom...
fply1 33551	Conditions for a function ...
ply1lvec 33552	In a division ring, the un...
evls1fn 33553	Functionality of the subri...
evls1dm 33554	The domain of the subring ...
evls1fvf 33555	The subring evaluation fun...
evl1fvf 33556	The univariate polynomial ...
evl1fpws 33557	Evaluation of a univariate...
ressdeg1 33558	The degree of a univariate...
ressply10g 33559	A restricted polynomial al...
ressply1mon1p 33560	The monic polynomials of a...
ressply1invg 33561	An element of a restricted...
ressply1sub 33562	A restricted polynomial al...
ressasclcl 33563	Closure of the univariate ...
evls1subd 33564	Univariate polynomial eval...
deg1le0eq0 33565	A polynomial with nonposit...
ply1asclunit 33566	A non-zero scalar polynomi...
ply1unit 33567	In a field ` F ` , a polyn...
evl1deg1 33568	Evaluation of a univariate...
evl1deg2 33569	Evaluation of a univariate...
evl1deg3 33570	Evaluation of a univariate...
ply1dg1rt 33571	Express the root ` - B / A...
ply1dg1rtn0 33572	Polynomials of degree 1 ov...
ply1mulrtss 33573	The roots of a factor ` F ...
ply1dg3rt0irred 33574	If a cubic polynomial over...
m1pmeq 33575	If two monic polynomials `...
ply1fermltl 33576	Fermat's little theorem fo...
coe1mon 33577	Coefficient vector of a mo...
ply1moneq 33578	Two monomials are equal if...
coe1zfv 33579	The coefficients of the ze...
coe1vr1 33580	Polynomial coefficient of ...
deg1vr 33581	The degree of the variable...
ply1degltel 33582	Characterize elementhood i...
ply1degleel 33583	Characterize elementhood i...
ply1degltlss 33584	The space ` S ` of the uni...
gsummoncoe1fzo 33585	A coefficient of the polyn...
ply1gsumz 33586	If a polynomial given as a...
deg1addlt 33587	If both factors have degre...
ig1pnunit 33588	The polynomial ideal gener...
ig1pmindeg 33589	The polynomial ideal gener...
q1pdir 33590	Distribution of univariate...
q1pvsca 33591	Scalar multiplication prop...
r1pvsca 33592	Scalar multiplication prop...
r1p0 33593	Polynomial remainder opera...
r1pcyc 33594	The polynomial remainder o...
r1padd1 33595	Addition property of the p...
r1pid2OLD 33596	Obsolete version of ~ r1pi...
r1plmhm 33597	The univariate polynomial ...
r1pquslmic 33598	The univariate polynomial ...
sra1r 33599	The unity element of a sub...
sradrng 33600	Condition for a subring al...
srasubrg 33601	A subring of the original ...
sralvec 33602	Given a sub division ring ...
srafldlvec 33603	Given a subfield ` F ` of ...
resssra 33604	The subring algebra of a r...
lsssra 33605	A subring is a subspace of...
drgext0g 33606	The additive neutral eleme...
drgextvsca 33607	The scalar multiplication ...
drgext0gsca 33608	The additive neutral eleme...
drgextsubrg 33609	The scalar field is a subr...
drgextlsp 33610	The scalar field is a subs...
drgextgsum 33611	Group sum in a division ri...
lvecdimfi 33612	Finite version of ~ lvecdi...
dimval 33615	The dimension of a vector ...
dimvalfi 33616	The dimension of a vector ...
dimcl 33617	Closure of the vector spac...
lmimdim 33618	Module isomorphisms preser...
lmicdim 33619	Module isomorphisms preser...
lvecdim0i 33620	A vector space of dimensio...
lvecdim0 33621	A vector space of dimensio...
lssdimle 33622	The dimension of a linear ...
dimpropd 33623	If two structures have the...
rlmdim 33624	The left vector space indu...
rgmoddimOLD 33625	Obsolete version of ~ rlmd...
frlmdim 33626	Dimension of a free left m...
tnglvec 33627	Augmenting a structure wit...
tngdim 33628	Dimension of a left vector...
rrxdim 33629	Dimension of the generaliz...
matdim 33630	Dimension of the space of ...
lbslsat 33631	A nonzero vector ` X ` is ...
lsatdim 33632	A line, spanned by a nonze...
drngdimgt0 33633	The dimension of a vector ...
lmhmlvec2 33634	A homomorphism of left vec...
kerlmhm 33635	The kernel of a vector spa...
imlmhm 33636	The image of a vector spac...
ply1degltdimlem 33637	Lemma for ~ ply1degltdim ....
ply1degltdim 33638	The space ` S ` of the uni...
lindsunlem 33639	Lemma for ~ lindsun . (Co...
lindsun 33640	Condition for the union of...
lbsdiflsp0 33641	The linear spans of two di...
dimkerim 33642	Given a linear map ` F ` b...
qusdimsum 33643	Let ` W ` be a vector spac...
fedgmullem1 33644	Lemma for ~ fedgmul . (Co...
fedgmullem2 33645	Lemma for ~ fedgmul . (Co...
fedgmul 33646	The multiplicativity formu...
dimlssid 33647	If the dimension of a line...
lvecendof1f1o 33648	If an endomorphism ` U ` o...
lactlmhm 33649	In an associative algebra ...
assalactf1o 33650	In an associative algebra ...
assarrginv 33651	If an element ` X ` of an ...
assafld 33652	If an algebra ` A ` of fin...
relfldext 33661	The field extension is a r...
brfldext 33662	The field extension relati...
ccfldextrr 33663	The field of the complex n...
fldextfld1 33664	A field extension is only ...
fldextfld2 33665	A field extension is only ...
fldextsubrg 33666	Field extension implies a ...
fldextress 33667	Field extension implies a ...
brfinext 33668	The finite field extension...
extdgval 33669	Value of the field extensi...
fldextsralvec 33670	The subring algebra associ...
extdgcl 33671	Closure of the field exten...
extdggt0 33672	Degrees of field extension...
fldexttr 33673	Field extension is a trans...
fldextid 33674	The field extension relati...
extdgid 33675	A trivial field extension ...
extdgmul 33676	The multiplicativity formu...
finexttrb 33677	The extension ` E ` of ` K...
extdg1id 33678	If the degree of the exten...
extdg1b 33679	The degree of the extensio...
fldgenfldext 33680	A subfield ` F ` extended ...
fldextchr 33681	The characteristic of a su...
evls1fldgencl 33682	Closure of the subring pol...
ccfldsrarelvec 33683	The subring algebra of the...
ccfldextdgrr 33684	The degree of the field ex...
irngval 33687	The elements of a field ` ...
elirng 33688	Property for an element ` ...
irngss 33689	All elements of a subring ...
irngssv 33690	An integral element is an ...
0ringirng 33691	A zero ring ` R ` has no i...
irngnzply1lem 33692	In the case of a field ` E...
irngnzply1 33693	In the case of a field ` E...
ply1annidllem 33696	Write the set ` Q ` of pol...
ply1annidl 33697	The set ` Q ` of polynomia...
ply1annnr 33698	The set ` Q ` of polynomia...
ply1annig1p 33699	The ideal ` Q ` of polynom...
minplyval 33700	Expand the value of the mi...
minplycl 33701	The minimal polynomial is ...
ply1annprmidl 33702	The set ` Q ` of polynomia...
minplymindeg 33703	The minimal polynomial of ...
minplyann 33704	The minimal polynomial for...
minplyirredlem 33705	Lemma for ~ minplyirred . ...
minplyirred 33706	A nonzero minimal polynomi...
irngnminplynz 33707	Integral elements have non...
minplym1p 33708	A minimal polynomial is mo...
irredminply 33709	An irreducible, monic, ann...
algextdeglem1 33710	Lemma for ~ algextdeg . (...
algextdeglem2 33711	Lemma for ~ algextdeg . B...
algextdeglem3 33712	Lemma for ~ algextdeg . T...
algextdeglem4 33713	Lemma for ~ algextdeg . B...
algextdeglem5 33714	Lemma for ~ algextdeg . T...
algextdeglem6 33715	Lemma for ~ algextdeg . B...
algextdeglem7 33716	Lemma for ~ algextdeg . T...
algextdeglem8 33717	Lemma for ~ algextdeg . T...
algextdeg 33718	The degree of an algebraic...
rtelextdg2lem 33719	Lemma for ~ rtelextdg2 : ...
rtelextdg2 33720	If an element ` X ` is a s...
fldext2chn 33721	In a non-empty tower ` T `...
constrrtll 33724	In the construction of con...
constrrtlc1 33725	In the construction of con...
constrrtlc2 33726	In the construction of con...
constrrtcclem 33727	In the construction of con...
constrrtcc 33728	In the construction of con...
constr0 33729	The first step of the cons...
constrsuc 33730	Membership in the successo...
constrlim 33731	Limit step of the construc...
constrsscn 33732	Closure of the constructib...
constrsslem 33733	Lemma for ~ constrss . Th...
constr01 33734	` 0 ` and ` 1 ` are in all...
constrss 33735	Constructed points are in ...
constrmon 33736	The construction of constr...
constrconj 33737	If a point ` X ` of the co...
constrfin 33738	Each step of the construct...
constrelextdg2 33739	If the ` N ` -th step ` ( ...
2sqr3minply 33740	The polynomial ` ( ( X ^ 3...
smatfval 33743	Value of the submatrix. (...
smatrcl 33744	Closure of the rectangular...
smatlem 33745	Lemma for the next theorem...
smattl 33746	Entries of a submatrix, to...
smattr 33747	Entries of a submatrix, to...
smatbl 33748	Entries of a submatrix, bo...
smatbr 33749	Entries of a submatrix, bo...
smatcl 33750	Closure of the square subm...
matmpo 33751	Write a square matrix as a...
1smat1 33752	The submatrix of the ident...
submat1n 33753	One case where the submatr...
submatres 33754	Special case where the sub...
submateqlem1 33755	Lemma for ~ submateq . (C...
submateqlem2 33756	Lemma for ~ submateq . (C...
submateq 33757	Sufficient condition for t...
submatminr1 33758	If we take a submatrix by ...
lmatval 33761	Value of the literal matri...
lmatfval 33762	Entries of a literal matri...
lmatfvlem 33763	Useful lemma to extract li...
lmatcl 33764	Closure of the literal mat...
lmat22lem 33765	Lemma for ~ lmat22e11 and ...
lmat22e11 33766	Entry of a 2x2 literal mat...
lmat22e12 33767	Entry of a 2x2 literal mat...
lmat22e21 33768	Entry of a 2x2 literal mat...
lmat22e22 33769	Entry of a 2x2 literal mat...
lmat22det 33770	The determinant of a liter...
mdetpmtr1 33771	The determinant of a matri...
mdetpmtr2 33772	The determinant of a matri...
mdetpmtr12 33773	The determinant of a matri...
mdetlap1 33774	A Laplace expansion of the...
madjusmdetlem1 33775	Lemma for ~ madjusmdet . ...
madjusmdetlem2 33776	Lemma for ~ madjusmdet . ...
madjusmdetlem3 33777	Lemma for ~ madjusmdet . ...
madjusmdetlem4 33778	Lemma for ~ madjusmdet . ...
madjusmdet 33779	Express the cofactor of th...
mdetlap 33780	Laplace expansion of the d...
ist0cld 33781	The predicate "is a T_0 sp...
txomap 33782	Given two open maps ` F ` ...
qtopt1 33783	If every equivalence class...
qtophaus 33784	If an open map's graph in ...
circtopn 33785	The topology of the unit c...
circcn 33786	The function gluing the re...
reff 33787	For any cover refinement, ...
locfinreflem 33788	A locally finite refinemen...
locfinref 33789	A locally finite refinemen...
iscref 33792	The property that every op...
crefeq 33793	Equality theorem for the "...
creftop 33794	A space where every open c...
crefi 33795	The property that every op...
crefdf 33796	A formulation of ~ crefi e...
crefss 33797	The "every open cover has ...
cmpcref 33798	Equivalent definition of c...
cmpfiref 33799	Every open cover of a Comp...
ldlfcntref 33802	Every open cover of a Lind...
ispcmp 33805	The predicate "is a paraco...
cmppcmp 33806	Every compact space is par...
dispcmp 33807	Every discrete space is pa...
pcmplfin 33808	Given a paracompact topolo...
pcmplfinf 33809	Given a paracompact topolo...
rspecval 33812	Value of the spectrum of t...
rspecbas 33813	The prime ideals form the ...
rspectset 33814	Topology component of the ...
rspectopn 33815	The topology component of ...
zarcls0 33816	The closure of the identit...
zarcls1 33817	The unit ideal ` B ` is th...
zarclsun 33818	The union of two closed se...
zarclsiin 33819	In a Zariski topology, the...
zarclsint 33820	The intersection of a fami...
zarclssn 33821	The closed points of Zaris...
zarcls 33822	The open sets of the Zaris...
zartopn 33823	The Zariski topology is a ...
zartop 33824	The Zariski topology is a ...
zartopon 33825	The points of the Zariski ...
zar0ring 33826	The Zariski Topology of th...
zart0 33827	The Zariski topology is T_...
zarmxt1 33828	The Zariski topology restr...
zarcmplem 33829	Lemma for ~ zarcmp . (Con...
zarcmp 33830	The Zariski topology is co...
rspectps 33831	The spectrum of a ring ` R...
rhmpreimacnlem 33832	Lemma for ~ rhmpreimacn . ...
rhmpreimacn 33833	The function mapping a pri...
metidval 33838	Value of the metric identi...
metidss 33839	As a relation, the metric ...
metidv 33840	` A ` and ` B ` identify b...
metideq 33841	Basic property of the metr...
metider 33842	The metric identification ...
pstmval 33843	Value of the metric induce...
pstmfval 33844	Function value of the metr...
pstmxmet 33845	The metric induced by a ps...
hauseqcn 33846	In a Hausdorff topology, t...
elunitge0 33847	An element of the closed u...
unitssxrge0 33848	The closed unit interval i...
unitdivcld 33849	Necessary conditions for a...
iistmd 33850	The closed unit interval f...
unicls 33851	The union of the closed se...
tpr2tp 33852	The usual topology on ` ( ...
tpr2uni 33853	The usual topology on ` ( ...
xpinpreima 33854	Rewrite the cartesian prod...
xpinpreima2 33855	Rewrite the cartesian prod...
sqsscirc1 33856	The complex square of side...
sqsscirc2 33857	The complex square of side...
cnre2csqlem 33858	Lemma for ~ cnre2csqima . ...
cnre2csqima 33859	Image of a centered square...
tpr2rico 33860	For any point of an open s...
cnvordtrestixx 33861	The restriction of the 'gr...
prsdm 33862	Domain of the relation of ...
prsrn 33863	Range of the relation of a...
prsss 33864	Relation of a subproset. ...
prsssdm 33865	Domain of a subproset rela...
ordtprsval 33866	Value of the order topolog...
ordtprsuni 33867	Value of the order topolog...
ordtcnvNEW 33868	The order dual generates t...
ordtrestNEW 33869	The subspace topology of a...
ordtrest2NEWlem 33870	Lemma for ~ ordtrest2NEW ....
ordtrest2NEW 33871	An interval-closed set ` A...
ordtconnlem1 33872	Connectedness in the order...
ordtconn 33873	Connectedness in the order...
mndpluscn 33874	A mapping that is both a h...
mhmhmeotmd 33875	Deduce a Topological Monoi...
rmulccn 33876	Multiplication by a real c...
raddcn 33877	Addition in the real numbe...
xrmulc1cn 33878	The operation multiplying ...
fmcncfil 33879	The image of a Cauchy filt...
xrge0hmph 33880	The extended nonnegative r...
xrge0iifcnv 33881	Define a bijection from ` ...
xrge0iifcv 33882	The defined function's val...
xrge0iifiso 33883	The defined bijection from...
xrge0iifhmeo 33884	Expose a homeomorphism fro...
xrge0iifhom 33885	The defined function from ...
xrge0iif1 33886	Condition for the defined ...
xrge0iifmhm 33887	The defined function from ...
xrge0pluscn 33888	The addition operation of ...
xrge0mulc1cn 33889	The operation multiplying ...
xrge0tps 33890	The extended nonnegative r...
xrge0topn 33891	The topology of the extend...
xrge0haus 33892	The topology of the extend...
xrge0tmd 33893	The extended nonnegative r...
xrge0tmdALT 33894	Alternate proof of ~ xrge0...
lmlim 33895	Relate a limit in a given ...
lmlimxrge0 33896	Relate a limit in the nonn...
rge0scvg 33897	Implication of convergence...
fsumcvg4 33898	A serie with finite suppor...
pnfneige0 33899	A neighborhood of ` +oo ` ...
lmxrge0 33900	Express "sequence ` F ` co...
lmdvg 33901	If a monotonic sequence of...
lmdvglim 33902	If a monotonic real number...
pl1cn 33903	A univariate polynomial is...
zringnm 33906	The norm (function) for a ...
zzsnm 33907	The norm of the ring of th...
zlm0 33908	Zero of a ` ZZ ` -module. ...
zlm1 33909	Unity element of a ` ZZ ` ...
zlmds 33910	Distance in a ` ZZ ` -modu...
zlmdsOLD 33911	Obsolete proof of ~ zlmds ...
zlmtset 33912	Topology in a ` ZZ ` -modu...
zlmtsetOLD 33913	Obsolete proof of ~ zlmtse...
zlmnm 33914	Norm of a ` ZZ ` -module (...
zhmnrg 33915	The ` ZZ ` -module built f...
nmmulg 33916	The norm of a group produc...
zrhnm 33917	The norm of the image by `...
cnzh 33918	The ` ZZ ` -module of ` CC...
rezh 33919	The ` ZZ ` -module of ` RR...
qqhval 33922	Value of the canonical hom...
zrhf1ker 33923	The kernel of the homomorp...
zrhchr 33924	The kernel of the homomorp...
zrhker 33925	The kernel of the homomorp...
zrhunitpreima 33926	The preimage by ` ZRHom ` ...
elzrhunit 33927	Condition for the image by...
elzdif0 33928	Lemma for ~ qqhval2 . (Co...
qqhval2lem 33929	Lemma for ~ qqhval2 . (Co...
qqhval2 33930	Value of the canonical hom...
qqhvval 33931	Value of the canonical hom...
qqh0 33932	The image of ` 0 ` by the ...
qqh1 33933	The image of ` 1 ` by the ...
qqhf 33934	` QQHom ` as a function. ...
qqhvq 33935	The image of a quotient by...
qqhghm 33936	The ` QQHom ` homomorphism...
qqhrhm 33937	The ` QQHom ` homomorphism...
qqhnm 33938	The norm of the image by `...
qqhcn 33939	The ` QQHom ` homomorphism...
qqhucn 33940	The ` QQHom ` homomorphism...
rrhval 33944	Value of the canonical hom...
rrhcn 33945	If the topology of ` R ` i...
rrhf 33946	If the topology of ` R ` i...
isrrext 33948	Express the property " ` R...
rrextnrg 33949	An extension of ` RR ` is ...
rrextdrg 33950	An extension of ` RR ` is ...
rrextnlm 33951	The norm of an extension o...
rrextchr 33952	The ring characteristic of...
rrextcusp 33953	An extension of ` RR ` is ...
rrexttps 33954	An extension of ` RR ` is ...
rrexthaus 33955	The topology of an extensi...
rrextust 33956	The uniformity of an exten...
rerrext 33957	The field of the real numb...
cnrrext 33958	The field of the complex n...
qqtopn 33959	The topology of the field ...
rrhfe 33960	If ` R ` is an extension o...
rrhcne 33961	If ` R ` is an extension o...
rrhqima 33962	The ` RRHom ` homomorphism...
rrh0 33963	The image of ` 0 ` by the ...
xrhval 33966	The value of the embedding...
zrhre 33967	The ` ZRHom ` homomorphism...
qqhre 33968	The ` QQHom ` homomorphism...
rrhre 33969	The ` RRHom ` homomorphism...
relmntop 33972	Manifold is a relation. (...
ismntoplly 33973	Property of being a manifo...
ismntop 33974	Property of being a manifo...
nexple 33975	A lower bound for an expon...
indv 33978	Value of the indicator fun...
indval 33979	Value of the indicator fun...
indval2 33980	Alternate value of the ind...
indf 33981	An indicator function as a...
indfval 33982	Value of the indicator fun...
ind1 33983	Value of the indicator fun...
ind0 33984	Value of the indicator fun...
ind1a 33985	Value of the indicator fun...
indpi1 33986	Preimage of the singleton ...
indsum 33987	Finite sum of a product wi...
indsumin 33988	Finite sum of a product wi...
prodindf 33989	The product of indicators ...
indf1o 33990	The bijection between a po...
indpreima 33991	A function with range ` { ...
indf1ofs 33992	The bijection between fini...
esumex 33995	An extended sum is a set b...
esumcl 33996	Closure for extended sum i...
esumeq12dvaf 33997	Equality deduction for ext...
esumeq12dva 33998	Equality deduction for ext...
esumeq12d 33999	Equality deduction for ext...
esumeq1 34000	Equality theorem for an ex...
esumeq1d 34001	Equality theorem for an ex...
esumeq2 34002	Equality theorem for exten...
esumeq2d 34003	Equality deduction for ext...
esumeq2dv 34004	Equality deduction for ext...
esumeq2sdv 34005	Equality deduction for ext...
nfesum1 34006	Bound-variable hypothesis ...
nfesum2 34007	Bound-variable hypothesis ...
cbvesum 34008	Change bound variable in a...
cbvesumv 34009	Change bound variable in a...
esumid 34010	Identify the extended sum ...
esumgsum 34011	A finite extended sum is t...
esumval 34012	Develop the value of the e...
esumel 34013	The extended sum is a limi...
esumnul 34014	Extended sum over the empt...
esum0 34015	Extended sum of zero. (Co...
esumf1o 34016	Re-index an extended sum u...
esumc 34017	Convert from the collectio...
esumrnmpt 34018	Rewrite an extended sum in...
esumsplit 34019	Split an extended sum into...
esummono 34020	Extended sum is monotonic....
esumpad 34021	Extend an extended sum by ...
esumpad2 34022	Remove zeroes from an exte...
esumadd 34023	Addition of infinite sums....
esumle 34024	If all of the terms of an ...
gsumesum 34025	Relate a group sum on ` ( ...
esumlub 34026	The extended sum is the lo...
esumaddf 34027	Addition of infinite sums....
esumlef 34028	If all of the terms of an ...
esumcst 34029	The extended sum of a cons...
esumsnf 34030	The extended sum of a sing...
esumsn 34031	The extended sum of a sing...
esumpr 34032	Extended sum over a pair. ...
esumpr2 34033	Extended sum over a pair, ...
esumrnmpt2 34034	Rewrite an extended sum in...
esumfzf 34035	Formulating a partial exte...
esumfsup 34036	Formulating an extended su...
esumfsupre 34037	Formulating an extended su...
esumss 34038	Change the index set to a ...
esumpinfval 34039	The value of the extended ...
esumpfinvallem 34040	Lemma for ~ esumpfinval . ...
esumpfinval 34041	The value of the extended ...
esumpfinvalf 34042	Same as ~ esumpfinval , mi...
esumpinfsum 34043	The value of the extended ...
esumpcvgval 34044	The value of the extended ...
esumpmono 34045	The partial sums in an ext...
esumcocn 34046	Lemma for ~ esummulc2 and ...
esummulc1 34047	An extended sum multiplied...
esummulc2 34048	An extended sum multiplied...
esumdivc 34049	An extended sum divided by...
hashf2 34050	Lemma for ~ hasheuni . (C...
hasheuni 34051	The cardinality of a disjo...
esumcvg 34052	The sequence of partial su...
esumcvg2 34053	Simpler version of ~ esumc...
esumcvgsum 34054	The value of the extended ...
esumsup 34055	Express an extended sum as...
esumgect 34056	"Send ` n ` to ` +oo ` " i...
esumcvgre 34057	All terms of a converging ...
esum2dlem 34058	Lemma for ~ esum2d (finite...
esum2d 34059	Write a double extended su...
esumiun 34060	Sum over a nonnecessarily ...
ofceq 34063	Equality theorem for funct...
ofcfval 34064	Value of an operation appl...
ofcval 34065	Evaluate a function/consta...
ofcfn 34066	The function operation pro...
ofcfeqd2 34067	Equality theorem for funct...
ofcfval3 34068	General value of ` ( F oFC...
ofcf 34069	The function/constant oper...
ofcfval2 34070	The function operation exp...
ofcfval4 34071	The function/constant oper...
ofcc 34072	Left operation by a consta...
ofcof 34073	Relate function operation ...
sigaex 34076	Lemma for ~ issiga and ~ i...
sigaval 34077	The set of sigma-algebra w...
issiga 34078	An alternative definition ...
isrnsiga 34079	The property of being a si...
0elsiga 34080	A sigma-algebra contains t...
baselsiga 34081	A sigma-algebra contains i...
sigasspw 34082	A sigma-algebra is a set o...
sigaclcu 34083	A sigma-algebra is closed ...
sigaclcuni 34084	A sigma-algebra is closed ...
sigaclfu 34085	A sigma-algebra is closed ...
sigaclcu2 34086	A sigma-algebra is closed ...
sigaclfu2 34087	A sigma-algebra is closed ...
sigaclcu3 34088	A sigma-algebra is closed ...
issgon 34089	Property of being a sigma-...
sgon 34090	A sigma-algebra is a sigma...
elsigass 34091	An element of a sigma-alge...
elrnsiga 34092	Dropping the base informat...
isrnsigau 34093	The property of being a si...
unielsiga 34094	A sigma-algebra contains i...
dmvlsiga 34095	Lebesgue-measurable subset...
pwsiga 34096	Any power set forms a sigm...
prsiga 34097	The smallest possible sigm...
sigaclci 34098	A sigma-algebra is closed ...
difelsiga 34099	A sigma-algebra is closed ...
unelsiga 34100	A sigma-algebra is closed ...
inelsiga 34101	A sigma-algebra is closed ...
sigainb 34102	Building a sigma-algebra f...
insiga 34103	The intersection of a coll...
sigagenval 34106	Value of the generated sig...
sigagensiga 34107	A generated sigma-algebra ...
sgsiga 34108	A generated sigma-algebra ...
unisg 34109	The sigma-algebra generate...
dmsigagen 34110	A sigma-algebra can be gen...
sssigagen 34111	A set is a subset of the s...
sssigagen2 34112	A subset of the generating...
elsigagen 34113	Any element of a set is al...
elsigagen2 34114	Any countable union of ele...
sigagenss 34115	The generated sigma-algebr...
sigagenss2 34116	Sufficient condition for i...
sigagenid 34117	The sigma-algebra generate...
ispisys 34118	The property of being a pi...
ispisys2 34119	The property of being a pi...
inelpisys 34120	Pi-systems are closed unde...
sigapisys 34121	All sigma-algebras are pi-...
isldsys 34122	The property of being a la...
pwldsys 34123	The power set of the unive...
unelldsys 34124	Lambda-systems are closed ...
sigaldsys 34125	All sigma-algebras are lam...
ldsysgenld 34126	The intersection of all la...
sigapildsyslem 34127	Lemma for ~ sigapildsys . ...
sigapildsys 34128	Sigma-algebra are exactly ...
ldgenpisyslem1 34129	Lemma for ~ ldgenpisys . ...
ldgenpisyslem2 34130	Lemma for ~ ldgenpisys . ...
ldgenpisyslem3 34131	Lemma for ~ ldgenpisys . ...
ldgenpisys 34132	The lambda system ` E ` ge...
dynkin 34133	Dynkin's lambda-pi theorem...
isros 34134	The property of being a ri...
rossspw 34135	A ring of sets is a collec...
0elros 34136	A ring of sets contains th...
unelros 34137	A ring of sets is closed u...
difelros 34138	A ring of sets is closed u...
inelros 34139	A ring of sets is closed u...
fiunelros 34140	A ring of sets is closed u...
issros 34141	The property of being a se...
srossspw 34142	A semiring of sets is a co...
0elsros 34143	A semiring of sets contain...
inelsros 34144	A semiring of sets is clos...
diffiunisros 34145	In semiring of sets, compl...
rossros 34146	Rings of sets are semiring...
brsiga 34149	The Borel Algebra on real ...
brsigarn 34150	The Borel Algebra is a sig...
brsigasspwrn 34151	The Borel Algebra is a set...
unibrsiga 34152	The union of the Borel Alg...
cldssbrsiga 34153	A Borel Algebra contains a...
sxval 34156	Value of the product sigma...
sxsiga 34157	A product sigma-algebra is...
sxsigon 34158	A product sigma-algebra is...
sxuni 34159	The base set of a product ...
elsx 34160	The cartesian product of t...
measbase 34163	The base set of a measure ...
measval 34164	The value of the ` measure...
ismeas 34165	The property of being a me...
isrnmeas 34166	The property of being a me...
dmmeas 34167	The domain of a measure is...
measbasedom 34168	The base set of a measure ...
measfrge0 34169	A measure is a function ov...
measfn 34170	A measure is a function on...
measvxrge0 34171	The values of a measure ar...
measvnul 34172	The measure of the empty s...
measge0 34173	A measure is nonnegative. ...
measle0 34174	If the measure of a given ...
measvun 34175	The measure of a countable...
measxun2 34176	The measure the union of t...
measun 34177	The measure the union of t...
measvunilem 34178	Lemma for ~ measvuni . (C...
measvunilem0 34179	Lemma for ~ measvuni . (C...
measvuni 34180	The measure of a countable...
measssd 34181	A measure is monotone with...
measunl 34182	A measure is sub-additive ...
measiuns 34183	The measure of the union o...
measiun 34184	A measure is sub-additive....
meascnbl 34185	A measure is continuous fr...
measinblem 34186	Lemma for ~ measinb . (Co...
measinb 34187	Building a measure restric...
measres 34188	Building a measure restric...
measinb2 34189	Building a measure restric...
measdivcst 34190	Division of a measure by a...
measdivcstALTV 34191	Alternate version of ~ mea...
cntmeas 34192	The Counting measure is a ...
pwcntmeas 34193	The counting measure is a ...
cntnevol 34194	Counting and Lebesgue meas...
voliune 34195	The Lebesgue measure funct...
volfiniune 34196	The Lebesgue measure funct...
volmeas 34197	The Lebesgue measure is a ...
ddeval1 34200	Value of the delta measure...
ddeval0 34201	Value of the delta measure...
ddemeas 34202	The Dirac delta measure is...
relae 34206	'almost everywhere' is a r...
brae 34207	'almost everywhere' relati...
braew 34208	'almost everywhere' relati...
truae 34209	A truth holds almost every...
aean 34210	A conjunction holds almost...
faeval 34212	Value of the 'almost every...
relfae 34213	The 'almost everywhere' bu...
brfae 34214	'almost everywhere' relati...
ismbfm 34217	The predicate " ` F ` is a...
elunirnmbfm 34218	The property of being a me...
mbfmfun 34219	A measurable function is a...
mbfmf 34220	A measurable function as a...
isanmbfmOLD 34221	Obsolete version of ~ isan...
mbfmcnvima 34222	The preimage by a measurab...
isanmbfm 34223	The predicate to be a meas...
mbfmbfmOLD 34224	A measurable function to a...
mbfmbfm 34225	A measurable function to a...
mbfmcst 34226	A constant function is mea...
1stmbfm 34227	The first projection map i...
2ndmbfm 34228	The second projection map ...
imambfm 34229	If the sigma-algebra in th...
cnmbfm 34230	A continuous function is m...
mbfmco 34231	The composition of two mea...
mbfmco2 34232	The pair building of two m...
mbfmvolf 34233	Measurable functions with ...
elmbfmvol2 34234	Measurable functions with ...
mbfmcnt 34235	All functions are measurab...
br2base 34236	The base set for the gener...
dya2ub 34237	An upper bound for a dyadi...
sxbrsigalem0 34238	The closed half-spaces of ...
sxbrsigalem3 34239	The sigma-algebra generate...
dya2iocival 34240	The function ` I ` returns...
dya2iocress 34241	Dyadic intervals are subse...
dya2iocbrsiga 34242	Dyadic intervals are Borel...
dya2icobrsiga 34243	Dyadic intervals are Borel...
dya2icoseg 34244	For any point and any clos...
dya2icoseg2 34245	For any point and any open...
dya2iocrfn 34246	The function returning dya...
dya2iocct 34247	The dyadic rectangle set i...
dya2iocnrect 34248	For any point of an open r...
dya2iocnei 34249	For any point of an open s...
dya2iocuni 34250	Every open set of ` ( RR X...
dya2iocucvr 34251	The dyadic rectangular set...
sxbrsigalem1 34252	The Borel algebra on ` ( R...
sxbrsigalem2 34253	The sigma-algebra generate...
sxbrsigalem4 34254	The Borel algebra on ` ( R...
sxbrsigalem5 34255	First direction for ~ sxbr...
sxbrsigalem6 34256	First direction for ~ sxbr...
sxbrsiga 34257	The product sigma-algebra ...
omsval 34260	Value of the function mapp...
omsfval 34261	Value of the outer measure...
omscl 34262	A closure lemma for the co...
omsf 34263	A constructed outer measur...
oms0 34264	A constructed outer measur...
omsmon 34265	A constructed outer measur...
omssubaddlem 34266	For any small margin ` E `...
omssubadd 34267	A constructed outer measur...
carsgval 34270	Value of the Caratheodory ...
carsgcl 34271	Closure of the Caratheodor...
elcarsg 34272	Property of being a Carath...
baselcarsg 34273	The universe set, ` O ` , ...
0elcarsg 34274	The empty set is Caratheod...
carsguni 34275	The union of all Caratheod...
elcarsgss 34276	Caratheodory measurable se...
difelcarsg 34277	The Caratheodory measurabl...
inelcarsg 34278	The Caratheodory measurabl...
unelcarsg 34279	The Caratheodory-measurabl...
difelcarsg2 34280	The Caratheodory-measurabl...
carsgmon 34281	Utility lemma: Apply mono...
carsgsigalem 34282	Lemma for the following th...
fiunelcarsg 34283	The Caratheodory measurabl...
carsgclctunlem1 34284	Lemma for ~ carsgclctun . ...
carsggect 34285	The outer measure is count...
carsgclctunlem2 34286	Lemma for ~ carsgclctun . ...
carsgclctunlem3 34287	Lemma for ~ carsgclctun . ...
carsgclctun 34288	The Caratheodory measurabl...
carsgsiga 34289	The Caratheodory measurabl...
omsmeas 34290	The restriction of a const...
pmeasmono 34291	This theorem's hypotheses ...
pmeasadd 34292	A premeasure on a ring of ...
itgeq12dv 34293	Equality theorem for an in...
sitgval 34299	Value of the simple functi...
issibf 34300	The predicate " ` F ` is a...
sibf0 34301	The constant zero function...
sibfmbl 34302	A simple function is measu...
sibff 34303	A simple function is a fun...
sibfrn 34304	A simple function has fini...
sibfima 34305	Any preimage of a singleto...
sibfinima 34306	The measure of the interse...
sibfof 34307	Applying function operatio...
sitgfval 34308	Value of the Bochner integ...
sitgclg 34309	Closure of the Bochner int...
sitgclbn 34310	Closure of the Bochner int...
sitgclcn 34311	Closure of the Bochner int...
sitgclre 34312	Closure of the Bochner int...
sitg0 34313	The integral of the consta...
sitgf 34314	The integral for simple fu...
sitgaddlemb 34315	Lemma for * sitgadd . (Co...
sitmval 34316	Value of the simple functi...
sitmfval 34317	Value of the integral dist...
sitmcl 34318	Closure of the integral di...
sitmf 34319	The integral metric as a f...
oddpwdc 34321	Lemma for ~ eulerpart . T...
oddpwdcv 34322	Lemma for ~ eulerpart : va...
eulerpartlemsv1 34323	Lemma for ~ eulerpart . V...
eulerpartlemelr 34324	Lemma for ~ eulerpart . (...
eulerpartlemsv2 34325	Lemma for ~ eulerpart . V...
eulerpartlemsf 34326	Lemma for ~ eulerpart . (...
eulerpartlems 34327	Lemma for ~ eulerpart . (...
eulerpartlemsv3 34328	Lemma for ~ eulerpart . V...
eulerpartlemgc 34329	Lemma for ~ eulerpart . (...
eulerpartleme 34330	Lemma for ~ eulerpart . (...
eulerpartlemv 34331	Lemma for ~ eulerpart . (...
eulerpartlemo 34332	Lemma for ~ eulerpart : ` ...
eulerpartlemd 34333	Lemma for ~ eulerpart : ` ...
eulerpartlem1 34334	Lemma for ~ eulerpart . (...
eulerpartlemb 34335	Lemma for ~ eulerpart . T...
eulerpartlemt0 34336	Lemma for ~ eulerpart . (...
eulerpartlemf 34337	Lemma for ~ eulerpart : O...
eulerpartlemt 34338	Lemma for ~ eulerpart . (...
eulerpartgbij 34339	Lemma for ~ eulerpart : T...
eulerpartlemgv 34340	Lemma for ~ eulerpart : va...
eulerpartlemr 34341	Lemma for ~ eulerpart . (...
eulerpartlemmf 34342	Lemma for ~ eulerpart . (...
eulerpartlemgvv 34343	Lemma for ~ eulerpart : va...
eulerpartlemgu 34344	Lemma for ~ eulerpart : R...
eulerpartlemgh 34345	Lemma for ~ eulerpart : T...
eulerpartlemgf 34346	Lemma for ~ eulerpart : I...
eulerpartlemgs2 34347	Lemma for ~ eulerpart : T...
eulerpartlemn 34348	Lemma for ~ eulerpart . (...
eulerpart 34349	Euler's theorem on partiti...
subiwrd 34352	Lemma for ~ sseqp1 . (Con...
subiwrdlen 34353	Length of a subword of an ...
iwrdsplit 34354	Lemma for ~ sseqp1 . (Con...
sseqval 34355	Value of the strong sequen...
sseqfv1 34356	Value of the strong sequen...
sseqfn 34357	A strong recursive sequenc...
sseqmw 34358	Lemma for ~ sseqf amd ~ ss...
sseqf 34359	A strong recursive sequenc...
sseqfres 34360	The first elements in the ...
sseqfv2 34361	Value of the strong sequen...
sseqp1 34362	Value of the strong sequen...
fiblem 34365	Lemma for ~ fib0 , ~ fib1 ...
fib0 34366	Value of the Fibonacci seq...
fib1 34367	Value of the Fibonacci seq...
fibp1 34368	Value of the Fibonacci seq...
fib2 34369	Value of the Fibonacci seq...
fib3 34370	Value of the Fibonacci seq...
fib4 34371	Value of the Fibonacci seq...
fib5 34372	Value of the Fibonacci seq...
fib6 34373	Value of the Fibonacci seq...
elprob 34376	The property of being a pr...
domprobmeas 34377	A probability measure is a...
domprobsiga 34378	The domain of a probabilit...
probtot 34379	The probability of the uni...
prob01 34380	A probability is an elemen...
probnul 34381	The probability of the emp...
unveldomd 34382	The universe is an element...
unveldom 34383	The universe is an element...
nuleldmp 34384	The empty set is an elemen...
probcun 34385	The probability of the uni...
probun 34386	The probability of the uni...
probdif 34387	The probability of the dif...
probinc 34388	A probability law is incre...
probdsb 34389	The probability of the com...
probmeasd 34390	A probability measure is a...
probvalrnd 34391	The value of a probability...
probtotrnd 34392	The probability of the uni...
totprobd 34393	Law of total probability, ...
totprob 34394	Law of total probability. ...
probfinmeasb 34395	Build a probability measur...
probfinmeasbALTV 34396	Alternate version of ~ pro...
probmeasb 34397	Build a probability from a...
cndprobval 34400	The value of the condition...
cndprobin 34401	An identity linking condit...
cndprob01 34402	The conditional probabilit...
cndprobtot 34403	The conditional probabilit...
cndprobnul 34404	The conditional probabilit...
cndprobprob 34405	The conditional probabilit...
bayesth 34406	Bayes Theorem. (Contribut...
rrvmbfm 34409	A real-valued random varia...
isrrvv 34410	Elementhood to the set of ...
rrvvf 34411	A real-valued random varia...
rrvfn 34412	A real-valued random varia...
rrvdm 34413	The domain of a random var...
rrvrnss 34414	The range of a random vari...
rrvf2 34415	A real-valued random varia...
rrvdmss 34416	The domain of a random var...
rrvfinvima 34417	For a real-value random va...
0rrv 34418	The constant function equa...
rrvadd 34419	The sum of two random vari...
rrvmulc 34420	A random variable multipli...
rrvsum 34421	An indexed sum of random v...
orvcval 34424	Value of the preimage mapp...
orvcval2 34425	Another way to express the...
elorvc 34426	Elementhood of a preimage....
orvcval4 34427	The value of the preimage ...
orvcoel 34428	If the relation produces o...
orvccel 34429	If the relation produces c...
elorrvc 34430	Elementhood of a preimage ...
orrvcval4 34431	The value of the preimage ...
orrvcoel 34432	If the relation produces o...
orrvccel 34433	If the relation produces c...
orvcgteel 34434	Preimage maps produced by ...
orvcelval 34435	Preimage maps produced by ...
orvcelel 34436	Preimage maps produced by ...
dstrvval 34437	The value of the distribut...
dstrvprob 34438	The distribution of a rand...
orvclteel 34439	Preimage maps produced by ...
dstfrvel 34440	Elementhood of preimage ma...
dstfrvunirn 34441	The limit of all preimage ...
orvclteinc 34442	Preimage maps produced by ...
dstfrvinc 34443	A cumulative distribution ...
dstfrvclim1 34444	The limit of the cumulativ...
coinfliplem 34445	Division in the extended r...
coinflipprob 34446	The ` P ` we defined for c...
coinflipspace 34447	The space of our coin-flip...
coinflipuniv 34448	The universe of our coin-f...
coinfliprv 34449	The ` X ` we defined for c...
coinflippv 34450	The probability of heads i...
coinflippvt 34451	The probability of tails i...
ballotlemoex 34452	` O ` is a set. (Contribu...
ballotlem1 34453	The size of the universe i...
ballotlemelo 34454	Elementhood in ` O ` . (C...
ballotlem2 34455	The probability that the f...
ballotlemfval 34456	The value of ` F ` . (Con...
ballotlemfelz 34457	` ( F `` C ) ` has values ...
ballotlemfp1 34458	If the ` J ` th ballot is ...
ballotlemfc0 34459	` F ` takes value 0 betwee...
ballotlemfcc 34460	` F ` takes value 0 betwee...
ballotlemfmpn 34461	` ( F `` C ) ` finishes co...
ballotlemfval0 34462	` ( F `` C ) ` always star...
ballotleme 34463	Elements of ` E ` . (Cont...
ballotlemodife 34464	Elements of ` ( O \ E ) ` ...
ballotlem4 34465	If the first pick is a vot...
ballotlem5 34466	If A is not ahead througho...
ballotlemi 34467	Value of ` I ` for a given...
ballotlemiex 34468	Properties of ` ( I `` C )...
ballotlemi1 34469	The first tie cannot be re...
ballotlemii 34470	The first tie cannot be re...
ballotlemsup 34471	The set of zeroes of ` F `...
ballotlemimin 34472	` ( I `` C ) ` is the firs...
ballotlemic 34473	If the first vote is for B...
ballotlem1c 34474	If the first vote is for A...
ballotlemsval 34475	Value of ` S ` . (Contrib...
ballotlemsv 34476	Value of ` S ` evaluated a...
ballotlemsgt1 34477	` S ` maps values less tha...
ballotlemsdom 34478	Domain of ` S ` for a give...
ballotlemsel1i 34479	The range ` ( 1 ... ( I ``...
ballotlemsf1o 34480	The defined ` S ` is a bij...
ballotlemsi 34481	The image by ` S ` of the ...
ballotlemsima 34482	The image by ` S ` of an i...
ballotlemieq 34483	If two countings share the...
ballotlemrval 34484	Value of ` R ` . (Contrib...
ballotlemscr 34485	The image of ` ( R `` C ) ...
ballotlemrv 34486	Value of ` R ` evaluated a...
ballotlemrv1 34487	Value of ` R ` before the ...
ballotlemrv2 34488	Value of ` R ` after the t...
ballotlemro 34489	Range of ` R ` is included...
ballotlemgval 34490	Expand the value of ` .^ `...
ballotlemgun 34491	A property of the defined ...
ballotlemfg 34492	Express the value of ` ( F...
ballotlemfrc 34493	Express the value of ` ( F...
ballotlemfrci 34494	Reverse counting preserves...
ballotlemfrceq 34495	Value of ` F ` for a rever...
ballotlemfrcn0 34496	Value of ` F ` for a rever...
ballotlemrc 34497	Range of ` R ` . (Contrib...
ballotlemirc 34498	Applying ` R ` does not ch...
ballotlemrinv0 34499	Lemma for ~ ballotlemrinv ...
ballotlemrinv 34500	` R ` is its own inverse :...
ballotlem1ri 34501	When the vote on the first...
ballotlem7 34502	` R ` is a bijection betwe...
ballotlem8 34503	There are as many counting...
ballotth 34504	Bertrand's ballot problem ...
sgncl 34505	Closure of the signum. (C...
sgnclre 34506	Closure of the signum. (C...
sgnneg 34507	Negation of the signum. (...
sgn3da 34508	A conditional containing a...
sgnmul 34509	Signum of a product. (Con...
sgnmulrp2 34510	Multiplication by a positi...
sgnsub 34511	Subtraction of a number of...
sgnnbi 34512	Negative signum. (Contrib...
sgnpbi 34513	Positive signum. (Contrib...
sgn0bi 34514	Zero signum. (Contributed...
sgnsgn 34515	Signum is idempotent. (Co...
sgnmulsgn 34516	If two real numbers are of...
sgnmulsgp 34517	If two real numbers are of...
fzssfzo 34518	Condition for an integer i...
gsumncl 34519	Closure of a group sum in ...
gsumnunsn 34520	Closure of a group sum in ...
ccatmulgnn0dir 34521	Concatenation of words fol...
ofcccat 34522	Letterwise operations on w...
ofcs1 34523	Letterwise operations on a...
ofcs2 34524	Letterwise operations on a...
plymul02 34525	Product of a polynomial wi...
plymulx0 34526	Coefficients of a polynomi...
plymulx 34527	Coefficients of a polynomi...
plyrecld 34528	Closure of a polynomial wi...
signsplypnf 34529	The quotient of a polynomi...
signsply0 34530	Lemma for the rule of sign...
signspval 34531	The value of the skipping ...
signsw0glem 34532	Neutral element property o...
signswbase 34533	The base of ` W ` is the u...
signswplusg 34534	The operation of ` W ` . ...
signsw0g 34535	The neutral element of ` W...
signswmnd 34536	` W ` is a monoid structur...
signswrid 34537	The zero-skipping operatio...
signswlid 34538	The zero-skipping operatio...
signswn0 34539	The zero-skipping operatio...
signswch 34540	The zero-skipping operatio...
signslema 34541	Computational part of ~~? ...
signstfv 34542	Value of the zero-skipping...
signstfval 34543	Value of the zero-skipping...
signstcl 34544	Closure of the zero skippi...
signstf 34545	The zero skipping sign wor...
signstlen 34546	Length of the zero skippin...
signstf0 34547	Sign of a single letter wo...
signstfvn 34548	Zero-skipping sign in a wo...
signsvtn0 34549	If the last letter is nonz...
signstfvp 34550	Zero-skipping sign in a wo...
signstfvneq0 34551	In case the first letter i...
signstfvcl 34552	Closure of the zero skippi...
signstfvc 34553	Zero-skipping sign in a wo...
signstres 34554	Restriction of a zero skip...
signstfveq0a 34555	Lemma for ~ signstfveq0 . ...
signstfveq0 34556	In case the last letter is...
signsvvfval 34557	The value of ` V ` , which...
signsvvf 34558	` V ` is a function. (Con...
signsvf0 34559	There is no change of sign...
signsvf1 34560	In a single-letter word, w...
signsvfn 34561	Number of changes in a wor...
signsvtp 34562	Adding a letter of the sam...
signsvtn 34563	Adding a letter of a diffe...
signsvfpn 34564	Adding a letter of the sam...
signsvfnn 34565	Adding a letter of a diffe...
signlem0 34566	Adding a zero as the highe...
signshf 34567	` H ` , corresponding to t...
signshwrd 34568	` H ` , corresponding to t...
signshlen 34569	Length of ` H ` , correspo...
signshnz 34570	` H ` is not the empty wor...
iblidicc 34571	The identity function is i...
rpsqrtcn 34572	Continuity of the real pos...
divsqrtid 34573	A real number divided by i...
cxpcncf1 34574	The power function on comp...
efmul2picn 34575	Multiplying by ` ( _i x. (...
fct2relem 34576	Lemma for ~ ftc2re . (Con...
ftc2re 34577	The Fundamental Theorem of...
fdvposlt 34578	Functions with a positive ...
fdvneggt 34579	Functions with a negative ...
fdvposle 34580	Functions with a nonnegati...
fdvnegge 34581	Functions with a nonpositi...
prodfzo03 34582	A product of three factors...
actfunsnf1o 34583	The action ` F ` of extend...
actfunsnrndisj 34584	The action ` F ` of extend...
itgexpif 34585	The basis for the circle m...
fsum2dsub 34586	Lemma for ~ breprexp - Re-...
reprval 34589	Value of the representatio...
repr0 34590	There is exactly one repre...
reprf 34591	Members of the representat...
reprsum 34592	Sums of values of the memb...
reprle 34593	Upper bound to the terms i...
reprsuc 34594	Express the representation...
reprfi 34595	Bounded representations ar...
reprss 34596	Representations with terms...
reprinrn 34597	Representations with term ...
reprlt 34598	There are no representatio...
hashreprin 34599	Express a sum of represent...
reprgt 34600	There are no representatio...
reprinfz1 34601	For the representation of ...
reprfi2 34602	Corollary of ~ reprinfz1 ....
reprfz1 34603	Corollary of ~ reprinfz1 ....
hashrepr 34604	Develop the number of repr...
reprpmtf1o 34605	Transposing ` 0 ` and ` X ...
reprdifc 34606	Express the representation...
chpvalz 34607	Value of the second Chebys...
chtvalz 34608	Value of the Chebyshev fun...
breprexplema 34609	Lemma for ~ breprexp (indu...
breprexplemb 34610	Lemma for ~ breprexp (clos...
breprexplemc 34611	Lemma for ~ breprexp (indu...
breprexp 34612	Express the ` S ` th power...
breprexpnat 34613	Express the ` S ` th power...
vtsval 34616	Value of the Vinogradov tr...
vtscl 34617	Closure of the Vinogradov ...
vtsprod 34618	Express the Vinogradov tri...
circlemeth 34619	The Hardy, Littlewood and ...
circlemethnat 34620	The Hardy, Littlewood and ...
circlevma 34621	The Circle Method, where t...
circlemethhgt 34622	The circle method, where t...
hgt750lemc 34626	An upper bound to the summ...
hgt750lemd 34627	An upper bound to the summ...
hgt749d 34628	A deduction version of ~ a...
logdivsqrle 34629	Conditions for ` ( ( log `...
hgt750lem 34630	Lemma for ~ tgoldbachgtd ....
hgt750lem2 34631	Decimal multiplication gal...
hgt750lemf 34632	Lemma for the statement 7....
hgt750lemg 34633	Lemma for the statement 7....
oddprm2 34634	Two ways to write the set ...
hgt750lemb 34635	An upper bound on the cont...
hgt750lema 34636	An upper bound on the cont...
hgt750leme 34637	An upper bound on the cont...
tgoldbachgnn 34638	Lemma for ~ tgoldbachgtd ....
tgoldbachgtde 34639	Lemma for ~ tgoldbachgtd ....
tgoldbachgtda 34640	Lemma for ~ tgoldbachgtd ....
tgoldbachgtd 34641	Odd integers greater than ...
tgoldbachgt 34642	Odd integers greater than ...
istrkg2d 34645	Property of fulfilling dim...
axtglowdim2ALTV 34646	Alternate version of ~ axt...
axtgupdim2ALTV 34647	Alternate version of ~ axt...
afsval 34650	Value of the AFS relation ...
brafs 34651	Binary relation form of th...
tg5segofs 34652	Rephrase ~ axtg5seg using ...
lpadval 34655	Value of the ` leftpad ` f...
lpadlem1 34656	Lemma for the ` leftpad ` ...
lpadlem3 34657	Lemma for ~ lpadlen1 . (C...
lpadlen1 34658	Length of a left-padded wo...
lpadlem2 34659	Lemma for the ` leftpad ` ...
lpadlen2 34660	Length of a left-padded wo...
lpadmax 34661	Length of a left-padded wo...
lpadleft 34662	The contents of prefix of ...
lpadright 34663	The suffix of a left-padde...
bnj170 34676	` /\ ` -manipulation. (Co...
bnj240 34677	` /\ ` -manipulation. (Co...
bnj248 34678	` /\ ` -manipulation. (Co...
bnj250 34679	` /\ ` -manipulation. (Co...
bnj251 34680	` /\ ` -manipulation. (Co...
bnj252 34681	` /\ ` -manipulation. (Co...
bnj253 34682	` /\ ` -manipulation. (Co...
bnj255 34683	` /\ ` -manipulation. (Co...
bnj256 34684	` /\ ` -manipulation. (Co...
bnj257 34685	` /\ ` -manipulation. (Co...
bnj258 34686	` /\ ` -manipulation. (Co...
bnj268 34687	` /\ ` -manipulation. (Co...
bnj290 34688	` /\ ` -manipulation. (Co...
bnj291 34689	` /\ ` -manipulation. (Co...
bnj312 34690	` /\ ` -manipulation. (Co...
bnj334 34691	` /\ ` -manipulation. (Co...
bnj345 34692	` /\ ` -manipulation. (Co...
bnj422 34693	` /\ ` -manipulation. (Co...
bnj432 34694	` /\ ` -manipulation. (Co...
bnj446 34695	` /\ ` -manipulation. (Co...
bnj23 34696	First-order logic and set ...
bnj31 34697	First-order logic and set ...
bnj62 34698	First-order logic and set ...
bnj89 34699	First-order logic and set ...
bnj90 34700	First-order logic and set ...
bnj101 34701	First-order logic and set ...
bnj105 34702	First-order logic and set ...
bnj115 34703	First-order logic and set ...
bnj132 34704	First-order logic and set ...
bnj133 34705	First-order logic and set ...
bnj156 34706	First-order logic and set ...
bnj158 34707	First-order logic and set ...
bnj168 34708	First-order logic and set ...
bnj206 34709	First-order logic and set ...
bnj216 34710	First-order logic and set ...
bnj219 34711	First-order logic and set ...
bnj226 34712	First-order logic and set ...
bnj228 34713	First-order logic and set ...
bnj519 34714	First-order logic and set ...
bnj524 34715	First-order logic and set ...
bnj525 34716	First-order logic and set ...
bnj534 34717	First-order logic and set ...
bnj538 34718	First-order logic and set ...
bnj529 34719	First-order logic and set ...
bnj551 34720	First-order logic and set ...
bnj563 34721	First-order logic and set ...
bnj564 34722	First-order logic and set ...
bnj593 34723	First-order logic and set ...
bnj596 34724	First-order logic and set ...
bnj610 34725	Pass from equality ( ` x =...
bnj642 34726	` /\ ` -manipulation. (Co...
bnj643 34727	` /\ ` -manipulation. (Co...
bnj645 34728	` /\ ` -manipulation. (Co...
bnj658 34729	` /\ ` -manipulation. (Co...
bnj667 34730	` /\ ` -manipulation. (Co...
bnj705 34731	` /\ ` -manipulation. (Co...
bnj706 34732	` /\ ` -manipulation. (Co...
bnj707 34733	` /\ ` -manipulation. (Co...
bnj708 34734	` /\ ` -manipulation. (Co...
bnj721 34735	` /\ ` -manipulation. (Co...
bnj832 34736	` /\ ` -manipulation. (Co...
bnj835 34737	` /\ ` -manipulation. (Co...
bnj836 34738	` /\ ` -manipulation. (Co...
bnj837 34739	` /\ ` -manipulation. (Co...
bnj769 34740	` /\ ` -manipulation. (Co...
bnj770 34741	` /\ ` -manipulation. (Co...
bnj771 34742	` /\ ` -manipulation. (Co...
bnj887 34743	` /\ ` -manipulation. (Co...
bnj918 34744	First-order logic and set ...
bnj919 34745	First-order logic and set ...
bnj923 34746	First-order logic and set ...
bnj927 34747	First-order logic and set ...
bnj931 34748	First-order logic and set ...
bnj937 34749	First-order logic and set ...
bnj941 34750	First-order logic and set ...
bnj945 34751	Technical lemma for ~ bnj6...
bnj946 34752	First-order logic and set ...
bnj951 34753	` /\ ` -manipulation. (Co...
bnj956 34754	First-order logic and set ...
bnj976 34755	First-order logic and set ...
bnj982 34756	First-order logic and set ...
bnj1019 34757	First-order logic and set ...
bnj1023 34758	First-order logic and set ...
bnj1095 34759	First-order logic and set ...
bnj1096 34760	First-order logic and set ...
bnj1098 34761	First-order logic and set ...
bnj1101 34762	First-order logic and set ...
bnj1113 34763	First-order logic and set ...
bnj1109 34764	First-order logic and set ...
bnj1131 34765	First-order logic and set ...
bnj1138 34766	First-order logic and set ...
bnj1142 34767	First-order logic and set ...
bnj1143 34768	First-order logic and set ...
bnj1146 34769	First-order logic and set ...
bnj1149 34770	First-order logic and set ...
bnj1185 34771	First-order logic and set ...
bnj1196 34772	First-order logic and set ...
bnj1198 34773	First-order logic and set ...
bnj1209 34774	First-order logic and set ...
bnj1211 34775	First-order logic and set ...
bnj1213 34776	First-order logic and set ...
bnj1212 34777	First-order logic and set ...
bnj1219 34778	First-order logic and set ...
bnj1224 34779	First-order logic and set ...
bnj1230 34780	First-order logic and set ...
bnj1232 34781	First-order logic and set ...
bnj1235 34782	First-order logic and set ...
bnj1239 34783	First-order logic and set ...
bnj1238 34784	First-order logic and set ...
bnj1241 34785	First-order logic and set ...
bnj1247 34786	First-order logic and set ...
bnj1254 34787	First-order logic and set ...
bnj1262 34788	First-order logic and set ...
bnj1266 34789	First-order logic and set ...
bnj1265 34790	First-order logic and set ...
bnj1275 34791	First-order logic and set ...
bnj1276 34792	First-order logic and set ...
bnj1292 34793	First-order logic and set ...
bnj1293 34794	First-order logic and set ...
bnj1294 34795	First-order logic and set ...
bnj1299 34796	First-order logic and set ...
bnj1304 34797	First-order logic and set ...
bnj1316 34798	First-order logic and set ...
bnj1317 34799	First-order logic and set ...
bnj1322 34800	First-order logic and set ...
bnj1340 34801	First-order logic and set ...
bnj1345 34802	First-order logic and set ...
bnj1350 34803	First-order logic and set ...
bnj1351 34804	First-order logic and set ...
bnj1352 34805	First-order logic and set ...
bnj1361 34806	First-order logic and set ...
bnj1366 34807	First-order logic and set ...
bnj1379 34808	First-order logic and set ...
bnj1383 34809	First-order logic and set ...
bnj1385 34810	First-order logic and set ...
bnj1386 34811	First-order logic and set ...
bnj1397 34812	First-order logic and set ...
bnj1400 34813	First-order logic and set ...
bnj1405 34814	First-order logic and set ...
bnj1422 34815	First-order logic and set ...
bnj1424 34816	First-order logic and set ...
bnj1436 34817	First-order logic and set ...
bnj1441 34818	First-order logic and set ...
bnj1441g 34819	First-order logic and set ...
bnj1454 34820	First-order logic and set ...
bnj1459 34821	First-order logic and set ...
bnj1464 34822	Conversion of implicit sub...
bnj1465 34823	First-order logic and set ...
bnj1468 34824	Conversion of implicit sub...
bnj1476 34825	First-order logic and set ...
bnj1502 34826	First-order logic and set ...
bnj1503 34827	First-order logic and set ...
bnj1517 34828	First-order logic and set ...
bnj1521 34829	First-order logic and set ...
bnj1533 34830	First-order logic and set ...
bnj1534 34831	First-order logic and set ...
bnj1536 34832	First-order logic and set ...
bnj1538 34833	First-order logic and set ...
bnj1541 34834	First-order logic and set ...
bnj1542 34835	First-order logic and set ...
bnj110 34836	Well-founded induction res...
bnj157 34837	Well-founded induction res...
bnj66 34838	Technical lemma for ~ bnj6...
bnj91 34839	First-order logic and set ...
bnj92 34840	First-order logic and set ...
bnj93 34841	Technical lemma for ~ bnj9...
bnj95 34842	Technical lemma for ~ bnj1...
bnj96 34843	Technical lemma for ~ bnj1...
bnj97 34844	Technical lemma for ~ bnj1...
bnj98 34845	Technical lemma for ~ bnj1...
bnj106 34846	First-order logic and set ...
bnj118 34847	First-order logic and set ...
bnj121 34848	First-order logic and set ...
bnj124 34849	Technical lemma for ~ bnj1...
bnj125 34850	Technical lemma for ~ bnj1...
bnj126 34851	Technical lemma for ~ bnj1...
bnj130 34852	Technical lemma for ~ bnj1...
bnj149 34853	Technical lemma for ~ bnj1...
bnj150 34854	Technical lemma for ~ bnj1...
bnj151 34855	Technical lemma for ~ bnj1...
bnj154 34856	Technical lemma for ~ bnj1...
bnj155 34857	Technical lemma for ~ bnj1...
bnj153 34858	Technical lemma for ~ bnj8...
bnj207 34859	Technical lemma for ~ bnj8...
bnj213 34860	First-order logic and set ...
bnj222 34861	Technical lemma for ~ bnj2...
bnj229 34862	Technical lemma for ~ bnj5...
bnj517 34863	Technical lemma for ~ bnj5...
bnj518 34864	Technical lemma for ~ bnj8...
bnj523 34865	Technical lemma for ~ bnj8...
bnj526 34866	Technical lemma for ~ bnj8...
bnj528 34867	Technical lemma for ~ bnj8...
bnj535 34868	Technical lemma for ~ bnj8...
bnj539 34869	Technical lemma for ~ bnj8...
bnj540 34870	Technical lemma for ~ bnj8...
bnj543 34871	Technical lemma for ~ bnj8...
bnj544 34872	Technical lemma for ~ bnj8...
bnj545 34873	Technical lemma for ~ bnj8...
bnj546 34874	Technical lemma for ~ bnj8...
bnj548 34875	Technical lemma for ~ bnj8...
bnj553 34876	Technical lemma for ~ bnj8...
bnj554 34877	Technical lemma for ~ bnj8...
bnj556 34878	Technical lemma for ~ bnj8...
bnj557 34879	Technical lemma for ~ bnj8...
bnj558 34880	Technical lemma for ~ bnj8...
bnj561 34881	Technical lemma for ~ bnj8...
bnj562 34882	Technical lemma for ~ bnj8...
bnj570 34883	Technical lemma for ~ bnj8...
bnj571 34884	Technical lemma for ~ bnj8...
bnj605 34885	Technical lemma. This lem...
bnj581 34886	Technical lemma for ~ bnj5...
bnj589 34887	Technical lemma for ~ bnj8...
bnj590 34888	Technical lemma for ~ bnj8...
bnj591 34889	Technical lemma for ~ bnj8...
bnj594 34890	Technical lemma for ~ bnj8...
bnj580 34891	Technical lemma for ~ bnj5...
bnj579 34892	Technical lemma for ~ bnj8...
bnj602 34893	Equality theorem for the `...
bnj607 34894	Technical lemma for ~ bnj8...
bnj609 34895	Technical lemma for ~ bnj8...
bnj611 34896	Technical lemma for ~ bnj8...
bnj600 34897	Technical lemma for ~ bnj8...
bnj601 34898	Technical lemma for ~ bnj8...
bnj852 34899	Technical lemma for ~ bnj6...
bnj864 34900	Technical lemma for ~ bnj6...
bnj865 34901	Technical lemma for ~ bnj6...
bnj873 34902	Technical lemma for ~ bnj6...
bnj849 34903	Technical lemma for ~ bnj6...
bnj882 34904	Definition (using hypothes...
bnj18eq1 34905	Equality theorem for trans...
bnj893 34906	Property of ` _trCl ` . U...
bnj900 34907	Technical lemma for ~ bnj6...
bnj906 34908	Property of ` _trCl ` . (...
bnj908 34909	Technical lemma for ~ bnj6...
bnj911 34910	Technical lemma for ~ bnj6...
bnj916 34911	Technical lemma for ~ bnj6...
bnj917 34912	Technical lemma for ~ bnj6...
bnj934 34913	Technical lemma for ~ bnj6...
bnj929 34914	Technical lemma for ~ bnj6...
bnj938 34915	Technical lemma for ~ bnj6...
bnj944 34916	Technical lemma for ~ bnj6...
bnj953 34917	Technical lemma for ~ bnj6...
bnj958 34918	Technical lemma for ~ bnj6...
bnj1000 34919	Technical lemma for ~ bnj8...
bnj965 34920	Technical lemma for ~ bnj8...
bnj964 34921	Technical lemma for ~ bnj6...
bnj966 34922	Technical lemma for ~ bnj6...
bnj967 34923	Technical lemma for ~ bnj6...
bnj969 34924	Technical lemma for ~ bnj6...
bnj970 34925	Technical lemma for ~ bnj6...
bnj910 34926	Technical lemma for ~ bnj6...
bnj978 34927	Technical lemma for ~ bnj6...
bnj981 34928	Technical lemma for ~ bnj6...
bnj983 34929	Technical lemma for ~ bnj6...
bnj984 34930	Technical lemma for ~ bnj6...
bnj985v 34931	Version of ~ bnj985 with a...
bnj985 34932	Technical lemma for ~ bnj6...
bnj986 34933	Technical lemma for ~ bnj6...
bnj996 34934	Technical lemma for ~ bnj6...
bnj998 34935	Technical lemma for ~ bnj6...
bnj999 34936	Technical lemma for ~ bnj6...
bnj1001 34937	Technical lemma for ~ bnj6...
bnj1006 34938	Technical lemma for ~ bnj6...
bnj1014 34939	Technical lemma for ~ bnj6...
bnj1015 34940	Technical lemma for ~ bnj6...
bnj1018g 34941	Version of ~ bnj1018 with ...
bnj1018 34942	Technical lemma for ~ bnj6...
bnj1020 34943	Technical lemma for ~ bnj6...
bnj1021 34944	Technical lemma for ~ bnj6...
bnj907 34945	Technical lemma for ~ bnj6...
bnj1029 34946	Property of ` _trCl ` . (...
bnj1033 34947	Technical lemma for ~ bnj6...
bnj1034 34948	Technical lemma for ~ bnj6...
bnj1039 34949	Technical lemma for ~ bnj6...
bnj1040 34950	Technical lemma for ~ bnj6...
bnj1047 34951	Technical lemma for ~ bnj6...
bnj1049 34952	Technical lemma for ~ bnj6...
bnj1052 34953	Technical lemma for ~ bnj6...
bnj1053 34954	Technical lemma for ~ bnj6...
bnj1071 34955	Technical lemma for ~ bnj6...
bnj1083 34956	Technical lemma for ~ bnj6...
bnj1090 34957	Technical lemma for ~ bnj6...
bnj1093 34958	Technical lemma for ~ bnj6...
bnj1097 34959	Technical lemma for ~ bnj6...
bnj1110 34960	Technical lemma for ~ bnj6...
bnj1112 34961	Technical lemma for ~ bnj6...
bnj1118 34962	Technical lemma for ~ bnj6...
bnj1121 34963	Technical lemma for ~ bnj6...
bnj1123 34964	Technical lemma for ~ bnj6...
bnj1030 34965	Technical lemma for ~ bnj6...
bnj1124 34966	Property of ` _trCl ` . (...
bnj1133 34967	Technical lemma for ~ bnj6...
bnj1128 34968	Technical lemma for ~ bnj6...
bnj1127 34969	Property of ` _trCl ` . (...
bnj1125 34970	Property of ` _trCl ` . (...
bnj1145 34971	Technical lemma for ~ bnj6...
bnj1147 34972	Property of ` _trCl ` . (...
bnj1137 34973	Property of ` _trCl ` . (...
bnj1148 34974	Property of ` _pred ` . (...
bnj1136 34975	Technical lemma for ~ bnj6...
bnj1152 34976	Technical lemma for ~ bnj6...
bnj1154 34977	Property of ` Fr ` . (Con...
bnj1171 34978	Technical lemma for ~ bnj6...
bnj1172 34979	Technical lemma for ~ bnj6...
bnj1173 34980	Technical lemma for ~ bnj6...
bnj1174 34981	Technical lemma for ~ bnj6...
bnj1175 34982	Technical lemma for ~ bnj6...
bnj1176 34983	Technical lemma for ~ bnj6...
bnj1177 34984	Technical lemma for ~ bnj6...
bnj1186 34985	Technical lemma for ~ bnj6...
bnj1190 34986	Technical lemma for ~ bnj6...
bnj1189 34987	Technical lemma for ~ bnj6...
bnj69 34988	Existence of a minimal ele...
bnj1228 34989	Existence of a minimal ele...
bnj1204 34990	Well-founded induction. T...
bnj1234 34991	Technical lemma for ~ bnj6...
bnj1245 34992	Technical lemma for ~ bnj6...
bnj1256 34993	Technical lemma for ~ bnj6...
bnj1259 34994	Technical lemma for ~ bnj6...
bnj1253 34995	Technical lemma for ~ bnj6...
bnj1279 34996	Technical lemma for ~ bnj6...
bnj1286 34997	Technical lemma for ~ bnj6...
bnj1280 34998	Technical lemma for ~ bnj6...
bnj1296 34999	Technical lemma for ~ bnj6...
bnj1309 35000	Technical lemma for ~ bnj6...
bnj1307 35001	Technical lemma for ~ bnj6...
bnj1311 35002	Technical lemma for ~ bnj6...
bnj1318 35003	Technical lemma for ~ bnj6...
bnj1326 35004	Technical lemma for ~ bnj6...
bnj1321 35005	Technical lemma for ~ bnj6...
bnj1364 35006	Property of ` _FrSe ` . (...
bnj1371 35007	Technical lemma for ~ bnj6...
bnj1373 35008	Technical lemma for ~ bnj6...
bnj1374 35009	Technical lemma for ~ bnj6...
bnj1384 35010	Technical lemma for ~ bnj6...
bnj1388 35011	Technical lemma for ~ bnj6...
bnj1398 35012	Technical lemma for ~ bnj6...
bnj1413 35013	Property of ` _trCl ` . (...
bnj1408 35014	Technical lemma for ~ bnj1...
bnj1414 35015	Property of ` _trCl ` . (...
bnj1415 35016	Technical lemma for ~ bnj6...
bnj1416 35017	Technical lemma for ~ bnj6...
bnj1418 35018	Property of ` _pred ` . (...
bnj1417 35019	Technical lemma for ~ bnj6...
bnj1421 35020	Technical lemma for ~ bnj6...
bnj1444 35021	Technical lemma for ~ bnj6...
bnj1445 35022	Technical lemma for ~ bnj6...
bnj1446 35023	Technical lemma for ~ bnj6...
bnj1447 35024	Technical lemma for ~ bnj6...
bnj1448 35025	Technical lemma for ~ bnj6...
bnj1449 35026	Technical lemma for ~ bnj6...
bnj1442 35027	Technical lemma for ~ bnj6...
bnj1450 35028	Technical lemma for ~ bnj6...
bnj1423 35029	Technical lemma for ~ bnj6...
bnj1452 35030	Technical lemma for ~ bnj6...
bnj1466 35031	Technical lemma for ~ bnj6...
bnj1467 35032	Technical lemma for ~ bnj6...
bnj1463 35033	Technical lemma for ~ bnj6...
bnj1489 35034	Technical lemma for ~ bnj6...
bnj1491 35035	Technical lemma for ~ bnj6...
bnj1312 35036	Technical lemma for ~ bnj6...
bnj1493 35037	Technical lemma for ~ bnj6...
bnj1497 35038	Technical lemma for ~ bnj6...
bnj1498 35039	Technical lemma for ~ bnj6...
bnj60 35040	Well-founded recursion, pa...
bnj1514 35041	Technical lemma for ~ bnj1...
bnj1518 35042	Technical lemma for ~ bnj1...
bnj1519 35043	Technical lemma for ~ bnj1...
bnj1520 35044	Technical lemma for ~ bnj1...
bnj1501 35045	Technical lemma for ~ bnj1...
bnj1500 35046	Well-founded recursion, pa...
bnj1525 35047	Technical lemma for ~ bnj1...
bnj1529 35048	Technical lemma for ~ bnj1...
bnj1523 35049	Technical lemma for ~ bnj1...
bnj1522 35050	Well-founded recursion, pa...
nfan1c 35051	Variant of ~ nfan and comm...
cbvex1v 35052	Rule used to change bound ...
dvelimalcased 35053	Eliminate a disjoint varia...
dvelimalcasei 35054	Eliminate a disjoint varia...
dvelimexcased 35055	Eliminate a disjoint varia...
dvelimexcasei 35056	Eliminate a disjoint varia...
exdifsn 35057	There exists an element in...
srcmpltd 35058	If a statement is true for...
prsrcmpltd 35059	If a statement is true for...
axsepg2 35060	A generalization of ~ ax-s...
axsepg2ALT 35061	Alternate proof of ~ axsep...
dff15 35062	A one-to-one function in t...
f1resveqaeq 35063	If a function restricted t...
f1resrcmplf1dlem 35064	Lemma for ~ f1resrcmplf1d ...
f1resrcmplf1d 35065	If a function's restrictio...
funen1cnv 35066	If a function is equinumer...
fnrelpredd 35067	A function that preserves ...
cardpred 35068	The cardinality function p...
nummin 35069	Every nonempty class of nu...
axnulg 35070	A generalization of ~ ax-n...
axnulALT2 35071	Alternate proof of ~ axnul...
prcinf 35072	Any proper class is litera...
fineqvrep 35073	If the Axiom of Infinity i...
fineqvpow 35074	If the Axiom of Infinity i...
fineqvac 35075	If the Axiom of Infinity i...
fineqvacALT 35076	Shorter proof of ~ fineqva...
gblacfnacd 35077	If ` F ` is a global choic...
wevgblacfn 35078	If ` R ` is a well-orderin...
zltp1ne 35079	Integer ordering relation....
nnltp1ne 35080	Positive integer ordering ...
nn0ltp1ne 35081	Nonnegative integer orderi...
0nn0m1nnn0 35082	A number is zero if and on...
f1resfz0f1d 35083	If a function with a seque...
fisshasheq 35084	A finite set is equal to i...
revpfxsfxrev 35085	The reverse of a prefix of...
swrdrevpfx 35086	A subword expressed in ter...
lfuhgr 35087	A hypergraph is loop-free ...
lfuhgr2 35088	A hypergraph is loop-free ...
lfuhgr3 35089	A hypergraph is loop-free ...
cplgredgex 35090	Any two (distinct) vertice...
cusgredgex 35091	Any two (distinct) vertice...
cusgredgex2 35092	Any two distinct vertices ...
pfxwlk 35093	A prefix of a walk is a wa...
revwlk 35094	The reverse of a walk is a...
revwlkb 35095	Two words represent a walk...
swrdwlk 35096	Two matching subwords of a...
pthhashvtx 35097	A graph containing a path ...
pthisspthorcycl 35098	A path is either a simple ...
spthcycl 35099	A walk is a trivial path i...
usgrgt2cycl 35100	A non-trivial cycle in a s...
usgrcyclgt2v 35101	A simple graph with a non-...
subgrwlk 35102	If a walk exists in a subg...
subgrtrl 35103	If a trail exists in a sub...
subgrpth 35104	If a path exists in a subg...
subgrcycl 35105	If a cycle exists in a sub...
cusgr3cyclex 35106	Every complete simple grap...
loop1cycl 35107	A hypergraph has a cycle o...
2cycld 35108	Construction of a 2-cycle ...
2cycl2d 35109	Construction of a 2-cycle ...
umgr2cycllem 35110	Lemma for ~ umgr2cycl . (...
umgr2cycl 35111	A multigraph with two dist...
dfacycgr1 35114	An alternate definition of...
isacycgr 35115	The property of being an a...
isacycgr1 35116	The property of being an a...
acycgrcycl 35117	Any cycle in an acyclic gr...
acycgr0v 35118	A null graph (with no vert...
acycgr1v 35119	A multigraph with one vert...
acycgr2v 35120	A simple graph with two ve...
prclisacycgr 35121	A proper class (representi...
acycgrislfgr 35122	An acyclic hypergraph is a...
upgracycumgr 35123	An acyclic pseudograph is ...
umgracycusgr 35124	An acyclic multigraph is a...
upgracycusgr 35125	An acyclic pseudograph is ...
cusgracyclt3v 35126	A complete simple graph is...
pthacycspth 35127	A path in an acyclic graph...
acycgrsubgr 35128	The subgraph of an acyclic...
quartfull 35135	The quartic equation, writ...
deranglem 35136	Lemma for derangements. (...
derangval 35137	Define the derangement fun...
derangf 35138	The derangement number is ...
derang0 35139	The derangement number of ...
derangsn 35140	The derangement number of ...
derangenlem 35141	One half of ~ derangen . ...
derangen 35142	The derangement number is ...
subfacval 35143	The subfactorial is define...
derangen2 35144	Write the derangement numb...
subfacf 35145	The subfactorial is a func...
subfaclefac 35146	The subfactorial is less t...
subfac0 35147	The subfactorial at zero. ...
subfac1 35148	The subfactorial at one. ...
subfacp1lem1 35149	Lemma for ~ subfacp1 . Th...
subfacp1lem2a 35150	Lemma for ~ subfacp1 . Pr...
subfacp1lem2b 35151	Lemma for ~ subfacp1 . Pr...
subfacp1lem3 35152	Lemma for ~ subfacp1 . In...
subfacp1lem4 35153	Lemma for ~ subfacp1 . Th...
subfacp1lem5 35154	Lemma for ~ subfacp1 . In...
subfacp1lem6 35155	Lemma for ~ subfacp1 . By...
subfacp1 35156	A two-term recurrence for ...
subfacval2 35157	A closed-form expression f...
subfaclim 35158	The subfactorial converges...
subfacval3 35159	Another closed form expres...
derangfmla 35160	The derangements formula, ...
erdszelem1 35161	Lemma for ~ erdsze . (Con...
erdszelem2 35162	Lemma for ~ erdsze . (Con...
erdszelem3 35163	Lemma for ~ erdsze . (Con...
erdszelem4 35164	Lemma for ~ erdsze . (Con...
erdszelem5 35165	Lemma for ~ erdsze . (Con...
erdszelem6 35166	Lemma for ~ erdsze . (Con...
erdszelem7 35167	Lemma for ~ erdsze . (Con...
erdszelem8 35168	Lemma for ~ erdsze . (Con...
erdszelem9 35169	Lemma for ~ erdsze . (Con...
erdszelem10 35170	Lemma for ~ erdsze . (Con...
erdszelem11 35171	Lemma for ~ erdsze . (Con...
erdsze 35172	The Erdős-Szekeres th...
erdsze2lem1 35173	Lemma for ~ erdsze2 . (Co...
erdsze2lem2 35174	Lemma for ~ erdsze2 . (Co...
erdsze2 35175	Generalize the statement o...
kur14lem1 35176	Lemma for ~ kur14 . (Cont...
kur14lem2 35177	Lemma for ~ kur14 . Write...
kur14lem3 35178	Lemma for ~ kur14 . A clo...
kur14lem4 35179	Lemma for ~ kur14 . Compl...
kur14lem5 35180	Lemma for ~ kur14 . Closu...
kur14lem6 35181	Lemma for ~ kur14 . If ` ...
kur14lem7 35182	Lemma for ~ kur14 : main p...
kur14lem8 35183	Lemma for ~ kur14 . Show ...
kur14lem9 35184	Lemma for ~ kur14 . Since...
kur14lem10 35185	Lemma for ~ kur14 . Disch...
kur14 35186	Kuratowski's closure-compl...
ispconn 35193	The property of being a pa...
pconncn 35194	The property of being a pa...
pconntop 35195	A simply connected space i...
issconn 35196	The property of being a si...
sconnpconn 35197	A simply connected space i...
sconntop 35198	A simply connected space i...
sconnpht 35199	A closed path in a simply ...
cnpconn 35200	An image of a path-connect...
pconnconn 35201	A path-connected space is ...
txpconn 35202	The topological product of...
ptpconn 35203	The topological product of...
indispconn 35204	The indiscrete topology (o...
connpconn 35205	A connected and locally pa...
qtoppconn 35206	A quotient of a path-conne...
pconnpi1 35207	All fundamental groups in ...
sconnpht2 35208	Any two paths in a simply ...
sconnpi1 35209	A path-connected topologic...
txsconnlem 35210	Lemma for ~ txsconn . (Co...
txsconn 35211	The topological product of...
cvxpconn 35212	A convex subset of the com...
cvxsconn 35213	A convex subset of the com...
blsconn 35214	An open ball in the comple...
cnllysconn 35215	The topology of the comple...
resconn 35216	A subset of ` RR ` is simp...
ioosconn 35217	An open interval is simply...
iccsconn 35218	A closed interval is simpl...
retopsconn 35219	The real numbers are simpl...
iccllysconn 35220	A closed interval is local...
rellysconn 35221	The real numbers are local...
iisconn 35222	The unit interval is simpl...
iillysconn 35223	The unit interval is local...
iinllyconn 35224	The unit interval is local...
fncvm 35227	Lemma for covering maps. ...
cvmscbv 35228	Change bound variables in ...
iscvm 35229	The property of being a co...
cvmtop1 35230	Reverse closure for a cove...
cvmtop2 35231	Reverse closure for a cove...
cvmcn 35232	A covering map is a contin...
cvmcov 35233	Property of a covering map...
cvmsrcl 35234	Reverse closure for an eve...
cvmsi 35235	One direction of ~ cvmsval...
cvmsval 35236	Elementhood in the set ` S...
cvmsss 35237	An even covering is a subs...
cvmsn0 35238	An even covering is nonemp...
cvmsuni 35239	An even covering of ` U ` ...
cvmsdisj 35240	An even covering of ` U ` ...
cvmshmeo 35241	Every element of an even c...
cvmsf1o 35242	` F ` , localized to an el...
cvmscld 35243	The sets of an even coveri...
cvmsss2 35244	An open subset of an evenl...
cvmcov2 35245	The covering map property ...
cvmseu 35246	Every element in ` U. T ` ...
cvmsiota 35247	Identify the unique elemen...
cvmopnlem 35248	Lemma for ~ cvmopn . (Con...
cvmfolem 35249	Lemma for ~ cvmfo . (Cont...
cvmopn 35250	A covering map is an open ...
cvmliftmolem1 35251	Lemma for ~ cvmliftmo . (...
cvmliftmolem2 35252	Lemma for ~ cvmliftmo . (...
cvmliftmoi 35253	A lift of a continuous fun...
cvmliftmo 35254	A lift of a continuous fun...
cvmliftlem1 35255	Lemma for ~ cvmlift . In ...
cvmliftlem2 35256	Lemma for ~ cvmlift . ` W ...
cvmliftlem3 35257	Lemma for ~ cvmlift . Sin...
cvmliftlem4 35258	Lemma for ~ cvmlift . The...
cvmliftlem5 35259	Lemma for ~ cvmlift . Def...
cvmliftlem6 35260	Lemma for ~ cvmlift . Ind...
cvmliftlem7 35261	Lemma for ~ cvmlift . Pro...
cvmliftlem8 35262	Lemma for ~ cvmlift . The...
cvmliftlem9 35263	Lemma for ~ cvmlift . The...
cvmliftlem10 35264	Lemma for ~ cvmlift . The...
cvmliftlem11 35265	Lemma for ~ cvmlift . (Co...
cvmliftlem13 35266	Lemma for ~ cvmlift . The...
cvmliftlem14 35267	Lemma for ~ cvmlift . Put...
cvmliftlem15 35268	Lemma for ~ cvmlift . Dis...
cvmlift 35269	One of the important prope...
cvmfo 35270	A covering map is an onto ...
cvmliftiota 35271	Write out a function ` H `...
cvmlift2lem1 35272	Lemma for ~ cvmlift2 . (C...
cvmlift2lem9a 35273	Lemma for ~ cvmlift2 and ~...
cvmlift2lem2 35274	Lemma for ~ cvmlift2 . (C...
cvmlift2lem3 35275	Lemma for ~ cvmlift2 . (C...
cvmlift2lem4 35276	Lemma for ~ cvmlift2 . (C...
cvmlift2lem5 35277	Lemma for ~ cvmlift2 . (C...
cvmlift2lem6 35278	Lemma for ~ cvmlift2 . (C...
cvmlift2lem7 35279	Lemma for ~ cvmlift2 . (C...
cvmlift2lem8 35280	Lemma for ~ cvmlift2 . (C...
cvmlift2lem9 35281	Lemma for ~ cvmlift2 . (C...
cvmlift2lem10 35282	Lemma for ~ cvmlift2 . (C...
cvmlift2lem11 35283	Lemma for ~ cvmlift2 . (C...
cvmlift2lem12 35284	Lemma for ~ cvmlift2 . (C...
cvmlift2lem13 35285	Lemma for ~ cvmlift2 . (C...
cvmlift2 35286	A two-dimensional version ...
cvmliftphtlem 35287	Lemma for ~ cvmliftpht . ...
cvmliftpht 35288	If ` G ` and ` H ` are pat...
cvmlift3lem1 35289	Lemma for ~ cvmlift3 . (C...
cvmlift3lem2 35290	Lemma for ~ cvmlift2 . (C...
cvmlift3lem3 35291	Lemma for ~ cvmlift2 . (C...
cvmlift3lem4 35292	Lemma for ~ cvmlift2 . (C...
cvmlift3lem5 35293	Lemma for ~ cvmlift2 . (C...
cvmlift3lem6 35294	Lemma for ~ cvmlift3 . (C...
cvmlift3lem7 35295	Lemma for ~ cvmlift3 . (C...
cvmlift3lem8 35296	Lemma for ~ cvmlift2 . (C...
cvmlift3lem9 35297	Lemma for ~ cvmlift2 . (C...
cvmlift3 35298	A general version of ~ cvm...
snmlff 35299	The function ` F ` from ~ ...
snmlfval 35300	The function ` F ` from ~ ...
snmlval 35301	The property " ` A ` is si...
snmlflim 35302	If ` A ` is simply normal,...
goel 35317	A "Godel-set of membership...
goelel3xp 35318	A "Godel-set of membership...
goeleq12bg 35319	Two "Godel-set of membersh...
gonafv 35320	The "Godel-set for the She...
goaleq12d 35321	Equality of the "Godel-set...
gonanegoal 35322	The Godel-set for the Shef...
satf 35323	The satisfaction predicate...
satfsucom 35324	The satisfaction predicate...
satfn 35325	The satisfaction predicate...
satom 35326	The satisfaction predicate...
satfvsucom 35327	The satisfaction predicate...
satfv0 35328	The value of the satisfact...
satfvsuclem1 35329	Lemma 1 for ~ satfvsuc . ...
satfvsuclem2 35330	Lemma 2 for ~ satfvsuc . ...
satfvsuc 35331	The value of the satisfact...
satfv1lem 35332	Lemma for ~ satfv1 . (Con...
satfv1 35333	The value of the satisfact...
satfsschain 35334	The binary relation of a s...
satfvsucsuc 35335	The satisfaction predicate...
satfbrsuc 35336	The binary relation of a s...
satfrel 35337	The value of the satisfact...
satfdmlem 35338	Lemma for ~ satfdm . (Con...
satfdm 35339	The domain of the satisfac...
satfrnmapom 35340	The range of the satisfact...
satfv0fun 35341	The value of the satisfact...
satf0 35342	The satisfaction predicate...
satf0sucom 35343	The satisfaction predicate...
satf00 35344	The value of the satisfact...
satf0suclem 35345	Lemma for ~ satf0suc , ~ s...
satf0suc 35346	The value of the satisfact...
satf0op 35347	An element of a value of t...
satf0n0 35348	The value of the satisfact...
sat1el2xp 35349	The first component of an ...
fmlafv 35350	The valid Godel formulas o...
fmla 35351	The set of all valid Godel...
fmla0 35352	The valid Godel formulas o...
fmla0xp 35353	The valid Godel formulas o...
fmlasuc0 35354	The valid Godel formulas o...
fmlafvel 35355	A class is a valid Godel f...
fmlasuc 35356	The valid Godel formulas o...
fmla1 35357	The valid Godel formulas o...
isfmlasuc 35358	The characterization of a ...
fmlasssuc 35359	The Godel formulas of heig...
fmlaomn0 35360	The empty set is not a God...
fmlan0 35361	The empty set is not a God...
gonan0 35362	The "Godel-set of NAND" is...
goaln0 35363	The "Godel-set of universa...
gonarlem 35364	Lemma for ~ gonar (inducti...
gonar 35365	If the "Godel-set of NAND"...
goalrlem 35366	Lemma for ~ goalr (inducti...
goalr 35367	If the "Godel-set of unive...
fmla0disjsuc 35368	The set of valid Godel for...
fmlasucdisj 35369	The valid Godel formulas o...
satfdmfmla 35370	The domain of the satisfac...
satffunlem 35371	Lemma for ~ satffunlem1lem...
satffunlem1lem1 35372	Lemma for ~ satffunlem1 . ...
satffunlem1lem2 35373	Lemma 2 for ~ satffunlem1 ...
satffunlem2lem1 35374	Lemma 1 for ~ satffunlem2 ...
dmopab3rexdif 35375	The domain of an ordered p...
satffunlem2lem2 35376	Lemma 2 for ~ satffunlem2 ...
satffunlem1 35377	Lemma 1 for ~ satffun : in...
satffunlem2 35378	Lemma 2 for ~ satffun : in...
satffun 35379	The value of the satisfact...
satff 35380	The satisfaction predicate...
satfun 35381	The satisfaction predicate...
satfvel 35382	An element of the value of...
satfv0fvfmla0 35383	The value of the satisfact...
satefv 35384	The simplified satisfactio...
sate0 35385	The simplified satisfactio...
satef 35386	The simplified satisfactio...
sate0fv0 35387	A simplified satisfaction ...
satefvfmla0 35388	The simplified satisfactio...
sategoelfvb 35389	Characterization of a valu...
sategoelfv 35390	Condition of a valuation `...
ex-sategoelel 35391	Example of a valuation of ...
ex-sategoel 35392	Instance of ~ sategoelfv f...
satfv1fvfmla1 35393	The value of the satisfact...
2goelgoanfmla1 35394	Two Godel-sets of membersh...
satefvfmla1 35395	The simplified satisfactio...
ex-sategoelelomsuc 35396	Example of a valuation of ...
ex-sategoelel12 35397	Example of a valuation of ...
prv 35398	The "proves" relation on a...
elnanelprv 35399	The wff ` ( A e. B -/\ B e...
prv0 35400	Every wff encoded as ` U `...
prv1n 35401	No wff encoded as a Godel-...
mvtval 35470	The set of variable typeco...
mrexval 35471	The set of "raw expression...
mexval 35472	The set of expressions, wh...
mexval2 35473	The set of expressions, wh...
mdvval 35474	The set of disjoint variab...
mvrsval 35475	The set of variables in an...
mvrsfpw 35476	The set of variables in an...
mrsubffval 35477	The substitution of some v...
mrsubfval 35478	The substitution of some v...
mrsubval 35479	The substitution of some v...
mrsubcv 35480	The value of a substituted...
mrsubvr 35481	The value of a substituted...
mrsubff 35482	A substitution is a functi...
mrsubrn 35483	Although it is defined for...
mrsubff1 35484	When restricted to complet...
mrsubff1o 35485	When restricted to complet...
mrsub0 35486	The value of the substitut...
mrsubf 35487	A substitution is a functi...
mrsubccat 35488	Substitution distributes o...
mrsubcn 35489	A substitution does not ch...
elmrsubrn 35490	Characterization of the su...
mrsubco 35491	The composition of two sub...
mrsubvrs 35492	The set of variables in a ...
msubffval 35493	A substitution applied to ...
msubfval 35494	A substitution applied to ...
msubval 35495	A substitution applied to ...
msubrsub 35496	A substitution applied to ...
msubty 35497	The type of a substituted ...
elmsubrn 35498	Characterization of substi...
msubrn 35499	Although it is defined for...
msubff 35500	A substitution is a functi...
msubco 35501	The composition of two sub...
msubf 35502	A substitution is a functi...
mvhfval 35503	Value of the function mapp...
mvhval 35504	Value of the function mapp...
mpstval 35505	A pre-statement is an orde...
elmpst 35506	Property of being a pre-st...
msrfval 35507	Value of the reduct of a p...
msrval 35508	Value of the reduct of a p...
mpstssv 35509	A pre-statement is an orde...
mpst123 35510	Decompose a pre-statement ...
mpstrcl 35511	The elements of a pre-stat...
msrf 35512	The reduct of a pre-statem...
msrrcl 35513	If ` X ` and ` Y ` have th...
mstaval 35514	Value of the set of statem...
msrid 35515	The reduct of a statement ...
msrfo 35516	The reduct of a pre-statem...
mstapst 35517	A statement is a pre-state...
elmsta 35518	Property of being a statem...
ismfs 35519	A formal system is a tuple...
mfsdisj 35520	The constants and variable...
mtyf2 35521	The type function maps var...
mtyf 35522	The type function maps var...
mvtss 35523	The set of variable typeco...
maxsta 35524	An axiom is a statement. ...
mvtinf 35525	Each variable typecode has...
msubff1 35526	When restricted to complet...
msubff1o 35527	When restricted to complet...
mvhf 35528	The function mapping varia...
mvhf1 35529	The function mapping varia...
msubvrs 35530	The set of variables in a ...
mclsrcl 35531	Reverse closure for the cl...
mclsssvlem 35532	Lemma for ~ mclsssv . (Co...
mclsval 35533	The function mapping varia...
mclsssv 35534	The closure of a set of ex...
ssmclslem 35535	Lemma for ~ ssmcls . (Con...
vhmcls 35536	All variable hypotheses ar...
ssmcls 35537	The original expressions a...
ss2mcls 35538	The closure is monotonic u...
mclsax 35539	The closure is closed unde...
mclsind 35540	Induction theorem for clos...
mppspstlem 35541	Lemma for ~ mppspst . (Co...
mppsval 35542	Definition of a provable p...
elmpps 35543	Definition of a provable p...
mppspst 35544	A provable pre-statement i...
mthmval 35545	A theorem is a pre-stateme...
elmthm 35546	A theorem is a pre-stateme...
mthmi 35547	A statement whose reduct i...
mthmsta 35548	A theorem is a pre-stateme...
mppsthm 35549	A provable pre-statement i...
mthmblem 35550	Lemma for ~ mthmb . (Cont...
mthmb 35551	If two statements have the...
mthmpps 35552	Given a theorem, there is ...
mclsppslem 35553	The closure is closed unde...
mclspps 35554	The closure is closed unde...
rexxfr3d 35608	Transfer existential quant...
rexxfr3dALT 35609	Longer proof of ~ rexxfr3d...
rspssbasd 35610	The span of a set of ring ...
ellcsrspsn 35611	Membership in a left coset...
ply1divalg3 35612	Uniqueness of polynomial r...
r1peuqusdeg1 35613	Uniqueness of polynomial r...
problem1 35635	Practice problem 1. Clues...
problem2 35636	Practice problem 2. Clues...
problem3 35637	Practice problem 3. Clues...
problem4 35638	Practice problem 4. Clues...
problem5 35639	Practice problem 5. Clues...
quad3 35640	Variant of quadratic equat...
climuzcnv 35641	Utility lemma to convert b...
sinccvglem 35642	` ( ( sin `` x ) / x ) ~~>...
sinccvg 35643	` ( ( sin `` x ) / x ) ~~>...
circum 35644	The circumference of a cir...
elfzm12 35645	Membership in a curtailed ...
nn0seqcvg 35646	A strictly-decreasing nonn...
lediv2aALT 35647	Division of both sides of ...
abs2sqlei 35648	The absolute values of two...
abs2sqlti 35649	The absolute values of two...
abs2sqle 35650	The absolute values of two...
abs2sqlt 35651	The absolute values of two...
abs2difi 35652	Difference of absolute val...
abs2difabsi 35653	Absolute value of differen...
2thALT 35654	Alternate proof of ~ 2th ....
orbi2iALT 35655	Alternate proof of ~ orbi2...
pm3.48ALT 35656	Alternate proof of ~ pm3.4...
3jcadALT 35657	Alternate proof of ~ 3jcad...
currybi 35658	Biconditional version of C...
axextprim 35665	~ ax-ext without distinct ...
axrepprim 35666	~ ax-rep without distinct ...
axunprim 35667	~ ax-un without distinct v...
axpowprim 35668	~ ax-pow without distinct ...
axregprim 35669	~ ax-reg without distinct ...
axinfprim 35670	~ ax-inf without distinct ...
axacprim 35671	~ ax-ac without distinct v...
untelirr 35672	We call a class "untanged"...
untuni 35673	The union of a class is un...
untsucf 35674	If a class is untangled, t...
unt0 35675	The null set is untangled....
untint 35676	If there is an untangled e...
efrunt 35677	If ` A ` is well-founded b...
untangtr 35678	A transitive class is unta...
3jaodd 35679	Double deduction form of ~...
3orit 35680	Closed form of ~ 3ori . (...
biimpexp 35681	A biconditional in the ant...
nepss 35682	Two classes are unequal if...
3ccased 35683	Triple disjunction form of...
dfso3 35684	Expansion of the definitio...
brtpid1 35685	A binary relation involvin...
brtpid2 35686	A binary relation involvin...
brtpid3 35687	A binary relation involvin...
iota5f 35688	A method for computing iot...
jath 35689	Closed form of ~ ja . Pro...
xpab 35690	Cartesian product of two c...
nnuni 35691	The union of a finite ordi...
sqdivzi 35692	Distribution of square ove...
supfz 35693	The supremum of a finite s...
inffz 35694	The infimum of a finite se...
fz0n 35695	The sequence ` ( 0 ... ( N...
shftvalg 35696	Value of a sequence shifte...
divcnvlin 35697	Limit of the ratio of two ...
climlec3 35698	Comparison of a constant t...
iexpire 35699	` _i ` raised to itself is...
bcneg1 35700	The binomial coefficient o...
bcm1nt 35701	The proportion of one bino...
bcprod 35702	A product identity for bin...
bccolsum 35703	A column-sum rule for bino...
iprodefisumlem 35704	Lemma for ~ iprodefisum . ...
iprodefisum 35705	Applying the exponential f...
iprodgam 35706	An infinite product versio...
faclimlem1 35707	Lemma for ~ faclim . Clos...
faclimlem2 35708	Lemma for ~ faclim . Show...
faclimlem3 35709	Lemma for ~ faclim . Alge...
faclim 35710	An infinite product expres...
iprodfac 35711	An infinite product expres...
faclim2 35712	Another factorial limit du...
gcd32 35713	Swap the second and third ...
gcdabsorb 35714	Absorption law for gcd. (...
dftr6 35715	A potential definition of ...
coep 35716	Composition with the membe...
coepr 35717	Composition with the conve...
dffr5 35718	A quantifier-free definiti...
dfso2 35719	Quantifier-free definition...
br8 35720	Substitution for an eight-...
br6 35721	Substitution for a six-pla...
br4 35722	Substitution for a four-pl...
cnvco1 35723	Another distributive law o...
cnvco2 35724	Another distributive law o...
eldm3 35725	Quantifier-free definition...
elrn3 35726	Quantifier-free definition...
pocnv 35727	The converse of a partial ...
socnv 35728	The converse of a strict o...
sotrd 35729	Transitivity law for stric...
elintfv 35730	Membership in an intersect...
funpsstri 35731	A condition for subset tri...
fundmpss 35732	If a class ` F ` is a prop...
funsseq 35733	Given two functions with e...
fununiq 35734	The uniqueness condition o...
funbreq 35735	An equality condition for ...
br1steq 35736	Uniqueness condition for t...
br2ndeq 35737	Uniqueness condition for t...
dfdm5 35738	Definition of domain in te...
dfrn5 35739	Definition of range in ter...
opelco3 35740	Alternate way of saying th...
elima4 35741	Quantifier-free expression...
fv1stcnv 35742	The value of the converse ...
fv2ndcnv 35743	The value of the converse ...
setinds 35744	Principle of set induction...
setinds2f 35745	` _E ` induction schema, u...
setinds2 35746	` _E ` induction schema, u...
elpotr 35747	A class of transitive sets...
dford5reg 35748	Given ~ ax-reg , an ordina...
dfon2lem1 35749	Lemma for ~ dfon2 . (Cont...
dfon2lem2 35750	Lemma for ~ dfon2 . (Cont...
dfon2lem3 35751	Lemma for ~ dfon2 . All s...
dfon2lem4 35752	Lemma for ~ dfon2 . If tw...
dfon2lem5 35753	Lemma for ~ dfon2 . Two s...
dfon2lem6 35754	Lemma for ~ dfon2 . A tra...
dfon2lem7 35755	Lemma for ~ dfon2 . All e...
dfon2lem8 35756	Lemma for ~ dfon2 . The i...
dfon2lem9 35757	Lemma for ~ dfon2 . A cla...
dfon2 35758	` On ` consists of all set...
rdgprc0 35759	The value of the recursive...
rdgprc 35760	The value of the recursive...
dfrdg2 35761	Alternate definition of th...
dfrdg3 35762	Generalization of ~ dfrdg2...
axextdfeq 35763	A version of ~ ax-ext for ...
ax8dfeq 35764	A version of ~ ax-8 for us...
axextdist 35765	~ ax-ext with distinctors ...
axextbdist 35766	~ axextb with distinctors ...
19.12b 35767	Version of ~ 19.12vv with ...
exnel 35768	There is always a set not ...
distel 35769	Distinctors in terms of me...
axextndbi 35770	~ axextnd as a bicondition...
hbntg 35771	A more general form of ~ h...
hbimtg 35772	A more general and closed ...
hbaltg 35773	A more general and closed ...
hbng 35774	A more general form of ~ h...
hbimg 35775	A more general form of ~ h...
wsuceq123 35780	Equality theorem for well-...
wsuceq1 35781	Equality theorem for well-...
wsuceq2 35782	Equality theorem for well-...
wsuceq3 35783	Equality theorem for well-...
nfwsuc 35784	Bound-variable hypothesis ...
wlimeq12 35785	Equality theorem for the l...
wlimeq1 35786	Equality theorem for the l...
wlimeq2 35787	Equality theorem for the l...
nfwlim 35788	Bound-variable hypothesis ...
elwlim 35789	Membership in the limit cl...
wzel 35790	The zero of a well-founded...
wsuclem 35791	Lemma for the supremum pro...
wsucex 35792	Existence theorem for well...
wsuccl 35793	If ` X ` is a set with an ...
wsuclb 35794	A well-founded successor i...
wlimss 35795	The class of limit points ...
txpss3v 35844	A tail Cartesian product i...
txprel 35845	A tail Cartesian product i...
brtxp 35846	Characterize a ternary rel...
brtxp2 35847	The binary relation over a...
dfpprod2 35848	Expanded definition of par...
pprodcnveq 35849	A converse law for paralle...
pprodss4v 35850	The parallel product is a ...
brpprod 35851	Characterize a quaternary ...
brpprod3a 35852	Condition for parallel pro...
brpprod3b 35853	Condition for parallel pro...
relsset 35854	The subset class is a bina...
brsset 35855	For sets, the ` SSet ` bin...
idsset 35856	` _I ` is equal to the int...
eltrans 35857	Membership in the class of...
dfon3 35858	A quantifier-free definiti...
dfon4 35859	Another quantifier-free de...
brtxpsd 35860	Expansion of a common form...
brtxpsd2 35861	Another common abbreviatio...
brtxpsd3 35862	A third common abbreviatio...
relbigcup 35863	The ` Bigcup ` relationshi...
brbigcup 35864	Binary relation over ` Big...
dfbigcup2 35865	` Bigcup ` using maps-to n...
fobigcup 35866	` Bigcup ` maps the univer...
fnbigcup 35867	` Bigcup ` is a function o...
fvbigcup 35868	For sets, ` Bigcup ` yield...
elfix 35869	Membership in the fixpoint...
elfix2 35870	Alternative membership in ...
dffix2 35871	The fixpoints of a class i...
fixssdm 35872	The fixpoints of a class a...
fixssrn 35873	The fixpoints of a class a...
fixcnv 35874	The fixpoints of a class a...
fixun 35875	The fixpoint operator dist...
ellimits 35876	Membership in the class of...
limitssson 35877	The class of all limit ord...
dfom5b 35878	A quantifier-free definiti...
sscoid 35879	A condition for subset and...
dffun10 35880	Another potential definiti...
elfuns 35881	Membership in the class of...
elfunsg 35882	Closed form of ~ elfuns . ...
brsingle 35883	The binary relation form o...
elsingles 35884	Membership in the class of...
fnsingle 35885	The singleton relationship...
fvsingle 35886	The value of the singleton...
dfsingles2 35887	Alternate definition of th...
snelsingles 35888	A singleton is a member of...
dfiota3 35889	A definition of iota using...
dffv5 35890	Another quantifier-free de...
unisnif 35891	Express union of singleton...
brimage 35892	Binary relation form of th...
brimageg 35893	Closed form of ~ brimage ....
funimage 35894	` Image A ` is a function....
fnimage 35895	` Image R ` is a function ...
imageval 35896	The image functor in maps-...
fvimage 35897	Value of the image functor...
brcart 35898	Binary relation form of th...
brdomain 35899	Binary relation form of th...
brrange 35900	Binary relation form of th...
brdomaing 35901	Closed form of ~ brdomain ...
brrangeg 35902	Closed form of ~ brrange ....
brimg 35903	Binary relation form of th...
brapply 35904	Binary relation form of th...
brcup 35905	Binary relation form of th...
brcap 35906	Binary relation form of th...
brsuccf 35907	Binary relation form of th...
funpartlem 35908	Lemma for ~ funpartfun . ...
funpartfun 35909	The functional part of ` F...
funpartss 35910	The functional part of ` F...
funpartfv 35911	The function value of the ...
fullfunfnv 35912	The full functional part o...
fullfunfv 35913	The function value of the ...
brfullfun 35914	A binary relation form con...
brrestrict 35915	Binary relation form of th...
dfrecs2 35916	A quantifier-free definiti...
dfrdg4 35917	A quantifier-free definiti...
dfint3 35918	Quantifier-free definition...
imagesset 35919	The Image functor applied ...
brub 35920	Binary relation form of th...
brlb 35921	Binary relation form of th...
altopex 35926	Alternative ordered pairs ...
altopthsn 35927	Two alternate ordered pair...
altopeq12 35928	Equality for alternate ord...
altopeq1 35929	Equality for alternate ord...
altopeq2 35930	Equality for alternate ord...
altopth1 35931	Equality of the first memb...
altopth2 35932	Equality of the second mem...
altopthg 35933	Alternate ordered pair the...
altopthbg 35934	Alternate ordered pair the...
altopth 35935	The alternate ordered pair...
altopthb 35936	Alternate ordered pair the...
altopthc 35937	Alternate ordered pair the...
altopthd 35938	Alternate ordered pair the...
altxpeq1 35939	Equality for alternate Car...
altxpeq2 35940	Equality for alternate Car...
elaltxp 35941	Membership in alternate Ca...
altopelaltxp 35942	Alternate ordered pair mem...
altxpsspw 35943	An inclusion rule for alte...
altxpexg 35944	The alternate Cartesian pr...
rankaltopb 35945	Compute the rank of an alt...
nfaltop 35946	Bound-variable hypothesis ...
sbcaltop 35947	Distribution of class subs...
cgrrflx2d 35950	Deduction form of ~ axcgrr...
cgrtr4d 35951	Deduction form of ~ axcgrt...
cgrtr4and 35952	Deduction form of ~ axcgrt...
cgrrflx 35953	Reflexivity law for congru...
cgrrflxd 35954	Deduction form of ~ cgrrfl...
cgrcomim 35955	Congruence commutes on the...
cgrcom 35956	Congruence commutes betwee...
cgrcomand 35957	Deduction form of ~ cgrcom...
cgrtr 35958	Transitivity law for congr...
cgrtrand 35959	Deduction form of ~ cgrtr ...
cgrtr3 35960	Transitivity law for congr...
cgrtr3and 35961	Deduction form of ~ cgrtr3...
cgrcoml 35962	Congruence commutes on the...
cgrcomr 35963	Congruence commutes on the...
cgrcomlr 35964	Congruence commutes on bot...
cgrcomland 35965	Deduction form of ~ cgrcom...
cgrcomrand 35966	Deduction form of ~ cgrcom...
cgrcomlrand 35967	Deduction form of ~ cgrcom...
cgrtriv 35968	Degenerate segments are co...
cgrid2 35969	Identity law for congruenc...
cgrdegen 35970	Two congruent segments are...
brofs 35971	Binary relation form of th...
5segofs 35972	Rephrase ~ ax5seg using th...
ofscom 35973	The outer five segment pre...
cgrextend 35974	Link congruence over a pai...
cgrextendand 35975	Deduction form of ~ cgrext...
segconeq 35976	Two points that satisfy th...
segconeu 35977	Existential uniqueness ver...
btwntriv2 35978	Betweenness always holds f...
btwncomim 35979	Betweenness commutes. Imp...
btwncom 35980	Betweenness commutes. (Co...
btwncomand 35981	Deduction form of ~ btwnco...
btwntriv1 35982	Betweenness always holds f...
btwnswapid 35983	If you can swap the first ...
btwnswapid2 35984	If you can swap arguments ...
btwnintr 35985	Inner transitivity law for...
btwnexch3 35986	Exchange the first endpoin...
btwnexch3and 35987	Deduction form of ~ btwnex...
btwnouttr2 35988	Outer transitivity law for...
btwnexch2 35989	Exchange the outer point o...
btwnouttr 35990	Outer transitivity law for...
btwnexch 35991	Outer transitivity law for...
btwnexchand 35992	Deduction form of ~ btwnex...
btwndiff 35993	There is always a ` c ` di...
trisegint 35994	A line segment between two...
funtransport 35997	The ` TransportTo ` relati...
fvtransport 35998	Calculate the value of the...
transportcl 35999	Closure law for segment tr...
transportprops 36000	Calculate the defining pro...
brifs 36009	Binary relation form of th...
ifscgr 36010	Inner five segment congrue...
cgrsub 36011	Removing identical parts f...
brcgr3 36012	Binary relation form of th...
cgr3permute3 36013	Permutation law for three-...
cgr3permute1 36014	Permutation law for three-...
cgr3permute2 36015	Permutation law for three-...
cgr3permute4 36016	Permutation law for three-...
cgr3permute5 36017	Permutation law for three-...
cgr3tr4 36018	Transitivity law for three...
cgr3com 36019	Commutativity law for thre...
cgr3rflx 36020	Identity law for three-pla...
cgrxfr 36021	A line segment can be divi...
btwnxfr 36022	A condition for extending ...
colinrel 36023	Colinearity is a relations...
brcolinear2 36024	Alternate colinearity bina...
brcolinear 36025	The binary relation form o...
colinearex 36026	The colinear predicate exi...
colineardim1 36027	If ` A ` is colinear with ...
colinearperm1 36028	Permutation law for coline...
colinearperm3 36029	Permutation law for coline...
colinearperm2 36030	Permutation law for coline...
colinearperm4 36031	Permutation law for coline...
colinearperm5 36032	Permutation law for coline...
colineartriv1 36033	Trivial case of colinearit...
colineartriv2 36034	Trivial case of colinearit...
btwncolinear1 36035	Betweenness implies coline...
btwncolinear2 36036	Betweenness implies coline...
btwncolinear3 36037	Betweenness implies coline...
btwncolinear4 36038	Betweenness implies coline...
btwncolinear5 36039	Betweenness implies coline...
btwncolinear6 36040	Betweenness implies coline...
colinearxfr 36041	Transfer law for colineari...
lineext 36042	Extend a line with a missi...
brofs2 36043	Change some conditions for...
brifs2 36044	Change some conditions for...
brfs 36045	Binary relation form of th...
fscgr 36046	Congruence law for the gen...
linecgr 36047	Congruence rule for lines....
linecgrand 36048	Deduction form of ~ linecg...
lineid 36049	Identity law for points on...
idinside 36050	Law for finding a point in...
endofsegid 36051	If ` A ` , ` B ` , and ` C...
endofsegidand 36052	Deduction form of ~ endofs...
btwnconn1lem1 36053	Lemma for ~ btwnconn1 . T...
btwnconn1lem2 36054	Lemma for ~ btwnconn1 . N...
btwnconn1lem3 36055	Lemma for ~ btwnconn1 . E...
btwnconn1lem4 36056	Lemma for ~ btwnconn1 . A...
btwnconn1lem5 36057	Lemma for ~ btwnconn1 . N...
btwnconn1lem6 36058	Lemma for ~ btwnconn1 . N...
btwnconn1lem7 36059	Lemma for ~ btwnconn1 . U...
btwnconn1lem8 36060	Lemma for ~ btwnconn1 . N...
btwnconn1lem9 36061	Lemma for ~ btwnconn1 . N...
btwnconn1lem10 36062	Lemma for ~ btwnconn1 . N...
btwnconn1lem11 36063	Lemma for ~ btwnconn1 . N...
btwnconn1lem12 36064	Lemma for ~ btwnconn1 . U...
btwnconn1lem13 36065	Lemma for ~ btwnconn1 . B...
btwnconn1lem14 36066	Lemma for ~ btwnconn1 . F...
btwnconn1 36067	Connectitivy law for betwe...
btwnconn2 36068	Another connectivity law f...
btwnconn3 36069	Inner connectivity law for...
midofsegid 36070	If two points fall in the ...
segcon2 36071	Generalization of ~ axsegc...
brsegle 36074	Binary relation form of th...
brsegle2 36075	Alternate characterization...
seglecgr12im 36076	Substitution law for segme...
seglecgr12 36077	Substitution law for segme...
seglerflx 36078	Segment comparison is refl...
seglemin 36079	Any segment is at least as...
segletr 36080	Segment less than is trans...
segleantisym 36081	Antisymmetry law for segme...
seglelin 36082	Linearity law for segment ...
btwnsegle 36083	If ` B ` falls between ` A...
colinbtwnle 36084	Given three colinear point...
broutsideof 36087	Binary relation form of ` ...
broutsideof2 36088	Alternate form of ` Outsid...
outsidene1 36089	Outsideness implies inequa...
outsidene2 36090	Outsideness implies inequa...
btwnoutside 36091	A principle linking outsid...
broutsideof3 36092	Characterization of outsid...
outsideofrflx 36093	Reflexivity of outsideness...
outsideofcom 36094	Commutativity law for outs...
outsideoftr 36095	Transitivity law for outsi...
outsideofeq 36096	Uniqueness law for ` Outsi...
outsideofeu 36097	Given a nondegenerate ray,...
outsidele 36098	Relate ` OutsideOf ` to ` ...
outsideofcol 36099	Outside of implies colinea...
funray 36106	Show that the ` Ray ` rela...
fvray 36107	Calculate the value of the...
funline 36108	Show that the ` Line ` rel...
linedegen 36109	When ` Line ` is applied w...
fvline 36110	Calculate the value of the...
liness 36111	A line is a subset of the ...
fvline2 36112	Alternate definition of a ...
lineunray 36113	A line is composed of a po...
lineelsb2 36114	If ` S ` lies on ` P Q ` ,...
linerflx1 36115	Reflexivity law for line m...
linecom 36116	Commutativity law for line...
linerflx2 36117	Reflexivity law for line m...
ellines 36118	Membership in the set of a...
linethru 36119	If ` A ` is a line contain...
hilbert1.1 36120	There is a line through an...
hilbert1.2 36121	There is at most one line ...
linethrueu 36122	There is a unique line goi...
lineintmo 36123	Two distinct lines interse...
fwddifval 36128	Calculate the value of the...
fwddifnval 36129	The value of the forward d...
fwddifn0 36130	The value of the n-iterate...
fwddifnp1 36131	The value of the n-iterate...
rankung 36132	The rank of the union of t...
ranksng 36133	The rank of a singleton. ...
rankelg 36134	The membership relation is...
rankpwg 36135	The rank of a power set. ...
rank0 36136	The rank of the empty set ...
rankeq1o 36137	The only set with rank ` 1...
elhf 36140	Membership in the heredita...
elhf2 36141	Alternate form of membersh...
elhf2g 36142	Hereditarily finiteness vi...
0hf 36143	The empty set is a heredit...
hfun 36144	The union of two HF sets i...
hfsn 36145	The singleton of an HF set...
hfadj 36146	Adjoining one HF element t...
hfelhf 36147	Any member of an HF set is...
hftr 36148	The class of all hereditar...
hfext 36149	Extensionality for HF sets...
hfuni 36150	The union of an HF set is ...
hfpw 36151	The power class of an HF s...
hfninf 36152	` _om ` is not hereditaril...
rmoeqi 36153	Equality inference for res...
rmoeqbii 36154	Equality inference for res...
reueqi 36155	Equality inference for res...
reueqbii 36156	Equality inference for res...
sbceqbii 36157	Formula-building inference...
disjeq1i 36158	Equality theorem for disjo...
disjeq12i 36159	Equality theorem for disjo...
rabeqbii 36160	Equality theorem for restr...
iuneq12i 36161	Equality theorem for index...
iineq1i 36162	Equality theorem for index...
iineq12i 36163	Equality theorem for index...
riotaeqbii 36164	Equivalent wff's and equal...
riotaeqi 36165	Equal domains yield equal ...
ixpeq1i 36166	Equality inference for inf...
ixpeq12i 36167	Equality inference for inf...
sumeq2si 36168	Equality inference for sum...
sumeq12si 36169	Equality inference for sum...
prodeq2si 36170	Equality inference for pro...
prodeq12si 36171	Equality inference for pro...
itgeq12i 36172	Equality inference for an ...
itgeq1i 36173	Equality inference for an ...
itgeq2i 36174	Equality inference for an ...
ditgeq123i 36175	Equality inference for the...
ditgeq12i 36176	Equality inference for the...
ditgeq3i 36177	Equality inference for the...
rmoeqdv 36178	Formula-building rule for ...
rmoeqbidv 36179	Formula-building rule for ...
reueqdv 36180	Formula-building rule for ...
reueqbidv 36181	Formula-building rule for ...
sbequbidv 36182	Deduction substituting bot...
disjeq12dv 36183	Equality theorem for disjo...
ixpeq12dv 36184	Equality theorem for infin...
sumeq12sdv 36185	Equality deduction for sum...
prodeq12sdv 36186	Equality deduction for pro...
itgeq12sdv 36187	Equality theorem for an in...
itgeq2sdv 36188	Equality theorem for an in...
ditgeq123dv 36189	Equality theorem for the d...
ditgeq12d 36190	Equality theorem for the d...
ditgeq3sdv 36191	Equality theorem for the d...
in-ax8 36192	A proof of ~ ax-8 that doe...
ss-ax8 36193	A proof of ~ ax-8 that doe...
cbvralvw2 36194	Change bound variable and ...
cbvrexvw2 36195	Change bound variable and ...
cbvrmovw2 36196	Change bound variable and ...
cbvreuvw2 36197	Change bound variable and ...
cbvsbcvw2 36198	Change bound variable of a...
cbvcsbvw2 36199	Change bound variable of a...
cbviunvw2 36200	Change bound variable and ...
cbviinvw2 36201	Change bound variable and ...
cbvmptvw2 36202	Change bound variable and ...
cbvdisjvw2 36203	Change bound variable and ...
cbvriotavw2 36204	Change bound variable and ...
cbvoprab1vw 36205	Change the first bound var...
cbvoprab2vw 36206	Change the second bound va...
cbvoprab123vw 36207	Change all bound variables...
cbvoprab23vw 36208	Change the second and thir...
cbvoprab13vw 36209	Change the first and third...
cbvmpovw2 36210	Change bound variables and...
cbvmpo1vw2 36211	Change domains and the fir...
cbvmpo2vw2 36212	Change domains and the sec...
cbvixpvw2 36213	Change bound variable and ...
cbvsumvw2 36214	Change bound variable and ...
cbvprodvw2 36215	Change bound variable and ...
cbvitgvw2 36216	Change bound variable and ...
cbvditgvw2 36217	Change bound variable and ...
cbvmodavw 36218	Change bound variable in t...
cbveudavw 36219	Change bound variable in t...
cbvrmodavw 36220	Change bound variable in t...
cbvreudavw 36221	Change bound variable in t...
cbvsbdavw 36222	Change bound variable in p...
cbvsbdavw2 36223	Change bound variable in p...
cbvabdavw 36224	Change bound variable in c...
cbvsbcdavw 36225	Change bound variable of a...
cbvsbcdavw2 36226	Change bound variable of a...
cbvcsbdavw 36227	Change bound variable of a...
cbvcsbdavw2 36228	Change bound variable of a...
cbvrabdavw 36229	Change bound variable in r...
cbviundavw 36230	Change bound variable in i...
cbviindavw 36231	Change bound variable in i...
cbvopab1davw 36232	Change the first bound var...
cbvopab2davw 36233	Change the second bound va...
cbvopabdavw 36234	Change bound variables in ...
cbvmptdavw 36235	Change bound variable in a...
cbvdisjdavw 36236	Change bound variable in a...
cbviotadavw 36237	Change bound variable in a...
cbvriotadavw 36238	Change bound variable in a...
cbvoprab1davw 36239	Change the first bound var...
cbvoprab2davw 36240	Change the second bound va...
cbvoprab3davw 36241	Change the third bound var...
cbvoprab123davw 36242	Change all bound variables...
cbvoprab12davw 36243	Change the first and secon...
cbvoprab23davw 36244	Change the second and thir...
cbvoprab13davw 36245	Change the first and third...
cbvixpdavw 36246	Change bound variable in a...
cbvsumdavw 36247	Change bound variable in a...
cbvproddavw 36248	Change bound variable in a...
cbvitgdavw 36249	Change bound variable in a...
cbvditgdavw 36250	Change bound variable in a...
cbvrmodavw2 36251	Change bound variable and ...
cbvreudavw2 36252	Change bound variable and ...
cbvrabdavw2 36253	Change bound variable and ...
cbviundavw2 36254	Change bound variable and ...
cbviindavw2 36255	Change bound variable and ...
cbvmptdavw2 36256	Change bound variable and ...
cbvdisjdavw2 36257	Change bound variable and ...
cbvriotadavw2 36258	Change bound variable and ...
cbvmpodavw2 36259	Change bound variable and ...
cbvmpo1davw2 36260	Change first bound variabl...
cbvmpo2davw2 36261	Change second bound variab...
cbvixpdavw2 36262	Change bound variable and ...
cbvsumdavw2 36263	Change bound variable and ...
cbvproddavw2 36264	Change bound variable and ...
cbvitgdavw2 36265	Change bound variable and ...
cbvditgdavw2 36266	Change bound variable and ...
mpomulnzcnf 36267	Multiplication maps nonzer...
a1i14 36268	Add two antecedents to a w...
a1i24 36269	Add two antecedents to a w...
exp5d 36270	An exportation inference. ...
exp5g 36271	An exportation inference. ...
exp5k 36272	An exportation inference. ...
exp56 36273	An exportation inference. ...
exp58 36274	An exportation inference. ...
exp510 36275	An exportation inference. ...
exp511 36276	An exportation inference. ...
exp512 36277	An exportation inference. ...
3com12d 36278	Commutation in consequent....
imp5p 36279	A triple importation infer...
imp5q 36280	A triple importation infer...
ecase13d 36281	Deduction for elimination ...
subtr 36282	Transitivity of implicit s...
subtr2 36283	Transitivity of implicit s...
trer 36284	A relation intersected wit...
elicc3 36285	An equivalent membership c...
finminlem 36286	A useful lemma about finit...
gtinf 36287	Any number greater than an...
opnrebl 36288	A set is open in the stand...
opnrebl2 36289	A set is open in the stand...
nn0prpwlem 36290	Lemma for ~ nn0prpw . Use...
nn0prpw 36291	Two nonnegative integers a...
topbnd 36292	Two equivalent expressions...
opnbnd 36293	A set is open iff it is di...
cldbnd 36294	A set is closed iff it con...
ntruni 36295	A union of interiors is a ...
clsun 36296	A pairwise union of closur...
clsint2 36297	The closure of an intersec...
opnregcld 36298	A set is regularly closed ...
cldregopn 36299	A set if regularly open if...
neiin 36300	Two neighborhoods intersec...
hmeoclda 36301	Homeomorphisms preserve cl...
hmeocldb 36302	Homeomorphisms preserve cl...
ivthALT 36303	An alternate proof of the ...
fnerel 36306	Fineness is a relation. (...
isfne 36307	The predicate " ` B ` is f...
isfne4 36308	The predicate " ` B ` is f...
isfne4b 36309	A condition for a topology...
isfne2 36310	The predicate " ` B ` is f...
isfne3 36311	The predicate " ` B ` is f...
fnebas 36312	A finer cover covers the s...
fnetg 36313	A finer cover generates a ...
fnessex 36314	If ` B ` is finer than ` A...
fneuni 36315	If ` B ` is finer than ` A...
fneint 36316	If a cover is finer than a...
fness 36317	A cover is finer than its ...
fneref 36318	Reflexivity of the finenes...
fnetr 36319	Transitivity of the finene...
fneval 36320	Two covers are finer than ...
fneer 36321	Fineness intersected with ...
topfne 36322	Fineness for covers corres...
topfneec 36323	A cover is equivalent to a...
topfneec2 36324	A topology is precisely id...
fnessref 36325	A cover is finer iff it ha...
refssfne 36326	A cover is a refinement if...
neibastop1 36327	A collection of neighborho...
neibastop2lem 36328	Lemma for ~ neibastop2 . ...
neibastop2 36329	In the topology generated ...
neibastop3 36330	The topology generated by ...
topmtcl 36331	The meet of a collection o...
topmeet 36332	Two equivalent formulation...
topjoin 36333	Two equivalent formulation...
fnemeet1 36334	The meet of a collection o...
fnemeet2 36335	The meet of equivalence cl...
fnejoin1 36336	Join of equivalence classe...
fnejoin2 36337	Join of equivalence classe...
fgmin 36338	Minimality property of a g...
neifg 36339	The neighborhood filter of...
tailfval 36340	The tail function for a di...
tailval 36341	The tail of an element in ...
eltail 36342	An element of a tail. (Co...
tailf 36343	The tail function of a dir...
tailini 36344	A tail contains its initia...
tailfb 36345	The collection of tails of...
filnetlem1 36346	Lemma for ~ filnet . Chan...
filnetlem2 36347	Lemma for ~ filnet . The ...
filnetlem3 36348	Lemma for ~ filnet . (Con...
filnetlem4 36349	Lemma for ~ filnet . (Con...
filnet 36350	A filter has the same conv...
tb-ax1 36351	The first of three axioms ...
tb-ax2 36352	The second of three axioms...
tb-ax3 36353	The third of three axioms ...
tbsyl 36354	The weak syllogism from Ta...
re1ax2lem 36355	Lemma for ~ re1ax2 . (Con...
re1ax2 36356	~ ax-2 rederived from the ...
naim1 36357	Constructor theorem for ` ...
naim2 36358	Constructor theorem for ` ...
naim1i 36359	Constructor rule for ` -/\...
naim2i 36360	Constructor rule for ` -/\...
naim12i 36361	Constructor rule for ` -/\...
nabi1i 36362	Constructor rule for ` -/\...
nabi2i 36363	Constructor rule for ` -/\...
nabi12i 36364	Constructor rule for ` -/\...
df3nandALT1 36367	The double nand expressed ...
df3nandALT2 36368	The double nand expressed ...
andnand1 36369	Double and in terms of dou...
imnand2 36370	An ` -> ` nand relation. ...
nalfal 36371	Not all sets hold ` F. ` a...
nexntru 36372	There does not exist a set...
nexfal 36373	There does not exist a set...
neufal 36374	There does not exist exact...
neutru 36375	There does not exist exact...
nmotru 36376	There does not exist at mo...
mofal 36377	There exist at most one se...
nrmo 36378	"At most one" restricted e...
meran1 36379	A single axiom for proposi...
meran2 36380	A single axiom for proposi...
meran3 36381	A single axiom for proposi...
waj-ax 36382	A single axiom for proposi...
lukshef-ax2 36383	A single axiom for proposi...
arg-ax 36384	A single axiom for proposi...
negsym1 36385	In the paper "On Variable ...
imsym1 36386	A symmetry with ` -> ` . ...
bisym1 36387	A symmetry with ` <-> ` . ...
consym1 36388	A symmetry with ` /\ ` . ...
dissym1 36389	A symmetry with ` \/ ` . ...
nandsym1 36390	A symmetry with ` -/\ ` . ...
unisym1 36391	A symmetry with ` A. ` . ...
exisym1 36392	A symmetry with ` E. ` . ...
unqsym1 36393	A symmetry with ` E! ` . ...
amosym1 36394	A symmetry with ` E* ` . ...
subsym1 36395	A symmetry with ` [ x / y ...
ontopbas 36396	An ordinal number is a top...
onsstopbas 36397	The class of ordinal numbe...
onpsstopbas 36398	The class of ordinal numbe...
ontgval 36399	The topology generated fro...
ontgsucval 36400	The topology generated fro...
onsuctop 36401	A successor ordinal number...
onsuctopon 36402	One of the topologies on a...
ordtoplem 36403	Membership of the class of...
ordtop 36404	An ordinal is a topology i...
onsucconni 36405	A successor ordinal number...
onsucconn 36406	A successor ordinal number...
ordtopconn 36407	An ordinal topology is con...
onintopssconn 36408	An ordinal topology is con...
onsuct0 36409	A successor ordinal number...
ordtopt0 36410	An ordinal topology is T_0...
onsucsuccmpi 36411	The successor of a success...
onsucsuccmp 36412	The successor of a success...
limsucncmpi 36413	The successor of a limit o...
limsucncmp 36414	The successor of a limit o...
ordcmp 36415	An ordinal topology is com...
ssoninhaus 36416	The ordinal topologies ` 1...
onint1 36417	The ordinal T_1 spaces are...
oninhaus 36418	The ordinal Hausdorff spac...
fveleq 36419	Please add description her...
findfvcl 36420	Please add description her...
findreccl 36421	Please add description her...
findabrcl 36422	Please add description her...
nnssi2 36423	Convert a theorem for real...
nnssi3 36424	Convert a theorem for real...
nndivsub 36425	Please add description her...
nndivlub 36426	A factor of a positive int...
ee7.2aOLD 36429	Lemma for Euclid's Element...
weiunlem1 36430	Lemma for ~ weiunpo , ~ we...
weiunlem2 36431	Lemma for ~ weiunpo , ~ we...
weiunfrlem 36432	Lemma for ~ weiunfr . (Co...
weiunpo 36433	A partial ordering on an i...
weiunso 36434	A strict ordering on an in...
weiunfr 36435	A well-founded relation on...
weiunse 36436	The relation constructed i...
weiunwe 36437	A well-ordering on an inde...
numiunnum 36438	An indexed union of sets i...
dnival 36439	Value of the "distance to ...
dnicld1 36440	Closure theorem for the "d...
dnicld2 36441	Closure theorem for the "d...
dnif 36442	The "distance to nearest i...
dnizeq0 36443	The distance to nearest in...
dnizphlfeqhlf 36444	The distance to nearest in...
rddif2 36445	Variant of ~ rddif . (Con...
dnibndlem1 36446	Lemma for ~ dnibnd . (Con...
dnibndlem2 36447	Lemma for ~ dnibnd . (Con...
dnibndlem3 36448	Lemma for ~ dnibnd . (Con...
dnibndlem4 36449	Lemma for ~ dnibnd . (Con...
dnibndlem5 36450	Lemma for ~ dnibnd . (Con...
dnibndlem6 36451	Lemma for ~ dnibnd . (Con...
dnibndlem7 36452	Lemma for ~ dnibnd . (Con...
dnibndlem8 36453	Lemma for ~ dnibnd . (Con...
dnibndlem9 36454	Lemma for ~ dnibnd . (Con...
dnibndlem10 36455	Lemma for ~ dnibnd . (Con...
dnibndlem11 36456	Lemma for ~ dnibnd . (Con...
dnibndlem12 36457	Lemma for ~ dnibnd . (Con...
dnibndlem13 36458	Lemma for ~ dnibnd . (Con...
dnibnd 36459	The "distance to nearest i...
dnicn 36460	The "distance to nearest i...
knoppcnlem1 36461	Lemma for ~ knoppcn . (Co...
knoppcnlem2 36462	Lemma for ~ knoppcn . (Co...
knoppcnlem3 36463	Lemma for ~ knoppcn . (Co...
knoppcnlem4 36464	Lemma for ~ knoppcn . (Co...
knoppcnlem5 36465	Lemma for ~ knoppcn . (Co...
knoppcnlem6 36466	Lemma for ~ knoppcn . (Co...
knoppcnlem7 36467	Lemma for ~ knoppcn . (Co...
knoppcnlem8 36468	Lemma for ~ knoppcn . (Co...
knoppcnlem9 36469	Lemma for ~ knoppcn . (Co...
knoppcnlem10 36470	Lemma for ~ knoppcn . (Co...
knoppcnlem11 36471	Lemma for ~ knoppcn . (Co...
knoppcn 36472	The continuous nowhere dif...
knoppcld 36473	Closure theorem for Knopp'...
unblimceq0lem 36474	Lemma for ~ unblimceq0 . ...
unblimceq0 36475	If ` F ` is unbounded near...
unbdqndv1 36476	If the difference quotient...
unbdqndv2lem1 36477	Lemma for ~ unbdqndv2 . (...
unbdqndv2lem2 36478	Lemma for ~ unbdqndv2 . (...
unbdqndv2 36479	Variant of ~ unbdqndv1 wit...
knoppndvlem1 36480	Lemma for ~ knoppndv . (C...
knoppndvlem2 36481	Lemma for ~ knoppndv . (C...
knoppndvlem3 36482	Lemma for ~ knoppndv . (C...
knoppndvlem4 36483	Lemma for ~ knoppndv . (C...
knoppndvlem5 36484	Lemma for ~ knoppndv . (C...
knoppndvlem6 36485	Lemma for ~ knoppndv . (C...
knoppndvlem7 36486	Lemma for ~ knoppndv . (C...
knoppndvlem8 36487	Lemma for ~ knoppndv . (C...
knoppndvlem9 36488	Lemma for ~ knoppndv . (C...
knoppndvlem10 36489	Lemma for ~ knoppndv . (C...
knoppndvlem11 36490	Lemma for ~ knoppndv . (C...
knoppndvlem12 36491	Lemma for ~ knoppndv . (C...
knoppndvlem13 36492	Lemma for ~ knoppndv . (C...
knoppndvlem14 36493	Lemma for ~ knoppndv . (C...
knoppndvlem15 36494	Lemma for ~ knoppndv . (C...
knoppndvlem16 36495	Lemma for ~ knoppndv . (C...
knoppndvlem17 36496	Lemma for ~ knoppndv . (C...
knoppndvlem18 36497	Lemma for ~ knoppndv . (C...
knoppndvlem19 36498	Lemma for ~ knoppndv . (C...
knoppndvlem20 36499	Lemma for ~ knoppndv . (C...
knoppndvlem21 36500	Lemma for ~ knoppndv . (C...
knoppndvlem22 36501	Lemma for ~ knoppndv . (C...
knoppndv 36502	The continuous nowhere dif...
knoppf 36503	Knopp's function is a func...
knoppcn2 36504	Variant of ~ knoppcn with ...
cnndvlem1 36505	Lemma for ~ cnndv . (Cont...
cnndvlem2 36506	Lemma for ~ cnndv . (Cont...
cnndv 36507	There exists a continuous ...
bj-mp2c 36508	A double _modus ponens_ in...
bj-mp2d 36509	A double _modus ponens_ in...
bj-0 36510	A syntactic theorem. See ...
bj-1 36511	In this proof, the use of ...
bj-a1k 36512	Weakening of ~ ax-1 . As ...
bj-poni 36513	Inference associated with ...
bj-nnclav 36514	When ` F. ` is substituted...
bj-nnclavi 36515	Inference associated with ...
bj-nnclavc 36516	Commuted form of ~ bj-nncl...
bj-nnclavci 36517	Inference associated with ...
bj-jarrii 36518	Inference associated with ...
bj-imim21 36519	The propositional function...
bj-imim21i 36520	Inference associated with ...
bj-peircestab 36521	Over minimal implicational...
bj-stabpeirce 36522	This minimal implicational...
bj-syl66ib 36523	A mixed syllogism inferenc...
bj-orim2 36524	Proof of ~ orim2 from the ...
bj-currypeirce 36525	Curry's axiom ~ curryax (a...
bj-peircecurry 36526	Peirce's axiom ~ peirce im...
bj-animbi 36527	Conjunction in terms of im...
bj-currypara 36528	Curry's paradox. Note tha...
bj-con2com 36529	A commuted form of the con...
bj-con2comi 36530	Inference associated with ...
bj-nimn 36531	If a formula is true, then...
bj-nimni 36532	Inference associated with ...
bj-peircei 36533	Inference associated with ...
bj-looinvi 36534	Inference associated with ...
bj-looinvii 36535	Inference associated with ...
bj-mt2bi 36536	Version of ~ mt2 where the...
bj-ntrufal 36537	The negation of a theorem ...
bj-fal 36538	Shortening of ~ fal using ...
bj-jaoi1 36539	Shortens ~ orfa2 (58>53), ...
bj-jaoi2 36540	Shortens ~ consensus (110>...
bj-dfbi4 36541	Alternate definition of th...
bj-dfbi5 36542	Alternate definition of th...
bj-dfbi6 36543	Alternate definition of th...
bj-bijust0ALT 36544	Alternate proof of ~ bijus...
bj-bijust00 36545	A self-implication does no...
bj-consensus 36546	Version of ~ consensus exp...
bj-consensusALT 36547	Alternate proof of ~ bj-co...
bj-df-ifc 36548	Candidate definition for t...
bj-dfif 36549	Alternate definition of th...
bj-ififc 36550	A biconditional connecting...
bj-imbi12 36551	Uncurried (imported) form ...
bj-falor 36552	Dual of ~ truan (which has...
bj-falor2 36553	Dual of ~ truan . (Contri...
bj-bibibi 36554	A property of the bicondit...
bj-imn3ani 36555	Duplication of ~ bnj1224 ....
bj-andnotim 36556	Two ways of expressing a c...
bj-bi3ant 36557	This used to be in the mai...
bj-bisym 36558	This used to be in the mai...
bj-bixor 36559	Equivalence of two ternary...
bj-axdd2 36560	This implication, proved u...
bj-axd2d 36561	This implication, proved u...
bj-axtd 36562	This implication, proved f...
bj-gl4 36563	In a normal modal logic, t...
bj-axc4 36564	Over minimal calculus, the...
prvlem1 36569	An elementary property of ...
prvlem2 36570	An elementary property of ...
bj-babygodel 36571	See the section header com...
bj-babylob 36572	See the section header com...
bj-godellob 36573	Proof of Gödel's theo...
bj-genr 36574	Generalization rule on the...
bj-genl 36575	Generalization rule on the...
bj-genan 36576	Generalization rule on a c...
bj-mpgs 36577	From a closed form theorem...
bj-2alim 36578	Closed form of ~ 2alimi . ...
bj-2exim 36579	Closed form of ~ 2eximi . ...
bj-alanim 36580	Closed form of ~ alanimi ....
bj-2albi 36581	Closed form of ~ 2albii . ...
bj-notalbii 36582	Equivalence of universal q...
bj-2exbi 36583	Closed form of ~ 2exbii . ...
bj-3exbi 36584	Closed form of ~ 3exbii . ...
bj-sylggt 36585	Stronger form of ~ sylgt ,...
bj-sylgt2 36586	Uncurried (imported) form ...
bj-alrimg 36587	The general form of the *a...
bj-alrimd 36588	A slightly more general ~ ...
bj-sylget 36589	Dual statement of ~ sylgt ...
bj-sylget2 36590	Uncurried (imported) form ...
bj-exlimg 36591	The general form of the *e...
bj-sylge 36592	Dual statement of ~ sylg (...
bj-exlimd 36593	A slightly more general ~ ...
bj-nfimexal 36594	A weak from of nonfreeness...
bj-alexim 36595	Closed form of ~ aleximi ....
bj-nexdh 36596	Closed form of ~ nexdh (ac...
bj-nexdh2 36597	Uncurried (imported) form ...
bj-hbxfrbi 36598	Closed form of ~ hbxfrbi ....
bj-hbyfrbi 36599	Version of ~ bj-hbxfrbi wi...
bj-exalim 36600	Distribute quantifiers ove...
bj-exalimi 36601	An inference for distribut...
bj-exalims 36602	Distributing quantifiers o...
bj-exalimsi 36603	An inference for distribut...
bj-ax12ig 36604	A lemma used to prove a we...
bj-ax12i 36605	A weakening of ~ bj-ax12ig...
bj-nfimt 36606	Closed form of ~ nfim and ...
bj-cbvalimt 36607	A lemma in closed form use...
bj-cbveximt 36608	A lemma in closed form use...
bj-eximALT 36609	Alternate proof of ~ exim ...
bj-aleximiALT 36610	Alternate proof of ~ alexi...
bj-eximcom 36611	A commuted form of ~ exim ...
bj-ax12wlem 36612	A lemma used to prove a we...
bj-cbvalim 36613	A lemma used to prove ~ bj...
bj-cbvexim 36614	A lemma used to prove ~ bj...
bj-cbvalimi 36615	An equality-free general i...
bj-cbveximi 36616	An equality-free general i...
bj-cbval 36617	Changing a bound variable ...
bj-cbvex 36618	Changing a bound variable ...
bj-ssbeq 36621	Substitution in an equalit...
bj-ssblem1 36622	A lemma for the definiens ...
bj-ssblem2 36623	An instance of ~ ax-11 pro...
bj-ax12v 36624	A weaker form of ~ ax-12 a...
bj-ax12 36625	Remove a DV condition from...
bj-ax12ssb 36626	Axiom ~ bj-ax12 expressed ...
bj-19.41al 36627	Special case of ~ 19.41 pr...
bj-equsexval 36628	Special case of ~ equsexv ...
bj-subst 36629	Proof of ~ sbalex from cor...
bj-ssbid2 36630	A special case of ~ sbequ2...
bj-ssbid2ALT 36631	Alternate proof of ~ bj-ss...
bj-ssbid1 36632	A special case of ~ sbequ1...
bj-ssbid1ALT 36633	Alternate proof of ~ bj-ss...
bj-ax6elem1 36634	Lemma for ~ bj-ax6e . (Co...
bj-ax6elem2 36635	Lemma for ~ bj-ax6e . (Co...
bj-ax6e 36636	Proof of ~ ax6e (hence ~ a...
bj-spimvwt 36637	Closed form of ~ spimvw . ...
bj-spnfw 36638	Theorem close to a closed ...
bj-cbvexiw 36639	Change bound variable. Th...
bj-cbvexivw 36640	Change bound variable. Th...
bj-modald 36641	A short form of the axiom ...
bj-denot 36642	A weakening of ~ ax-6 and ...
bj-eqs 36643	A lemma for substitutions,...
bj-cbvexw 36644	Change bound variable. Th...
bj-ax12w 36645	The general statement that...
bj-ax89 36646	A theorem which could be u...
bj-cleljusti 36647	One direction of ~ cleljus...
bj-alcomexcom 36648	Commutation of two existen...
bj-hbalt 36649	Closed form of ~ hbal . W...
axc11n11 36650	Proof of ~ axc11n from { ~...
axc11n11r 36651	Proof of ~ axc11n from { ~...
bj-axc16g16 36652	Proof of ~ axc16g from { ~...
bj-ax12v3 36653	A weak version of ~ ax-12 ...
bj-ax12v3ALT 36654	Alternate proof of ~ bj-ax...
bj-sb 36655	A weak variant of ~ sbid2 ...
bj-modalbe 36656	The predicate-calculus ver...
bj-spst 36657	Closed form of ~ sps . On...
bj-19.21bit 36658	Closed form of ~ 19.21bi ....
bj-19.23bit 36659	Closed form of ~ 19.23bi ....
bj-nexrt 36660	Closed form of ~ nexr . C...
bj-alrim 36661	Closed form of ~ alrimi . ...
bj-alrim2 36662	Uncurried (imported) form ...
bj-nfdt0 36663	A theorem close to a close...
bj-nfdt 36664	Closed form of ~ nf5d and ...
bj-nexdt 36665	Closed form of ~ nexd . (...
bj-nexdvt 36666	Closed form of ~ nexdv . ...
bj-alexbiex 36667	Adding a second quantifier...
bj-exexbiex 36668	Adding a second quantifier...
bj-alalbial 36669	Adding a second quantifier...
bj-exalbial 36670	Adding a second quantifier...
bj-19.9htbi 36671	Strengthening ~ 19.9ht by ...
bj-hbntbi 36672	Strengthening ~ hbnt by re...
bj-biexal1 36673	A general FOL biconditiona...
bj-biexal2 36674	When ` ph ` is substituted...
bj-biexal3 36675	When ` ph ` is substituted...
bj-bialal 36676	When ` ph ` is substituted...
bj-biexex 36677	When ` ph ` is substituted...
bj-hbext 36678	Closed form of ~ hbex . (...
bj-nfalt 36679	Closed form of ~ nfal . (...
bj-nfext 36680	Closed form of ~ nfex . (...
bj-eeanvw 36681	Version of ~ exdistrv with...
bj-modal4 36682	First-order logic form of ...
bj-modal4e 36683	First-order logic form of ...
bj-modalb 36684	A short form of the axiom ...
bj-wnf1 36685	When ` ph ` is substituted...
bj-wnf2 36686	When ` ph ` is substituted...
bj-wnfanf 36687	When ` ph ` is substituted...
bj-wnfenf 36688	When ` ph ` is substituted...
bj-substax12 36689	Equivalent form of the axi...
bj-substw 36690	Weak form of the LHS of ~ ...
bj-nnfbi 36693	If two formulas are equiva...
bj-nnfbd 36694	If two formulas are equiva...
bj-nnfbii 36695	If two formulas are equiva...
bj-nnfa 36696	Nonfreeness implies the eq...
bj-nnfad 36697	Nonfreeness implies the eq...
bj-nnfai 36698	Nonfreeness implies the eq...
bj-nnfe 36699	Nonfreeness implies the eq...
bj-nnfed 36700	Nonfreeness implies the eq...
bj-nnfei 36701	Nonfreeness implies the eq...
bj-nnfea 36702	Nonfreeness implies the eq...
bj-nnfead 36703	Nonfreeness implies the eq...
bj-nnfeai 36704	Nonfreeness implies the eq...
bj-dfnnf2 36705	Alternate definition of ~ ...
bj-nnfnfTEMP 36706	New nonfreeness implies ol...
bj-wnfnf 36707	When ` ph ` is substituted...
bj-nnfnt 36708	A variable is nonfree in a...
bj-nnftht 36709	A variable is nonfree in a...
bj-nnfth 36710	A variable is nonfree in a...
bj-nnfnth 36711	A variable is nonfree in t...
bj-nnfim1 36712	A consequence of nonfreene...
bj-nnfim2 36713	A consequence of nonfreene...
bj-nnfim 36714	Nonfreeness in the anteced...
bj-nnfimd 36715	Nonfreeness in the anteced...
bj-nnfan 36716	Nonfreeness in both conjun...
bj-nnfand 36717	Nonfreeness in both conjun...
bj-nnfor 36718	Nonfreeness in both disjun...
bj-nnford 36719	Nonfreeness in both disjun...
bj-nnfbit 36720	Nonfreeness in both sides ...
bj-nnfbid 36721	Nonfreeness in both sides ...
bj-nnfv 36722	A non-occurring variable i...
bj-nnf-alrim 36723	Proof of the closed form o...
bj-nnf-exlim 36724	Proof of the closed form o...
bj-dfnnf3 36725	Alternate definition of no...
bj-nfnnfTEMP 36726	New nonfreeness is equival...
bj-nnfa1 36727	See ~ nfa1 . (Contributed...
bj-nnfe1 36728	See ~ nfe1 . (Contributed...
bj-19.12 36729	See ~ 19.12 . Could be la...
bj-nnflemaa 36730	One of four lemmas for non...
bj-nnflemee 36731	One of four lemmas for non...
bj-nnflemae 36732	One of four lemmas for non...
bj-nnflemea 36733	One of four lemmas for non...
bj-nnfalt 36734	See ~ nfal and ~ bj-nfalt ...
bj-nnfext 36735	See ~ nfex and ~ bj-nfext ...
bj-stdpc5t 36736	Alias of ~ bj-nnf-alrim fo...
bj-19.21t 36737	Statement ~ 19.21t proved ...
bj-19.23t 36738	Statement ~ 19.23t proved ...
bj-19.36im 36739	One direction of ~ 19.36 f...
bj-19.37im 36740	One direction of ~ 19.37 f...
bj-19.42t 36741	Closed form of ~ 19.42 fro...
bj-19.41t 36742	Closed form of ~ 19.41 fro...
bj-sbft 36743	Version of ~ sbft using ` ...
bj-pm11.53vw 36744	Version of ~ pm11.53v with...
bj-pm11.53v 36745	Version of ~ pm11.53v with...
bj-pm11.53a 36746	A variant of ~ pm11.53v . ...
bj-equsvt 36747	A variant of ~ equsv . (C...
bj-equsalvwd 36748	Variant of ~ equsalvw . (...
bj-equsexvwd 36749	Variant of ~ equsexvw . (...
bj-sbievwd 36750	Variant of ~ sbievw . (Co...
bj-axc10 36751	Alternate proof of ~ axc10...
bj-alequex 36752	A fol lemma. See ~ aleque...
bj-spimt2 36753	A step in the proof of ~ s...
bj-cbv3ta 36754	Closed form of ~ cbv3 . (...
bj-cbv3tb 36755	Closed form of ~ cbv3 . (...
bj-hbsb3t 36756	A theorem close to a close...
bj-hbsb3 36757	Shorter proof of ~ hbsb3 ....
bj-nfs1t 36758	A theorem close to a close...
bj-nfs1t2 36759	A theorem close to a close...
bj-nfs1 36760	Shorter proof of ~ nfs1 (t...
bj-axc10v 36761	Version of ~ axc10 with a ...
bj-spimtv 36762	Version of ~ spimt with a ...
bj-cbv3hv2 36763	Version of ~ cbv3h with tw...
bj-cbv1hv 36764	Version of ~ cbv1h with a ...
bj-cbv2hv 36765	Version of ~ cbv2h with a ...
bj-cbv2v 36766	Version of ~ cbv2 with a d...
bj-cbvaldv 36767	Version of ~ cbvald with a...
bj-cbvexdv 36768	Version of ~ cbvexd with a...
bj-cbval2vv 36769	Version of ~ cbval2vv with...
bj-cbvex2vv 36770	Version of ~ cbvex2vv with...
bj-cbvaldvav 36771	Version of ~ cbvaldva with...
bj-cbvexdvav 36772	Version of ~ cbvexdva with...
bj-cbvex4vv 36773	Version of ~ cbvex4v with ...
bj-equsalhv 36774	Version of ~ equsalh with ...
bj-axc11nv 36775	Version of ~ axc11n with a...
bj-aecomsv 36776	Version of ~ aecoms with a...
bj-axc11v 36777	Version of ~ axc11 with a ...
bj-drnf2v 36778	Version of ~ drnf2 with a ...
bj-equs45fv 36779	Version of ~ equs45f with ...
bj-hbs1 36780	Version of ~ hbsb2 with a ...
bj-nfs1v 36781	Version of ~ nfsb2 with a ...
bj-hbsb2av 36782	Version of ~ hbsb2a with a...
bj-hbsb3v 36783	Version of ~ hbsb3 with a ...
bj-nfsab1 36784	Remove dependency on ~ ax-...
bj-dtrucor2v 36785	Version of ~ dtrucor2 with...
bj-hbaeb2 36786	Biconditional version of a...
bj-hbaeb 36787	Biconditional version of ~...
bj-hbnaeb 36788	Biconditional version of ~...
bj-dvv 36789	A special instance of ~ bj...
bj-equsal1t 36790	Duplication of ~ wl-equsal...
bj-equsal1ti 36791	Inference associated with ...
bj-equsal1 36792	One direction of ~ equsal ...
bj-equsal2 36793	One direction of ~ equsal ...
bj-equsal 36794	Shorter proof of ~ equsal ...
stdpc5t 36795	Closed form of ~ stdpc5 . ...
bj-stdpc5 36796	More direct proof of ~ std...
2stdpc5 36797	A double ~ stdpc5 (one dir...
bj-19.21t0 36798	Proof of ~ 19.21t from ~ s...
exlimii 36799	Inference associated with ...
ax11-pm 36800	Proof of ~ ax-11 similar t...
ax6er 36801	Commuted form of ~ ax6e . ...
exlimiieq1 36802	Inferring a theorem when i...
exlimiieq2 36803	Inferring a theorem when i...
ax11-pm2 36804	Proof of ~ ax-11 from the ...
bj-sbsb 36805	Biconditional showing two ...
bj-dfsb2 36806	Alternate (dual) definitio...
bj-sbf3 36807	Substitution has no effect...
bj-sbf4 36808	Substitution has no effect...
bj-eu3f 36809	Version of ~ eu3v where th...
bj-sblem1 36810	Lemma for substitution. (...
bj-sblem2 36811	Lemma for substitution. (...
bj-sblem 36812	Lemma for substitution. (...
bj-sbievw1 36813	Lemma for substitution. (...
bj-sbievw2 36814	Lemma for substitution. (...
bj-sbievw 36815	Lemma for substitution. C...
bj-sbievv 36816	Version of ~ sbie with a s...
bj-moeub 36817	Uniqueness is equivalent t...
bj-sbidmOLD 36818	Obsolete proof of ~ sbidm ...
bj-dvelimdv 36819	Deduction form of ~ dvelim...
bj-dvelimdv1 36820	Curried (exported) form of...
bj-dvelimv 36821	A version of ~ dvelim usin...
bj-nfeel2 36822	Nonfreeness in a membershi...
bj-axc14nf 36823	Proof of a version of ~ ax...
bj-axc14 36824	Alternate proof of ~ axc14...
mobidvALT 36825	Alternate proof of ~ mobid...
sbn1ALT 36826	Alternate proof of ~ sbn1 ...
eliminable1 36827	A theorem used to prove th...
eliminable2a 36828	A theorem used to prove th...
eliminable2b 36829	A theorem used to prove th...
eliminable2c 36830	A theorem used to prove th...
eliminable3a 36831	A theorem used to prove th...
eliminable3b 36832	A theorem used to prove th...
eliminable-velab 36833	A theorem used to prove th...
eliminable-veqab 36834	A theorem used to prove th...
eliminable-abeqv 36835	A theorem used to prove th...
eliminable-abeqab 36836	A theorem used to prove th...
eliminable-abelv 36837	A theorem used to prove th...
eliminable-abelab 36838	A theorem used to prove th...
bj-denoteslem 36839	Duplicate of ~ issettru an...
bj-denotesALTV 36840	Moved to main as ~ iseqset...
bj-issettruALTV 36841	Moved to main as ~ issettr...
bj-elabtru 36842	This is as close as we can...
bj-issetwt 36843	Closed form of ~ bj-issetw...
bj-issetw 36844	The closest one can get to...
bj-issetiv 36845	Version of ~ bj-isseti wit...
bj-isseti 36846	Version of ~ isseti with a...
bj-ralvw 36847	A weak version of ~ ralv n...
bj-rexvw 36848	A weak version of ~ rexv n...
bj-rababw 36849	A weak version of ~ rabab ...
bj-rexcom4bv 36850	Version of ~ rexcom4b and ...
bj-rexcom4b 36851	Remove from ~ rexcom4b dep...
bj-ceqsalt0 36852	The FOL content of ~ ceqsa...
bj-ceqsalt1 36853	The FOL content of ~ ceqsa...
bj-ceqsalt 36854	Remove from ~ ceqsalt depe...
bj-ceqsaltv 36855	Version of ~ bj-ceqsalt wi...
bj-ceqsalg0 36856	The FOL content of ~ ceqsa...
bj-ceqsalg 36857	Remove from ~ ceqsalg depe...
bj-ceqsalgALT 36858	Alternate proof of ~ bj-ce...
bj-ceqsalgv 36859	Version of ~ bj-ceqsalg wi...
bj-ceqsalgvALT 36860	Alternate proof of ~ bj-ce...
bj-ceqsal 36861	Remove from ~ ceqsal depen...
bj-ceqsalv 36862	Remove from ~ ceqsalv depe...
bj-spcimdv 36863	Remove from ~ spcimdv depe...
bj-spcimdvv 36864	Remove from ~ spcimdv depe...
elelb 36865	Equivalence between two co...
bj-pwvrelb 36866	Characterization of the el...
bj-nfcsym 36867	The nonfreeness quantifier...
bj-sbeqALT 36868	Substitution in an equalit...
bj-sbeq 36869	Distribute proper substitu...
bj-sbceqgALT 36870	Distribute proper substitu...
bj-csbsnlem 36871	Lemma for ~ bj-csbsn (in t...
bj-csbsn 36872	Substitution in a singleto...
bj-sbel1 36873	Version of ~ sbcel1g when ...
bj-abv 36874	The class of sets verifyin...
bj-abvALT 36875	Alternate version of ~ bj-...
bj-ab0 36876	The class of sets verifyin...
bj-abf 36877	Shorter proof of ~ abf (wh...
bj-csbprc 36878	More direct proof of ~ csb...
bj-exlimvmpi 36879	A Fol lemma ( ~ exlimiv fo...
bj-exlimmpi 36880	Lemma for ~ bj-vtoclg1f1 (...
bj-exlimmpbi 36881	Lemma for theorems of the ...
bj-exlimmpbir 36882	Lemma for theorems of the ...
bj-vtoclf 36883	Remove dependency on ~ ax-...
bj-vtocl 36884	Remove dependency on ~ ax-...
bj-vtoclg1f1 36885	The FOL content of ~ vtocl...
bj-vtoclg1f 36886	Reprove ~ vtoclg1f from ~ ...
bj-vtoclg1fv 36887	Version of ~ bj-vtoclg1f w...
bj-vtoclg 36888	A version of ~ vtoclg with...
bj-rabeqbid 36889	Version of ~ rabeqbidv wit...
bj-seex 36890	Version of ~ seex with a d...
bj-nfcf 36891	Version of ~ df-nfc with a...
bj-zfauscl 36892	General version of ~ zfaus...
bj-elabd2ALT 36893	Alternate proof of ~ elabd...
bj-unrab 36894	Generalization of ~ unrab ...
bj-inrab 36895	Generalization of ~ inrab ...
bj-inrab2 36896	Shorter proof of ~ inrab ....
bj-inrab3 36897	Generalization of ~ dfrab3...
bj-rabtr 36898	Restricted class abstracti...
bj-rabtrALT 36899	Alternate proof of ~ bj-ra...
bj-rabtrAUTO 36900	Proof of ~ bj-rabtr found ...
bj-gabss 36903	Inclusion of generalized c...
bj-gabssd 36904	Inclusion of generalized c...
bj-gabeqd 36905	Equality of generalized cl...
bj-gabeqis 36906	Equality of generalized cl...
bj-elgab 36907	Elements of a generalized ...
bj-gabima 36908	Generalized class abstract...
bj-ru1 36911	A version of Russell's par...
bj-ru 36912	Remove dependency on ~ ax-...
currysetlem 36913	Lemma for ~ currysetlem , ...
curryset 36914	Curry's paradox in set the...
currysetlem1 36915	Lemma for ~ currysetALT . ...
currysetlem2 36916	Lemma for ~ currysetALT . ...
currysetlem3 36917	Lemma for ~ currysetALT . ...
currysetALT 36918	Alternate proof of ~ curry...
bj-n0i 36919	Inference associated with ...
bj-disjsn01 36920	Disjointness of the single...
bj-0nel1 36921	The empty set does not bel...
bj-1nel0 36922	` 1o ` does not belong to ...
bj-xpimasn 36923	The image of a singleton, ...
bj-xpima1sn 36924	The image of a singleton b...
bj-xpima1snALT 36925	Alternate proof of ~ bj-xp...
bj-xpima2sn 36926	The image of a singleton b...
bj-xpnzex 36927	If the first factor of a p...
bj-xpexg2 36928	Curried (exported) form of...
bj-xpnzexb 36929	If the first factor of a p...
bj-cleq 36930	Substitution property for ...
bj-snsetex 36931	The class of sets "whose s...
bj-clexab 36932	Sethood of certain classes...
bj-sngleq 36935	Substitution property for ...
bj-elsngl 36936	Characterization of the el...
bj-snglc 36937	Characterization of the el...
bj-snglss 36938	The singletonization of a ...
bj-0nelsngl 36939	The empty set is not a mem...
bj-snglinv 36940	Inverse of singletonizatio...
bj-snglex 36941	A class is a set if and on...
bj-tageq 36944	Substitution property for ...
bj-eltag 36945	Characterization of the el...
bj-0eltag 36946	The empty set belongs to t...
bj-tagn0 36947	The tagging of a class is ...
bj-tagss 36948	The tagging of a class is ...
bj-snglsstag 36949	The singletonization is in...
bj-sngltagi 36950	The singletonization is in...
bj-sngltag 36951	The singletonization and t...
bj-tagci 36952	Characterization of the el...
bj-tagcg 36953	Characterization of the el...
bj-taginv 36954	Inverse of tagging. (Cont...
bj-tagex 36955	A class is a set if and on...
bj-xtageq 36956	The products of a given cl...
bj-xtagex 36957	The product of a set and t...
bj-projeq 36960	Substitution property for ...
bj-projeq2 36961	Substitution property for ...
bj-projun 36962	The class projection on a ...
bj-projex 36963	Sethood of the class proje...
bj-projval 36964	Value of the class project...
bj-1upleq 36967	Substitution property for ...
bj-pr1eq 36970	Substitution property for ...
bj-pr1un 36971	The first projection prese...
bj-pr1val 36972	Value of the first project...
bj-pr11val 36973	Value of the first project...
bj-pr1ex 36974	Sethood of the first proje...
bj-1uplth 36975	The characteristic propert...
bj-1uplex 36976	A monuple is a set if and ...
bj-1upln0 36977	A monuple is nonempty. (C...
bj-2upleq 36980	Substitution property for ...
bj-pr21val 36981	Value of the first project...
bj-pr2eq 36984	Substitution property for ...
bj-pr2un 36985	The second projection pres...
bj-pr2val 36986	Value of the second projec...
bj-pr22val 36987	Value of the second projec...
bj-pr2ex 36988	Sethood of the second proj...
bj-2uplth 36989	The characteristic propert...
bj-2uplex 36990	A couple is a set if and o...
bj-2upln0 36991	A couple is nonempty. (Co...
bj-2upln1upl 36992	A couple is never equal to...
bj-rcleqf 36993	Relative version of ~ cleq...
bj-rcleq 36994	Relative version of ~ dfcl...
bj-reabeq 36995	Relative form of ~ eqabb ....
bj-disj2r 36996	Relative version of ~ ssdi...
bj-sscon 36997	Contraposition law for rel...
bj-abex 36998	Two ways of stating that t...
bj-clex 36999	Two ways of stating that a...
bj-axsn 37000	Two ways of stating the ax...
bj-snexg 37002	A singleton built on a set...
bj-snex 37003	A singleton is a set. See...
bj-axbun 37004	Two ways of stating the ax...
bj-unexg 37006	Existence of binary unions...
bj-prexg 37007	Existence of unordered pai...
bj-prex 37008	Existence of unordered pai...
bj-axadj 37009	Two ways of stating the ax...
bj-adjg1 37011	Existence of the result of...
bj-snfromadj 37012	Singleton from adjunction ...
bj-prfromadj 37013	Unordered pair from adjunc...
bj-adjfrombun 37014	Adjunction from singleton ...
eleq2w2ALT 37015	Alternate proof of ~ eleq2...
bj-clel3gALT 37016	Alternate proof of ~ clel3...
bj-pw0ALT 37017	Alternate proof of ~ pw0 ....
bj-sselpwuni 37018	Quantitative version of ~ ...
bj-unirel 37019	Quantitative version of ~ ...
bj-elpwg 37020	If the intersection of two...
bj-velpwALT 37021	This theorem ~ bj-velpwALT...
bj-elpwgALT 37022	Alternate proof of ~ elpwg...
bj-vjust 37023	Justification theorem for ...
bj-nul 37024	Two formulations of the ax...
bj-nuliota 37025	Definition of the empty se...
bj-nuliotaALT 37026	Alternate proof of ~ bj-nu...
bj-vtoclgfALT 37027	Alternate proof of ~ vtocl...
bj-elsn12g 37028	Join of ~ elsng and ~ elsn...
bj-elsnb 37029	Biconditional version of ~...
bj-pwcfsdom 37030	Remove hypothesis from ~ p...
bj-grur1 37031	Remove hypothesis from ~ g...
bj-bm1.3ii 37032	The extension of a predica...
bj-dfid2ALT 37033	Alternate version of ~ dfi...
bj-0nelopab 37034	The empty set is never an ...
bj-brrelex12ALT 37035	Two classes related by a b...
bj-epelg 37036	The membership relation an...
bj-epelb 37037	Two classes are related by...
bj-nsnid 37038	A set does not contain the...
bj-rdg0gALT 37039	Alternate proof of ~ rdg0g...
bj-evaleq 37040	Equality theorem for the `...
bj-evalfun 37041	The evaluation at a class ...
bj-evalfn 37042	The evaluation at a class ...
bj-evalval 37043	Value of the evaluation at...
bj-evalid 37044	The evaluation at a set of...
bj-ndxarg 37045	Proof of ~ ndxarg from ~ b...
bj-evalidval 37046	Closed general form of ~ s...
bj-rest00 37049	An elementwise intersectio...
bj-restsn 37050	An elementwise intersectio...
bj-restsnss 37051	Special case of ~ bj-rests...
bj-restsnss2 37052	Special case of ~ bj-rests...
bj-restsn0 37053	An elementwise intersectio...
bj-restsn10 37054	Special case of ~ bj-rests...
bj-restsnid 37055	The elementwise intersecti...
bj-rest10 37056	An elementwise intersectio...
bj-rest10b 37057	Alternate version of ~ bj-...
bj-restn0 37058	An elementwise intersectio...
bj-restn0b 37059	Alternate version of ~ bj-...
bj-restpw 37060	The elementwise intersecti...
bj-rest0 37061	An elementwise intersectio...
bj-restb 37062	An elementwise intersectio...
bj-restv 37063	An elementwise intersectio...
bj-resta 37064	An elementwise intersectio...
bj-restuni 37065	The union of an elementwis...
bj-restuni2 37066	The union of an elementwis...
bj-restreg 37067	A reformulation of the axi...
bj-raldifsn 37068	All elements in a set sati...
bj-0int 37069	If ` A ` is a collection o...
bj-mooreset 37070	A Moore collection is a se...
bj-ismoore 37073	Characterization of Moore ...
bj-ismoored0 37074	Necessary condition to be ...
bj-ismoored 37075	Necessary condition to be ...
bj-ismoored2 37076	Necessary condition to be ...
bj-ismooredr 37077	Sufficient condition to be...
bj-ismooredr2 37078	Sufficient condition to be...
bj-discrmoore 37079	The powerclass ` ~P A ` is...
bj-0nmoore 37080	The empty set is not a Moo...
bj-snmoore 37081	A singleton is a Moore col...
bj-snmooreb 37082	A singleton is a Moore col...
bj-prmoore 37083	A pair formed of two neste...
bj-0nelmpt 37084	The empty set is not an el...
bj-mptval 37085	Value of a function given ...
bj-dfmpoa 37086	An equivalent definition o...
bj-mpomptALT 37087	Alternate proof of ~ mpomp...
setsstrset 37104	Relation between ~ df-sets...
bj-nfald 37105	Variant of ~ nfald . (Con...
bj-nfexd 37106	Variant of ~ nfexd . (Con...
copsex2d 37107	Implicit substitution dedu...
copsex2b 37108	Biconditional form of ~ co...
opelopabd 37109	Membership of an ordere pa...
opelopabb 37110	Membership of an ordered p...
opelopabbv 37111	Membership of an ordered p...
bj-opelrelex 37112	The coordinates of an orde...
bj-opelresdm 37113	If an ordered pair is in a...
bj-brresdm 37114	If two classes are related...
brabd0 37115	Expressing that two sets a...
brabd 37116	Expressing that two sets a...
bj-brab2a1 37117	"Unbounded" version of ~ b...
bj-opabssvv 37118	A variant of ~ relopabiv (...
bj-funidres 37119	The restricted identity re...
bj-opelidb 37120	Characterization of the or...
bj-opelidb1 37121	Characterization of the or...
bj-inexeqex 37122	Lemma for ~ bj-opelid (but...
bj-elsn0 37123	If the intersection of two...
bj-opelid 37124	Characterization of the or...
bj-ideqg 37125	Characterization of the cl...
bj-ideqgALT 37126	Alternate proof of ~ bj-id...
bj-ideqb 37127	Characterization of classe...
bj-idres 37128	Alternate expression for t...
bj-opelidres 37129	Characterization of the or...
bj-idreseq 37130	Sufficient condition for t...
bj-idreseqb 37131	Characterization for two c...
bj-ideqg1 37132	For sets, the identity rel...
bj-ideqg1ALT 37133	Alternate proof of bj-ideq...
bj-opelidb1ALT 37134	Characterization of the co...
bj-elid3 37135	Characterization of the co...
bj-elid4 37136	Characterization of the el...
bj-elid5 37137	Characterization of the el...
bj-elid6 37138	Characterization of the el...
bj-elid7 37139	Characterization of the el...
bj-diagval 37142	Value of the functionalize...
bj-diagval2 37143	Value of the functionalize...
bj-eldiag 37144	Characterization of the el...
bj-eldiag2 37145	Characterization of the el...
bj-imdirvallem 37148	Lemma for ~ bj-imdirval an...
bj-imdirval 37149	Value of the functionalize...
bj-imdirval2lem 37150	Lemma for ~ bj-imdirval2 a...
bj-imdirval2 37151	Value of the functionalize...
bj-imdirval3 37152	Value of the functionalize...
bj-imdiridlem 37153	Lemma for ~ bj-imdirid and...
bj-imdirid 37154	Functorial property of the...
bj-opelopabid 37155	Membership in an ordered-p...
bj-opabco 37156	Composition of ordered-pai...
bj-xpcossxp 37157	The composition of two Car...
bj-imdirco 37158	Functorial property of the...
bj-iminvval 37161	Value of the functionalize...
bj-iminvval2 37162	Value of the functionalize...
bj-iminvid 37163	Functorial property of the...
bj-inftyexpitaufo 37170	The function ` inftyexpita...
bj-inftyexpitaudisj 37173	An element of the circle a...
bj-inftyexpiinv 37176	Utility theorem for the in...
bj-inftyexpiinj 37177	Injectivity of the paramet...
bj-inftyexpidisj 37178	An element of the circle a...
bj-ccinftydisj 37181	The circle at infinity is ...
bj-elccinfty 37182	A lemma for infinite exten...
bj-ccssccbar 37185	Complex numbers are extend...
bj-ccinftyssccbar 37186	Infinite extended complex ...
bj-pinftyccb 37189	The class ` pinfty ` is an...
bj-pinftynrr 37190	The extended complex numbe...
bj-minftyccb 37193	The class ` minfty ` is an...
bj-minftynrr 37194	The extended complex numbe...
bj-pinftynminfty 37195	The extended complex numbe...
bj-rrhatsscchat 37204	The real projective line i...
bj-imafv 37219	If the direct image of a s...
bj-funun 37220	Value of a function expres...
bj-fununsn1 37221	Value of a function expres...
bj-fununsn2 37222	Value of a function expres...
bj-fvsnun1 37223	The value of a function wi...
bj-fvsnun2 37224	The value of a function wi...
bj-fvmptunsn1 37225	Value of a function expres...
bj-fvmptunsn2 37226	Value of a function expres...
bj-iomnnom 37227	The canonical bijection fr...
bj-smgrpssmgm 37236	Semigroups are magmas. (C...
bj-smgrpssmgmel 37237	Semigroups are magmas (ele...
bj-mndsssmgrp 37238	Monoids are semigroups. (...
bj-mndsssmgrpel 37239	Monoids are semigroups (el...
bj-cmnssmnd 37240	Commutative monoids are mo...
bj-cmnssmndel 37241	Commutative monoids are mo...
bj-grpssmnd 37242	Groups are monoids. (Cont...
bj-grpssmndel 37243	Groups are monoids (elemen...
bj-ablssgrp 37244	Abelian groups are groups....
bj-ablssgrpel 37245	Abelian groups are groups ...
bj-ablsscmn 37246	Abelian groups are commuta...
bj-ablsscmnel 37247	Abelian groups are commuta...
bj-modssabl 37248	(The additive groups of) m...
bj-vecssmod 37249	Vector spaces are modules....
bj-vecssmodel 37250	Vector spaces are modules ...
bj-finsumval0 37253	Value of a finite sum. (C...
bj-fvimacnv0 37254	Variant of ~ fvimacnv wher...
bj-isvec 37255	The predicate "is a vector...
bj-fldssdrng 37256	Fields are division rings....
bj-flddrng 37257	Fields are division rings ...
bj-rrdrg 37258	The field of real numbers ...
bj-isclm 37259	The predicate "is a subcom...
bj-isrvec 37262	The predicate "is a real v...
bj-rvecmod 37263	Real vector spaces are mod...
bj-rvecssmod 37264	Real vector spaces are mod...
bj-rvecrr 37265	The field of scalars of a ...
bj-isrvecd 37266	The predicate "is a real v...
bj-rvecvec 37267	Real vector spaces are vec...
bj-isrvec2 37268	The predicate "is a real v...
bj-rvecssvec 37269	Real vector spaces are vec...
bj-rveccmod 37270	Real vector spaces are sub...
bj-rvecsscmod 37271	Real vector spaces are sub...
bj-rvecsscvec 37272	Real vector spaces are sub...
bj-rveccvec 37273	Real vector spaces are sub...
bj-rvecssabl 37274	(The additive groups of) r...
bj-rvecabl 37275	(The additive groups of) r...
bj-subcom 37276	A consequence of commutati...
bj-lineqi 37277	Solution of a (scalar) lin...
bj-bary1lem 37278	Lemma for ~ bj-bary1 : exp...
bj-bary1lem1 37279	Lemma for ~ bj-bary1 : com...
bj-bary1 37280	Barycentric coordinates in...
bj-endval 37283	Value of the monoid of end...
bj-endbase 37284	Base set of the monoid of ...
bj-endcomp 37285	Composition law of the mon...
bj-endmnd 37286	The monoid of endomorphism...
taupilem3 37287	Lemma for tau-related theo...
taupilemrplb 37288	A set of positive reals ha...
taupilem1 37289	Lemma for ~ taupi . A pos...
taupilem2 37290	Lemma for ~ taupi . The s...
taupi 37291	Relationship between ` _ta...
dfgcd3 37292	Alternate definition of th...
irrdifflemf 37293	Lemma for ~ irrdiff . The...
irrdiff 37294	The irrationals are exactl...
iccioo01 37295	The closed unit interval i...
csbrecsg 37296	Move class substitution in...
csbrdgg 37297	Move class substitution in...
csboprabg 37298	Move class substitution in...
csbmpo123 37299	Move class substitution in...
con1bii2 37300	A contraposition inference...
con2bii2 37301	A contraposition inference...
vtoclefex 37302	Implicit substitution of a...
rnmptsn 37303	The range of a function ma...
f1omptsnlem 37304	This is the core of the pr...
f1omptsn 37305	A function mapping to sing...
mptsnunlem 37306	This is the core of the pr...
mptsnun 37307	A class ` B ` is equal to ...
dissneqlem 37308	This is the core of the pr...
dissneq 37309	Any topology that contains...
exlimim 37310	Closed form of ~ exlimimd ...
exlimimd 37311	Existential elimination ru...
exellim 37312	Closed form of ~ exellimdd...
exellimddv 37313	Eliminate an antecedent wh...
topdifinfindis 37314	Part of Exercise 3 of [Mun...
topdifinffinlem 37315	This is the core of the pr...
topdifinffin 37316	Part of Exercise 3 of [Mun...
topdifinf 37317	Part of Exercise 3 of [Mun...
topdifinfeq 37318	Two different ways of defi...
icorempo 37319	Closed-below, open-above i...
icoreresf 37320	Closed-below, open-above i...
icoreval 37321	Value of the closed-below,...
icoreelrnab 37322	Elementhood in the set of ...
isbasisrelowllem1 37323	Lemma for ~ isbasisrelowl ...
isbasisrelowllem2 37324	Lemma for ~ isbasisrelowl ...
icoreclin 37325	The set of closed-below, o...
isbasisrelowl 37326	The set of all closed-belo...
icoreunrn 37327	The union of all closed-be...
istoprelowl 37328	The set of all closed-belo...
icoreelrn 37329	A class abstraction which ...
iooelexlt 37330	An element of an open inte...
relowlssretop 37331	The lower limit topology o...
relowlpssretop 37332	The lower limit topology o...
sucneqond 37333	Inequality of an ordinal s...
sucneqoni 37334	Inequality of an ordinal s...
onsucuni3 37335	If an ordinal number has a...
1oequni2o 37336	The ordinal number ` 1o ` ...
rdgsucuni 37337	If an ordinal number has a...
rdgeqoa 37338	If a recursive function wi...
elxp8 37339	Membership in a Cartesian ...
cbveud 37340	Deduction used to change b...
cbvreud 37341	Deduction used to change b...
difunieq 37342	The difference of unions i...
inunissunidif 37343	Theorem about subsets of t...
rdgellim 37344	Elementhood in a recursive...
rdglimss 37345	A recursive definition at ...
rdgssun 37346	In a recursive definition ...
exrecfnlem 37347	Lemma for ~ exrecfn . (Co...
exrecfn 37348	Theorem about the existenc...
exrecfnpw 37349	For any base set, a set wh...
finorwe 37350	If the Axiom of Infinity i...
dffinxpf 37353	This theorem is the same a...
finxpeq1 37354	Equality theorem for Carte...
finxpeq2 37355	Equality theorem for Carte...
csbfinxpg 37356	Distribute proper substitu...
finxpreclem1 37357	Lemma for ` ^^ ` recursion...
finxpreclem2 37358	Lemma for ` ^^ ` recursion...
finxp0 37359	The value of Cartesian exp...
finxp1o 37360	The value of Cartesian exp...
finxpreclem3 37361	Lemma for ` ^^ ` recursion...
finxpreclem4 37362	Lemma for ` ^^ ` recursion...
finxpreclem5 37363	Lemma for ` ^^ ` recursion...
finxpreclem6 37364	Lemma for ` ^^ ` recursion...
finxpsuclem 37365	Lemma for ~ finxpsuc . (C...
finxpsuc 37366	The value of Cartesian exp...
finxp2o 37367	The value of Cartesian exp...
finxp3o 37368	The value of Cartesian exp...
finxpnom 37369	Cartesian exponentiation w...
finxp00 37370	Cartesian exponentiation o...
iunctb2 37371	Using the axiom of countab...
domalom 37372	A class which dominates ev...
isinf2 37373	The converse of ~ isinf . ...
ctbssinf 37374	Using the axiom of choice,...
ralssiun 37375	The index set of an indexe...
nlpineqsn 37376	For every point ` p ` of a...
nlpfvineqsn 37377	Given a subset ` A ` of ` ...
fvineqsnf1 37378	A theorem about functions ...
fvineqsneu 37379	A theorem about functions ...
fvineqsneq 37380	A theorem about functions ...
pibp16 37381	Property P000016 of pi-bas...
pibp19 37382	Property P000019 of pi-bas...
pibp21 37383	Property P000021 of pi-bas...
pibt1 37384	Theorem T000001 of pi-base...
pibt2 37385	Theorem T000002 of pi-base...
wl-section-prop 37386	Intuitionistic logic is no...
wl-section-boot 37390	In this section, I provide...
wl-luk-imim1i 37391	Inference adding common co...
wl-luk-syl 37392	An inference version of th...
wl-luk-imtrid 37393	A syllogism rule of infere...
wl-luk-pm2.18d 37394	Deduction based on reducti...
wl-luk-con4i 37395	Inference rule. Copy of ~...
wl-luk-pm2.24i 37396	Inference rule. Copy of ~...
wl-luk-a1i 37397	Inference rule. Copy of ~...
wl-luk-mpi 37398	A nested _modus ponens_ in...
wl-luk-imim2i 37399	Inference adding common an...
wl-luk-imtrdi 37400	A syllogism rule of infere...
wl-luk-ax3 37401	~ ax-3 proved from Lukasie...
wl-luk-ax1 37402	~ ax-1 proved from Lukasie...
wl-luk-pm2.27 37403	This theorem, called "Asse...
wl-luk-com12 37404	Inference that swaps (comm...
wl-luk-pm2.21 37405	From a wff and its negatio...
wl-luk-con1i 37406	A contraposition inference...
wl-luk-ja 37407	Inference joining the ante...
wl-luk-imim2 37408	A closed form of syllogism...
wl-luk-a1d 37409	Deduction introducing an e...
wl-luk-ax2 37410	~ ax-2 proved from Lukasie...
wl-luk-id 37411	Principle of identity. Th...
wl-luk-notnotr 37412	Converse of double negatio...
wl-luk-pm2.04 37413	Swap antecedents. Theorem...
wl-section-impchain 37414	An implication like ` ( ps...
wl-impchain-mp-x 37415	This series of theorems pr...
wl-impchain-mp-0 37416	This theorem is the start ...
wl-impchain-mp-1 37417	This theorem is in fact a ...
wl-impchain-mp-2 37418	This theorem is in fact a ...
wl-impchain-com-1.x 37419	It is often convenient to ...
wl-impchain-com-1.1 37420	A degenerate form of antec...
wl-impchain-com-1.2 37421	This theorem is in fact a ...
wl-impchain-com-1.3 37422	This theorem is in fact a ...
wl-impchain-com-1.4 37423	This theorem is in fact a ...
wl-impchain-com-n.m 37424	This series of theorems al...
wl-impchain-com-2.3 37425	This theorem is in fact a ...
wl-impchain-com-2.4 37426	This theorem is in fact a ...
wl-impchain-com-3.2.1 37427	This theorem is in fact a ...
wl-impchain-a1-x 37428	If an implication chain is...
wl-impchain-a1-1 37429	Inference rule, a copy of ...
wl-impchain-a1-2 37430	Inference rule, a copy of ...
wl-impchain-a1-3 37431	Inference rule, a copy of ...
wl-ifp-ncond1 37432	If one case of an ` if- ` ...
wl-ifp-ncond2 37433	If one case of an ` if- ` ...
wl-ifpimpr 37434	If one case of an ` if- ` ...
wl-ifp4impr 37435	If one case of an ` if- ` ...
wl-df-3xor 37436	Alternative definition of ...
wl-df3xor2 37437	Alternative definition of ...
wl-df3xor3 37438	Alternative form of ~ wl-d...
wl-3xortru 37439	If the first input is true...
wl-3xorfal 37440	If the first input is fals...
wl-3xorbi 37441	Triple xor can be replaced...
wl-3xorbi2 37442	Alternative form of ~ wl-3...
wl-3xorbi123d 37443	Equivalence theorem for tr...
wl-3xorbi123i 37444	Equivalence theorem for tr...
wl-3xorrot 37445	Rotation law for triple xo...
wl-3xorcoma 37446	Commutative law for triple...
wl-3xorcomb 37447	Commutative law for triple...
wl-3xornot1 37448	Flipping the first input f...
wl-3xornot 37449	Triple xor distributes ove...
wl-1xor 37450	In the recursive scheme ...
wl-2xor 37451	In the recursive scheme ...
wl-df-3mintru2 37452	Alternative definition of ...
wl-df2-3mintru2 37453	The adder carry in disjunc...
wl-df3-3mintru2 37454	The adder carry in conjunc...
wl-df4-3mintru2 37455	An alternative definition ...
wl-1mintru1 37456	Using the recursion formul...
wl-1mintru2 37457	Using the recursion formul...
wl-2mintru1 37458	Using the recursion formul...
wl-2mintru2 37459	Using the recursion formul...
wl-df3maxtru1 37460	Assuming "(n+1)-maxtru1" `...
wl-ax13lem1 37462	A version of ~ ax-wl-13v w...
wl-mps 37463	Replacing a nested consequ...
wl-syls1 37464	Replacing a nested consequ...
wl-syls2 37465	Replacing a nested anteced...
wl-embant 37466	A true wff can always be a...
wl-orel12 37467	In a conjunctive normal fo...
wl-cases2-dnf 37468	A particular instance of ~...
wl-cbvmotv 37469	Change bound variable. Us...
wl-moteq 37470	Change bound variable. Us...
wl-motae 37471	Change bound variable. Us...
wl-moae 37472	Two ways to express "at mo...
wl-euae 37473	Two ways to express "exact...
wl-nax6im 37474	The following series of th...
wl-hbae1 37475	This specialization of ~ h...
wl-naevhba1v 37476	An instance of ~ hbn1w app...
wl-spae 37477	Prove an instance of ~ sp ...
wl-speqv 37478	Under the assumption ` -. ...
wl-19.8eqv 37479	Under the assumption ` -. ...
wl-19.2reqv 37480	Under the assumption ` -. ...
wl-nfalv 37481	If ` x ` is not present in...
wl-nfimf1 37482	An antecedent is irrelevan...
wl-nfae1 37483	Unlike ~ nfae , this speci...
wl-nfnae1 37484	Unlike ~ nfnae , this spec...
wl-aetr 37485	A transitive law for varia...
wl-axc11r 37486	Same as ~ axc11r , but usi...
wl-dral1d 37487	A version of ~ dral1 with ...
wl-cbvalnaed 37488	~ wl-cbvalnae with a conte...
wl-cbvalnae 37489	A more general version of ...
wl-exeq 37490	The semantics of ` E. x y ...
wl-aleq 37491	The semantics of ` A. x y ...
wl-nfeqfb 37492	Extend ~ nfeqf to an equiv...
wl-nfs1t 37493	If ` y ` is not free in ` ...
wl-equsalvw 37494	Version of ~ equsalv with ...
wl-equsald 37495	Deduction version of ~ equ...
wl-equsaldv 37496	Deduction version of ~ equ...
wl-equsal 37497	A useful equivalence relat...
wl-equsal1t 37498	The expression ` x = y ` i...
wl-equsalcom 37499	This simple equivalence ea...
wl-equsal1i 37500	The antecedent ` x = y ` i...
wl-sbid2ft 37501	A more general version of ...
wl-cbvalsbi 37502	Change bounded variables i...
wl-sbrimt 37503	Substitution with a variab...
wl-sblimt 37504	Substitution with a variab...
wl-sb9v 37505	Commutation of quantificat...
wl-sb8ft 37506	Substitution of variable i...
wl-sb8eft 37507	Substitution of variable i...
wl-sb8t 37508	Substitution of variable i...
wl-sb8et 37509	Substitution of variable i...
wl-sbhbt 37510	Closed form of ~ sbhb . C...
wl-sbnf1 37511	Two ways expressing that `...
wl-equsb3 37512	~ equsb3 with a distinctor...
wl-equsb4 37513	Substitution applied to an...
wl-2sb6d 37514	Version of ~ 2sb6 with a c...
wl-sbcom2d-lem1 37515	Lemma used to prove ~ wl-s...
wl-sbcom2d-lem2 37516	Lemma used to prove ~ wl-s...
wl-sbcom2d 37517	Version of ~ sbcom2 with a...
wl-sbalnae 37518	A theorem used in eliminat...
wl-sbal1 37519	A theorem used in eliminat...
wl-sbal2 37520	Move quantifier in and out...
wl-2spsbbi 37521	~ spsbbi applied twice. (...
wl-lem-exsb 37522	This theorem provides a ba...
wl-lem-nexmo 37523	This theorem provides a ba...
wl-lem-moexsb 37524	The antecedent ` A. x ( ph...
wl-alanbii 37525	This theorem extends ~ ala...
wl-mo2df 37526	Version of ~ mof with a co...
wl-mo2tf 37527	Closed form of ~ mof with ...
wl-eudf 37528	Version of ~ eu6 with a co...
wl-eutf 37529	Closed form of ~ eu6 with ...
wl-euequf 37530	~ euequ proved with a dist...
wl-mo2t 37531	Closed form of ~ mof . (C...
wl-mo3t 37532	Closed form of ~ mo3 . (C...
wl-nfsbtv 37533	Closed form of ~ nfsbv . ...
wl-sb8eut 37534	Substitution of variable i...
wl-sb8eutv 37535	Substitution of variable i...
wl-sb8mot 37536	Substitution of variable i...
wl-sb8motv 37537	Substitution of variable i...
wl-issetft 37538	A closed form of ~ issetf ...
wl-axc11rc11 37539	Proving ~ axc11r from ~ ax...
wl-ax11-lem1 37541	A transitive law for varia...
wl-ax11-lem2 37542	Lemma. (Contributed by Wo...
wl-ax11-lem3 37543	Lemma. (Contributed by Wo...
wl-ax11-lem4 37544	Lemma. (Contributed by Wo...
wl-ax11-lem5 37545	Lemma. (Contributed by Wo...
wl-ax11-lem6 37546	Lemma. (Contributed by Wo...
wl-ax11-lem7 37547	Lemma. (Contributed by Wo...
wl-ax11-lem8 37548	Lemma. (Contributed by Wo...
wl-ax11-lem9 37549	The easy part when ` x ` c...
wl-ax11-lem10 37550	We now have prepared every...
wl-clabv 37551	Variant of ~ df-clab , whe...
wl-dfclab 37552	Rederive ~ df-clab from ~ ...
wl-clabtv 37553	Using class abstraction in...
wl-clabt 37554	Using class abstraction in...
rabiun 37555	Abstraction restricted to ...
iundif1 37556	Indexed union of class dif...
imadifss 37557	The difference of images i...
cureq 37558	Equality theorem for curry...
unceq 37559	Equality theorem for uncur...
curf 37560	Functional property of cur...
uncf 37561	Functional property of unc...
curfv 37562	Value of currying. (Contr...
uncov 37563	Value of uncurrying. (Con...
curunc 37564	Currying of uncurrying. (...
unccur 37565	Uncurrying of currying. (...
phpreu 37566	Theorem related to pigeonh...
finixpnum 37567	A finite Cartesian product...
fin2solem 37568	Lemma for ~ fin2so . (Con...
fin2so 37569	Any totally ordered Tarski...
ltflcei 37570	Theorem to move the floor ...
leceifl 37571	Theorem to move the floor ...
sin2h 37572	Half-angle rule for sine. ...
cos2h 37573	Half-angle rule for cosine...
tan2h 37574	Half-angle rule for tangen...
lindsadd 37575	In a vector space, the uni...
lindsdom 37576	A linearly independent set...
lindsenlbs 37577	A maximal linearly indepen...
matunitlindflem1 37578	One direction of ~ matunit...
matunitlindflem2 37579	One direction of ~ matunit...
matunitlindf 37580	A matrix over a field is i...
ptrest 37581	Expressing a restriction o...
ptrecube 37582	Any point in an open set o...
poimirlem1 37583	Lemma for ~ poimir - the v...
poimirlem2 37584	Lemma for ~ poimir - conse...
poimirlem3 37585	Lemma for ~ poimir to add ...
poimirlem4 37586	Lemma for ~ poimir connect...
poimirlem5 37587	Lemma for ~ poimir to esta...
poimirlem6 37588	Lemma for ~ poimir establi...
poimirlem7 37589	Lemma for ~ poimir , simil...
poimirlem8 37590	Lemma for ~ poimir , estab...
poimirlem9 37591	Lemma for ~ poimir , estab...
poimirlem10 37592	Lemma for ~ poimir establi...
poimirlem11 37593	Lemma for ~ poimir connect...
poimirlem12 37594	Lemma for ~ poimir connect...
poimirlem13 37595	Lemma for ~ poimir - for a...
poimirlem14 37596	Lemma for ~ poimir - for a...
poimirlem15 37597	Lemma for ~ poimir , that ...
poimirlem16 37598	Lemma for ~ poimir establi...
poimirlem17 37599	Lemma for ~ poimir establi...
poimirlem18 37600	Lemma for ~ poimir stating...
poimirlem19 37601	Lemma for ~ poimir establi...
poimirlem20 37602	Lemma for ~ poimir establi...
poimirlem21 37603	Lemma for ~ poimir stating...
poimirlem22 37604	Lemma for ~ poimir , that ...
poimirlem23 37605	Lemma for ~ poimir , two w...
poimirlem24 37606	Lemma for ~ poimir , two w...
poimirlem25 37607	Lemma for ~ poimir stating...
poimirlem26 37608	Lemma for ~ poimir showing...
poimirlem27 37609	Lemma for ~ poimir showing...
poimirlem28 37610	Lemma for ~ poimir , a var...
poimirlem29 37611	Lemma for ~ poimir connect...
poimirlem30 37612	Lemma for ~ poimir combini...
poimirlem31 37613	Lemma for ~ poimir , assig...
poimirlem32 37614	Lemma for ~ poimir , combi...
poimir 37615	Poincare-Miranda theorem. ...
broucube 37616	Brouwer - or as Kulpa call...
heicant 37617	Heine-Cantor theorem: a co...
opnmbllem0 37618	Lemma for ~ ismblfin ; cou...
mblfinlem1 37619	Lemma for ~ ismblfin , ord...
mblfinlem2 37620	Lemma for ~ ismblfin , eff...
mblfinlem3 37621	The difference between two...
mblfinlem4 37622	Backward direction of ~ is...
ismblfin 37623	Measurability in terms of ...
ovoliunnfl 37624	~ ovoliun is incompatible ...
ex-ovoliunnfl 37625	Demonstration of ~ ovoliun...
voliunnfl 37626	~ voliun is incompatible w...
volsupnfl 37627	~ volsup is incompatible w...
mbfresfi 37628	Measurability of a piecewi...
mbfposadd 37629	If the sum of two measurab...
cnambfre 37630	A real-valued, a.e. contin...
dvtanlem 37631	Lemma for ~ dvtan - the do...
dvtan 37632	Derivative of tangent. (C...
itg2addnclem 37633	An alternate expression fo...
itg2addnclem2 37634	Lemma for ~ itg2addnc . T...
itg2addnclem3 37635	Lemma incomprehensible in ...
itg2addnc 37636	Alternate proof of ~ itg2a...
itg2gt0cn 37637	~ itg2gt0 holds on functio...
ibladdnclem 37638	Lemma for ~ ibladdnc ; cf ...
ibladdnc 37639	Choice-free analogue of ~ ...
itgaddnclem1 37640	Lemma for ~ itgaddnc ; cf....
itgaddnclem2 37641	Lemma for ~ itgaddnc ; cf....
itgaddnc 37642	Choice-free analogue of ~ ...
iblsubnc 37643	Choice-free analogue of ~ ...
itgsubnc 37644	Choice-free analogue of ~ ...
iblabsnclem 37645	Lemma for ~ iblabsnc ; cf....
iblabsnc 37646	Choice-free analogue of ~ ...
iblmulc2nc 37647	Choice-free analogue of ~ ...
itgmulc2nclem1 37648	Lemma for ~ itgmulc2nc ; c...
itgmulc2nclem2 37649	Lemma for ~ itgmulc2nc ; c...
itgmulc2nc 37650	Choice-free analogue of ~ ...
itgabsnc 37651	Choice-free analogue of ~ ...
itggt0cn 37652	~ itggt0 holds for continu...
ftc1cnnclem 37653	Lemma for ~ ftc1cnnc ; cf....
ftc1cnnc 37654	Choice-free proof of ~ ftc...
ftc1anclem1 37655	Lemma for ~ ftc1anc - the ...
ftc1anclem2 37656	Lemma for ~ ftc1anc - rest...
ftc1anclem3 37657	Lemma for ~ ftc1anc - the ...
ftc1anclem4 37658	Lemma for ~ ftc1anc . (Co...
ftc1anclem5 37659	Lemma for ~ ftc1anc , the ...
ftc1anclem6 37660	Lemma for ~ ftc1anc - cons...
ftc1anclem7 37661	Lemma for ~ ftc1anc . (Co...
ftc1anclem8 37662	Lemma for ~ ftc1anc . (Co...
ftc1anc 37663	~ ftc1a holds for function...
ftc2nc 37664	Choice-free proof of ~ ftc...
asindmre 37665	Real part of domain of dif...
dvasin 37666	Derivative of arcsine. (C...
dvacos 37667	Derivative of arccosine. ...
dvreasin 37668	Real derivative of arcsine...
dvreacos 37669	Real derivative of arccosi...
areacirclem1 37670	Antiderivative of cross-se...
areacirclem2 37671	Endpoint-inclusive continu...
areacirclem3 37672	Integrability of cross-sec...
areacirclem4 37673	Endpoint-inclusive continu...
areacirclem5 37674	Finding the cross-section ...
areacirc 37675	The area of a circle of ra...
unirep 37676	Define a quantity whose de...
cover2 37677	Two ways of expressing the...
cover2g 37678	Two ways of expressing the...
brabg2 37679	Relation by a binary relat...
opelopab3 37680	Ordered pair membership in...
cocanfo 37681	Cancellation of a surjecti...
brresi2 37682	Restriction of a binary re...
fnopabeqd 37683	Equality deduction for fun...
fvopabf4g 37684	Function value of an opera...
fnopabco 37685	Composition of a function ...
opropabco 37686	Composition of an operator...
cocnv 37687	Composition with a functio...
f1ocan1fv 37688	Cancel a composition by a ...
f1ocan2fv 37689	Cancel a composition by th...
inixp 37690	Intersection of Cartesian ...
upixp 37691	Universal property of the ...
abrexdom 37692	An indexed set is dominate...
abrexdom2 37693	An indexed set is dominate...
ac6gf 37694	Axiom of Choice. (Contrib...
indexa 37695	If for every element of an...
indexdom 37696	If for every element of an...
frinfm 37697	A subset of a well-founded...
welb 37698	A nonempty subset of a wel...
supex2g 37699	Existence of supremum. (C...
supclt 37700	Closure of supremum. (Con...
supubt 37701	Upper bound property of su...
filbcmb 37702	Combine a finite set of lo...
fzmul 37703	Membership of a product in...
sdclem2 37704	Lemma for ~ sdc . (Contri...
sdclem1 37705	Lemma for ~ sdc . (Contri...
sdc 37706	Strong dependent choice. ...
fdc 37707	Finite version of dependen...
fdc1 37708	Variant of ~ fdc with no s...
seqpo 37709	Two ways to say that a seq...
incsequz 37710	An increasing sequence of ...
incsequz2 37711	An increasing sequence of ...
nnubfi 37712	A bounded above set of pos...
nninfnub 37713	An infinite set of positiv...
subspopn 37714	An open set is open in the...
neificl 37715	Neighborhoods are closed u...
lpss2 37716	Limit points of a subset a...
metf1o 37717	Use a bijection with a met...
blssp 37718	A ball in the subspace met...
mettrifi 37719	Generalized triangle inequ...
lmclim2 37720	A sequence in a metric spa...
geomcau 37721	If the distance between co...
caures 37722	The restriction of a Cauch...
caushft 37723	A shifted Cauchy sequence ...
constcncf 37724	A constant function is a c...
cnres2 37725	The restriction of a conti...
cnresima 37726	A continuous function is c...
cncfres 37727	A continuous function on c...
istotbnd 37731	The predicate "is a totall...
istotbnd2 37732	The predicate "is a totall...
istotbnd3 37733	A metric space is totally ...
totbndmet 37734	The predicate "totally bou...
0totbnd 37735	The metric (there is only ...
sstotbnd2 37736	Condition for a subset of ...
sstotbnd 37737	Condition for a subset of ...
sstotbnd3 37738	Use a net that is not nece...
totbndss 37739	A subset of a totally boun...
equivtotbnd 37740	If the metric ` M ` is "st...
isbnd 37742	The predicate "is a bounde...
bndmet 37743	A bounded metric space is ...
isbndx 37744	A "bounded extended metric...
isbnd2 37745	The predicate "is a bounde...
isbnd3 37746	A metric space is bounded ...
isbnd3b 37747	A metric space is bounded ...
bndss 37748	A subset of a bounded metr...
blbnd 37749	A ball is bounded. (Contr...
ssbnd 37750	A subset of a metric space...
totbndbnd 37751	A totally bounded metric s...
equivbnd 37752	If the metric ` M ` is "st...
bnd2lem 37753	Lemma for ~ equivbnd2 and ...
equivbnd2 37754	If balls are totally bound...
prdsbnd 37755	The product metric over fi...
prdstotbnd 37756	The product metric over fi...
prdsbnd2 37757	If balls are totally bound...
cntotbnd 37758	A subset of the complex nu...
cnpwstotbnd 37759	A subset of ` A ^ I ` , wh...
ismtyval 37762	The set of isometries betw...
isismty 37763	The condition "is an isome...
ismtycnv 37764	The inverse of an isometry...
ismtyima 37765	The image of a ball under ...
ismtyhmeolem 37766	Lemma for ~ ismtyhmeo . (...
ismtyhmeo 37767	An isometry is a homeomorp...
ismtybndlem 37768	Lemma for ~ ismtybnd . (C...
ismtybnd 37769	Isometries preserve bounde...
ismtyres 37770	A restriction of an isomet...
heibor1lem 37771	Lemma for ~ heibor1 . A c...
heibor1 37772	One half of ~ heibor , tha...
heiborlem1 37773	Lemma for ~ heibor . We w...
heiborlem2 37774	Lemma for ~ heibor . Subs...
heiborlem3 37775	Lemma for ~ heibor . Usin...
heiborlem4 37776	Lemma for ~ heibor . Usin...
heiborlem5 37777	Lemma for ~ heibor . The ...
heiborlem6 37778	Lemma for ~ heibor . Sinc...
heiborlem7 37779	Lemma for ~ heibor . Sinc...
heiborlem8 37780	Lemma for ~ heibor . The ...
heiborlem9 37781	Lemma for ~ heibor . Disc...
heiborlem10 37782	Lemma for ~ heibor . The ...
heibor 37783	Generalized Heine-Borel Th...
bfplem1 37784	Lemma for ~ bfp . The seq...
bfplem2 37785	Lemma for ~ bfp . Using t...
bfp 37786	Banach fixed point theorem...
rrnval 37789	The n-dimensional Euclidea...
rrnmval 37790	The value of the Euclidean...
rrnmet 37791	Euclidean space is a metri...
rrndstprj1 37792	The distance between two p...
rrndstprj2 37793	Bound on the distance betw...
rrncmslem 37794	Lemma for ~ rrncms . (Con...
rrncms 37795	Euclidean space is complet...
repwsmet 37796	The supremum metric on ` R...
rrnequiv 37797	The supremum metric on ` R...
rrntotbnd 37798	A set in Euclidean space i...
rrnheibor 37799	Heine-Borel theorem for Eu...
ismrer1 37800	An isometry between ` RR `...
reheibor 37801	Heine-Borel theorem for re...
iccbnd 37802	A closed interval in ` RR ...
icccmpALT 37803	A closed interval in ` RR ...
isass 37808	The predicate "is an assoc...
isexid 37809	The predicate ` G ` has a ...
ismgmOLD 37812	Obsolete version of ~ ismg...
clmgmOLD 37813	Obsolete version of ~ mgmc...
opidonOLD 37814	Obsolete version of ~ mndp...
rngopidOLD 37815	Obsolete version of ~ mndp...
opidon2OLD 37816	Obsolete version of ~ mndp...
isexid2 37817	If ` G e. ( Magma i^i ExId...
exidu1 37818	Uniqueness of the left and...
idrval 37819	The value of the identity ...
iorlid 37820	A magma right and left ide...
cmpidelt 37821	A magma right and left ide...
smgrpismgmOLD 37824	Obsolete version of ~ sgrp...
issmgrpOLD 37825	Obsolete version of ~ issg...
smgrpmgm 37826	A semigroup is a magma. (...
smgrpassOLD 37827	Obsolete version of ~ sgrp...
mndoissmgrpOLD 37830	Obsolete version of ~ mnds...
mndoisexid 37831	A monoid has an identity e...
mndoismgmOLD 37832	Obsolete version of ~ mndm...
mndomgmid 37833	A monoid is a magma with a...
ismndo 37834	The predicate "is a monoid...
ismndo1 37835	The predicate "is a monoid...
ismndo2 37836	The predicate "is a monoid...
grpomndo 37837	A group is a monoid. (Con...
exidcl 37838	Closure of the binary oper...
exidreslem 37839	Lemma for ~ exidres and ~ ...
exidres 37840	The restriction of a binar...
exidresid 37841	The restriction of a binar...
ablo4pnp 37842	A commutative/associative ...
grpoeqdivid 37843	Two group elements are equ...
grposnOLD 37844	The group operation for th...
elghomlem1OLD 37847	Obsolete as of 15-Mar-2020...
elghomlem2OLD 37848	Obsolete as of 15-Mar-2020...
elghomOLD 37849	Obsolete version of ~ isgh...
ghomlinOLD 37850	Obsolete version of ~ ghml...
ghomidOLD 37851	Obsolete version of ~ ghmi...
ghomf 37852	Mapping property of a grou...
ghomco 37853	The composition of two gro...
ghomdiv 37854	Group homomorphisms preser...
grpokerinj 37855	A group homomorphism is in...
relrngo 37858	The class of all unital ri...
isrngo 37859	The predicate "is a (unita...
isrngod 37860	Conditions that determine ...
rngoi 37861	The properties of a unital...
rngosm 37862	Functionality of the multi...
rngocl 37863	Closure of the multiplicat...
rngoid 37864	The multiplication operati...
rngoideu 37865	The unity element of a rin...
rngodi 37866	Distributive law for the m...
rngodir 37867	Distributive law for the m...
rngoass 37868	Associative law for the mu...
rngo2 37869	A ring element plus itself...
rngoablo 37870	A ring's addition operatio...
rngoablo2 37871	In a unital ring the addit...
rngogrpo 37872	A ring's addition operatio...
rngone0 37873	The base set of a ring is ...
rngogcl 37874	Closure law for the additi...
rngocom 37875	The addition operation of ...
rngoaass 37876	The addition operation of ...
rngoa32 37877	The addition operation of ...
rngoa4 37878	Rearrangement of 4 terms i...
rngorcan 37879	Right cancellation law for...
rngolcan 37880	Left cancellation law for ...
rngo0cl 37881	A ring has an additive ide...
rngo0rid 37882	The additive identity of a...
rngo0lid 37883	The additive identity of a...
rngolz 37884	The zero of a unital ring ...
rngorz 37885	The zero of a unital ring ...
rngosn3 37886	Obsolete as of 25-Jan-2020...
rngosn4 37887	Obsolete as of 25-Jan-2020...
rngosn6 37888	Obsolete as of 25-Jan-2020...
rngonegcl 37889	A ring is closed under neg...
rngoaddneg1 37890	Adding the negative in a r...
rngoaddneg2 37891	Adding the negative in a r...
rngosub 37892	Subtraction in a ring, in ...
rngmgmbs4 37893	The range of an internal o...
rngodm1dm2 37894	In a unital ring the domai...
rngorn1 37895	In a unital ring the range...
rngorn1eq 37896	In a unital ring the range...
rngomndo 37897	In a unital ring the multi...
rngoidmlem 37898	The unity element of a rin...
rngolidm 37899	The unity element of a rin...
rngoridm 37900	The unity element of a rin...
rngo1cl 37901	The unity element of a rin...
rngoueqz 37902	Obsolete as of 23-Jan-2020...
rngonegmn1l 37903	Negation in a ring is the ...
rngonegmn1r 37904	Negation in a ring is the ...
rngoneglmul 37905	Negation of a product in a...
rngonegrmul 37906	Negation of a product in a...
rngosubdi 37907	Ring multiplication distri...
rngosubdir 37908	Ring multiplication distri...
zerdivemp1x 37909	In a unital ring a left in...
isdivrngo 37912	The predicate "is a divisi...
drngoi 37913	The properties of a divisi...
gidsn 37914	Obsolete as of 23-Jan-2020...
zrdivrng 37915	The zero ring is not a div...
dvrunz 37916	In a division ring the rin...
isgrpda 37917	Properties that determine ...
isdrngo1 37918	The predicate "is a divisi...
divrngcl 37919	The product of two nonzero...
isdrngo2 37920	A division ring is a ring ...
isdrngo3 37921	A division ring is a ring ...
rngohomval 37926	The set of ring homomorphi...
isrngohom 37927	The predicate "is a ring h...
rngohomf 37928	A ring homomorphism is a f...
rngohomcl 37929	Closure law for a ring hom...
rngohom1 37930	A ring homomorphism preser...
rngohomadd 37931	Ring homomorphisms preserv...
rngohommul 37932	Ring homomorphisms preserv...
rngogrphom 37933	A ring homomorphism is a g...
rngohom0 37934	A ring homomorphism preser...
rngohomsub 37935	Ring homomorphisms preserv...
rngohomco 37936	The composition of two rin...
rngokerinj 37937	A ring homomorphism is inj...
rngoisoval 37939	The set of ring isomorphis...
isrngoiso 37940	The predicate "is a ring i...
rngoiso1o 37941	A ring isomorphism is a bi...
rngoisohom 37942	A ring isomorphism is a ri...
rngoisocnv 37943	The inverse of a ring isom...
rngoisoco 37944	The composition of two rin...
isriscg 37946	The ring isomorphism relat...
isrisc 37947	The ring isomorphism relat...
risc 37948	The ring isomorphism relat...
risci 37949	Determine that two rings a...
riscer 37950	Ring isomorphism is an equ...
iscom2 37957	A device to add commutativ...
iscrngo 37958	The predicate "is a commut...
iscrngo2 37959	The predicate "is a commut...
iscringd 37960	Conditions that determine ...
flddivrng 37961	A field is a division ring...
crngorngo 37962	A commutative ring is a ri...
crngocom 37963	The multiplication operati...
crngm23 37964	Commutative/associative la...
crngm4 37965	Commutative/associative la...
fldcrngo 37966	A field is a commutative r...
isfld2 37967	The predicate "is a field"...
crngohomfo 37968	The image of a homomorphis...
idlval 37975	The class of ideals of a r...
isidl 37976	The predicate "is an ideal...
isidlc 37977	The predicate "is an ideal...
idlss 37978	An ideal of ` R ` is a sub...
idlcl 37979	An element of an ideal is ...
idl0cl 37980	An ideal contains ` 0 ` . ...
idladdcl 37981	An ideal is closed under a...
idllmulcl 37982	An ideal is closed under m...
idlrmulcl 37983	An ideal is closed under m...
idlnegcl 37984	An ideal is closed under n...
idlsubcl 37985	An ideal is closed under s...
rngoidl 37986	A ring ` R ` is an ` R ` i...
0idl 37987	The set containing only ` ...
1idl 37988	Two ways of expressing the...
0rngo 37989	In a ring, ` 0 = 1 ` iff t...
divrngidl 37990	The only ideals in a divis...
intidl 37991	The intersection of a none...
inidl 37992	The intersection of two id...
unichnidl 37993	The union of a nonempty ch...
keridl 37994	The kernel of a ring homom...
pridlval 37995	The class of prime ideals ...
ispridl 37996	The predicate "is a prime ...
pridlidl 37997	A prime ideal is an ideal....
pridlnr 37998	A prime ideal is a proper ...
pridl 37999	The main property of a pri...
ispridl2 38000	A condition that shows an ...
maxidlval 38001	The set of maximal ideals ...
ismaxidl 38002	The predicate "is a maxima...
maxidlidl 38003	A maximal ideal is an idea...
maxidlnr 38004	A maximal ideal is proper....
maxidlmax 38005	A maximal ideal is a maxim...
maxidln1 38006	One is not contained in an...
maxidln0 38007	A ring with a maximal idea...
isprrngo 38012	The predicate "is a prime ...
prrngorngo 38013	A prime ring is a ring. (...
smprngopr 38014	A simple ring (one whose o...
divrngpr 38015	A division ring is a prime...
isdmn 38016	The predicate "is a domain...
isdmn2 38017	The predicate "is a domain...
dmncrng 38018	A domain is a commutative ...
dmnrngo 38019	A domain is a ring. (Cont...
flddmn 38020	A field is a domain. (Con...
igenval 38023	The ideal generated by a s...
igenss 38024	A set is a subset of the i...
igenidl 38025	The ideal generated by a s...
igenmin 38026	The ideal generated by a s...
igenidl2 38027	The ideal generated by an ...
igenval2 38028	The ideal generated by a s...
prnc 38029	A principal ideal (an idea...
isfldidl 38030	Determine if a ring is a f...
isfldidl2 38031	Determine if a ring is a f...
ispridlc 38032	The predicate "is a prime ...
pridlc 38033	Property of a prime ideal ...
pridlc2 38034	Property of a prime ideal ...
pridlc3 38035	Property of a prime ideal ...
isdmn3 38036	The predicate "is a domain...
dmnnzd 38037	A domain has no zero-divis...
dmncan1 38038	Cancellation law for domai...
dmncan2 38039	Cancellation law for domai...
efald2 38040	A proof by contradiction. ...
notbinot1 38041	Simplification rule of neg...
bicontr 38042	Biconditional of its own n...
impor 38043	An equivalent formula for ...
orfa 38044	The falsum ` F. ` can be r...
notbinot2 38045	Commutation rule between n...
biimpor 38046	A rewriting rule for bicon...
orfa1 38047	Add a contradicting disjun...
orfa2 38048	Remove a contradicting dis...
bifald 38049	Infer the equivalence to a...
orsild 38050	A lemma for not-or-not eli...
orsird 38051	A lemma for not-or-not eli...
cnf1dd 38052	A lemma for Conjunctive No...
cnf2dd 38053	A lemma for Conjunctive No...
cnfn1dd 38054	A lemma for Conjunctive No...
cnfn2dd 38055	A lemma for Conjunctive No...
or32dd 38056	A rearrangement of disjunc...
notornotel1 38057	A lemma for not-or-not eli...
notornotel2 38058	A lemma for not-or-not eli...
contrd 38059	A proof by contradiction, ...
an12i 38060	An inference from commutin...
exmid2 38061	An excluded middle law. (...
selconj 38062	An inference for selecting...
truconj 38063	Add true as a conjunct. (...
orel 38064	An inference for disjuncti...
negel 38065	An inference for negation ...
botel 38066	An inference for bottom el...
tradd 38067	Add top ad a conjunct. (C...
gm-sbtru 38068	Substitution does not chan...
sbfal 38069	Substitution does not chan...
sbcani 38070	Distribution of class subs...
sbcori 38071	Distribution of class subs...
sbcimi 38072	Distribution of class subs...
sbcni 38073	Move class substitution in...
sbali 38074	Discard class substitution...
sbexi 38075	Discard class substitution...
sbcalf 38076	Move universal quantifier ...
sbcexf 38077	Move existential quantifie...
sbcalfi 38078	Move universal quantifier ...
sbcexfi 38079	Move existential quantifie...
spsbcdi 38080	A lemma for eliminating a ...
alrimii 38081	A lemma for introducing a ...
spesbcdi 38082	A lemma for introducing an...
exlimddvf 38083	A lemma for eliminating an...
exlimddvfi 38084	A lemma for eliminating an...
sbceq1ddi 38085	A lemma for eliminating in...
sbccom2lem 38086	Lemma for ~ sbccom2 . (Co...
sbccom2 38087	Commutative law for double...
sbccom2f 38088	Commutative law for double...
sbccom2fi 38089	Commutative law for double...
csbcom2fi 38090	Commutative law for double...
fald 38091	Refutation of falsity, in ...
tsim1 38092	A Tseitin axiom for logica...
tsim2 38093	A Tseitin axiom for logica...
tsim3 38094	A Tseitin axiom for logica...
tsbi1 38095	A Tseitin axiom for logica...
tsbi2 38096	A Tseitin axiom for logica...
tsbi3 38097	A Tseitin axiom for logica...
tsbi4 38098	A Tseitin axiom for logica...
tsxo1 38099	A Tseitin axiom for logica...
tsxo2 38100	A Tseitin axiom for logica...
tsxo3 38101	A Tseitin axiom for logica...
tsxo4 38102	A Tseitin axiom for logica...
tsan1 38103	A Tseitin axiom for logica...
tsan2 38104	A Tseitin axiom for logica...
tsan3 38105	A Tseitin axiom for logica...
tsna1 38106	A Tseitin axiom for logica...
tsna2 38107	A Tseitin axiom for logica...
tsna3 38108	A Tseitin axiom for logica...
tsor1 38109	A Tseitin axiom for logica...
tsor2 38110	A Tseitin axiom for logica...
tsor3 38111	A Tseitin axiom for logica...
ts3an1 38112	A Tseitin axiom for triple...
ts3an2 38113	A Tseitin axiom for triple...
ts3an3 38114	A Tseitin axiom for triple...
ts3or1 38115	A Tseitin axiom for triple...
ts3or2 38116	A Tseitin axiom for triple...
ts3or3 38117	A Tseitin axiom for triple...
iuneq2f 38118	Equality deduction for ind...
rabeq12f 38119	Equality deduction for res...
csbeq12 38120	Equality deduction for sub...
sbeqi 38121	Equality deduction for sub...
ralbi12f 38122	Equality deduction for res...
oprabbi 38123	Equality deduction for cla...
mpobi123f 38124	Equality deduction for map...
iuneq12f 38125	Equality deduction for ind...
iineq12f 38126	Equality deduction for ind...
opabbi 38127	Equality deduction for cla...
mptbi12f 38128	Equality deduction for map...
orcomdd 38129	Commutativity of logic dis...
scottexf 38130	A version of ~ scottex wit...
scott0f 38131	A version of ~ scott0 with...
scottn0f 38132	A version of ~ scott0f wit...
ac6s3f 38133	Generalization of the Axio...
ac6s6 38134	Generalization of the Axio...
ac6s6f 38135	Generalization of the Axio...
el2v1 38179	New way ( ~ elv , and the ...
el3v1 38180	New way ( ~ elv , and the ...
el3v2 38181	New way ( ~ elv , and the ...
el3v12 38182	New way ( ~ elv , and the ...
el3v13 38183	New way ( ~ elv , and the ...
el3v23 38184	New way ( ~ elv , and the ...
anan 38185	Multiple commutations in c...
triantru3 38186	A wff is equivalent to its...
bianim 38187	Exchanging conjunction in ...
biorfd 38188	A wff is equivalent to its...
eqbrtr 38189	Substitution of equal clas...
eqbrb 38190	Substitution of equal clas...
eqeltr 38191	Substitution of equal clas...
eqelb 38192	Substitution of equal clas...
eqeqan2d 38193	Implication of introducing...
suceqsneq 38194	One-to-one relationship be...
sucdifsn2 38195	Absorption of union with a...
sucdifsn 38196	The difference between the...
disjresin 38197	The restriction to a disjo...
disjresdisj 38198	The intersection of restri...
disjresdif 38199	The difference between res...
disjresundif 38200	Lemma for ~ ressucdifsn2 ....
ressucdifsn2 38201	The difference between res...
ressucdifsn 38202	The difference between res...
inres2 38203	Two ways of expressing the...
coideq 38204	Equality theorem for compo...
nexmo1 38205	If there is no case where ...
ralin 38206	Restricted universal quant...
r2alan 38207	Double restricted universa...
ssrabi 38208	Inference of restricted ab...
rabimbieq 38209	Restricted equivalent wff'...
abeqin 38210	Intersection with class ab...
abeqinbi 38211	Intersection with class ab...
rabeqel 38212	Class element of a restric...
eqrelf 38213	The equality connective be...
br1cnvinxp 38214	Binary relation on the con...
releleccnv 38215	Elementhood in a converse ...
releccnveq 38216	Equality of converse ` R `...
opelvvdif 38217	Negated elementhood of ord...
vvdifopab 38218	Ordered-pair class abstrac...
brvdif 38219	Binary relation with unive...
brvdif2 38220	Binary relation with unive...
brvvdif 38221	Binary relation with the c...
brvbrvvdif 38222	Binary relation with the c...
brcnvep 38223	The converse of the binary...
elecALTV 38224	Elementhood in the ` R ` -...
brcnvepres 38225	Restricted converse epsilo...
brres2 38226	Binary relation on a restr...
br1cnvres 38227	Binary relation on the con...
eldmres 38228	Elementhood in the domain ...
elrnres 38229	Element of the range of a ...
eldmressnALTV 38230	Element of the domain of a...
elrnressn 38231	Element of the range of a ...
eldm4 38232	Elementhood in a domain. ...
eldmres2 38233	Elementhood in the domain ...
eceq1i 38234	Equality theorem for ` C `...
elecres 38235	Elementhood in the restric...
ecres 38236	Restricted coset of ` B ` ...
ecres2 38237	The restricted coset of ` ...
eccnvepres 38238	Restricted converse epsilo...
eleccnvep 38239	Elementhood in the convers...
eccnvep 38240	The converse epsilon coset...
extep 38241	Property of epsilon relati...
disjeccnvep 38242	Property of the epsilon re...
eccnvepres2 38243	The restricted converse ep...
eccnvepres3 38244	Condition for a restricted...
eldmqsres 38245	Elementhood in a restricte...
eldmqsres2 38246	Elementhood in a restricte...
qsss1 38247	Subclass theorem for quoti...
qseq1i 38248	Equality theorem for quoti...
brinxprnres 38249	Binary relation on a restr...
inxprnres 38250	Restriction of a class as ...
dfres4 38251	Alternate definition of th...
exan3 38252	Equivalent expressions wit...
exanres 38253	Equivalent expressions wit...
exanres3 38254	Equivalent expressions wit...
exanres2 38255	Equivalent expressions wit...
cnvepres 38256	Restricted converse epsilo...
eqrel2 38257	Equality of relations. (C...
rncnv 38258	Range of converse is the d...
dfdm6 38259	Alternate definition of do...
dfrn6 38260	Alternate definition of ra...
rncnvepres 38261	The range of the restricte...
dmecd 38262	Equality of the coset of `...
dmec2d 38263	Equality of the coset of `...
brid 38264	Property of the identity b...
ideq2 38265	For sets, the identity bin...
idresssidinxp 38266	Condition for the identity...
idreseqidinxp 38267	Condition for the identity...
extid 38268	Property of identity relat...
inxpss 38269	Two ways to say that an in...
idinxpss 38270	Two ways to say that an in...
ref5 38271	Two ways to say that an in...
inxpss3 38272	Two ways to say that an in...
inxpss2 38273	Two ways to say that inter...
inxpssidinxp 38274	Two ways to say that inter...
idinxpssinxp 38275	Two ways to say that inter...
idinxpssinxp2 38276	Identity intersection with...
idinxpssinxp3 38277	Identity intersection with...
idinxpssinxp4 38278	Identity intersection with...
relcnveq3 38279	Two ways of saying a relat...
relcnveq 38280	Two ways of saying a relat...
relcnveq2 38281	Two ways of saying a relat...
relcnveq4 38282	Two ways of saying a relat...
qsresid 38283	Simplification of a specia...
n0elqs 38284	Two ways of expressing tha...
n0elqs2 38285	Two ways of expressing tha...
ecex2 38286	Condition for a coset to b...
uniqsALTV 38287	The union of a quotient se...
imaexALTV 38288	Existence of an image of a...
ecexALTV 38289	Existence of a coset, like...
rnresequniqs 38290	The range of a restriction...
n0el2 38291	Two ways of expressing tha...
cnvepresex 38292	Sethood condition for the ...
eccnvepex 38293	The converse epsilon coset...
cnvepimaex 38294	The image of converse epsi...
cnvepima 38295	The image of converse epsi...
inex3 38296	Sufficient condition for t...
inxpex 38297	Sufficient condition for a...
eqres 38298	Converting a class constan...
brrabga 38299	The law of concretion for ...
brcnvrabga 38300	The law of concretion for ...
opideq 38301	Equality conditions for or...
iss2 38302	A subclass of the identity...
eldmcnv 38303	Elementhood in a domain of...
dfrel5 38304	Alternate definition of th...
dfrel6 38305	Alternate definition of th...
cnvresrn 38306	Converse restricted to ran...
relssinxpdmrn 38307	Subset of restriction, spe...
cnvref4 38308	Two ways to say that a rel...
cnvref5 38309	Two ways to say that a rel...
ecin0 38310	Two ways of saying that th...
ecinn0 38311	Two ways of saying that th...
ineleq 38312	Equivalence of restricted ...
inecmo 38313	Equivalence of a double re...
inecmo2 38314	Equivalence of a double re...
ineccnvmo 38315	Equivalence of a double re...
alrmomorn 38316	Equivalence of an "at most...
alrmomodm 38317	Equivalence of an "at most...
ineccnvmo2 38318	Equivalence of a double un...
inecmo3 38319	Equivalence of a double un...
moeu2 38320	Uniqueness is equivalent t...
mopickr 38321	"At most one" picks a vari...
moantr 38322	Sufficient condition for t...
brabidgaw 38323	The law of concretion for ...
brabidga 38324	The law of concretion for ...
inxp2 38325	Intersection with a Cartes...
opabf 38326	A class abstraction of a c...
ec0 38327	The empty-coset of a class...
brcnvin 38328	Intersection with a conver...
xrnss3v 38330	A range Cartesian product ...
xrnrel 38331	A range Cartesian product ...
brxrn 38332	Characterize a ternary rel...
brxrn2 38333	A characterization of the ...
dfxrn2 38334	Alternate definition of th...
xrneq1 38335	Equality theorem for the r...
xrneq1i 38336	Equality theorem for the r...
xrneq1d 38337	Equality theorem for the r...
xrneq2 38338	Equality theorem for the r...
xrneq2i 38339	Equality theorem for the r...
xrneq2d 38340	Equality theorem for the r...
xrneq12 38341	Equality theorem for the r...
xrneq12i 38342	Equality theorem for the r...
xrneq12d 38343	Equality theorem for the r...
elecxrn 38344	Elementhood in the ` ( R |...
ecxrn 38345	The ` ( R |X. S ) ` -coset...
disjressuc2 38346	Double restricted quantifi...
disjecxrn 38347	Two ways of saying that ` ...
disjecxrncnvep 38348	Two ways of saying that co...
disjsuc2 38349	Double restricted quantifi...
xrninxp 38350	Intersection of a range Ca...
xrninxp2 38351	Intersection of a range Ca...
xrninxpex 38352	Sufficient condition for t...
inxpxrn 38353	Two ways to express the in...
br1cnvxrn2 38354	The converse of a binary r...
elec1cnvxrn2 38355	Elementhood in the convers...
rnxrn 38356	Range of the range Cartesi...
rnxrnres 38357	Range of a range Cartesian...
rnxrncnvepres 38358	Range of a range Cartesian...
rnxrnidres 38359	Range of a range Cartesian...
xrnres 38360	Two ways to express restri...
xrnres2 38361	Two ways to express restri...
xrnres3 38362	Two ways to express restri...
xrnres4 38363	Two ways to express restri...
xrnresex 38364	Sufficient condition for a...
xrnidresex 38365	Sufficient condition for a...
xrncnvepresex 38366	Sufficient condition for a...
brin2 38367	Binary relation on an inte...
brin3 38368	Binary relation on an inte...
dfcoss2 38371	Alternate definition of th...
dfcoss3 38372	Alternate definition of th...
dfcoss4 38373	Alternate definition of th...
cosscnv 38374	Class of cosets by the con...
coss1cnvres 38375	Class of cosets by the con...
coss2cnvepres 38376	Special case of ~ coss1cnv...
cossex 38377	If ` A ` is a set then the...
cosscnvex 38378	If ` A ` is a set then the...
1cosscnvepresex 38379	Sufficient condition for a...
1cossxrncnvepresex 38380	Sufficient condition for a...
relcoss 38381	Cosets by ` R ` is a relat...
relcoels 38382	Coelements on ` A ` is a r...
cossss 38383	Subclass theorem for the c...
cosseq 38384	Equality theorem for the c...
cosseqi 38385	Equality theorem for the c...
cosseqd 38386	Equality theorem for the c...
1cossres 38387	The class of cosets by a r...
dfcoels 38388	Alternate definition of th...
brcoss 38389	` A ` and ` B ` are cosets...
brcoss2 38390	Alternate form of the ` A ...
brcoss3 38391	Alternate form of the ` A ...
brcosscnvcoss 38392	For sets, the ` A ` and ` ...
brcoels 38393	` B ` and ` C ` are coelem...
cocossss 38394	Two ways of saying that co...
cnvcosseq 38395	The converse of cosets by ...
br2coss 38396	Cosets by ` ,~ R ` binary ...
br1cossres 38397	` B ` and ` C ` are cosets...
br1cossres2 38398	` B ` and ` C ` are cosets...
brressn 38399	Binary relation on a restr...
ressn2 38400	A class ' R ' restricted t...
refressn 38401	Any class ' R ' restricted...
antisymressn 38402	Every class ' R ' restrict...
trressn 38403	Any class ' R ' restricted...
relbrcoss 38404	` A ` and ` B ` are cosets...
br1cossinres 38405	` B ` and ` C ` are cosets...
br1cossxrnres 38406	` <. B , C >. ` and ` <. D...
br1cossinidres 38407	` B ` and ` C ` are cosets...
br1cossincnvepres 38408	` B ` and ` C ` are cosets...
br1cossxrnidres 38409	` <. B , C >. ` and ` <. D...
br1cossxrncnvepres 38410	` <. B , C >. ` and ` <. D...
dmcoss3 38411	The domain of cosets is th...
dmcoss2 38412	The domain of cosets is th...
rncossdmcoss 38413	The range of cosets is the...
dm1cosscnvepres 38414	The domain of cosets of th...
dmcoels 38415	The domain of coelements i...
eldmcoss 38416	Elementhood in the domain ...
eldmcoss2 38417	Elementhood in the domain ...
eldm1cossres 38418	Elementhood in the domain ...
eldm1cossres2 38419	Elementhood in the domain ...
refrelcosslem 38420	Lemma for the left side of...
refrelcoss3 38421	The class of cosets by ` R...
refrelcoss2 38422	The class of cosets by ` R...
symrelcoss3 38423	The class of cosets by ` R...
symrelcoss2 38424	The class of cosets by ` R...
cossssid 38425	Equivalent expressions for...
cossssid2 38426	Equivalent expressions for...
cossssid3 38427	Equivalent expressions for...
cossssid4 38428	Equivalent expressions for...
cossssid5 38429	Equivalent expressions for...
brcosscnv 38430	` A ` and ` B ` are cosets...
brcosscnv2 38431	` A ` and ` B ` are cosets...
br1cosscnvxrn 38432	` A ` and ` B ` are cosets...
1cosscnvxrn 38433	Cosets by the converse ran...
cosscnvssid3 38434	Equivalent expressions for...
cosscnvssid4 38435	Equivalent expressions for...
cosscnvssid5 38436	Equivalent expressions for...
coss0 38437	Cosets by the empty set ar...
cossid 38438	Cosets by the identity rel...
cosscnvid 38439	Cosets by the converse ide...
trcoss 38440	Sufficient condition for t...
eleccossin 38441	Two ways of saying that th...
trcoss2 38442	Equivalent expressions for...
elrels2 38444	The element of the relatio...
elrelsrel 38445	The element of the relatio...
elrelsrelim 38446	The element of the relatio...
elrels5 38447	Equivalent expressions for...
elrels6 38448	Equivalent expressions for...
elrelscnveq3 38449	Two ways of saying a relat...
elrelscnveq 38450	Two ways of saying a relat...
elrelscnveq2 38451	Two ways of saying a relat...
elrelscnveq4 38452	Two ways of saying a relat...
cnvelrels 38453	The converse of a set is a...
cosselrels 38454	Cosets of sets are element...
cosscnvelrels 38455	Cosets of converse sets ar...
dfssr2 38457	Alternate definition of th...
relssr 38458	The subset relation is a r...
brssr 38459	The subset relation and su...
brssrid 38460	Any set is a subset of its...
issetssr 38461	Two ways of expressing set...
brssrres 38462	Restricted subset binary r...
br1cnvssrres 38463	Restricted converse subset...
brcnvssr 38464	The converse of a subset r...
brcnvssrid 38465	Any set is a converse subs...
br1cossxrncnvssrres 38466	` <. B , C >. ` and ` <. D...
extssr 38467	Property of subset relatio...
dfrefrels2 38471	Alternate definition of th...
dfrefrels3 38472	Alternate definition of th...
dfrefrel2 38473	Alternate definition of th...
dfrefrel3 38474	Alternate definition of th...
dfrefrel5 38475	Alternate definition of th...
elrefrels2 38476	Element of the class of re...
elrefrels3 38477	Element of the class of re...
elrefrelsrel 38478	For sets, being an element...
refreleq 38479	Equality theorem for refle...
refrelid 38480	Identity relation is refle...
refrelcoss 38481	The class of cosets by ` R...
refrelressn 38482	Any class ' R ' restricted...
dfcnvrefrels2 38486	Alternate definition of th...
dfcnvrefrels3 38487	Alternate definition of th...
dfcnvrefrel2 38488	Alternate definition of th...
dfcnvrefrel3 38489	Alternate definition of th...
dfcnvrefrel4 38490	Alternate definition of th...
dfcnvrefrel5 38491	Alternate definition of th...
elcnvrefrels2 38492	Element of the class of co...
elcnvrefrels3 38493	Element of the class of co...
elcnvrefrelsrel 38494	For sets, being an element...
cnvrefrelcoss2 38495	Necessary and sufficient c...
cosselcnvrefrels2 38496	Necessary and sufficient c...
cosselcnvrefrels3 38497	Necessary and sufficient c...
cosselcnvrefrels4 38498	Necessary and sufficient c...
cosselcnvrefrels5 38499	Necessary and sufficient c...
dfsymrels2 38503	Alternate definition of th...
dfsymrels3 38504	Alternate definition of th...
dfsymrels4 38505	Alternate definition of th...
dfsymrels5 38506	Alternate definition of th...
dfsymrel2 38507	Alternate definition of th...
dfsymrel3 38508	Alternate definition of th...
dfsymrel4 38509	Alternate definition of th...
dfsymrel5 38510	Alternate definition of th...
elsymrels2 38511	Element of the class of sy...
elsymrels3 38512	Element of the class of sy...
elsymrels4 38513	Element of the class of sy...
elsymrels5 38514	Element of the class of sy...
elsymrelsrel 38515	For sets, being an element...
symreleq 38516	Equality theorem for symme...
symrelim 38517	Symmetric relation implies...
symrelcoss 38518	The class of cosets by ` R...
idsymrel 38519	The identity relation is s...
epnsymrel 38520	The membership (epsilon) r...
symrefref2 38521	Symmetry is a sufficient c...
symrefref3 38522	Symmetry is a sufficient c...
refsymrels2 38523	Elements of the class of r...
refsymrels3 38524	Elements of the class of r...
refsymrel2 38525	A relation which is reflex...
refsymrel3 38526	A relation which is reflex...
elrefsymrels2 38527	Elements of the class of r...
elrefsymrels3 38528	Elements of the class of r...
elrefsymrelsrel 38529	For sets, being an element...
dftrrels2 38533	Alternate definition of th...
dftrrels3 38534	Alternate definition of th...
dftrrel2 38535	Alternate definition of th...
dftrrel3 38536	Alternate definition of th...
eltrrels2 38537	Element of the class of tr...
eltrrels3 38538	Element of the class of tr...
eltrrelsrel 38539	For sets, being an element...
trreleq 38540	Equality theorem for the t...
trrelressn 38541	Any class ' R ' restricted...
dfeqvrels2 38546	Alternate definition of th...
dfeqvrels3 38547	Alternate definition of th...
dfeqvrel2 38548	Alternate definition of th...
dfeqvrel3 38549	Alternate definition of th...
eleqvrels2 38550	Element of the class of eq...
eleqvrels3 38551	Element of the class of eq...
eleqvrelsrel 38552	For sets, being an element...
elcoeleqvrels 38553	Elementhood in the coeleme...
elcoeleqvrelsrel 38554	For sets, being an element...
eqvrelrel 38555	An equivalence relation is...
eqvrelrefrel 38556	An equivalence relation is...
eqvrelsymrel 38557	An equivalence relation is...
eqvreltrrel 38558	An equivalence relation is...
eqvrelim 38559	Equivalence relation impli...
eqvreleq 38560	Equality theorem for equiv...
eqvreleqi 38561	Equality theorem for equiv...
eqvreleqd 38562	Equality theorem for equiv...
eqvrelsym 38563	An equivalence relation is...
eqvrelsymb 38564	An equivalence relation is...
eqvreltr 38565	An equivalence relation is...
eqvreltrd 38566	A transitivity relation fo...
eqvreltr4d 38567	A transitivity relation fo...
eqvrelref 38568	An equivalence relation is...
eqvrelth 38569	Basic property of equivale...
eqvrelcl 38570	Elementhood in the field o...
eqvrelthi 38571	Basic property of equivale...
eqvreldisj 38572	Equivalence classes do not...
qsdisjALTV 38573	Elements of a quotient set...
eqvrelqsel 38574	If an element of a quotien...
eqvrelcoss 38575	Two ways to express equiva...
eqvrelcoss3 38576	Two ways to express equiva...
eqvrelcoss2 38577	Two ways to express equiva...
eqvrelcoss4 38578	Two ways to express equiva...
dfcoeleqvrels 38579	Alternate definition of th...
dfcoeleqvrel 38580	Alternate definition of th...
brredunds 38584	Binary relation on the cla...
brredundsredund 38585	For sets, binary relation ...
redundss3 38586	Implication of redundancy ...
redundeq1 38587	Equivalence of redundancy ...
redundpim3 38588	Implication of redundancy ...
redundpbi1 38589	Equivalence of redundancy ...
refrelsredund4 38590	The naive version of the c...
refrelsredund2 38591	The naive version of the c...
refrelsredund3 38592	The naive version of the c...
refrelredund4 38593	The naive version of the d...
refrelredund2 38594	The naive version of the d...
refrelredund3 38595	The naive version of the d...
dmqseq 38598	Equality theorem for domai...
dmqseqi 38599	Equality theorem for domai...
dmqseqd 38600	Equality theorem for domai...
dmqseqeq1 38601	Equality theorem for domai...
dmqseqeq1i 38602	Equality theorem for domai...
dmqseqeq1d 38603	Equality theorem for domai...
brdmqss 38604	The domain quotient binary...
brdmqssqs 38605	If ` A ` and ` R ` are set...
n0eldmqs 38606	The empty set is not an el...
n0eldmqseq 38607	The empty set is not an el...
n0elim 38608	Implication of that the em...
n0el3 38609	Two ways of expressing tha...
cnvepresdmqss 38610	The domain quotient binary...
cnvepresdmqs 38611	The domain quotient predic...
unidmqs 38612	The range of a relation is...
unidmqseq 38613	The union of the domain qu...
dmqseqim 38614	If the domain quotient of ...
dmqseqim2 38615	Lemma for ~ erimeq2 . (Co...
releldmqs 38616	Elementhood in the domain ...
eldmqs1cossres 38617	Elementhood in the domain ...
releldmqscoss 38618	Elementhood in the domain ...
dmqscoelseq 38619	Two ways to express the eq...
dmqs1cosscnvepreseq 38620	Two ways to express the eq...
brers 38625	Binary equivalence relatio...
dferALTV2 38626	Equivalence relation with ...
erALTVeq1 38627	Equality theorem for equiv...
erALTVeq1i 38628	Equality theorem for equiv...
erALTVeq1d 38629	Equality theorem for equiv...
dfcomember 38630	Alternate definition of th...
dfcomember2 38631	Alternate definition of th...
dfcomember3 38632	Alternate definition of th...
eqvreldmqs 38633	Two ways to express comemb...
eqvreldmqs2 38634	Two ways to express comemb...
brerser 38635	Binary equivalence relatio...
erimeq2 38636	Equivalence relation on it...
erimeq 38637	Equivalence relation on it...
dffunsALTV 38641	Alternate definition of th...
dffunsALTV2 38642	Alternate definition of th...
dffunsALTV3 38643	Alternate definition of th...
dffunsALTV4 38644	Alternate definition of th...
dffunsALTV5 38645	Alternate definition of th...
dffunALTV2 38646	Alternate definition of th...
dffunALTV3 38647	Alternate definition of th...
dffunALTV4 38648	Alternate definition of th...
dffunALTV5 38649	Alternate definition of th...
elfunsALTV 38650	Elementhood in the class o...
elfunsALTV2 38651	Elementhood in the class o...
elfunsALTV3 38652	Elementhood in the class o...
elfunsALTV4 38653	Elementhood in the class o...
elfunsALTV5 38654	Elementhood in the class o...
elfunsALTVfunALTV 38655	The element of the class o...
funALTVfun 38656	Our definition of the func...
funALTVss 38657	Subclass theorem for funct...
funALTVeq 38658	Equality theorem for funct...
funALTVeqi 38659	Equality inference for the...
funALTVeqd 38660	Equality deduction for the...
dfdisjs 38666	Alternate definition of th...
dfdisjs2 38667	Alternate definition of th...
dfdisjs3 38668	Alternate definition of th...
dfdisjs4 38669	Alternate definition of th...
dfdisjs5 38670	Alternate definition of th...
dfdisjALTV 38671	Alternate definition of th...
dfdisjALTV2 38672	Alternate definition of th...
dfdisjALTV3 38673	Alternate definition of th...
dfdisjALTV4 38674	Alternate definition of th...
dfdisjALTV5 38675	Alternate definition of th...
dfeldisj2 38676	Alternate definition of th...
dfeldisj3 38677	Alternate definition of th...
dfeldisj4 38678	Alternate definition of th...
dfeldisj5 38679	Alternate definition of th...
eldisjs 38680	Elementhood in the class o...
eldisjs2 38681	Elementhood in the class o...
eldisjs3 38682	Elementhood in the class o...
eldisjs4 38683	Elementhood in the class o...
eldisjs5 38684	Elementhood in the class o...
eldisjsdisj 38685	The element of the class o...
eleldisjs 38686	Elementhood in the disjoin...
eleldisjseldisj 38687	The element of the disjoin...
disjrel 38688	Disjoint relation is a rel...
disjss 38689	Subclass theorem for disjo...
disjssi 38690	Subclass theorem for disjo...
disjssd 38691	Subclass theorem for disjo...
disjeq 38692	Equality theorem for disjo...
disjeqi 38693	Equality theorem for disjo...
disjeqd 38694	Equality theorem for disjo...
disjdmqseqeq1 38695	Lemma for the equality the...
eldisjss 38696	Subclass theorem for disjo...
eldisjssi 38697	Subclass theorem for disjo...
eldisjssd 38698	Subclass theorem for disjo...
eldisjeq 38699	Equality theorem for disjo...
eldisjeqi 38700	Equality theorem for disjo...
eldisjeqd 38701	Equality theorem for disjo...
disjres 38702	Disjoint restriction. (Co...
eldisjn0elb 38703	Two forms of disjoint elem...
disjxrn 38704	Two ways of saying that a ...
disjxrnres5 38705	Disjoint range Cartesian p...
disjorimxrn 38706	Disjointness condition for...
disjimxrn 38707	Disjointness condition for...
disjimres 38708	Disjointness condition for...
disjimin 38709	Disjointness condition for...
disjiminres 38710	Disjointness condition for...
disjimxrnres 38711	Disjointness condition for...
disjALTV0 38712	The null class is disjoint...
disjALTVid 38713	The class of identity rela...
disjALTVidres 38714	The class of identity rela...
disjALTVinidres 38715	The intersection with rest...
disjALTVxrnidres 38716	The class of range Cartesi...
disjsuc 38717	Disjoint range Cartesian p...
dfantisymrel4 38719	Alternate definition of th...
dfantisymrel5 38720	Alternate definition of th...
antisymrelres 38721	(Contributed by Peter Mazs...
antisymrelressn 38722	(Contributed by Peter Mazs...
dfpart2 38727	Alternate definition of th...
dfmembpart2 38728	Alternate definition of th...
brparts 38729	Binary partitions relation...
brparts2 38730	Binary partitions relation...
brpartspart 38731	Binary partition and the p...
parteq1 38732	Equality theorem for parti...
parteq2 38733	Equality theorem for parti...
parteq12 38734	Equality theorem for parti...
parteq1i 38735	Equality theorem for parti...
parteq1d 38736	Equality theorem for parti...
partsuc2 38737	Property of the partition....
partsuc 38738	Property of the partition....
disjim 38739	The "Divide et Aequivalere...
disjimi 38740	Every disjoint relation ge...
detlem 38741	If a relation is disjoint,...
eldisjim 38742	If the elements of ` A ` a...
eldisjim2 38743	Alternate form of ~ eldisj...
eqvrel0 38744	The null class is an equiv...
det0 38745	The cosets by the null cla...
eqvrelcoss0 38746	The cosets by the null cla...
eqvrelid 38747	The identity relation is a...
eqvrel1cossidres 38748	The cosets by a restricted...
eqvrel1cossinidres 38749	The cosets by an intersect...
eqvrel1cossxrnidres 38750	The cosets by a range Cart...
detid 38751	The cosets by the identity...
eqvrelcossid 38752	The cosets by the identity...
detidres 38753	The cosets by the restrict...
detinidres 38754	The cosets by the intersec...
detxrnidres 38755	The cosets by the range Ca...
disjlem14 38756	Lemma for ~ disjdmqseq , ~...
disjlem17 38757	Lemma for ~ disjdmqseq , ~...
disjlem18 38758	Lemma for ~ disjdmqseq , ~...
disjlem19 38759	Lemma for ~ disjdmqseq , ~...
disjdmqsss 38760	Lemma for ~ disjdmqseq via...
disjdmqscossss 38761	Lemma for ~ disjdmqseq via...
disjdmqs 38762	If a relation is disjoint,...
disjdmqseq 38763	If a relation is disjoint,...
eldisjn0el 38764	Special case of ~ disjdmqs...
partim2 38765	Disjoint relation on its n...
partim 38766	Partition implies equivale...
partimeq 38767	Partition implies that the...
eldisjlem19 38768	Special case of ~ disjlem1...
membpartlem19 38769	Together with ~ disjlem19 ...
petlem 38770	If you can prove that the ...
petlemi 38771	If you can prove disjointn...
pet02 38772	Class ` A ` is a partition...
pet0 38773	Class ` A ` is a partition...
petid2 38774	Class ` A ` is a partition...
petid 38775	A class is a partition by ...
petidres2 38776	Class ` A ` is a partition...
petidres 38777	A class is a partition by ...
petinidres2 38778	Class ` A ` is a partition...
petinidres 38779	A class is a partition by ...
petxrnidres2 38780	Class ` A ` is a partition...
petxrnidres 38781	A class is a partition by ...
eqvreldisj1 38782	The elements of the quotie...
eqvreldisj2 38783	The elements of the quotie...
eqvreldisj3 38784	The elements of the quotie...
eqvreldisj4 38785	Intersection with the conv...
eqvreldisj5 38786	Range Cartesian product wi...
eqvrelqseqdisj2 38787	Implication of ~ eqvreldis...
fences3 38788	Implication of ~ eqvrelqse...
eqvrelqseqdisj3 38789	Implication of ~ eqvreldis...
eqvrelqseqdisj4 38790	Lemma for ~ petincnvepres2...
eqvrelqseqdisj5 38791	Lemma for the Partition-Eq...
mainer 38792	The Main Theorem of Equiva...
partimcomember 38793	Partition with general ` R...
mpet3 38794	Member Partition-Equivalen...
cpet2 38795	The conventional form of t...
cpet 38796	The conventional form of M...
mpet 38797	Member Partition-Equivalen...
mpet2 38798	Member Partition-Equivalen...
mpets2 38799	Member Partition-Equivalen...
mpets 38800	Member Partition-Equivalen...
mainpart 38801	Partition with general ` R...
fences 38802	The Theorem of Fences by E...
fences2 38803	The Theorem of Fences by E...
mainer2 38804	The Main Theorem of Equiva...
mainerim 38805	Every equivalence relation...
petincnvepres2 38806	A partition-equivalence th...
petincnvepres 38807	The shortest form of a par...
pet2 38808	Partition-Equivalence Theo...
pet 38809	Partition-Equivalence Theo...
pets 38810	Partition-Equivalence Theo...
prtlem60 38811	Lemma for ~ prter3 . (Con...
bicomdd 38812	Commute two sides of a bic...
jca2r 38813	Inference conjoining the c...
jca3 38814	Inference conjoining the c...
prtlem70 38815	Lemma for ~ prter3 : a rea...
ibdr 38816	Reverse of ~ ibd . (Contr...
prtlem100 38817	Lemma for ~ prter3 . (Con...
prtlem5 38818	Lemma for ~ prter1 , ~ prt...
prtlem80 38819	Lemma for ~ prter2 . (Con...
brabsb2 38820	A closed form of ~ brabsb ...
eqbrrdv2 38821	Other version of ~ eqbrrdi...
prtlem9 38822	Lemma for ~ prter3 . (Con...
prtlem10 38823	Lemma for ~ prter3 . (Con...
prtlem11 38824	Lemma for ~ prter2 . (Con...
prtlem12 38825	Lemma for ~ prtex and ~ pr...
prtlem13 38826	Lemma for ~ prter1 , ~ prt...
prtlem16 38827	Lemma for ~ prtex , ~ prte...
prtlem400 38828	Lemma for ~ prter2 and als...
erprt 38831	The quotient set of an equ...
prtlem14 38832	Lemma for ~ prter1 , ~ prt...
prtlem15 38833	Lemma for ~ prter1 and ~ p...
prtlem17 38834	Lemma for ~ prter2 . (Con...
prtlem18 38835	Lemma for ~ prter2 . (Con...
prtlem19 38836	Lemma for ~ prter2 . (Con...
prter1 38837	Every partition generates ...
prtex 38838	The equivalence relation g...
prter2 38839	The quotient set of the eq...
prter3 38840	For every partition there ...
axc5 38851	This theorem repeats ~ sp ...
ax4fromc4 38852	Rederivation of Axiom ~ ax...
ax10fromc7 38853	Rederivation of Axiom ~ ax...
ax6fromc10 38854	Rederivation of Axiom ~ ax...
hba1-o 38855	The setvar ` x ` is not fr...
axc4i-o 38856	Inference version of ~ ax-...
equid1 38857	Proof of ~ equid from our ...
equcomi1 38858	Proof of ~ equcomi from ~ ...
aecom-o 38859	Commutation law for identi...
aecoms-o 38860	A commutation rule for ide...
hbae-o 38861	All variables are effectiv...
dral1-o 38862	Formula-building lemma for...
ax12fromc15 38863	Rederivation of Axiom ~ ax...
ax13fromc9 38864	Derive ~ ax-13 from ~ ax-c...
ax5ALT 38865	Axiom to quantify a variab...
sps-o 38866	Generalization of antecede...
hbequid 38867	Bound-variable hypothesis ...
nfequid-o 38868	Bound-variable hypothesis ...
axc5c7 38869	Proof of a single axiom th...
axc5c7toc5 38870	Rederivation of ~ ax-c5 fr...
axc5c7toc7 38871	Rederivation of ~ ax-c7 fr...
axc711 38872	Proof of a single axiom th...
nfa1-o 38873	` x ` is not free in ` A. ...
axc711toc7 38874	Rederivation of ~ ax-c7 fr...
axc711to11 38875	Rederivation of ~ ax-11 fr...
axc5c711 38876	Proof of a single axiom th...
axc5c711toc5 38877	Rederivation of ~ ax-c5 fr...
axc5c711toc7 38878	Rederivation of ~ ax-c7 fr...
axc5c711to11 38879	Rederivation of ~ ax-11 fr...
equidqe 38880	~ equid with existential q...
axc5sp1 38881	A special case of ~ ax-c5 ...
equidq 38882	~ equid with universal qua...
equid1ALT 38883	Alternate proof of ~ equid...
axc11nfromc11 38884	Rederivation of ~ ax-c11n ...
naecoms-o 38885	A commutation rule for dis...
hbnae-o 38886	All variables are effectiv...
dvelimf-o 38887	Proof of ~ dvelimh that us...
dral2-o 38888	Formula-building lemma for...
aev-o 38889	A "distinctor elimination"...
ax5eq 38890	Theorem to add distinct qu...
dveeq2-o 38891	Quantifier introduction wh...
axc16g-o 38892	A generalization of Axiom ...
dveeq1-o 38893	Quantifier introduction wh...
dveeq1-o16 38894	Version of ~ dveeq1 using ...
ax5el 38895	Theorem to add distinct qu...
axc11n-16 38896	This theorem shows that, g...
dveel2ALT 38897	Alternate proof of ~ dveel...
ax12f 38898	Basis step for constructin...
ax12eq 38899	Basis step for constructin...
ax12el 38900	Basis step for constructin...
ax12indn 38901	Induction step for constru...
ax12indi 38902	Induction step for constru...
ax12indalem 38903	Lemma for ~ ax12inda2 and ...
ax12inda2ALT 38904	Alternate proof of ~ ax12i...
ax12inda2 38905	Induction step for constru...
ax12inda 38906	Induction step for constru...
ax12v2-o 38907	Rederivation of ~ ax-c15 f...
ax12a2-o 38908	Derive ~ ax-c15 from a hyp...
axc11-o 38909	Show that ~ ax-c11 can be ...
fsumshftd 38910	Index shift of a finite su...
riotaclbgBAD 38912	Closure of restricted iota...
riotaclbBAD 38913	Closure of restricted iota...
riotasvd 38914	Deduction version of ~ rio...
riotasv2d 38915	Value of description binde...
riotasv2s 38916	The value of description b...
riotasv 38917	Value of description binde...
riotasv3d 38918	A property ` ch ` holding ...
elimhyps 38919	A version of ~ elimhyp usi...
dedths 38920	A version of weak deductio...
renegclALT 38921	Closure law for negative o...
elimhyps2 38922	Generalization of ~ elimhy...
dedths2 38923	Generalization of ~ dedths...
nfcxfrdf 38924	A utility lemma to transfe...
nfded 38925	A deduction theorem that c...
nfded2 38926	A deduction theorem that c...
nfunidALT2 38927	Deduction version of ~ nfu...
nfunidALT 38928	Deduction version of ~ nfu...
nfopdALT 38929	Deduction version of bound...
cnaddcom 38930	Recover the commutative la...
toycom 38931	Show the commutative law f...
lshpset 38936	The set of all hyperplanes...
islshp 38937	The predicate "is a hyperp...
islshpsm 38938	Hyperplane properties expr...
lshplss 38939	A hyperplane is a subspace...
lshpne 38940	A hyperplane is not equal ...
lshpnel 38941	A hyperplane's generating ...
lshpnelb 38942	The subspace sum of a hype...
lshpnel2N 38943	Condition that determines ...
lshpne0 38944	The member of the span in ...
lshpdisj 38945	A hyperplane and the span ...
lshpcmp 38946	If two hyperplanes are com...
lshpinN 38947	The intersection of two di...
lsatset 38948	The set of all 1-dim subsp...
islsat 38949	The predicate "is a 1-dim ...
lsatlspsn2 38950	The span of a nonzero sing...
lsatlspsn 38951	The span of a nonzero sing...
islsati 38952	A 1-dim subspace (atom) (o...
lsateln0 38953	A 1-dim subspace (atom) (o...
lsatlss 38954	The set of 1-dim subspaces...
lsatlssel 38955	An atom is a subspace. (C...
lsatssv 38956	An atom is a set of vector...
lsatn0 38957	A 1-dim subspace (atom) of...
lsatspn0 38958	The span of a vector is an...
lsator0sp 38959	The span of a vector is ei...
lsatssn0 38960	A subspace (or any class) ...
lsatcmp 38961	If two atoms are comparabl...
lsatcmp2 38962	If an atom is included in ...
lsatel 38963	A nonzero vector in an ato...
lsatelbN 38964	A nonzero vector in an ato...
lsat2el 38965	Two atoms sharing a nonzer...
lsmsat 38966	Convert comparison of atom...
lsatfixedN 38967	Show equality with the spa...
lsmsatcv 38968	Subspace sum has the cover...
lssatomic 38969	The lattice of subspaces i...
lssats 38970	The lattice of subspaces i...
lpssat 38971	Two subspaces in a proper ...
lrelat 38972	Subspaces are relatively a...
lssatle 38973	The ordering of two subspa...
lssat 38974	Two subspaces in a proper ...
islshpat 38975	Hyperplane properties expr...
lcvfbr 38978	The covers relation for a ...
lcvbr 38979	The covers relation for a ...
lcvbr2 38980	The covers relation for a ...
lcvbr3 38981	The covers relation for a ...
lcvpss 38982	The covers relation implie...
lcvnbtwn 38983	The covers relation implie...
lcvntr 38984	The covers relation is not...
lcvnbtwn2 38985	The covers relation implie...
lcvnbtwn3 38986	The covers relation implie...
lsmcv2 38987	Subspace sum has the cover...
lcvat 38988	If a subspace covers anoth...
lsatcv0 38989	An atom covers the zero su...
lsatcveq0 38990	A subspace covered by an a...
lsat0cv 38991	A subspace is an atom iff ...
lcvexchlem1 38992	Lemma for ~ lcvexch . (Co...
lcvexchlem2 38993	Lemma for ~ lcvexch . (Co...
lcvexchlem3 38994	Lemma for ~ lcvexch . (Co...
lcvexchlem4 38995	Lemma for ~ lcvexch . (Co...
lcvexchlem5 38996	Lemma for ~ lcvexch . (Co...
lcvexch 38997	Subspaces satisfy the exch...
lcvp 38998	Covering property of Defin...
lcv1 38999	Covering property of a sub...
lcv2 39000	Covering property of a sub...
lsatexch 39001	The atom exchange property...
lsatnle 39002	The meet of a subspace and...
lsatnem0 39003	The meet of distinct atoms...
lsatexch1 39004	The atom exch1ange propert...
lsatcv0eq 39005	If the sum of two atoms co...
lsatcv1 39006	Two atoms covering the zer...
lsatcvatlem 39007	Lemma for ~ lsatcvat . (C...
lsatcvat 39008	A nonzero subspace less th...
lsatcvat2 39009	A subspace covered by the ...
lsatcvat3 39010	A condition implying that ...
islshpcv 39011	Hyperplane properties expr...
l1cvpat 39012	A subspace covered by the ...
l1cvat 39013	Create an atom under an el...
lshpat 39014	Create an atom under a hyp...
lflset 39017	The set of linear function...
islfl 39018	The predicate "is a linear...
lfli 39019	Property of a linear funct...
islfld 39020	Properties that determine ...
lflf 39021	A linear functional is a f...
lflcl 39022	A linear functional value ...
lfl0 39023	A linear functional is zer...
lfladd 39024	Property of a linear funct...
lflsub 39025	Property of a linear funct...
lflmul 39026	Property of a linear funct...
lfl0f 39027	The zero function is a fun...
lfl1 39028	A nonzero functional has a...
lfladdcl 39029	Closure of addition of two...
lfladdcom 39030	Commutativity of functiona...
lfladdass 39031	Associativity of functiona...
lfladd0l 39032	Functional addition with t...
lflnegcl 39033	Closure of the negative of...
lflnegl 39034	A functional plus its nega...
lflvscl 39035	Closure of a scalar produc...
lflvsdi1 39036	Distributive law for (righ...
lflvsdi2 39037	Reverse distributive law f...
lflvsdi2a 39038	Reverse distributive law f...
lflvsass 39039	Associative law for (right...
lfl0sc 39040	The (right vector space) s...
lflsc0N 39041	The scalar product with th...
lfl1sc 39042	The (right vector space) s...
lkrfval 39045	The kernel of a functional...
lkrval 39046	Value of the kernel of a f...
ellkr 39047	Membership in the kernel o...
lkrval2 39048	Value of the kernel of a f...
ellkr2 39049	Membership in the kernel o...
lkrcl 39050	A member of the kernel of ...
lkrf0 39051	The value of a functional ...
lkr0f 39052	The kernel of the zero fun...
lkrlss 39053	The kernel of a linear fun...
lkrssv 39054	The kernel of a linear fun...
lkrsc 39055	The kernel of a nonzero sc...
lkrscss 39056	The kernel of a scalar pro...
eqlkr 39057	Two functionals with the s...
eqlkr2 39058	Two functionals with the s...
eqlkr3 39059	Two functionals with the s...
lkrlsp 39060	The subspace sum of a kern...
lkrlsp2 39061	The subspace sum of a kern...
lkrlsp3 39062	The subspace sum of a kern...
lkrshp 39063	The kernel of a nonzero fu...
lkrshp3 39064	The kernels of nonzero fun...
lkrshpor 39065	The kernel of a functional...
lkrshp4 39066	A kernel is a hyperplane i...
lshpsmreu 39067	Lemma for ~ lshpkrex . Sh...
lshpkrlem1 39068	Lemma for ~ lshpkrex . Th...
lshpkrlem2 39069	Lemma for ~ lshpkrex . Th...
lshpkrlem3 39070	Lemma for ~ lshpkrex . De...
lshpkrlem4 39071	Lemma for ~ lshpkrex . Pa...
lshpkrlem5 39072	Lemma for ~ lshpkrex . Pa...
lshpkrlem6 39073	Lemma for ~ lshpkrex . Sh...
lshpkrcl 39074	The set ` G ` defined by h...
lshpkr 39075	The kernel of functional `...
lshpkrex 39076	There exists a functional ...
lshpset2N 39077	The set of all hyperplanes...
islshpkrN 39078	The predicate "is a hyperp...
lfl1dim 39079	Equivalent expressions for...
lfl1dim2N 39080	Equivalent expressions for...
ldualset 39083	Define the (left) dual of ...
ldualvbase 39084	The vectors of a dual spac...
ldualelvbase 39085	Utility theorem for conver...
ldualfvadd 39086	Vector addition in the dua...
ldualvadd 39087	Vector addition in the dua...
ldualvaddcl 39088	The value of vector additi...
ldualvaddval 39089	The value of the value of ...
ldualsca 39090	The ring of scalars of the...
ldualsbase 39091	Base set of scalar ring fo...
ldualsaddN 39092	Scalar addition for the du...
ldualsmul 39093	Scalar multiplication for ...
ldualfvs 39094	Scalar product operation f...
ldualvs 39095	Scalar product operation v...
ldualvsval 39096	Value of scalar product op...
ldualvscl 39097	The scalar product operati...
ldualvaddcom 39098	Commutative law for vector...
ldualvsass 39099	Associative law for scalar...
ldualvsass2 39100	Associative law for scalar...
ldualvsdi1 39101	Distributive law for scala...
ldualvsdi2 39102	Reverse distributive law f...
ldualgrplem 39103	Lemma for ~ ldualgrp . (C...
ldualgrp 39104	The dual of a vector space...
ldual0 39105	The zero scalar of the dua...
ldual1 39106	The unit scalar of the dua...
ldualneg 39107	The negative of a scalar o...
ldual0v 39108	The zero vector of the dua...
ldual0vcl 39109	The dual zero vector is a ...
lduallmodlem 39110	Lemma for ~ lduallmod . (...
lduallmod 39111	The dual of a left module ...
lduallvec 39112	The dual of a left vector ...
ldualvsub 39113	The value of vector subtra...
ldualvsubcl 39114	Closure of vector subtract...
ldualvsubval 39115	The value of the value of ...
ldualssvscl 39116	Closure of scalar product ...
ldualssvsubcl 39117	Closure of vector subtract...
ldual0vs 39118	Scalar zero times a functi...
lkr0f2 39119	The kernel of the zero fun...
lduallkr3 39120	The kernels of nonzero fun...
lkrpssN 39121	Proper subset relation bet...
lkrin 39122	Intersection of the kernel...
eqlkr4 39123	Two functionals with the s...
ldual1dim 39124	Equivalent expressions for...
ldualkrsc 39125	The kernel of a nonzero sc...
lkrss 39126	The kernel of a scalar pro...
lkrss2N 39127	Two functionals with kerne...
lkreqN 39128	Proportional functionals h...
lkrlspeqN 39129	Condition for colinear fun...
isopos 39138	The predicate "is an ortho...
opposet 39139	Every orthoposet is a pose...
oposlem 39140	Lemma for orthoposet prope...
op01dm 39141	Conditions necessary for z...
op0cl 39142	An orthoposet has a zero e...
op1cl 39143	An orthoposet has a unity ...
op0le 39144	Orthoposet zero is less th...
ople0 39145	An element less than or eq...
opnlen0 39146	An element not less than a...
lub0N 39147	The least upper bound of t...
opltn0 39148	A lattice element greater ...
ople1 39149	Any element is less than t...
op1le 39150	If the orthoposet unity is...
glb0N 39151	The greatest lower bound o...
opoccl 39152	Closure of orthocomplement...
opococ 39153	Double negative law for or...
opcon3b 39154	Contraposition law for ort...
opcon2b 39155	Orthocomplement contraposi...
opcon1b 39156	Orthocomplement contraposi...
oplecon3 39157	Contraposition law for ort...
oplecon3b 39158	Contraposition law for ort...
oplecon1b 39159	Contraposition law for str...
opoc1 39160	Orthocomplement of orthopo...
opoc0 39161	Orthocomplement of orthopo...
opltcon3b 39162	Contraposition law for str...
opltcon1b 39163	Contraposition law for str...
opltcon2b 39164	Contraposition law for str...
opexmid 39165	Law of excluded middle for...
opnoncon 39166	Law of contradiction for o...
riotaocN 39167	The orthocomplement of the...
cmtfvalN 39168	Value of commutes relation...
cmtvalN 39169	Equivalence for commutes r...
isolat 39170	The predicate "is an ortho...
ollat 39171	An ortholattice is a latti...
olop 39172	An ortholattice is an orth...
olposN 39173	An ortholattice is a poset...
isolatiN 39174	Properties that determine ...
oldmm1 39175	De Morgan's law for meet i...
oldmm2 39176	De Morgan's law for meet i...
oldmm3N 39177	De Morgan's law for meet i...
oldmm4 39178	De Morgan's law for meet i...
oldmj1 39179	De Morgan's law for join i...
oldmj2 39180	De Morgan's law for join i...
oldmj3 39181	De Morgan's law for join i...
oldmj4 39182	De Morgan's law for join i...
olj01 39183	An ortholattice element jo...
olj02 39184	An ortholattice element jo...
olm11 39185	The meet of an ortholattic...
olm12 39186	The meet of an ortholattic...
latmassOLD 39187	Ortholattice meet is assoc...
latm12 39188	A rearrangement of lattice...
latm32 39189	A rearrangement of lattice...
latmrot 39190	Rotate lattice meet of 3 c...
latm4 39191	Rearrangement of lattice m...
latmmdiN 39192	Lattice meet distributes o...
latmmdir 39193	Lattice meet distributes o...
olm01 39194	Meet with lattice zero is ...
olm02 39195	Meet with lattice zero is ...
isoml 39196	The predicate "is an ortho...
isomliN 39197	Properties that determine ...
omlol 39198	An orthomodular lattice is...
omlop 39199	An orthomodular lattice is...
omllat 39200	An orthomodular lattice is...
omllaw 39201	The orthomodular law. (Co...
omllaw2N 39202	Variation of orthomodular ...
omllaw3 39203	Orthomodular law equivalen...
omllaw4 39204	Orthomodular law equivalen...
omllaw5N 39205	The orthomodular law. Rem...
cmtcomlemN 39206	Lemma for ~ cmtcomN . ( ~...
cmtcomN 39207	Commutation is symmetric. ...
cmt2N 39208	Commutation with orthocomp...
cmt3N 39209	Commutation with orthocomp...
cmt4N 39210	Commutation with orthocomp...
cmtbr2N 39211	Alternate definition of th...
cmtbr3N 39212	Alternate definition for t...
cmtbr4N 39213	Alternate definition for t...
lecmtN 39214	Ordered elements commute. ...
cmtidN 39215	Any element commutes with ...
omlfh1N 39216	Foulis-Holland Theorem, pa...
omlfh3N 39217	Foulis-Holland Theorem, pa...
omlmod1i2N 39218	Analogue of modular law ~ ...
omlspjN 39219	Contraction of a Sasaki pr...
cvrfval 39226	Value of covers relation "...
cvrval 39227	Binary relation expressing...
cvrlt 39228	The covers relation implie...
cvrnbtwn 39229	There is no element betwee...
ncvr1 39230	No element covers the latt...
cvrletrN 39231	Property of an element abo...
cvrval2 39232	Binary relation expressing...
cvrnbtwn2 39233	The covers relation implie...
cvrnbtwn3 39234	The covers relation implie...
cvrcon3b 39235	Contraposition law for the...
cvrle 39236	The covers relation implie...
cvrnbtwn4 39237	The covers relation implie...
cvrnle 39238	The covers relation implie...
cvrne 39239	The covers relation implie...
cvrnrefN 39240	The covers relation is not...
cvrcmp 39241	If two lattice elements th...
cvrcmp2 39242	If two lattice elements co...
pats 39243	The set of atoms in a pose...
isat 39244	The predicate "is an atom"...
isat2 39245	The predicate "is an atom"...
atcvr0 39246	An atom covers zero. ( ~ ...
atbase 39247	An atom is a member of the...
atssbase 39248	The set of atoms is a subs...
0ltat 39249	An atom is greater than ze...
leatb 39250	A poset element less than ...
leat 39251	A poset element less than ...
leat2 39252	A nonzero poset element le...
leat3 39253	A poset element less than ...
meetat 39254	The meet of any element wi...
meetat2 39255	The meet of any element wi...
isatl 39257	The predicate "is an atomi...
atllat 39258	An atomic lattice is a lat...
atlpos 39259	An atomic lattice is a pos...
atl0dm 39260	Condition necessary for ze...
atl0cl 39261	An atomic lattice has a ze...
atl0le 39262	Orthoposet zero is less th...
atlle0 39263	An element less than or eq...
atlltn0 39264	A lattice element greater ...
isat3 39265	The predicate "is an atom"...
atn0 39266	An atom is not zero. ( ~ ...
atnle0 39267	An atom is not less than o...
atlen0 39268	A lattice element is nonze...
atcmp 39269	If two atoms are comparabl...
atncmp 39270	Frequently-used variation ...
atnlt 39271	Two atoms cannot satisfy t...
atcvreq0 39272	An element covered by an a...
atncvrN 39273	Two atoms cannot satisfy t...
atlex 39274	Every nonzero element of a...
atnle 39275	Two ways of expressing "an...
atnem0 39276	The meet of distinct atoms...
atlatmstc 39277	An atomic, complete, ortho...
atlatle 39278	The ordering of two Hilber...
atlrelat1 39279	An atomistic lattice with ...
iscvlat 39281	The predicate "is an atomi...
iscvlat2N 39282	The predicate "is an atomi...
cvlatl 39283	An atomic lattice with the...
cvllat 39284	An atomic lattice with the...
cvlposN 39285	An atomic lattice with the...
cvlexch1 39286	An atomic covering lattice...
cvlexch2 39287	An atomic covering lattice...
cvlexchb1 39288	An atomic covering lattice...
cvlexchb2 39289	An atomic covering lattice...
cvlexch3 39290	An atomic covering lattice...
cvlexch4N 39291	An atomic covering lattice...
cvlatexchb1 39292	A version of ~ cvlexchb1 f...
cvlatexchb2 39293	A version of ~ cvlexchb2 f...
cvlatexch1 39294	Atom exchange property. (...
cvlatexch2 39295	Atom exchange property. (...
cvlatexch3 39296	Atom exchange property. (...
cvlcvr1 39297	The covering property. Pr...
cvlcvrp 39298	A Hilbert lattice satisfie...
cvlatcvr1 39299	An atom is covered by its ...
cvlatcvr2 39300	An atom is covered by its ...
cvlsupr2 39301	Two equivalent ways of exp...
cvlsupr3 39302	Two equivalent ways of exp...
cvlsupr4 39303	Consequence of superpositi...
cvlsupr5 39304	Consequence of superpositi...
cvlsupr6 39305	Consequence of superpositi...
cvlsupr7 39306	Consequence of superpositi...
cvlsupr8 39307	Consequence of superpositi...
ishlat1 39310	The predicate "is a Hilber...
ishlat2 39311	The predicate "is a Hilber...
ishlat3N 39312	The predicate "is a Hilber...
ishlatiN 39313	Properties that determine ...
hlomcmcv 39314	A Hilbert lattice is ortho...
hloml 39315	A Hilbert lattice is ortho...
hlclat 39316	A Hilbert lattice is compl...
hlcvl 39317	A Hilbert lattice is an at...
hlatl 39318	A Hilbert lattice is atomi...
hlol 39319	A Hilbert lattice is an or...
hlop 39320	A Hilbert lattice is an or...
hllat 39321	A Hilbert lattice is a lat...
hllatd 39322	Deduction form of ~ hllat ...
hlomcmat 39323	A Hilbert lattice is ortho...
hlpos 39324	A Hilbert lattice is a pos...
hlatjcl 39325	Closure of join operation....
hlatjcom 39326	Commutatitivity of join op...
hlatjidm 39327	Idempotence of join operat...
hlatjass 39328	Lattice join is associativ...
hlatj12 39329	Swap 1st and 2nd members o...
hlatj32 39330	Swap 2nd and 3rd members o...
hlatjrot 39331	Rotate lattice join of 3 c...
hlatj4 39332	Rearrangement of lattice j...
hlatlej1 39333	A join's first argument is...
hlatlej2 39334	A join's second argument i...
glbconN 39335	De Morgan's law for GLB an...
glbconNOLD 39336	Obsolete version of ~ glbc...
glbconxN 39337	De Morgan's law for GLB an...
atnlej1 39338	If an atom is not less tha...
atnlej2 39339	If an atom is not less tha...
hlsuprexch 39340	A Hilbert lattice has the ...
hlexch1 39341	A Hilbert lattice has the ...
hlexch2 39342	A Hilbert lattice has the ...
hlexchb1 39343	A Hilbert lattice has the ...
hlexchb2 39344	A Hilbert lattice has the ...
hlsupr 39345	A Hilbert lattice has the ...
hlsupr2 39346	A Hilbert lattice has the ...
hlhgt4 39347	A Hilbert lattice has a he...
hlhgt2 39348	A Hilbert lattice has a he...
hl0lt1N 39349	Lattice 0 is less than lat...
hlexch3 39350	A Hilbert lattice has the ...
hlexch4N 39351	A Hilbert lattice has the ...
hlatexchb1 39352	A version of ~ hlexchb1 fo...
hlatexchb2 39353	A version of ~ hlexchb2 fo...
hlatexch1 39354	Atom exchange property. (...
hlatexch2 39355	Atom exchange property. (...
hlatmstcOLDN 39356	An atomic, complete, ortho...
hlatle 39357	The ordering of two Hilber...
hlateq 39358	The equality of two Hilber...
hlrelat1 39359	An atomistic lattice with ...
hlrelat5N 39360	An atomistic lattice with ...
hlrelat 39361	A Hilbert lattice is relat...
hlrelat2 39362	A consequence of relative ...
exatleN 39363	A condition for an atom to...
hl2at 39364	A Hilbert lattice has at l...
atex 39365	At least one atom exists. ...
intnatN 39366	If the intersection with a...
2llnne2N 39367	Condition implying that tw...
2llnneN 39368	Condition implying that tw...
cvr1 39369	A Hilbert lattice has the ...
cvr2N 39370	Less-than and covers equiv...
hlrelat3 39371	The Hilbert lattice is rel...
cvrval3 39372	Binary relation expressing...
cvrval4N 39373	Binary relation expressing...
cvrval5 39374	Binary relation expressing...
cvrp 39375	A Hilbert lattice satisfie...
atcvr1 39376	An atom is covered by its ...
atcvr2 39377	An atom is covered by its ...
cvrexchlem 39378	Lemma for ~ cvrexch . ( ~...
cvrexch 39379	A Hilbert lattice satisfie...
cvratlem 39380	Lemma for ~ cvrat . ( ~ a...
cvrat 39381	A nonzero Hilbert lattice ...
ltltncvr 39382	A chained strong ordering ...
ltcvrntr 39383	Non-transitive condition f...
cvrntr 39384	The covers relation is not...
atcvr0eq 39385	The covers relation is not...
lnnat 39386	A line (the join of two di...
atcvrj0 39387	Two atoms covering the zer...
cvrat2 39388	A Hilbert lattice element ...
atcvrneN 39389	Inequality derived from at...
atcvrj1 39390	Condition for an atom to b...
atcvrj2b 39391	Condition for an atom to b...
atcvrj2 39392	Condition for an atom to b...
atleneN 39393	Inequality derived from at...
atltcvr 39394	An equivalence of less-tha...
atle 39395	Any nonzero element has an...
atlt 39396	Two atoms are unequal iff ...
atlelt 39397	Transfer less-than relatio...
2atlt 39398	Given an atom less than an...
atexchcvrN 39399	Atom exchange property. V...
atexchltN 39400	Atom exchange property. V...
cvrat3 39401	A condition implying that ...
cvrat4 39402	A condition implying exist...
cvrat42 39403	Commuted version of ~ cvra...
2atjm 39404	The meet of a line (expres...
atbtwn 39405	Property of a 3rd atom ` R...
atbtwnexOLDN 39406	There exists a 3rd atom ` ...
atbtwnex 39407	Given atoms ` P ` in ` X `...
3noncolr2 39408	Two ways to express 3 non-...
3noncolr1N 39409	Two ways to express 3 non-...
hlatcon3 39410	Atom exchange combined wit...
hlatcon2 39411	Atom exchange combined wit...
4noncolr3 39412	A way to express 4 non-col...
4noncolr2 39413	A way to express 4 non-col...
4noncolr1 39414	A way to express 4 non-col...
athgt 39415	A Hilbert lattice, whose h...
3dim0 39416	There exists a 3-dimension...
3dimlem1 39417	Lemma for ~ 3dim1 . (Cont...
3dimlem2 39418	Lemma for ~ 3dim1 . (Cont...
3dimlem3a 39419	Lemma for ~ 3dim3 . (Cont...
3dimlem3 39420	Lemma for ~ 3dim1 . (Cont...
3dimlem3OLDN 39421	Lemma for ~ 3dim1 . (Cont...
3dimlem4a 39422	Lemma for ~ 3dim3 . (Cont...
3dimlem4 39423	Lemma for ~ 3dim1 . (Cont...
3dimlem4OLDN 39424	Lemma for ~ 3dim1 . (Cont...
3dim1lem5 39425	Lemma for ~ 3dim1 . (Cont...
3dim1 39426	Construct a 3-dimensional ...
3dim2 39427	Construct 2 new layers on ...
3dim3 39428	Construct a new layer on t...
2dim 39429	Generate a height-3 elemen...
1dimN 39430	An atom is covered by a he...
1cvrco 39431	The orthocomplement of an ...
1cvratex 39432	There exists an atom less ...
1cvratlt 39433	An atom less than or equal...
1cvrjat 39434	An element covered by the ...
1cvrat 39435	Create an atom under an el...
ps-1 39436	The join of two atoms ` R ...
ps-2 39437	Lattice analogue for the p...
2atjlej 39438	Two atoms are different if...
hlatexch3N 39439	Rearrange join of atoms in...
hlatexch4 39440	Exchange 2 atoms. (Contri...
ps-2b 39441	Variation of projective ge...
3atlem1 39442	Lemma for ~ 3at . (Contri...
3atlem2 39443	Lemma for ~ 3at . (Contri...
3atlem3 39444	Lemma for ~ 3at . (Contri...
3atlem4 39445	Lemma for ~ 3at . (Contri...
3atlem5 39446	Lemma for ~ 3at . (Contri...
3atlem6 39447	Lemma for ~ 3at . (Contri...
3atlem7 39448	Lemma for ~ 3at . (Contri...
3at 39449	Any three non-colinear ato...
llnset 39464	The set of lattice lines i...
islln 39465	The predicate "is a lattic...
islln4 39466	The predicate "is a lattic...
llni 39467	Condition implying a latti...
llnbase 39468	A lattice line is a lattic...
islln3 39469	The predicate "is a lattic...
islln2 39470	The predicate "is a lattic...
llni2 39471	The join of two different ...
llnnleat 39472	An atom cannot majorize a ...
llnneat 39473	A lattice line is not an a...
2atneat 39474	The join of two distinct a...
llnn0 39475	A lattice line is nonzero....
islln2a 39476	The predicate "is a lattic...
llnle 39477	Any element greater than 0...
atcvrlln2 39478	An atom under a line is co...
atcvrlln 39479	An element covering an ato...
llnexatN 39480	Given an atom on a line, t...
llncmp 39481	If two lattice lines are c...
llnnlt 39482	Two lattice lines cannot s...
2llnmat 39483	Two intersecting lines int...
2at0mat0 39484	Special case of ~ 2atmat0 ...
2atmat0 39485	The meet of two unequal li...
2atm 39486	An atom majorized by two d...
ps-2c 39487	Variation of projective ge...
lplnset 39488	The set of lattice planes ...
islpln 39489	The predicate "is a lattic...
islpln4 39490	The predicate "is a lattic...
lplni 39491	Condition implying a latti...
islpln3 39492	The predicate "is a lattic...
lplnbase 39493	A lattice plane is a latti...
islpln5 39494	The predicate "is a lattic...
islpln2 39495	The predicate "is a lattic...
lplni2 39496	The join of 3 different at...
lvolex3N 39497	There is an atom outside o...
llnmlplnN 39498	The intersection of a line...
lplnle 39499	Any element greater than 0...
lplnnle2at 39500	A lattice line (or atom) c...
lplnnleat 39501	A lattice plane cannot maj...
lplnnlelln 39502	A lattice plane is not les...
2atnelpln 39503	The join of two atoms is n...
lplnneat 39504	No lattice plane is an ato...
lplnnelln 39505	No lattice plane is a latt...
lplnn0N 39506	A lattice plane is nonzero...
islpln2a 39507	The predicate "is a lattic...
islpln2ah 39508	The predicate "is a lattic...
lplnriaN 39509	Property of a lattice plan...
lplnribN 39510	Property of a lattice plan...
lplnric 39511	Property of a lattice plan...
lplnri1 39512	Property of a lattice plan...
lplnri2N 39513	Property of a lattice plan...
lplnri3N 39514	Property of a lattice plan...
lplnllnneN 39515	Two lattice lines defined ...
llncvrlpln2 39516	A lattice line under a lat...
llncvrlpln 39517	An element covering a latt...
2lplnmN 39518	If the join of two lattice...
2llnmj 39519	The meet of two lattice li...
2atmat 39520	The meet of two intersecti...
lplncmp 39521	If two lattice planes are ...
lplnexatN 39522	Given a lattice line on a ...
lplnexllnN 39523	Given an atom on a lattice...
lplnnlt 39524	Two lattice planes cannot ...
2llnjaN 39525	The join of two different ...
2llnjN 39526	The join of two different ...
2llnm2N 39527	The meet of two different ...
2llnm3N 39528	Two lattice lines in a lat...
2llnm4 39529	Two lattice lines that maj...
2llnmeqat 39530	An atom equals the interse...
lvolset 39531	The set of 3-dim lattice v...
islvol 39532	The predicate "is a 3-dim ...
islvol4 39533	The predicate "is a 3-dim ...
lvoli 39534	Condition implying a 3-dim...
islvol3 39535	The predicate "is a 3-dim ...
lvoli3 39536	Condition implying a 3-dim...
lvolbase 39537	A 3-dim lattice volume is ...
islvol5 39538	The predicate "is a 3-dim ...
islvol2 39539	The predicate "is a 3-dim ...
lvoli2 39540	The join of 4 different at...
lvolnle3at 39541	A lattice plane (or lattic...
lvolnleat 39542	An atom cannot majorize a ...
lvolnlelln 39543	A lattice line cannot majo...
lvolnlelpln 39544	A lattice plane cannot maj...
3atnelvolN 39545	The join of 3 atoms is not...
2atnelvolN 39546	The join of two atoms is n...
lvolneatN 39547	No lattice volume is an at...
lvolnelln 39548	No lattice volume is a lat...
lvolnelpln 39549	No lattice volume is a lat...
lvoln0N 39550	A lattice volume is nonzer...
islvol2aN 39551	The predicate "is a lattic...
4atlem0a 39552	Lemma for ~ 4at . (Contri...
4atlem0ae 39553	Lemma for ~ 4at . (Contri...
4atlem0be 39554	Lemma for ~ 4at . (Contri...
4atlem3 39555	Lemma for ~ 4at . Break i...
4atlem3a 39556	Lemma for ~ 4at . Break i...
4atlem3b 39557	Lemma for ~ 4at . Break i...
4atlem4a 39558	Lemma for ~ 4at . Frequen...
4atlem4b 39559	Lemma for ~ 4at . Frequen...
4atlem4c 39560	Lemma for ~ 4at . Frequen...
4atlem4d 39561	Lemma for ~ 4at . Frequen...
4atlem9 39562	Lemma for ~ 4at . Substit...
4atlem10a 39563	Lemma for ~ 4at . Substit...
4atlem10b 39564	Lemma for ~ 4at . Substit...
4atlem10 39565	Lemma for ~ 4at . Combine...
4atlem11a 39566	Lemma for ~ 4at . Substit...
4atlem11b 39567	Lemma for ~ 4at . Substit...
4atlem11 39568	Lemma for ~ 4at . Combine...
4atlem12a 39569	Lemma for ~ 4at . Substit...
4atlem12b 39570	Lemma for ~ 4at . Substit...
4atlem12 39571	Lemma for ~ 4at . Combine...
4at 39572	Four atoms determine a lat...
4at2 39573	Four atoms determine a lat...
lplncvrlvol2 39574	A lattice line under a lat...
lplncvrlvol 39575	An element covering a latt...
lvolcmp 39576	If two lattice planes are ...
lvolnltN 39577	Two lattice volumes cannot...
2lplnja 39578	The join of two different ...
2lplnj 39579	The join of two different ...
2lplnm2N 39580	The meet of two different ...
2lplnmj 39581	The meet of two lattice pl...
dalemkehl 39582	Lemma for ~ dath . Freque...
dalemkelat 39583	Lemma for ~ dath . Freque...
dalemkeop 39584	Lemma for ~ dath . Freque...
dalempea 39585	Lemma for ~ dath . Freque...
dalemqea 39586	Lemma for ~ dath . Freque...
dalemrea 39587	Lemma for ~ dath . Freque...
dalemsea 39588	Lemma for ~ dath . Freque...
dalemtea 39589	Lemma for ~ dath . Freque...
dalemuea 39590	Lemma for ~ dath . Freque...
dalemyeo 39591	Lemma for ~ dath . Freque...
dalemzeo 39592	Lemma for ~ dath . Freque...
dalemclpjs 39593	Lemma for ~ dath . Freque...
dalemclqjt 39594	Lemma for ~ dath . Freque...
dalemclrju 39595	Lemma for ~ dath . Freque...
dalem-clpjq 39596	Lemma for ~ dath . Freque...
dalemceb 39597	Lemma for ~ dath . Freque...
dalempeb 39598	Lemma for ~ dath . Freque...
dalemqeb 39599	Lemma for ~ dath . Freque...
dalemreb 39600	Lemma for ~ dath . Freque...
dalemseb 39601	Lemma for ~ dath . Freque...
dalemteb 39602	Lemma for ~ dath . Freque...
dalemueb 39603	Lemma for ~ dath . Freque...
dalempjqeb 39604	Lemma for ~ dath . Freque...
dalemsjteb 39605	Lemma for ~ dath . Freque...
dalemtjueb 39606	Lemma for ~ dath . Freque...
dalemqrprot 39607	Lemma for ~ dath . Freque...
dalemyeb 39608	Lemma for ~ dath . Freque...
dalemcnes 39609	Lemma for ~ dath . Freque...
dalempnes 39610	Lemma for ~ dath . Freque...
dalemqnet 39611	Lemma for ~ dath . Freque...
dalempjsen 39612	Lemma for ~ dath . Freque...
dalemply 39613	Lemma for ~ dath . Freque...
dalemsly 39614	Lemma for ~ dath . Freque...
dalemswapyz 39615	Lemma for ~ dath . Swap t...
dalemrot 39616	Lemma for ~ dath . Rotate...
dalemrotyz 39617	Lemma for ~ dath . Rotate...
dalem1 39618	Lemma for ~ dath . Show t...
dalemcea 39619	Lemma for ~ dath . Freque...
dalem2 39620	Lemma for ~ dath . Show t...
dalemdea 39621	Lemma for ~ dath . Freque...
dalemeea 39622	Lemma for ~ dath . Freque...
dalem3 39623	Lemma for ~ dalemdnee . (...
dalem4 39624	Lemma for ~ dalemdnee . (...
dalemdnee 39625	Lemma for ~ dath . Axis o...
dalem5 39626	Lemma for ~ dath . Atom `...
dalem6 39627	Lemma for ~ dath . Analog...
dalem7 39628	Lemma for ~ dath . Analog...
dalem8 39629	Lemma for ~ dath . Plane ...
dalem-cly 39630	Lemma for ~ dalem9 . Cent...
dalem9 39631	Lemma for ~ dath . Since ...
dalem10 39632	Lemma for ~ dath . Atom `...
dalem11 39633	Lemma for ~ dath . Analog...
dalem12 39634	Lemma for ~ dath . Analog...
dalem13 39635	Lemma for ~ dalem14 . (Co...
dalem14 39636	Lemma for ~ dath . Planes...
dalem15 39637	Lemma for ~ dath . The ax...
dalem16 39638	Lemma for ~ dath . The at...
dalem17 39639	Lemma for ~ dath . When p...
dalem18 39640	Lemma for ~ dath . Show t...
dalem19 39641	Lemma for ~ dath . Show t...
dalemccea 39642	Lemma for ~ dath . Freque...
dalemddea 39643	Lemma for ~ dath . Freque...
dalem-ccly 39644	Lemma for ~ dath . Freque...
dalem-ddly 39645	Lemma for ~ dath . Freque...
dalemccnedd 39646	Lemma for ~ dath . Freque...
dalemclccjdd 39647	Lemma for ~ dath . Freque...
dalemcceb 39648	Lemma for ~ dath . Freque...
dalemswapyzps 39649	Lemma for ~ dath . Swap t...
dalemrotps 39650	Lemma for ~ dath . Rotate...
dalemcjden 39651	Lemma for ~ dath . Show t...
dalem20 39652	Lemma for ~ dath . Show t...
dalem21 39653	Lemma for ~ dath . Show t...
dalem22 39654	Lemma for ~ dath . Show t...
dalem23 39655	Lemma for ~ dath . Show t...
dalem24 39656	Lemma for ~ dath . Show t...
dalem25 39657	Lemma for ~ dath . Show t...
dalem27 39658	Lemma for ~ dath . Show t...
dalem28 39659	Lemma for ~ dath . Lemma ...
dalem29 39660	Lemma for ~ dath . Analog...
dalem30 39661	Lemma for ~ dath . Analog...
dalem31N 39662	Lemma for ~ dath . Analog...
dalem32 39663	Lemma for ~ dath . Analog...
dalem33 39664	Lemma for ~ dath . Analog...
dalem34 39665	Lemma for ~ dath . Analog...
dalem35 39666	Lemma for ~ dath . Analog...
dalem36 39667	Lemma for ~ dath . Analog...
dalem37 39668	Lemma for ~ dath . Analog...
dalem38 39669	Lemma for ~ dath . Plane ...
dalem39 39670	Lemma for ~ dath . Auxili...
dalem40 39671	Lemma for ~ dath . Analog...
dalem41 39672	Lemma for ~ dath . (Contr...
dalem42 39673	Lemma for ~ dath . Auxili...
dalem43 39674	Lemma for ~ dath . Planes...
dalem44 39675	Lemma for ~ dath . Dummy ...
dalem45 39676	Lemma for ~ dath . Dummy ...
dalem46 39677	Lemma for ~ dath . Analog...
dalem47 39678	Lemma for ~ dath . Analog...
dalem48 39679	Lemma for ~ dath . Analog...
dalem49 39680	Lemma for ~ dath . Analog...
dalem50 39681	Lemma for ~ dath . Analog...
dalem51 39682	Lemma for ~ dath . Constr...
dalem52 39683	Lemma for ~ dath . Lines ...
dalem53 39684	Lemma for ~ dath . The au...
dalem54 39685	Lemma for ~ dath . Line `...
dalem55 39686	Lemma for ~ dath . Lines ...
dalem56 39687	Lemma for ~ dath . Analog...
dalem57 39688	Lemma for ~ dath . Axis o...
dalem58 39689	Lemma for ~ dath . Analog...
dalem59 39690	Lemma for ~ dath . Analog...
dalem60 39691	Lemma for ~ dath . ` B ` i...
dalem61 39692	Lemma for ~ dath . Show t...
dalem62 39693	Lemma for ~ dath . Elimin...
dalem63 39694	Lemma for ~ dath . Combin...
dath 39695	Desargues's theorem of pro...
dath2 39696	Version of Desargues's the...
lineset 39697	The set of lines in a Hilb...
isline 39698	The predicate "is a line"....
islinei 39699	Condition implying "is a l...
pointsetN 39700	The set of points in a Hil...
ispointN 39701	The predicate "is a point"...
atpointN 39702	The singleton of an atom i...
psubspset 39703	The set of projective subs...
ispsubsp 39704	The predicate "is a projec...
ispsubsp2 39705	The predicate "is a projec...
psubspi 39706	Property of a projective s...
psubspi2N 39707	Property of a projective s...
0psubN 39708	The empty set is a project...
snatpsubN 39709	The singleton of an atom i...
pointpsubN 39710	A point (singleton of an a...
linepsubN 39711	A line is a projective sub...
atpsubN 39712	The set of all atoms is a ...
psubssat 39713	A projective subspace cons...
psubatN 39714	A member of a projective s...
pmapfval 39715	The projective map of a Hi...
pmapval 39716	Value of the projective ma...
elpmap 39717	Member of a projective map...
pmapssat 39718	The projective map of a Hi...
pmapssbaN 39719	A weakening of ~ pmapssat ...
pmaple 39720	The projective map of a Hi...
pmap11 39721	The projective map of a Hi...
pmapat 39722	The projective map of an a...
elpmapat 39723	Member of the projective m...
pmap0 39724	Value of the projective ma...
pmapeq0 39725	A projective map value is ...
pmap1N 39726	Value of the projective ma...
pmapsub 39727	The projective map of a Hi...
pmapglbx 39728	The projective map of the ...
pmapglb 39729	The projective map of the ...
pmapglb2N 39730	The projective map of the ...
pmapglb2xN 39731	The projective map of the ...
pmapmeet 39732	The projective map of a me...
isline2 39733	Definition of line in term...
linepmap 39734	A line described with a pr...
isline3 39735	Definition of line in term...
isline4N 39736	Definition of line in term...
lneq2at 39737	A line equals the join of ...
lnatexN 39738	There is an atom in a line...
lnjatN 39739	Given an atom in a line, t...
lncvrelatN 39740	A lattice element covered ...
lncvrat 39741	A line covers the atoms it...
lncmp 39742	If two lines are comparabl...
2lnat 39743	Two intersecting lines int...
2atm2atN 39744	Two joins with a common at...
2llnma1b 39745	Generalization of ~ 2llnma...
2llnma1 39746	Two different intersecting...
2llnma3r 39747	Two different intersecting...
2llnma2 39748	Two different intersecting...
2llnma2rN 39749	Two different intersecting...
cdlema1N 39750	A condition for required f...
cdlema2N 39751	A condition for required f...
cdlemblem 39752	Lemma for ~ cdlemb . (Con...
cdlemb 39753	Given two atoms not less t...
paddfval 39756	Projective subspace sum op...
paddval 39757	Projective subspace sum op...
elpadd 39758	Member of a projective sub...
elpaddn0 39759	Member of projective subsp...
paddvaln0N 39760	Projective subspace sum op...
elpaddri 39761	Condition implying members...
elpaddatriN 39762	Condition implying members...
elpaddat 39763	Membership in a projective...
elpaddatiN 39764	Consequence of membership ...
elpadd2at 39765	Membership in a projective...
elpadd2at2 39766	Membership in a projective...
paddunssN 39767	Projective subspace sum in...
elpadd0 39768	Member of projective subsp...
paddval0 39769	Projective subspace sum wi...
padd01 39770	Projective subspace sum wi...
padd02 39771	Projective subspace sum wi...
paddcom 39772	Projective subspace sum co...
paddssat 39773	A projective subspace sum ...
sspadd1 39774	A projective subspace sum ...
sspadd2 39775	A projective subspace sum ...
paddss1 39776	Subset law for projective ...
paddss2 39777	Subset law for projective ...
paddss12 39778	Subset law for projective ...
paddasslem1 39779	Lemma for ~ paddass . (Co...
paddasslem2 39780	Lemma for ~ paddass . (Co...
paddasslem3 39781	Lemma for ~ paddass . Res...
paddasslem4 39782	Lemma for ~ paddass . Com...
paddasslem5 39783	Lemma for ~ paddass . Sho...
paddasslem6 39784	Lemma for ~ paddass . (Co...
paddasslem7 39785	Lemma for ~ paddass . Com...
paddasslem8 39786	Lemma for ~ paddass . (Co...
paddasslem9 39787	Lemma for ~ paddass . Com...
paddasslem10 39788	Lemma for ~ paddass . Use...
paddasslem11 39789	Lemma for ~ paddass . The...
paddasslem12 39790	Lemma for ~ paddass . The...
paddasslem13 39791	Lemma for ~ paddass . The...
paddasslem14 39792	Lemma for ~ paddass . Rem...
paddasslem15 39793	Lemma for ~ paddass . Use...
paddasslem16 39794	Lemma for ~ paddass . Use...
paddasslem17 39795	Lemma for ~ paddass . The...
paddasslem18 39796	Lemma for ~ paddass . Com...
paddass 39797	Projective subspace sum is...
padd12N 39798	Commutative/associative la...
padd4N 39799	Rearrangement of 4 terms i...
paddidm 39800	Projective subspace sum is...
paddclN 39801	The projective sum of two ...
paddssw1 39802	Subset law for projective ...
paddssw2 39803	Subset law for projective ...
paddss 39804	Subset law for projective ...
pmodlem1 39805	Lemma for ~ pmod1i . (Con...
pmodlem2 39806	Lemma for ~ pmod1i . (Con...
pmod1i 39807	The modular law holds in a...
pmod2iN 39808	Dual of the modular law. ...
pmodN 39809	The modular law for projec...
pmodl42N 39810	Lemma derived from modular...
pmapjoin 39811	The projective map of the ...
pmapjat1 39812	The projective map of the ...
pmapjat2 39813	The projective map of the ...
pmapjlln1 39814	The projective map of the ...
hlmod1i 39815	A version of the modular l...
atmod1i1 39816	Version of modular law ~ p...
atmod1i1m 39817	Version of modular law ~ p...
atmod1i2 39818	Version of modular law ~ p...
llnmod1i2 39819	Version of modular law ~ p...
atmod2i1 39820	Version of modular law ~ p...
atmod2i2 39821	Version of modular law ~ p...
llnmod2i2 39822	Version of modular law ~ p...
atmod3i1 39823	Version of modular law tha...
atmod3i2 39824	Version of modular law tha...
atmod4i1 39825	Version of modular law tha...
atmod4i2 39826	Version of modular law tha...
llnexchb2lem 39827	Lemma for ~ llnexchb2 . (...
llnexchb2 39828	Line exchange property (co...
llnexch2N 39829	Line exchange property (co...
dalawlem1 39830	Lemma for ~ dalaw . Speci...
dalawlem2 39831	Lemma for ~ dalaw . Utili...
dalawlem3 39832	Lemma for ~ dalaw . First...
dalawlem4 39833	Lemma for ~ dalaw . Secon...
dalawlem5 39834	Lemma for ~ dalaw . Speci...
dalawlem6 39835	Lemma for ~ dalaw . First...
dalawlem7 39836	Lemma for ~ dalaw . Secon...
dalawlem8 39837	Lemma for ~ dalaw . Speci...
dalawlem9 39838	Lemma for ~ dalaw . Speci...
dalawlem10 39839	Lemma for ~ dalaw . Combi...
dalawlem11 39840	Lemma for ~ dalaw . First...
dalawlem12 39841	Lemma for ~ dalaw . Secon...
dalawlem13 39842	Lemma for ~ dalaw . Speci...
dalawlem14 39843	Lemma for ~ dalaw . Combi...
dalawlem15 39844	Lemma for ~ dalaw . Swap ...
dalaw 39845	Desargues's law, derived f...
pclfvalN 39848	The projective subspace cl...
pclvalN 39849	Value of the projective su...
pclclN 39850	Closure of the projective ...
elpclN 39851	Membership in the projecti...
elpcliN 39852	Implication of membership ...
pclssN 39853	Ordering is preserved by s...
pclssidN 39854	A set of atoms is included...
pclidN 39855	The projective subspace cl...
pclbtwnN 39856	A projective subspace sand...
pclunN 39857	The projective subspace cl...
pclun2N 39858	The projective subspace cl...
pclfinN 39859	The projective subspace cl...
pclcmpatN 39860	The set of projective subs...
polfvalN 39863	The projective subspace po...
polvalN 39864	Value of the projective su...
polval2N 39865	Alternate expression for v...
polsubN 39866	The polarity of a set of a...
polssatN 39867	The polarity of a set of a...
pol0N 39868	The polarity of the empty ...
pol1N 39869	The polarity of the whole ...
2pol0N 39870	The closed subspace closur...
polpmapN 39871	The polarity of a projecti...
2polpmapN 39872	Double polarity of a proje...
2polvalN 39873	Value of double polarity. ...
2polssN 39874	A set of atoms is a subset...
3polN 39875	Triple polarity cancels to...
polcon3N 39876	Contraposition law for pol...
2polcon4bN 39877	Contraposition law for pol...
polcon2N 39878	Contraposition law for pol...
polcon2bN 39879	Contraposition law for pol...
pclss2polN 39880	The projective subspace cl...
pcl0N 39881	The projective subspace cl...
pcl0bN 39882	The projective subspace cl...
pmaplubN 39883	The LUB of a projective ma...
sspmaplubN 39884	A set of atoms is a subset...
2pmaplubN 39885	Double projective map of a...
paddunN 39886	The closure of the project...
poldmj1N 39887	De Morgan's law for polari...
pmapj2N 39888	The projective map of the ...
pmapocjN 39889	The projective map of the ...
polatN 39890	The polarity of the single...
2polatN 39891	Double polarity of the sin...
pnonsingN 39892	The intersection of a set ...
psubclsetN 39895	The set of closed projecti...
ispsubclN 39896	The predicate "is a closed...
psubcliN 39897	Property of a closed proje...
psubcli2N 39898	Property of a closed proje...
psubclsubN 39899	A closed projective subspa...
psubclssatN 39900	A closed projective subspa...
pmapidclN 39901	Projective map of the LUB ...
0psubclN 39902	The empty set is a closed ...
1psubclN 39903	The set of all atoms is a ...
atpsubclN 39904	A point (singleton of an a...
pmapsubclN 39905	A projective map value is ...
ispsubcl2N 39906	Alternate predicate for "i...
psubclinN 39907	The intersection of two cl...
paddatclN 39908	The projective sum of a cl...
pclfinclN 39909	The projective subspace cl...
linepsubclN 39910	A line is a closed project...
polsubclN 39911	A polarity is a closed pro...
poml4N 39912	Orthomodular law for proje...
poml5N 39913	Orthomodular law for proje...
poml6N 39914	Orthomodular law for proje...
osumcllem1N 39915	Lemma for ~ osumclN . (Co...
osumcllem2N 39916	Lemma for ~ osumclN . (Co...
osumcllem3N 39917	Lemma for ~ osumclN . (Co...
osumcllem4N 39918	Lemma for ~ osumclN . (Co...
osumcllem5N 39919	Lemma for ~ osumclN . (Co...
osumcllem6N 39920	Lemma for ~ osumclN . Use...
osumcllem7N 39921	Lemma for ~ osumclN . (Co...
osumcllem8N 39922	Lemma for ~ osumclN . (Co...
osumcllem9N 39923	Lemma for ~ osumclN . (Co...
osumcllem10N 39924	Lemma for ~ osumclN . Con...
osumcllem11N 39925	Lemma for ~ osumclN . (Co...
osumclN 39926	Closure of orthogonal sum....
pmapojoinN 39927	For orthogonal elements, p...
pexmidN 39928	Excluded middle law for cl...
pexmidlem1N 39929	Lemma for ~ pexmidN . Hol...
pexmidlem2N 39930	Lemma for ~ pexmidN . (Co...
pexmidlem3N 39931	Lemma for ~ pexmidN . Use...
pexmidlem4N 39932	Lemma for ~ pexmidN . (Co...
pexmidlem5N 39933	Lemma for ~ pexmidN . (Co...
pexmidlem6N 39934	Lemma for ~ pexmidN . (Co...
pexmidlem7N 39935	Lemma for ~ pexmidN . Con...
pexmidlem8N 39936	Lemma for ~ pexmidN . The...
pexmidALTN 39937	Excluded middle law for cl...
pl42lem1N 39938	Lemma for ~ pl42N . (Cont...
pl42lem2N 39939	Lemma for ~ pl42N . (Cont...
pl42lem3N 39940	Lemma for ~ pl42N . (Cont...
pl42lem4N 39941	Lemma for ~ pl42N . (Cont...
pl42N 39942	Law holding in a Hilbert l...
watfvalN 39951	The W atoms function. (Co...
watvalN 39952	Value of the W atoms funct...
iswatN 39953	The predicate "is a W atom...
lhpset 39954	The set of co-atoms (latti...
islhp 39955	The predicate "is a co-ato...
islhp2 39956	The predicate "is a co-ato...
lhpbase 39957	A co-atom is a member of t...
lhp1cvr 39958	The lattice unity covers a...
lhplt 39959	An atom under a co-atom is...
lhp2lt 39960	The join of two atoms unde...
lhpexlt 39961	There exists an atom less ...
lhp0lt 39962	A co-atom is greater than ...
lhpn0 39963	A co-atom is nonzero. TOD...
lhpexle 39964	There exists an atom under...
lhpexnle 39965	There exists an atom not u...
lhpexle1lem 39966	Lemma for ~ lhpexle1 and o...
lhpexle1 39967	There exists an atom under...
lhpexle2lem 39968	Lemma for ~ lhpexle2 . (C...
lhpexle2 39969	There exists atom under a ...
lhpexle3lem 39970	There exists atom under a ...
lhpexle3 39971	There exists atom under a ...
lhpex2leN 39972	There exist at least two d...
lhpoc 39973	The orthocomplement of a c...
lhpoc2N 39974	The orthocomplement of an ...
lhpocnle 39975	The orthocomplement of a c...
lhpocat 39976	The orthocomplement of a c...
lhpocnel 39977	The orthocomplement of a c...
lhpocnel2 39978	The orthocomplement of a c...
lhpjat1 39979	The join of a co-atom (hyp...
lhpjat2 39980	The join of a co-atom (hyp...
lhpj1 39981	The join of a co-atom (hyp...
lhpmcvr 39982	The meet of a lattice hype...
lhpmcvr2 39983	Alternate way to express t...
lhpmcvr3 39984	Specialization of ~ lhpmcv...
lhpmcvr4N 39985	Specialization of ~ lhpmcv...
lhpmcvr5N 39986	Specialization of ~ lhpmcv...
lhpmcvr6N 39987	Specialization of ~ lhpmcv...
lhpm0atN 39988	If the meet of a lattice h...
lhpmat 39989	An element covered by the ...
lhpmatb 39990	An element covered by the ...
lhp2at0 39991	Join and meet with differe...
lhp2atnle 39992	Inequality for 2 different...
lhp2atne 39993	Inequality for joins with ...
lhp2at0nle 39994	Inequality for 2 different...
lhp2at0ne 39995	Inequality for joins with ...
lhpelim 39996	Eliminate an atom not unde...
lhpmod2i2 39997	Modular law for hyperplane...
lhpmod6i1 39998	Modular law for hyperplane...
lhprelat3N 39999	The Hilbert lattice is rel...
cdlemb2 40000	Given two atoms not under ...
lhple 40001	Property of a lattice elem...
lhpat 40002	Create an atom under a co-...
lhpat4N 40003	Property of an atom under ...
lhpat2 40004	Create an atom under a co-...
lhpat3 40005	There is only one atom und...
4atexlemk 40006	Lemma for ~ 4atexlem7 . (...
4atexlemw 40007	Lemma for ~ 4atexlem7 . (...
4atexlempw 40008	Lemma for ~ 4atexlem7 . (...
4atexlemp 40009	Lemma for ~ 4atexlem7 . (...
4atexlemq 40010	Lemma for ~ 4atexlem7 . (...
4atexlems 40011	Lemma for ~ 4atexlem7 . (...
4atexlemt 40012	Lemma for ~ 4atexlem7 . (...
4atexlemutvt 40013	Lemma for ~ 4atexlem7 . (...
4atexlempnq 40014	Lemma for ~ 4atexlem7 . (...
4atexlemnslpq 40015	Lemma for ~ 4atexlem7 . (...
4atexlemkl 40016	Lemma for ~ 4atexlem7 . (...
4atexlemkc 40017	Lemma for ~ 4atexlem7 . (...
4atexlemwb 40018	Lemma for ~ 4atexlem7 . (...
4atexlempsb 40019	Lemma for ~ 4atexlem7 . (...
4atexlemqtb 40020	Lemma for ~ 4atexlem7 . (...
4atexlempns 40021	Lemma for ~ 4atexlem7 . (...
4atexlemswapqr 40022	Lemma for ~ 4atexlem7 . S...
4atexlemu 40023	Lemma for ~ 4atexlem7 . (...
4atexlemv 40024	Lemma for ~ 4atexlem7 . (...
4atexlemunv 40025	Lemma for ~ 4atexlem7 . (...
4atexlemtlw 40026	Lemma for ~ 4atexlem7 . (...
4atexlemntlpq 40027	Lemma for ~ 4atexlem7 . (...
4atexlemc 40028	Lemma for ~ 4atexlem7 . (...
4atexlemnclw 40029	Lemma for ~ 4atexlem7 . (...
4atexlemex2 40030	Lemma for ~ 4atexlem7 . S...
4atexlemcnd 40031	Lemma for ~ 4atexlem7 . (...
4atexlemex4 40032	Lemma for ~ 4atexlem7 . S...
4atexlemex6 40033	Lemma for ~ 4atexlem7 . (...
4atexlem7 40034	Whenever there are at leas...
4atex 40035	Whenever there are at leas...
4atex2 40036	More general version of ~ ...
4atex2-0aOLDN 40037	Same as ~ 4atex2 except th...
4atex2-0bOLDN 40038	Same as ~ 4atex2 except th...
4atex2-0cOLDN 40039	Same as ~ 4atex2 except th...
4atex3 40040	More general version of ~ ...
lautset 40041	The set of lattice automor...
islaut 40042	The predicate "is a lattic...
lautle 40043	Less-than or equal propert...
laut1o 40044	A lattice automorphism is ...
laut11 40045	One-to-one property of a l...
lautcl 40046	A lattice automorphism val...
lautcnvclN 40047	Reverse closure of a latti...
lautcnvle 40048	Less-than or equal propert...
lautcnv 40049	The converse of a lattice ...
lautlt 40050	Less-than property of a la...
lautcvr 40051	Covering property of a lat...
lautj 40052	Meet property of a lattice...
lautm 40053	Meet property of a lattice...
lauteq 40054	A lattice automorphism arg...
idlaut 40055	The identity function is a...
lautco 40056	The composition of two lat...
pautsetN 40057	The set of projective auto...
ispautN 40058	The predicate "is a projec...
ldilfset 40067	The mapping from fiducial ...
ldilset 40068	The set of lattice dilatio...
isldil 40069	The predicate "is a lattic...
ldillaut 40070	A lattice dilation is an a...
ldil1o 40071	A lattice dilation is a on...
ldilval 40072	Value of a lattice dilatio...
idldil 40073	The identity function is a...
ldilcnv 40074	The converse of a lattice ...
ldilco 40075	The composition of two lat...
ltrnfset 40076	The set of all lattice tra...
ltrnset 40077	The set of lattice transla...
isltrn 40078	The predicate "is a lattic...
isltrn2N 40079	The predicate "is a lattic...
ltrnu 40080	Uniqueness property of a l...
ltrnldil 40081	A lattice translation is a...
ltrnlaut 40082	A lattice translation is a...
ltrn1o 40083	A lattice translation is a...
ltrncl 40084	Closure of a lattice trans...
ltrn11 40085	One-to-one property of a l...
ltrncnvnid 40086	If a translation is differ...
ltrncoidN 40087	Two translations are equal...
ltrnle 40088	Less-than or equal propert...
ltrncnvleN 40089	Less-than or equal propert...
ltrnm 40090	Lattice translation of a m...
ltrnj 40091	Lattice translation of a m...
ltrncvr 40092	Covering property of a lat...
ltrnval1 40093	Value of a lattice transla...
ltrnid 40094	A lattice translation is t...
ltrnnid 40095	If a lattice translation i...
ltrnatb 40096	The lattice translation of...
ltrncnvatb 40097	The converse of the lattic...
ltrnel 40098	The lattice translation of...
ltrnat 40099	The lattice translation of...
ltrncnvat 40100	The converse of the lattic...
ltrncnvel 40101	The converse of the lattic...
ltrncoelN 40102	Composition of lattice tra...
ltrncoat 40103	Composition of lattice tra...
ltrncoval 40104	Two ways to express value ...
ltrncnv 40105	The converse of a lattice ...
ltrn11at 40106	Frequently used one-to-one...
ltrneq2 40107	The equality of two transl...
ltrneq 40108	The equality of two transl...
idltrn 40109	The identity function is a...
ltrnmw 40110	Property of lattice transl...
dilfsetN 40111	The mapping from fiducial ...
dilsetN 40112	The set of dilations for a...
isdilN 40113	The predicate "is a dilati...
trnfsetN 40114	The mapping from fiducial ...
trnsetN 40115	The set of translations fo...
istrnN 40116	The predicate "is a transl...
trlfset 40119	The set of all traces of l...
trlset 40120	The set of traces of latti...
trlval 40121	The value of the trace of ...
trlval2 40122	The value of the trace of ...
trlcl 40123	Closure of the trace of a ...
trlcnv 40124	The trace of the converse ...
trljat1 40125	The value of a translation...
trljat2 40126	The value of a translation...
trljat3 40127	The value of a translation...
trlat 40128	If an atom differs from it...
trl0 40129	If an atom not under the f...
trlator0 40130	The trace of a lattice tra...
trlatn0 40131	The trace of a lattice tra...
trlnidat 40132	The trace of a lattice tra...
ltrnnidn 40133	If a lattice translation i...
ltrnideq 40134	Property of the identity l...
trlid0 40135	The trace of the identity ...
trlnidatb 40136	A lattice translation is n...
trlid0b 40137	A lattice translation is t...
trlnid 40138	Different translations wit...
ltrn2ateq 40139	Property of the equality o...
ltrnateq 40140	If any atom (under ` W ` )...
ltrnatneq 40141	If any atom (under ` W ` )...
ltrnatlw 40142	If the value of an atom eq...
trlle 40143	The trace of a lattice tra...
trlne 40144	The trace of a lattice tra...
trlnle 40145	The atom not under the fid...
trlval3 40146	The value of the trace of ...
trlval4 40147	The value of the trace of ...
trlval5 40148	The value of the trace of ...
arglem1N 40149	Lemma for Desargues's law....
cdlemc1 40150	Part of proof of Lemma C i...
cdlemc2 40151	Part of proof of Lemma C i...
cdlemc3 40152	Part of proof of Lemma C i...
cdlemc4 40153	Part of proof of Lemma C i...
cdlemc5 40154	Lemma for ~ cdlemc . (Con...
cdlemc6 40155	Lemma for ~ cdlemc . (Con...
cdlemc 40156	Lemma C in [Crawley] p. 11...
cdlemd1 40157	Part of proof of Lemma D i...
cdlemd2 40158	Part of proof of Lemma D i...
cdlemd3 40159	Part of proof of Lemma D i...
cdlemd4 40160	Part of proof of Lemma D i...
cdlemd5 40161	Part of proof of Lemma D i...
cdlemd6 40162	Part of proof of Lemma D i...
cdlemd7 40163	Part of proof of Lemma D i...
cdlemd8 40164	Part of proof of Lemma D i...
cdlemd9 40165	Part of proof of Lemma D i...
cdlemd 40166	If two translations agree ...
ltrneq3 40167	Two translations agree at ...
cdleme00a 40168	Part of proof of Lemma E i...
cdleme0aa 40169	Part of proof of Lemma E i...
cdleme0a 40170	Part of proof of Lemma E i...
cdleme0b 40171	Part of proof of Lemma E i...
cdleme0c 40172	Part of proof of Lemma E i...
cdleme0cp 40173	Part of proof of Lemma E i...
cdleme0cq 40174	Part of proof of Lemma E i...
cdleme0dN 40175	Part of proof of Lemma E i...
cdleme0e 40176	Part of proof of Lemma E i...
cdleme0fN 40177	Part of proof of Lemma E i...
cdleme0gN 40178	Part of proof of Lemma E i...
cdlemeulpq 40179	Part of proof of Lemma E i...
cdleme01N 40180	Part of proof of Lemma E i...
cdleme02N 40181	Part of proof of Lemma E i...
cdleme0ex1N 40182	Part of proof of Lemma E i...
cdleme0ex2N 40183	Part of proof of Lemma E i...
cdleme0moN 40184	Part of proof of Lemma E i...
cdleme1b 40185	Part of proof of Lemma E i...
cdleme1 40186	Part of proof of Lemma E i...
cdleme2 40187	Part of proof of Lemma E i...
cdleme3b 40188	Part of proof of Lemma E i...
cdleme3c 40189	Part of proof of Lemma E i...
cdleme3d 40190	Part of proof of Lemma E i...
cdleme3e 40191	Part of proof of Lemma E i...
cdleme3fN 40192	Part of proof of Lemma E i...
cdleme3g 40193	Part of proof of Lemma E i...
cdleme3h 40194	Part of proof of Lemma E i...
cdleme3fa 40195	Part of proof of Lemma E i...
cdleme3 40196	Part of proof of Lemma E i...
cdleme4 40197	Part of proof of Lemma E i...
cdleme4a 40198	Part of proof of Lemma E i...
cdleme5 40199	Part of proof of Lemma E i...
cdleme6 40200	Part of proof of Lemma E i...
cdleme7aa 40201	Part of proof of Lemma E i...
cdleme7a 40202	Part of proof of Lemma E i...
cdleme7b 40203	Part of proof of Lemma E i...
cdleme7c 40204	Part of proof of Lemma E i...
cdleme7d 40205	Part of proof of Lemma E i...
cdleme7e 40206	Part of proof of Lemma E i...
cdleme7ga 40207	Part of proof of Lemma E i...
cdleme7 40208	Part of proof of Lemma E i...
cdleme8 40209	Part of proof of Lemma E i...
cdleme9a 40210	Part of proof of Lemma E i...
cdleme9b 40211	Utility lemma for Lemma E ...
cdleme9 40212	Part of proof of Lemma E i...
cdleme10 40213	Part of proof of Lemma E i...
cdleme8tN 40214	Part of proof of Lemma E i...
cdleme9taN 40215	Part of proof of Lemma E i...
cdleme9tN 40216	Part of proof of Lemma E i...
cdleme10tN 40217	Part of proof of Lemma E i...
cdleme16aN 40218	Part of proof of Lemma E i...
cdleme11a 40219	Part of proof of Lemma E i...
cdleme11c 40220	Part of proof of Lemma E i...
cdleme11dN 40221	Part of proof of Lemma E i...
cdleme11e 40222	Part of proof of Lemma E i...
cdleme11fN 40223	Part of proof of Lemma E i...
cdleme11g 40224	Part of proof of Lemma E i...
cdleme11h 40225	Part of proof of Lemma E i...
cdleme11j 40226	Part of proof of Lemma E i...
cdleme11k 40227	Part of proof of Lemma E i...
cdleme11l 40228	Part of proof of Lemma E i...
cdleme11 40229	Part of proof of Lemma E i...
cdleme12 40230	Part of proof of Lemma E i...
cdleme13 40231	Part of proof of Lemma E i...
cdleme14 40232	Part of proof of Lemma E i...
cdleme15a 40233	Part of proof of Lemma E i...
cdleme15b 40234	Part of proof of Lemma E i...
cdleme15c 40235	Part of proof of Lemma E i...
cdleme15d 40236	Part of proof of Lemma E i...
cdleme15 40237	Part of proof of Lemma E i...
cdleme16b 40238	Part of proof of Lemma E i...
cdleme16c 40239	Part of proof of Lemma E i...
cdleme16d 40240	Part of proof of Lemma E i...
cdleme16e 40241	Part of proof of Lemma E i...
cdleme16f 40242	Part of proof of Lemma E i...
cdleme16g 40243	Part of proof of Lemma E i...
cdleme16 40244	Part of proof of Lemma E i...
cdleme17a 40245	Part of proof of Lemma E i...
cdleme17b 40246	Lemma leading to ~ cdleme1...
cdleme17c 40247	Part of proof of Lemma E i...
cdleme17d1 40248	Part of proof of Lemma E i...
cdleme0nex 40249	Part of proof of Lemma E i...
cdleme18a 40250	Part of proof of Lemma E i...
cdleme18b 40251	Part of proof of Lemma E i...
cdleme18c 40252	Part of proof of Lemma E i...
cdleme22gb 40253	Utility lemma for Lemma E ...
cdleme18d 40254	Part of proof of Lemma E i...
cdlemesner 40255	Part of proof of Lemma E i...
cdlemedb 40256	Part of proof of Lemma E i...
cdlemeda 40257	Part of proof of Lemma E i...
cdlemednpq 40258	Part of proof of Lemma E i...
cdlemednuN 40259	Part of proof of Lemma E i...
cdleme20zN 40260	Part of proof of Lemma E i...
cdleme20y 40261	Part of proof of Lemma E i...
cdleme19a 40262	Part of proof of Lemma E i...
cdleme19b 40263	Part of proof of Lemma E i...
cdleme19c 40264	Part of proof of Lemma E i...
cdleme19d 40265	Part of proof of Lemma E i...
cdleme19e 40266	Part of proof of Lemma E i...
cdleme19f 40267	Part of proof of Lemma E i...
cdleme20aN 40268	Part of proof of Lemma E i...
cdleme20bN 40269	Part of proof of Lemma E i...
cdleme20c 40270	Part of proof of Lemma E i...
cdleme20d 40271	Part of proof of Lemma E i...
cdleme20e 40272	Part of proof of Lemma E i...
cdleme20f 40273	Part of proof of Lemma E i...
cdleme20g 40274	Part of proof of Lemma E i...
cdleme20h 40275	Part of proof of Lemma E i...
cdleme20i 40276	Part of proof of Lemma E i...
cdleme20j 40277	Part of proof of Lemma E i...
cdleme20k 40278	Part of proof of Lemma E i...
cdleme20l1 40279	Part of proof of Lemma E i...
cdleme20l2 40280	Part of proof of Lemma E i...
cdleme20l 40281	Part of proof of Lemma E i...
cdleme20m 40282	Part of proof of Lemma E i...
cdleme20 40283	Combine ~ cdleme19f and ~ ...
cdleme21a 40284	Part of proof of Lemma E i...
cdleme21b 40285	Part of proof of Lemma E i...
cdleme21c 40286	Part of proof of Lemma E i...
cdleme21at 40287	Part of proof of Lemma E i...
cdleme21ct 40288	Part of proof of Lemma E i...
cdleme21d 40289	Part of proof of Lemma E i...
cdleme21e 40290	Part of proof of Lemma E i...
cdleme21f 40291	Part of proof of Lemma E i...
cdleme21g 40292	Part of proof of Lemma E i...
cdleme21h 40293	Part of proof of Lemma E i...
cdleme21i 40294	Part of proof of Lemma E i...
cdleme21j 40295	Combine ~ cdleme20 and ~ c...
cdleme21 40296	Part of proof of Lemma E i...
cdleme21k 40297	Eliminate ` S =/= T ` cond...
cdleme22aa 40298	Part of proof of Lemma E i...
cdleme22a 40299	Part of proof of Lemma E i...
cdleme22b 40300	Part of proof of Lemma E i...
cdleme22cN 40301	Part of proof of Lemma E i...
cdleme22d 40302	Part of proof of Lemma E i...
cdleme22e 40303	Part of proof of Lemma E i...
cdleme22eALTN 40304	Part of proof of Lemma E i...
cdleme22f 40305	Part of proof of Lemma E i...
cdleme22f2 40306	Part of proof of Lemma E i...
cdleme22g 40307	Part of proof of Lemma E i...
cdleme23a 40308	Part of proof of Lemma E i...
cdleme23b 40309	Part of proof of Lemma E i...
cdleme23c 40310	Part of proof of Lemma E i...
cdleme24 40311	Quantified version of ~ cd...
cdleme25a 40312	Lemma for ~ cdleme25b . (...
cdleme25b 40313	Transform ~ cdleme24 . TO...
cdleme25c 40314	Transform ~ cdleme25b . (...
cdleme25dN 40315	Transform ~ cdleme25c . (...
cdleme25cl 40316	Show closure of the unique...
cdleme25cv 40317	Change bound variables in ...
cdleme26e 40318	Part of proof of Lemma E i...
cdleme26ee 40319	Part of proof of Lemma E i...
cdleme26eALTN 40320	Part of proof of Lemma E i...
cdleme26fALTN 40321	Part of proof of Lemma E i...
cdleme26f 40322	Part of proof of Lemma E i...
cdleme26f2ALTN 40323	Part of proof of Lemma E i...
cdleme26f2 40324	Part of proof of Lemma E i...
cdleme27cl 40325	Part of proof of Lemma E i...
cdleme27a 40326	Part of proof of Lemma E i...
cdleme27b 40327	Lemma for ~ cdleme27N . (...
cdleme27N 40328	Part of proof of Lemma E i...
cdleme28a 40329	Lemma for ~ cdleme25b . T...
cdleme28b 40330	Lemma for ~ cdleme25b . T...
cdleme28c 40331	Part of proof of Lemma E i...
cdleme28 40332	Quantified version of ~ cd...
cdleme29ex 40333	Lemma for ~ cdleme29b . (...
cdleme29b 40334	Transform ~ cdleme28 . (C...
cdleme29c 40335	Transform ~ cdleme28b . (...
cdleme29cl 40336	Show closure of the unique...
cdleme30a 40337	Part of proof of Lemma E i...
cdleme31so 40338	Part of proof of Lemma E i...
cdleme31sn 40339	Part of proof of Lemma E i...
cdleme31sn1 40340	Part of proof of Lemma E i...
cdleme31se 40341	Part of proof of Lemma D i...
cdleme31se2 40342	Part of proof of Lemma D i...
cdleme31sc 40343	Part of proof of Lemma E i...
cdleme31sde 40344	Part of proof of Lemma D i...
cdleme31snd 40345	Part of proof of Lemma D i...
cdleme31sdnN 40346	Part of proof of Lemma E i...
cdleme31sn1c 40347	Part of proof of Lemma E i...
cdleme31sn2 40348	Part of proof of Lemma E i...
cdleme31fv 40349	Part of proof of Lemma E i...
cdleme31fv1 40350	Part of proof of Lemma E i...
cdleme31fv1s 40351	Part of proof of Lemma E i...
cdleme31fv2 40352	Part of proof of Lemma E i...
cdleme31id 40353	Part of proof of Lemma E i...
cdlemefrs29pre00 40354	***START OF VALUE AT ATOM ...
cdlemefrs29bpre0 40355	TODO fix comment. (Contri...
cdlemefrs29bpre1 40356	TODO: FIX COMMENT. (Contr...
cdlemefrs29cpre1 40357	TODO: FIX COMMENT. (Contr...
cdlemefrs29clN 40358	TODO: NOT USED? Show clo...
cdlemefrs32fva 40359	Part of proof of Lemma E i...
cdlemefrs32fva1 40360	Part of proof of Lemma E i...
cdlemefr29exN 40361	Lemma for ~ cdlemefs29bpre...
cdlemefr27cl 40362	Part of proof of Lemma E i...
cdlemefr32sn2aw 40363	Show that ` [_ R / s ]_ N ...
cdlemefr32snb 40364	Show closure of ` [_ R / s...
cdlemefr29bpre0N 40365	TODO fix comment. (Contri...
cdlemefr29clN 40366	Show closure of the unique...
cdleme43frv1snN 40367	Value of ` [_ R / s ]_ N `...
cdlemefr32fvaN 40368	Part of proof of Lemma E i...
cdlemefr32fva1 40369	Part of proof of Lemma E i...
cdlemefr31fv1 40370	Value of ` ( F `` R ) ` wh...
cdlemefs29pre00N 40371	FIX COMMENT. TODO: see if ...
cdlemefs27cl 40372	Part of proof of Lemma E i...
cdlemefs32sn1aw 40373	Show that ` [_ R / s ]_ N ...
cdlemefs32snb 40374	Show closure of ` [_ R / s...
cdlemefs29bpre0N 40375	TODO: FIX COMMENT. (Contr...
cdlemefs29bpre1N 40376	TODO: FIX COMMENT. (Contr...
cdlemefs29cpre1N 40377	TODO: FIX COMMENT. (Contr...
cdlemefs29clN 40378	Show closure of the unique...
cdleme43fsv1snlem 40379	Value of ` [_ R / s ]_ N `...
cdleme43fsv1sn 40380	Value of ` [_ R / s ]_ N `...
cdlemefs32fvaN 40381	Part of proof of Lemma E i...
cdlemefs32fva1 40382	Part of proof of Lemma E i...
cdlemefs31fv1 40383	Value of ` ( F `` R ) ` wh...
cdlemefr44 40384	Value of f(r) when r is an...
cdlemefs44 40385	Value of f_s(r) when r is ...
cdlemefr45 40386	Value of f(r) when r is an...
cdlemefr45e 40387	Explicit expansion of ~ cd...
cdlemefs45 40388	Value of f_s(r) when r is ...
cdlemefs45ee 40389	Explicit expansion of ~ cd...
cdlemefs45eN 40390	Explicit expansion of ~ cd...
cdleme32sn1awN 40391	Show that ` [_ R / s ]_ N ...
cdleme41sn3a 40392	Show that ` [_ R / s ]_ N ...
cdleme32sn2awN 40393	Show that ` [_ R / s ]_ N ...
cdleme32snaw 40394	Show that ` [_ R / s ]_ N ...
cdleme32snb 40395	Show closure of ` [_ R / s...
cdleme32fva 40396	Part of proof of Lemma D i...
cdleme32fva1 40397	Part of proof of Lemma D i...
cdleme32fvaw 40398	Show that ` ( F `` R ) ` i...
cdleme32fvcl 40399	Part of proof of Lemma D i...
cdleme32a 40400	Part of proof of Lemma D i...
cdleme32b 40401	Part of proof of Lemma D i...
cdleme32c 40402	Part of proof of Lemma D i...
cdleme32d 40403	Part of proof of Lemma D i...
cdleme32e 40404	Part of proof of Lemma D i...
cdleme32f 40405	Part of proof of Lemma D i...
cdleme32le 40406	Part of proof of Lemma D i...
cdleme35a 40407	Part of proof of Lemma E i...
cdleme35fnpq 40408	Part of proof of Lemma E i...
cdleme35b 40409	Part of proof of Lemma E i...
cdleme35c 40410	Part of proof of Lemma E i...
cdleme35d 40411	Part of proof of Lemma E i...
cdleme35e 40412	Part of proof of Lemma E i...
cdleme35f 40413	Part of proof of Lemma E i...
cdleme35g 40414	Part of proof of Lemma E i...
cdleme35h 40415	Part of proof of Lemma E i...
cdleme35h2 40416	Part of proof of Lemma E i...
cdleme35sn2aw 40417	Part of proof of Lemma E i...
cdleme35sn3a 40418	Part of proof of Lemma E i...
cdleme36a 40419	Part of proof of Lemma E i...
cdleme36m 40420	Part of proof of Lemma E i...
cdleme37m 40421	Part of proof of Lemma E i...
cdleme38m 40422	Part of proof of Lemma E i...
cdleme38n 40423	Part of proof of Lemma E i...
cdleme39a 40424	Part of proof of Lemma E i...
cdleme39n 40425	Part of proof of Lemma E i...
cdleme40m 40426	Part of proof of Lemma E i...
cdleme40n 40427	Part of proof of Lemma E i...
cdleme40v 40428	Part of proof of Lemma E i...
cdleme40w 40429	Part of proof of Lemma E i...
cdleme42a 40430	Part of proof of Lemma E i...
cdleme42c 40431	Part of proof of Lemma E i...
cdleme42d 40432	Part of proof of Lemma E i...
cdleme41sn3aw 40433	Part of proof of Lemma E i...
cdleme41sn4aw 40434	Part of proof of Lemma E i...
cdleme41snaw 40435	Part of proof of Lemma E i...
cdleme41fva11 40436	Part of proof of Lemma E i...
cdleme42b 40437	Part of proof of Lemma E i...
cdleme42e 40438	Part of proof of Lemma E i...
cdleme42f 40439	Part of proof of Lemma E i...
cdleme42g 40440	Part of proof of Lemma E i...
cdleme42h 40441	Part of proof of Lemma E i...
cdleme42i 40442	Part of proof of Lemma E i...
cdleme42k 40443	Part of proof of Lemma E i...
cdleme42ke 40444	Part of proof of Lemma E i...
cdleme42keg 40445	Part of proof of Lemma E i...
cdleme42mN 40446	Part of proof of Lemma E i...
cdleme42mgN 40447	Part of proof of Lemma E i...
cdleme43aN 40448	Part of proof of Lemma E i...
cdleme43bN 40449	Lemma for Lemma E in [Craw...
cdleme43cN 40450	Part of proof of Lemma E i...
cdleme43dN 40451	Part of proof of Lemma E i...
cdleme46f2g2 40452	Conversion for ` G ` to re...
cdleme46f2g1 40453	Conversion for ` G ` to re...
cdleme17d2 40454	Part of proof of Lemma E i...
cdleme17d3 40455	TODO: FIX COMMENT. (Contr...
cdleme17d4 40456	TODO: FIX COMMENT. (Contr...
cdleme17d 40457	Part of proof of Lemma E i...
cdleme48fv 40458	Part of proof of Lemma D i...
cdleme48fvg 40459	Remove ` P =/= Q ` conditi...
cdleme46fvaw 40460	Show that ` ( F `` R ) ` i...
cdleme48bw 40461	TODO: fix comment. TODO: ...
cdleme48b 40462	TODO: fix comment. (Contr...
cdleme46frvlpq 40463	Show that ` ( F `` S ) ` i...
cdleme46fsvlpq 40464	Show that ` ( F `` R ) ` i...
cdlemeg46fvcl 40465	TODO: fix comment. (Contr...
cdleme4gfv 40466	Part of proof of Lemma D i...
cdlemeg47b 40467	TODO: FIX COMMENT. (Contr...
cdlemeg47rv 40468	Value of g_s(r) when r is ...
cdlemeg47rv2 40469	Value of g_s(r) when r is ...
cdlemeg49le 40470	Part of proof of Lemma D i...
cdlemeg46bOLDN 40471	TODO FIX COMMENT. (Contrib...
cdlemeg46c 40472	TODO FIX COMMENT. (Contrib...
cdlemeg46rvOLDN 40473	Value of g_s(r) when r is ...
cdlemeg46rv2OLDN 40474	Value of g_s(r) when r is ...
cdlemeg46fvaw 40475	Show that ` ( F `` R ) ` i...
cdlemeg46nlpq 40476	Show that ` ( G `` S ) ` i...
cdlemeg46ngfr 40477	TODO FIX COMMENT g(f(s))=s...
cdlemeg46nfgr 40478	TODO FIX COMMENT f(g(s))=s...
cdlemeg46sfg 40479	TODO FIX COMMENT f(r) ` \/...
cdlemeg46fjgN 40480	NOT NEEDED? TODO FIX COMM...
cdlemeg46rjgN 40481	NOT NEEDED? TODO FIX COMM...
cdlemeg46fjv 40482	TODO FIX COMMENT f(r) ` \/...
cdlemeg46fsfv 40483	TODO FIX COMMENT f(r) ` \/...
cdlemeg46frv 40484	TODO FIX COMMENT. (f(r) ` ...
cdlemeg46v1v2 40485	TODO FIX COMMENT v_1 = v_2...
cdlemeg46vrg 40486	TODO FIX COMMENT v_1 ` <_ ...
cdlemeg46rgv 40487	TODO FIX COMMENT r ` <_ ` ...
cdlemeg46req 40488	TODO FIX COMMENT r = (v_1 ...
cdlemeg46gfv 40489	TODO FIX COMMENT p. 115 pe...
cdlemeg46gfr 40490	TODO FIX COMMENT p. 116 pe...
cdlemeg46gfre 40491	TODO FIX COMMENT p. 116 pe...
cdlemeg46gf 40492	TODO FIX COMMENT Eliminate...
cdlemeg46fgN 40493	TODO FIX COMMENT p. 116 pe...
cdleme48d 40494	TODO: fix comment. (Contr...
cdleme48gfv1 40495	TODO: fix comment. (Contr...
cdleme48gfv 40496	TODO: fix comment. (Contr...
cdleme48fgv 40497	TODO: fix comment. (Contr...
cdlemeg49lebilem 40498	Part of proof of Lemma D i...
cdleme50lebi 40499	Part of proof of Lemma D i...
cdleme50eq 40500	Part of proof of Lemma D i...
cdleme50f 40501	Part of proof of Lemma D i...
cdleme50f1 40502	Part of proof of Lemma D i...
cdleme50rnlem 40503	Part of proof of Lemma D i...
cdleme50rn 40504	Part of proof of Lemma D i...
cdleme50f1o 40505	Part of proof of Lemma D i...
cdleme50laut 40506	Part of proof of Lemma D i...
cdleme50ldil 40507	Part of proof of Lemma D i...
cdleme50trn1 40508	Part of proof that ` F ` i...
cdleme50trn2a 40509	Part of proof that ` F ` i...
cdleme50trn2 40510	Part of proof that ` F ` i...
cdleme50trn12 40511	Part of proof that ` F ` i...
cdleme50trn3 40512	Part of proof that ` F ` i...
cdleme50trn123 40513	Part of proof that ` F ` i...
cdleme51finvfvN 40514	Part of proof of Lemma E i...
cdleme51finvN 40515	Part of proof of Lemma E i...
cdleme50ltrn 40516	Part of proof of Lemma E i...
cdleme51finvtrN 40517	Part of proof of Lemma E i...
cdleme50ex 40518	Part of Lemma E in [Crawle...
cdleme 40519	Lemma E in [Crawley] p. 11...
cdlemf1 40520	Part of Lemma F in [Crawle...
cdlemf2 40521	Part of Lemma F in [Crawle...
cdlemf 40522	Lemma F in [Crawley] p. 11...
cdlemfnid 40523	~ cdlemf with additional c...
cdlemftr3 40524	Special case of ~ cdlemf s...
cdlemftr2 40525	Special case of ~ cdlemf s...
cdlemftr1 40526	Part of proof of Lemma G o...
cdlemftr0 40527	Special case of ~ cdlemf s...
trlord 40528	The ordering of two Hilber...
cdlemg1a 40529	Shorter expression for ` G...
cdlemg1b2 40530	This theorem can be used t...
cdlemg1idlemN 40531	Lemma for ~ cdlemg1idN . ...
cdlemg1fvawlemN 40532	Lemma for ~ ltrniotafvawN ...
cdlemg1ltrnlem 40533	Lemma for ~ ltrniotacl . ...
cdlemg1finvtrlemN 40534	Lemma for ~ ltrniotacnvN ....
cdlemg1bOLDN 40535	This theorem can be used t...
cdlemg1idN 40536	Version of ~ cdleme31id wi...
ltrniotafvawN 40537	Version of ~ cdleme46fvaw ...
ltrniotacl 40538	Version of ~ cdleme50ltrn ...
ltrniotacnvN 40539	Version of ~ cdleme51finvt...
ltrniotaval 40540	Value of the unique transl...
ltrniotacnvval 40541	Converse value of the uniq...
ltrniotaidvalN 40542	Value of the unique transl...
ltrniotavalbN 40543	Value of the unique transl...
cdlemeiota 40544	A translation is uniquely ...
cdlemg1ci2 40545	Any function of the form o...
cdlemg1cN 40546	Any translation belongs to...
cdlemg1cex 40547	Any translation is one of ...
cdlemg2cN 40548	Any translation belongs to...
cdlemg2dN 40549	This theorem can be used t...
cdlemg2cex 40550	Any translation is one of ...
cdlemg2ce 40551	Utility theorem to elimina...
cdlemg2jlemOLDN 40552	Part of proof of Lemma E i...
cdlemg2fvlem 40553	Lemma for ~ cdlemg2fv . (...
cdlemg2klem 40554	~ cdleme42keg with simpler...
cdlemg2idN 40555	Version of ~ cdleme31id wi...
cdlemg3a 40556	Part of proof of Lemma G i...
cdlemg2jOLDN 40557	TODO: Replace this with ~...
cdlemg2fv 40558	Value of a translation in ...
cdlemg2fv2 40559	Value of a translation in ...
cdlemg2k 40560	~ cdleme42keg with simpler...
cdlemg2kq 40561	~ cdlemg2k with ` P ` and ...
cdlemg2l 40562	TODO: FIX COMMENT. (Contr...
cdlemg2m 40563	TODO: FIX COMMENT. (Contr...
cdlemg5 40564	TODO: Is there a simpler ...
cdlemb3 40565	Given two atoms not under ...
cdlemg7fvbwN 40566	Properties of a translatio...
cdlemg4a 40567	TODO: FIX COMMENT If fg(p...
cdlemg4b1 40568	TODO: FIX COMMENT. (Contr...
cdlemg4b2 40569	TODO: FIX COMMENT. (Contr...
cdlemg4b12 40570	TODO: FIX COMMENT. (Contr...
cdlemg4c 40571	TODO: FIX COMMENT. (Contr...
cdlemg4d 40572	TODO: FIX COMMENT. (Contr...
cdlemg4e 40573	TODO: FIX COMMENT. (Contr...
cdlemg4f 40574	TODO: FIX COMMENT. (Contr...
cdlemg4g 40575	TODO: FIX COMMENT. (Contr...
cdlemg4 40576	TODO: FIX COMMENT. (Contr...
cdlemg6a 40577	TODO: FIX COMMENT. TODO: ...
cdlemg6b 40578	TODO: FIX COMMENT. TODO: ...
cdlemg6c 40579	TODO: FIX COMMENT. (Contr...
cdlemg6d 40580	TODO: FIX COMMENT. (Contr...
cdlemg6e 40581	TODO: FIX COMMENT. (Contr...
cdlemg6 40582	TODO: FIX COMMENT. (Contr...
cdlemg7fvN 40583	Value of a translation com...
cdlemg7aN 40584	TODO: FIX COMMENT. (Contr...
cdlemg7N 40585	TODO: FIX COMMENT. (Contr...
cdlemg8a 40586	TODO: FIX COMMENT. (Contr...
cdlemg8b 40587	TODO: FIX COMMENT. (Contr...
cdlemg8c 40588	TODO: FIX COMMENT. (Contr...
cdlemg8d 40589	TODO: FIX COMMENT. (Contr...
cdlemg8 40590	TODO: FIX COMMENT. (Contr...
cdlemg9a 40591	TODO: FIX COMMENT. (Contr...
cdlemg9b 40592	The triples ` <. P , ( F `...
cdlemg9 40593	The triples ` <. P , ( F `...
cdlemg10b 40594	TODO: FIX COMMENT. TODO: ...
cdlemg10bALTN 40595	TODO: FIX COMMENT. TODO: ...
cdlemg11a 40596	TODO: FIX COMMENT. (Contr...
cdlemg11aq 40597	TODO: FIX COMMENT. TODO: ...
cdlemg10c 40598	TODO: FIX COMMENT. TODO: ...
cdlemg10a 40599	TODO: FIX COMMENT. (Contr...
cdlemg10 40600	TODO: FIX COMMENT. (Contr...
cdlemg11b 40601	TODO: FIX COMMENT. (Contr...
cdlemg12a 40602	TODO: FIX COMMENT. (Contr...
cdlemg12b 40603	The triples ` <. P , ( F `...
cdlemg12c 40604	The triples ` <. P , ( F `...
cdlemg12d 40605	TODO: FIX COMMENT. (Contr...
cdlemg12e 40606	TODO: FIX COMMENT. (Contr...
cdlemg12f 40607	TODO: FIX COMMENT. (Contr...
cdlemg12g 40608	TODO: FIX COMMENT. TODO: ...
cdlemg12 40609	TODO: FIX COMMENT. (Contr...
cdlemg13a 40610	TODO: FIX COMMENT. (Contr...
cdlemg13 40611	TODO: FIX COMMENT. (Contr...
cdlemg14f 40612	TODO: FIX COMMENT. (Contr...
cdlemg14g 40613	TODO: FIX COMMENT. (Contr...
cdlemg15a 40614	Eliminate the ` ( F `` P )...
cdlemg15 40615	Eliminate the ` ( (...
cdlemg16 40616	Part of proof of Lemma G o...
cdlemg16ALTN 40617	This version of ~ cdlemg16...
cdlemg16z 40618	Eliminate ` ( ( F `...
cdlemg16zz 40619	Eliminate ` P =/= Q ` from...
cdlemg17a 40620	TODO: FIX COMMENT. (Contr...
cdlemg17b 40621	Part of proof of Lemma G i...
cdlemg17dN 40622	TODO: fix comment. (Contr...
cdlemg17dALTN 40623	Same as ~ cdlemg17dN with ...
cdlemg17e 40624	TODO: fix comment. (Contr...
cdlemg17f 40625	TODO: fix comment. (Contr...
cdlemg17g 40626	TODO: fix comment. (Contr...
cdlemg17h 40627	TODO: fix comment. (Contr...
cdlemg17i 40628	TODO: fix comment. (Contr...
cdlemg17ir 40629	TODO: fix comment. (Contr...
cdlemg17j 40630	TODO: fix comment. (Contr...
cdlemg17pq 40631	Utility theorem for swappi...
cdlemg17bq 40632	~ cdlemg17b with ` P ` and...
cdlemg17iqN 40633	~ cdlemg17i with ` P ` and...
cdlemg17irq 40634	~ cdlemg17ir with ` P ` an...
cdlemg17jq 40635	~ cdlemg17j with ` P ` and...
cdlemg17 40636	Part of Lemma G of [Crawle...
cdlemg18a 40637	Show two lines are differe...
cdlemg18b 40638	Lemma for ~ cdlemg18c . T...
cdlemg18c 40639	Show two lines intersect a...
cdlemg18d 40640	Show two lines intersect a...
cdlemg18 40641	Show two lines intersect a...
cdlemg19a 40642	Show two lines intersect a...
cdlemg19 40643	Show two lines intersect a...
cdlemg20 40644	Show two lines intersect a...
cdlemg21 40645	Version of cdlemg19 with `...
cdlemg22 40646	~ cdlemg21 with ` ( F `` P...
cdlemg24 40647	Combine ~ cdlemg16z and ~ ...
cdlemg37 40648	Use ~ cdlemg8 to eliminate...
cdlemg25zz 40649	~ cdlemg16zz restated for ...
cdlemg26zz 40650	~ cdlemg16zz restated for ...
cdlemg27a 40651	For use with case when ` (...
cdlemg28a 40652	Part of proof of Lemma G o...
cdlemg31b0N 40653	TODO: Fix comment. (Cont...
cdlemg31b0a 40654	TODO: Fix comment. (Cont...
cdlemg27b 40655	TODO: Fix comment. (Cont...
cdlemg31a 40656	TODO: fix comment. (Contr...
cdlemg31b 40657	TODO: fix comment. (Contr...
cdlemg31c 40658	Show that when ` N ` is an...
cdlemg31d 40659	Eliminate ` ( F `` P ) =/=...
cdlemg33b0 40660	TODO: Fix comment. (Cont...
cdlemg33c0 40661	TODO: Fix comment. (Cont...
cdlemg28b 40662	Part of proof of Lemma G o...
cdlemg28 40663	Part of proof of Lemma G o...
cdlemg29 40664	Eliminate ` ( F `` P ) =/=...
cdlemg33a 40665	TODO: Fix comment. (Cont...
cdlemg33b 40666	TODO: Fix comment. (Cont...
cdlemg33c 40667	TODO: Fix comment. (Cont...
cdlemg33d 40668	TODO: Fix comment. (Cont...
cdlemg33e 40669	TODO: Fix comment. (Cont...
cdlemg33 40670	Combine ~ cdlemg33b , ~ cd...
cdlemg34 40671	Use cdlemg33 to eliminate ...
cdlemg35 40672	TODO: Fix comment. TODO:...
cdlemg36 40673	Use cdlemg35 to eliminate ...
cdlemg38 40674	Use ~ cdlemg37 to eliminat...
cdlemg39 40675	Eliminate ` =/= ` conditio...
cdlemg40 40676	Eliminate ` P =/= Q ` cond...
cdlemg41 40677	Convert ~ cdlemg40 to func...
ltrnco 40678	The composition of two tra...
trlcocnv 40679	Swap the arguments of the ...
trlcoabs 40680	Absorption into a composit...
trlcoabs2N 40681	Absorption of the trace of...
trlcoat 40682	The trace of a composition...
trlcocnvat 40683	Commonly used special case...
trlconid 40684	The composition of two dif...
trlcolem 40685	Lemma for ~ trlco . (Cont...
trlco 40686	The trace of a composition...
trlcone 40687	If two translations have d...
cdlemg42 40688	Part of proof of Lemma G o...
cdlemg43 40689	Part of proof of Lemma G o...
cdlemg44a 40690	Part of proof of Lemma G o...
cdlemg44b 40691	Eliminate ` ( F `` P ) =/=...
cdlemg44 40692	Part of proof of Lemma G o...
cdlemg47a 40693	TODO: fix comment. TODO: ...
cdlemg46 40694	Part of proof of Lemma G o...
cdlemg47 40695	Part of proof of Lemma G o...
cdlemg48 40696	Eliminate ` h ` from ~ cdl...
ltrncom 40697	Composition is commutative...
ltrnco4 40698	Rearrange a composition of...
trljco 40699	Trace joined with trace of...
trljco2 40700	Trace joined with trace of...
tgrpfset 40703	The translation group maps...
tgrpset 40704	The translation group for ...
tgrpbase 40705	The base set of the transl...
tgrpopr 40706	The group operation of the...
tgrpov 40707	The group operation value ...
tgrpgrplem 40708	Lemma for ~ tgrpgrp . (Co...
tgrpgrp 40709	The translation group is a...
tgrpabl 40710	The translation group is a...
tendofset 40717	The set of all trace-prese...
tendoset 40718	The set of trace-preservin...
istendo 40719	The predicate "is a trace-...
tendotp 40720	Trace-preserving property ...
istendod 40721	Deduce the predicate "is a...
tendof 40722	Functionality of a trace-p...
tendoeq1 40723	Condition determining equa...
tendovalco 40724	Value of composition of tr...
tendocoval 40725	Value of composition of en...
tendocl 40726	Closure of a trace-preserv...
tendoco2 40727	Distribution of compositio...
tendoidcl 40728	The identity is a trace-pr...
tendo1mul 40729	Multiplicative identity mu...
tendo1mulr 40730	Multiplicative identity mu...
tendococl 40731	The composition of two tra...
tendoid 40732	The identity value of a tr...
tendoeq2 40733	Condition determining equa...
tendoplcbv 40734	Define sum operation for t...
tendopl 40735	Value of endomorphism sum ...
tendopl2 40736	Value of result of endomor...
tendoplcl2 40737	Value of result of endomor...
tendoplco2 40738	Value of result of endomor...
tendopltp 40739	Trace-preserving property ...
tendoplcl 40740	Endomorphism sum is a trac...
tendoplcom 40741	The endomorphism sum opera...
tendoplass 40742	The endomorphism sum opera...
tendodi1 40743	Endomorphism composition d...
tendodi2 40744	Endomorphism composition d...
tendo0cbv 40745	Define additive identity f...
tendo02 40746	Value of additive identity...
tendo0co2 40747	The additive identity trac...
tendo0tp 40748	Trace-preserving property ...
tendo0cl 40749	The additive identity is a...
tendo0pl 40750	Property of the additive i...
tendo0plr 40751	Property of the additive i...
tendoicbv 40752	Define inverse function fo...
tendoi 40753	Value of inverse endomorph...
tendoi2 40754	Value of additive inverse ...
tendoicl 40755	Closure of the additive in...
tendoipl 40756	Property of the additive i...
tendoipl2 40757	Property of the additive i...
erngfset 40758	The division rings on trac...
erngset 40759	The division ring on trace...
erngbase 40760	The base set of the divisi...
erngfplus 40761	Ring addition operation. ...
erngplus 40762	Ring addition operation. ...
erngplus2 40763	Ring addition operation. ...
erngfmul 40764	Ring multiplication operat...
erngmul 40765	Ring addition operation. ...
erngfset-rN 40766	The division rings on trac...
erngset-rN 40767	The division ring on trace...
erngbase-rN 40768	The base set of the divisi...
erngfplus-rN 40769	Ring addition operation. ...
erngplus-rN 40770	Ring addition operation. ...
erngplus2-rN 40771	Ring addition operation. ...
erngfmul-rN 40772	Ring multiplication operat...
erngmul-rN 40773	Ring addition operation. ...
cdlemh1 40774	Part of proof of Lemma H o...
cdlemh2 40775	Part of proof of Lemma H o...
cdlemh 40776	Lemma H of [Crawley] p. 11...
cdlemi1 40777	Part of proof of Lemma I o...
cdlemi2 40778	Part of proof of Lemma I o...
cdlemi 40779	Lemma I of [Crawley] p. 11...
cdlemj1 40780	Part of proof of Lemma J o...
cdlemj2 40781	Part of proof of Lemma J o...
cdlemj3 40782	Part of proof of Lemma J o...
tendocan 40783	Cancellation law: if the v...
tendoid0 40784	A trace-preserving endomor...
tendo0mul 40785	Additive identity multipli...
tendo0mulr 40786	Additive identity multipli...
tendo1ne0 40787	The identity (unity) is no...
tendoconid 40788	The composition (product) ...
tendotr 40789	The trace of the value of ...
cdlemk1 40790	Part of proof of Lemma K o...
cdlemk2 40791	Part of proof of Lemma K o...
cdlemk3 40792	Part of proof of Lemma K o...
cdlemk4 40793	Part of proof of Lemma K o...
cdlemk5a 40794	Part of proof of Lemma K o...
cdlemk5 40795	Part of proof of Lemma K o...
cdlemk6 40796	Part of proof of Lemma K o...
cdlemk8 40797	Part of proof of Lemma K o...
cdlemk9 40798	Part of proof of Lemma K o...
cdlemk9bN 40799	Part of proof of Lemma K o...
cdlemki 40800	Part of proof of Lemma K o...
cdlemkvcl 40801	Part of proof of Lemma K o...
cdlemk10 40802	Part of proof of Lemma K o...
cdlemksv 40803	Part of proof of Lemma K o...
cdlemksel 40804	Part of proof of Lemma K o...
cdlemksat 40805	Part of proof of Lemma K o...
cdlemksv2 40806	Part of proof of Lemma K o...
cdlemk7 40807	Part of proof of Lemma K o...
cdlemk11 40808	Part of proof of Lemma K o...
cdlemk12 40809	Part of proof of Lemma K o...
cdlemkoatnle 40810	Utility lemma. (Contribut...
cdlemk13 40811	Part of proof of Lemma K o...
cdlemkole 40812	Utility lemma. (Contribut...
cdlemk14 40813	Part of proof of Lemma K o...
cdlemk15 40814	Part of proof of Lemma K o...
cdlemk16a 40815	Part of proof of Lemma K o...
cdlemk16 40816	Part of proof of Lemma K o...
cdlemk17 40817	Part of proof of Lemma K o...
cdlemk1u 40818	Part of proof of Lemma K o...
cdlemk5auN 40819	Part of proof of Lemma K o...
cdlemk5u 40820	Part of proof of Lemma K o...
cdlemk6u 40821	Part of proof of Lemma K o...
cdlemkj 40822	Part of proof of Lemma K o...
cdlemkuvN 40823	Part of proof of Lemma K o...
cdlemkuel 40824	Part of proof of Lemma K o...
cdlemkuat 40825	Part of proof of Lemma K o...
cdlemkuv2 40826	Part of proof of Lemma K o...
cdlemk18 40827	Part of proof of Lemma K o...
cdlemk19 40828	Part of proof of Lemma K o...
cdlemk7u 40829	Part of proof of Lemma K o...
cdlemk11u 40830	Part of proof of Lemma K o...
cdlemk12u 40831	Part of proof of Lemma K o...
cdlemk21N 40832	Part of proof of Lemma K o...
cdlemk20 40833	Part of proof of Lemma K o...
cdlemkoatnle-2N 40834	Utility lemma. (Contribut...
cdlemk13-2N 40835	Part of proof of Lemma K o...
cdlemkole-2N 40836	Utility lemma. (Contribut...
cdlemk14-2N 40837	Part of proof of Lemma K o...
cdlemk15-2N 40838	Part of proof of Lemma K o...
cdlemk16-2N 40839	Part of proof of Lemma K o...
cdlemk17-2N 40840	Part of proof of Lemma K o...
cdlemkj-2N 40841	Part of proof of Lemma K o...
cdlemkuv-2N 40842	Part of proof of Lemma K o...
cdlemkuel-2N 40843	Part of proof of Lemma K o...
cdlemkuv2-2 40844	Part of proof of Lemma K o...
cdlemk18-2N 40845	Part of proof of Lemma K o...
cdlemk19-2N 40846	Part of proof of Lemma K o...
cdlemk7u-2N 40847	Part of proof of Lemma K o...
cdlemk11u-2N 40848	Part of proof of Lemma K o...
cdlemk12u-2N 40849	Part of proof of Lemma K o...
cdlemk21-2N 40850	Part of proof of Lemma K o...
cdlemk20-2N 40851	Part of proof of Lemma K o...
cdlemk22 40852	Part of proof of Lemma K o...
cdlemk30 40853	Part of proof of Lemma K o...
cdlemkuu 40854	Convert between function a...
cdlemk31 40855	Part of proof of Lemma K o...
cdlemk32 40856	Part of proof of Lemma K o...
cdlemkuel-3 40857	Part of proof of Lemma K o...
cdlemkuv2-3N 40858	Part of proof of Lemma K o...
cdlemk18-3N 40859	Part of proof of Lemma K o...
cdlemk22-3 40860	Part of proof of Lemma K o...
cdlemk23-3 40861	Part of proof of Lemma K o...
cdlemk24-3 40862	Part of proof of Lemma K o...
cdlemk25-3 40863	Part of proof of Lemma K o...
cdlemk26b-3 40864	Part of proof of Lemma K o...
cdlemk26-3 40865	Part of proof of Lemma K o...
cdlemk27-3 40866	Part of proof of Lemma K o...
cdlemk28-3 40867	Part of proof of Lemma K o...
cdlemk33N 40868	Part of proof of Lemma K o...
cdlemk34 40869	Part of proof of Lemma K o...
cdlemk29-3 40870	Part of proof of Lemma K o...
cdlemk35 40871	Part of proof of Lemma K o...
cdlemk36 40872	Part of proof of Lemma K o...
cdlemk37 40873	Part of proof of Lemma K o...
cdlemk38 40874	Part of proof of Lemma K o...
cdlemk39 40875	Part of proof of Lemma K o...
cdlemk40 40876	TODO: fix comment. (Contr...
cdlemk40t 40877	TODO: fix comment. (Contr...
cdlemk40f 40878	TODO: fix comment. (Contr...
cdlemk41 40879	Part of proof of Lemma K o...
cdlemkfid1N 40880	Lemma for ~ cdlemkfid3N . ...
cdlemkid1 40881	Lemma for ~ cdlemkid . (C...
cdlemkfid2N 40882	Lemma for ~ cdlemkfid3N . ...
cdlemkid2 40883	Lemma for ~ cdlemkid . (C...
cdlemkfid3N 40884	TODO: is this useful or sh...
cdlemky 40885	Part of proof of Lemma K o...
cdlemkyu 40886	Convert between function a...
cdlemkyuu 40887	~ cdlemkyu with some hypot...
cdlemk11ta 40888	Part of proof of Lemma K o...
cdlemk19ylem 40889	Lemma for ~ cdlemk19y . (...
cdlemk11tb 40890	Part of proof of Lemma K o...
cdlemk19y 40891	~ cdlemk19 with simpler hy...
cdlemkid3N 40892	Lemma for ~ cdlemkid . (C...
cdlemkid4 40893	Lemma for ~ cdlemkid . (C...
cdlemkid5 40894	Lemma for ~ cdlemkid . (C...
cdlemkid 40895	The value of the tau funct...
cdlemk35s 40896	Substitution version of ~ ...
cdlemk35s-id 40897	Substitution version of ~ ...
cdlemk39s 40898	Substitution version of ~ ...
cdlemk39s-id 40899	Substitution version of ~ ...
cdlemk42 40900	Part of proof of Lemma K o...
cdlemk19xlem 40901	Lemma for ~ cdlemk19x . (...
cdlemk19x 40902	~ cdlemk19 with simpler hy...
cdlemk42yN 40903	Part of proof of Lemma K o...
cdlemk11tc 40904	Part of proof of Lemma K o...
cdlemk11t 40905	Part of proof of Lemma K o...
cdlemk45 40906	Part of proof of Lemma K o...
cdlemk46 40907	Part of proof of Lemma K o...
cdlemk47 40908	Part of proof of Lemma K o...
cdlemk48 40909	Part of proof of Lemma K o...
cdlemk49 40910	Part of proof of Lemma K o...
cdlemk50 40911	Part of proof of Lemma K o...
cdlemk51 40912	Part of proof of Lemma K o...
cdlemk52 40913	Part of proof of Lemma K o...
cdlemk53a 40914	Lemma for ~ cdlemk53 . (C...
cdlemk53b 40915	Lemma for ~ cdlemk53 . (C...
cdlemk53 40916	Part of proof of Lemma K o...
cdlemk54 40917	Part of proof of Lemma K o...
cdlemk55a 40918	Lemma for ~ cdlemk55 . (C...
cdlemk55b 40919	Lemma for ~ cdlemk55 . (C...
cdlemk55 40920	Part of proof of Lemma K o...
cdlemkyyN 40921	Part of proof of Lemma K o...
cdlemk43N 40922	Part of proof of Lemma K o...
cdlemk35u 40923	Substitution version of ~ ...
cdlemk55u1 40924	Lemma for ~ cdlemk55u . (...
cdlemk55u 40925	Part of proof of Lemma K o...
cdlemk39u1 40926	Lemma for ~ cdlemk39u . (...
cdlemk39u 40927	Part of proof of Lemma K o...
cdlemk19u1 40928	~ cdlemk19 with simpler hy...
cdlemk19u 40929	Part of Lemma K of [Crawle...
cdlemk56 40930	Part of Lemma K of [Crawle...
cdlemk19w 40931	Use a fixed element to eli...
cdlemk56w 40932	Use a fixed element to eli...
cdlemk 40933	Lemma K of [Crawley] p. 11...
tendoex 40934	Generalization of Lemma K ...
cdleml1N 40935	Part of proof of Lemma L o...
cdleml2N 40936	Part of proof of Lemma L o...
cdleml3N 40937	Part of proof of Lemma L o...
cdleml4N 40938	Part of proof of Lemma L o...
cdleml5N 40939	Part of proof of Lemma L o...
cdleml6 40940	Part of proof of Lemma L o...
cdleml7 40941	Part of proof of Lemma L o...
cdleml8 40942	Part of proof of Lemma L o...
cdleml9 40943	Part of proof of Lemma L o...
dva1dim 40944	Two expressions for the 1-...
dvhb1dimN 40945	Two expressions for the 1-...
erng1lem 40946	Value of the endomorphism ...
erngdvlem1 40947	Lemma for ~ eringring . (...
erngdvlem2N 40948	Lemma for ~ eringring . (...
erngdvlem3 40949	Lemma for ~ eringring . (...
erngdvlem4 40950	Lemma for ~ erngdv . (Con...
eringring 40951	An endomorphism ring is a ...
erngdv 40952	An endomorphism ring is a ...
erng0g 40953	The division ring zero of ...
erng1r 40954	The division ring unity of...
erngdvlem1-rN 40955	Lemma for ~ eringring . (...
erngdvlem2-rN 40956	Lemma for ~ eringring . (...
erngdvlem3-rN 40957	Lemma for ~ eringring . (...
erngdvlem4-rN 40958	Lemma for ~ erngdv . (Con...
erngring-rN 40959	An endomorphism ring is a ...
erngdv-rN 40960	An endomorphism ring is a ...
dvafset 40963	The constructed partial ve...
dvaset 40964	The constructed partial ve...
dvasca 40965	The ring base set of the c...
dvabase 40966	The ring base set of the c...
dvafplusg 40967	Ring addition operation fo...
dvaplusg 40968	Ring addition operation fo...
dvaplusgv 40969	Ring addition operation fo...
dvafmulr 40970	Ring multiplication operat...
dvamulr 40971	Ring multiplication operat...
dvavbase 40972	The vectors (vector base s...
dvafvadd 40973	The vector sum operation f...
dvavadd 40974	Ring addition operation fo...
dvafvsca 40975	Ring addition operation fo...
dvavsca 40976	Ring addition operation fo...
tendospcl 40977	Closure of endomorphism sc...
tendospass 40978	Associative law for endomo...
tendospdi1 40979	Forward distributive law f...
tendocnv 40980	Converse of a trace-preser...
tendospdi2 40981	Reverse distributive law f...
tendospcanN 40982	Cancellation law for trace...
dvaabl 40983	The constructed partial ve...
dvalveclem 40984	Lemma for ~ dvalvec . (Co...
dvalvec 40985	The constructed partial ve...
dva0g 40986	The zero vector of partial...
diaffval 40989	The partial isomorphism A ...
diafval 40990	The partial isomorphism A ...
diaval 40991	The partial isomorphism A ...
diaelval 40992	Member of the partial isom...
diafn 40993	Functionality and domain o...
diadm 40994	Domain of the partial isom...
diaeldm 40995	Member of domain of the pa...
diadmclN 40996	A member of domain of the ...
diadmleN 40997	A member of domain of the ...
dian0 40998	The value of the partial i...
dia0eldmN 40999	The lattice zero belongs t...
dia1eldmN 41000	The fiducial hyperplane (t...
diass 41001	The value of the partial i...
diael 41002	A member of the value of t...
diatrl 41003	Trace of a member of the p...
diaelrnN 41004	Any value of the partial i...
dialss 41005	The value of partial isomo...
diaord 41006	The partial isomorphism A ...
dia11N 41007	The partial isomorphism A ...
diaf11N 41008	The partial isomorphism A ...
diaclN 41009	Closure of partial isomorp...
diacnvclN 41010	Closure of partial isomorp...
dia0 41011	The value of the partial i...
dia1N 41012	The value of the partial i...
dia1elN 41013	The largest subspace in th...
diaglbN 41014	Partial isomorphism A of a...
diameetN 41015	Partial isomorphism A of a...
diainN 41016	Inverse partial isomorphis...
diaintclN 41017	The intersection of partia...
diasslssN 41018	The partial isomorphism A ...
diassdvaN 41019	The partial isomorphism A ...
dia1dim 41020	Two expressions for the 1-...
dia1dim2 41021	Two expressions for a 1-di...
dia1dimid 41022	A vector (translation) bel...
dia2dimlem1 41023	Lemma for ~ dia2dim . Sho...
dia2dimlem2 41024	Lemma for ~ dia2dim . Def...
dia2dimlem3 41025	Lemma for ~ dia2dim . Def...
dia2dimlem4 41026	Lemma for ~ dia2dim . Sho...
dia2dimlem5 41027	Lemma for ~ dia2dim . The...
dia2dimlem6 41028	Lemma for ~ dia2dim . Eli...
dia2dimlem7 41029	Lemma for ~ dia2dim . Eli...
dia2dimlem8 41030	Lemma for ~ dia2dim . Eli...
dia2dimlem9 41031	Lemma for ~ dia2dim . Eli...
dia2dimlem10 41032	Lemma for ~ dia2dim . Con...
dia2dimlem11 41033	Lemma for ~ dia2dim . Con...
dia2dimlem12 41034	Lemma for ~ dia2dim . Obt...
dia2dimlem13 41035	Lemma for ~ dia2dim . Eli...
dia2dim 41036	A two-dimensional subspace...
dvhfset 41039	The constructed full vecto...
dvhset 41040	The constructed full vecto...
dvhsca 41041	The ring of scalars of the...
dvhbase 41042	The ring base set of the c...
dvhfplusr 41043	Ring addition operation fo...
dvhfmulr 41044	Ring multiplication operat...
dvhmulr 41045	Ring multiplication operat...
dvhvbase 41046	The vectors (vector base s...
dvhelvbasei 41047	Vector membership in the c...
dvhvaddcbv 41048	Change bound variables to ...
dvhvaddval 41049	The vector sum operation f...
dvhfvadd 41050	The vector sum operation f...
dvhvadd 41051	The vector sum operation f...
dvhopvadd 41052	The vector sum operation f...
dvhopvadd2 41053	The vector sum operation f...
dvhvaddcl 41054	Closure of the vector sum ...
dvhvaddcomN 41055	Commutativity of vector su...
dvhvaddass 41056	Associativity of vector su...
dvhvscacbv 41057	Change bound variables to ...
dvhvscaval 41058	The scalar product operati...
dvhfvsca 41059	Scalar product operation f...
dvhvsca 41060	Scalar product operation f...
dvhopvsca 41061	Scalar product operation f...
dvhvscacl 41062	Closure of the scalar prod...
tendoinvcl 41063	Closure of multiplicative ...
tendolinv 41064	Left multiplicative invers...
tendorinv 41065	Right multiplicative inver...
dvhgrp 41066	The full vector space ` U ...
dvhlveclem 41067	Lemma for ~ dvhlvec . TOD...
dvhlvec 41068	The full vector space ` U ...
dvhlmod 41069	The full vector space ` U ...
dvh0g 41070	The zero vector of vector ...
dvheveccl 41071	Properties of a unit vecto...
dvhopclN 41072	Closure of a ` DVecH ` vec...
dvhopaddN 41073	Sum of ` DVecH ` vectors e...
dvhopspN 41074	Scalar product of ` DVecH ...
dvhopN 41075	Decompose a ` DVecH ` vect...
dvhopellsm 41076	Ordered pair membership in...
cdlemm10N 41077	The image of the map ` G `...
docaffvalN 41080	Subspace orthocomplement f...
docafvalN 41081	Subspace orthocomplement f...
docavalN 41082	Subspace orthocomplement f...
docaclN 41083	Closure of subspace orthoc...
diaocN 41084	Value of partial isomorphi...
doca2N 41085	Double orthocomplement of ...
doca3N 41086	Double orthocomplement of ...
dvadiaN 41087	Any closed subspace is a m...
diarnN 41088	Partial isomorphism A maps...
diaf1oN 41089	The partial isomorphism A ...
djaffvalN 41092	Subspace join for ` DVecA ...
djafvalN 41093	Subspace join for ` DVecA ...
djavalN 41094	Subspace join for ` DVecA ...
djaclN 41095	Closure of subspace join f...
djajN 41096	Transfer lattice join to `...
dibffval 41099	The partial isomorphism B ...
dibfval 41100	The partial isomorphism B ...
dibval 41101	The partial isomorphism B ...
dibopelvalN 41102	Member of the partial isom...
dibval2 41103	Value of the partial isomo...
dibopelval2 41104	Member of the partial isom...
dibval3N 41105	Value of the partial isomo...
dibelval3 41106	Member of the partial isom...
dibopelval3 41107	Member of the partial isom...
dibelval1st 41108	Membership in value of the...
dibelval1st1 41109	Membership in value of the...
dibelval1st2N 41110	Membership in value of the...
dibelval2nd 41111	Membership in value of the...
dibn0 41112	The value of the partial i...
dibfna 41113	Functionality and domain o...
dibdiadm 41114	Domain of the partial isom...
dibfnN 41115	Functionality and domain o...
dibdmN 41116	Domain of the partial isom...
dibeldmN 41117	Member of domain of the pa...
dibord 41118	The isomorphism B for a la...
dib11N 41119	The isomorphism B for a la...
dibf11N 41120	The partial isomorphism A ...
dibclN 41121	Closure of partial isomorp...
dibvalrel 41122	The value of partial isomo...
dib0 41123	The value of partial isomo...
dib1dim 41124	Two expressions for the 1-...
dibglbN 41125	Partial isomorphism B of a...
dibintclN 41126	The intersection of partia...
dib1dim2 41127	Two expressions for a 1-di...
dibss 41128	The partial isomorphism B ...
diblss 41129	The value of partial isomo...
diblsmopel 41130	Membership in subspace sum...
dicffval 41133	The partial isomorphism C ...
dicfval 41134	The partial isomorphism C ...
dicval 41135	The partial isomorphism C ...
dicopelval 41136	Membership in value of the...
dicelvalN 41137	Membership in value of the...
dicval2 41138	The partial isomorphism C ...
dicelval3 41139	Member of the partial isom...
dicopelval2 41140	Membership in value of the...
dicelval2N 41141	Membership in value of the...
dicfnN 41142	Functionality and domain o...
dicdmN 41143	Domain of the partial isom...
dicvalrelN 41144	The value of partial isomo...
dicssdvh 41145	The partial isomorphism C ...
dicelval1sta 41146	Membership in value of the...
dicelval1stN 41147	Membership in value of the...
dicelval2nd 41148	Membership in value of the...
dicvaddcl 41149	Membership in value of the...
dicvscacl 41150	Membership in value of the...
dicn0 41151	The value of the partial i...
diclss 41152	The value of partial isomo...
diclspsn 41153	The value of isomorphism C...
cdlemn2 41154	Part of proof of Lemma N o...
cdlemn2a 41155	Part of proof of Lemma N o...
cdlemn3 41156	Part of proof of Lemma N o...
cdlemn4 41157	Part of proof of Lemma N o...
cdlemn4a 41158	Part of proof of Lemma N o...
cdlemn5pre 41159	Part of proof of Lemma N o...
cdlemn5 41160	Part of proof of Lemma N o...
cdlemn6 41161	Part of proof of Lemma N o...
cdlemn7 41162	Part of proof of Lemma N o...
cdlemn8 41163	Part of proof of Lemma N o...
cdlemn9 41164	Part of proof of Lemma N o...
cdlemn10 41165	Part of proof of Lemma N o...
cdlemn11a 41166	Part of proof of Lemma N o...
cdlemn11b 41167	Part of proof of Lemma N o...
cdlemn11c 41168	Part of proof of Lemma N o...
cdlemn11pre 41169	Part of proof of Lemma N o...
cdlemn11 41170	Part of proof of Lemma N o...
cdlemn 41171	Lemma N of [Crawley] p. 12...
dihordlem6 41172	Part of proof of Lemma N o...
dihordlem7 41173	Part of proof of Lemma N o...
dihordlem7b 41174	Part of proof of Lemma N o...
dihjustlem 41175	Part of proof after Lemma ...
dihjust 41176	Part of proof after Lemma ...
dihord1 41177	Part of proof after Lemma ...
dihord2a 41178	Part of proof after Lemma ...
dihord2b 41179	Part of proof after Lemma ...
dihord2cN 41180	Part of proof after Lemma ...
dihord11b 41181	Part of proof after Lemma ...
dihord10 41182	Part of proof after Lemma ...
dihord11c 41183	Part of proof after Lemma ...
dihord2pre 41184	Part of proof after Lemma ...
dihord2pre2 41185	Part of proof after Lemma ...
dihord2 41186	Part of proof after Lemma ...
dihffval 41189	The isomorphism H for a la...
dihfval 41190	Isomorphism H for a lattic...
dihval 41191	Value of isomorphism H for...
dihvalc 41192	Value of isomorphism H for...
dihlsscpre 41193	Closure of isomorphism H f...
dihvalcqpre 41194	Value of isomorphism H for...
dihvalcq 41195	Value of isomorphism H for...
dihvalb 41196	Value of isomorphism H for...
dihopelvalbN 41197	Ordered pair member of the...
dihvalcqat 41198	Value of isomorphism H for...
dih1dimb 41199	Two expressions for a 1-di...
dih1dimb2 41200	Isomorphism H at an atom u...
dih1dimc 41201	Isomorphism H at an atom n...
dib2dim 41202	Extend ~ dia2dim to partia...
dih2dimb 41203	Extend ~ dib2dim to isomor...
dih2dimbALTN 41204	Extend ~ dia2dim to isomor...
dihopelvalcqat 41205	Ordered pair member of the...
dihvalcq2 41206	Value of isomorphism H for...
dihopelvalcpre 41207	Member of value of isomorp...
dihopelvalc 41208	Member of value of isomorp...
dihlss 41209	The value of isomorphism H...
dihss 41210	The value of isomorphism H...
dihssxp 41211	An isomorphism H value is ...
dihopcl 41212	Closure of an ordered pair...
xihopellsmN 41213	Ordered pair membership in...
dihopellsm 41214	Ordered pair membership in...
dihord6apre 41215	Part of proof that isomorp...
dihord3 41216	The isomorphism H for a la...
dihord4 41217	The isomorphism H for a la...
dihord5b 41218	Part of proof that isomorp...
dihord6b 41219	Part of proof that isomorp...
dihord6a 41220	Part of proof that isomorp...
dihord5apre 41221	Part of proof that isomorp...
dihord5a 41222	Part of proof that isomorp...
dihord 41223	The isomorphism H is order...
dih11 41224	The isomorphism H is one-t...
dihf11lem 41225	Functionality of the isomo...
dihf11 41226	The isomorphism H for a la...
dihfn 41227	Functionality and domain o...
dihdm 41228	Domain of isomorphism H. (...
dihcl 41229	Closure of isomorphism H. ...
dihcnvcl 41230	Closure of isomorphism H c...
dihcnvid1 41231	The converse isomorphism o...
dihcnvid2 41232	The isomorphism of a conve...
dihcnvord 41233	Ordering property for conv...
dihcnv11 41234	The converse of isomorphis...
dihsslss 41235	The isomorphism H maps to ...
dihrnlss 41236	The isomorphism H maps to ...
dihrnss 41237	The isomorphism H maps to ...
dihvalrel 41238	The value of isomorphism H...
dih0 41239	The value of isomorphism H...
dih0bN 41240	A lattice element is zero ...
dih0vbN 41241	A vector is zero iff its s...
dih0cnv 41242	The isomorphism H converse...
dih0rn 41243	The zero subspace belongs ...
dih0sb 41244	A subspace is zero iff the...
dih1 41245	The value of isomorphism H...
dih1rn 41246	The full vector space belo...
dih1cnv 41247	The isomorphism H converse...
dihwN 41248	Value of isomorphism H at ...
dihmeetlem1N 41249	Isomorphism H of a conjunc...
dihglblem5apreN 41250	A conjunction property of ...
dihglblem5aN 41251	A conjunction property of ...
dihglblem2aN 41252	Lemma for isomorphism H of...
dihglblem2N 41253	The GLB of a set of lattic...
dihglblem3N 41254	Isomorphism H of a lattice...
dihglblem3aN 41255	Isomorphism H of a lattice...
dihglblem4 41256	Isomorphism H of a lattice...
dihglblem5 41257	Isomorphism H of a lattice...
dihmeetlem2N 41258	Isomorphism H of a conjunc...
dihglbcpreN 41259	Isomorphism H of a lattice...
dihglbcN 41260	Isomorphism H of a lattice...
dihmeetcN 41261	Isomorphism H of a lattice...
dihmeetbN 41262	Isomorphism H of a lattice...
dihmeetbclemN 41263	Lemma for isomorphism H of...
dihmeetlem3N 41264	Lemma for isomorphism H of...
dihmeetlem4preN 41265	Lemma for isomorphism H of...
dihmeetlem4N 41266	Lemma for isomorphism H of...
dihmeetlem5 41267	Part of proof that isomorp...
dihmeetlem6 41268	Lemma for isomorphism H of...
dihmeetlem7N 41269	Lemma for isomorphism H of...
dihjatc1 41270	Lemma for isomorphism H of...
dihjatc2N 41271	Isomorphism H of join with...
dihjatc3 41272	Isomorphism H of join with...
dihmeetlem8N 41273	Lemma for isomorphism H of...
dihmeetlem9N 41274	Lemma for isomorphism H of...
dihmeetlem10N 41275	Lemma for isomorphism H of...
dihmeetlem11N 41276	Lemma for isomorphism H of...
dihmeetlem12N 41277	Lemma for isomorphism H of...
dihmeetlem13N 41278	Lemma for isomorphism H of...
dihmeetlem14N 41279	Lemma for isomorphism H of...
dihmeetlem15N 41280	Lemma for isomorphism H of...
dihmeetlem16N 41281	Lemma for isomorphism H of...
dihmeetlem17N 41282	Lemma for isomorphism H of...
dihmeetlem18N 41283	Lemma for isomorphism H of...
dihmeetlem19N 41284	Lemma for isomorphism H of...
dihmeetlem20N 41285	Lemma for isomorphism H of...
dihmeetALTN 41286	Isomorphism H of a lattice...
dih1dimatlem0 41287	Lemma for ~ dih1dimat . (...
dih1dimatlem 41288	Lemma for ~ dih1dimat . (...
dih1dimat 41289	Any 1-dimensional subspace...
dihlsprn 41290	The span of a vector belon...
dihlspsnssN 41291	A subspace included in a 1...
dihlspsnat 41292	The inverse isomorphism H ...
dihatlat 41293	The isomorphism H of an at...
dihat 41294	There exists at least one ...
dihpN 41295	The value of isomorphism H...
dihlatat 41296	The reverse isomorphism H ...
dihatexv 41297	There is a nonzero vector ...
dihatexv2 41298	There is a nonzero vector ...
dihglblem6 41299	Isomorphism H of a lattice...
dihglb 41300	Isomorphism H of a lattice...
dihglb2 41301	Isomorphism H of a lattice...
dihmeet 41302	Isomorphism H of a lattice...
dihintcl 41303	The intersection of closed...
dihmeetcl 41304	Closure of closed subspace...
dihmeet2 41305	Reverse isomorphism H of a...
dochffval 41308	Subspace orthocomplement f...
dochfval 41309	Subspace orthocomplement f...
dochval 41310	Subspace orthocomplement f...
dochval2 41311	Subspace orthocomplement f...
dochcl 41312	Closure of subspace orthoc...
dochlss 41313	A subspace orthocomplement...
dochssv 41314	A subspace orthocomplement...
dochfN 41315	Domain and codomain of the...
dochvalr 41316	Orthocomplement of a close...
doch0 41317	Orthocomplement of the zer...
doch1 41318	Orthocomplement of the uni...
dochoc0 41319	The zero subspace is close...
dochoc1 41320	The unit subspace (all vec...
dochvalr2 41321	Orthocomplement of a close...
dochvalr3 41322	Orthocomplement of a close...
doch2val2 41323	Double orthocomplement for...
dochss 41324	Subset law for orthocomple...
dochocss 41325	Double negative law for or...
dochoc 41326	Double negative law for or...
dochsscl 41327	If a set of vectors is inc...
dochoccl 41328	A set of vectors is closed...
dochord 41329	Ordering law for orthocomp...
dochord2N 41330	Ordering law for orthocomp...
dochord3 41331	Ordering law for orthocomp...
doch11 41332	Orthocomplement is one-to-...
dochsordN 41333	Strict ordering law for or...
dochn0nv 41334	An orthocomplement is nonz...
dihoml4c 41335	Version of ~ dihoml4 with ...
dihoml4 41336	Orthomodular law for const...
dochspss 41337	The span of a set of vecto...
dochocsp 41338	The span of an orthocomple...
dochspocN 41339	The span of an orthocomple...
dochocsn 41340	The double orthocomplement...
dochsncom 41341	Swap vectors in an orthoco...
dochsat 41342	The double orthocomplement...
dochshpncl 41343	If a hyperplane is not clo...
dochlkr 41344	Equivalent conditions for ...
dochkrshp 41345	The closure of a kernel is...
dochkrshp2 41346	Properties of the closure ...
dochkrshp3 41347	Properties of the closure ...
dochkrshp4 41348	Properties of the closure ...
dochdmj1 41349	De Morgan-like law for sub...
dochnoncon 41350	Law of noncontradiction. ...
dochnel2 41351	A nonzero member of a subs...
dochnel 41352	A nonzero vector doesn't b...
djhffval 41355	Subspace join for ` DVecH ...
djhfval 41356	Subspace join for ` DVecH ...
djhval 41357	Subspace join for ` DVecH ...
djhval2 41358	Value of subspace join for...
djhcl 41359	Closure of subspace join f...
djhlj 41360	Transfer lattice join to `...
djhljjN 41361	Lattice join in terms of `...
djhjlj 41362	` DVecH ` vector space clo...
djhj 41363	` DVecH ` vector space clo...
djhcom 41364	Subspace join commutes. (...
djhspss 41365	Subspace span of union is ...
djhsumss 41366	Subspace sum is a subset o...
dihsumssj 41367	The subspace sum of two is...
djhunssN 41368	Subspace union is a subset...
dochdmm1 41369	De Morgan-like law for clo...
djhexmid 41370	Excluded middle property o...
djh01 41371	Closed subspace join with ...
djh02 41372	Closed subspace join with ...
djhlsmcl 41373	A closed subspace sum equa...
djhcvat42 41374	A covering property. ( ~ ...
dihjatb 41375	Isomorphism H of lattice j...
dihjatc 41376	Isomorphism H of lattice j...
dihjatcclem1 41377	Lemma for isomorphism H of...
dihjatcclem2 41378	Lemma for isomorphism H of...
dihjatcclem3 41379	Lemma for ~ dihjatcc . (C...
dihjatcclem4 41380	Lemma for isomorphism H of...
dihjatcc 41381	Isomorphism H of lattice j...
dihjat 41382	Isomorphism H of lattice j...
dihprrnlem1N 41383	Lemma for ~ dihprrn , show...
dihprrnlem2 41384	Lemma for ~ dihprrn . (Co...
dihprrn 41385	The span of a vector pair ...
djhlsmat 41386	The sum of two subspace at...
dihjat1lem 41387	Subspace sum of a closed s...
dihjat1 41388	Subspace sum of a closed s...
dihsmsprn 41389	Subspace sum of a closed s...
dihjat2 41390	The subspace sum of a clos...
dihjat3 41391	Isomorphism H of lattice j...
dihjat4 41392	Transfer the subspace sum ...
dihjat6 41393	Transfer the subspace sum ...
dihsmsnrn 41394	The subspace sum of two si...
dihsmatrn 41395	The subspace sum of a clos...
dihjat5N 41396	Transfer lattice join with...
dvh4dimat 41397	There is an atom that is o...
dvh3dimatN 41398	There is an atom that is o...
dvh2dimatN 41399	Given an atom, there exist...
dvh1dimat 41400	There exists an atom. (Co...
dvh1dim 41401	There exists a nonzero vec...
dvh4dimlem 41402	Lemma for ~ dvh4dimN . (C...
dvhdimlem 41403	Lemma for ~ dvh2dim and ~ ...
dvh2dim 41404	There is a vector that is ...
dvh3dim 41405	There is a vector that is ...
dvh4dimN 41406	There is a vector that is ...
dvh3dim2 41407	There is a vector that is ...
dvh3dim3N 41408	There is a vector that is ...
dochsnnz 41409	The orthocomplement of a s...
dochsatshp 41410	The orthocomplement of a s...
dochsatshpb 41411	The orthocomplement of a s...
dochsnshp 41412	The orthocomplement of a n...
dochshpsat 41413	A hyperplane is closed iff...
dochkrsat 41414	The orthocomplement of a k...
dochkrsat2 41415	The orthocomplement of a k...
dochsat0 41416	The orthocomplement of a k...
dochkrsm 41417	The subspace sum of a clos...
dochexmidat 41418	Special case of excluded m...
dochexmidlem1 41419	Lemma for ~ dochexmid . H...
dochexmidlem2 41420	Lemma for ~ dochexmid . (...
dochexmidlem3 41421	Lemma for ~ dochexmid . U...
dochexmidlem4 41422	Lemma for ~ dochexmid . (...
dochexmidlem5 41423	Lemma for ~ dochexmid . (...
dochexmidlem6 41424	Lemma for ~ dochexmid . (...
dochexmidlem7 41425	Lemma for ~ dochexmid . C...
dochexmidlem8 41426	Lemma for ~ dochexmid . T...
dochexmid 41427	Excluded middle law for cl...
dochsnkrlem1 41428	Lemma for ~ dochsnkr . (C...
dochsnkrlem2 41429	Lemma for ~ dochsnkr . (C...
dochsnkrlem3 41430	Lemma for ~ dochsnkr . (C...
dochsnkr 41431	A (closed) kernel expresse...
dochsnkr2 41432	Kernel of the explicit fun...
dochsnkr2cl 41433	The ` X ` determining func...
dochflcl 41434	Closure of the explicit fu...
dochfl1 41435	The value of the explicit ...
dochfln0 41436	The value of a functional ...
dochkr1 41437	A nonzero functional has a...
dochkr1OLDN 41438	A nonzero functional has a...
lpolsetN 41441	The set of polarities of a...
islpolN 41442	The predicate "is a polari...
islpoldN 41443	Properties that determine ...
lpolfN 41444	Functionality of a polarit...
lpolvN 41445	The polarity of the whole ...
lpolconN 41446	Contraposition property of...
lpolsatN 41447	The polarity of an atomic ...
lpolpolsatN 41448	Property of a polarity. (...
dochpolN 41449	The subspace orthocompleme...
lcfl1lem 41450	Property of a functional w...
lcfl1 41451	Property of a functional w...
lcfl2 41452	Property of a functional w...
lcfl3 41453	Property of a functional w...
lcfl4N 41454	Property of a functional w...
lcfl5 41455	Property of a functional w...
lcfl5a 41456	Property of a functional w...
lcfl6lem 41457	Lemma for ~ lcfl6 . A fun...
lcfl7lem 41458	Lemma for ~ lcfl7N . If t...
lcfl6 41459	Property of a functional w...
lcfl7N 41460	Property of a functional w...
lcfl8 41461	Property of a functional w...
lcfl8a 41462	Property of a functional w...
lcfl8b 41463	Property of a nonzero func...
lcfl9a 41464	Property implying that a f...
lclkrlem1 41465	The set of functionals hav...
lclkrlem2a 41466	Lemma for ~ lclkr . Use ~...
lclkrlem2b 41467	Lemma for ~ lclkr . (Cont...
lclkrlem2c 41468	Lemma for ~ lclkr . (Cont...
lclkrlem2d 41469	Lemma for ~ lclkr . (Cont...
lclkrlem2e 41470	Lemma for ~ lclkr . The k...
lclkrlem2f 41471	Lemma for ~ lclkr . Const...
lclkrlem2g 41472	Lemma for ~ lclkr . Compa...
lclkrlem2h 41473	Lemma for ~ lclkr . Elimi...
lclkrlem2i 41474	Lemma for ~ lclkr . Elimi...
lclkrlem2j 41475	Lemma for ~ lclkr . Kerne...
lclkrlem2k 41476	Lemma for ~ lclkr . Kerne...
lclkrlem2l 41477	Lemma for ~ lclkr . Elimi...
lclkrlem2m 41478	Lemma for ~ lclkr . Const...
lclkrlem2n 41479	Lemma for ~ lclkr . (Cont...
lclkrlem2o 41480	Lemma for ~ lclkr . When ...
lclkrlem2p 41481	Lemma for ~ lclkr . When ...
lclkrlem2q 41482	Lemma for ~ lclkr . The s...
lclkrlem2r 41483	Lemma for ~ lclkr . When ...
lclkrlem2s 41484	Lemma for ~ lclkr . Thus,...
lclkrlem2t 41485	Lemma for ~ lclkr . We el...
lclkrlem2u 41486	Lemma for ~ lclkr . ~ lclk...
lclkrlem2v 41487	Lemma for ~ lclkr . When ...
lclkrlem2w 41488	Lemma for ~ lclkr . This ...
lclkrlem2x 41489	Lemma for ~ lclkr . Elimi...
lclkrlem2y 41490	Lemma for ~ lclkr . Resta...
lclkrlem2 41491	The set of functionals hav...
lclkr 41492	The set of functionals wit...
lcfls1lem 41493	Property of a functional w...
lcfls1N 41494	Property of a functional w...
lcfls1c 41495	Property of a functional w...
lclkrslem1 41496	The set of functionals hav...
lclkrslem2 41497	The set of functionals hav...
lclkrs 41498	The set of functionals hav...
lclkrs2 41499	The set of functionals wit...
lcfrvalsnN 41500	Reconstruction from the du...
lcfrlem1 41501	Lemma for ~ lcfr . Note t...
lcfrlem2 41502	Lemma for ~ lcfr . (Contr...
lcfrlem3 41503	Lemma for ~ lcfr . (Contr...
lcfrlem4 41504	Lemma for ~ lcfr . (Contr...
lcfrlem5 41505	Lemma for ~ lcfr . The se...
lcfrlem6 41506	Lemma for ~ lcfr . Closur...
lcfrlem7 41507	Lemma for ~ lcfr . Closur...
lcfrlem8 41508	Lemma for ~ lcf1o and ~ lc...
lcfrlem9 41509	Lemma for ~ lcf1o . (This...
lcf1o 41510	Define a function ` J ` th...
lcfrlem10 41511	Lemma for ~ lcfr . (Contr...
lcfrlem11 41512	Lemma for ~ lcfr . (Contr...
lcfrlem12N 41513	Lemma for ~ lcfr . (Contr...
lcfrlem13 41514	Lemma for ~ lcfr . (Contr...
lcfrlem14 41515	Lemma for ~ lcfr . (Contr...
lcfrlem15 41516	Lemma for ~ lcfr . (Contr...
lcfrlem16 41517	Lemma for ~ lcfr . (Contr...
lcfrlem17 41518	Lemma for ~ lcfr . Condit...
lcfrlem18 41519	Lemma for ~ lcfr . (Contr...
lcfrlem19 41520	Lemma for ~ lcfr . (Contr...
lcfrlem20 41521	Lemma for ~ lcfr . (Contr...
lcfrlem21 41522	Lemma for ~ lcfr . (Contr...
lcfrlem22 41523	Lemma for ~ lcfr . (Contr...
lcfrlem23 41524	Lemma for ~ lcfr . TODO: ...
lcfrlem24 41525	Lemma for ~ lcfr . (Contr...
lcfrlem25 41526	Lemma for ~ lcfr . Specia...
lcfrlem26 41527	Lemma for ~ lcfr . Specia...
lcfrlem27 41528	Lemma for ~ lcfr . Specia...
lcfrlem28 41529	Lemma for ~ lcfr . TODO: ...
lcfrlem29 41530	Lemma for ~ lcfr . (Contr...
lcfrlem30 41531	Lemma for ~ lcfr . (Contr...
lcfrlem31 41532	Lemma for ~ lcfr . (Contr...
lcfrlem32 41533	Lemma for ~ lcfr . (Contr...
lcfrlem33 41534	Lemma for ~ lcfr . (Contr...
lcfrlem34 41535	Lemma for ~ lcfr . (Contr...
lcfrlem35 41536	Lemma for ~ lcfr . (Contr...
lcfrlem36 41537	Lemma for ~ lcfr . (Contr...
lcfrlem37 41538	Lemma for ~ lcfr . (Contr...
lcfrlem38 41539	Lemma for ~ lcfr . Combin...
lcfrlem39 41540	Lemma for ~ lcfr . Elimin...
lcfrlem40 41541	Lemma for ~ lcfr . Elimin...
lcfrlem41 41542	Lemma for ~ lcfr . Elimin...
lcfrlem42 41543	Lemma for ~ lcfr . Elimin...
lcfr 41544	Reconstruction of a subspa...
lcdfval 41547	Dual vector space of funct...
lcdval 41548	Dual vector space of funct...
lcdval2 41549	Dual vector space of funct...
lcdlvec 41550	The dual vector space of f...
lcdlmod 41551	The dual vector space of f...
lcdvbase 41552	Vector base set of a dual ...
lcdvbasess 41553	The vector base set of the...
lcdvbaselfl 41554	A vector in the base set o...
lcdvbasecl 41555	Closure of the value of a ...
lcdvadd 41556	Vector addition for the cl...
lcdvaddval 41557	The value of the value of ...
lcdsca 41558	The ring of scalars of the...
lcdsbase 41559	Base set of scalar ring fo...
lcdsadd 41560	Scalar addition for the cl...
lcdsmul 41561	Scalar multiplication for ...
lcdvs 41562	Scalar product for the clo...
lcdvsval 41563	Value of scalar product op...
lcdvscl 41564	The scalar product operati...
lcdlssvscl 41565	Closure of scalar product ...
lcdvsass 41566	Associative law for scalar...
lcd0 41567	The zero scalar of the clo...
lcd1 41568	The unit scalar of the clo...
lcdneg 41569	The unit scalar of the clo...
lcd0v 41570	The zero functional in the...
lcd0v2 41571	The zero functional in the...
lcd0vvalN 41572	Value of the zero function...
lcd0vcl 41573	Closure of the zero functi...
lcd0vs 41574	A scalar zero times a func...
lcdvs0N 41575	A scalar times the zero fu...
lcdvsub 41576	The value of vector subtra...
lcdvsubval 41577	The value of the value of ...
lcdlss 41578	Subspaces of a dual vector...
lcdlss2N 41579	Subspaces of a dual vector...
lcdlsp 41580	Span in the set of functio...
lcdlkreqN 41581	Colinear functionals have ...
lcdlkreq2N 41582	Colinear functionals have ...
mapdffval 41585	Projectivity from vector s...
mapdfval 41586	Projectivity from vector s...
mapdval 41587	Value of projectivity from...
mapdvalc 41588	Value of projectivity from...
mapdval2N 41589	Value of projectivity from...
mapdval3N 41590	Value of projectivity from...
mapdval4N 41591	Value of projectivity from...
mapdval5N 41592	Value of projectivity from...
mapdordlem1a 41593	Lemma for ~ mapdord . (Co...
mapdordlem1bN 41594	Lemma for ~ mapdord . (Co...
mapdordlem1 41595	Lemma for ~ mapdord . (Co...
mapdordlem2 41596	Lemma for ~ mapdord . Ord...
mapdord 41597	Ordering property of the m...
mapd11 41598	The map defined by ~ df-ma...
mapddlssN 41599	The mapping of a subspace ...
mapdsn 41600	Value of the map defined b...
mapdsn2 41601	Value of the map defined b...
mapdsn3 41602	Value of the map defined b...
mapd1dim2lem1N 41603	Value of the map defined b...
mapdrvallem2 41604	Lemma for ~ mapdrval . TO...
mapdrvallem3 41605	Lemma for ~ mapdrval . (C...
mapdrval 41606	Given a dual subspace ` R ...
mapd1o 41607	The map defined by ~ df-ma...
mapdrn 41608	Range of the map defined b...
mapdunirnN 41609	Union of the range of the ...
mapdrn2 41610	Range of the map defined b...
mapdcnvcl 41611	Closure of the converse of...
mapdcl 41612	Closure the value of the m...
mapdcnvid1N 41613	Converse of the value of t...
mapdsord 41614	Strong ordering property o...
mapdcl2 41615	The mapping of a subspace ...
mapdcnvid2 41616	Value of the converse of t...
mapdcnvordN 41617	Ordering property of the c...
mapdcnv11N 41618	The converse of the map de...
mapdcv 41619	Covering property of the c...
mapdincl 41620	Closure of dual subspace i...
mapdin 41621	Subspace intersection is p...
mapdlsmcl 41622	Closure of dual subspace s...
mapdlsm 41623	Subspace sum is preserved ...
mapd0 41624	Projectivity map of the ze...
mapdcnvatN 41625	Atoms are preserved by the...
mapdat 41626	Atoms are preserved by the...
mapdspex 41627	The map of a span equals t...
mapdn0 41628	Transfer nonzero property ...
mapdncol 41629	Transfer non-colinearity f...
mapdindp 41630	Transfer (part of) vector ...
mapdpglem1 41631	Lemma for ~ mapdpg . Baer...
mapdpglem2 41632	Lemma for ~ mapdpg . Baer...
mapdpglem2a 41633	Lemma for ~ mapdpg . (Con...
mapdpglem3 41634	Lemma for ~ mapdpg . Baer...
mapdpglem4N 41635	Lemma for ~ mapdpg . (Con...
mapdpglem5N 41636	Lemma for ~ mapdpg . (Con...
mapdpglem6 41637	Lemma for ~ mapdpg . Baer...
mapdpglem8 41638	Lemma for ~ mapdpg . Baer...
mapdpglem9 41639	Lemma for ~ mapdpg . Baer...
mapdpglem10 41640	Lemma for ~ mapdpg . Baer...
mapdpglem11 41641	Lemma for ~ mapdpg . (Con...
mapdpglem12 41642	Lemma for ~ mapdpg . TODO...
mapdpglem13 41643	Lemma for ~ mapdpg . (Con...
mapdpglem14 41644	Lemma for ~ mapdpg . (Con...
mapdpglem15 41645	Lemma for ~ mapdpg . (Con...
mapdpglem16 41646	Lemma for ~ mapdpg . Baer...
mapdpglem17N 41647	Lemma for ~ mapdpg . Baer...
mapdpglem18 41648	Lemma for ~ mapdpg . Baer...
mapdpglem19 41649	Lemma for ~ mapdpg . Baer...
mapdpglem20 41650	Lemma for ~ mapdpg . Baer...
mapdpglem21 41651	Lemma for ~ mapdpg . (Con...
mapdpglem22 41652	Lemma for ~ mapdpg . Baer...
mapdpglem23 41653	Lemma for ~ mapdpg . Baer...
mapdpglem30a 41654	Lemma for ~ mapdpg . (Con...
mapdpglem30b 41655	Lemma for ~ mapdpg . (Con...
mapdpglem25 41656	Lemma for ~ mapdpg . Baer...
mapdpglem26 41657	Lemma for ~ mapdpg . Baer...
mapdpglem27 41658	Lemma for ~ mapdpg . Baer...
mapdpglem29 41659	Lemma for ~ mapdpg . Baer...
mapdpglem28 41660	Lemma for ~ mapdpg . Baer...
mapdpglem30 41661	Lemma for ~ mapdpg . Baer...
mapdpglem31 41662	Lemma for ~ mapdpg . Baer...
mapdpglem24 41663	Lemma for ~ mapdpg . Exis...
mapdpglem32 41664	Lemma for ~ mapdpg . Uniq...
mapdpg 41665	Part 1 of proof of the fir...
baerlem3lem1 41666	Lemma for ~ baerlem3 . (C...
baerlem5alem1 41667	Lemma for ~ baerlem5a . (...
baerlem5blem1 41668	Lemma for ~ baerlem5b . (...
baerlem3lem2 41669	Lemma for ~ baerlem3 . (C...
baerlem5alem2 41670	Lemma for ~ baerlem5a . (...
baerlem5blem2 41671	Lemma for ~ baerlem5b . (...
baerlem3 41672	An equality that holds whe...
baerlem5a 41673	An equality that holds whe...
baerlem5b 41674	An equality that holds whe...
baerlem5amN 41675	An equality that holds whe...
baerlem5bmN 41676	An equality that holds whe...
baerlem5abmN 41677	An equality that holds whe...
mapdindp0 41678	Vector independence lemma....
mapdindp1 41679	Vector independence lemma....
mapdindp2 41680	Vector independence lemma....
mapdindp3 41681	Vector independence lemma....
mapdindp4 41682	Vector independence lemma....
mapdhval 41683	Lemmma for ~~? mapdh . (C...
mapdhval0 41684	Lemmma for ~~? mapdh . (C...
mapdhval2 41685	Lemmma for ~~? mapdh . (C...
mapdhcl 41686	Lemmma for ~~? mapdh . (C...
mapdheq 41687	Lemmma for ~~? mapdh . Th...
mapdheq2 41688	Lemmma for ~~? mapdh . On...
mapdheq2biN 41689	Lemmma for ~~? mapdh . Pa...
mapdheq4lem 41690	Lemma for ~ mapdheq4 . Pa...
mapdheq4 41691	Lemma for ~~? mapdh . Par...
mapdh6lem1N 41692	Lemma for ~ mapdh6N . Par...
mapdh6lem2N 41693	Lemma for ~ mapdh6N . Par...
mapdh6aN 41694	Lemma for ~ mapdh6N . Par...
mapdh6b0N 41695	Lemmma for ~ mapdh6N . (C...
mapdh6bN 41696	Lemmma for ~ mapdh6N . (C...
mapdh6cN 41697	Lemmma for ~ mapdh6N . (C...
mapdh6dN 41698	Lemmma for ~ mapdh6N . (C...
mapdh6eN 41699	Lemmma for ~ mapdh6N . Pa...
mapdh6fN 41700	Lemmma for ~ mapdh6N . Pa...
mapdh6gN 41701	Lemmma for ~ mapdh6N . Pa...
mapdh6hN 41702	Lemmma for ~ mapdh6N . Pa...
mapdh6iN 41703	Lemmma for ~ mapdh6N . El...
mapdh6jN 41704	Lemmma for ~ mapdh6N . El...
mapdh6kN 41705	Lemmma for ~ mapdh6N . El...
mapdh6N 41706	Part (6) of [Baer] p. 47 l...
mapdh7eN 41707	Part (7) of [Baer] p. 48 l...
mapdh7cN 41708	Part (7) of [Baer] p. 48 l...
mapdh7dN 41709	Part (7) of [Baer] p. 48 l...
mapdh7fN 41710	Part (7) of [Baer] p. 48 l...
mapdh75e 41711	Part (7) of [Baer] p. 48 l...
mapdh75cN 41712	Part (7) of [Baer] p. 48 l...
mapdh75d 41713	Part (7) of [Baer] p. 48 l...
mapdh75fN 41714	Part (7) of [Baer] p. 48 l...
hvmapffval 41717	Map from nonzero vectors t...
hvmapfval 41718	Map from nonzero vectors t...
hvmapval 41719	Value of map from nonzero ...
hvmapvalvalN 41720	Value of value of map (i.e...
hvmapidN 41721	The value of the vector to...
hvmap1o 41722	The vector to functional m...
hvmapclN 41723	Closure of the vector to f...
hvmap1o2 41724	The vector to functional m...
hvmapcl2 41725	Closure of the vector to f...
hvmaplfl 41726	The vector to functional m...
hvmaplkr 41727	Kernel of the vector to fu...
mapdhvmap 41728	Relationship between ` map...
lspindp5 41729	Obtain an independent vect...
hdmaplem1 41730	Lemma to convert a frequen...
hdmaplem2N 41731	Lemma to convert a frequen...
hdmaplem3 41732	Lemma to convert a frequen...
hdmaplem4 41733	Lemma to convert a frequen...
mapdh8a 41734	Part of Part (8) in [Baer]...
mapdh8aa 41735	Part of Part (8) in [Baer]...
mapdh8ab 41736	Part of Part (8) in [Baer]...
mapdh8ac 41737	Part of Part (8) in [Baer]...
mapdh8ad 41738	Part of Part (8) in [Baer]...
mapdh8b 41739	Part of Part (8) in [Baer]...
mapdh8c 41740	Part of Part (8) in [Baer]...
mapdh8d0N 41741	Part of Part (8) in [Baer]...
mapdh8d 41742	Part of Part (8) in [Baer]...
mapdh8e 41743	Part of Part (8) in [Baer]...
mapdh8g 41744	Part of Part (8) in [Baer]...
mapdh8i 41745	Part of Part (8) in [Baer]...
mapdh8j 41746	Part of Part (8) in [Baer]...
mapdh8 41747	Part (8) in [Baer] p. 48. ...
mapdh9a 41748	Lemma for part (9) in [Bae...
mapdh9aOLDN 41749	Lemma for part (9) in [Bae...
hdmap1ffval 41754	Preliminary map from vecto...
hdmap1fval 41755	Preliminary map from vecto...
hdmap1vallem 41756	Value of preliminary map f...
hdmap1val 41757	Value of preliminary map f...
hdmap1val0 41758	Value of preliminary map f...
hdmap1val2 41759	Value of preliminary map f...
hdmap1eq 41760	The defining equation for ...
hdmap1cbv 41761	Frequently used lemma to c...
hdmap1valc 41762	Connect the value of the p...
hdmap1cl 41763	Convert closure theorem ~ ...
hdmap1eq2 41764	Convert ~ mapdheq2 to use ...
hdmap1eq4N 41765	Convert ~ mapdheq4 to use ...
hdmap1l6lem1 41766	Lemma for ~ hdmap1l6 . Pa...
hdmap1l6lem2 41767	Lemma for ~ hdmap1l6 . Pa...
hdmap1l6a 41768	Lemma for ~ hdmap1l6 . Pa...
hdmap1l6b0N 41769	Lemmma for ~ hdmap1l6 . (...
hdmap1l6b 41770	Lemmma for ~ hdmap1l6 . (...
hdmap1l6c 41771	Lemmma for ~ hdmap1l6 . (...
hdmap1l6d 41772	Lemmma for ~ hdmap1l6 . (...
hdmap1l6e 41773	Lemmma for ~ hdmap1l6 . P...
hdmap1l6f 41774	Lemmma for ~ hdmap1l6 . P...
hdmap1l6g 41775	Lemmma for ~ hdmap1l6 . P...
hdmap1l6h 41776	Lemmma for ~ hdmap1l6 . P...
hdmap1l6i 41777	Lemmma for ~ hdmap1l6 . E...
hdmap1l6j 41778	Lemmma for ~ hdmap1l6 . E...
hdmap1l6k 41779	Lemmma for ~ hdmap1l6 . E...
hdmap1l6 41780	Part (6) of [Baer] p. 47 l...
hdmap1eulem 41781	Lemma for ~ hdmap1eu . TO...
hdmap1eulemOLDN 41782	Lemma for ~ hdmap1euOLDN ....
hdmap1eu 41783	Convert ~ mapdh9a to use t...
hdmap1euOLDN 41784	Convert ~ mapdh9aOLDN to u...
hdmapffval 41785	Map from vectors to functi...
hdmapfval 41786	Map from vectors to functi...
hdmapval 41787	Value of map from vectors ...
hdmapfnN 41788	Functionality of map from ...
hdmapcl 41789	Closure of map from vector...
hdmapval2lem 41790	Lemma for ~ hdmapval2 . (...
hdmapval2 41791	Value of map from vectors ...
hdmapval0 41792	Value of map from vectors ...
hdmapeveclem 41793	Lemma for ~ hdmapevec . T...
hdmapevec 41794	Value of map from vectors ...
hdmapevec2 41795	The inner product of the r...
hdmapval3lemN 41796	Value of map from vectors ...
hdmapval3N 41797	Value of map from vectors ...
hdmap10lem 41798	Lemma for ~ hdmap10 . (Co...
hdmap10 41799	Part 10 in [Baer] p. 48 li...
hdmap11lem1 41800	Lemma for ~ hdmapadd . (C...
hdmap11lem2 41801	Lemma for ~ hdmapadd . (C...
hdmapadd 41802	Part 11 in [Baer] p. 48 li...
hdmapeq0 41803	Part of proof of part 12 i...
hdmapnzcl 41804	Nonzero vector closure of ...
hdmapneg 41805	Part of proof of part 12 i...
hdmapsub 41806	Part of proof of part 12 i...
hdmap11 41807	Part of proof of part 12 i...
hdmaprnlem1N 41808	Part of proof of part 12 i...
hdmaprnlem3N 41809	Part of proof of part 12 i...
hdmaprnlem3uN 41810	Part of proof of part 12 i...
hdmaprnlem4tN 41811	Lemma for ~ hdmaprnN . TO...
hdmaprnlem4N 41812	Part of proof of part 12 i...
hdmaprnlem6N 41813	Part of proof of part 12 i...
hdmaprnlem7N 41814	Part of proof of part 12 i...
hdmaprnlem8N 41815	Part of proof of part 12 i...
hdmaprnlem9N 41816	Part of proof of part 12 i...
hdmaprnlem3eN 41817	Lemma for ~ hdmaprnN . (C...
hdmaprnlem10N 41818	Lemma for ~ hdmaprnN . Sh...
hdmaprnlem11N 41819	Lemma for ~ hdmaprnN . Sh...
hdmaprnlem15N 41820	Lemma for ~ hdmaprnN . El...
hdmaprnlem16N 41821	Lemma for ~ hdmaprnN . El...
hdmaprnlem17N 41822	Lemma for ~ hdmaprnN . In...
hdmaprnN 41823	Part of proof of part 12 i...
hdmapf1oN 41824	Part 12 in [Baer] p. 49. ...
hdmap14lem1a 41825	Prior to part 14 in [Baer]...
hdmap14lem2a 41826	Prior to part 14 in [Baer]...
hdmap14lem1 41827	Prior to part 14 in [Baer]...
hdmap14lem2N 41828	Prior to part 14 in [Baer]...
hdmap14lem3 41829	Prior to part 14 in [Baer]...
hdmap14lem4a 41830	Simplify ` ( A \ { Q } ) `...
hdmap14lem4 41831	Simplify ` ( A \ { Q } ) `...
hdmap14lem6 41832	Case where ` F ` is zero. ...
hdmap14lem7 41833	Combine cases of ` F ` . ...
hdmap14lem8 41834	Part of proof of part 14 i...
hdmap14lem9 41835	Part of proof of part 14 i...
hdmap14lem10 41836	Part of proof of part 14 i...
hdmap14lem11 41837	Part of proof of part 14 i...
hdmap14lem12 41838	Lemma for proof of part 14...
hdmap14lem13 41839	Lemma for proof of part 14...
hdmap14lem14 41840	Part of proof of part 14 i...
hdmap14lem15 41841	Part of proof of part 14 i...
hgmapffval 41844	Map from the scalar divisi...
hgmapfval 41845	Map from the scalar divisi...
hgmapval 41846	Value of map from the scal...
hgmapfnN 41847	Functionality of scalar si...
hgmapcl 41848	Closure of scalar sigma ma...
hgmapdcl 41849	Closure of the vector spac...
hgmapvs 41850	Part 15 of [Baer] p. 50 li...
hgmapval0 41851	Value of the scalar sigma ...
hgmapval1 41852	Value of the scalar sigma ...
hgmapadd 41853	Part 15 of [Baer] p. 50 li...
hgmapmul 41854	Part 15 of [Baer] p. 50 li...
hgmaprnlem1N 41855	Lemma for ~ hgmaprnN . (C...
hgmaprnlem2N 41856	Lemma for ~ hgmaprnN . Pa...
hgmaprnlem3N 41857	Lemma for ~ hgmaprnN . El...
hgmaprnlem4N 41858	Lemma for ~ hgmaprnN . El...
hgmaprnlem5N 41859	Lemma for ~ hgmaprnN . El...
hgmaprnN 41860	Part of proof of part 16 i...
hgmap11 41861	The scalar sigma map is on...
hgmapf1oN 41862	The scalar sigma map is a ...
hgmapeq0 41863	The scalar sigma map is ze...
hdmapipcl 41864	The inner product (Hermiti...
hdmapln1 41865	Linearity property that wi...
hdmaplna1 41866	Additive property of first...
hdmaplns1 41867	Subtraction property of fi...
hdmaplnm1 41868	Multiplicative property of...
hdmaplna2 41869	Additive property of secon...
hdmapglnm2 41870	g-linear property of secon...
hdmapgln2 41871	g-linear property that wil...
hdmaplkr 41872	Kernel of the vector to du...
hdmapellkr 41873	Membership in the kernel (...
hdmapip0 41874	Zero property that will be...
hdmapip1 41875	Construct a proportional v...
hdmapip0com 41876	Commutation property of Ba...
hdmapinvlem1 41877	Line 27 in [Baer] p. 110. ...
hdmapinvlem2 41878	Line 28 in [Baer] p. 110, ...
hdmapinvlem3 41879	Line 30 in [Baer] p. 110, ...
hdmapinvlem4 41880	Part 1.1 of Proposition 1 ...
hdmapglem5 41881	Part 1.2 in [Baer] p. 110 ...
hgmapvvlem1 41882	Involution property of sca...
hgmapvvlem2 41883	Lemma for ~ hgmapvv . Eli...
hgmapvvlem3 41884	Lemma for ~ hgmapvv . Eli...
hgmapvv 41885	Value of a double involuti...
hdmapglem7a 41886	Lemma for ~ hdmapg . (Con...
hdmapglem7b 41887	Lemma for ~ hdmapg . (Con...
hdmapglem7 41888	Lemma for ~ hdmapg . Line...
hdmapg 41889	Apply the scalar sigma fun...
hdmapoc 41890	Express our constructed or...
hlhilset 41893	The final Hilbert space co...
hlhilsca 41894	The scalar of the final co...
hlhilbase 41895	The base set of the final ...
hlhilplus 41896	The vector addition for th...
hlhilslem 41897	Lemma for ~ hlhilsbase etc...
hlhilslemOLD 41898	Obsolete version of ~ hlhi...
hlhilsbase 41899	The scalar base set of the...
hlhilsbaseOLD 41900	Obsolete version of ~ hlhi...
hlhilsplus 41901	Scalar addition for the fi...
hlhilsplusOLD 41902	Obsolete version of ~ hlhi...
hlhilsmul 41903	Scalar multiplication for ...
hlhilsmulOLD 41904	Obsolete version of ~ hlhi...
hlhilsbase2 41905	The scalar base set of the...
hlhilsplus2 41906	Scalar addition for the fi...
hlhilsmul2 41907	Scalar multiplication for ...
hlhils0 41908	The scalar ring zero for t...
hlhils1N 41909	The scalar ring unity for ...
hlhilvsca 41910	The scalar product for the...
hlhilip 41911	Inner product operation fo...
hlhilipval 41912	Value of inner product ope...
hlhilnvl 41913	The involution operation o...
hlhillvec 41914	The final constructed Hilb...
hlhildrng 41915	The star division ring for...
hlhilsrnglem 41916	Lemma for ~ hlhilsrng . (...
hlhilsrng 41917	The star division ring for...
hlhil0 41918	The zero vector for the fi...
hlhillsm 41919	The vector sum operation f...
hlhilocv 41920	The orthocomplement for th...
hlhillcs 41921	The closed subspaces of th...
hlhilphllem 41922	Lemma for ~ hlhil . (Cont...
hlhilhillem 41923	Lemma for ~ hlhil . (Cont...
hlathil 41924	Construction of a Hilbert ...
iscsrg 41927	A commutative semiring is ...
rhmzrhval 41928	Evaluation of integers acr...
zndvdchrrhm 41929	Construction of a ring hom...
leexp1ad 41930	Weak base ordering relatio...
relogbcld 41931	Closure of the general log...
relogbexpd 41932	Identity law for general l...
relogbzexpd 41933	Power law for the general ...
logblebd 41934	The general logarithm is m...
uzindd 41935	Induction on the upper int...
fzadd2d 41936	Membership of a sum in a f...
zltlem1d 41937	Integer ordering relation,...
zltp1led 41938	Integer ordering relation,...
fzne2d 41939	Elementhood in a finite se...
eqfnfv2d2 41940	Equality of functions is d...
fzsplitnd 41941	Split a finite interval of...
fzsplitnr 41942	Split a finite interval of...
addassnni 41943	Associative law for additi...
addcomnni 41944	Commutative law for additi...
mulassnni 41945	Associative law for multip...
mulcomnni 41946	Commutative law for multip...
gcdcomnni 41947	Commutative law for gcd. ...
gcdnegnni 41948	Negation invariance for gc...
neggcdnni 41949	Negation invariance for gc...
bccl2d 41950	Closure of the binomial co...
recbothd 41951	Take reciprocal on both si...
gcdmultiplei 41952	The GCD of a multiple of a...
gcdaddmzz2nni 41953	Adding a multiple of one o...
gcdaddmzz2nncomi 41954	Adding a multiple of one o...
gcdnncli 41955	Closure of the gcd operato...
muldvds1d 41956	If a product divides an in...
muldvds2d 41957	If a product divides an in...
nndivdvdsd 41958	A positive integer divides...
nnproddivdvdsd 41959	A product of natural numbe...
coprmdvds2d 41960	If an integer is divisible...
imadomfi 41961	An image of a function und...
12gcd5e1 41962	The gcd of 12 and 5 is 1. ...
60gcd6e6 41963	The gcd of 60 and 6 is 6. ...
60gcd7e1 41964	The gcd of 60 and 7 is 1. ...
420gcd8e4 41965	The gcd of 420 and 8 is 4....
lcmeprodgcdi 41966	Calculate the least common...
12lcm5e60 41967	The lcm of 12 and 5 is 60....
60lcm6e60 41968	The lcm of 60 and 6 is 60....
60lcm7e420 41969	The lcm of 60 and 7 is 420...
420lcm8e840 41970	The lcm of 420 and 8 is 84...
lcmfunnnd 41971	Useful equation to calcula...
lcm1un 41972	Least common multiple of n...
lcm2un 41973	Least common multiple of n...
lcm3un 41974	Least common multiple of n...
lcm4un 41975	Least common multiple of n...
lcm5un 41976	Least common multiple of n...
lcm6un 41977	Least common multiple of n...
lcm7un 41978	Least common multiple of n...
lcm8un 41979	Least common multiple of n...
3factsumint1 41980	Move constants out of inte...
3factsumint2 41981	Move constants out of inte...
3factsumint3 41982	Move constants out of inte...
3factsumint4 41983	Move constants out of inte...
3factsumint 41984	Helpful equation for lcm i...
resopunitintvd 41985	Restrict continuous functi...
resclunitintvd 41986	Restrict continuous functi...
resdvopclptsd 41987	Restrict derivative on uni...
lcmineqlem1 41988	Part of lcm inequality lem...
lcmineqlem2 41989	Part of lcm inequality lem...
lcmineqlem3 41990	Part of lcm inequality lem...
lcmineqlem4 41991	Part of lcm inequality lem...
lcmineqlem5 41992	Technical lemma for recipr...
lcmineqlem6 41993	Part of lcm inequality lem...
lcmineqlem7 41994	Derivative of 1-x for chai...
lcmineqlem8 41995	Derivative of (1-x)^(N-M)....
lcmineqlem9 41996	(1-x)^(N-M) is continuous....
lcmineqlem10 41997	Induction step of ~ lcmine...
lcmineqlem11 41998	Induction step, continuati...
lcmineqlem12 41999	Base case for induction. ...
lcmineqlem13 42000	Induction proof for lcm in...
lcmineqlem14 42001	Technical lemma for inequa...
lcmineqlem15 42002	F times the least common m...
lcmineqlem16 42003	Technical divisibility lem...
lcmineqlem17 42004	Inequality of 2^{2n}. (Co...
lcmineqlem18 42005	Technical lemma to shift f...
lcmineqlem19 42006	Dividing implies inequalit...
lcmineqlem20 42007	Inequality for lcm lemma. ...
lcmineqlem21 42008	The lcm inequality lemma w...
lcmineqlem22 42009	The lcm inequality lemma w...
lcmineqlem23 42010	Penultimate step to the lc...
lcmineqlem 42011	The least common multiple ...
3exp7 42012	3 to the power of 7 equals...
3lexlogpow5ineq1 42013	First inequality in inequa...
3lexlogpow5ineq2 42014	Second inequality in inequ...
3lexlogpow5ineq4 42015	Sharper logarithm inequali...
3lexlogpow5ineq3 42016	Combined inequality chain ...
3lexlogpow2ineq1 42017	Result for bound in AKS in...
3lexlogpow2ineq2 42018	Result for bound in AKS in...
3lexlogpow5ineq5 42019	Result for bound in AKS in...
intlewftc 42020	Inequality inference by in...
aks4d1lem1 42021	Technical lemma to reduce ...
aks4d1p1p1 42022	Exponential law for finite...
dvrelog2 42023	The derivative of the loga...
dvrelog3 42024	The derivative of the loga...
dvrelog2b 42025	Derivative of the binary l...
0nonelalab 42026	Technical lemma for open i...
dvrelogpow2b 42027	Derivative of the power of...
aks4d1p1p3 42028	Bound of a ceiling of the ...
aks4d1p1p2 42029	Rewrite ` A ` in more suit...
aks4d1p1p4 42030	Technical step for inequal...
dvle2 42031	Collapsed ~ dvle . (Contr...
aks4d1p1p6 42032	Inequality lift to differe...
aks4d1p1p7 42033	Bound of intermediary of i...
aks4d1p1p5 42034	Show inequality for existe...
aks4d1p1 42035	Show inequality for existe...
aks4d1p2 42036	Technical lemma for existe...
aks4d1p3 42037	There exists a small enoug...
aks4d1p4 42038	There exists a small enoug...
aks4d1p5 42039	Show that ` N ` and ` R ` ...
aks4d1p6 42040	The maximal prime power ex...
aks4d1p7d1 42041	Technical step in AKS lemm...
aks4d1p7 42042	Technical step in AKS lemm...
aks4d1p8d1 42043	If a prime divides one num...
aks4d1p8d2 42044	Any prime power dividing a...
aks4d1p8d3 42045	The remainder of a divisio...
aks4d1p8 42046	Show that ` N ` and ` R ` ...
aks4d1p9 42047	Show that the order is bou...
aks4d1 42048	Lemma 4.1 from ~ https://w...
fldhmf1 42049	A field homomorphism is in...
isprimroot 42052	The value of a primitive r...
isprimroot2 42053	Alternative way of creatin...
mndmolinv 42054	An element of a monoid tha...
linvh 42055	If an element has a unique...
primrootsunit1 42056	Primitive roots have left ...
primrootsunit 42057	Primitive roots have left ...
primrootscoprmpow 42058	Coprime powers of primitiv...
posbezout 42059	Bezout's identity restrict...
primrootscoprf 42060	Coprime powers of primitiv...
primrootscoprbij 42061	A bijection between coprim...
primrootscoprbij2 42062	A bijection between coprim...
remexz 42063	Division with rest. (Cont...
primrootlekpowne0 42064	There is no smaller power ...
primrootspoweq0 42065	The power of a ` R ` -th p...
aks6d1c1p1 42066	Definition of the introspe...
aks6d1c1p1rcl 42067	Reverse closure of the int...
aks6d1c1p2 42068	` P ` and linear factors a...
aks6d1c1p3 42069	In a field with a Frobeniu...
aks6d1c1p4 42070	The product of polynomials...
aks6d1c1p5 42071	The product of exponents i...
aks6d1c1p7 42072	` X ` is introspective to ...
aks6d1c1p6 42073	If a polynomials ` F ` is ...
aks6d1c1p8 42074	If a number ` E ` is intro...
aks6d1c1 42075	Claim 1 of Theorem 6.1 ~ h...
evl1gprodd 42076	Polynomial evaluation buil...
aks6d1c2p1 42077	In the AKS-theorem the sub...
aks6d1c2p2 42078	Injective condition for co...
hashscontpowcl 42079	Closure of E for ~ https:/...
hashscontpow1 42080	Helper lemma for to prove ...
hashscontpow 42081	If a set contains all ` N ...
aks6d1c3 42082	Claim 3 of Theorem 6.1 of ...
aks6d1c4 42083	Claim 4 of Theorem 6.1 of ...
aks6d1c1rh 42084	Claim 1 of AKS primality p...
aks6d1c2lem3 42085	Lemma for ~ aks6d1c2 to si...
aks6d1c2lem4 42086	Claim 2 of Theorem 6.1 AKS...
hashnexinj 42087	If the number of elements ...
hashnexinjle 42088	If the number of elements ...
aks6d1c2 42089	Claim 2 of Theorem 6.1 of ...
rspcsbnea 42090	Special case related to ~ ...
idomnnzpownz 42091	A non-zero power in an int...
idomnnzgmulnz 42092	A finite product of non-ze...
ringexp0nn 42093	Zero to the power of a pos...
aks6d1c5lem0 42094	Lemma for Claim 5 of Theor...
aks6d1c5lem1 42095	Lemma for claim 5, evaluat...
aks6d1c5lem3 42096	Lemma for Claim 5, polynom...
aks6d1c5lem2 42097	Lemma for Claim 5, contrad...
aks6d1c5 42098	Claim 5 of Theorem 6.1 ~ h...
deg1gprod 42099	Degree multiplication is a...
deg1pow 42100	Exact degree of a power of...
5bc2eq10 42101	The value of 5 choose 2. ...
facp2 42102	The factorial of a success...
2np3bcnp1 42103	Part of induction step for...
2ap1caineq 42104	Inequality for Theorem 6.6...
sticksstones1 42105	Different strictly monoton...
sticksstones2 42106	The range function on stri...
sticksstones3 42107	The range function on stri...
sticksstones4 42108	Equinumerosity lemma for s...
sticksstones5 42109	Count the number of strict...
sticksstones6 42110	Function induces an order ...
sticksstones7 42111	Closure property of sticks...
sticksstones8 42112	Establish mapping between ...
sticksstones9 42113	Establish mapping between ...
sticksstones10 42114	Establish mapping between ...
sticksstones11 42115	Establish bijective mappin...
sticksstones12a 42116	Establish bijective mappin...
sticksstones12 42117	Establish bijective mappin...
sticksstones13 42118	Establish bijective mappin...
sticksstones14 42119	Sticks and stones with def...
sticksstones15 42120	Sticks and stones with alm...
sticksstones16 42121	Sticks and stones with col...
sticksstones17 42122	Extend sticks and stones t...
sticksstones18 42123	Extend sticks and stones t...
sticksstones19 42124	Extend sticks and stones t...
sticksstones20 42125	Lift sticks and stones to ...
sticksstones21 42126	Lift sticks and stones to ...
sticksstones22 42127	Non-exhaustive sticks and ...
sticksstones23 42128	Non-exhaustive sticks and ...
aks6d1c6lem1 42129	Lemma for claim 6, deduce ...
aks6d1c6lem2 42130	Every primitive root is ro...
aks6d1c6lem3 42131	Claim 6 of Theorem 6.1 of ...
aks6d1c6lem4 42132	Claim 6 of Theorem 6.1 of ...
aks6d1c6isolem1 42133	Lemma to construct the map...
aks6d1c6isolem2 42134	Lemma to construct the gro...
aks6d1c6isolem3 42135	The preimage of a map send...
aks6d1c6lem5 42136	Eliminate the size hypothe...
bcled 42137	Inequality for binomial co...
bcle2d 42138	Inequality for binomial co...
aks6d1c7lem1 42139	The last set of inequaliti...
aks6d1c7lem2 42140	Contradiction to Claim 2 a...
aks6d1c7lem3 42141	Remove lots of hypotheses ...
aks6d1c7lem4 42142	In the AKS algorithm there...
aks6d1c7 42143	` N ` is a prime power if ...
rhmqusspan 42144	Ring homomorphism out of a...
aks5lem1 42145	Section 5 of ~ https://www...
aks5lem2 42146	Lemma for section 5 ~ http...
ply1asclzrhval 42147	Transfer results from alge...
aks5lem3a 42148	Lemma for AKS section 5. ...
aks5lem4a 42149	Lemma for AKS section 5, r...
aks5lem5a 42150	Lemma for AKS, section 5, ...
aks5lem6 42151	Connect results of section...
indstrd 42152	Strong induction, deductio...
grpods 42153	Relate sums of elements of...
unitscyglem1 42154	Lemma for unitscyg. (Cont...
unitscyglem2 42155	Lemma for unitscyg. (Cont...
unitscyglem3 42156	Lemma for unitscyg. (Cont...
unitscyglem4 42157	Lemma for unitscyg (Contri...
unitscyglem5 42158	Lemma for unitscyg (Contri...
aks5lem7 42159	Lemma for aks5. We clean ...
aks5lem8 42160	Lemma for aks5. Clean up ...
exfinfldd 42162	For any prime ` P ` and an...
aks5 42163	The AKS Primality test, gi...
metakunt1 42164	A is an endomapping. (Con...
metakunt2 42165	A is an endomapping. (Con...
metakunt3 42166	Value of A. (Contributed b...
metakunt4 42167	Value of A. (Contributed b...
metakunt5 42168	C is the left inverse for ...
metakunt6 42169	C is the left inverse for ...
metakunt7 42170	C is the left inverse for ...
metakunt8 42171	C is the left inverse for ...
metakunt9 42172	C is the left inverse for ...
metakunt10 42173	C is the right inverse for...
metakunt11 42174	C is the right inverse for...
metakunt12 42175	C is the right inverse for...
metakunt13 42176	C is the right inverse for...
metakunt14 42177	A is a primitive permutati...
metakunt15 42178	Construction of another pe...
metakunt16 42179	Construction of another pe...
metakunt17 42180	The union of three disjoin...
metakunt18 42181	Disjoint domains and codom...
metakunt19 42182	Domains on restrictions of...
metakunt20 42183	Show that B coincides on t...
metakunt21 42184	Show that B coincides on t...
metakunt22 42185	Show that B coincides on t...
metakunt23 42186	B coincides on the union o...
metakunt24 42187	Technical condition such t...
metakunt25 42188	B is a permutation. (Cont...
metakunt26 42189	Construction of one soluti...
metakunt27 42190	Construction of one soluti...
metakunt28 42191	Construction of one soluti...
metakunt29 42192	Construction of one soluti...
metakunt30 42193	Construction of one soluti...
metakunt31 42194	Construction of one soluti...
metakunt32 42195	Construction of one soluti...
metakunt33 42196	Construction of one soluti...
metakunt34 42197	` D ` is a permutation. (...
fac2xp3 42198	Factorial of 2x+3, sublemm...
prodsplit 42199	Product split into two fac...
2xp3dxp2ge1d 42200	2x+3 is greater than or eq...
factwoffsmonot 42201	A factorial with offset is...
intnanrt 42202	Introduction of conjunct i...
ioin9i8 42203	Miscellaneous inference cr...
jaodd 42204	Double deduction form of ~...
syl3an12 42205	A double syllogism inferen...
sbtd 42206	A true statement is true u...
sbor2 42207	One direction of ~ sbor , ...
sbalexi 42208	Inference form of ~ sbalex...
19.9dev 42209	~ 19.9d in the case of an ...
3rspcedvd 42210	Triple application of ~ rs...
sn-axrep5v 42211	A condensed form of ~ axre...
sn-axprlem3 42212	~ axprlem3 using only Tars...
sn-exelALT 42213	Alternate proof of ~ exel ...
ss2ab1 42214	Class abstractions in a su...
ssabdv 42215	Deduction of abstraction s...
sn-iotalem 42216	An unused lemma showing th...
sn-iotalemcor 42217	Corollary of ~ sn-iotalem ...
abbi1sn 42218	Originally part of ~ uniab...
brif2 42219	Move a relation inside and...
brif12 42220	Move a relation inside and...
pssexg 42221	The proper subset of a set...
pssn0 42222	A proper superset is nonem...
psspwb 42223	Classes are proper subclas...
xppss12 42224	Proper subset theorem for ...
elpwbi 42225	Membership in a power set,...
imaopab 42226	The image of a class of or...
fnsnbt 42227	A function's domain is a s...
fnimasnd 42228	The image of a function by...
eqresfnbd 42229	Property of being the rest...
f1o2d2 42230	Sufficient condition for a...
fmpocos 42231	Composition of two functio...
ovmpogad 42232	Value of an operation give...
ofun 42233	A function operation of un...
dfqs2 42234	Alternate definition of qu...
dfqs3 42235	Alternate definition of qu...
qseq12d 42236	Equality theorem for quoti...
qsalrel 42237	The quotient set is equal ...
elmapssresd 42238	A restricted mapping is a ...
supinf 42239	The supremum is the infimu...
mapcod 42240	Compose two mappings. (Co...
fisdomnn 42241	A finite set is dominated ...
ltex 42242	The less-than relation is ...
leex 42243	The less-than-or-equal-to ...
subex 42244	The subtraction operation ...
absex 42245	The absolute value functio...
cjex 42246	The conjugate function is ...
fzosumm1 42247	Separate out the last term...
ccatcan2d 42248	Cancellation law for conca...
c0exALT 42249	Alternate proof of ~ c0ex ...
0cnALT3 42250	Alternate proof of ~ 0cn u...
elre0re 42251	Specialized version of ~ 0...
1t1e1ALT 42252	Alternate proof of ~ 1t1e1...
lttrii 42253	'Less than' is transitive....
remulcan2d 42254	~ mulcan2d for real number...
readdridaddlidd 42255	Given some real number ` B...
sn-1ne2 42256	A proof of ~ 1ne2 without ...
nnn1suc 42257	A positive integer that is...
nnadd1com 42258	Addition with 1 is commuta...
nnaddcom 42259	Addition is commutative fo...
nnaddcomli 42260	Version of ~ addcomli for ...
nnadddir 42261	Right-distributivity for n...
nnmul1com 42262	Multiplication with 1 is c...
nnmulcom 42263	Multiplication is commutat...
readdrcl2d 42264	Reverse closure for additi...
mvrrsubd 42265	Move a subtraction in the ...
laddrotrd 42266	Rotate the variables right...
raddswap12d 42267	Swap the first two variabl...
lsubrotld 42268	Rotate the variables left ...
rsubrotld 42269	Rotate the variables left ...
lsubswap23d 42270	Swap the second and third ...
addsubeq4com 42271	Relation between sums and ...
sqsumi 42272	A sum squared. (Contribut...
negn0nposznnd 42273	Lemma for ~ dffltz . (Con...
sqmid3api 42274	Value of the square of the...
decaddcom 42275	Commute ones place in addi...
sqn5i 42276	The square of a number end...
sqn5ii 42277	The square of a number end...
decpmulnc 42278	Partial products algorithm...
decpmul 42279	Partial products algorithm...
sqdeccom12 42280	The square of a number in ...
sq3deccom12 42281	Variant of ~ sqdeccom12 wi...
4t5e20 42282	4 times 5 equals 20. (Con...
sq4 42283	The square of 4 is 16. (C...
sq5 42284	The square of 5 is 25. (C...
sq6 42285	The square of 6 is 36. (C...
sq7 42286	The square of 7 is 49. (C...
sq8 42287	The square of 8 is 64. (C...
sq9 42288	The square of 9 is 81. (C...
4rp 42289	4 is a positive real. (Co...
5rp 42290	5 is a positive real. (Co...
6rp 42291	6 is a positive real. (Co...
7rp 42292	7 is a positive real. (Co...
8rp 42293	8 is a positive real. (Co...
9rp 42294	9 is a positive real. (Co...
235t711 42295	Calculate a product by lon...
ex-decpmul 42296	Example usage of ~ decpmul...
eluzp1 42297	Membership in a successor ...
sn-eluzp1l 42298	Shorter proof of ~ eluzp1l...
fz1sumconst 42299	The sum of ` N ` constant ...
fz1sump1 42300	Add one more term to a sum...
oddnumth 42301	The Odd Number Theorem. T...
nicomachus 42302	Nicomachus's Theorem. The...
sumcubes 42303	The sum of the first ` N `...
pine0 42304	` _pi ` is nonzero. (Cont...
ine1 42305	` _i ` is not 1. (Contrib...
0tie0 42306	0 times ` _i ` equals 0. ...
it1ei 42307	` _i ` times 1 equals ` _i...
1tiei 42308	1 times ` _i ` equals ` _i...
itrere 42309	` _i ` times a real is rea...
retire 42310	A real times ` _i ` is rea...
oexpreposd 42311	Lemma for ~ dffltz . TODO...
explt1d 42312	A nonnegative real number ...
expeq1d 42313	A nonnegative real number ...
expeqidd 42314	A nonnegative real number ...
exp11d 42315	~ exp11nnd for nonzero int...
0dvds0 42316	0 divides 0. (Contributed...
absdvdsabsb 42317	Divisibility is invariant ...
gcdnn0id 42318	The ` gcd ` of a nonnegati...
gcdle1d 42319	The greatest common diviso...
gcdle2d 42320	The greatest common diviso...
dvdsexpad 42321	Deduction associated with ...
dvdsexpnn 42322	~ dvdssqlem generalized to...
dvdsexpnn0 42323	~ dvdsexpnn generalized to...
dvdsexpb 42324	~ dvdssq generalized to po...
posqsqznn 42325	When a positive rational s...
zdivgd 42326	Two ways to express " ` N ...
efne0d 42327	The exponential of a compl...
efsubd 42328	Difference of exponents la...
ef11d 42329	General condition for the ...
logccne0d 42330	The logarithm isn't 0 if i...
cxp112d 42331	General condition for comp...
cxp111d 42332	General condition for comp...
cxpi11d 42333	` _i ` to the powers of ` ...
logne0d 42334	Deduction form of ~ logne0...
rxp112d 42335	Real exponentiation is one...
log11d 42336	The natural logarithm is o...
rplog11d 42337	The natural logarithm is o...
rxp11d 42338	Real exponentiation is one...
tanhalfpim 42339	The tangent of ` _pi / 2 `...
tan3rdpi 42340	The tangent of ` _pi / 3 `...
asin1half 42341	The arcsine of ` 1 / 2 ` i...
acos1half 42342	The arccosine of ` 1 / 2 `...
resubval 42345	Value of real subtraction,...
renegeulemv 42346	Lemma for ~ renegeu and si...
renegeulem 42347	Lemma for ~ renegeu and si...
renegeu 42348	Existential uniqueness of ...
rernegcl 42349	Closure law for negative r...
renegadd 42350	Relationship between real ...
renegid 42351	Addition of a real number ...
reneg0addlid 42352	Negative zero is a left ad...
resubeulem1 42353	Lemma for ~ resubeu . A v...
resubeulem2 42354	Lemma for ~ resubeu . A v...
resubeu 42355	Existential uniqueness of ...
rersubcl 42356	Closure for real subtracti...
resubadd 42357	Relation between real subt...
resubaddd 42358	Relationship between subtr...
resubf 42359	Real subtraction is an ope...
repncan2 42360	Addition and subtraction o...
repncan3 42361	Addition and subtraction o...
readdsub 42362	Law for addition and subtr...
reladdrsub 42363	Move LHS of a sum into RHS...
reltsub1 42364	Subtraction from both side...
reltsubadd2 42365	'Less than' relationship b...
resubcan2 42366	Cancellation law for real ...
resubsub4 42367	Law for double subtraction...
rennncan2 42368	Cancellation law for real ...
renpncan3 42369	Cancellation law for real ...
repnpcan 42370	Cancellation law for addit...
reppncan 42371	Cancellation law for mixed...
resubidaddlidlem 42372	Lemma for ~ resubidaddlid ...
resubidaddlid 42373	Any real number subtracted...
resubdi 42374	Distribution of multiplica...
re1m1e0m0 42375	Equality of two left-addit...
sn-00idlem1 42376	Lemma for ~ sn-00id . (Co...
sn-00idlem2 42377	Lemma for ~ sn-00id . (Co...
sn-00idlem3 42378	Lemma for ~ sn-00id . (Co...
sn-00id 42379	~ 00id proven without ~ ax...
re0m0e0 42380	Real number version of ~ 0...
readdlid 42381	Real number version of ~ a...
sn-addlid 42382	~ addlid without ~ ax-mulc...
remul02 42383	Real number version of ~ m...
sn-0ne2 42384	~ 0ne2 without ~ ax-mulcom...
remul01 42385	Real number version of ~ m...
resubid 42386	Subtraction of a real numb...
readdrid 42387	Real number version of ~ a...
resubid1 42388	Real number version of ~ s...
renegneg 42389	A real number is equal to ...
readdcan2 42390	Commuted version of ~ read...
renegid2 42391	Commuted version of ~ rene...
remulneg2d 42392	Product with negative is n...
sn-it0e0 42393	Proof of ~ it0e0 without ~...
sn-negex12 42394	A combination of ~ cnegex ...
sn-negex 42395	Proof of ~ cnegex without ...
sn-negex2 42396	Proof of ~ cnegex2 without...
sn-addcand 42397	~ addcand without ~ ax-mul...
sn-addrid 42398	~ addrid without ~ ax-mulc...
sn-addcan2d 42399	~ addcan2d without ~ ax-mu...
reixi 42400	~ ixi without ~ ax-mulcom ...
rei4 42401	~ i4 without ~ ax-mulcom ....
sn-addid0 42402	A number that sums to itse...
sn-mul01 42403	~ mul01 without ~ ax-mulco...
sn-subeu 42404	~ negeu without ~ ax-mulco...
sn-subcl 42405	~ subcl without ~ ax-mulco...
sn-subf 42406	~ subf without ~ ax-mulcom...
resubeqsub 42407	Equivalence between real s...
subresre 42408	Subtraction restricted to ...
addinvcom 42409	A number commutes with its...
remulinvcom 42410	A left multiplicative inve...
remullid 42411	Commuted version of ~ ax-1...
sn-1ticom 42412	Lemma for ~ sn-mullid and ...
sn-mullid 42413	~ mullid without ~ ax-mulc...
sn-it1ei 42414	~ it1ei without ~ ax-mulco...
ipiiie0 42415	The multiplicative inverse...
remulcand 42416	Commuted version of ~ remu...
sn-0tie0 42417	Lemma for ~ sn-mul02 . Co...
sn-mul02 42418	~ mul02 without ~ ax-mulco...
sn-ltaddpos 42419	~ ltaddpos without ~ ax-mu...
sn-ltaddneg 42420	~ ltaddneg without ~ ax-mu...
reposdif 42421	Comparison of two numbers ...
relt0neg1 42422	Comparison of a real and i...
relt0neg2 42423	Comparison of a real and i...
sn-addlt0d 42424	The sum of negative number...
sn-addgt0d 42425	The sum of positive number...
sn-nnne0 42426	~ nnne0 without ~ ax-mulco...
reelznn0nn 42427	~ elznn0nn restated using ...
nn0addcom 42428	Addition is commutative fo...
zaddcomlem 42429	Lemma for ~ zaddcom . (Co...
zaddcom 42430	Addition is commutative fo...
renegmulnnass 42431	Move multiplication by a n...
nn0mulcom 42432	Multiplication is commutat...
zmulcomlem 42433	Lemma for ~ zmulcom . (Co...
zmulcom 42434	Multiplication is commutat...
mulgt0con1dlem 42435	Lemma for ~ mulgt0con1d . ...
mulgt0con1d 42436	Counterpart to ~ mulgt0con...
mulgt0con2d 42437	Lemma for ~ mulgt0b2d and ...
mulgt0b2d 42438	Biconditional, deductive f...
sn-ltmul2d 42439	~ ltmul2d without ~ ax-mul...
sn-ltmulgt11d 42440	~ ltmulgt11d without ~ ax-...
sn-0lt1 42441	~ 0lt1 without ~ ax-mulcom...
sn-ltp1 42442	~ ltp1 without ~ ax-mulcom...
sn-mulgt1d 42443	~ mulgt1d without ~ ax-mul...
reneg1lt0 42444	Lemma for ~ sn-inelr . (C...
sn-inelr 42445	~ inelr without ~ ax-mulco...
sn-itrere 42446	` _i ` times a real is rea...
sn-retire 42447	Commuted version of ~ sn-i...
cnreeu 42448	The reals in the expressio...
sn-sup2 42449	~ sup2 with exactly the sa...
sn-sup3d 42450	~ sup3 without ~ ax-mulcom...
sn-suprcld 42451	~ suprcld without ~ ax-mul...
sn-suprubd 42452	~ suprubd without ~ ax-mul...
nelsubginvcld 42453	The inverse of a non-subgr...
nelsubgcld 42454	A non-subgroup-member plus...
nelsubgsubcld 42455	A non-subgroup-member minu...
rnasclg 42456	The set of injected scalar...
frlmfielbas 42457	The vectors of a finite fr...
frlmfzwrd 42458	A vector of a module with ...
frlmfzowrd 42459	A vector of a module with ...
frlmfzolen 42460	The dimension of a vector ...
frlmfzowrdb 42461	The vectors of a module wi...
frlmfzoccat 42462	The concatenation of two v...
frlmvscadiccat 42463	Scalar multiplication dist...
grpasscan2d 42464	An associative cancellatio...
grpcominv1 42465	If two elements commute, t...
grpcominv2 42466	If two elements commute, t...
finsubmsubg 42467	A submonoid of a finite gr...
opprmndb 42468	A class is a monoid if and...
opprgrpb 42469	A class is a group if and ...
opprablb 42470	A class is an Abelian grou...
imacrhmcl 42471	The image of a commutative...
rimrcl1 42472	Reverse closure of a ring ...
rimrcl2 42473	Reverse closure of a ring ...
rimcnv 42474	The converse of a ring iso...
rimco 42475	The composition of ring is...
ricsym 42476	Ring isomorphism is symmet...
rictr 42477	Ring isomorphism is transi...
riccrng1 42478	Ring isomorphism preserves...
riccrng 42479	A ring is commutative if a...
domnexpgn0cl 42480	In a domain, a (nonnegativ...
drnginvrn0d 42481	A multiplicative inverse i...
drngmullcan 42482	Cancellation of a nonzero ...
drngmulrcan 42483	Cancellation of a nonzero ...
drnginvmuld 42484	Inverse of a nonzero produ...
ricdrng1 42485	A ring isomorphism maps a ...
ricdrng 42486	A ring is a division ring ...
ricfld 42487	A ring is a field if and o...
asclf1 42488	Two ways of saying the sca...
abvexp 42489	Move exponentiation in and...
fimgmcyclem 42490	Lemma for ~ fimgmcyc . (C...
fimgmcyc 42491	Version of ~ odcl2 for fin...
fidomncyc 42492	Version of ~ odcl2 for mul...
fiabv 42493	In a finite domain (a fini...
lvecgrp 42494	A vector space is a group....
lvecring 42495	The scalar component of a ...
frlm0vald 42496	All coordinates of the zer...
frlmsnic 42497	Given a free module with a...
uvccl 42498	A unit vector is a vector....
uvcn0 42499	A unit vector is nonzero. ...
pwselbasr 42500	The reverse direction of ~...
pwsgprod 42501	Finite products in a power...
psrmnd 42502	The ring of power series i...
psrbagres 42503	Restrict a bag of variable...
mplcrngd 42504	The polynomial ring is a c...
mplsubrgcl 42505	An element of a polynomial...
mhmcopsr 42506	The composition of a monoi...
mhmcoaddpsr 42507	Show that the ring homomor...
rhmcomulpsr 42508	Show that the ring homomor...
rhmpsr 42509	Provide a ring homomorphis...
rhmpsr1 42510	Provide a ring homomorphis...
mplascl0 42511	The zero scalar as a polyn...
mplascl1 42512	The one scalar as a polyno...
mplmapghm 42513	The function ` H ` mapping...
evl0 42514	The zero polynomial evalua...
evlscl 42515	A polynomial over the ring...
evlsval3 42516	Give a formula for the pol...
evlsvval 42517	Give a formula for the eva...
evlsvvvallem 42518	Lemma for ~ evlsvvval akin...
evlsvvvallem2 42519	Lemma for theorems using ~...
evlsvvval 42520	Give a formula for the eva...
evlsscaval 42521	Polynomial evaluation buil...
evlsvarval 42522	Polynomial evaluation buil...
evlsbagval 42523	Polynomial evaluation buil...
evlsexpval 42524	Polynomial evaluation buil...
evlsaddval 42525	Polynomial evaluation buil...
evlsmulval 42526	Polynomial evaluation buil...
evlsmaprhm 42527	The function ` F ` mapping...
evlsevl 42528	Evaluation in a subring is...
evlcl 42529	A polynomial over the ring...
evlvvval 42530	Give a formula for the eva...
evlvvvallem 42531	Lemma for theorems using ~...
evladdval 42532	Polynomial evaluation buil...
evlmulval 42533	Polynomial evaluation buil...
selvcllem1 42534	` T ` is an associative al...
selvcllem2 42535	` D ` is a ring homomorphi...
selvcllem3 42536	The third argument passed ...
selvcllemh 42537	Apply the third argument (...
selvcllem4 42538	The fourth argument passed...
selvcllem5 42539	The fifth argument passed ...
selvcl 42540	Closure of the "variable s...
selvval2 42541	Value of the "variable sel...
selvvvval 42542	Recover the original polyn...
evlselvlem 42543	Lemma for ~ evlselv . Use...
evlselv 42544	Evaluating a selection of ...
selvadd 42545	The "variable selection" f...
selvmul 42546	The "variable selection" f...
fsuppind 42547	Induction on functions ` F...
fsuppssindlem1 42548	Lemma for ~ fsuppssind . ...
fsuppssindlem2 42549	Lemma for ~ fsuppssind . ...
fsuppssind 42550	Induction on functions ` F...
mhpind 42551	The homogeneous polynomial...
evlsmhpvvval 42552	Give a formula for the eva...
mhphflem 42553	Lemma for ~ mhphf . Add s...
mhphf 42554	A homogeneous polynomial d...
mhphf2 42555	A homogeneous polynomial d...
mhphf3 42556	A homogeneous polynomial d...
mhphf4 42557	A homogeneous polynomial d...
prjspval 42560	Value of the projective sp...
prjsprel 42561	Utility theorem regarding ...
prjspertr 42562	The relation in ` PrjSp ` ...
prjsperref 42563	The relation in ` PrjSp ` ...
prjspersym 42564	The relation in ` PrjSp ` ...
prjsper 42565	The relation used to defin...
prjspreln0 42566	Two nonzero vectors are eq...
prjspvs 42567	A nonzero multiple of a ve...
prjsprellsp 42568	Two vectors are equivalent...
prjspeclsp 42569	The vectors equivalent to ...
prjspval2 42570	Alternate definition of pr...
prjspnval 42573	Value of the n-dimensional...
prjspnerlem 42574	A lemma showing that the e...
prjspnval2 42575	Value of the n-dimensional...
prjspner 42576	The relation used to defin...
prjspnvs 42577	A nonzero multiple of a ve...
prjspnssbas 42578	A projective point spans a...
prjspnn0 42579	A projective point is none...
0prjspnlem 42580	Lemma for ~ 0prjspn . The...
prjspnfv01 42581	Any vector is equivalent t...
prjspner01 42582	Any vector is equivalent t...
prjspner1 42583	Two vectors whose zeroth c...
0prjspnrel 42584	In the zero-dimensional pr...
0prjspn 42585	A zero-dimensional project...
prjcrvfval 42588	Value of the projective cu...
prjcrvval 42589	Value of the projective cu...
prjcrv0 42590	The "curve" (zero set) cor...
dffltz 42591	Fermat's Last Theorem (FLT...
fltmul 42592	A counterexample to FLT st...
fltdiv 42593	A counterexample to FLT st...
flt0 42594	A counterexample for FLT d...
fltdvdsabdvdsc 42595	Any factor of both ` A ` a...
fltabcoprmex 42596	A counterexample to FLT im...
fltaccoprm 42597	A counterexample to FLT wi...
fltbccoprm 42598	A counterexample to FLT wi...
fltabcoprm 42599	A counterexample to FLT wi...
infdesc 42600	Infinite descent. The hyp...
fltne 42601	If a counterexample to FLT...
flt4lem 42602	Raising a number to the fo...
flt4lem1 42603	Satisfy the antecedent use...
flt4lem2 42604	If ` A ` is even, ` B ` is...
flt4lem3 42605	Equivalent to ~ pythagtrip...
flt4lem4 42606	If the product of two copr...
flt4lem5 42607	In the context of the lemm...
flt4lem5elem 42608	Version of ~ fltaccoprm an...
flt4lem5a 42609	Part 1 of Equation 1 of ...
flt4lem5b 42610	Part 2 of Equation 1 of ...
flt4lem5c 42611	Part 2 of Equation 2 of ...
flt4lem5d 42612	Part 3 of Equation 2 of ...
flt4lem5e 42613	Satisfy the hypotheses of ...
flt4lem5f 42614	Final equation of ~...
flt4lem6 42615	Remove shared factors in a...
flt4lem7 42616	Convert ~ flt4lem5f into a...
nna4b4nsq 42617	Strengthening of Fermat's ...
fltltc 42618	` ( C ^ N ) ` is the large...
fltnltalem 42619	Lemma for ~ fltnlta . A l...
fltnlta 42620	In a Fermat counterexample...
iddii 42621	Version of ~ a1ii with the...
bicomdALT 42622	Alternate proof of ~ bicom...
alan 42623	Alias for ~ 19.26 for easi...
exor 42624	Alias for ~ 19.43 for easi...
rexor 42625	Alias for ~ r19.43 for eas...
ruvALT 42626	Alternate proof of ~ ruv w...
sn-wcdeq 42627	Alternative to ~ wcdeq and...
sq45 42628	45 squared is 2025. (Cont...
sum9cubes 42629	The sum of the first nine ...
sn-isghm 42630	Longer proof of ~ isghm , ...
aprilfools2025 42631	An abuse of notation. (Co...
nfa1w 42632	Replace ~ ax-10 in ~ nfa1 ...
eu6w 42633	Replace ~ ax-10 , ~ ax-12 ...
abbibw 42634	Replace ~ ax-10 , ~ ax-11 ...
absnw 42635	Replace ~ ax-10 , ~ ax-11 ...
euabsn2w 42636	Replace ~ ax-10 , ~ ax-11 ...
sn-tz6.12-2 42637	~ tz6.12-2 without ~ ax-10...
cu3addd 42638	Cube of sum of three numbe...
sqnegd 42639	The square of the negative...
negexpidd 42640	The sum of a real number t...
rexlimdv3d 42641	An extended version of ~ r...
3cubeslem1 42642	Lemma for ~ 3cubes . (Con...
3cubeslem2 42643	Lemma for ~ 3cubes . Used...
3cubeslem3l 42644	Lemma for ~ 3cubes . (Con...
3cubeslem3r 42645	Lemma for ~ 3cubes . (Con...
3cubeslem3 42646	Lemma for ~ 3cubes . (Con...
3cubeslem4 42647	Lemma for ~ 3cubes . This...
3cubes 42648	Every rational number is a...
rntrclfvOAI 42649	The range of the transitiv...
moxfr 42650	Transfer at-most-one betwe...
imaiinfv 42651	Indexed intersection of an...
elrfi 42652	Elementhood in a set of re...
elrfirn 42653	Elementhood in a set of re...
elrfirn2 42654	Elementhood in a set of re...
cmpfiiin 42655	In a compact topology, a s...
ismrcd1 42656	Any function from the subs...
ismrcd2 42657	Second half of ~ ismrcd1 ....
istopclsd 42658	A closure function which s...
ismrc 42659	A function is a Moore clos...
isnacs 42662	Expand definition of Noeth...
nacsfg 42663	In a Noetherian-type closu...
isnacs2 42664	Express Noetherian-type cl...
mrefg2 42665	Slight variation on finite...
mrefg3 42666	Slight variation on finite...
nacsacs 42667	A closure system of Noethe...
isnacs3 42668	A choice-free order equiva...
incssnn0 42669	Transitivity induction of ...
nacsfix 42670	An increasing sequence of ...
constmap 42671	A constant (represented wi...
mapco2g 42672	Renaming indices in a tupl...
mapco2 42673	Post-composition (renaming...
mapfzcons 42674	Extending a one-based mapp...
mapfzcons1 42675	Recover prefix mapping fro...
mapfzcons1cl 42676	A nonempty mapping has a p...
mapfzcons2 42677	Recover added element from...
mptfcl 42678	Interpret range of a maps-...
mzpclval 42683	Substitution lemma for ` m...
elmzpcl 42684	Double substitution lemma ...
mzpclall 42685	The set of all functions w...
mzpcln0 42686	Corollary of ~ mzpclall : ...
mzpcl1 42687	Defining property 1 of a p...
mzpcl2 42688	Defining property 2 of a p...
mzpcl34 42689	Defining properties 3 and ...
mzpval 42690	Value of the ` mzPoly ` fu...
dmmzp 42691	` mzPoly ` is defined for ...
mzpincl 42692	Polynomial closedness is a...
mzpconst 42693	Constant functions are pol...
mzpf 42694	A polynomial function is a...
mzpproj 42695	A projection function is p...
mzpadd 42696	The pointwise sum of two p...
mzpmul 42697	The pointwise product of t...
mzpconstmpt 42698	A constant function expres...
mzpaddmpt 42699	Sum of polynomial function...
mzpmulmpt 42700	Product of polynomial func...
mzpsubmpt 42701	The difference of two poly...
mzpnegmpt 42702	Negation of a polynomial f...
mzpexpmpt 42703	Raise a polynomial functio...
mzpindd 42704	"Structural" induction to ...
mzpmfp 42705	Relationship between multi...
mzpsubst 42706	Substituting polynomials f...
mzprename 42707	Simplified version of ~ mz...
mzpresrename 42708	A polynomial is a polynomi...
mzpcompact2lem 42709	Lemma for ~ mzpcompact2 . ...
mzpcompact2 42710	Polynomials are finitary o...
coeq0i 42711	~ coeq0 but without explic...
fzsplit1nn0 42712	Split a finite 1-based set...
eldiophb 42715	Initial expression of Diop...
eldioph 42716	Condition for a set to be ...
diophrw 42717	Renaming and adding unused...
eldioph2lem1 42718	Lemma for ~ eldioph2 . Co...
eldioph2lem2 42719	Lemma for ~ eldioph2 . Co...
eldioph2 42720	Construct a Diophantine se...
eldioph2b 42721	While Diophantine sets wer...
eldiophelnn0 42722	Remove antecedent on ` B `...
eldioph3b 42723	Define Diophantine sets in...
eldioph3 42724	Inference version of ~ eld...
ellz1 42725	Membership in a lower set ...
lzunuz 42726	The union of a lower set o...
fz1eqin 42727	Express a one-based finite...
lzenom 42728	Lower integers are countab...
elmapresaunres2 42729	~ fresaunres2 transposed t...
diophin 42730	If two sets are Diophantin...
diophun 42731	If two sets are Diophantin...
eldiophss 42732	Diophantine sets are sets ...
diophrex 42733	Projecting a Diophantine s...
eq0rabdioph 42734	This is the first of a num...
eqrabdioph 42735	Diophantine set builder fo...
0dioph 42736	The null set is Diophantin...
vdioph 42737	The "universal" set (as la...
anrabdioph 42738	Diophantine set builder fo...
orrabdioph 42739	Diophantine set builder fo...
3anrabdioph 42740	Diophantine set builder fo...
3orrabdioph 42741	Diophantine set builder fo...
2sbcrex 42742	Exchange an existential qu...
sbcrexgOLD 42743	Interchange class substitu...
2sbcrexOLD 42744	Exchange an existential qu...
sbc2rex 42745	Exchange a substitution wi...
sbc2rexgOLD 42746	Exchange a substitution wi...
sbc4rex 42747	Exchange a substitution wi...
sbc4rexgOLD 42748	Exchange a substitution wi...
sbcrot3 42749	Rotate a sequence of three...
sbcrot5 42750	Rotate a sequence of five ...
sbccomieg 42751	Commute two explicit subst...
rexrabdioph 42752	Diophantine set builder fo...
rexfrabdioph 42753	Diophantine set builder fo...
2rexfrabdioph 42754	Diophantine set builder fo...
3rexfrabdioph 42755	Diophantine set builder fo...
4rexfrabdioph 42756	Diophantine set builder fo...
6rexfrabdioph 42757	Diophantine set builder fo...
7rexfrabdioph 42758	Diophantine set builder fo...
rabdiophlem1 42759	Lemma for arithmetic dioph...
rabdiophlem2 42760	Lemma for arithmetic dioph...
elnn0rabdioph 42761	Diophantine set builder fo...
rexzrexnn0 42762	Rewrite an existential qua...
lerabdioph 42763	Diophantine set builder fo...
eluzrabdioph 42764	Diophantine set builder fo...
elnnrabdioph 42765	Diophantine set builder fo...
ltrabdioph 42766	Diophantine set builder fo...
nerabdioph 42767	Diophantine set builder fo...
dvdsrabdioph 42768	Divisibility is a Diophant...
eldioph4b 42769	Membership in ` Dioph ` ex...
eldioph4i 42770	Forward-only version of ~ ...
diophren 42771	Change variables in a Diop...
rabrenfdioph 42772	Change variable numbers in...
rabren3dioph 42773	Change variable numbers in...
fphpd 42774	Pigeonhole principle expre...
fphpdo 42775	Pigeonhole principle for s...
ctbnfien 42776	An infinite subset of a co...
fiphp3d 42777	Infinite pigeonhole princi...
rencldnfilem 42778	Lemma for ~ rencldnfi . (...
rencldnfi 42779	A set of real numbers whic...
irrapxlem1 42780	Lemma for ~ irrapx1 . Div...
irrapxlem2 42781	Lemma for ~ irrapx1 . Two...
irrapxlem3 42782	Lemma for ~ irrapx1 . By ...
irrapxlem4 42783	Lemma for ~ irrapx1 . Eli...
irrapxlem5 42784	Lemma for ~ irrapx1 . Swi...
irrapxlem6 42785	Lemma for ~ irrapx1 . Exp...
irrapx1 42786	Dirichlet's approximation ...
pellexlem1 42787	Lemma for ~ pellex . Arit...
pellexlem2 42788	Lemma for ~ pellex . Arit...
pellexlem3 42789	Lemma for ~ pellex . To e...
pellexlem4 42790	Lemma for ~ pellex . Invo...
pellexlem5 42791	Lemma for ~ pellex . Invo...
pellexlem6 42792	Lemma for ~ pellex . Doin...
pellex 42793	Every Pell equation has a ...
pell1qrval 42804	Value of the set of first-...
elpell1qr 42805	Membership in a first-quad...
pell14qrval 42806	Value of the set of positi...
elpell14qr 42807	Membership in the set of p...
pell1234qrval 42808	Value of the set of genera...
elpell1234qr 42809	Membership in the set of g...
pell1234qrre 42810	General Pell solutions are...
pell1234qrne0 42811	No solution to a Pell equa...
pell1234qrreccl 42812	General solutions of the P...
pell1234qrmulcl 42813	General solutions of the P...
pell14qrss1234 42814	A positive Pell solution i...
pell14qrre 42815	A positive Pell solution i...
pell14qrne0 42816	A positive Pell solution i...
pell14qrgt0 42817	A positive Pell solution i...
pell14qrrp 42818	A positive Pell solution i...
pell1234qrdich 42819	A general Pell solution is...
elpell14qr2 42820	A number is a positive Pel...
pell14qrmulcl 42821	Positive Pell solutions ar...
pell14qrreccl 42822	Positive Pell solutions ar...
pell14qrdivcl 42823	Positive Pell solutions ar...
pell14qrexpclnn0 42824	Lemma for ~ pell14qrexpcl ...
pell14qrexpcl 42825	Positive Pell solutions ar...
pell1qrss14 42826	First-quadrant Pell soluti...
pell14qrdich 42827	A positive Pell solution i...
pell1qrge1 42828	A Pell solution in the fir...
pell1qr1 42829	1 is a Pell solution and i...
elpell1qr2 42830	The first quadrant solutio...
pell1qrgaplem 42831	Lemma for ~ pell1qrgap . ...
pell1qrgap 42832	First-quadrant Pell soluti...
pell14qrgap 42833	Positive Pell solutions ar...
pell14qrgapw 42834	Positive Pell solutions ar...
pellqrexplicit 42835	Condition for a calculated...
infmrgelbi 42836	Any lower bound of a nonem...
pellqrex 42837	There is a nontrivial solu...
pellfundval 42838	Value of the fundamental s...
pellfundre 42839	The fundamental solution o...
pellfundge 42840	Lower bound on the fundame...
pellfundgt1 42841	Weak lower bound on the Pe...
pellfundlb 42842	A nontrivial first quadran...
pellfundglb 42843	If a real is larger than t...
pellfundex 42844	The fundamental solution a...
pellfund14gap 42845	There are no solutions bet...
pellfundrp 42846	The fundamental Pell solut...
pellfundne1 42847	The fundamental Pell solut...
reglogcl 42848	General logarithm is a rea...
reglogltb 42849	General logarithm preserve...
reglogleb 42850	General logarithm preserve...
reglogmul 42851	Multiplication law for gen...
reglogexp 42852	Power law for general log....
reglogbas 42853	General log of the base is...
reglog1 42854	General log of 1 is 0. (C...
reglogexpbas 42855	General log of a power of ...
pellfund14 42856	Every positive Pell soluti...
pellfund14b 42857	The positive Pell solution...
rmxfval 42862	Value of the X sequence. ...
rmyfval 42863	Value of the Y sequence. ...
rmspecsqrtnq 42864	The discriminant used to d...
rmspecnonsq 42865	The discriminant used to d...
qirropth 42866	This lemma implements the ...
rmspecfund 42867	The base of exponent used ...
rmxyelqirr 42868	The solutions used to cons...
rmxyelqirrOLD 42869	Obsolete version of ~ rmxy...
rmxypairf1o 42870	The function used to extra...
rmxyelxp 42871	Lemma for ~ frmx and ~ frm...
frmx 42872	The X sequence is a nonneg...
frmy 42873	The Y sequence is an integ...
rmxyval 42874	Main definition of the X a...
rmspecpos 42875	The discriminant used to d...
rmxycomplete 42876	The X and Y sequences take...
rmxynorm 42877	The X and Y sequences defi...
rmbaserp 42878	The base of exponentiation...
rmxyneg 42879	Negation law for X and Y s...
rmxyadd 42880	Addition formula for X and...
rmxy1 42881	Value of the X and Y seque...
rmxy0 42882	Value of the X and Y seque...
rmxneg 42883	Negation law (even functio...
rmx0 42884	Value of X sequence at 0. ...
rmx1 42885	Value of X sequence at 1. ...
rmxadd 42886	Addition formula for X seq...
rmyneg 42887	Negation formula for Y seq...
rmy0 42888	Value of Y sequence at 0. ...
rmy1 42889	Value of Y sequence at 1. ...
rmyadd 42890	Addition formula for Y seq...
rmxp1 42891	Special addition-of-1 form...
rmyp1 42892	Special addition of 1 form...
rmxm1 42893	Subtraction of 1 formula f...
rmym1 42894	Subtraction of 1 formula f...
rmxluc 42895	The X sequence is a Lucas ...
rmyluc 42896	The Y sequence is a Lucas ...
rmyluc2 42897	Lucas sequence property of...
rmxdbl 42898	"Double-angle formula" for...
rmydbl 42899	"Double-angle formula" for...
monotuz 42900	A function defined on an u...
monotoddzzfi 42901	A function which is odd an...
monotoddzz 42902	A function (given implicit...
oddcomabszz 42903	An odd function which take...
2nn0ind 42904	Induction on nonnegative i...
zindbi 42905	Inductively transfer a pro...
rmxypos 42906	For all nonnegative indice...
ltrmynn0 42907	The Y-sequence is strictly...
ltrmxnn0 42908	The X-sequence is strictly...
lermxnn0 42909	The X-sequence is monotoni...
rmxnn 42910	The X-sequence is defined ...
ltrmy 42911	The Y-sequence is strictly...
rmyeq0 42912	Y is zero only at zero. (...
rmyeq 42913	Y is one-to-one. (Contrib...
lermy 42914	Y is monotonic (non-strict...
rmynn 42915	` rmY ` is positive for po...
rmynn0 42916	` rmY ` is nonnegative for...
rmyabs 42917	` rmY ` commutes with ` ab...
jm2.24nn 42918	X(n) is strictly greater t...
jm2.17a 42919	First half of lemma 2.17 o...
jm2.17b 42920	Weak form of the second ha...
jm2.17c 42921	Second half of lemma 2.17 ...
jm2.24 42922	Lemma 2.24 of [JonesMatija...
rmygeid 42923	Y(n) increases faster than...
congtr 42924	A wff of the form ` A || (...
congadd 42925	If two pairs of numbers ar...
congmul 42926	If two pairs of numbers ar...
congsym 42927	Congruence mod ` A ` is a ...
congneg 42928	If two integers are congru...
congsub 42929	If two pairs of numbers ar...
congid 42930	Every integer is congruent...
mzpcong 42931	Polynomials commute with c...
congrep 42932	Every integer is congruent...
congabseq 42933	If two integers are congru...
acongid 42934	A wff like that in this th...
acongsym 42935	Symmetry of alternating co...
acongneg2 42936	Negate right side of alter...
acongtr 42937	Transitivity of alternatin...
acongeq12d 42938	Substitution deduction for...
acongrep 42939	Every integer is alternati...
fzmaxdif 42940	Bound on the difference be...
fzneg 42941	Reflection of a finite ran...
acongeq 42942	Two numbers in the fundame...
dvdsacongtr 42943	Alternating congruence pas...
coprmdvdsb 42944	Multiplication by a coprim...
modabsdifz 42945	Divisibility in terms of m...
dvdsabsmod0 42946	Divisibility in terms of m...
jm2.18 42947	Theorem 2.18 of [JonesMati...
jm2.19lem1 42948	Lemma for ~ jm2.19 . X an...
jm2.19lem2 42949	Lemma for ~ jm2.19 . (Con...
jm2.19lem3 42950	Lemma for ~ jm2.19 . (Con...
jm2.19lem4 42951	Lemma for ~ jm2.19 . Exte...
jm2.19 42952	Lemma 2.19 of [JonesMatija...
jm2.21 42953	Lemma for ~ jm2.20nn . Ex...
jm2.22 42954	Lemma for ~ jm2.20nn . Ap...
jm2.23 42955	Lemma for ~ jm2.20nn . Tr...
jm2.20nn 42956	Lemma 2.20 of [JonesMatija...
jm2.25lem1 42957	Lemma for ~ jm2.26 . (Con...
jm2.25 42958	Lemma for ~ jm2.26 . Rema...
jm2.26a 42959	Lemma for ~ jm2.26 . Reve...
jm2.26lem3 42960	Lemma for ~ jm2.26 . Use ...
jm2.26 42961	Lemma 2.26 of [JonesMatija...
jm2.15nn0 42962	Lemma 2.15 of [JonesMatija...
jm2.16nn0 42963	Lemma 2.16 of [JonesMatija...
jm2.27a 42964	Lemma for ~ jm2.27 . Reve...
jm2.27b 42965	Lemma for ~ jm2.27 . Expa...
jm2.27c 42966	Lemma for ~ jm2.27 . Forw...
jm2.27 42967	Lemma 2.27 of [JonesMatija...
jm2.27dlem1 42968	Lemma for ~ rmydioph . Su...
jm2.27dlem2 42969	Lemma for ~ rmydioph . Th...
jm2.27dlem3 42970	Lemma for ~ rmydioph . In...
jm2.27dlem4 42971	Lemma for ~ rmydioph . In...
jm2.27dlem5 42972	Lemma for ~ rmydioph . Us...
rmydioph 42973	~ jm2.27 restated in terms...
rmxdiophlem 42974	X can be expressed in term...
rmxdioph 42975	X is a Diophantine functio...
jm3.1lem1 42976	Lemma for ~ jm3.1 . (Cont...
jm3.1lem2 42977	Lemma for ~ jm3.1 . (Cont...
jm3.1lem3 42978	Lemma for ~ jm3.1 . (Cont...
jm3.1 42979	Diophantine expression for...
expdiophlem1 42980	Lemma for ~ expdioph . Fu...
expdiophlem2 42981	Lemma for ~ expdioph . Ex...
expdioph 42982	The exponential function i...
setindtr 42983	Set induction for sets con...
setindtrs 42984	Set induction scheme witho...
dford3lem1 42985	Lemma for ~ dford3 . (Con...
dford3lem2 42986	Lemma for ~ dford3 . (Con...
dford3 42987	Ordinals are precisely the...
dford4 42988	~ dford3 expressed in prim...
wopprc 42989	Unrelated: Wiener pairs t...
rpnnen3lem 42990	Lemma for ~ rpnnen3 . (Co...
rpnnen3 42991	Dedekind cut injection of ...
axac10 42992	Characterization of choice...
harinf 42993	The Hartogs number of an i...
wdom2d2 42994	Deduction for weak dominan...
ttac 42995	Tarski's theorem about cho...
pw2f1ocnv 42996	Define a bijection between...
pw2f1o2 42997	Define a bijection between...
pw2f1o2val 42998	Function value of the ~ pw...
pw2f1o2val2 42999	Membership in a mapped set...
limsuc2 43000	Limit ordinals in the sens...
wepwsolem 43001	Transfer an ordering on ch...
wepwso 43002	A well-ordering induces a ...
dnnumch1 43003	Define an enumeration of a...
dnnumch2 43004	Define an enumeration (wea...
dnnumch3lem 43005	Value of the ordinal injec...
dnnumch3 43006	Define an injection from a...
dnwech 43007	Define a well-ordering fro...
fnwe2val 43008	Lemma for ~ fnwe2 . Subst...
fnwe2lem1 43009	Lemma for ~ fnwe2 . Subst...
fnwe2lem2 43010	Lemma for ~ fnwe2 . An el...
fnwe2lem3 43011	Lemma for ~ fnwe2 . Trich...
fnwe2 43012	A well-ordering can be con...
aomclem1 43013	Lemma for ~ dfac11 . This...
aomclem2 43014	Lemma for ~ dfac11 . Succ...
aomclem3 43015	Lemma for ~ dfac11 . Succ...
aomclem4 43016	Lemma for ~ dfac11 . Limi...
aomclem5 43017	Lemma for ~ dfac11 . Comb...
aomclem6 43018	Lemma for ~ dfac11 . Tran...
aomclem7 43019	Lemma for ~ dfac11 . ` ( R...
aomclem8 43020	Lemma for ~ dfac11 . Perf...
dfac11 43021	The right-hand side of thi...
kelac1 43022	Kelley's choice, basic for...
kelac2lem 43023	Lemma for ~ kelac2 and ~ d...
kelac2 43024	Kelley's choice, most comm...
dfac21 43025	Tychonoff's theorem is a c...
islmodfg 43028	Property of a finitely gen...
islssfg 43029	Property of a finitely gen...
islssfg2 43030	Property of a finitely gen...
islssfgi 43031	Finitely spanned subspaces...
fglmod 43032	Finitely generated left mo...
lsmfgcl 43033	The sum of two finitely ge...
islnm 43036	Property of being a Noethe...
islnm2 43037	Property of being a Noethe...
lnmlmod 43038	A Noetherian left module i...
lnmlssfg 43039	A submodule of Noetherian ...
lnmlsslnm 43040	All submodules of a Noethe...
lnmfg 43041	A Noetherian left module i...
kercvrlsm 43042	The domain of a linear fun...
lmhmfgima 43043	A homomorphism maps finite...
lnmepi 43044	Epimorphic images of Noeth...
lmhmfgsplit 43045	If the kernel and range of...
lmhmlnmsplit 43046	If the kernel and range of...
lnmlmic 43047	Noetherian is an invariant...
pwssplit4 43048	Splitting for structure po...
filnm 43049	Finite left modules are No...
pwslnmlem0 43050	Zeroeth powers are Noether...
pwslnmlem1 43051	First powers are Noetheria...
pwslnmlem2 43052	A sum of powers is Noether...
pwslnm 43053	Finite powers of Noetheria...
unxpwdom3 43054	Weaker version of ~ unxpwd...
pwfi2f1o 43055	The ~ pw2f1o bijection rel...
pwfi2en 43056	Finitely supported indicat...
frlmpwfi 43057	Formal linear combinations...
gicabl 43058	Being Abelian is a group i...
imasgim 43059	A relabeling of the elemen...
isnumbasgrplem1 43060	A set which is equipollent...
harn0 43061	The Hartogs number of a se...
numinfctb 43062	A numerable infinite set c...
isnumbasgrplem2 43063	If the (to be thought of a...
isnumbasgrplem3 43064	Every nonempty numerable s...
isnumbasabl 43065	A set is numerable iff it ...
isnumbasgrp 43066	A set is numerable iff it ...
dfacbasgrp 43067	A choice equivalent in abs...
islnr 43070	Property of a left-Noether...
lnrring 43071	Left-Noetherian rings are ...
lnrlnm 43072	Left-Noetherian rings have...
islnr2 43073	Property of being a left-N...
islnr3 43074	Relate left-Noetherian rin...
lnr2i 43075	Given an ideal in a left-N...
lpirlnr 43076	Left principal ideal rings...
lnrfrlm 43077	Finite-dimensional free mo...
lnrfg 43078	Finitely-generated modules...
lnrfgtr 43079	A submodule of a finitely ...
hbtlem1 43082	Value of the leading coeff...
hbtlem2 43083	Leading coefficient ideals...
hbtlem7 43084	Functionality of leading c...
hbtlem4 43085	The leading ideal function...
hbtlem3 43086	The leading ideal function...
hbtlem5 43087	The leading ideal function...
hbtlem6 43088	There is a finite set of p...
hbt 43089	The Hilbert Basis Theorem ...
dgrsub2 43094	Subtracting two polynomial...
elmnc 43095	Property of a monic polyno...
mncply 43096	A monic polynomial is a po...
mnccoe 43097	A monic polynomial has lea...
mncn0 43098	A monic polynomial is not ...
dgraaval 43103	Value of the degree functi...
dgraalem 43104	Properties of the degree o...
dgraacl 43105	Closure of the degree func...
dgraaf 43106	Degree function on algebra...
dgraaub 43107	Upper bound on degree of a...
dgraa0p 43108	A rational polynomial of d...
mpaaeu 43109	An algebraic number has ex...
mpaaval 43110	Value of the minimal polyn...
mpaalem 43111	Properties of the minimal ...
mpaacl 43112	Minimal polynomial is a po...
mpaadgr 43113	Minimal polynomial has deg...
mpaaroot 43114	The minimal polynomial of ...
mpaamn 43115	Minimal polynomial is moni...
itgoval 43120	Value of the integral-over...
aaitgo 43121	The standard algebraic num...
itgoss 43122	An integral element is int...
itgocn 43123	All integral elements are ...
cnsrexpcl 43124	Exponentiation is closed i...
fsumcnsrcl 43125	Finite sums are closed in ...
cnsrplycl 43126	Polynomials are closed in ...
rgspnval 43127	Value of the ring-span of ...
rgspncl 43128	The ring-span of a set is ...
rgspnssid 43129	The ring-span of a set con...
rgspnmin 43130	The ring-span is contained...
rgspnid 43131	The span of a subring is i...
rngunsnply 43132	Adjoining one element to a...
flcidc 43133	Finite linear combinations...
algstr 43136	Lemma to shorten proofs of...
algbase 43137	The base set of a construc...
algaddg 43138	The additive operation of ...
algmulr 43139	The multiplicative operati...
algsca 43140	The set of scalars of a co...
algvsca 43141	The scalar product operati...
mendval 43142	Value of the module endomo...
mendbas 43143	Base set of the module end...
mendplusgfval 43144	Addition in the module end...
mendplusg 43145	A specific addition in the...
mendmulrfval 43146	Multiplication in the modu...
mendmulr 43147	A specific multiplication ...
mendsca 43148	The module endomorphism al...
mendvscafval 43149	Scalar multiplication in t...
mendvsca 43150	A specific scalar multipli...
mendring 43151	The module endomorphism al...
mendlmod 43152	The module endomorphism al...
mendassa 43153	The module endomorphism al...
idomodle 43154	Limit on the number of ` N...
fiuneneq 43155	Two finite sets of equal s...
idomsubgmo 43156	The units of an integral d...
proot1mul 43157	Any primitive ` N ` -th ro...
proot1hash 43158	If an integral domain has ...
proot1ex 43159	The complex field has prim...
mon1psubm 43162	Monic polynomials are a mu...
deg1mhm 43163	Homomorphic property of th...
cytpfn 43164	Functionality of the cyclo...
cytpval 43165	Substitutions for the Nth ...
fgraphopab 43166	Express a function as a su...
fgraphxp 43167	Express a function as a su...
hausgraph 43168	The graph of a continuous ...
r1sssucd 43173	Deductive form of ~ r1sssu...
iocunico 43174	Split an open interval int...
iocinico 43175	The intersection of two se...
iocmbl 43176	An open-below, closed-abov...
cnioobibld 43177	A bounded, continuous func...
arearect 43178	The area of a rectangle wh...
areaquad 43179	The area of a quadrilatera...
uniel 43180	Two ways to say a union is...
unielss 43181	Two ways to say the union ...
unielid 43182	Two ways to say the union ...
ssunib 43183	Two ways to say a class is...
rp-intrabeq 43184	Equality theorem for supre...
rp-unirabeq 43185	Equality theorem for infim...
onmaxnelsup 43186	Two ways to say the maximu...
onsupneqmaxlim0 43187	If the supremum of a class...
onsupcl2 43188	The supremum of a set of o...
onuniintrab 43189	The union of a set of ordi...
onintunirab 43190	The intersection of a non-...
onsupnmax 43191	If the union of a class of...
onsupuni 43192	The supremum of a set of o...
onsupuni2 43193	The supremum of a set of o...
onsupintrab 43194	The supremum of a set of o...
onsupintrab2 43195	The supremum of a set of o...
onsupcl3 43196	The supremum of a set of o...
onsupex3 43197	The supremum of a set of o...
onuniintrab2 43198	The union of a set of ordi...
oninfint 43199	The infimum of a non-empty...
oninfunirab 43200	The infimum of a non-empty...
oninfcl2 43201	The infimum of a non-empty...
onsupmaxb 43202	The union of a class of or...
onexgt 43203	For any ordinal, there is ...
onexomgt 43204	For any ordinal, there is ...
omlimcl2 43205	The product of a limit ord...
onexlimgt 43206	For any ordinal, there is ...
onexoegt 43207	For any ordinal, there is ...
oninfex2 43208	The infimum of a non-empty...
onsupeqmax 43209	Condition when the supremu...
onsupeqnmax 43210	Condition when the supremu...
onsuplub 43211	The supremum of a set of o...
onsupnub 43212	An upper bound of a set of...
onfisupcl 43213	Sufficient condition when ...
onelord 43214	Every element of a ordinal...
onepsuc 43215	Every ordinal is less than...
epsoon 43216	The ordinals are strictly ...
epirron 43217	The strict order on the or...
oneptr 43218	The strict order on the or...
oneltr 43219	The elementhood relation o...
oneptri 43220	The strict, complete (line...
oneltri 43221	The elementhood relation o...
ordeldif 43222	Membership in the differen...
ordeldifsucon 43223	Membership in the differen...
ordeldif1o 43224	Membership in the differen...
ordne0gt0 43225	Ordinal zero is less than ...
ondif1i 43226	Ordinal zero is less than ...
onsucelab 43227	The successor of every ord...
dflim6 43228	A limit ordinal is a non-z...
limnsuc 43229	A limit ordinal is not an ...
onsucss 43230	If one ordinal is less tha...
ordnexbtwnsuc 43231	For any distinct pair of o...
orddif0suc 43232	For any distinct pair of o...
onsucf1lem 43233	For ordinals, the successo...
onsucf1olem 43234	The successor operation is...
onsucrn 43235	The successor operation is...
onsucf1o 43236	The successor operation is...
dflim7 43237	A limit ordinal is a non-z...
onov0suclim 43238	Compactly express rules fo...
oa0suclim 43239	Closed form expression of ...
om0suclim 43240	Closed form expression of ...
oe0suclim 43241	Closed form expression of ...
oaomoecl 43242	The operations of addition...
onsupsucismax 43243	If the union of a set of o...
onsssupeqcond 43244	If for every element of a ...
limexissup 43245	An ordinal which is a limi...
limiun 43246	A limit ordinal is the uni...
limexissupab 43247	An ordinal which is a limi...
om1om1r 43248	Ordinal one is both a left...
oe0rif 43249	Ordinal zero raised to any...
oasubex 43250	While subtraction can't be...
nnamecl 43251	Natural numbers are closed...
onsucwordi 43252	The successor operation pr...
oalim2cl 43253	The ordinal sum of any ord...
oaltublim 43254	Given ` C ` is a limit ord...
oaordi3 43255	Ordinal addition of the sa...
oaord3 43256	When the same ordinal is a...
1oaomeqom 43257	Ordinal one plus omega is ...
oaabsb 43258	The right addend absorbs t...
oaordnrex 43259	When omega is added on the...
oaordnr 43260	When the same ordinal is a...
omge1 43261	Any non-zero ordinal produ...
omge2 43262	Any non-zero ordinal produ...
omlim2 43263	The non-zero product with ...
omord2lim 43264	Given a limit ordinal, the...
omord2i 43265	Ordinal multiplication of ...
omord2com 43266	When the same non-zero ord...
2omomeqom 43267	Ordinal two times omega is...
omnord1ex 43268	When omega is multiplied o...
omnord1 43269	When the same non-zero ord...
oege1 43270	Any non-zero ordinal power...
oege2 43271	Any power of an ordinal at...
rp-oelim2 43272	The power of an ordinal at...
oeord2lim 43273	Given a limit ordinal, the...
oeord2i 43274	Ordinal exponentiation of ...
oeord2com 43275	When the same base at leas...
nnoeomeqom 43276	Any natural number at leas...
df3o2 43277	Ordinal 3 is the unordered...
df3o3 43278	Ordinal 3, fully expanded....
oenord1ex 43279	When ordinals two and thre...
oenord1 43280	When two ordinals (both at...
oaomoencom 43281	Ordinal addition, multipli...
oenassex 43282	Ordinal two raised to two ...
oenass 43283	Ordinal exponentiation is ...
cantnftermord 43284	For terms of the form of a...
cantnfub 43285	Given a finite number of t...
cantnfub2 43286	Given a finite number of t...
bropabg 43287	Equivalence for two classe...
cantnfresb 43288	A Cantor normal form which...
cantnf2 43289	For every ordinal, ` A ` ,...
oawordex2 43290	If ` C ` is between ` A ` ...
nnawordexg 43291	If an ordinal, ` B ` , is ...
succlg 43292	Closure law for ordinal su...
dflim5 43293	A limit ordinal is either ...
oacl2g 43294	Closure law for ordinal ad...
onmcl 43295	If an ordinal is less than...
omabs2 43296	Ordinal multiplication by ...
omcl2 43297	Closure law for ordinal mu...
omcl3g 43298	Closure law for ordinal mu...
ordsssucb 43299	An ordinal number is less ...
tfsconcatlem 43300	Lemma for ~ tfsconcatun . ...
tfsconcatun 43301	The concatenation of two t...
tfsconcatfn 43302	The concatenation of two t...
tfsconcatfv1 43303	An early value of the conc...
tfsconcatfv2 43304	A latter value of the conc...
tfsconcatfv 43305	The value of the concatena...
tfsconcatrn 43306	The range of the concatena...
tfsconcatfo 43307	The concatenation of two t...
tfsconcatb0 43308	The concatentation with th...
tfsconcat0i 43309	The concatentation with th...
tfsconcat0b 43310	The concatentation with th...
tfsconcat00 43311	The concatentation of two ...
tfsconcatrev 43312	If the domain of a transfi...
tfsconcatrnss12 43313	The range of the concatena...
tfsconcatrnss 43314	The concatenation of trans...
tfsconcatrnsson 43315	The concatenation of trans...
tfsnfin 43316	A transfinite sequence is ...
rp-tfslim 43317	The limit of a sequence of...
ofoafg 43318	Addition operator for func...
ofoaf 43319	Addition operator for func...
ofoafo 43320	Addition operator for func...
ofoacl 43321	Closure law for component ...
ofoaid1 43322	Identity law for component...
ofoaid2 43323	Identity law for component...
ofoaass 43324	Component-wise addition of...
ofoacom 43325	Component-wise addition of...
naddcnff 43326	Addition operator for Cant...
naddcnffn 43327	Addition operator for Cant...
naddcnffo 43328	Addition of Cantor normal ...
naddcnfcl 43329	Closure law for component-...
naddcnfcom 43330	Component-wise ordinal add...
naddcnfid1 43331	Identity law for component...
naddcnfid2 43332	Identity law for component...
naddcnfass 43333	Component-wise addition of...
onsucunifi 43334	The successor to the union...
sucunisn 43335	The successor to the union...
onsucunipr 43336	The successor to the union...
onsucunitp 43337	The successor to the union...
oaun3lem1 43338	The class of all ordinal s...
oaun3lem2 43339	The class of all ordinal s...
oaun3lem3 43340	The class of all ordinal s...
oaun3lem4 43341	The class of all ordinal s...
rp-abid 43342	Two ways to express a clas...
oadif1lem 43343	Express the set difference...
oadif1 43344	Express the set difference...
oaun2 43345	Ordinal addition as a unio...
oaun3 43346	Ordinal addition as a unio...
naddov4 43347	Alternate expression for n...
nadd2rabtr 43348	The set of ordinals which ...
nadd2rabord 43349	The set of ordinals which ...
nadd2rabex 43350	The class of ordinals whic...
nadd2rabon 43351	The set of ordinals which ...
nadd1rabtr 43352	The set of ordinals which ...
nadd1rabord 43353	The set of ordinals which ...
nadd1rabex 43354	The class of ordinals whic...
nadd1rabon 43355	The set of ordinals which ...
nadd1suc 43356	Natural addition with 1 is...
naddass1 43357	Natural addition of ordina...
naddgeoa 43358	Natural addition results i...
naddonnn 43359	Natural addition with a na...
naddwordnexlem0 43360	When ` A ` is the sum of a...
naddwordnexlem1 43361	When ` A ` is the sum of a...
naddwordnexlem2 43362	When ` A ` is the sum of a...
naddwordnexlem3 43363	When ` A ` is the sum of a...
oawordex3 43364	When ` A ` is the sum of a...
naddwordnexlem4 43365	When ` A ` is the sum of a...
ordsssucim 43366	If an ordinal is less than...
insucid 43367	The intersection of a clas...
om2 43368	Two ways to double an ordi...
oaltom 43369	Multiplication eventually ...
oe2 43370	Two ways to square an ordi...
omltoe 43371	Exponentiation eventually ...
abeqabi 43372	Generalized condition for ...
abpr 43373	Condition for a class abst...
abtp 43374	Condition for a class abst...
ralopabb 43375	Restricted universal quant...
fpwfvss 43376	Functions into a powerset ...
sdomne0 43377	A class that strictly domi...
sdomne0d 43378	A class that strictly domi...
safesnsupfiss 43379	If ` B ` is a finite subse...
safesnsupfiub 43380	If ` B ` is a finite subse...
safesnsupfidom1o 43381	If ` B ` is a finite subse...
safesnsupfilb 43382	If ` B ` is a finite subse...
isoeq145d 43383	Equality deduction for iso...
resisoeq45d 43384	Equality deduction for equ...
negslem1 43385	An equivalence between ide...
nvocnvb 43386	Equivalence to saying the ...
rp-brsslt 43387	Binary relation form of a ...
nla0002 43388	Extending a linear order t...
nla0003 43389	Extending a linear order t...
nla0001 43390	Extending a linear order t...
faosnf0.11b 43391	` B ` is called a non-limi...
dfno2 43392	A surreal number, in the f...
onnog 43393	Every ordinal maps to a su...
onnobdayg 43394	Every ordinal maps to a su...
bdaybndex 43395	Bounds formed from the bir...
bdaybndbday 43396	Bounds formed from the bir...
onno 43397	Every ordinal maps to a su...
onnoi 43398	Every ordinal maps to a su...
0no 43399	Ordinal zero maps to a sur...
1no 43400	Ordinal one maps to a surr...
2no 43401	Ordinal two maps to a surr...
3no 43402	Ordinal three maps to a su...
4no 43403	Ordinal four maps to a sur...
fnimafnex 43404	The functional image of a ...
nlimsuc 43405	A successor is not a limit...
nlim1NEW 43406	1 is not a limit ordinal. ...
nlim2NEW 43407	2 is not a limit ordinal. ...
nlim3 43408	3 is not a limit ordinal. ...
nlim4 43409	4 is not a limit ordinal. ...
oa1un 43410	Given ` A e. On ` , let ` ...
oa1cl 43411	` A +o 1o ` is in ` On ` ....
0finon 43412	0 is a finite ordinal. Se...
1finon 43413	1 is a finite ordinal. Se...
2finon 43414	2 is a finite ordinal. Se...
3finon 43415	3 is a finite ordinal. Se...
4finon 43416	4 is a finite ordinal. Se...
finona1cl 43417	The finite ordinals are cl...
finonex 43418	The finite ordinals are a ...
fzunt 43419	Union of two adjacent fini...
fzuntd 43420	Union of two adjacent fini...
fzunt1d 43421	Union of two overlapping f...
fzuntgd 43422	Union of two adjacent or o...
ifpan123g 43423	Conjunction of conditional...
ifpan23 43424	Conjunction of conditional...
ifpdfor2 43425	Define or in terms of cond...
ifporcor 43426	Corollary of commutation o...
ifpdfan2 43427	Define and with conditiona...
ifpancor 43428	Corollary of commutation o...
ifpdfor 43429	Define or in terms of cond...
ifpdfan 43430	Define and with conditiona...
ifpbi2 43431	Equivalence theorem for co...
ifpbi3 43432	Equivalence theorem for co...
ifpim1 43433	Restate implication as con...
ifpnot 43434	Restate negated wff as con...
ifpid2 43435	Restate wff as conditional...
ifpim2 43436	Restate implication as con...
ifpbi23 43437	Equivalence theorem for co...
ifpbiidcor 43438	Restatement of ~ biid . (...
ifpbicor 43439	Corollary of commutation o...
ifpxorcor 43440	Corollary of commutation o...
ifpbi1 43441	Equivalence theorem for co...
ifpnot23 43442	Negation of conditional lo...
ifpnotnotb 43443	Factor conditional logic o...
ifpnorcor 43444	Corollary of commutation o...
ifpnancor 43445	Corollary of commutation o...
ifpnot23b 43446	Negation of conditional lo...
ifpbiidcor2 43447	Restatement of ~ biid . (...
ifpnot23c 43448	Negation of conditional lo...
ifpnot23d 43449	Negation of conditional lo...
ifpdfnan 43450	Define nand as conditional...
ifpdfxor 43451	Define xor as conditional ...
ifpbi12 43452	Equivalence theorem for co...
ifpbi13 43453	Equivalence theorem for co...
ifpbi123 43454	Equivalence theorem for co...
ifpidg 43455	Restate wff as conditional...
ifpid3g 43456	Restate wff as conditional...
ifpid2g 43457	Restate wff as conditional...
ifpid1g 43458	Restate wff as conditional...
ifpim23g 43459	Restate implication as con...
ifpim3 43460	Restate implication as con...
ifpnim1 43461	Restate negated implicatio...
ifpim4 43462	Restate implication as con...
ifpnim2 43463	Restate negated implicatio...
ifpim123g 43464	Implication of conditional...
ifpim1g 43465	Implication of conditional...
ifp1bi 43466	Substitute the first eleme...
ifpbi1b 43467	When the first variable is...
ifpimimb 43468	Factor conditional logic o...
ifpororb 43469	Factor conditional logic o...
ifpananb 43470	Factor conditional logic o...
ifpnannanb 43471	Factor conditional logic o...
ifpor123g 43472	Disjunction of conditional...
ifpimim 43473	Consequnce of implication....
ifpbibib 43474	Factor conditional logic o...
ifpxorxorb 43475	Factor conditional logic o...
rp-fakeimass 43476	A special case where impli...
rp-fakeanorass 43477	A special case where a mix...
rp-fakeoranass 43478	A special case where a mix...
rp-fakeinunass 43479	A special case where a mix...
rp-fakeuninass 43480	A special case where a mix...
rp-isfinite5 43481	A set is said to be finite...
rp-isfinite6 43482	A set is said to be finite...
intabssd 43483	When for each element ` y ...
eu0 43484	There is only one empty se...
epelon2 43485	Over the ordinal numbers, ...
ontric3g 43486	For all ` x , y e. On ` , ...
dfsucon 43487	` A ` is called a successo...
snen1g 43488	A singleton is equinumerou...
snen1el 43489	A singleton is equinumerou...
sn1dom 43490	A singleton is dominated b...
pr2dom 43491	An unordered pair is domin...
tr3dom 43492	An unordered triple is dom...
ensucne0 43493	A class equinumerous to a ...
ensucne0OLD 43494	A class equinumerous to a ...
dfom6 43495	Let ` _om ` be defined to ...
infordmin 43496	` _om ` is the smallest in...
iscard4 43497	Two ways to express the pr...
minregex 43498	Given any cardinal number ...
minregex2 43499	Given any cardinal number ...
iscard5 43500	Two ways to express the pr...
elrncard 43501	Let us define a cardinal n...
harval3 43502	` ( har `` A ) ` is the le...
harval3on 43503	For any ordinal number ` A...
omssrncard 43504	All natural numbers are ca...
0iscard 43505	0 is a cardinal number. (...
1iscard 43506	1 is a cardinal number. (...
omiscard 43507	` _om ` is a cardinal numb...
sucomisnotcard 43508	` _om +o 1o ` is not a car...
nna1iscard 43509	For any natural number, th...
har2o 43510	The least cardinal greater...
en2pr 43511	A class is equinumerous to...
pr2cv 43512	If an unordered pair is eq...
pr2el1 43513	If an unordered pair is eq...
pr2cv1 43514	If an unordered pair is eq...
pr2el2 43515	If an unordered pair is eq...
pr2cv2 43516	If an unordered pair is eq...
pren2 43517	An unordered pair is equin...
pr2eldif1 43518	If an unordered pair is eq...
pr2eldif2 43519	If an unordered pair is eq...
pren2d 43520	A pair of two distinct set...
aleph1min 43521	` ( aleph `` 1o ) ` is the...
alephiso2 43522	` aleph ` is a strictly or...
alephiso3 43523	` aleph ` is a strictly or...
pwelg 43524	The powerclass is an eleme...
pwinfig 43525	The powerclass of an infin...
pwinfi2 43526	The powerclass of an infin...
pwinfi3 43527	The powerclass of an infin...
pwinfi 43528	The powerclass of an infin...
fipjust 43529	A definition of the finite...
cllem0 43530	The class of all sets with...
superficl 43531	The class of all supersets...
superuncl 43532	The class of all supersets...
ssficl 43533	The class of all subsets o...
ssuncl 43534	The class of all subsets o...
ssdifcl 43535	The class of all subsets o...
sssymdifcl 43536	The class of all subsets o...
fiinfi 43537	If two classes have the fi...
rababg 43538	Condition when restricted ...
elinintab 43539	Two ways of saying a set i...
elmapintrab 43540	Two ways to say a set is a...
elinintrab 43541	Two ways of saying a set i...
inintabss 43542	Upper bound on intersectio...
inintabd 43543	Value of the intersection ...
xpinintabd 43544	Value of the intersection ...
relintabex 43545	If the intersection of a c...
elcnvcnvintab 43546	Two ways of saying a set i...
relintab 43547	Value of the intersection ...
nonrel 43548	A non-relation is equal to...
elnonrel 43549	Only an ordered pair where...
cnvssb 43550	Subclass theorem for conve...
relnonrel 43551	The non-relation part of a...
cnvnonrel 43552	The converse of the non-re...
brnonrel 43553	A non-relation cannot rela...
dmnonrel 43554	The domain of the non-rela...
rnnonrel 43555	The range of the non-relat...
resnonrel 43556	A restriction of the non-r...
imanonrel 43557	An image under the non-rel...
cononrel1 43558	Composition with the non-r...
cononrel2 43559	Composition with the non-r...
elmapintab 43560	Two ways to say a set is a...
fvnonrel 43561	The function value of any ...
elinlem 43562	Two ways to say a set is a...
elcnvcnvlem 43563	Two ways to say a set is a...
cnvcnvintabd 43564	Value of the relationship ...
elcnvlem 43565	Two ways to say a set is a...
elcnvintab 43566	Two ways of saying a set i...
cnvintabd 43567	Value of the converse of t...
undmrnresiss 43568	Two ways of saying the ide...
reflexg 43569	Two ways of saying a relat...
cnvssco 43570	A condition weaker than re...
refimssco 43571	Reflexive relations are su...
cleq2lem 43572	Equality implies bijection...
cbvcllem 43573	Change of bound variable i...
clublem 43574	If a superset ` Y ` of ` X...
clss2lem 43575	The closure of a property ...
dfid7 43576	Definition of identity rel...
mptrcllem 43577	Show two versions of a clo...
cotrintab 43578	The intersection of a clas...
rclexi 43579	The reflexive closure of a...
rtrclexlem 43580	Existence of relation impl...
rtrclex 43581	The reflexive-transitive c...
trclubgNEW 43582	If a relation exists then ...
trclubNEW 43583	If a relation exists then ...
trclexi 43584	The transitive closure of ...
rtrclexi 43585	The reflexive-transitive c...
clrellem 43586	When the property ` ps ` h...
clcnvlem 43587	When ` A ` , an upper boun...
cnvtrucl0 43588	The converse of the trivia...
cnvrcl0 43589	The converse of the reflex...
cnvtrcl0 43590	The converse of the transi...
dmtrcl 43591	The domain of the transiti...
rntrcl 43592	The range of the transitiv...
dfrtrcl5 43593	Definition of reflexive-tr...
trcleq2lemRP 43594	Equality implies bijection...
sqrtcvallem1 43595	Two ways of saying a compl...
reabsifneg 43596	Alternate expression for t...
reabsifnpos 43597	Alternate expression for t...
reabsifpos 43598	Alternate expression for t...
reabsifnneg 43599	Alternate expression for t...
reabssgn 43600	Alternate expression for t...
sqrtcvallem2 43601	Equivalent to saying that ...
sqrtcvallem3 43602	Equivalent to saying that ...
sqrtcvallem4 43603	Equivalent to saying that ...
sqrtcvallem5 43604	Equivalent to saying that ...
sqrtcval 43605	Explicit formula for the c...
sqrtcval2 43606	Explicit formula for the c...
resqrtval 43607	Real part of the complex s...
imsqrtval 43608	Imaginary part of the comp...
resqrtvalex 43609	Example for ~ resqrtval . ...
imsqrtvalex 43610	Example for ~ imsqrtval . ...
al3im 43611	Version of ~ ax-4 for a ne...
intima0 43612	Two ways of expressing the...
elimaint 43613	Element of image of inters...
cnviun 43614	Converse of indexed union....
imaiun1 43615	The image of an indexed un...
coiun1 43616	Composition with an indexe...
elintima 43617	Element of intersection of...
intimass 43618	The image under the inters...
intimass2 43619	The image under the inters...
intimag 43620	Requirement for the image ...
intimasn 43621	Two ways to express the im...
intimasn2 43622	Two ways to express the im...
ss2iundf 43623	Subclass theorem for index...
ss2iundv 43624	Subclass theorem for index...
cbviuneq12df 43625	Rule used to change the bo...
cbviuneq12dv 43626	Rule used to change the bo...
conrel1d 43627	Deduction about compositio...
conrel2d 43628	Deduction about compositio...
trrelind 43629	The intersection of transi...
xpintrreld 43630	The intersection of a tran...
restrreld 43631	The restriction of a trans...
trrelsuperreldg 43632	Concrete construction of a...
trficl 43633	The class of all transitiv...
cnvtrrel 43634	The converse of a transiti...
trrelsuperrel2dg 43635	Concrete construction of a...
dfrcl2 43638	Reflexive closure of a rel...
dfrcl3 43639	Reflexive closure of a rel...
dfrcl4 43640	Reflexive closure of a rel...
relexp2 43641	A set operated on by the r...
relexpnul 43642	If the domain and range of...
eliunov2 43643	Membership in the indexed ...
eltrclrec 43644	Membership in the indexed ...
elrtrclrec 43645	Membership in the indexed ...
briunov2 43646	Two classes related by the...
brmptiunrelexpd 43647	If two elements are connec...
fvmptiunrelexplb0d 43648	If the indexed union range...
fvmptiunrelexplb0da 43649	If the indexed union range...
fvmptiunrelexplb1d 43650	If the indexed union range...
brfvid 43651	If two elements are connec...
brfvidRP 43652	If two elements are connec...
fvilbd 43653	A set is a subset of its i...
fvilbdRP 43654	A set is a subset of its i...
brfvrcld 43655	If two elements are connec...
brfvrcld2 43656	If two elements are connec...
fvrcllb0d 43657	A restriction of the ident...
fvrcllb0da 43658	A restriction of the ident...
fvrcllb1d 43659	A set is a subset of its i...
brtrclrec 43660	Two classes related by the...
brrtrclrec 43661	Two classes related by the...
briunov2uz 43662	Two classes related by the...
eliunov2uz 43663	Membership in the indexed ...
ov2ssiunov2 43664	Any particular operator va...
relexp0eq 43665	The zeroth power of relati...
iunrelexp0 43666	Simplification of zeroth p...
relexpxpnnidm 43667	Any positive power of a Ca...
relexpiidm 43668	Any power of any restricti...
relexpss1d 43669	The relational power of a ...
comptiunov2i 43670	The composition two indexe...
corclrcl 43671	The reflexive closure is i...
iunrelexpmin1 43672	The indexed union of relat...
relexpmulnn 43673	With exponents limited to ...
relexpmulg 43674	With ordered exponents, th...
trclrelexplem 43675	The union of relational po...
iunrelexpmin2 43676	The indexed union of relat...
relexp01min 43677	With exponents limited to ...
relexp1idm 43678	Repeated raising a relatio...
relexp0idm 43679	Repeated raising a relatio...
relexp0a 43680	Absorption law for zeroth ...
relexpxpmin 43681	The composition of powers ...
relexpaddss 43682	The composition of two pow...
iunrelexpuztr 43683	The indexed union of relat...
dftrcl3 43684	Transitive closure of a re...
brfvtrcld 43685	If two elements are connec...
fvtrcllb1d 43686	A set is a subset of its i...
trclfvcom 43687	The transitive closure of ...
cnvtrclfv 43688	The converse of the transi...
cotrcltrcl 43689	The transitive closure is ...
trclimalb2 43690	Lower bound for image unde...
brtrclfv2 43691	Two ways to indicate two e...
trclfvdecomr 43692	The transitive closure of ...
trclfvdecoml 43693	The transitive closure of ...
dmtrclfvRP 43694	The domain of the transiti...
rntrclfvRP 43695	The range of the transitiv...
rntrclfv 43696	The range of the transitiv...
dfrtrcl3 43697	Reflexive-transitive closu...
brfvrtrcld 43698	If two elements are connec...
fvrtrcllb0d 43699	A restriction of the ident...
fvrtrcllb0da 43700	A restriction of the ident...
fvrtrcllb1d 43701	A set is a subset of its i...
dfrtrcl4 43702	Reflexive-transitive closu...
corcltrcl 43703	The composition of the ref...
cortrcltrcl 43704	Composition with the refle...
corclrtrcl 43705	Composition with the refle...
cotrclrcl 43706	The composition of the ref...
cortrclrcl 43707	Composition with the refle...
cotrclrtrcl 43708	Composition with the refle...
cortrclrtrcl 43709	The reflexive-transitive c...
frege77d 43710	If the images of both ` { ...
frege81d 43711	If the image of ` U ` is a...
frege83d 43712	If the image of the union ...
frege96d 43713	If ` C ` follows ` A ` in ...
frege87d 43714	If the images of both ` { ...
frege91d 43715	If ` B ` follows ` A ` in ...
frege97d 43716	If ` A ` contains all elem...
frege98d 43717	If ` C ` follows ` A ` and...
frege102d 43718	If either ` A ` and ` C ` ...
frege106d 43719	If ` B ` follows ` A ` in ...
frege108d 43720	If either ` A ` and ` C ` ...
frege109d 43721	If ` A ` contains all elem...
frege114d 43722	If either ` R ` relates ` ...
frege111d 43723	If either ` A ` and ` C ` ...
frege122d 43724	If ` F ` is a function, ` ...
frege124d 43725	If ` F ` is a function, ` ...
frege126d 43726	If ` F ` is a function, ` ...
frege129d 43727	If ` F ` is a function and...
frege131d 43728	If ` F ` is a function and...
frege133d 43729	If ` F ` is a function and...
dfxor4 43730	Express exclusive-or in te...
dfxor5 43731	Express exclusive-or in te...
df3or2 43732	Express triple-or in terms...
df3an2 43733	Express triple-and in term...
nev 43734	Express that not every set...
0pssin 43735	Express that an intersecti...
dfhe2 43738	The property of relation `...
dfhe3 43739	The property of relation `...
heeq12 43740	Equality law for relations...
heeq1 43741	Equality law for relations...
heeq2 43742	Equality law for relations...
sbcheg 43743	Distribute proper substitu...
hess 43744	Subclass law for relations...
xphe 43745	Any Cartesian product is h...
0he 43746	The empty relation is here...
0heALT 43747	The empty relation is here...
he0 43748	Any relation is hereditary...
unhe1 43749	The union of two relations...
snhesn 43750	Any singleton is hereditar...
idhe 43751	The identity relation is h...
psshepw 43752	The relation between sets ...
sshepw 43753	The relation between sets ...
rp-simp2-frege 43756	Simplification of triple c...
rp-simp2 43757	Simplification of triple c...
rp-frege3g 43758	Add antecedent to ~ ax-fre...
frege3 43759	Add antecedent to ~ ax-fre...
rp-misc1-frege 43760	Double-use of ~ ax-frege2 ...
rp-frege24 43761	Introducing an embedded an...
rp-frege4g 43762	Deduction related to distr...
frege4 43763	Special case of closed for...
frege5 43764	A closed form of ~ syl . ...
rp-7frege 43765	Distribute antecedent and ...
rp-4frege 43766	Elimination of a nested an...
rp-6frege 43767	Elimination of a nested an...
rp-8frege 43768	Eliminate antecedent when ...
rp-frege25 43769	Closed form for ~ a1dd . ...
frege6 43770	A closed form of ~ imim2d ...
axfrege8 43771	Swap antecedents. Identic...
frege7 43772	A closed form of ~ syl6 . ...
frege26 43774	Identical to ~ idd . Prop...
frege27 43775	We cannot (at the same tim...
frege9 43776	Closed form of ~ syl with ...
frege12 43777	A closed form of ~ com23 ....
frege11 43778	Elimination of a nested an...
frege24 43779	Closed form for ~ a1d . D...
frege16 43780	A closed form of ~ com34 ....
frege25 43781	Closed form for ~ a1dd . ...
frege18 43782	Closed form of a syllogism...
frege22 43783	A closed form of ~ com45 ....
frege10 43784	Result commuting anteceden...
frege17 43785	A closed form of ~ com3l ....
frege13 43786	A closed form of ~ com3r ....
frege14 43787	Closed form of a deduction...
frege19 43788	A closed form of ~ syl6 . ...
frege23 43789	Syllogism followed by rota...
frege15 43790	A closed form of ~ com4r ....
frege21 43791	Replace antecedent in ante...
frege20 43792	A closed form of ~ syl8 . ...
axfrege28 43793	Contraposition. Identical...
frege29 43795	Closed form of ~ con3d . ...
frege30 43796	Commuted, closed form of ~...
axfrege31 43797	Identical to ~ notnotr . ...
frege32 43799	Deduce ~ con1 from ~ con3 ...
frege33 43800	If ` ph ` or ` ps ` takes ...
frege34 43801	If as a consequence of the...
frege35 43802	Commuted, closed form of ~...
frege36 43803	The case in which ` ps ` i...
frege37 43804	If ` ch ` is a necessary c...
frege38 43805	Identical to ~ pm2.21 . P...
frege39 43806	Syllogism between ~ pm2.18...
frege40 43807	Anything implies ~ pm2.18 ...
axfrege41 43808	Identical to ~ notnot . A...
frege42 43810	Not not ~ id . Propositio...
frege43 43811	If there is a choice only ...
frege44 43812	Similar to a commuted ~ pm...
frege45 43813	Deduce ~ pm2.6 from ~ con1...
frege46 43814	If ` ps ` holds when ` ph ...
frege47 43815	Deduce consequence follows...
frege48 43816	Closed form of syllogism w...
frege49 43817	Closed form of deduction w...
frege50 43818	Closed form of ~ jaoi . P...
frege51 43819	Compare with ~ jaod . Pro...
axfrege52a 43820	Justification for ~ ax-fre...
frege52aid 43822	The case when the content ...
frege53aid 43823	Specialization of ~ frege5...
frege53a 43824	Lemma for ~ frege55a . Pr...
axfrege54a 43825	Justification for ~ ax-fre...
frege54cor0a 43827	Synonym for logical equiva...
frege54cor1a 43828	Reflexive equality. (Cont...
frege55aid 43829	Lemma for ~ frege57aid . ...
frege55lem1a 43830	Necessary deduction regard...
frege55lem2a 43831	Core proof of Proposition ...
frege55a 43832	Proposition 55 of [Frege18...
frege55cor1a 43833	Proposition 55 of [Frege18...
frege56aid 43834	Lemma for ~ frege57aid . ...
frege56a 43835	Proposition 56 of [Frege18...
frege57aid 43836	This is the all important ...
frege57a 43837	Analogue of ~ frege57aid ....
axfrege58a 43838	Identical to ~ anifp . Ju...
frege58acor 43840	Lemma for ~ frege59a . (C...
frege59a 43841	A kind of Aristotelian inf...
frege60a 43842	Swap antecedents of ~ ax-f...
frege61a 43843	Lemma for ~ frege65a . Pr...
frege62a 43844	A kind of Aristotelian inf...
frege63a 43845	Proposition 63 of [Frege18...
frege64a 43846	Lemma for ~ frege65a . Pr...
frege65a 43847	A kind of Aristotelian inf...
frege66a 43848	Swap antecedents of ~ freg...
frege67a 43849	Lemma for ~ frege68a . Pr...
frege68a 43850	Combination of applying a ...
axfrege52c 43851	Justification for ~ ax-fre...
frege52b 43853	The case when the content ...
frege53b 43854	Lemma for frege102 (via ~ ...
axfrege54c 43855	Reflexive equality of clas...
frege54b 43857	Reflexive equality of sets...
frege54cor1b 43858	Reflexive equality. (Cont...
frege55lem1b 43859	Necessary deduction regard...
frege55lem2b 43860	Lemma for ~ frege55b . Co...
frege55b 43861	Lemma for ~ frege57b . Pr...
frege56b 43862	Lemma for ~ frege57b . Pr...
frege57b 43863	Analogue of ~ frege57aid ....
axfrege58b 43864	If ` A. x ph ` is affirmed...
frege58bid 43866	If ` A. x ph ` is affirmed...
frege58bcor 43867	Lemma for ~ frege59b . (C...
frege59b 43868	A kind of Aristotelian inf...
frege60b 43869	Swap antecedents of ~ ax-f...
frege61b 43870	Lemma for ~ frege65b . Pr...
frege62b 43871	A kind of Aristotelian inf...
frege63b 43872	Lemma for ~ frege91 . Pro...
frege64b 43873	Lemma for ~ frege65b . Pr...
frege65b 43874	A kind of Aristotelian inf...
frege66b 43875	Swap antecedents of ~ freg...
frege67b 43876	Lemma for ~ frege68b . Pr...
frege68b 43877	Combination of applying a ...
frege53c 43878	Proposition 53 of [Frege18...
frege54cor1c 43879	Reflexive equality. (Cont...
frege55lem1c 43880	Necessary deduction regard...
frege55lem2c 43881	Core proof of Proposition ...
frege55c 43882	Proposition 55 of [Frege18...
frege56c 43883	Lemma for ~ frege57c . Pr...
frege57c 43884	Swap order of implication ...
frege58c 43885	Principle related to ~ sp ...
frege59c 43886	A kind of Aristotelian inf...
frege60c 43887	Swap antecedents of ~ freg...
frege61c 43888	Lemma for ~ frege65c . Pr...
frege62c 43889	A kind of Aristotelian inf...
frege63c 43890	Analogue of ~ frege63b . ...
frege64c 43891	Lemma for ~ frege65c . Pr...
frege65c 43892	A kind of Aristotelian inf...
frege66c 43893	Swap antecedents of ~ freg...
frege67c 43894	Lemma for ~ frege68c . Pr...
frege68c 43895	Combination of applying a ...
dffrege69 43896	If from the proposition th...
frege70 43897	Lemma for ~ frege72 . Pro...
frege71 43898	Lemma for ~ frege72 . Pro...
frege72 43899	If property ` A ` is hered...
frege73 43900	Lemma for ~ frege87 . Pro...
frege74 43901	If ` X ` has a property ` ...
frege75 43902	If from the proposition th...
dffrege76 43903	If from the two propositio...
frege77 43904	If ` Y ` follows ` X ` in ...
frege78 43905	Commuted form of ~ frege77...
frege79 43906	Distributed form of ~ freg...
frege80 43907	Add additional condition t...
frege81 43908	If ` X ` has a property ` ...
frege82 43909	Closed-form deduction base...
frege83 43910	Apply commuted form of ~ f...
frege84 43911	Commuted form of ~ frege81...
frege85 43912	Commuted form of ~ frege77...
frege86 43913	Conclusion about element o...
frege87 43914	If ` Z ` is a result of an...
frege88 43915	Commuted form of ~ frege87...
frege89 43916	One direction of ~ dffrege...
frege90 43917	Add antecedent to ~ frege8...
frege91 43918	Every result of an applica...
frege92 43919	Inference from ~ frege91 ....
frege93 43920	Necessary condition for tw...
frege94 43921	Looking one past a pair re...
frege95 43922	Looking one past a pair re...
frege96 43923	Every result of an applica...
frege97 43924	The property of following ...
frege98 43925	If ` Y ` follows ` X ` and...
dffrege99 43926	If ` Z ` is identical with...
frege100 43927	One direction of ~ dffrege...
frege101 43928	Lemma for ~ frege102 . Pr...
frege102 43929	If ` Z ` belongs to the ` ...
frege103 43930	Proposition 103 of [Frege1...
frege104 43931	Proposition 104 of [Frege1...
frege105 43932	Proposition 105 of [Frege1...
frege106 43933	Whatever follows ` X ` in ...
frege107 43934	Proposition 107 of [Frege1...
frege108 43935	If ` Y ` belongs to the ` ...
frege109 43936	The property of belonging ...
frege110 43937	Proposition 110 of [Frege1...
frege111 43938	If ` Y ` belongs to the ` ...
frege112 43939	Identity implies belonging...
frege113 43940	Proposition 113 of [Frege1...
frege114 43941	If ` X ` belongs to the ` ...
dffrege115 43942	If from the circumstance t...
frege116 43943	One direction of ~ dffrege...
frege117 43944	Lemma for ~ frege118 . Pr...
frege118 43945	Simplified application of ...
frege119 43946	Lemma for ~ frege120 . Pr...
frege120 43947	Simplified application of ...
frege121 43948	Lemma for ~ frege122 . Pr...
frege122 43949	If ` X ` is a result of an...
frege123 43950	Lemma for ~ frege124 . Pr...
frege124 43951	If ` X ` is a result of an...
frege125 43952	Lemma for ~ frege126 . Pr...
frege126 43953	If ` M ` follows ` Y ` in ...
frege127 43954	Communte antecedents of ~ ...
frege128 43955	Lemma for ~ frege129 . Pr...
frege129 43956	If the procedure ` R ` is ...
frege130 43957	Lemma for ~ frege131 . Pr...
frege131 43958	If the procedure ` R ` is ...
frege132 43959	Lemma for ~ frege133 . Pr...
frege133 43960	If the procedure ` R ` is ...
enrelmap 43961	The set of all possible re...
enrelmapr 43962	The set of all possible re...
enmappw 43963	The set of all mappings fr...
enmappwid 43964	The set of all mappings fr...
rfovd 43965	Value of the operator, ` (...
rfovfvd 43966	Value of the operator, ` (...
rfovfvfvd 43967	Value of the operator, ` (...
rfovcnvf1od 43968	Properties of the operator...
rfovcnvd 43969	Value of the converse of t...
rfovf1od 43970	The value of the operator,...
rfovcnvfvd 43971	Value of the converse of t...
fsovd 43972	Value of the operator, ` (...
fsovrfovd 43973	The operator which gives a...
fsovfvd 43974	Value of the operator, ` (...
fsovfvfvd 43975	Value of the operator, ` (...
fsovfd 43976	The operator, ` ( A O B ) ...
fsovcnvlem 43977	The ` O ` operator, which ...
fsovcnvd 43978	The value of the converse ...
fsovcnvfvd 43979	The value of the converse ...
fsovf1od 43980	The value of ` ( A O B ) `...
dssmapfvd 43981	Value of the duality opera...
dssmapfv2d 43982	Value of the duality opera...
dssmapfv3d 43983	Value of the duality opera...
dssmapnvod 43984	For any base set ` B ` the...
dssmapf1od 43985	For any base set ` B ` the...
dssmap2d 43986	For any base set ` B ` the...
or3or 43987	Decompose disjunction into...
andi3or 43988	Distribute over triple dis...
uneqsn 43989	If a union of classes is e...
brfvimex 43990	If a binary relation holds...
brovmptimex 43991	If a binary relation holds...
brovmptimex1 43992	If a binary relation holds...
brovmptimex2 43993	If a binary relation holds...
brcoffn 43994	Conditions allowing the de...
brcofffn 43995	Conditions allowing the de...
brco2f1o 43996	Conditions allowing the de...
brco3f1o 43997	Conditions allowing the de...
ntrclsbex 43998	If (pseudo-)interior and (...
ntrclsrcomplex 43999	The relative complement of...
neik0imk0p 44000	Kuratowski's K0 axiom impl...
ntrk2imkb 44001	If an interior function is...
ntrkbimka 44002	If the interiors of disjoi...
ntrk0kbimka 44003	If the interiors of disjoi...
clsk3nimkb 44004	If the base set is not emp...
clsk1indlem0 44005	The ansatz closure functio...
clsk1indlem2 44006	The ansatz closure functio...
clsk1indlem3 44007	The ansatz closure functio...
clsk1indlem4 44008	The ansatz closure functio...
clsk1indlem1 44009	The ansatz closure functio...
clsk1independent 44010	For generalized closure fu...
neik0pk1imk0 44011	Kuratowski's K0' and K1 ax...
isotone1 44012	Two different ways to say ...
isotone2 44013	Two different ways to say ...
ntrk1k3eqk13 44014	An interior function is bo...
ntrclsf1o 44015	If (pseudo-)interior and (...
ntrclsnvobr 44016	If (pseudo-)interior and (...
ntrclsiex 44017	If (pseudo-)interior and (...
ntrclskex 44018	If (pseudo-)interior and (...
ntrclsfv1 44019	If (pseudo-)interior and (...
ntrclsfv2 44020	If (pseudo-)interior and (...
ntrclselnel1 44021	If (pseudo-)interior and (...
ntrclselnel2 44022	If (pseudo-)interior and (...
ntrclsfv 44023	The value of the interior ...
ntrclsfveq1 44024	If interior and closure fu...
ntrclsfveq2 44025	If interior and closure fu...
ntrclsfveq 44026	If interior and closure fu...
ntrclsss 44027	If interior and closure fu...
ntrclsneine0lem 44028	If (pseudo-)interior and (...
ntrclsneine0 44029	If (pseudo-)interior and (...
ntrclscls00 44030	If (pseudo-)interior and (...
ntrclsiso 44031	If (pseudo-)interior and (...
ntrclsk2 44032	An interior function is co...
ntrclskb 44033	The interiors of disjoint ...
ntrclsk3 44034	The intersection of interi...
ntrclsk13 44035	The interior of the inters...
ntrclsk4 44036	Idempotence of the interio...
ntrneibex 44037	If (pseudo-)interior and (...
ntrneircomplex 44038	The relative complement of...
ntrneif1o 44039	If (pseudo-)interior and (...
ntrneiiex 44040	If (pseudo-)interior and (...
ntrneinex 44041	If (pseudo-)interior and (...
ntrneicnv 44042	If (pseudo-)interior and (...
ntrneifv1 44043	If (pseudo-)interior and (...
ntrneifv2 44044	If (pseudo-)interior and (...
ntrneiel 44045	If (pseudo-)interior and (...
ntrneifv3 44046	The value of the neighbors...
ntrneineine0lem 44047	If (pseudo-)interior and (...
ntrneineine1lem 44048	If (pseudo-)interior and (...
ntrneifv4 44049	The value of the interior ...
ntrneiel2 44050	Membership in iterated int...
ntrneineine0 44051	If (pseudo-)interior and (...
ntrneineine1 44052	If (pseudo-)interior and (...
ntrneicls00 44053	If (pseudo-)interior and (...
ntrneicls11 44054	If (pseudo-)interior and (...
ntrneiiso 44055	If (pseudo-)interior and (...
ntrneik2 44056	An interior function is co...
ntrneix2 44057	An interior (closure) func...
ntrneikb 44058	The interiors of disjoint ...
ntrneixb 44059	The interiors (closures) o...
ntrneik3 44060	The intersection of interi...
ntrneix3 44061	The closure of the union o...
ntrneik13 44062	The interior of the inters...
ntrneix13 44063	The closure of the union o...
ntrneik4w 44064	Idempotence of the interio...
ntrneik4 44065	Idempotence of the interio...
clsneibex 44066	If (pseudo-)closure and (p...
clsneircomplex 44067	The relative complement of...
clsneif1o 44068	If a (pseudo-)closure func...
clsneicnv 44069	If a (pseudo-)closure func...
clsneikex 44070	If closure and neighborhoo...
clsneinex 44071	If closure and neighborhoo...
clsneiel1 44072	If a (pseudo-)closure func...
clsneiel2 44073	If a (pseudo-)closure func...
clsneifv3 44074	Value of the neighborhoods...
clsneifv4 44075	Value of the closure (inte...
neicvgbex 44076	If (pseudo-)neighborhood a...
neicvgrcomplex 44077	The relative complement of...
neicvgf1o 44078	If neighborhood and conver...
neicvgnvo 44079	If neighborhood and conver...
neicvgnvor 44080	If neighborhood and conver...
neicvgmex 44081	If the neighborhoods and c...
neicvgnex 44082	If the neighborhoods and c...
neicvgel1 44083	A subset being an element ...
neicvgel2 44084	The complement of a subset...
neicvgfv 44085	The value of the neighborh...
ntrrn 44086	The range of the interior ...
ntrf 44087	The interior function of a...
ntrf2 44088	The interior function is a...
ntrelmap 44089	The interior function is a...
clsf2 44090	The closure function is a ...
clselmap 44091	The closure function is a ...
dssmapntrcls 44092	The interior and closure o...
dssmapclsntr 44093	The closure and interior o...
gneispa 44094	Each point ` p ` of the ne...
gneispb 44095	Given a neighborhood ` N `...
gneispace2 44096	The predicate that ` F ` i...
gneispace3 44097	The predicate that ` F ` i...
gneispace 44098	The predicate that ` F ` i...
gneispacef 44099	A generic neighborhood spa...
gneispacef2 44100	A generic neighborhood spa...
gneispacefun 44101	A generic neighborhood spa...
gneispacern 44102	A generic neighborhood spa...
gneispacern2 44103	A generic neighborhood spa...
gneispace0nelrn 44104	A generic neighborhood spa...
gneispace0nelrn2 44105	A generic neighborhood spa...
gneispace0nelrn3 44106	A generic neighborhood spa...
gneispaceel 44107	Every neighborhood of a po...
gneispaceel2 44108	Every neighborhood of a po...
gneispacess 44109	All supersets of a neighbo...
gneispacess2 44110	All supersets of a neighbo...
k0004lem1 44111	Application of ~ ssin to r...
k0004lem2 44112	A mapping with a particula...
k0004lem3 44113	When the value of a mappin...
k0004val 44114	The topological simplex of...
k0004ss1 44115	The topological simplex of...
k0004ss2 44116	The topological simplex of...
k0004ss3 44117	The topological simplex of...
k0004val0 44118	The topological simplex of...
inductionexd 44119	Simple induction example. ...
wwlemuld 44120	Natural deduction form of ...
leeq1d 44121	Specialization of ~ breq1d...
leeq2d 44122	Specialization of ~ breq2d...
absmulrposd 44123	Specialization of absmuld ...
imadisjld 44124	Natural dduction form of o...
wnefimgd 44125	The image of a mapping fro...
fco2d 44126	Natural deduction form of ...
wfximgfd 44127	The value of a function on...
extoimad 44128	If |f(x)| <= C for all x t...
imo72b2lem0 44129	Lemma for ~ imo72b2 . (Co...
suprleubrd 44130	Natural deduction form of ...
imo72b2lem2 44131	Lemma for ~ imo72b2 . (Co...
suprlubrd 44132	Natural deduction form of ...
imo72b2lem1 44133	Lemma for ~ imo72b2 . (Co...
lemuldiv3d 44134	'Less than or equal to' re...
lemuldiv4d 44135	'Less than or equal to' re...
imo72b2 44136	IMO 1972 B2. (14th Intern...
int-addcomd 44137	AdditionCommutativity gene...
int-addassocd 44138	AdditionAssociativity gene...
int-addsimpd 44139	AdditionSimplification gen...
int-mulcomd 44140	MultiplicationCommutativit...
int-mulassocd 44141	MultiplicationAssociativit...
int-mulsimpd 44142	MultiplicationSimplificati...
int-leftdistd 44143	AdditionMultiplicationLeft...
int-rightdistd 44144	AdditionMultiplicationRigh...
int-sqdefd 44145	SquareDefinition generator...
int-mul11d 44146	First MultiplicationOne ge...
int-mul12d 44147	Second MultiplicationOne g...
int-add01d 44148	First AdditionZero generat...
int-add02d 44149	Second AdditionZero genera...
int-sqgeq0d 44150	SquareGEQZero generator ru...
int-eqprincd 44151	PrincipleOfEquality genera...
int-eqtransd 44152	EqualityTransitivity gener...
int-eqmvtd 44153	EquMoveTerm generator rule...
int-eqineqd 44154	EquivalenceImpliesDoubleIn...
int-ineqmvtd 44155	IneqMoveTerm generator rul...
int-ineq1stprincd 44156	FirstPrincipleOfInequality...
int-ineq2ndprincd 44157	SecondPrincipleOfInequalit...
int-ineqtransd 44158	InequalityTransitivity gen...
unitadd 44159	Theorem used in conjunctio...
gsumws3 44160	Valuation of a length 3 wo...
gsumws4 44161	Valuation of a length 4 wo...
amgm2d 44162	Arithmetic-geometric mean ...
amgm3d 44163	Arithmetic-geometric mean ...
amgm4d 44164	Arithmetic-geometric mean ...
spALT 44165	~ sp can be proven from th...
elnelneqd 44166	Two classes are not equal ...
elnelneq2d 44167	Two classes are not equal ...
rr-spce 44168	Prove an existential. (Co...
rexlimdvaacbv 44169	Unpack a restricted existe...
rexlimddvcbvw 44170	Unpack a restricted existe...
rexlimddvcbv 44171	Unpack a restricted existe...
rr-elrnmpt3d 44172	Elementhood in an image se...
finnzfsuppd 44173	If a function is zero outs...
rr-phpd 44174	Equivalent of ~ php withou...
suceqd 44175	Deduction associated with ...
tfindsd 44176	Deduction associated with ...
mnringvald 44179	Value of the monoid ring f...
mnringnmulrd 44180	Components of a monoid rin...
mnringnmulrdOLD 44181	Obsolete version of ~ mnri...
mnringbased 44182	The base set of a monoid r...
mnringbasedOLD 44183	Obsolete version of ~ mnri...
mnringbaserd 44184	The base set of a monoid r...
mnringelbased 44185	Membership in the base set...
mnringbasefd 44186	Elements of a monoid ring ...
mnringbasefsuppd 44187	Elements of a monoid ring ...
mnringaddgd 44188	The additive operation of ...
mnringaddgdOLD 44189	Obsolete version of ~ mnri...
mnring0gd 44190	The additive identity of a...
mnring0g2d 44191	The additive identity of a...
mnringmulrd 44192	The ring product of a mono...
mnringscad 44193	The scalar ring of a monoi...
mnringscadOLD 44194	Obsolete version of ~ mnri...
mnringvscad 44195	The scalar product of a mo...
mnringvscadOLD 44196	Obsolete version of ~ mnri...
mnringlmodd 44197	Monoid rings are left modu...
mnringmulrvald 44198	Value of multiplication in...
mnringmulrcld 44199	Monoid rings are closed un...
gru0eld 44200	A nonempty Grothendieck un...
grusucd 44201	Grothendieck universes are...
r1rankcld 44202	Any rank of the cumulative...
grur1cld 44203	Grothendieck universes are...
grurankcld 44204	Grothendieck universes are...
grurankrcld 44205	If a Grothendieck universe...
scotteqd 44208	Equality theorem for the S...
scotteq 44209	Closed form of ~ scotteqd ...
nfscott 44210	Bound-variable hypothesis ...
scottabf 44211	Value of the Scott operati...
scottab 44212	Value of the Scott operati...
scottabes 44213	Value of the Scott operati...
scottss 44214	Scott's trick produces a s...
elscottab 44215	An element of the output o...
scottex2 44216	~ scottex expressed using ...
scotteld 44217	The Scott operation sends ...
scottelrankd 44218	Property of a Scott's tric...
scottrankd 44219	Rank of a nonempty Scott's...
gruscottcld 44220	If a Grothendieck universe...
dfcoll2 44223	Alternate definition of th...
colleq12d 44224	Equality theorem for the c...
colleq1 44225	Equality theorem for the c...
colleq2 44226	Equality theorem for the c...
nfcoll 44227	Bound-variable hypothesis ...
collexd 44228	The output of the collecti...
cpcolld 44229	Property of the collection...
cpcoll2d 44230	~ cpcolld with an extra ex...
grucollcld 44231	A Grothendieck universe co...
ismnu 44232	The hypothesis of this the...
mnuop123d 44233	Operations of a minimal un...
mnussd 44234	Minimal universes are clos...
mnuss2d 44235	~ mnussd with arguments pr...
mnu0eld 44236	A nonempty minimal univers...
mnuop23d 44237	Second and third operation...
mnupwd 44238	Minimal universes are clos...
mnusnd 44239	Minimal universes are clos...
mnuprssd 44240	A minimal universe contain...
mnuprss2d 44241	Special case of ~ mnuprssd...
mnuop3d 44242	Third operation of a minim...
mnuprdlem1 44243	Lemma for ~ mnuprd . (Con...
mnuprdlem2 44244	Lemma for ~ mnuprd . (Con...
mnuprdlem3 44245	Lemma for ~ mnuprd . (Con...
mnuprdlem4 44246	Lemma for ~ mnuprd . Gene...
mnuprd 44247	Minimal universes are clos...
mnuunid 44248	Minimal universes are clos...
mnuund 44249	Minimal universes are clos...
mnutrcld 44250	Minimal universes contain ...
mnutrd 44251	Minimal universes are tran...
mnurndlem1 44252	Lemma for ~ mnurnd . (Con...
mnurndlem2 44253	Lemma for ~ mnurnd . Dedu...
mnurnd 44254	Minimal universes contain ...
mnugrud 44255	Minimal universes are Grot...
grumnudlem 44256	Lemma for ~ grumnud . (Co...
grumnud 44257	Grothendieck universes are...
grumnueq 44258	The class of Grothendieck ...
expandan 44259	Expand conjunction to prim...
expandexn 44260	Expand an existential quan...
expandral 44261	Expand a restricted univer...
expandrexn 44262	Expand a restricted existe...
expandrex 44263	Expand a restricted existe...
expanduniss 44264	Expand ` U. A C_ B ` to pr...
ismnuprim 44265	Express the predicate on `...
rr-grothprimbi 44266	Express "every set is cont...
inagrud 44267	Inaccessible levels of the...
inaex 44268	Assuming the Tarski-Grothe...
gruex 44269	Assuming the Tarski-Grothe...
rr-groth 44270	An equivalent of ~ ax-grot...
rr-grothprim 44271	An equivalent of ~ ax-grot...
ismnushort 44272	Express the predicate on `...
dfuniv2 44273	Alternative definition of ...
rr-grothshortbi 44274	Express "every set is cont...
rr-grothshort 44275	A shorter equivalent of ~ ...
nanorxor 44276	'nand' is equivalent to th...
undisjrab 44277	Union of two disjoint rest...
iso0 44278	The empty set is an ` R , ...
ssrecnpr 44279	` RR ` is a subset of both...
seff 44280	Let set ` S ` be the real ...
sblpnf 44281	The infinity ball in the a...
prmunb2 44282	The primes are unbounded. ...
dvgrat 44283	Ratio test for divergence ...
cvgdvgrat 44284	Ratio test for convergence...
radcnvrat 44285	Let ` L ` be the limit, if...
reldvds 44286	The divides relation is in...
nznngen 44287	All positive integers in t...
nzss 44288	The set of multiples of _m...
nzin 44289	The intersection of the se...
nzprmdif 44290	Subtract one prime's multi...
hashnzfz 44291	Special case of ~ hashdvds...
hashnzfz2 44292	Special case of ~ hashnzfz...
hashnzfzclim 44293	As the upper bound ` K ` o...
caofcan 44294	Transfer a cancellation la...
ofsubid 44295	Function analogue of ~ sub...
ofmul12 44296	Function analogue of ~ mul...
ofdivrec 44297	Function analogue of ~ div...
ofdivcan4 44298	Function analogue of ~ div...
ofdivdiv2 44299	Function analogue of ~ div...
lhe4.4ex1a 44300	Example of the Fundamental...
dvsconst 44301	Derivative of a constant f...
dvsid 44302	Derivative of the identity...
dvsef 44303	Derivative of the exponent...
expgrowthi 44304	Exponential growth and dec...
dvconstbi 44305	The derivative of a functi...
expgrowth 44306	Exponential growth and dec...
bccval 44309	Value of the generalized b...
bcccl 44310	Closure of the generalized...
bcc0 44311	The generalized binomial c...
bccp1k 44312	Generalized binomial coeff...
bccm1k 44313	Generalized binomial coeff...
bccn0 44314	Generalized binomial coeff...
bccn1 44315	Generalized binomial coeff...
bccbc 44316	The binomial coefficient a...
uzmptshftfval 44317	When ` F ` is a maps-to fu...
dvradcnv2 44318	The radius of convergence ...
binomcxplemwb 44319	Lemma for ~ binomcxp . Th...
binomcxplemnn0 44320	Lemma for ~ binomcxp . Wh...
binomcxplemrat 44321	Lemma for ~ binomcxp . As...
binomcxplemfrat 44322	Lemma for ~ binomcxp . ~ b...
binomcxplemradcnv 44323	Lemma for ~ binomcxp . By...
binomcxplemdvbinom 44324	Lemma for ~ binomcxp . By...
binomcxplemcvg 44325	Lemma for ~ binomcxp . Th...
binomcxplemdvsum 44326	Lemma for ~ binomcxp . Th...
binomcxplemnotnn0 44327	Lemma for ~ binomcxp . Wh...
binomcxp 44328	Generalize the binomial th...
pm10.12 44329	Theorem *10.12 in [Whitehe...
pm10.14 44330	Theorem *10.14 in [Whitehe...
pm10.251 44331	Theorem *10.251 in [Whiteh...
pm10.252 44332	Theorem *10.252 in [Whiteh...
pm10.253 44333	Theorem *10.253 in [Whiteh...
albitr 44334	Theorem *10.301 in [Whiteh...
pm10.42 44335	Theorem *10.42 in [Whitehe...
pm10.52 44336	Theorem *10.52 in [Whitehe...
pm10.53 44337	Theorem *10.53 in [Whitehe...
pm10.541 44338	Theorem *10.541 in [Whiteh...
pm10.542 44339	Theorem *10.542 in [Whiteh...
pm10.55 44340	Theorem *10.55 in [Whitehe...
pm10.56 44341	Theorem *10.56 in [Whitehe...
pm10.57 44342	Theorem *10.57 in [Whitehe...
2alanimi 44343	Removes two universal quan...
2al2imi 44344	Removes two universal quan...
pm11.11 44345	Theorem *11.11 in [Whitehe...
pm11.12 44346	Theorem *11.12 in [Whitehe...
19.21vv 44347	Compare Theorem *11.3 in [...
2alim 44348	Theorem *11.32 in [Whitehe...
2albi 44349	Theorem *11.33 in [Whitehe...
2exim 44350	Theorem *11.34 in [Whitehe...
2exbi 44351	Theorem *11.341 in [Whiteh...
spsbce-2 44352	Theorem *11.36 in [Whitehe...
19.33-2 44353	Theorem *11.421 in [Whiteh...
19.36vv 44354	Theorem *11.43 in [Whitehe...
19.31vv 44355	Theorem *11.44 in [Whitehe...
19.37vv 44356	Theorem *11.46 in [Whitehe...
19.28vv 44357	Theorem *11.47 in [Whitehe...
pm11.52 44358	Theorem *11.52 in [Whitehe...
aaanv 44359	Theorem *11.56 in [Whitehe...
pm11.57 44360	Theorem *11.57 in [Whitehe...
pm11.58 44361	Theorem *11.58 in [Whitehe...
pm11.59 44362	Theorem *11.59 in [Whitehe...
pm11.6 44363	Theorem *11.6 in [Whitehea...
pm11.61 44364	Theorem *11.61 in [Whitehe...
pm11.62 44365	Theorem *11.62 in [Whitehe...
pm11.63 44366	Theorem *11.63 in [Whitehe...
pm11.7 44367	Theorem *11.7 in [Whitehea...
pm11.71 44368	Theorem *11.71 in [Whitehe...
sbeqal1 44369	If ` x = y ` always implie...
sbeqal1i 44370	Suppose you know ` x = y `...
sbeqal2i 44371	If ` x = y ` implies ` x =...
axc5c4c711 44372	Proof of a theorem that ca...
axc5c4c711toc5 44373	Rederivation of ~ sp from ...
axc5c4c711toc4 44374	Rederivation of ~ axc4 fro...
axc5c4c711toc7 44375	Rederivation of ~ axc7 fro...
axc5c4c711to11 44376	Rederivation of ~ ax-11 fr...
axc11next 44377	This theorem shows that, g...
pm13.13a 44378	One result of theorem *13....
pm13.13b 44379	Theorem *13.13 in [Whitehe...
pm13.14 44380	Theorem *13.14 in [Whitehe...
pm13.192 44381	Theorem *13.192 in [Whiteh...
pm13.193 44382	Theorem *13.193 in [Whiteh...
pm13.194 44383	Theorem *13.194 in [Whiteh...
pm13.195 44384	Theorem *13.195 in [Whiteh...
pm13.196a 44385	Theorem *13.196 in [Whiteh...
2sbc6g 44386	Theorem *13.21 in [Whitehe...
2sbc5g 44387	Theorem *13.22 in [Whitehe...
iotain 44388	Equivalence between two di...
iotaexeu 44389	The iota class exists. Th...
iotasbc 44390	Definition *14.01 in [Whit...
iotasbc2 44391	Theorem *14.111 in [Whiteh...
pm14.12 44392	Theorem *14.12 in [Whitehe...
pm14.122a 44393	Theorem *14.122 in [Whiteh...
pm14.122b 44394	Theorem *14.122 in [Whiteh...
pm14.122c 44395	Theorem *14.122 in [Whiteh...
pm14.123a 44396	Theorem *14.123 in [Whiteh...
pm14.123b 44397	Theorem *14.123 in [Whiteh...
pm14.123c 44398	Theorem *14.123 in [Whiteh...
pm14.18 44399	Theorem *14.18 in [Whitehe...
iotaequ 44400	Theorem *14.2 in [Whitehea...
iotavalb 44401	Theorem *14.202 in [Whiteh...
iotasbc5 44402	Theorem *14.205 in [Whiteh...
pm14.24 44403	Theorem *14.24 in [Whitehe...
iotavalsb 44404	Theorem *14.242 in [Whiteh...
sbiota1 44405	Theorem *14.25 in [Whitehe...
sbaniota 44406	Theorem *14.26 in [Whitehe...
eubiOLD 44407	Obsolete proof of ~ eubi a...
iotasbcq 44408	Theorem *14.272 in [Whiteh...
elnev 44409	Any set that contains one ...
rusbcALT 44410	A version of Russell's par...
compeq 44411	Equality between two ways ...
compne 44412	The complement of ` A ` is...
compab 44413	Two ways of saying "the co...
conss2 44414	Contrapositive law for sub...
conss1 44415	Contrapositive law for sub...
ralbidar 44416	More general form of ~ ral...
rexbidar 44417	More general form of ~ rex...
dropab1 44418	Theorem to aid use of the ...
dropab2 44419	Theorem to aid use of the ...
ipo0 44420	If the identity relation p...
ifr0 44421	A class that is founded by...
ordpss 44422	~ ordelpss with an anteced...
fvsb 44423	Explicit substitution of a...
fveqsb 44424	Implicit substitution of a...
xpexb 44425	A Cartesian product exists...
trelpss 44426	An element of a transitive...
addcomgi 44427	Generalization of commutat...
addrval 44437	Value of the operation of ...
subrval 44438	Value of the operation of ...
mulvval 44439	Value of the operation of ...
addrfv 44440	Vector addition at a value...
subrfv 44441	Vector subtraction at a va...
mulvfv 44442	Scalar multiplication at a...
addrfn 44443	Vector addition produces a...
subrfn 44444	Vector subtraction produce...
mulvfn 44445	Scalar multiplication prod...
addrcom 44446	Vector addition is commuta...
idiALT 44450	Placeholder for ~ idi . T...
exbir 44451	Exportation implication al...
3impexpbicom 44452	Version of ~ 3impexp where...
3impexpbicomi 44453	Inference associated with ...
bi1imp 44454	Importation inference simi...
bi2imp 44455	Importation inference simi...
bi3impb 44456	Similar to ~ 3impb with im...
bi3impa 44457	Similar to ~ 3impa with im...
bi23impib 44458	~ 3impib with the inner im...
bi13impib 44459	~ 3impib with the outer im...
bi123impib 44460	~ 3impib with the implicat...
bi13impia 44461	~ 3impia with the outer im...
bi123impia 44462	~ 3impia with the implicat...
bi33imp12 44463	~ 3imp with innermost impl...
bi23imp13 44464	~ 3imp with middle implica...
bi13imp23 44465	~ 3imp with outermost impl...
bi13imp2 44466	Similar to ~ 3imp except t...
bi12imp3 44467	Similar to ~ 3imp except a...
bi23imp1 44468	Similar to ~ 3imp except a...
bi123imp0 44469	Similar to ~ 3imp except a...
4animp1 44470	A single hypothesis unific...
4an31 44471	A rearrangement of conjunc...
4an4132 44472	A rearrangement of conjunc...
expcomdg 44473	Biconditional form of ~ ex...
iidn3 44474	~ idn3 without virtual ded...
ee222 44475	~ e222 without virtual ded...
ee3bir 44476	Right-biconditional form o...
ee13 44477	~ e13 without virtual dedu...
ee121 44478	~ e121 without virtual ded...
ee122 44479	~ e122 without virtual ded...
ee333 44480	~ e333 without virtual ded...
ee323 44481	~ e323 without virtual ded...
3ornot23 44482	If the second and third di...
orbi1r 44483	~ orbi1 with order of disj...
3orbi123 44484	~ pm4.39 with a 3-conjunct...
syl5imp 44485	Closed form of ~ syl5 . D...
impexpd 44486	The following User's Proof...
com3rgbi 44487	The following User's Proof...
impexpdcom 44488	The following User's Proof...
ee1111 44489	Non-virtual deduction form...
pm2.43bgbi 44490	Logical equivalence of a 2...
pm2.43cbi 44491	Logical equivalence of a 3...
ee233 44492	Non-virtual deduction form...
imbi13 44493	Join three logical equival...
ee33 44494	Non-virtual deduction form...
con5 44495	Biconditional contrapositi...
con5i 44496	Inference form of ~ con5 ....
exlimexi 44497	Inference similar to Theor...
sb5ALT 44498	Equivalence for substituti...
eexinst01 44499	~ exinst01 without virtual...
eexinst11 44500	~ exinst11 without virtual...
vk15.4j 44501	Excercise 4j of Unit 15 of...
notnotrALT 44502	Converse of double negatio...
con3ALT2 44503	Contraposition. Alternate...
ssralv2 44504	Quantification restricted ...
sbc3or 44505	~ sbcor with a 3-disjuncts...
alrim3con13v 44506	Closed form of ~ alrimi wi...
rspsbc2 44507	~ rspsbc with two quantify...
sbcoreleleq 44508	Substitution of a setvar v...
tratrb 44509	If a class is transitive a...
ordelordALT 44510	An element of an ordinal c...
sbcim2g 44511	Distribution of class subs...
sbcbi 44512	Implication form of ~ sbcb...
trsbc 44513	Formula-building inference...
truniALT 44514	The union of a class of tr...
onfrALTlem5 44515	Lemma for ~ onfrALT . (Co...
onfrALTlem4 44516	Lemma for ~ onfrALT . (Co...
onfrALTlem3 44517	Lemma for ~ onfrALT . (Co...
ggen31 44518	~ gen31 without virtual de...
onfrALTlem2 44519	Lemma for ~ onfrALT . (Co...
cbvexsv 44520	A theorem pertaining to th...
onfrALTlem1 44521	Lemma for ~ onfrALT . (Co...
onfrALT 44522	The membership relation is...
19.41rg 44523	Closed form of right-to-le...
opelopab4 44524	Ordered pair membership in...
2pm13.193 44525	~ pm13.193 for two variabl...
hbntal 44526	A closed form of ~ hbn . ~...
hbimpg 44527	A closed form of ~ hbim . ...
hbalg 44528	Closed form of ~ hbal . D...
hbexg 44529	Closed form of ~ nfex . D...
ax6e2eq 44530	Alternate form of ~ ax6e f...
ax6e2nd 44531	If at least two sets exist...
ax6e2ndeq 44532	"At least two sets exist" ...
2sb5nd 44533	Equivalence for double sub...
2uasbanh 44534	Distribute the unabbreviat...
2uasban 44535	Distribute the unabbreviat...
e2ebind 44536	Absorption of an existenti...
elpwgded 44537	~ elpwgdedVD in convention...
trelded 44538	Deduction form of ~ trel ....
jaoded 44539	Deduction form of ~ jao . ...
sbtT 44540	A substitution into a theo...
not12an2impnot1 44541	If a double conjunction is...
in1 44544	Inference form of ~ df-vd1...
iin1 44545	~ in1 without virtual dedu...
dfvd1ir 44546	Inference form of ~ df-vd1...
idn1 44547	Virtual deduction identity...
dfvd1imp 44548	Left-to-right part of defi...
dfvd1impr 44549	Right-to-left part of defi...
dfvd2 44552	Definition of a 2-hypothes...
dfvd2an 44555	Definition of a 2-hypothes...
dfvd2ani 44556	Inference form of ~ dfvd2a...
dfvd2anir 44557	Right-to-left inference fo...
dfvd2i 44558	Inference form of ~ dfvd2 ...
dfvd2ir 44559	Right-to-left inference fo...
dfvd3 44564	Definition of a 3-hypothes...
dfvd3i 44565	Inference form of ~ dfvd3 ...
dfvd3ir 44566	Right-to-left inference fo...
dfvd3an 44567	Definition of a 3-hypothes...
dfvd3ani 44568	Inference form of ~ dfvd3a...
dfvd3anir 44569	Right-to-left inference fo...
vd01 44570	A virtual hypothesis virtu...
vd02 44571	Two virtual hypotheses vir...
vd03 44572	A theorem is virtually inf...
vd12 44573	A virtual deduction with 1...
vd13 44574	A virtual deduction with 1...
vd23 44575	A virtual deduction with 2...
dfvd2imp 44576	The virtual deduction form...
dfvd2impr 44577	A 2-antecedent nested impl...
in2 44578	The virtual deduction intr...
int2 44579	The virtual deduction intr...
iin2 44580	~ in2 without virtual dedu...
in2an 44581	The virtual deduction intr...
in3 44582	The virtual deduction intr...
iin3 44583	~ in3 without virtual dedu...
in3an 44584	The virtual deduction intr...
int3 44585	The virtual deduction intr...
idn2 44586	Virtual deduction identity...
iden2 44587	Virtual deduction identity...
idn3 44588	Virtual deduction identity...
gen11 44589	Virtual deduction generali...
gen11nv 44590	Virtual deduction generali...
gen12 44591	Virtual deduction generali...
gen21 44592	Virtual deduction generali...
gen21nv 44593	Virtual deduction form of ...
gen31 44594	Virtual deduction generali...
gen22 44595	Virtual deduction generali...
ggen22 44596	~ gen22 without virtual de...
exinst 44597	Existential Instantiation....
exinst01 44598	Existential Instantiation....
exinst11 44599	Existential Instantiation....
e1a 44600	A Virtual deduction elimin...
el1 44601	A Virtual deduction elimin...
e1bi 44602	Biconditional form of ~ e1...
e1bir 44603	Right biconditional form o...
e2 44604	A virtual deduction elimin...
e2bi 44605	Biconditional form of ~ e2...
e2bir 44606	Right biconditional form o...
ee223 44607	~ e223 without virtual ded...
e223 44608	A virtual deduction elimin...
e222 44609	A virtual deduction elimin...
e220 44610	A virtual deduction elimin...
ee220 44611	~ e220 without virtual ded...
e202 44612	A virtual deduction elimin...
ee202 44613	~ e202 without virtual ded...
e022 44614	A virtual deduction elimin...
ee022 44615	~ e022 without virtual ded...
e002 44616	A virtual deduction elimin...
ee002 44617	~ e002 without virtual ded...
e020 44618	A virtual deduction elimin...
ee020 44619	~ e020 without virtual ded...
e200 44620	A virtual deduction elimin...
ee200 44621	~ e200 without virtual ded...
e221 44622	A virtual deduction elimin...
ee221 44623	~ e221 without virtual ded...
e212 44624	A virtual deduction elimin...
ee212 44625	~ e212 without virtual ded...
e122 44626	A virtual deduction elimin...
e112 44627	A virtual deduction elimin...
ee112 44628	~ e112 without virtual ded...
e121 44629	A virtual deduction elimin...
e211 44630	A virtual deduction elimin...
ee211 44631	~ e211 without virtual ded...
e210 44632	A virtual deduction elimin...
ee210 44633	~ e210 without virtual ded...
e201 44634	A virtual deduction elimin...
ee201 44635	~ e201 without virtual ded...
e120 44636	A virtual deduction elimin...
ee120 44637	Virtual deduction rule ~ e...
e021 44638	A virtual deduction elimin...
ee021 44639	~ e021 without virtual ded...
e012 44640	A virtual deduction elimin...
ee012 44641	~ e012 without virtual ded...
e102 44642	A virtual deduction elimin...
ee102 44643	~ e102 without virtual ded...
e22 44644	A virtual deduction elimin...
e22an 44645	Conjunction form of ~ e22 ...
ee22an 44646	~ e22an without virtual de...
e111 44647	A virtual deduction elimin...
e1111 44648	A virtual deduction elimin...
e110 44649	A virtual deduction elimin...
ee110 44650	~ e110 without virtual ded...
e101 44651	A virtual deduction elimin...
ee101 44652	~ e101 without virtual ded...
e011 44653	A virtual deduction elimin...
ee011 44654	~ e011 without virtual ded...
e100 44655	A virtual deduction elimin...
ee100 44656	~ e100 without virtual ded...
e010 44657	A virtual deduction elimin...
ee010 44658	~ e010 without virtual ded...
e001 44659	A virtual deduction elimin...
ee001 44660	~ e001 without virtual ded...
e11 44661	A virtual deduction elimin...
e11an 44662	Conjunction form of ~ e11 ...
ee11an 44663	~ e11an without virtual de...
e01 44664	A virtual deduction elimin...
e01an 44665	Conjunction form of ~ e01 ...
ee01an 44666	~ e01an without virtual de...
e10 44667	A virtual deduction elimin...
e10an 44668	Conjunction form of ~ e10 ...
ee10an 44669	~ e10an without virtual de...
e02 44670	A virtual deduction elimin...
e02an 44671	Conjunction form of ~ e02 ...
ee02an 44672	~ e02an without virtual de...
eel021old 44673	~ el021old without virtual...
el021old 44674	A virtual deduction elimin...
eel132 44675	~ syl2an with antecedents ...
eel000cT 44676	An elimination deduction. ...
eel0TT 44677	An elimination deduction. ...
eelT00 44678	An elimination deduction. ...
eelTTT 44679	An elimination deduction. ...
eelT11 44680	An elimination deduction. ...
eelT1 44681	Syllogism inference combin...
eelT12 44682	An elimination deduction. ...
eelTT1 44683	An elimination deduction. ...
eelT01 44684	An elimination deduction. ...
eel0T1 44685	An elimination deduction. ...
eel12131 44686	An elimination deduction. ...
eel2131 44687	~ syl2an with antecedents ...
eel3132 44688	~ syl2an with antecedents ...
eel0321old 44689	~ el0321old without virtua...
el0321old 44690	A virtual deduction elimin...
eel2122old 44691	~ el2122old without virtua...
el2122old 44692	A virtual deduction elimin...
eel0000 44693	Elimination rule similar t...
eel00001 44694	An elimination deduction. ...
eel00000 44695	Elimination rule similar ~...
eel11111 44696	Five-hypothesis eliminatio...
e12 44697	A virtual deduction elimin...
e12an 44698	Conjunction form of ~ e12 ...
el12 44699	Virtual deduction form of ...
e20 44700	A virtual deduction elimin...
e20an 44701	Conjunction form of ~ e20 ...
ee20an 44702	~ e20an without virtual de...
e21 44703	A virtual deduction elimin...
e21an 44704	Conjunction form of ~ e21 ...
ee21an 44705	~ e21an without virtual de...
e333 44706	A virtual deduction elimin...
e33 44707	A virtual deduction elimin...
e33an 44708	Conjunction form of ~ e33 ...
ee33an 44709	~ e33an without virtual de...
e3 44710	Meta-connective form of ~ ...
e3bi 44711	Biconditional form of ~ e3...
e3bir 44712	Right biconditional form o...
e03 44713	A virtual deduction elimin...
ee03 44714	~ e03 without virtual dedu...
e03an 44715	Conjunction form of ~ e03 ...
ee03an 44716	Conjunction form of ~ ee03...
e30 44717	A virtual deduction elimin...
ee30 44718	~ e30 without virtual dedu...
e30an 44719	A virtual deduction elimin...
ee30an 44720	Conjunction form of ~ ee30...
e13 44721	A virtual deduction elimin...
e13an 44722	A virtual deduction elimin...
ee13an 44723	~ e13an without virtual de...
e31 44724	A virtual deduction elimin...
ee31 44725	~ e31 without virtual dedu...
e31an 44726	A virtual deduction elimin...
ee31an 44727	~ e31an without virtual de...
e23 44728	A virtual deduction elimin...
e23an 44729	A virtual deduction elimin...
ee23an 44730	~ e23an without virtual de...
e32 44731	A virtual deduction elimin...
ee32 44732	~ e32 without virtual dedu...
e32an 44733	A virtual deduction elimin...
ee32an 44734	~ e33an without virtual de...
e123 44735	A virtual deduction elimin...
ee123 44736	~ e123 without virtual ded...
el123 44737	A virtual deduction elimin...
e233 44738	A virtual deduction elimin...
e323 44739	A virtual deduction elimin...
e000 44740	A virtual deduction elimin...
e00 44741	Elimination rule identical...
e00an 44742	Elimination rule identical...
eel00cT 44743	An elimination deduction. ...
eelTT 44744	An elimination deduction. ...
e0a 44745	Elimination rule identical...
eelT 44746	An elimination deduction. ...
eel0cT 44747	An elimination deduction. ...
eelT0 44748	An elimination deduction. ...
e0bi 44749	Elimination rule identical...
e0bir 44750	Elimination rule identical...
uun0.1 44751	Convention notation form o...
un0.1 44752	` T. ` is the constant tru...
uunT1 44753	A deduction unionizing a n...
uunT1p1 44754	A deduction unionizing a n...
uunT21 44755	A deduction unionizing a n...
uun121 44756	A deduction unionizing a n...
uun121p1 44757	A deduction unionizing a n...
uun132 44758	A deduction unionizing a n...
uun132p1 44759	A deduction unionizing a n...
anabss7p1 44760	A deduction unionizing a n...
un10 44761	A unionizing deduction. (...
un01 44762	A unionizing deduction. (...
un2122 44763	A deduction unionizing a n...
uun2131 44764	A deduction unionizing a n...
uun2131p1 44765	A deduction unionizing a n...
uunTT1 44766	A deduction unionizing a n...
uunTT1p1 44767	A deduction unionizing a n...
uunTT1p2 44768	A deduction unionizing a n...
uunT11 44769	A deduction unionizing a n...
uunT11p1 44770	A deduction unionizing a n...
uunT11p2 44771	A deduction unionizing a n...
uunT12 44772	A deduction unionizing a n...
uunT12p1 44773	A deduction unionizing a n...
uunT12p2 44774	A deduction unionizing a n...
uunT12p3 44775	A deduction unionizing a n...
uunT12p4 44776	A deduction unionizing a n...
uunT12p5 44777	A deduction unionizing a n...
uun111 44778	A deduction unionizing a n...
3anidm12p1 44779	A deduction unionizing a n...
3anidm12p2 44780	A deduction unionizing a n...
uun123 44781	A deduction unionizing a n...
uun123p1 44782	A deduction unionizing a n...
uun123p2 44783	A deduction unionizing a n...
uun123p3 44784	A deduction unionizing a n...
uun123p4 44785	A deduction unionizing a n...
uun2221 44786	A deduction unionizing a n...
uun2221p1 44787	A deduction unionizing a n...
uun2221p2 44788	A deduction unionizing a n...
3impdirp1 44789	A deduction unionizing a n...
3impcombi 44790	A 1-hypothesis proposition...
trsspwALT 44791	Virtual deduction proof of...
trsspwALT2 44792	Virtual deduction proof of...
trsspwALT3 44793	Short predicate calculus p...
sspwtr 44794	Virtual deduction proof of...
sspwtrALT 44795	Virtual deduction proof of...
sspwtrALT2 44796	Short predicate calculus p...
pwtrVD 44797	Virtual deduction proof of...
pwtrrVD 44798	Virtual deduction proof of...
suctrALT 44799	The successor of a transit...
snssiALTVD 44800	Virtual deduction proof of...
snssiALT 44801	If a class is an element o...
snsslVD 44802	Virtual deduction proof of...
snssl 44803	If a singleton is a subcla...
snelpwrVD 44804	Virtual deduction proof of...
unipwrVD 44805	Virtual deduction proof of...
unipwr 44806	A class is a subclass of t...
sstrALT2VD 44807	Virtual deduction proof of...
sstrALT2 44808	Virtual deduction proof of...
suctrALT2VD 44809	Virtual deduction proof of...
suctrALT2 44810	Virtual deduction proof of...
elex2VD 44811	Virtual deduction proof of...
elex22VD 44812	Virtual deduction proof of...
eqsbc2VD 44813	Virtual deduction proof of...
zfregs2VD 44814	Virtual deduction proof of...
tpid3gVD 44815	Virtual deduction proof of...
en3lplem1VD 44816	Virtual deduction proof of...
en3lplem2VD 44817	Virtual deduction proof of...
en3lpVD 44818	Virtual deduction proof of...
simplbi2VD 44819	Virtual deduction proof of...
3ornot23VD 44820	Virtual deduction proof of...
orbi1rVD 44821	Virtual deduction proof of...
bitr3VD 44822	Virtual deduction proof of...
3orbi123VD 44823	Virtual deduction proof of...
sbc3orgVD 44824	Virtual deduction proof of...
19.21a3con13vVD 44825	Virtual deduction proof of...
exbirVD 44826	Virtual deduction proof of...
exbiriVD 44827	Virtual deduction proof of...
rspsbc2VD 44828	Virtual deduction proof of...
3impexpVD 44829	Virtual deduction proof of...
3impexpbicomVD 44830	Virtual deduction proof of...
3impexpbicomiVD 44831	Virtual deduction proof of...
sbcoreleleqVD 44832	Virtual deduction proof of...
hbra2VD 44833	Virtual deduction proof of...
tratrbVD 44834	Virtual deduction proof of...
al2imVD 44835	Virtual deduction proof of...
syl5impVD 44836	Virtual deduction proof of...
idiVD 44837	Virtual deduction proof of...
ancomstVD 44838	Closed form of ~ ancoms . ...
ssralv2VD 44839	Quantification restricted ...
ordelordALTVD 44840	An element of an ordinal c...
equncomVD 44841	If a class equals the unio...
equncomiVD 44842	Inference form of ~ equnco...
sucidALTVD 44843	A set belongs to its succe...
sucidALT 44844	A set belongs to its succe...
sucidVD 44845	A set belongs to its succe...
imbi12VD 44846	Implication form of ~ imbi...
imbi13VD 44847	Join three logical equival...
sbcim2gVD 44848	Distribution of class subs...
sbcbiVD 44849	Implication form of ~ sbcb...
trsbcVD 44850	Formula-building inference...
truniALTVD 44851	The union of a class of tr...
ee33VD 44852	Non-virtual deduction form...
trintALTVD 44853	The intersection of a clas...
trintALT 44854	The intersection of a clas...
undif3VD 44855	The first equality of Exer...
sbcssgVD 44856	Virtual deduction proof of...
csbingVD 44857	Virtual deduction proof of...
onfrALTlem5VD 44858	Virtual deduction proof of...
onfrALTlem4VD 44859	Virtual deduction proof of...
onfrALTlem3VD 44860	Virtual deduction proof of...
simplbi2comtVD 44861	Virtual deduction proof of...
onfrALTlem2VD 44862	Virtual deduction proof of...
onfrALTlem1VD 44863	Virtual deduction proof of...
onfrALTVD 44864	Virtual deduction proof of...
csbeq2gVD 44865	Virtual deduction proof of...
csbsngVD 44866	Virtual deduction proof of...
csbxpgVD 44867	Virtual deduction proof of...
csbresgVD 44868	Virtual deduction proof of...
csbrngVD 44869	Virtual deduction proof of...
csbima12gALTVD 44870	Virtual deduction proof of...
csbunigVD 44871	Virtual deduction proof of...
csbfv12gALTVD 44872	Virtual deduction proof of...
con5VD 44873	Virtual deduction proof of...
relopabVD 44874	Virtual deduction proof of...
19.41rgVD 44875	Virtual deduction proof of...
2pm13.193VD 44876	Virtual deduction proof of...
hbimpgVD 44877	Virtual deduction proof of...
hbalgVD 44878	Virtual deduction proof of...
hbexgVD 44879	Virtual deduction proof of...
ax6e2eqVD 44880	The following User's Proof...
ax6e2ndVD 44881	The following User's Proof...
ax6e2ndeqVD 44882	The following User's Proof...
2sb5ndVD 44883	The following User's Proof...
2uasbanhVD 44884	The following User's Proof...
e2ebindVD 44885	The following User's Proof...
sb5ALTVD 44886	The following User's Proof...
vk15.4jVD 44887	The following User's Proof...
notnotrALTVD 44888	The following User's Proof...
con3ALTVD 44889	The following User's Proof...
elpwgdedVD 44890	Membership in a power clas...
sspwimp 44891	If a class is a subclass o...
sspwimpVD 44892	The following User's Proof...
sspwimpcf 44893	If a class is a subclass o...
sspwimpcfVD 44894	The following User's Proof...
suctrALTcf 44895	The successor of a transit...
suctrALTcfVD 44896	The following User's Proof...
suctrALT3 44897	The successor of a transit...
sspwimpALT 44898	If a class is a subclass o...
unisnALT 44899	A set equals the union of ...
notnotrALT2 44900	Converse of double negatio...
sspwimpALT2 44901	If a class is a subclass o...
e2ebindALT 44902	Absorption of an existenti...
ax6e2ndALT 44903	If at least two sets exist...
ax6e2ndeqALT 44904	"At least two sets exist" ...
2sb5ndALT 44905	Equivalence for double sub...
chordthmALT 44906	The intersecting chords th...
isosctrlem1ALT 44907	Lemma for ~ isosctr . Thi...
iunconnlem2 44908	The indexed union of conne...
iunconnALT 44909	The indexed union of conne...
sineq0ALT 44910	A complex number whose sin...
trwf 44911	The class of well-founded ...
traxext 44912	A transitive class models ...
wfaxext 44913	The class of well-founded ...
xpwf 44914	The Cartesian product of t...
dmwf 44915	The domain of a well-found...
rnwf 44916	The range of a well-founde...
evth2f 44917	A version of ~ evth2 using...
elunif 44918	A version of ~ eluni using...
rzalf 44919	A version of ~ rzal using ...
fvelrnbf 44920	A version of ~ fvelrnb usi...
rfcnpre1 44921	If F is a continuous funct...
ubelsupr 44922	If U belongs to A and U is...
fsumcnf 44923	A finite sum of functions ...
mulltgt0 44924	The product of a negative ...
rspcegf 44925	A version of ~ rspcev usin...
rabexgf 44926	A version of ~ rabexg usin...
fcnre 44927	A function continuous with...
sumsnd 44928	A sum of a singleton is th...
evthf 44929	A version of ~ evth using ...
cnfex 44930	The class of continuous fu...
fnchoice 44931	For a finite set, a choice...
refsumcn 44932	A finite sum of continuous...
rfcnpre2 44933	If ` F ` is a continuous f...
cncmpmax 44934	When the hypothesis for th...
rfcnpre3 44935	If F is a continuous funct...
rfcnpre4 44936	If F is a continuous funct...
sumpair 44937	Sum of two distinct comple...
rfcnnnub 44938	Given a real continuous fu...
refsum2cnlem1 44939	This is the core Lemma for...
refsum2cn 44940	The sum of two continuus r...
adantlllr 44941	Deduction adding a conjunc...
3adantlr3 44942	Deduction adding a conjunc...
3adantll2 44943	Deduction adding a conjunc...
3adantll3 44944	Deduction adding a conjunc...
ssnel 44945	If not element of a set, t...
sncldre 44946	A singleton is closed w.r....
n0p 44947	A polynomial with a nonzer...
pm2.65ni 44948	Inference rule for proof b...
pwssfi 44949	Every element of the power...
iuneq2df 44950	Equality deduction for ind...
nnfoctb 44951	There exists a mapping fro...
ssinss1d 44952	Intersection preserves sub...
elpwinss 44953	An element of the powerset...
unidmex 44954	If ` F ` is a set, then ` ...
ndisj2 44955	A non-disjointness conditi...
zenom 44956	The set of integer numbers...
uzwo4 44957	Well-ordering principle: a...
unisn0 44958	The union of the singleton...
ssin0 44959	If two classes are disjoin...
inabs3 44960	Absorption law for interse...
pwpwuni 44961	Relationship between power...
disjiun2 44962	In a disjoint collection, ...
0pwfi 44963	The empty set is in any po...
ssinss2d 44964	Intersection preserves sub...
zct 44965	The set of integer numbers...
pwfin0 44966	A finite set always belong...
uzct 44967	An upper integer set is co...
iunxsnf 44968	A singleton index picks ou...
fiiuncl 44969	If a set is closed under t...
iunp1 44970	The addition of the next s...
fiunicl 44971	If a set is closed under t...
ixpeq2d 44972	Equality theorem for infin...
disjxp1 44973	The sets of a cartesian pr...
disjsnxp 44974	The sets in the cartesian ...
eliind 44975	Membership in indexed inte...
rspcef 44976	Restricted existential spe...
ixpssmapc 44977	An infinite Cartesian prod...
elintd 44978	Membership in class inters...
ssdf 44979	A sufficient condition for...
brneqtrd 44980	Substitution of equal clas...
ssnct 44981	A set containing an uncoun...
ssuniint 44982	Sufficient condition for b...
elintdv 44983	Membership in class inters...
ssd 44984	A sufficient condition for...
ralimralim 44985	Introducing any antecedent...
snelmap 44986	Membership of the element ...
xrnmnfpnf 44987	An extended real that is n...
nelrnmpt 44988	Non-membership in the rang...
iuneq1i 44989	Equality theorem for index...
nssrex 44990	Negation of subclass relat...
ssinc 44991	Inclusion relation for a m...
ssdec 44992	Inclusion relation for a m...
elixpconstg 44993	Membership in an infinite ...
iineq1d 44994	Equality theorem for index...
metpsmet 44995	A metric is a pseudometric...
ixpssixp 44996	Subclass theorem for infin...
ballss3 44997	A sufficient condition for...
iunincfi 44998	Given a sequence of increa...
nsstr 44999	If it's not a subclass, it...
rexanuz3 45000	Combine two different uppe...
cbvmpo2 45001	Rule to change the second ...
cbvmpo1 45002	Rule to change the first b...
eliuniin 45003	Indexed union of indexed i...
ssabf 45004	Subclass of a class abstra...
pssnssi 45005	A proper subclass does not...
rabidim2 45006	Membership in a restricted...
eluni2f 45007	Membership in class union....
eliin2f 45008	Membership in indexed inte...
nssd 45009	Negation of subclass relat...
iineq12dv 45010	Equality deduction for ind...
supxrcld 45011	The supremum of an arbitra...
elrestd 45012	A sufficient condition for...
eliuniincex 45013	Counterexample to show tha...
eliincex 45014	Counterexample to show tha...
eliinid 45015	Membership in an indexed i...
abssf 45016	Class abstraction in a sub...
supxrubd 45017	A member of a set of exten...
ssrabf 45018	Subclass of a restricted c...
ssrabdf 45019	Subclass of a restricted c...
eliin2 45020	Membership in indexed inte...
ssrab2f 45021	Subclass relation for a re...
restuni3 45022	The underlying set of a su...
rabssf 45023	Restricted class abstracti...
eliuniin2 45024	Indexed union of indexed i...
restuni4 45025	The underlying set of a su...
restuni6 45026	The underlying set of a su...
restuni5 45027	The underlying set of a su...
unirestss 45028	The union of an elementwis...
iniin1 45029	Indexed intersection of in...
iniin2 45030	Indexed intersection of in...
cbvrabv2 45031	A more general version of ...
cbvrabv2w 45032	A more general version of ...
iinssiin 45033	Subset implication for an ...
eliind2 45034	Membership in indexed inte...
iinssd 45035	Subset implication for an ...
rabbida2 45036	Equivalent wff's yield equ...
iinexd 45037	The existence of an indexe...
rabexf 45038	Separation Scheme in terms...
rabbida3 45039	Equivalent wff's yield equ...
r19.36vf 45040	Restricted quantifier vers...
raleqd 45041	Equality deduction for res...
iinssf 45042	Subset implication for an ...
iinssdf 45043	Subset implication for an ...
resabs2i 45044	Absorption law for restric...
ssdf2 45045	A sufficient condition for...
rabssd 45046	Restricted class abstracti...
rexnegd 45047	Minus a real number. (Con...
rexlimd3 45048	* Inference from Theorem 1...
resabs1i 45049	Absorption law for restric...
nel1nelin 45050	Membership in an intersect...
nel2nelin 45051	Membership in an intersect...
nel1nelini 45052	Membership in an intersect...
nel2nelini 45053	Membership in an intersect...
eliunid 45054	Membership in indexed unio...
reximdd 45055	Deduction from Theorem 19....
inopnd 45056	The intersection of two op...
ss2rabdf 45057	Deduction of restricted ab...
restopn3 45058	If ` A ` is open, then ` A...
restopnssd 45059	A topology restricted to a...
restsubel 45060	A subset belongs in the sp...
toprestsubel 45061	A subset is open in the to...
rabidd 45062	An "identity" law of concr...
iunssdf 45063	Subset theorem for an inde...
iinss2d 45064	Subset implication for an ...
r19.3rzf 45065	Restricted quantification ...
r19.28zf 45066	Restricted quantifier vers...
iindif2f 45067	Indexed intersection of cl...
ralfal 45068	Two ways of expressing emp...
archd 45069	Archimedean property of re...
eliund 45070	Membership in indexed unio...
nimnbi 45071	If an implication is false...
nimnbi2 45072	If an implication is false...
notbicom 45073	Commutative law for the ne...
rexeqif 45074	Equality inference for res...
rspced 45075	Restricted existential spe...
feq1dd 45076	Equality deduction for fun...
fnresdmss 45077	A function does not change...
fmptsnxp 45078	Maps-to notation and Carte...
fvmpt2bd 45079	Value of a function given ...
rnmptfi 45080	The range of a function wi...
fresin2 45081	Restriction of a function ...
ffi 45082	A function with finite dom...
suprnmpt 45083	An explicit bound for the ...
rnffi 45084	The range of a function wi...
mptelpm 45085	A function in maps-to nota...
rnmptpr 45086	Range of a function define...
resmpti 45087	Restriction of the mapping...
founiiun 45088	Union expressed as an inde...
rnresun 45089	Distribution law for range...
elrnmptf 45090	The range of a function in...
rnmptssrn 45091	Inclusion relation for two...
disjf1 45092	A 1 to 1 mapping built fro...
rnsnf 45093	The range of a function wh...
wessf1ornlem 45094	Given a function ` F ` on ...
wessf1orn 45095	Given a function ` F ` on ...
nelrnres 45096	If ` A ` is not in the ran...
disjrnmpt2 45097	Disjointness of the range ...
elrnmpt1sf 45098	Elementhood in an image se...
founiiun0 45099	Union expressed as an inde...
disjf1o 45100	A bijection built from dis...
disjinfi 45101	Only a finite number of di...
fvovco 45102	Value of the composition o...
ssnnf1octb 45103	There exists a bijection b...
nnf1oxpnn 45104	There is a bijection betwe...
rnmptssd 45105	The range of a function gi...
projf1o 45106	A biijection from a set to...
fvmap 45107	Function value for a membe...
fvixp2 45108	Projection of a factor of ...
choicefi 45109	For a finite set, a choice...
mpct 45110	The exponentiation of a co...
cnmetcoval 45111	Value of the distance func...
fcomptss 45112	Express composition of two...
elmapsnd 45113	Membership in a set expone...
mapss2 45114	Subset inheritance for set...
fsneq 45115	Equality condition for two...
difmap 45116	Difference of two sets exp...
unirnmap 45117	Given a subset of a set ex...
inmap 45118	Intersection of two sets e...
fcoss 45119	Composition of two mapping...
fsneqrn 45120	Equality condition for two...
difmapsn 45121	Difference of two sets exp...
mapssbi 45122	Subset inheritance for set...
unirnmapsn 45123	Equality theorem for a sub...
iunmapss 45124	The indexed union of set e...
ssmapsn 45125	A subset ` C ` of a set ex...
iunmapsn 45126	The indexed union of set e...
absfico 45127	Mapping domain and codomai...
icof 45128	The set of left-closed rig...
elpmrn 45129	The range of a partial fun...
imaexi 45130	The image of a set is a se...
axccdom 45131	Relax the constraint on ax...
dmmptdff 45132	The domain of the mapping ...
dmmptdf 45133	The domain of the mapping ...
elpmi2 45134	The domain of a partial fu...
dmrelrnrel 45135	A relation preserving func...
fvcod 45136	Value of a function compos...
elrnmpoid 45137	Membership in the range of...
axccd 45138	An alternative version of ...
axccd2 45139	An alternative version of ...
feqresmptf 45140	Express a restricted funct...
dmmptssf 45141	The domain of a mapping is...
dmmptdf2 45142	The domain of the mapping ...
dmuz 45143	Domain of the upper intege...
fmptd2f 45144	Domain and codomain of the...
mpteq1df 45145	An equality theorem for th...
mpteq1dfOLD 45146	Obsolete version of ~ mpte...
mptexf 45147	If the domain of a functio...
fvmpt4 45148	Value of a function given ...
fmptf 45149	Functionality of the mappi...
resimass 45150	The image of a restriction...
mptssid 45151	The mapping operation expr...
mptfnd 45152	The maps-to notation defin...
mpteq12daOLD 45153	Obsolete version of ~ mpte...
rnmptlb 45154	Boundness below of the ran...
rnmptbddlem 45155	Boundness of the range of ...
rnmptbdd 45156	Boundness of the range of ...
funimaeq 45157	Membership relation for th...
rnmptssf 45158	The range of a function gi...
rnmptbd2lem 45159	Boundness below of the ran...
rnmptbd2 45160	Boundness below of the ran...
infnsuprnmpt 45161	The indexed infimum of rea...
suprclrnmpt 45162	Closure of the indexed sup...
suprubrnmpt2 45163	A member of a nonempty ind...
suprubrnmpt 45164	A member of a nonempty ind...
rnmptssdf 45165	The range of a function gi...
rnmptbdlem 45166	Boundness above of the ran...
rnmptbd 45167	Boundness above of the ran...
rnmptss2 45168	The range of a function gi...
elmptima 45169	The image of a function in...
ralrnmpt3 45170	A restricted quantifier ov...
fvelima2 45171	Function value in an image...
rnmptssbi 45172	The range of a function gi...
imass2d 45173	Subset theorem for image. ...
imassmpt 45174	Membership relation for th...
fpmd 45175	A total function is a part...
fconst7 45176	An alternative way to expr...
fnmptif 45177	Functionality and domain o...
dmmptif 45178	Domain of the mapping oper...
mpteq2dfa 45179	Slightly more general equa...
dmmpt1 45180	The domain of the mapping ...
fmptff 45181	Functionality of the mappi...
fvmptelcdmf 45182	The value of a function at...
fmptdff 45183	A version of ~ fmptd using...
fvmpt2df 45184	Deduction version of ~ fvm...
rn1st 45185	The range of a function wi...
rnmptssff 45186	The range of a function gi...
rnmptssdff 45187	The range of a function gi...
fvmpt4d 45188	Value of a function given ...
sub2times 45189	Subtracting from a number,...
nnxrd 45190	A natural number is an ext...
nnxr 45191	A natural number is an ext...
abssubrp 45192	The distance of two distin...
elfzfzo 45193	Relationship between membe...
oddfl 45194	Odd number representation ...
abscosbd 45195	Bound for the absolute val...
mul13d 45196	Commutative/associative la...
negpilt0 45197	Negative ` _pi ` is negati...
dstregt0 45198	A complex number ` A ` tha...
subadd4b 45199	Rearrangement of 4 terms i...
xrlttri5d 45200	Not equal and not larger i...
neglt 45201	The negative of a positive...
zltlesub 45202	If an integer ` N ` is les...
divlt0gt0d 45203	The ratio of a negative nu...
subsub23d 45204	Swap subtrahend and result...
2timesgt 45205	Double of a positive real ...
reopn 45206	The reals are open with re...
sub31 45207	Swap the first and third t...
nnne1ge2 45208	A positive integer which i...
lefldiveq 45209	A closed enough, smaller r...
negsubdi3d 45210	Distribution of negative o...
ltdiv2dd 45211	Division of a positive num...
abssinbd 45212	Bound for the absolute val...
halffl 45213	Floor of ` ( 1 / 2 ) ` . ...
monoords 45214	Ordering relation for a st...
hashssle 45215	The size of a subset of a ...
lttri5d 45216	Not equal and not larger i...
fzisoeu 45217	A finite ordered set has a...
lt3addmuld 45218	If three real numbers are ...
absnpncan2d 45219	Triangular inequality, com...
fperiodmullem 45220	A function with period ` T...
fperiodmul 45221	A function with period T i...
upbdrech 45222	Choice of an upper bound f...
lt4addmuld 45223	If four real numbers are l...
absnpncan3d 45224	Triangular inequality, com...
upbdrech2 45225	Choice of an upper bound f...
ssfiunibd 45226	A finite union of bounded ...
fzdifsuc2 45227	Remove a successor from th...
fzsscn 45228	A finite sequence of integ...
divcan8d 45229	A cancellation law for div...
dmmcand 45230	Cancellation law for divis...
fzssre 45231	A finite sequence of integ...
bccld 45232	A binomial coefficient, in...
leadd12dd 45233	Addition to both sides of ...
fzssnn0 45234	A finite set of sequential...
xreqle 45235	Equality implies 'less tha...
xaddlidd 45236	` 0 ` is a left identity f...
xadd0ge 45237	A number is less than or e...
elfzolem1 45238	A member in a half-open in...
xrgtned 45239	'Greater than' implies not...
xrleneltd 45240	'Less than or equal to' an...
xaddcomd 45241	The extended real addition...
supxrre3 45242	The supremum of a nonempty...
uzfissfz 45243	For any finite subset of t...
xleadd2d 45244	Addition of extended reals...
suprltrp 45245	The supremum of a nonempty...
xleadd1d 45246	Addition of extended reals...
xreqled 45247	Equality implies 'less tha...
xrgepnfd 45248	An extended real greater t...
xrge0nemnfd 45249	A nonnegative extended rea...
supxrgere 45250	If a real number can be ap...
iuneqfzuzlem 45251	Lemma for ~ iuneqfzuz : he...
iuneqfzuz 45252	If two unions indexed by u...
xle2addd 45253	Adding both side of two in...
supxrgelem 45254	If an extended real number...
supxrge 45255	If an extended real number...
suplesup 45256	If any element of ` A ` ca...
infxrglb 45257	The infimum of a set of ex...
xadd0ge2 45258	A number is less than or e...
nepnfltpnf 45259	An extended real that is n...
ltadd12dd 45260	Addition to both sides of ...
nemnftgtmnft 45261	An extended real that is n...
xrgtso 45262	'Greater than' is a strict...
rpex 45263	The positive reals form a ...
xrge0ge0 45264	A nonnegative extended rea...
xrssre 45265	A subset of extended reals...
ssuzfz 45266	A finite subset of the upp...
absfun 45267	The absolute value is a fu...
infrpge 45268	The infimum of a nonempty,...
xrlexaddrp 45269	If an extended real number...
supsubc 45270	The supremum function dist...
xralrple2 45271	Show that ` A ` is less th...
nnuzdisj 45272	The first ` N ` elements o...
ltdivgt1 45273	Divsion by a number greate...
xrltned 45274	'Less than' implies not eq...
nnsplit 45275	Express the set of positiv...
divdiv3d 45276	Division into a fraction. ...
abslt2sqd 45277	Comparison of the square o...
qenom 45278	The set of rational number...
qct 45279	The set of rational number...
xrltnled 45280	'Less than' in terms of 'l...
lenlteq 45281	'less than or equal to' bu...
xrred 45282	An extended real that is n...
rr2sscn2 45283	The cartesian square of ` ...
infxr 45284	The infimum of a set of ex...
infxrunb2 45285	The infimum of an unbounde...
infxrbnd2 45286	The infimum of a bounded-b...
infleinflem1 45287	Lemma for ~ infleinf , cas...
infleinflem2 45288	Lemma for ~ infleinf , whe...
infleinf 45289	If any element of ` B ` ca...
xralrple4 45290	Show that ` A ` is less th...
xralrple3 45291	Show that ` A ` is less th...
eluzelzd 45292	A member of an upper set o...
suplesup2 45293	If any element of ` A ` is...
recnnltrp 45294	` N ` is a natural number ...
nnn0 45295	The set of positive intege...
fzct 45296	A finite set of sequential...
rpgtrecnn 45297	Any positive real number i...
fzossuz 45298	A half-open integer interv...
infxrrefi 45299	The real and extended real...
xrralrecnnle 45300	Show that ` A ` is less th...
fzoct 45301	A finite set of sequential...
frexr 45302	A function taking real val...
nnrecrp 45303	The reciprocal of a positi...
reclt0d 45304	The reciprocal of a negati...
lt0neg1dd 45305	If a number is negative, i...
infxrcld 45306	The infimum of an arbitrar...
xrralrecnnge 45307	Show that ` A ` is less th...
reclt0 45308	The reciprocal of a negati...
ltmulneg 45309	Multiplying by a negative ...
allbutfi 45310	For all but finitely many....
ltdiv23neg 45311	Swap denominator with othe...
xreqnltd 45312	A consequence of trichotom...
mnfnre2 45313	Minus infinity is not a re...
zssxr 45314	The integers are a subset ...
fisupclrnmpt 45315	A nonempty finite indexed ...
supxrunb3 45316	The supremum of an unbound...
elfzod 45317	Membership in a half-open ...
fimaxre4 45318	A nonempty finite set of r...
ren0 45319	The set of reals is nonemp...
eluzelz2 45320	A member of an upper set o...
resabs2d 45321	Absorption law for restric...
uzid2 45322	Membership of the least me...
supxrleubrnmpt 45323	The supremum of a nonempty...
uzssre2 45324	An upper set of integers i...
uzssd 45325	Subset relationship for tw...
eluzd 45326	Membership in an upper set...
infxrlbrnmpt2 45327	A member of a nonempty ind...
xrre4 45328	An extended real is real i...
uz0 45329	The upper integers functio...
eluzelz2d 45330	A member of an upper set o...
infleinf2 45331	If any element in ` B ` is...
unb2ltle 45332	"Unbounded below" expresse...
uzidd2 45333	Membership of the least me...
uzssd2 45334	Subset relationship for tw...
rexabslelem 45335	An indexed set of absolute...
rexabsle 45336	An indexed set of absolute...
allbutfiinf 45337	Given a "for all but finit...
supxrrernmpt 45338	The real and extended real...
suprleubrnmpt 45339	The supremum of a nonempty...
infrnmptle 45340	An indexed infimum of exte...
infxrunb3 45341	The infimum of an unbounde...
uzn0d 45342	The upper integers are all...
uzssd3 45343	Subset relationship for tw...
rexabsle2 45344	An indexed set of absolute...
infxrunb3rnmpt 45345	The infimum of an unbounde...
supxrre3rnmpt 45346	The indexed supremum of a ...
uzublem 45347	A set of reals, indexed by...
uzub 45348	A set of reals, indexed by...
ssrexr 45349	A subset of the reals is a...
supxrmnf2 45350	Removing minus infinity fr...
supxrcli 45351	The supremum of an arbitra...
uzid3 45352	Membership of the least me...
infxrlesupxr 45353	The supremum of a nonempty...
xnegeqd 45354	Equality of two extended n...
xnegrecl 45355	The extended real negative...
xnegnegi 45356	Extended real version of ~...
xnegeqi 45357	Equality of two extended n...
nfxnegd 45358	Deduction version of ~ nfx...
xnegnegd 45359	Extended real version of ~...
uzred 45360	An upper integer is a real...
xnegcli 45361	Closure of extended real n...
supminfrnmpt 45362	The indexed supremum of a ...
infxrpnf 45363	Adding plus infinity to a ...
infxrrnmptcl 45364	The infimum of an arbitrar...
leneg2d 45365	Negative of one side of 'l...
supxrltinfxr 45366	The supremum of the empty ...
max1d 45367	A number is less than or e...
supxrleubrnmptf 45368	The supremum of a nonempty...
nleltd 45369	'Not less than or equal to...
zxrd 45370	An integer is an extended ...
infxrgelbrnmpt 45371	The infimum of an indexed ...
rphalfltd 45372	Half of a positive real is...
uzssz2 45373	An upper set of integers i...
leneg3d 45374	Negative of one side of 'l...
max2d 45375	A number is less than or e...
uzn0bi 45376	The upper integers functio...
xnegrecl2 45377	If the extended real negat...
nfxneg 45378	Bound-variable hypothesis ...
uzxrd 45379	An upper integer is an ext...
infxrpnf2 45380	Removing plus infinity fro...
supminfxr 45381	The extended real suprema ...
infrpgernmpt 45382	The infimum of a nonempty,...
xnegre 45383	An extended real is real i...
xnegrecl2d 45384	If the extended real negat...
uzxr 45385	An upper integer is an ext...
supminfxr2 45386	The extended real suprema ...
xnegred 45387	An extended real is real i...
supminfxrrnmpt 45388	The indexed supremum of a ...
min1d 45389	The minimum of two numbers...
min2d 45390	The minimum of two numbers...
pnfged 45391	Plus infinity is an upper ...
xrnpnfmnf 45392	An extended real that is n...
uzsscn 45393	An upper set of integers i...
absimnre 45394	The absolute value of the ...
uzsscn2 45395	An upper set of integers i...
xrtgcntopre 45396	The standard topologies on...
absimlere 45397	The absolute value of the ...
rpssxr 45398	The positive reals are a s...
monoordxrv 45399	Ordering relation for a mo...
monoordxr 45400	Ordering relation for a mo...
monoord2xrv 45401	Ordering relation for a mo...
monoord2xr 45402	Ordering relation for a mo...
xrpnf 45403	An extended real is plus i...
xlenegcon1 45404	Extended real version of ~...
xlenegcon2 45405	Extended real version of ~...
pimxrneun 45406	The preimage of a set of e...
caucvgbf 45407	A function is convergent i...
cvgcau 45408	A convergent function is C...
cvgcaule 45409	A convergent function is C...
rexanuz2nf 45410	A simple counterexample re...
gtnelioc 45411	A real number larger than ...
ioossioc 45412	An open interval is a subs...
ioondisj2 45413	A condition for two open i...
ioondisj1 45414	A condition for two open i...
ioogtlb 45415	An element of a closed int...
evthiccabs 45416	Extreme Value Theorem on y...
ltnelicc 45417	A real number smaller than...
eliood 45418	Membership in an open real...
iooabslt 45419	An upper bound for the dis...
gtnelicc 45420	A real number greater than...
iooinlbub 45421	An open interval has empty...
iocgtlb 45422	An element of a left-open ...
iocleub 45423	An element of a left-open ...
eliccd 45424	Membership in a closed rea...
eliccre 45425	A member of a closed inter...
eliooshift 45426	Element of an open interva...
eliocd 45427	Membership in a left-open ...
icoltub 45428	An element of a left-close...
eliocre 45429	A member of a left-open ri...
iooltub 45430	An element of an open inte...
ioontr 45431	The interior of an interva...
snunioo1 45432	The closure of one end of ...
lbioc 45433	A left-open right-closed i...
ioomidp 45434	The midpoint is an element...
iccdifioo 45435	If the open inverval is re...
iccdifprioo 45436	An open interval is the cl...
ioossioobi 45437	Biconditional form of ~ io...
iccshift 45438	A closed interval shifted ...
iccsuble 45439	An upper bound to the dist...
iocopn 45440	A left-open right-closed i...
eliccelioc 45441	Membership in a closed int...
iooshift 45442	An open interval shifted b...
iccintsng 45443	Intersection of two adiace...
icoiccdif 45444	Left-closed right-open int...
icoopn 45445	A left-closed right-open i...
icoub 45446	A left-closed, right-open ...
eliccxrd 45447	Membership in a closed rea...
pnfel0pnf 45448	` +oo ` is a nonnegative e...
eliccnelico 45449	An element of a closed int...
eliccelicod 45450	A member of a closed inter...
ge0xrre 45451	A nonnegative extended rea...
ge0lere 45452	A nonnegative extended Rea...
elicores 45453	Membership in a left-close...
inficc 45454	The infimum of a nonempty ...
qinioo 45455	The rational numbers are d...
lenelioc 45456	A real number smaller than...
ioonct 45457	A nonempty open interval i...
xrgtnelicc 45458	A real number greater than...
iccdificc 45459	The difference of two clos...
iocnct 45460	A nonempty left-open, righ...
iccnct 45461	A closed interval, with mo...
iooiinicc 45462	A closed interval expresse...
iccgelbd 45463	An element of a closed int...
iooltubd 45464	An element of an open inte...
icoltubd 45465	An element of a left-close...
qelioo 45466	The rational numbers are d...
tgqioo2 45467	Every open set of reals is...
iccleubd 45468	An element of a closed int...
elioored 45469	A member of an open interv...
ioogtlbd 45470	An element of a closed int...
ioofun 45471	` (,) ` is a function. (C...
icomnfinre 45472	A left-closed, right-open,...
sqrlearg 45473	The square compared with i...
ressiocsup 45474	If the supremum belongs to...
ressioosup 45475	If the supremum does not b...
iooiinioc 45476	A left-open, right-closed ...
ressiooinf 45477	If the infimum does not be...
icogelbd 45478	An element of a left-close...
iocleubd 45479	An element of a left-open ...
uzinico 45480	An upper interval of integ...
preimaiocmnf 45481	Preimage of a right-closed...
uzinico2 45482	An upper interval of integ...
uzinico3 45483	An upper interval of integ...
icossico2 45484	Condition for a closed-bel...
dmico 45485	The domain of the closed-b...
ndmico 45486	The closed-below, open-abo...
uzubioo 45487	The upper integers are unb...
uzubico 45488	The upper integers are unb...
uzubioo2 45489	The upper integers are unb...
uzubico2 45490	The upper integers are unb...
iocgtlbd 45491	An element of a left-open ...
xrtgioo2 45492	The topology on the extend...
tgioo4 45493	The standard topology on t...
fsummulc1f 45494	Closure of a finite sum of...
fsumnncl 45495	Closure of a nonempty, fin...
fsumge0cl 45496	The finite sum of nonnegat...
fsumf1of 45497	Re-index a finite sum usin...
fsumiunss 45498	Sum over a disjoint indexe...
fsumreclf 45499	Closure of a finite sum of...
fsumlessf 45500	A shorter sum of nonnegati...
fsumsupp0 45501	Finite sum of function val...
fsumsermpt 45502	A finite sum expressed in ...
fmul01 45503	Multiplying a finite numbe...
fmulcl 45504	If ' Y ' is closed under t...
fmuldfeqlem1 45505	induction step for the pro...
fmuldfeq 45506	X and Z are two equivalent...
fmul01lt1lem1 45507	Given a finite multiplicat...
fmul01lt1lem2 45508	Given a finite multiplicat...
fmul01lt1 45509	Given a finite multiplicat...
cncfmptss 45510	A continuous complex funct...
rrpsscn 45511	The positive reals are a s...
mulc1cncfg 45512	A version of ~ mulc1cncf u...
infrglb 45513	The infimum of a nonempty ...
expcnfg 45514	If ` F ` is a complex cont...
prodeq2ad 45515	Equality deduction for pro...
fprodsplit1 45516	Separate out a term in a f...
fprodexp 45517	Positive integer exponenti...
fprodabs2 45518	The absolute value of a fi...
fprod0 45519	A finite product with a ze...
mccllem 45520	* Induction step for ~ mcc...
mccl 45521	A multinomial coefficient,...
fprodcnlem 45522	A finite product of functi...
fprodcn 45523	A finite product of functi...
clim1fr1 45524	A class of sequences of fr...
isumneg 45525	Negation of a converging s...
climrec 45526	Limit of the reciprocal of...
climmulf 45527	A version of ~ climmul usi...
climexp 45528	The limit of natural power...
climinf 45529	A bounded monotonic noninc...
climsuselem1 45530	The subsequence index ` I ...
climsuse 45531	A subsequence ` G ` of a c...
climrecf 45532	A version of ~ climrec usi...
climneg 45533	Complex limit of the negat...
climinff 45534	A version of ~ climinf usi...
climdivf 45535	Limit of the ratio of two ...
climreeq 45536	If ` F ` is a real functio...
ellimciota 45537	An explicit value for the ...
climaddf 45538	A version of ~ climadd usi...
mullimc 45539	Limit of the product of tw...
ellimcabssub0 45540	An equivalent condition fo...
limcdm0 45541	If a function has empty do...
islptre 45542	An equivalence condition f...
limccog 45543	Limit of the composition o...
limciccioolb 45544	The limit of a function at...
climf 45545	Express the predicate: Th...
mullimcf 45546	Limit of the multiplicatio...
constlimc 45547	Limit of constant function...
rexlim2d 45548	Inference removing two res...
idlimc 45549	Limit of the identity func...
divcnvg 45550	The sequence of reciprocal...
limcperiod 45551	If ` F ` is a periodic fun...
limcrecl 45552	If ` F ` is a real-valued ...
sumnnodd 45553	A series indexed by ` NN `...
lptioo2 45554	The upper bound of an open...
lptioo1 45555	The lower bound of an open...
elprn1 45556	A member of an unordered p...
elprn2 45557	A member of an unordered p...
limcmptdm 45558	The domain of a maps-to fu...
clim2f 45559	Express the predicate: Th...
limcicciooub 45560	The limit of a function at...
ltmod 45561	A sufficient condition for...
islpcn 45562	A characterization for a l...
lptre2pt 45563	If a set in the real line ...
limsupre 45564	If a sequence is bounded, ...
limcresiooub 45565	The left limit doesn't cha...
limcresioolb 45566	The right limit doesn't ch...
limcleqr 45567	If the left and the right ...
lptioo2cn 45568	The upper bound of an open...
lptioo1cn 45569	The lower bound of an open...
neglimc 45570	Limit of the negative func...
addlimc 45571	Sum of two limits. (Contr...
0ellimcdiv 45572	If the numerator converges...
clim2cf 45573	Express the predicate ` F ...
limclner 45574	For a limit point, both fr...
sublimc 45575	Subtraction of two limits....
reclimc 45576	Limit of the reciprocal of...
clim0cf 45577	Express the predicate ` F ...
limclr 45578	For a limit point, both fr...
divlimc 45579	Limit of the quotient of t...
expfac 45580	Factorial grows faster tha...
climconstmpt 45581	A constant sequence conver...
climresmpt 45582	A function restricted to u...
climsubmpt 45583	Limit of the difference of...
climsubc2mpt 45584	Limit of the difference of...
climsubc1mpt 45585	Limit of the difference of...
fnlimfv 45586	The value of the limit fun...
climreclf 45587	The limit of a convergent ...
climeldmeq 45588	Two functions that are eve...
climf2 45589	Express the predicate: Th...
fnlimcnv 45590	The sequence of function v...
climeldmeqmpt 45591	Two functions that are eve...
climfveq 45592	Two functions that are eve...
clim2f2 45593	Express the predicate: Th...
climfveqmpt 45594	Two functions that are eve...
climd 45595	Express the predicate: Th...
clim2d 45596	The limit of complex numbe...
fnlimfvre 45597	The limit function of real...
allbutfifvre 45598	Given a sequence of real-v...
climleltrp 45599	The limit of complex numbe...
fnlimfvre2 45600	The limit function of real...
fnlimf 45601	The limit function of real...
fnlimabslt 45602	A sequence of function val...
climfveqf 45603	Two functions that are eve...
climmptf 45604	Exhibit a function ` G ` w...
climfveqmpt3 45605	Two functions that are eve...
climeldmeqf 45606	Two functions that are eve...
climreclmpt 45607	The limit of B convergent ...
limsupref 45608	If a sequence is bounded, ...
limsupbnd1f 45609	If a sequence is eventuall...
climbddf 45610	A converging sequence of c...
climeqf 45611	Two functions that are eve...
climeldmeqmpt3 45612	Two functions that are eve...
limsupcld 45613	Closure of the superior li...
climfv 45614	The limit of a convergent ...
limsupval3 45615	The superior limit of an i...
climfveqmpt2 45616	Two functions that are eve...
limsup0 45617	The superior limit of the ...
climeldmeqmpt2 45618	Two functions that are eve...
limsupresre 45619	The supremum limit of a fu...
climeqmpt 45620	Two functions that are eve...
climfvd 45621	The limit of a convergent ...
limsuplesup 45622	An upper bound for the sup...
limsupresico 45623	The superior limit doesn't...
limsuppnfdlem 45624	If the restriction of a fu...
limsuppnfd 45625	If the restriction of a fu...
limsupresuz 45626	If the real part of the do...
limsupub 45627	If the limsup is not ` +oo...
limsupres 45628	The superior limit of a re...
climinf2lem 45629	A convergent, nonincreasin...
climinf2 45630	A convergent, nonincreasin...
limsupvaluz 45631	The superior limit, when t...
limsupresuz2 45632	If the domain of a functio...
limsuppnflem 45633	If the restriction of a fu...
limsuppnf 45634	If the restriction of a fu...
limsupubuzlem 45635	If the limsup is not ` +oo...
limsupubuz 45636	For a real-valued function...
climinf2mpt 45637	A bounded below, monotonic...
climinfmpt 45638	A bounded below, monotonic...
climinf3 45639	A convergent, nonincreasin...
limsupvaluzmpt 45640	The superior limit, when t...
limsupequzmpt2 45641	Two functions that are eve...
limsupubuzmpt 45642	If the limsup is not ` +oo...
limsupmnflem 45643	The superior limit of a fu...
limsupmnf 45644	The superior limit of a fu...
limsupequzlem 45645	Two functions that are eve...
limsupequz 45646	Two functions that are eve...
limsupre2lem 45647	Given a function on the ex...
limsupre2 45648	Given a function on the ex...
limsupmnfuzlem 45649	The superior limit of a fu...
limsupmnfuz 45650	The superior limit of a fu...
limsupequzmptlem 45651	Two functions that are eve...
limsupequzmpt 45652	Two functions that are eve...
limsupre2mpt 45653	Given a function on the ex...
limsupequzmptf 45654	Two functions that are eve...
limsupre3lem 45655	Given a function on the ex...
limsupre3 45656	Given a function on the ex...
limsupre3mpt 45657	Given a function on the ex...
limsupre3uzlem 45658	Given a function on the ex...
limsupre3uz 45659	Given a function on the ex...
limsupreuz 45660	Given a function on the re...
limsupvaluz2 45661	The superior limit, when t...
limsupreuzmpt 45662	Given a function on the re...
supcnvlimsup 45663	If a function on a set of ...
supcnvlimsupmpt 45664	If a function on a set of ...
0cnv 45665	If ` (/) ` is a complex nu...
climuzlem 45666	Express the predicate: Th...
climuz 45667	Express the predicate: Th...
lmbr3v 45668	Express the binary relatio...
climisp 45669	If a sequence converges to...
lmbr3 45670	Express the binary relatio...
climrescn 45671	A sequence converging w.r....
climxrrelem 45672	If a sequence ranging over...
climxrre 45673	If a sequence ranging over...
limsuplt2 45676	The defining property of t...
liminfgord 45677	Ordering property of the i...
limsupvald 45678	The superior limit of a se...
limsupresicompt 45679	The superior limit doesn't...
limsupcli 45680	Closure of the superior li...
liminfgf 45681	Closure of the inferior li...
liminfval 45682	The inferior limit of a se...
climlimsup 45683	A sequence of real numbers...
limsupge 45684	The defining property of t...
liminfgval 45685	Value of the inferior limi...
liminfcl 45686	Closure of the inferior li...
liminfvald 45687	The inferior limit of a se...
liminfval5 45688	The inferior limit of an i...
limsupresxr 45689	The superior limit of a fu...
liminfresxr 45690	The inferior limit of a fu...
liminfval2 45691	The superior limit, relati...
climlimsupcex 45692	Counterexample for ~ climl...
liminfcld 45693	Closure of the inferior li...
liminfresico 45694	The inferior limit doesn't...
limsup10exlem 45695	The range of the given fun...
limsup10ex 45696	The superior limit of a fu...
liminf10ex 45697	The inferior limit of a fu...
liminflelimsuplem 45698	The superior limit is grea...
liminflelimsup 45699	The superior limit is grea...
limsupgtlem 45700	For any positive real, the...
limsupgt 45701	Given a sequence of real n...
liminfresre 45702	The inferior limit of a fu...
liminfresicompt 45703	The inferior limit doesn't...
liminfltlimsupex 45704	An example where the ` lim...
liminfgelimsup 45705	The inferior limit is grea...
liminfvalxr 45706	Alternate definition of ` ...
liminfresuz 45707	If the real part of the do...
liminflelimsupuz 45708	The superior limit is grea...
liminfvalxrmpt 45709	Alternate definition of ` ...
liminfresuz2 45710	If the domain of a functio...
liminfgelimsupuz 45711	The inferior limit is grea...
liminfval4 45712	Alternate definition of ` ...
liminfval3 45713	Alternate definition of ` ...
liminfequzmpt2 45714	Two functions that are eve...
liminfvaluz 45715	Alternate definition of ` ...
liminf0 45716	The inferior limit of the ...
limsupval4 45717	Alternate definition of ` ...
liminfvaluz2 45718	Alternate definition of ` ...
liminfvaluz3 45719	Alternate definition of ` ...
liminflelimsupcex 45720	A counterexample for ~ lim...
limsupvaluz3 45721	Alternate definition of ` ...
liminfvaluz4 45722	Alternate definition of ` ...
limsupvaluz4 45723	Alternate definition of ` ...
climliminflimsupd 45724	If a sequence of real numb...
liminfreuzlem 45725	Given a function on the re...
liminfreuz 45726	Given a function on the re...
liminfltlem 45727	Given a sequence of real n...
liminflt 45728	Given a sequence of real n...
climliminf 45729	A sequence of real numbers...
liminflimsupclim 45730	A sequence of real numbers...
climliminflimsup 45731	A sequence of real numbers...
climliminflimsup2 45732	A sequence of real numbers...
climliminflimsup3 45733	A sequence of real numbers...
climliminflimsup4 45734	A sequence of real numbers...
limsupub2 45735	A extended real valued fun...
limsupubuz2 45736	A sequence with values in ...
xlimpnfxnegmnf 45737	A sequence converges to ` ...
liminflbuz2 45738	A sequence with values in ...
liminfpnfuz 45739	The inferior limit of a fu...
liminflimsupxrre 45740	A sequence with values in ...
xlimrel 45743	The limit on extended real...
xlimres 45744	A function converges iff i...
xlimcl 45745	The limit of a sequence of...
rexlimddv2 45746	Restricted existential eli...
xlimclim 45747	Given a sequence of reals,...
xlimconst 45748	A constant sequence conver...
climxlim 45749	A converging sequence in t...
xlimbr 45750	Express the binary relatio...
fuzxrpmcn 45751	A function mapping from an...
cnrefiisplem 45752	Lemma for ~ cnrefiisp (som...
cnrefiisp 45753	A non-real, complex number...
xlimxrre 45754	If a sequence ranging over...
xlimmnfvlem1 45755	Lemma for ~ xlimmnfv : the...
xlimmnfvlem2 45756	Lemma for ~ xlimmnf : the ...
xlimmnfv 45757	A function converges to mi...
xlimconst2 45758	A sequence that eventually...
xlimpnfvlem1 45759	Lemma for ~ xlimpnfv : the...
xlimpnfvlem2 45760	Lemma for ~ xlimpnfv : the...
xlimpnfv 45761	A function converges to pl...
xlimclim2lem 45762	Lemma for ~ xlimclim2 . H...
xlimclim2 45763	Given a sequence of extend...
xlimmnf 45764	A function converges to mi...
xlimpnf 45765	A function converges to pl...
xlimmnfmpt 45766	A function converges to pl...
xlimpnfmpt 45767	A function converges to pl...
climxlim2lem 45768	In this lemma for ~ climxl...
climxlim2 45769	A sequence of extended rea...
dfxlim2v 45770	An alternative definition ...
dfxlim2 45771	An alternative definition ...
climresd 45772	A function restricted to u...
climresdm 45773	A real function converges ...
dmclimxlim 45774	A real valued sequence tha...
xlimmnflimsup2 45775	A sequence of extended rea...
xlimuni 45776	An infinite sequence conve...
xlimclimdm 45777	A sequence of extended rea...
xlimfun 45778	The convergence relation o...
xlimmnflimsup 45779	If a sequence of extended ...
xlimdm 45780	Two ways to express that a...
xlimpnfxnegmnf2 45781	A sequence converges to ` ...
xlimresdm 45782	A function converges in th...
xlimpnfliminf 45783	If a sequence of extended ...
xlimpnfliminf2 45784	A sequence of extended rea...
xlimliminflimsup 45785	A sequence of extended rea...
xlimlimsupleliminf 45786	A sequence of extended rea...
coseq0 45787	A complex number whose cos...
sinmulcos 45788	Multiplication formula for...
coskpi2 45789	The cosine of an integer m...
cosnegpi 45790	The cosine of negative ` _...
sinaover2ne0 45791	If ` A ` in ` ( 0 , 2 _pi ...
cosknegpi 45792	The cosine of an integer m...
mulcncff 45793	The multiplication of two ...
cncfmptssg 45794	A continuous complex funct...
constcncfg 45795	A constant function is a c...
idcncfg 45796	The identity function is a...
cncfshift 45797	A periodic continuous func...
resincncf 45798	` sin ` restricted to real...
addccncf2 45799	Adding a constant is a con...
0cnf 45800	The empty set is a continu...
fsumcncf 45801	The finite sum of continuo...
cncfperiod 45802	A periodic continuous func...
subcncff 45803	The subtraction of two con...
negcncfg 45804	The opposite of a continuo...
cnfdmsn 45805	A function with a singleto...
cncfcompt 45806	Composition of continuous ...
addcncff 45807	The sum of two continuous ...
ioccncflimc 45808	Limit at the upper bound o...
cncfuni 45809	A complex function on a su...
icccncfext 45810	A continuous function on a...
cncficcgt0 45811	A the absolute value of a ...
icocncflimc 45812	Limit at the lower bound, ...
cncfdmsn 45813	A complex function with a ...
divcncff 45814	The quotient of two contin...
cncfshiftioo 45815	A periodic continuous func...
cncfiooicclem1 45816	A continuous function ` F ...
cncfiooicc 45817	A continuous function ` F ...
cncfiooiccre 45818	A continuous function ` F ...
cncfioobdlem 45819	` G ` actually extends ` F...
cncfioobd 45820	A continuous function ` F ...
jumpncnp 45821	Jump discontinuity or disc...
cxpcncf2 45822	The complex power function...
fprodcncf 45823	The finite product of cont...
add1cncf 45824	Addition to a constant is ...
add2cncf 45825	Addition to a constant is ...
sub1cncfd 45826	Subtracting a constant is ...
sub2cncfd 45827	Subtraction from a constan...
fprodsub2cncf 45828	` F ` is continuous. (Con...
fprodadd2cncf 45829	` F ` is continuous. (Con...
fprodsubrecnncnvlem 45830	The sequence ` S ` of fini...
fprodsubrecnncnv 45831	The sequence ` S ` of fini...
fprodaddrecnncnvlem 45832	The sequence ` S ` of fini...
fprodaddrecnncnv 45833	The sequence ` S ` of fini...
dvsinexp 45834	The derivative of sin^N . ...
dvcosre 45835	The real derivative of the...
dvsinax 45836	Derivative exercise: the d...
dvsubf 45837	The subtraction rule for e...
dvmptconst 45838	Function-builder for deriv...
dvcnre 45839	From complex differentiati...
dvmptidg 45840	Function-builder for deriv...
dvresntr 45841	Function-builder for deriv...
fperdvper 45842	The derivative of a period...
dvasinbx 45843	Derivative exercise: the d...
dvresioo 45844	Restriction of a derivativ...
dvdivf 45845	The quotient rule for ever...
dvdivbd 45846	A sufficient condition for...
dvsubcncf 45847	A sufficient condition for...
dvmulcncf 45848	A sufficient condition for...
dvcosax 45849	Derivative exercise: the d...
dvdivcncf 45850	A sufficient condition for...
dvbdfbdioolem1 45851	Given a function with boun...
dvbdfbdioolem2 45852	A function on an open inte...
dvbdfbdioo 45853	A function on an open inte...
ioodvbdlimc1lem1 45854	If ` F ` has bounded deriv...
ioodvbdlimc1lem2 45855	Limit at the lower bound o...
ioodvbdlimc1 45856	A real function with bound...
ioodvbdlimc2lem 45857	Limit at the upper bound o...
ioodvbdlimc2 45858	A real function with bound...
dvdmsscn 45859	` X ` is a subset of ` CC ...
dvmptmulf 45860	Function-builder for deriv...
dvnmptdivc 45861	Function-builder for itera...
dvdsn1add 45862	If ` K ` divides ` N ` but...
dvxpaek 45863	Derivative of the polynomi...
dvnmptconst 45864	The ` N ` -th derivative o...
dvnxpaek 45865	The ` n ` -th derivative o...
dvnmul 45866	Function-builder for the `...
dvmptfprodlem 45867	Induction step for ~ dvmpt...
dvmptfprod 45868	Function-builder for deriv...
dvnprodlem1 45869	` D ` is bijective. (Cont...
dvnprodlem2 45870	Induction step for ~ dvnpr...
dvnprodlem3 45871	The multinomial formula fo...
dvnprod 45872	The multinomial formula fo...
itgsin0pilem1 45873	Calculation of the integra...
ibliccsinexp 45874	sin^n on a closed interval...
itgsin0pi 45875	Calculation of the integra...
iblioosinexp 45876	sin^n on an open integral ...
itgsinexplem1 45877	Integration by parts is ap...
itgsinexp 45878	A recursive formula for th...
iblconstmpt 45879	A constant function is int...
itgeq1d 45880	Equality theorem for an in...
mbfres2cn 45881	Measurability of a piecewi...
vol0 45882	The measure of the empty s...
ditgeqiooicc 45883	A function ` F ` on an ope...
volge0 45884	The volume of a set is alw...
cnbdibl 45885	A continuous bounded funct...
snmbl 45886	A singleton is measurable....
ditgeq3d 45887	Equality theorem for the d...
iblempty 45888	The empty function is inte...
iblsplit 45889	The union of two integrabl...
volsn 45890	A singleton has 0 Lebesgue...
itgvol0 45891	If the domani is negligibl...
itgcoscmulx 45892	Exercise: the integral of ...
iblsplitf 45893	A version of ~ iblsplit us...
ibliooicc 45894	If a function is integrabl...
volioc 45895	The measure of a left-open...
iblspltprt 45896	If a function is integrabl...
itgsincmulx 45897	Exercise: the integral of ...
itgsubsticclem 45898	lemma for ~ itgsubsticc . ...
itgsubsticc 45899	Integration by u-substitut...
itgioocnicc 45900	The integral of a piecewis...
iblcncfioo 45901	A continuous function ` F ...
itgspltprt 45902	The ` S. ` integral splits...
itgiccshift 45903	The integral of a function...
itgperiod 45904	The integral of a periodic...
itgsbtaddcnst 45905	Integral substitution, add...
volico 45906	The measure of left-closed...
sublevolico 45907	The Lebesgue measure of a ...
dmvolss 45908	Lebesgue measurable sets a...
ismbl3 45909	The predicate " ` A ` is L...
volioof 45910	The function that assigns ...
ovolsplit 45911	The Lebesgue outer measure...
fvvolioof 45912	The function value of the ...
volioore 45913	The measure of an open int...
fvvolicof 45914	The function value of the ...
voliooico 45915	An open interval and a lef...
ismbl4 45916	The predicate " ` A ` is L...
volioofmpt 45917	` ( ( vol o. (,) ) o. F ) ...
volicoff 45918	` ( ( vol o. [,) ) o. F ) ...
voliooicof 45919	The Lebesgue measure of op...
volicofmpt 45920	` ( ( vol o. [,) ) o. F ) ...
volicc 45921	The Lebesgue measure of a ...
voliccico 45922	A closed interval and a le...
mbfdmssre 45923	The domain of a measurable...
stoweidlem1 45924	Lemma for ~ stoweid . Thi...
stoweidlem2 45925	lemma for ~ stoweid : here...
stoweidlem3 45926	Lemma for ~ stoweid : if `...
stoweidlem4 45927	Lemma for ~ stoweid : a cl...
stoweidlem5 45928	There exists a δ as ...
stoweidlem6 45929	Lemma for ~ stoweid : two ...
stoweidlem7 45930	This lemma is used to prov...
stoweidlem8 45931	Lemma for ~ stoweid : two ...
stoweidlem9 45932	Lemma for ~ stoweid : here...
stoweidlem10 45933	Lemma for ~ stoweid . Thi...
stoweidlem11 45934	This lemma is used to prov...
stoweidlem12 45935	Lemma for ~ stoweid . Thi...
stoweidlem13 45936	Lemma for ~ stoweid . Thi...
stoweidlem14 45937	There exists a ` k ` as in...
stoweidlem15 45938	This lemma is used to prov...
stoweidlem16 45939	Lemma for ~ stoweid . The...
stoweidlem17 45940	This lemma proves that the...
stoweidlem18 45941	This theorem proves Lemma ...
stoweidlem19 45942	If a set of real functions...
stoweidlem20 45943	If a set A of real functio...
stoweidlem21 45944	Once the Stone Weierstrass...
stoweidlem22 45945	If a set of real functions...
stoweidlem23 45946	This lemma is used to prov...
stoweidlem24 45947	This lemma proves that for...
stoweidlem25 45948	This lemma proves that for...
stoweidlem26 45949	This lemma is used to prov...
stoweidlem27 45950	This lemma is used to prov...
stoweidlem28 45951	There exists a δ as ...
stoweidlem29 45952	When the hypothesis for th...
stoweidlem30 45953	This lemma is used to prov...
stoweidlem31 45954	This lemma is used to prov...
stoweidlem32 45955	If a set A of real functio...
stoweidlem33 45956	If a set of real functions...
stoweidlem34 45957	This lemma proves that for...
stoweidlem35 45958	This lemma is used to prov...
stoweidlem36 45959	This lemma is used to prov...
stoweidlem37 45960	This lemma is used to prov...
stoweidlem38 45961	This lemma is used to prov...
stoweidlem39 45962	This lemma is used to prov...
stoweidlem40 45963	This lemma proves that q_n...
stoweidlem41 45964	This lemma is used to prov...
stoweidlem42 45965	This lemma is used to prov...
stoweidlem43 45966	This lemma is used to prov...
stoweidlem44 45967	This lemma is used to prov...
stoweidlem45 45968	This lemma proves that, gi...
stoweidlem46 45969	This lemma proves that set...
stoweidlem47 45970	Subtracting a constant fro...
stoweidlem48 45971	This lemma is used to prov...
stoweidlem49 45972	There exists a function q_...
stoweidlem50 45973	This lemma proves that set...
stoweidlem51 45974	There exists a function x ...
stoweidlem52 45975	There exists a neighborhoo...
stoweidlem53 45976	This lemma is used to prov...
stoweidlem54 45977	There exists a function ` ...
stoweidlem55 45978	This lemma proves the exis...
stoweidlem56 45979	This theorem proves Lemma ...
stoweidlem57 45980	There exists a function x ...
stoweidlem58 45981	This theorem proves Lemma ...
stoweidlem59 45982	This lemma proves that the...
stoweidlem60 45983	This lemma proves that the...
stoweidlem61 45984	This lemma proves that the...
stoweidlem62 45985	This theorem proves the St...
stoweid 45986	This theorem proves the St...
stowei 45987	This theorem proves the St...
wallispilem1 45988	` I ` is monotone: increas...
wallispilem2 45989	A first set of properties ...
wallispilem3 45990	I maps to real values. (C...
wallispilem4 45991	` F ` maps to explicit exp...
wallispilem5 45992	The sequence ` H ` converg...
wallispi 45993	Wallis' formula for π :...
wallispi2lem1 45994	An intermediate step betwe...
wallispi2lem2 45995	Two expressions are proven...
wallispi2 45996	An alternative version of ...
stirlinglem1 45997	A simple limit of fraction...
stirlinglem2 45998	` A ` maps to positive rea...
stirlinglem3 45999	Long but simple algebraic ...
stirlinglem4 46000	Algebraic manipulation of ...
stirlinglem5 46001	If ` T ` is between ` 0 ` ...
stirlinglem6 46002	A series that converges to...
stirlinglem7 46003	Algebraic manipulation of ...
stirlinglem8 46004	If ` A ` converges to ` C ...
stirlinglem9 46005	` ( ( B `` N ) - ( B `` ( ...
stirlinglem10 46006	A bound for any B(N)-B(N +...
stirlinglem11 46007	` B ` is decreasing. (Con...
stirlinglem12 46008	The sequence ` B ` is boun...
stirlinglem13 46009	` B ` is decreasing and ha...
stirlinglem14 46010	The sequence ` A ` converg...
stirlinglem15 46011	The Stirling's formula is ...
stirling 46012	Stirling's approximation f...
stirlingr 46013	Stirling's approximation f...
dirkerval 46014	The N_th Dirichlet Kernel....
dirker2re 46015	The Dirichlet Kernel value...
dirkerdenne0 46016	The Dirichlet Kernel denom...
dirkerval2 46017	The N_th Dirichlet Kernel ...
dirkerre 46018	The Dirichlet Kernel at an...
dirkerper 46019	the Dirichlet Kernel has p...
dirkerf 46020	For any natural number ` N...
dirkertrigeqlem1 46021	Sum of an even number of a...
dirkertrigeqlem2 46022	Trigonomic equality lemma ...
dirkertrigeqlem3 46023	Trigonometric equality lem...
dirkertrigeq 46024	Trigonometric equality for...
dirkeritg 46025	The definite integral of t...
dirkercncflem1 46026	If ` Y ` is a multiple of ...
dirkercncflem2 46027	Lemma used to prove that t...
dirkercncflem3 46028	The Dirichlet Kernel is co...
dirkercncflem4 46029	The Dirichlet Kernel is co...
dirkercncf 46030	For any natural number ` N...
fourierdlem1 46031	A partition interval is a ...
fourierdlem2 46032	Membership in a partition....
fourierdlem3 46033	Membership in a partition....
fourierdlem4 46034	` E ` is a function that m...
fourierdlem5 46035	` S ` is a function. (Con...
fourierdlem6 46036	` X ` is in the periodic p...
fourierdlem7 46037	The difference between the...
fourierdlem8 46038	A partition interval is a ...
fourierdlem9 46039	` H ` is a complex functio...
fourierdlem10 46040	Condition on the bounds of...
fourierdlem11 46041	If there is a partition, t...
fourierdlem12 46042	A point of a partition is ...
fourierdlem13 46043	Value of ` V ` in terms of...
fourierdlem14 46044	Given the partition ` V ` ...
fourierdlem15 46045	The range of the partition...
fourierdlem16 46046	The coefficients of the fo...
fourierdlem17 46047	The defined ` L ` is actua...
fourierdlem18 46048	The function ` S ` is cont...
fourierdlem19 46049	If two elements of ` D ` h...
fourierdlem20 46050	Every interval in the part...
fourierdlem21 46051	The coefficients of the fo...
fourierdlem22 46052	The coefficients of the fo...
fourierdlem23 46053	If ` F ` is continuous and...
fourierdlem24 46054	A sufficient condition for...
fourierdlem25 46055	If ` C ` is not in the ran...
fourierdlem26 46056	Periodic image of a point ...
fourierdlem27 46057	A partition open interval ...
fourierdlem28 46058	Derivative of ` ( F `` ( X...
fourierdlem29 46059	Explicit function value fo...
fourierdlem30 46060	Sum of three small pieces ...
fourierdlem31 46061	If ` A ` is finite and for...
fourierdlem32 46062	Limit of a continuous func...
fourierdlem33 46063	Limit of a continuous func...
fourierdlem34 46064	A partition is one to one....
fourierdlem35 46065	There is a single point in...
fourierdlem36 46066	` F ` is an isomorphism. ...
fourierdlem37 46067	` I ` is a function that m...
fourierdlem38 46068	The function ` F ` is cont...
fourierdlem39 46069	Integration by parts of ...
fourierdlem40 46070	` H ` is a continuous func...
fourierdlem41 46071	Lemma used to prove that e...
fourierdlem42 46072	The set of points in a mov...
fourierdlem43 46073	` K ` is a real function. ...
fourierdlem44 46074	A condition for having ` (...
fourierdlem46 46075	The function ` F ` has a l...
fourierdlem47 46076	For ` r ` large enough, th...
fourierdlem48 46077	The given periodic functio...
fourierdlem49 46078	The given periodic functio...
fourierdlem50 46079	Continuity of ` O ` and it...
fourierdlem51 46080	` X ` is in the periodic p...
fourierdlem52 46081	d16:d17,d18:jca |- ( ph ->...
fourierdlem53 46082	The limit of ` F ( s ) ` a...
fourierdlem54 46083	Given a partition ` Q ` an...
fourierdlem55 46084	` U ` is a real function. ...
fourierdlem56 46085	Derivative of the ` K ` fu...
fourierdlem57 46086	The derivative of ` O ` . ...
fourierdlem58 46087	The derivative of ` K ` is...
fourierdlem59 46088	The derivative of ` H ` is...
fourierdlem60 46089	Given a differentiable fun...
fourierdlem61 46090	Given a differentiable fun...
fourierdlem62 46091	The function ` K ` is cont...
fourierdlem63 46092	The upper bound of interva...
fourierdlem64 46093	The partition ` V ` is fin...
fourierdlem65 46094	The distance of two adjace...
fourierdlem66 46095	Value of the ` G ` functio...
fourierdlem67 46096	` G ` is a function. (Con...
fourierdlem68 46097	The derivative of ` O ` is...
fourierdlem69 46098	A piecewise continuous fun...
fourierdlem70 46099	A piecewise continuous fun...
fourierdlem71 46100	A periodic piecewise conti...
fourierdlem72 46101	The derivative of ` O ` is...
fourierdlem73 46102	A version of the Riemann L...
fourierdlem74 46103	Given a piecewise smooth f...
fourierdlem75 46104	Given a piecewise smooth f...
fourierdlem76 46105	Continuity of ` O ` and it...
fourierdlem77 46106	If ` H ` is bounded, then ...
fourierdlem78 46107	` G ` is continuous when r...
fourierdlem79 46108	` E ` projects every inter...
fourierdlem80 46109	The derivative of ` O ` is...
fourierdlem81 46110	The integral of a piecewis...
fourierdlem82 46111	Integral by substitution, ...
fourierdlem83 46112	The fourier partial sum fo...
fourierdlem84 46113	If ` F ` is piecewise cont...
fourierdlem85 46114	Limit of the function ` G ...
fourierdlem86 46115	Continuity of ` O ` and it...
fourierdlem87 46116	The integral of ` G ` goes...
fourierdlem88 46117	Given a piecewise continuo...
fourierdlem89 46118	Given a piecewise continuo...
fourierdlem90 46119	Given a piecewise continuo...
fourierdlem91 46120	Given a piecewise continuo...
fourierdlem92 46121	The integral of a piecewis...
fourierdlem93 46122	Integral by substitution (...
fourierdlem94 46123	For a piecewise smooth fun...
fourierdlem95 46124	Algebraic manipulation of ...
fourierdlem96 46125	limit for ` F ` at the low...
fourierdlem97 46126	` F ` is continuous on the...
fourierdlem98 46127	` F ` is continuous on the...
fourierdlem99 46128	limit for ` F ` at the upp...
fourierdlem100 46129	A piecewise continuous fun...
fourierdlem101 46130	Integral by substitution f...
fourierdlem102 46131	For a piecewise smooth fun...
fourierdlem103 46132	The half lower part of the...
fourierdlem104 46133	The half upper part of the...
fourierdlem105 46134	A piecewise continuous fun...
fourierdlem106 46135	For a piecewise smooth fun...
fourierdlem107 46136	The integral of a piecewis...
fourierdlem108 46137	The integral of a piecewis...
fourierdlem109 46138	The integral of a piecewis...
fourierdlem110 46139	The integral of a piecewis...
fourierdlem111 46140	The fourier partial sum fo...
fourierdlem112 46141	Here abbreviations (local ...
fourierdlem113 46142	Fourier series convergence...
fourierdlem114 46143	Fourier series convergence...
fourierdlem115 46144	Fourier serier convergence...
fourierd 46145	Fourier series convergence...
fourierclimd 46146	Fourier series convergence...
fourierclim 46147	Fourier series convergence...
fourier 46148	Fourier series convergence...
fouriercnp 46149	If ` F ` is continuous at ...
fourier2 46150	Fourier series convergence...
sqwvfoura 46151	Fourier coefficients for t...
sqwvfourb 46152	Fourier series ` B ` coeff...
fourierswlem 46153	The Fourier series for the...
fouriersw 46154	Fourier series convergence...
fouriercn 46155	If the derivative of ` F `...
elaa2lem 46156	Elementhood in the set of ...
elaa2 46157	Elementhood in the set of ...
etransclem1 46158	` H ` is a function. (Con...
etransclem2 46159	Derivative of ` G ` . (Co...
etransclem3 46160	The given ` if ` term is a...
etransclem4 46161	` F ` expressed as a finit...
etransclem5 46162	A change of bound variable...
etransclem6 46163	A change of bound variable...
etransclem7 46164	The given product is an in...
etransclem8 46165	` F ` is a function. (Con...
etransclem9 46166	If ` K ` divides ` N ` but...
etransclem10 46167	The given ` if ` term is a...
etransclem11 46168	A change of bound variable...
etransclem12 46169	` C ` applied to ` N ` . ...
etransclem13 46170	` F ` applied to ` Y ` . ...
etransclem14 46171	Value of the term ` T ` , ...
etransclem15 46172	Value of the term ` T ` , ...
etransclem16 46173	Every element in the range...
etransclem17 46174	The ` N ` -th derivative o...
etransclem18 46175	The given function is inte...
etransclem19 46176	The ` N ` -th derivative o...
etransclem20 46177	` H ` is smooth. (Contrib...
etransclem21 46178	The ` N ` -th derivative o...
etransclem22 46179	The ` N ` -th derivative o...
etransclem23 46180	This is the claim proof in...
etransclem24 46181	` P ` divides the I -th de...
etransclem25 46182	` P ` factorial divides th...
etransclem26 46183	Every term in the sum of t...
etransclem27 46184	The ` N ` -th derivative o...
etransclem28 46185	` ( P - 1 ) ` factorial di...
etransclem29 46186	The ` N ` -th derivative o...
etransclem30 46187	The ` N ` -th derivative o...
etransclem31 46188	The ` N ` -th derivative o...
etransclem32 46189	This is the proof for the ...
etransclem33 46190	` F ` is smooth. (Contrib...
etransclem34 46191	The ` N ` -th derivative o...
etransclem35 46192	` P ` does not divide the ...
etransclem36 46193	The ` N ` -th derivative o...
etransclem37 46194	` ( P - 1 ) ` factorial di...
etransclem38 46195	` P ` divides the I -th de...
etransclem39 46196	` G ` is a function. (Con...
etransclem40 46197	The ` N ` -th derivative o...
etransclem41 46198	` P ` does not divide the ...
etransclem42 46199	The ` N ` -th derivative o...
etransclem43 46200	` G ` is a continuous func...
etransclem44 46201	The given finite sum is no...
etransclem45 46202	` K ` is an integer. (Con...
etransclem46 46203	This is the proof for equa...
etransclem47 46204	` _e ` is transcendental. ...
etransclem48 46205	` _e ` is transcendental. ...
etransc 46206	` _e ` is transcendental. ...
rrxtopn 46207	The topology of the genera...
rrxngp 46208	Generalized Euclidean real...
rrxtps 46209	Generalized Euclidean real...
rrxtopnfi 46210	The topology of the n-dime...
rrxtopon 46211	The topology on generalize...
rrxtop 46212	The topology on generalize...
rrndistlt 46213	Given two points in the sp...
rrxtoponfi 46214	The topology on n-dimensio...
rrxunitopnfi 46215	The base set of the standa...
rrxtopn0 46216	The topology of the zero-d...
qndenserrnbllem 46217	n-dimensional rational num...
qndenserrnbl 46218	n-dimensional rational num...
rrxtopn0b 46219	The topology of the zero-d...
qndenserrnopnlem 46220	n-dimensional rational num...
qndenserrnopn 46221	n-dimensional rational num...
qndenserrn 46222	n-dimensional rational num...
rrxsnicc 46223	A multidimensional singlet...
rrnprjdstle 46224	The distance between two p...
rrndsmet 46225	` D ` is a metric for the ...
rrndsxmet 46226	` D ` is an extended metri...
ioorrnopnlem 46227	The a point in an indexed ...
ioorrnopn 46228	The indexed product of ope...
ioorrnopnxrlem 46229	Given a point ` F ` that b...
ioorrnopnxr 46230	The indexed product of ope...
issal 46237	Express the predicate " ` ...
pwsal 46238	The power set of a given s...
salunicl 46239	SAlg sigma-algebra is clos...
saluncl 46240	The union of two sets in a...
prsal 46241	The pair of the empty set ...
saldifcl 46242	The complement of an eleme...
0sal 46243	The empty set belongs to e...
salgenval 46244	The sigma-algebra generate...
saliunclf 46245	SAlg sigma-algebra is clos...
saliuncl 46246	SAlg sigma-algebra is clos...
salincl 46247	The intersection of two se...
saluni 46248	A set is an element of any...
saliinclf 46249	SAlg sigma-algebra is clos...
saliincl 46250	SAlg sigma-algebra is clos...
saldifcl2 46251	The difference of two elem...
intsaluni 46252	The union of an arbitrary ...
intsal 46253	The arbitrary intersection...
salgenn0 46254	The set used in the defini...
salgencl 46255	` SalGen ` actually genera...
issald 46256	Sufficient condition to pr...
salexct 46257	An example of nontrivial s...
sssalgen 46258	A set is a subset of the s...
salgenss 46259	The sigma-algebra generate...
salgenuni 46260	The base set of the sigma-...
issalgend 46261	One side of ~ dfsalgen2 . ...
salexct2 46262	An example of a subset tha...
unisalgen 46263	The union of a set belongs...
dfsalgen2 46264	Alternate characterization...
salexct3 46265	An example of a sigma-alge...
salgencntex 46266	This counterexample shows ...
salgensscntex 46267	This counterexample shows ...
issalnnd 46268	Sufficient condition to pr...
dmvolsal 46269	Lebesgue measurable sets f...
saldifcld 46270	The complement of an eleme...
saluncld 46271	The union of two sets in a...
salgencld 46272	` SalGen ` actually genera...
0sald 46273	The empty set belongs to e...
iooborel 46274	An open interval is a Bore...
salincld 46275	The intersection of two se...
salunid 46276	A set is an element of any...
unisalgen2 46277	The union of a set belongs...
bor1sal 46278	The Borel sigma-algebra on...
iocborel 46279	A left-open, right-closed ...
subsaliuncllem 46280	A subspace sigma-algebra i...
subsaliuncl 46281	A subspace sigma-algebra i...
subsalsal 46282	A subspace sigma-algebra i...
subsaluni 46283	A set belongs to the subsp...
salrestss 46284	A sigma-algebra restricted...
sge0rnre 46287	When ` sum^ ` is applied t...
fge0icoicc 46288	If ` F ` maps to nonnegati...
sge0val 46289	The value of the sum of no...
fge0npnf 46290	If ` F ` maps to nonnegati...
sge0rnn0 46291	The range used in the defi...
sge0vald 46292	The value of the sum of no...
fge0iccico 46293	A range of nonnegative ext...
gsumge0cl 46294	Closure of group sum, for ...
sge0reval 46295	Value of the sum of nonneg...
sge0pnfval 46296	If a term in the sum of no...
fge0iccre 46297	A range of nonnegative ext...
sge0z 46298	Any nonnegative extended s...
sge00 46299	The sum of nonnegative ext...
fsumlesge0 46300	Every finite subsum of non...
sge0revalmpt 46301	Value of the sum of nonneg...
sge0sn 46302	A sum of a nonnegative ext...
sge0tsms 46303	` sum^ ` applied to a nonn...
sge0cl 46304	The arbitrary sum of nonne...
sge0f1o 46305	Re-index a nonnegative ext...
sge0snmpt 46306	A sum of a nonnegative ext...
sge0ge0 46307	The sum of nonnegative ext...
sge0xrcl 46308	The arbitrary sum of nonne...
sge0repnf 46309	The of nonnegative extende...
sge0fsum 46310	The arbitrary sum of a fin...
sge0rern 46311	If the sum of nonnegative ...
sge0supre 46312	If the arbitrary sum of no...
sge0fsummpt 46313	The arbitrary sum of a fin...
sge0sup 46314	The arbitrary sum of nonne...
sge0less 46315	A shorter sum of nonnegati...
sge0rnbnd 46316	The range used in the defi...
sge0pr 46317	Sum of a pair of nonnegati...
sge0gerp 46318	The arbitrary sum of nonne...
sge0pnffigt 46319	If the sum of nonnegative ...
sge0ssre 46320	If a sum of nonnegative ex...
sge0lefi 46321	A sum of nonnegative exten...
sge0lessmpt 46322	A shorter sum of nonnegati...
sge0ltfirp 46323	If the sum of nonnegative ...
sge0prle 46324	The sum of a pair of nonne...
sge0gerpmpt 46325	The arbitrary sum of nonne...
sge0resrnlem 46326	The sum of nonnegative ext...
sge0resrn 46327	The sum of nonnegative ext...
sge0ssrempt 46328	If a sum of nonnegative ex...
sge0resplit 46329	` sum^ ` splits into two p...
sge0le 46330	If all of the terms of sum...
sge0ltfirpmpt 46331	If the extended sum of non...
sge0split 46332	Split a sum of nonnegative...
sge0lempt 46333	If all of the terms of sum...
sge0splitmpt 46334	Split a sum of nonnegative...
sge0ss 46335	Change the index set to a ...
sge0iunmptlemfi 46336	Sum of nonnegative extende...
sge0p1 46337	The addition of the next t...
sge0iunmptlemre 46338	Sum of nonnegative extende...
sge0fodjrnlem 46339	Re-index a nonnegative ext...
sge0fodjrn 46340	Re-index a nonnegative ext...
sge0iunmpt 46341	Sum of nonnegative extende...
sge0iun 46342	Sum of nonnegative extende...
sge0nemnf 46343	The generalized sum of non...
sge0rpcpnf 46344	The sum of an infinite num...
sge0rernmpt 46345	If the sum of nonnegative ...
sge0lefimpt 46346	A sum of nonnegative exten...
nn0ssge0 46347	Nonnegative integers are n...
sge0clmpt 46348	The generalized sum of non...
sge0ltfirpmpt2 46349	If the extended sum of non...
sge0isum 46350	If a series of nonnegative...
sge0xrclmpt 46351	The generalized sum of non...
sge0xp 46352	Combine two generalized su...
sge0isummpt 46353	If a series of nonnegative...
sge0ad2en 46354	The value of the infinite ...
sge0isummpt2 46355	If a series of nonnegative...
sge0xaddlem1 46356	The extended addition of t...
sge0xaddlem2 46357	The extended addition of t...
sge0xadd 46358	The extended addition of t...
sge0fsummptf 46359	The generalized sum of a f...
sge0snmptf 46360	A sum of a nonnegative ext...
sge0ge0mpt 46361	The sum of nonnegative ext...
sge0repnfmpt 46362	The of nonnegative extende...
sge0pnffigtmpt 46363	If the generalized sum of ...
sge0splitsn 46364	Separate out a term in a g...
sge0pnffsumgt 46365	If the sum of nonnegative ...
sge0gtfsumgt 46366	If the generalized sum of ...
sge0uzfsumgt 46367	If a real number is smalle...
sge0pnfmpt 46368	If a term in the sum of no...
sge0seq 46369	A series of nonnegative re...
sge0reuz 46370	Value of the generalized s...
sge0reuzb 46371	Value of the generalized s...
ismea 46374	Express the predicate " ` ...
dmmeasal 46375	The domain of a measure is...
meaf 46376	A measure is a function th...
mea0 46377	The measure of the empty s...
nnfoctbdjlem 46378	There exists a mapping fro...
nnfoctbdj 46379	There exists a mapping fro...
meadjuni 46380	The measure of the disjoin...
meacl 46381	The measure of a set is a ...
iundjiunlem 46382	The sets in the sequence `...
iundjiun 46383	Given a sequence ` E ` of ...
meaxrcl 46384	The measure of a set is an...
meadjun 46385	The measure of the union o...
meassle 46386	The measure of a set is gr...
meaunle 46387	The measure of the union o...
meadjiunlem 46388	The sum of nonnegative ext...
meadjiun 46389	The measure of the disjoin...
ismeannd 46390	Sufficient condition to pr...
meaiunlelem 46391	The measure of the union o...
meaiunle 46392	The measure of the union o...
psmeasurelem 46393	` M ` applied to a disjoin...
psmeasure 46394	Point supported measure, R...
voliunsge0lem 46395	The Lebesgue measure funct...
voliunsge0 46396	The Lebesgue measure funct...
volmea 46397	The Lebesgue measure on th...
meage0 46398	If the measure of a measur...
meadjunre 46399	The measure of the union o...
meassre 46400	If the measure of a measur...
meale0eq0 46401	A measure that is less tha...
meadif 46402	The measure of the differe...
meaiuninclem 46403	Measures are continuous fr...
meaiuninc 46404	Measures are continuous fr...
meaiuninc2 46405	Measures are continuous fr...
meaiunincf 46406	Measures are continuous fr...
meaiuninc3v 46407	Measures are continuous fr...
meaiuninc3 46408	Measures are continuous fr...
meaiininclem 46409	Measures are continuous fr...
meaiininc 46410	Measures are continuous fr...
meaiininc2 46411	Measures are continuous fr...
caragenval 46416	The sigma-algebra generate...
isome 46417	Express the predicate " ` ...
caragenel 46418	Membership in the Caratheo...
omef 46419	An outer measure is a func...
ome0 46420	The outer measure of the e...
omessle 46421	The outer measure of a set...
omedm 46422	The domain of an outer mea...
caragensplit 46423	If ` E ` is in the set gen...
caragenelss 46424	An element of the Caratheo...
carageneld 46425	Membership in the Caratheo...
omecl 46426	The outer measure of a set...
caragenss 46427	The sigma-algebra generate...
omeunile 46428	The outer measure of the u...
caragen0 46429	The empty set belongs to a...
omexrcl 46430	The outer measure of a set...
caragenunidm 46431	The base set of an outer m...
caragensspw 46432	The sigma-algebra generate...
omessre 46433	If the outer measure of a ...
caragenuni 46434	The base set of the sigma-...
caragenuncllem 46435	The Caratheodory's constru...
caragenuncl 46436	The Caratheodory's constru...
caragendifcl 46437	The Caratheodory's constru...
caragenfiiuncl 46438	The Caratheodory's constru...
omeunle 46439	The outer measure of the u...
omeiunle 46440	The outer measure of the i...
omelesplit 46441	The outer measure of a set...
omeiunltfirp 46442	If the outer measure of a ...
omeiunlempt 46443	The outer measure of the i...
carageniuncllem1 46444	The outer measure of ` A i...
carageniuncllem2 46445	The Caratheodory's constru...
carageniuncl 46446	The Caratheodory's constru...
caragenunicl 46447	The Caratheodory's constru...
caragensal 46448	Caratheodory's method gene...
caratheodorylem1 46449	Lemma used to prove that C...
caratheodorylem2 46450	Caratheodory's constructio...
caratheodory 46451	Caratheodory's constructio...
0ome 46452	The map that assigns 0 to ...
isomenndlem 46453	` O ` is sub-additive w.r....
isomennd 46454	Sufficient condition to pr...
caragenel2d 46455	Membership in the Caratheo...
omege0 46456	If the outer measure of a ...
omess0 46457	If the outer measure of a ...
caragencmpl 46458	A measure built with the C...
vonval 46463	Value of the Lebesgue meas...
ovnval 46464	Value of the Lebesgue oute...
elhoi 46465	Membership in a multidimen...
icoresmbl 46466	A closed-below, open-above...
hoissre 46467	The projection of a half-o...
ovnval2 46468	Value of the Lebesgue oute...
volicorecl 46469	The Lebesgue measure of a ...
hoiprodcl 46470	The pre-measure of half-op...
hoicvr 46471	` I ` is a countable set o...
hoissrrn 46472	A half-open interval is a ...
ovn0val 46473	The Lebesgue outer measure...
ovnn0val 46474	The value of a (multidimen...
ovnval2b 46475	Value of the Lebesgue oute...
volicorescl 46476	The Lebesgue measure of a ...
ovnprodcl 46477	The product used in the de...
hoiprodcl2 46478	The pre-measure of half-op...
hoicvrrex 46479	Any subset of the multidim...
ovnsupge0 46480	The set used in the defini...
ovnlecvr 46481	Given a subset of multidim...
ovnpnfelsup 46482	` +oo ` is an element of t...
ovnsslelem 46483	The (multidimensional, non...
ovnssle 46484	The (multidimensional) Leb...
ovnlerp 46485	The Lebesgue outer measure...
ovnf 46486	The Lebesgue outer measure...
ovncvrrp 46487	The Lebesgue outer measure...
ovn0lem 46488	For any finite dimension, ...
ovn0 46489	For any finite dimension, ...
ovncl 46490	The Lebesgue outer measure...
ovn02 46491	For the zero-dimensional s...
ovnxrcl 46492	The Lebesgue outer measure...
ovnsubaddlem1 46493	The Lebesgue outer measure...
ovnsubaddlem2 46494	` ( voln* `` X ) ` is suba...
ovnsubadd 46495	` ( voln* `` X ) ` is suba...
ovnome 46496	` ( voln* `` X ) ` is an o...
vonmea 46497	` ( voln `` X ) ` is a mea...
volicon0 46498	The measure of a nonempty ...
hsphoif 46499	` H ` is a function (that ...
hoidmvval 46500	The dimensional volume of ...
hoissrrn2 46501	A half-open interval is a ...
hsphoival 46502	` H ` is a function (that ...
hoiprodcl3 46503	The pre-measure of half-op...
volicore 46504	The Lebesgue measure of a ...
hoidmvcl 46505	The dimensional volume of ...
hoidmv0val 46506	The dimensional volume of ...
hoidmvn0val 46507	The dimensional volume of ...
hsphoidmvle2 46508	The dimensional volume of ...
hsphoidmvle 46509	The dimensional volume of ...
hoidmvval0 46510	The dimensional volume of ...
hoiprodp1 46511	The dimensional volume of ...
sge0hsphoire 46512	If the generalized sum of ...
hoidmvval0b 46513	The dimensional volume of ...
hoidmv1lelem1 46514	The supremum of ` U ` belo...
hoidmv1lelem2 46515	This is the contradiction ...
hoidmv1lelem3 46516	The dimensional volume of ...
hoidmv1le 46517	The dimensional volume of ...
hoidmvlelem1 46518	The supremum of ` U ` belo...
hoidmvlelem2 46519	This is the contradiction ...
hoidmvlelem3 46520	This is the contradiction ...
hoidmvlelem4 46521	The dimensional volume of ...
hoidmvlelem5 46522	The dimensional volume of ...
hoidmvle 46523	The dimensional volume of ...
ovnhoilem1 46524	The Lebesgue outer measure...
ovnhoilem2 46525	The Lebesgue outer measure...
ovnhoi 46526	The Lebesgue outer measure...
dmovn 46527	The domain of the Lebesgue...
hoicoto2 46528	The half-open interval exp...
dmvon 46529	Lebesgue measurable n-dime...
hoi2toco 46530	The half-open interval exp...
hoidifhspval 46531	` D ` is a function that r...
hspval 46532	The value of the half-spac...
ovnlecvr2 46533	Given a subset of multidim...
ovncvr2 46534	` B ` and ` T ` are the le...
dmovnsal 46535	The domain of the Lebesgue...
unidmovn 46536	Base set of the n-dimensio...
rrnmbl 46537	The set of n-dimensional R...
hoidifhspval2 46538	` D ` is a function that r...
hspdifhsp 46539	A n-dimensional half-open ...
unidmvon 46540	Base set of the n-dimensio...
hoidifhspf 46541	` D ` is a function that r...
hoidifhspval3 46542	` D ` is a function that r...
hoidifhspdmvle 46543	The dimensional volume of ...
voncmpl 46544	The Lebesgue measure is co...
hoiqssbllem1 46545	The center of the n-dimens...
hoiqssbllem2 46546	The center of the n-dimens...
hoiqssbllem3 46547	A n-dimensional ball conta...
hoiqssbl 46548	A n-dimensional ball conta...
hspmbllem1 46549	Any half-space of the n-di...
hspmbllem2 46550	Any half-space of the n-di...
hspmbllem3 46551	Any half-space of the n-di...
hspmbl 46552	Any half-space of the n-di...
hoimbllem 46553	Any n-dimensional half-ope...
hoimbl 46554	Any n-dimensional half-ope...
opnvonmbllem1 46555	The half-open interval exp...
opnvonmbllem2 46556	An open subset of the n-di...
opnvonmbl 46557	An open subset of the n-di...
opnssborel 46558	Open sets of a generalized...
borelmbl 46559	All Borel subsets of the n...
volicorege0 46560	The Lebesgue measure of a ...
isvonmbl 46561	The predicate " ` A ` is m...
mblvon 46562	The n-dimensional Lebesgue...
vonmblss 46563	n-dimensional Lebesgue mea...
volico2 46564	The measure of left-closed...
vonmblss2 46565	n-dimensional Lebesgue mea...
ovolval2lem 46566	The value of the Lebesgue ...
ovolval2 46567	The value of the Lebesgue ...
ovnsubadd2lem 46568	` ( voln* `` X ) ` is suba...
ovnsubadd2 46569	` ( voln* `` X ) ` is suba...
ovolval3 46570	The value of the Lebesgue ...
ovnsplit 46571	The n-dimensional Lebesgue...
ovolval4lem1 46572	|- ( ( ph /\ n e. A ) -> ...
ovolval4lem2 46573	The value of the Lebesgue ...
ovolval4 46574	The value of the Lebesgue ...
ovolval5lem1 46575	` |- ( ph -> ( sum^ `` ( n...
ovolval5lem2 46576	` |- ( ( ph /\ n e. NN ) -...
ovolval5lem3 46577	The value of the Lebesgue ...
ovolval5 46578	The value of the Lebesgue ...
ovnovollem1 46579	if ` F ` is a cover of ` B...
ovnovollem2 46580	if ` I ` is a cover of ` (...
ovnovollem3 46581	The 1-dimensional Lebesgue...
ovnovol 46582	The 1-dimensional Lebesgue...
vonvolmbllem 46583	If a subset ` B ` of real ...
vonvolmbl 46584	A subset of Real numbers i...
vonvol 46585	The 1-dimensional Lebesgue...
vonvolmbl2 46586	A subset ` X ` of the spac...
vonvol2 46587	The 1-dimensional Lebesgue...
hoimbl2 46588	Any n-dimensional half-ope...
voncl 46589	The Lebesgue measure of a ...
vonhoi 46590	The Lebesgue outer measure...
vonxrcl 46591	The Lebesgue measure of a ...
ioosshoi 46592	A n-dimensional open inter...
vonn0hoi 46593	The Lebesgue outer measure...
von0val 46594	The Lebesgue measure (for ...
vonhoire 46595	The Lebesgue measure of a ...
iinhoiicclem 46596	A n-dimensional closed int...
iinhoiicc 46597	A n-dimensional closed int...
iunhoiioolem 46598	A n-dimensional open inter...
iunhoiioo 46599	A n-dimensional open inter...
ioovonmbl 46600	Any n-dimensional open int...
iccvonmbllem 46601	Any n-dimensional closed i...
iccvonmbl 46602	Any n-dimensional closed i...
vonioolem1 46603	The sequence of the measur...
vonioolem2 46604	The n-dimensional Lebesgue...
vonioo 46605	The n-dimensional Lebesgue...
vonicclem1 46606	The sequence of the measur...
vonicclem2 46607	The n-dimensional Lebesgue...
vonicc 46608	The n-dimensional Lebesgue...
snvonmbl 46609	A n-dimensional singleton ...
vonn0ioo 46610	The n-dimensional Lebesgue...
vonn0icc 46611	The n-dimensional Lebesgue...
ctvonmbl 46612	Any n-dimensional countabl...
vonn0ioo2 46613	The n-dimensional Lebesgue...
vonsn 46614	The n-dimensional Lebesgue...
vonn0icc2 46615	The n-dimensional Lebesgue...
vonct 46616	The n-dimensional Lebesgue...
vitali2 46617	There are non-measurable s...
pimltmnf2f 46620	Given a real-valued functi...
pimltmnf2 46621	Given a real-valued functi...
preimagelt 46622	The preimage of a right-op...
preimalegt 46623	The preimage of a left-ope...
pimconstlt0 46624	Given a constant function,...
pimconstlt1 46625	Given a constant function,...
pimltpnff 46626	Given a real-valued functi...
pimltpnf 46627	Given a real-valued functi...
pimgtpnf2f 46628	Given a real-valued functi...
pimgtpnf2 46629	Given a real-valued functi...
salpreimagelt 46630	If all the preimages of le...
pimrecltpos 46631	The preimage of an unbound...
salpreimalegt 46632	If all the preimages of ri...
pimiooltgt 46633	The preimage of an open in...
preimaicomnf 46634	Preimage of an open interv...
pimltpnf2f 46635	Given a real-valued functi...
pimltpnf2 46636	Given a real-valued functi...
pimgtmnf2 46637	Given a real-valued functi...
pimdecfgtioc 46638	Given a nonincreasing func...
pimincfltioc 46639	Given a nondecreasing func...
pimdecfgtioo 46640	Given a nondecreasing func...
pimincfltioo 46641	Given a nondecreasing func...
preimaioomnf 46642	Preimage of an open interv...
preimageiingt 46643	A preimage of a left-close...
preimaleiinlt 46644	A preimage of a left-open,...
pimgtmnff 46645	Given a real-valued functi...
pimgtmnf 46646	Given a real-valued functi...
pimrecltneg 46647	The preimage of an unbound...
salpreimagtge 46648	If all the preimages of le...
salpreimaltle 46649	If all the preimages of ri...
issmflem 46650	The predicate " ` F ` is a...
issmf 46651	The predicate " ` F ` is a...
salpreimalelt 46652	If all the preimages of ri...
salpreimagtlt 46653	If all the preimages of le...
smfpreimalt 46654	Given a function measurabl...
smff 46655	A function measurable w.r....
smfdmss 46656	The domain of a function m...
issmff 46657	The predicate " ` F ` is a...
issmfd 46658	A sufficient condition for...
smfpreimaltf 46659	Given a function measurabl...
issmfdf 46660	A sufficient condition for...
sssmf 46661	The restriction of a sigma...
mbfresmf 46662	A real-valued measurable f...
cnfsmf 46663	A continuous function is m...
incsmflem 46664	A nondecreasing function i...
incsmf 46665	A real-valued, nondecreasi...
smfsssmf 46666	If a function is measurabl...
issmflelem 46667	The predicate " ` F ` is a...
issmfle 46668	The predicate " ` F ` is a...
smfpimltmpt 46669	Given a function measurabl...
smfpimltxr 46670	Given a function measurabl...
issmfdmpt 46671	A sufficient condition for...
smfconst 46672	Given a sigma-algebra over...
sssmfmpt 46673	The restriction of a sigma...
cnfrrnsmf 46674	A function, continuous fro...
smfid 46675	The identity function is B...
bormflebmf 46676	A Borel measurable functio...
smfpreimale 46677	Given a function measurabl...
issmfgtlem 46678	The predicate " ` F ` is a...
issmfgt 46679	The predicate " ` F ` is a...
issmfled 46680	A sufficient condition for...
smfpimltxrmptf 46681	Given a function measurabl...
smfpimltxrmpt 46682	Given a function measurabl...
smfmbfcex 46683	A constant function, with ...
issmfgtd 46684	A sufficient condition for...
smfpreimagt 46685	Given a function measurabl...
smfaddlem1 46686	Given the sum of two funct...
smfaddlem2 46687	The sum of two sigma-measu...
smfadd 46688	The sum of two sigma-measu...
decsmflem 46689	A nonincreasing function i...
decsmf 46690	A real-valued, nonincreasi...
smfpreimagtf 46691	Given a function measurabl...
issmfgelem 46692	The predicate " ` F ` is a...
issmfge 46693	The predicate " ` F ` is a...
smflimlem1 46694	Lemma for the proof that t...
smflimlem2 46695	Lemma for the proof that t...
smflimlem3 46696	The limit of sigma-measura...
smflimlem4 46697	Lemma for the proof that t...
smflimlem5 46698	Lemma for the proof that t...
smflimlem6 46699	Lemma for the proof that t...
smflim 46700	The limit of sigma-measura...
nsssmfmbflem 46701	The sigma-measurable funct...
nsssmfmbf 46702	The sigma-measurable funct...
smfpimgtxr 46703	Given a function measurabl...
smfpimgtmpt 46704	Given a function measurabl...
smfpreimage 46705	Given a function measurabl...
mbfpsssmf 46706	Real-valued measurable fun...
smfpimgtxrmptf 46707	Given a function measurabl...
smfpimgtxrmpt 46708	Given a function measurabl...
smfpimioompt 46709	Given a function measurabl...
smfpimioo 46710	Given a function measurabl...
smfresal 46711	Given a sigma-measurable f...
smfrec 46712	The reciprocal of a sigma-...
smfres 46713	The restriction of sigma-m...
smfmullem1 46714	The multiplication of two ...
smfmullem2 46715	The multiplication of two ...
smfmullem3 46716	The multiplication of two ...
smfmullem4 46717	The multiplication of two ...
smfmul 46718	The multiplication of two ...
smfmulc1 46719	A sigma-measurable functio...
smfdiv 46720	The fraction of two sigma-...
smfpimbor1lem1 46721	Every open set belongs to ...
smfpimbor1lem2 46722	Given a sigma-measurable f...
smfpimbor1 46723	Given a sigma-measurable f...
smf2id 46724	Twice the identity functio...
smfco 46725	The composition of a Borel...
smfneg 46726	The negative of a sigma-me...
smffmptf 46727	A function measurable w.r....
smffmpt 46728	A function measurable w.r....
smflim2 46729	The limit of a sequence of...
smfpimcclem 46730	Lemma for ~ smfpimcc given...
smfpimcc 46731	Given a countable set of s...
issmfle2d 46732	A sufficient condition for...
smflimmpt 46733	The limit of a sequence of...
smfsuplem1 46734	The supremum of a countabl...
smfsuplem2 46735	The supremum of a countabl...
smfsuplem3 46736	The supremum of a countabl...
smfsup 46737	The supremum of a countabl...
smfsupmpt 46738	The supremum of a countabl...
smfsupxr 46739	The supremum of a countabl...
smfinflem 46740	The infimum of a countable...
smfinf 46741	The infimum of a countable...
smfinfmpt 46742	The infimum of a countable...
smflimsuplem1 46743	If ` H ` converges, the ` ...
smflimsuplem2 46744	The superior limit of a se...
smflimsuplem3 46745	The limit of the ` ( H `` ...
smflimsuplem4 46746	If ` H ` converges, the ` ...
smflimsuplem5 46747	` H ` converges to the sup...
smflimsuplem6 46748	The superior limit of a se...
smflimsuplem7 46749	The superior limit of a se...
smflimsuplem8 46750	The superior limit of a se...
smflimsup 46751	The superior limit of a se...
smflimsupmpt 46752	The superior limit of a se...
smfliminflem 46753	The inferior limit of a co...
smfliminf 46754	The inferior limit of a co...
smfliminfmpt 46755	The inferior limit of a co...
adddmmbl 46756	If two functions have doma...
adddmmbl2 46757	If two functions have doma...
muldmmbl 46758	If two functions have doma...
muldmmbl2 46759	If two functions have doma...
smfdmmblpimne 46760	If a measurable function w...
smfdivdmmbl 46761	If a functions and a sigma...
smfpimne 46762	Given a function measurabl...
smfpimne2 46763	Given a function measurabl...
smfdivdmmbl2 46764	If a functions and a sigma...
fsupdm 46765	The domain of the sup func...
fsupdm2 46766	The domain of the sup func...
smfsupdmmbllem 46767	If a countable set of sigm...
smfsupdmmbl 46768	If a countable set of sigm...
finfdm 46769	The domain of the inf func...
finfdm2 46770	The domain of the inf func...
smfinfdmmbllem 46771	If a countable set of sigm...
smfinfdmmbl 46772	If a countable set of sigm...
sigarval 46773	Define the signed area by ...
sigarim 46774	Signed area takes value in...
sigarac 46775	Signed area is anticommuta...
sigaraf 46776	Signed area is additive by...
sigarmf 46777	Signed area is additive (w...
sigaras 46778	Signed area is additive by...
sigarms 46779	Signed area is additive (w...
sigarls 46780	Signed area is linear by t...
sigarid 46781	Signed area of a flat para...
sigarexp 46782	Expand the signed area for...
sigarperm 46783	Signed area ` ( A - C ) G ...
sigardiv 46784	If signed area between vec...
sigarimcd 46785	Signed area takes value in...
sigariz 46786	If signed area is zero, th...
sigarcol 46787	Given three points ` A ` ,...
sharhght 46788	Let ` A B C ` be a triangl...
sigaradd 46789	Subtracting (double) area ...
cevathlem1 46790	Ceva's theorem first lemma...
cevathlem2 46791	Ceva's theorem second lemm...
cevath 46792	Ceva's theorem. Let ` A B...
simpcntrab 46793	The center of a simple gro...
et-ltneverrefl 46794	Less-than class is never r...
et-equeucl 46795	Alternative proof that equ...
et-sqrtnegnre 46796	The square root of a negat...
natlocalincr 46797	Global monotonicity on hal...
natglobalincr 46798	Local monotonicity on half...
upwordnul 46801	Empty set is an increasing...
upwordisword 46802	Any increasing sequence is...
singoutnword 46803	Singleton with character o...
singoutnupword 46804	Singleton with character o...
upwordsing 46805	Singleton is an increasing...
upwordsseti 46806	Strictly increasing sequen...
tworepnotupword 46807	Concatenation of identical...
upwrdfi 46808	There is a finite number o...
hirstL-ax3 46809	The third axiom of a syste...
ax3h 46810	Recover ~ ax-3 from ~ hirs...
aibandbiaiffaiffb 46811	A closed form showing (a i...
aibandbiaiaiffb 46812	A closed form showing (a i...
notatnand 46813	Do not use. Use intnanr i...
aistia 46814	Given a is equivalent to `...
aisfina 46815	Given a is equivalent to `...
bothtbothsame 46816	Given both a, b are equiva...
bothfbothsame 46817	Given both a, b are equiva...
aiffbbtat 46818	Given a is equivalent to b...
aisbbisfaisf 46819	Given a is equivalent to b...
axorbtnotaiffb 46820	Given a is exclusive to b,...
aiffnbandciffatnotciffb 46821	Given a is equivalent to (...
axorbciffatcxorb 46822	Given a is equivalent to (...
aibnbna 46823	Given a implies b, (not b)...
aibnbaif 46824	Given a implies b, not b, ...
aiffbtbat 46825	Given a is equivalent to b...
astbstanbst 46826	Given a is equivalent to T...
aistbistaandb 46827	Given a is equivalent to T...
aisbnaxb 46828	Given a is equivalent to b...
atbiffatnnb 46829	If a implies b, then a imp...
bisaiaisb 46830	Application of bicom1 with...
atbiffatnnbalt 46831	If a implies b, then a imp...
abnotbtaxb 46832	Assuming a, not b, there e...
abnotataxb 46833	Assuming not a, b, there e...
conimpf 46834	Assuming a, not b, and a i...
conimpfalt 46835	Assuming a, not b, and a i...
aistbisfiaxb 46836	Given a is equivalent to T...
aisfbistiaxb 46837	Given a is equivalent to F...
aifftbifffaibif 46838	Given a is equivalent to T...
aifftbifffaibifff 46839	Given a is equivalent to T...
atnaiana 46840	Given a, it is not the cas...
ainaiaandna 46841	Given a, a implies it is n...
abcdta 46842	Given (((a and b) and c) a...
abcdtb 46843	Given (((a and b) and c) a...
abcdtc 46844	Given (((a and b) and c) a...
abcdtd 46845	Given (((a and b) and c) a...
abciffcbatnabciffncba 46846	Operands in a biconditiona...
abciffcbatnabciffncbai 46847	Operands in a biconditiona...
nabctnabc 46848	not ( a -> ( b /\ c ) ) we...
jabtaib 46849	For when pm3.4 lacks a pm3...
onenotinotbothi 46850	From one negated implicati...
twonotinotbothi 46851	From these two negated imp...
clifte 46852	show d is the same as an i...
cliftet 46853	show d is the same as an i...
clifteta 46854	show d is the same as an i...
cliftetb 46855	show d is the same as an i...
confun 46856	Given the hypotheses there...
confun2 46857	Confun simplified to two p...
confun3 46858	Confun's more complex form...
confun4 46859	An attempt at derivative. ...
confun5 46860	An attempt at derivative. ...
plcofph 46861	Given, a,b and a "definiti...
pldofph 46862	Given, a,b c, d, "definiti...
plvcofph 46863	Given, a,b,d, and "definit...
plvcofphax 46864	Given, a,b,d, and "definit...
plvofpos 46865	rh is derivable because ON...
mdandyv0 46866	Given the equivalences set...
mdandyv1 46867	Given the equivalences set...
mdandyv2 46868	Given the equivalences set...
mdandyv3 46869	Given the equivalences set...
mdandyv4 46870	Given the equivalences set...
mdandyv5 46871	Given the equivalences set...
mdandyv6 46872	Given the equivalences set...
mdandyv7 46873	Given the equivalences set...
mdandyv8 46874	Given the equivalences set...
mdandyv9 46875	Given the equivalences set...
mdandyv10 46876	Given the equivalences set...
mdandyv11 46877	Given the equivalences set...
mdandyv12 46878	Given the equivalences set...
mdandyv13 46879	Given the equivalences set...
mdandyv14 46880	Given the equivalences set...
mdandyv15 46881	Given the equivalences set...
mdandyvr0 46882	Given the equivalences set...
mdandyvr1 46883	Given the equivalences set...
mdandyvr2 46884	Given the equivalences set...
mdandyvr3 46885	Given the equivalences set...
mdandyvr4 46886	Given the equivalences set...
mdandyvr5 46887	Given the equivalences set...
mdandyvr6 46888	Given the equivalences set...
mdandyvr7 46889	Given the equivalences set...
mdandyvr8 46890	Given the equivalences set...
mdandyvr9 46891	Given the equivalences set...
mdandyvr10 46892	Given the equivalences set...
mdandyvr11 46893	Given the equivalences set...
mdandyvr12 46894	Given the equivalences set...
mdandyvr13 46895	Given the equivalences set...
mdandyvr14 46896	Given the equivalences set...
mdandyvr15 46897	Given the equivalences set...
mdandyvrx0 46898	Given the exclusivities se...
mdandyvrx1 46899	Given the exclusivities se...
mdandyvrx2 46900	Given the exclusivities se...
mdandyvrx3 46901	Given the exclusivities se...
mdandyvrx4 46902	Given the exclusivities se...
mdandyvrx5 46903	Given the exclusivities se...
mdandyvrx6 46904	Given the exclusivities se...
mdandyvrx7 46905	Given the exclusivities se...
mdandyvrx8 46906	Given the exclusivities se...
mdandyvrx9 46907	Given the exclusivities se...
mdandyvrx10 46908	Given the exclusivities se...
mdandyvrx11 46909	Given the exclusivities se...
mdandyvrx12 46910	Given the exclusivities se...
mdandyvrx13 46911	Given the exclusivities se...
mdandyvrx14 46912	Given the exclusivities se...
mdandyvrx15 46913	Given the exclusivities se...
H15NH16TH15IH16 46914	Given 15 hypotheses and a ...
dandysum2p2e4 46915	CONTRADICTION PROVED AT 1 ...
mdandysum2p2e4 46916	CONTRADICTION PROVED AT 1 ...
adh-jarrsc 46917	Replacement of a nested an...
adh-minim 46918	A single axiom for minimal...
adh-minim-ax1-ax2-lem1 46919	First lemma for the deriva...
adh-minim-ax1-ax2-lem2 46920	Second lemma for the deriv...
adh-minim-ax1-ax2-lem3 46921	Third lemma for the deriva...
adh-minim-ax1-ax2-lem4 46922	Fourth lemma for the deriv...
adh-minim-ax1 46923	Derivation of ~ ax-1 from ...
adh-minim-ax2-lem5 46924	Fifth lemma for the deriva...
adh-minim-ax2-lem6 46925	Sixth lemma for the deriva...
adh-minim-ax2c 46926	Derivation of a commuted f...
adh-minim-ax2 46927	Derivation of ~ ax-2 from ...
adh-minim-idALT 46928	Derivation of ~ id (reflex...
adh-minim-pm2.43 46929	Derivation of ~ pm2.43 Whi...
adh-minimp 46930	Another single axiom for m...
adh-minimp-jarr-imim1-ax2c-lem1 46931	First lemma for the deriva...
adh-minimp-jarr-lem2 46932	Second lemma for the deriv...
adh-minimp-jarr-ax2c-lem3 46933	Third lemma for the deriva...
adh-minimp-sylsimp 46934	Derivation of ~ jarr (also...
adh-minimp-ax1 46935	Derivation of ~ ax-1 from ...
adh-minimp-imim1 46936	Derivation of ~ imim1 ("le...
adh-minimp-ax2c 46937	Derivation of a commuted f...
adh-minimp-ax2-lem4 46938	Fourth lemma for the deriv...
adh-minimp-ax2 46939	Derivation of ~ ax-2 from ...
adh-minimp-idALT 46940	Derivation of ~ id (reflex...
adh-minimp-pm2.43 46941	Derivation of ~ pm2.43 Whi...
n0nsn2el 46942	If a class with one elemen...
eusnsn 46943	There is a unique element ...
absnsb 46944	If the class abstraction `...
euabsneu 46945	Another way to express exi...
elprneb 46946	An element of a proper uno...
oppr 46947	Equality for ordered pairs...
opprb 46948	Equality for unordered pai...
or2expropbilem1 46949	Lemma 1 for ~ or2expropbi ...
or2expropbilem2 46950	Lemma 2 for ~ or2expropbi ...
or2expropbi 46951	If two classes are strictl...
eubrv 46952	If there is a unique set w...
eubrdm 46953	If there is a unique set w...
eldmressn 46954	Element of the domain of a...
iota0def 46955	Example for a defined iota...
iota0ndef 46956	Example for an undefined i...
fveqvfvv 46957	If a function's value at a...
fnresfnco 46958	Composition of two functio...
funcoressn 46959	A composition restricted t...
funressnfv 46960	A restriction to a singlet...
funressndmfvrn 46961	The value of a function ` ...
funressnvmo 46962	A function restricted to a...
funressnmo 46963	A function restricted to a...
funressneu 46964	There is exactly one value...
fresfo 46965	Conditions for a restricti...
fsetsniunop 46966	The class of all functions...
fsetabsnop 46967	The class of all functions...
fsetsnf 46968	The mapping of an element ...
fsetsnf1 46969	The mapping of an element ...
fsetsnfo 46970	The mapping of an element ...
fsetsnf1o 46971	The mapping of an element ...
fsetsnprcnex 46972	The class of all functions...
cfsetssfset 46973	The class of constant func...
cfsetsnfsetfv 46974	The function value of the ...
cfsetsnfsetf 46975	The mapping of the class o...
cfsetsnfsetf1 46976	The mapping of the class o...
cfsetsnfsetfo 46977	The mapping of the class o...
cfsetsnfsetf1o 46978	The mapping of the class o...
fsetprcnexALT 46979	First version of proof for...
fcoreslem1 46980	Lemma 1 for ~ fcores . (C...
fcoreslem2 46981	Lemma 2 for ~ fcores . (C...
fcoreslem3 46982	Lemma 3 for ~ fcores . (C...
fcoreslem4 46983	Lemma 4 for ~ fcores . (C...
fcores 46984	Every composite function `...
fcoresf1lem 46985	Lemma for ~ fcoresf1 . (C...
fcoresf1 46986	If a composition is inject...
fcoresf1b 46987	A composition is injective...
fcoresfo 46988	If a composition is surjec...
fcoresfob 46989	A composition is surjectiv...
fcoresf1ob 46990	A composition is bijective...
f1cof1blem 46991	Lemma for ~ f1cof1b and ~ ...
3f1oss1 46992	The composition of three b...
3f1oss2 46993	The composition of three b...
f1cof1b 46994	If the range of ` F ` equa...
funfocofob 46995	If the domain of a functio...
fnfocofob 46996	If the domain of a functio...
focofob 46997	If the domain of a functio...
f1ocof1ob 46998	If the range of ` F ` equa...
f1ocof1ob2 46999	If the range of ` F ` equa...
aiotajust 47001	Soundness justification th...
dfaiota2 47003	Alternate definition of th...
reuabaiotaiota 47004	The iota and the alternate...
reuaiotaiota 47005	The iota and the alternate...
aiotaexb 47006	The alternate iota over a ...
aiotavb 47007	The alternate iota over a ...
aiotaint 47008	This is to ~ df-aiota what...
dfaiota3 47009	Alternate definition of ` ...
iotan0aiotaex 47010	If the iota over a wff ` p...
aiotaexaiotaiota 47011	The alternate iota over a ...
aiotaval 47012	Theorem 8.19 in [Quine] p....
aiota0def 47013	Example for a defined alte...
aiota0ndef 47014	Example for an undefined a...
r19.32 47015	Theorem 19.32 of [Margaris...
rexsb 47016	An equivalent expression f...
rexrsb 47017	An equivalent expression f...
2rexsb 47018	An equivalent expression f...
2rexrsb 47019	An equivalent expression f...
cbvral2 47020	Change bound variables of ...
cbvrex2 47021	Change bound variables of ...
ralndv1 47022	Example for a theorem abou...
ralndv2 47023	Second example for a theor...
reuf1odnf 47024	There is exactly one eleme...
reuf1od 47025	There is exactly one eleme...
euoreqb 47026	There is a set which is eq...
2reu3 47027	Double restricted existent...
2reu7 47028	Two equivalent expressions...
2reu8 47029	Two equivalent expressions...
2reu8i 47030	Implication of a double re...
2reuimp0 47031	Implication of a double re...
2reuimp 47032	Implication of a double re...
ralbinrald 47039	Elemination of a restricte...
nvelim 47040	If a class is the universa...
alneu 47041	If a statement holds for a...
eu2ndop1stv 47042	If there is a unique secon...
dfateq12d 47043	Equality deduction for "de...
nfdfat 47044	Bound-variable hypothesis ...
dfdfat2 47045	Alternate definition of th...
fundmdfat 47046	A function is defined at a...
dfatprc 47047	A function is not defined ...
dfatelrn 47048	The value of a function ` ...
dfafv2 47049	Alternative definition of ...
afveq12d 47050	Equality deduction for fun...
afveq1 47051	Equality theorem for funct...
afveq2 47052	Equality theorem for funct...
nfafv 47053	Bound-variable hypothesis ...
csbafv12g 47054	Move class substitution in...
afvfundmfveq 47055	If a class is a function r...
afvnfundmuv 47056	If a set is not in the dom...
ndmafv 47057	The value of a class outsi...
afvvdm 47058	If the function value of a...
nfunsnafv 47059	If the restriction of a cl...
afvvfunressn 47060	If the function value of a...
afvprc 47061	A function's value at a pr...
afvvv 47062	If a function's value at a...
afvpcfv0 47063	If the value of the altern...
afvnufveq 47064	The value of the alternati...
afvvfveq 47065	The value of the alternati...
afv0fv0 47066	If the value of the altern...
afvfvn0fveq 47067	If the function's value at...
afv0nbfvbi 47068	The function's value at an...
afvfv0bi 47069	The function's value at an...
afveu 47070	The value of a function at...
fnbrafvb 47071	Equivalence of function va...
fnopafvb 47072	Equivalence of function va...
funbrafvb 47073	Equivalence of function va...
funopafvb 47074	Equivalence of function va...
funbrafv 47075	The second argument of a b...
funbrafv2b 47076	Function value in terms of...
dfafn5a 47077	Representation of a functi...
dfafn5b 47078	Representation of a functi...
fnrnafv 47079	The range of a function ex...
afvelrnb 47080	A member of a function's r...
afvelrnb0 47081	A member of a function's r...
dfaimafn 47082	Alternate definition of th...
dfaimafn2 47083	Alternate definition of th...
afvelima 47084	Function value in an image...
afvelrn 47085	A function's value belongs...
fnafvelrn 47086	A function's value belongs...
fafvelcdm 47087	A function's value belongs...
ffnafv 47088	A function maps to a class...
afvres 47089	The value of a restricted ...
tz6.12-afv 47090	Function value. Theorem 6...
tz6.12-1-afv 47091	Function value (Theorem 6....
dmfcoafv 47092	Domains of a function comp...
afvco2 47093	Value of a function compos...
rlimdmafv 47094	Two ways to express that a...
aoveq123d 47095	Equality deduction for ope...
nfaov 47096	Bound-variable hypothesis ...
csbaovg 47097	Move class substitution in...
aovfundmoveq 47098	If a class is a function r...
aovnfundmuv 47099	If an ordered pair is not ...
ndmaov 47100	The value of an operation ...
ndmaovg 47101	The value of an operation ...
aovvdm 47102	If the operation value of ...
nfunsnaov 47103	If the restriction of a cl...
aovvfunressn 47104	If the operation value of ...
aovprc 47105	The value of an operation ...
aovrcl 47106	Reverse closure for an ope...
aovpcov0 47107	If the alternative value o...
aovnuoveq 47108	The alternative value of t...
aovvoveq 47109	The alternative value of t...
aov0ov0 47110	If the alternative value o...
aovovn0oveq 47111	If the operation's value a...
aov0nbovbi 47112	The operation's value on a...
aovov0bi 47113	The operation's value on a...
rspceaov 47114	A frequently used special ...
fnotaovb 47115	Equivalence of operation v...
ffnaov 47116	An operation maps to a cla...
faovcl 47117	Closure law for an operati...
aovmpt4g 47118	Value of a function given ...
aoprssdm 47119	Domain of closure of an op...
ndmaovcl 47120	The "closure" of an operat...
ndmaovrcl 47121	Reverse closure law, in co...
ndmaovcom 47122	Any operation is commutati...
ndmaovass 47123	Any operation is associati...
ndmaovdistr 47124	Any operation is distribut...
dfatafv2iota 47127	If a function is defined a...
ndfatafv2 47128	The alternate function val...
ndfatafv2undef 47129	The alternate function val...
dfatafv2ex 47130	The alternate function val...
afv2ex 47131	The alternate function val...
afv2eq12d 47132	Equality deduction for fun...
afv2eq1 47133	Equality theorem for funct...
afv2eq2 47134	Equality theorem for funct...
nfafv2 47135	Bound-variable hypothesis ...
csbafv212g 47136	Move class substitution in...
fexafv2ex 47137	The alternate function val...
ndfatafv2nrn 47138	The alternate function val...
ndmafv2nrn 47139	The value of a class outsi...
funressndmafv2rn 47140	The alternate function val...
afv2ndefb 47141	Two ways to say that an al...
nfunsnafv2 47142	If the restriction of a cl...
afv2prc 47143	A function's value at a pr...
dfatafv2rnb 47144	The alternate function val...
afv2orxorb 47145	If a set is in the range o...
dmafv2rnb 47146	The alternate function val...
fundmafv2rnb 47147	The alternate function val...
afv2elrn 47148	An alternate function valu...
afv20defat 47149	If the alternate function ...
fnafv2elrn 47150	An alternate function valu...
fafv2elcdm 47151	An alternate function valu...
fafv2elrnb 47152	An alternate function valu...
fcdmvafv2v 47153	If the codomain of a funct...
tz6.12-2-afv2 47154	Function value when ` F ` ...
afv2eu 47155	The value of a function at...
afv2res 47156	The value of a restricted ...
tz6.12-afv2 47157	Function value (Theorem 6....
tz6.12-1-afv2 47158	Function value (Theorem 6....
tz6.12c-afv2 47159	Corollary of Theorem 6.12(...
tz6.12i-afv2 47160	Corollary of Theorem 6.12(...
funressnbrafv2 47161	The second argument of a b...
dfatbrafv2b 47162	Equivalence of function va...
dfatopafv2b 47163	Equivalence of function va...
funbrafv2 47164	The second argument of a b...
fnbrafv2b 47165	Equivalence of function va...
fnopafv2b 47166	Equivalence of function va...
funbrafv22b 47167	Equivalence of function va...
funopafv2b 47168	Equivalence of function va...
dfatsnafv2 47169	Singleton of function valu...
dfafv23 47170	A definition of function v...
dfatdmfcoafv2 47171	Domain of a function compo...
dfatcolem 47172	Lemma for ~ dfatco . (Con...
dfatco 47173	The predicate "defined at"...
afv2co2 47174	Value of a function compos...
rlimdmafv2 47175	Two ways to express that a...
dfafv22 47176	Alternate definition of ` ...
afv2ndeffv0 47177	If the alternate function ...
dfatafv2eqfv 47178	If a function is defined a...
afv2rnfveq 47179	If the alternate function ...
afv20fv0 47180	If the alternate function ...
afv2fvn0fveq 47181	If the function's value at...
afv2fv0 47182	If the function's value at...
afv2fv0b 47183	The function's value at an...
afv2fv0xorb 47184	If a set is in the range o...
an4com24 47185	Rearrangement of 4 conjunc...
3an4ancom24 47186	Commutative law for a conj...
4an21 47187	Rearrangement of 4 conjunc...
dfnelbr2 47190	Alternate definition of th...
nelbr 47191	The binary relation of a s...
nelbrim 47192	If a set is related to ano...
nelbrnel 47193	A set is related to anothe...
nelbrnelim 47194	If a set is related to ano...
ralralimp 47195	Selecting one of two alter...
otiunsndisjX 47196	The union of singletons co...
fvifeq 47197	Equality of function value...
rnfdmpr 47198	The range of a one-to-one ...
imarnf1pr 47199	The image of the range of ...
funop1 47200	A function is an ordered p...
fun2dmnopgexmpl 47201	A function with a domain c...
opabresex0d 47202	A collection of ordered pa...
opabbrfex0d 47203	A collection of ordered pa...
opabresexd 47204	A collection of ordered pa...
opabbrfexd 47205	A collection of ordered pa...
f1oresf1orab 47206	Build a bijection by restr...
f1oresf1o 47207	Build a bijection by restr...
f1oresf1o2 47208	Build a bijection by restr...
fvmptrab 47209	Value of a function mappin...
fvmptrabdm 47210	Value of a function mappin...
cnambpcma 47211	((a-b)+c)-a = c-a holds fo...
cnapbmcpd 47212	((a+b)-c)+d = ((a+d)+b)-c ...
addsubeq0 47213	The sum of two complex num...
leaddsuble 47214	Addition and subtraction o...
2leaddle2 47215	If two real numbers are le...
ltnltne 47216	Variant of trichotomy law ...
p1lep2 47217	A real number increasd by ...
ltsubsubaddltsub 47218	If the result of subtracti...
zm1nn 47219	An integer minus 1 is posi...
readdcnnred 47220	The sum of a real number a...
resubcnnred 47221	The difference of a real n...
recnmulnred 47222	The product of a real numb...
cndivrenred 47223	The quotient of an imagina...
sqrtnegnre 47224	The square root of a negat...
nn0resubcl 47225	Closure law for subtractio...
zgeltp1eq 47226	If an integer is between a...
1t10e1p1e11 47227	11 is 1 times 10 to the po...
deccarry 47228	Add 1 to a 2 digit number ...
eluzge0nn0 47229	If an integer is greater t...
nltle2tri 47230	Negated extended trichotom...
ssfz12 47231	Subset relationship for fi...
elfz2z 47232	Membership of an integer i...
2elfz3nn0 47233	If there are two elements ...
fz0addcom 47234	The addition of two member...
2elfz2melfz 47235	If the sum of two integers...
fz0addge0 47236	The sum of two integers in...
elfzlble 47237	Membership of an integer i...
elfzelfzlble 47238	Membership of an element o...
fzopred 47239	Join a predecessor to the ...
fzopredsuc 47240	Join a predecessor and a s...
1fzopredsuc 47241	Join 0 and a successor to ...
el1fzopredsuc 47242	An element of an open inte...
subsubelfzo0 47243	Subtracting a difference f...
2ffzoeq 47244	Two functions over a half-...
m1mod0mod1 47245	An integer decreased by 1 ...
elmod2 47246	An integer modulo 2 is eit...
smonoord 47247	Ordering relation for a st...
fsummsndifre 47248	A finite sum with one of i...
fsumsplitsndif 47249	Separate out a term in a f...
fsummmodsndifre 47250	A finite sum of summands m...
fsummmodsnunz 47251	A finite sum of summands m...
setsidel 47252	The injected slot is an el...
setsnidel 47253	The injected slot is an el...
setsv 47254	The value of the structure...
preimafvsnel 47255	The preimage of a function...
preimafvn0 47256	The preimage of a function...
uniimafveqt 47257	The union of the image of ...
uniimaprimaeqfv 47258	The union of the image of ...
setpreimafvex 47259	The class ` P ` of all pre...
elsetpreimafvb 47260	The characterization of an...
elsetpreimafv 47261	An element of the class ` ...
elsetpreimafvssdm 47262	An element of the class ` ...
fvelsetpreimafv 47263	There is an element in a p...
preimafvelsetpreimafv 47264	The preimage of a function...
preimafvsspwdm 47265	The class ` P ` of all pre...
0nelsetpreimafv 47266	The empty set is not an el...
elsetpreimafvbi 47267	An element of the preimage...
elsetpreimafveqfv 47268	The elements of the preima...
eqfvelsetpreimafv 47269	If an element of the domai...
elsetpreimafvrab 47270	An element of the preimage...
imaelsetpreimafv 47271	The image of an element of...
uniimaelsetpreimafv 47272	The union of the image of ...
elsetpreimafveq 47273	If two preimages of functi...
fundcmpsurinjlem1 47274	Lemma 1 for ~ fundcmpsurin...
fundcmpsurinjlem2 47275	Lemma 2 for ~ fundcmpsurin...
fundcmpsurinjlem3 47276	Lemma 3 for ~ fundcmpsurin...
imasetpreimafvbijlemf 47277	Lemma for ~ imasetpreimafv...
imasetpreimafvbijlemfv 47278	Lemma for ~ imasetpreimafv...
imasetpreimafvbijlemfv1 47279	Lemma for ~ imasetpreimafv...
imasetpreimafvbijlemf1 47280	Lemma for ~ imasetpreimafv...
imasetpreimafvbijlemfo 47281	Lemma for ~ imasetpreimafv...
imasetpreimafvbij 47282	The mapping ` H ` is a bij...
fundcmpsurbijinjpreimafv 47283	Every function ` F : A -->...
fundcmpsurinjpreimafv 47284	Every function ` F : A -->...
fundcmpsurinj 47285	Every function ` F : A -->...
fundcmpsurbijinj 47286	Every function ` F : A -->...
fundcmpsurinjimaid 47287	Every function ` F : A -->...
fundcmpsurinjALT 47288	Alternate proof of ~ fundc...
iccpval 47291	Partition consisting of a ...
iccpart 47292	A special partition. Corr...
iccpartimp 47293	Implications for a class b...
iccpartres 47294	The restriction of a parti...
iccpartxr 47295	If there is a partition, t...
iccpartgtprec 47296	If there is a partition, t...
iccpartipre 47297	If there is a partition, t...
iccpartiltu 47298	If there is a partition, t...
iccpartigtl 47299	If there is a partition, t...
iccpartlt 47300	If there is a partition, t...
iccpartltu 47301	If there is a partition, t...
iccpartgtl 47302	If there is a partition, t...
iccpartgt 47303	If there is a partition, t...
iccpartleu 47304	If there is a partition, t...
iccpartgel 47305	If there is a partition, t...
iccpartrn 47306	If there is a partition, t...
iccpartf 47307	The range of the partition...
iccpartel 47308	If there is a partition, t...
iccelpart 47309	An element of any partitio...
iccpartiun 47310	A half-open interval of ex...
icceuelpartlem 47311	Lemma for ~ icceuelpart . ...
icceuelpart 47312	An element of a partitione...
iccpartdisj 47313	The segments of a partitio...
iccpartnel 47314	A point of a partition is ...
fargshiftfv 47315	If a class is a function, ...
fargshiftf 47316	If a class is a function, ...
fargshiftf1 47317	If a function is 1-1, then...
fargshiftfo 47318	If a function is onto, the...
fargshiftfva 47319	The values of a shifted fu...
lswn0 47320	The last symbol of a not e...
nfich1 47323	The first interchangeable ...
nfich2 47324	The second interchangeable...
ichv 47325	Setvar variables are inter...
ichf 47326	Setvar variables are inter...
ichid 47327	A setvar variable is alway...
icht 47328	A theorem is interchangeab...
ichbidv 47329	Formula building rule for ...
ichcircshi 47330	The setvar variables are i...
ichan 47331	If two setvar variables ar...
ichn 47332	Negation does not affect i...
ichim 47333	Formula building rule for ...
dfich2 47334	Alternate definition of th...
ichcom 47335	The interchangeability of ...
ichbi12i 47336	Equivalence for interchang...
icheqid 47337	In an equality for the sam...
icheq 47338	In an equality of setvar v...
ichnfimlem 47339	Lemma for ~ ichnfim : A s...
ichnfim 47340	If in an interchangeabilit...
ichnfb 47341	If ` x ` and ` y ` are int...
ichal 47342	Move a universal quantifie...
ich2al 47343	Two setvar variables are a...
ich2ex 47344	Two setvar variables are a...
ichexmpl1 47345	Example for interchangeabl...
ichexmpl2 47346	Example for interchangeabl...
ich2exprop 47347	If the setvar variables ar...
ichnreuop 47348	If the setvar variables ar...
ichreuopeq 47349	If the setvar variables ar...
sprid 47350	Two identical representati...
elsprel 47351	An unordered pair is an el...
spr0nelg 47352	The empty set is not an el...
sprval 47355	The set of all unordered p...
sprvalpw 47356	The set of all unordered p...
sprssspr 47357	The set of all unordered p...
spr0el 47358	The empty set is not an un...
sprvalpwn0 47359	The set of all unordered p...
sprel 47360	An element of the set of a...
prssspr 47361	An element of a subset of ...
prelspr 47362	An unordered pair of eleme...
prsprel 47363	The elements of a pair fro...
prsssprel 47364	The elements of a pair fro...
sprvalpwle2 47365	The set of all unordered p...
sprsymrelfvlem 47366	Lemma for ~ sprsymrelf and...
sprsymrelf1lem 47367	Lemma for ~ sprsymrelf1 . ...
sprsymrelfolem1 47368	Lemma 1 for ~ sprsymrelfo ...
sprsymrelfolem2 47369	Lemma 2 for ~ sprsymrelfo ...
sprsymrelfv 47370	The value of the function ...
sprsymrelf 47371	The mapping ` F ` is a fun...
sprsymrelf1 47372	The mapping ` F ` is a one...
sprsymrelfo 47373	The mapping ` F ` is a fun...
sprsymrelf1o 47374	The mapping ` F ` is a bij...
sprbisymrel 47375	There is a bijection betwe...
sprsymrelen 47376	The class ` P ` of subsets...
prpair 47377	Characterization of a prop...
prproropf1olem0 47378	Lemma 0 for ~ prproropf1o ...
prproropf1olem1 47379	Lemma 1 for ~ prproropf1o ...
prproropf1olem2 47380	Lemma 2 for ~ prproropf1o ...
prproropf1olem3 47381	Lemma 3 for ~ prproropf1o ...
prproropf1olem4 47382	Lemma 4 for ~ prproropf1o ...
prproropf1o 47383	There is a bijection betwe...
prproropen 47384	The set of proper pairs an...
prproropreud 47385	There is exactly one order...
pairreueq 47386	Two equivalent representat...
paireqne 47387	Two sets are not equal iff...
prprval 47390	The set of all proper unor...
prprvalpw 47391	The set of all proper unor...
prprelb 47392	An element of the set of a...
prprelprb 47393	A set is an element of the...
prprspr2 47394	The set of all proper unor...
prprsprreu 47395	There is a unique proper u...
prprreueq 47396	There is a unique proper u...
sbcpr 47397	The proper substitution of...
reupr 47398	There is a unique unordere...
reuprpr 47399	There is a unique proper u...
poprelb 47400	Equality for unordered pai...
2exopprim 47401	The existence of an ordere...
reuopreuprim 47402	There is a unique unordere...
fmtno 47405	The ` N ` th Fermat number...
fmtnoge3 47406	Each Fermat number is grea...
fmtnonn 47407	Each Fermat number is a po...
fmtnom1nn 47408	A Fermat number minus one ...
fmtnoodd 47409	Each Fermat number is odd....
fmtnorn 47410	A Fermat number is a funct...
fmtnof1 47411	The enumeration of the Fer...
fmtnoinf 47412	The set of Fermat numbers ...
fmtnorec1 47413	The first recurrence relat...
sqrtpwpw2p 47414	The floor of the square ro...
fmtnosqrt 47415	The floor of the square ro...
fmtno0 47416	The ` 0 ` th Fermat number...
fmtno1 47417	The ` 1 ` st Fermat number...
fmtnorec2lem 47418	Lemma for ~ fmtnorec2 (ind...
fmtnorec2 47419	The second recurrence rela...
fmtnodvds 47420	Any Fermat number divides ...
goldbachthlem1 47421	Lemma 1 for ~ goldbachth ....
goldbachthlem2 47422	Lemma 2 for ~ goldbachth ....
goldbachth 47423	Goldbach's theorem: Two d...
fmtnorec3 47424	The third recurrence relat...
fmtnorec4 47425	The fourth recurrence rela...
fmtno2 47426	The ` 2 ` nd Fermat number...
fmtno3 47427	The ` 3 ` rd Fermat number...
fmtno4 47428	The ` 4 ` th Fermat number...
fmtno5lem1 47429	Lemma 1 for ~ fmtno5 . (C...
fmtno5lem2 47430	Lemma 2 for ~ fmtno5 . (C...
fmtno5lem3 47431	Lemma 3 for ~ fmtno5 . (C...
fmtno5lem4 47432	Lemma 4 for ~ fmtno5 . (C...
fmtno5 47433	The ` 5 ` th Fermat number...
fmtno0prm 47434	The ` 0 ` th Fermat number...
fmtno1prm 47435	The ` 1 ` st Fermat number...
fmtno2prm 47436	The ` 2 ` nd Fermat number...
257prm 47437	257 is a prime number (the...
fmtno3prm 47438	The ` 3 ` rd Fermat number...
odz2prm2pw 47439	Any power of two is coprim...
fmtnoprmfac1lem 47440	Lemma for ~ fmtnoprmfac1 :...
fmtnoprmfac1 47441	Divisor of Fermat number (...
fmtnoprmfac2lem1 47442	Lemma for ~ fmtnoprmfac2 ....
fmtnoprmfac2 47443	Divisor of Fermat number (...
fmtnofac2lem 47444	Lemma for ~ fmtnofac2 (Ind...
fmtnofac2 47445	Divisor of Fermat number (...
fmtnofac1 47446	Divisor of Fermat number (...
fmtno4sqrt 47447	The floor of the square ro...
fmtno4prmfac 47448	If P was a (prime) factor ...
fmtno4prmfac193 47449	If P was a (prime) factor ...
fmtno4nprmfac193 47450	193 is not a (prime) facto...
fmtno4prm 47451	The ` 4 `-th Fermat number...
65537prm 47452	65537 is a prime number (t...
fmtnofz04prm 47453	The first five Fermat numb...
fmtnole4prm 47454	The first five Fermat numb...
fmtno5faclem1 47455	Lemma 1 for ~ fmtno5fac . ...
fmtno5faclem2 47456	Lemma 2 for ~ fmtno5fac . ...
fmtno5faclem3 47457	Lemma 3 for ~ fmtno5fac . ...
fmtno5fac 47458	The factorization of the `...
fmtno5nprm 47459	The ` 5 ` th Fermat number...
prmdvdsfmtnof1lem1 47460	Lemma 1 for ~ prmdvdsfmtno...
prmdvdsfmtnof1lem2 47461	Lemma 2 for ~ prmdvdsfmtno...
prmdvdsfmtnof 47462	The mapping of a Fermat nu...
prmdvdsfmtnof1 47463	The mapping of a Fermat nu...
prminf2 47464	The set of prime numbers i...
2pwp1prm 47465	For ` ( ( 2 ^ k ) + 1 ) ` ...
2pwp1prmfmtno 47466	Every prime number of the ...
m2prm 47467	The second Mersenne number...
m3prm 47468	The third Mersenne number ...
flsqrt 47469	A condition equivalent to ...
flsqrt5 47470	The floor of the square ro...
3ndvds4 47471	3 does not divide 4. (Con...
139prmALT 47472	139 is a prime number. In...
31prm 47473	31 is a prime number. In ...
m5prm 47474	The fifth Mersenne number ...
127prm 47475	127 is a prime number. (C...
m7prm 47476	The seventh Mersenne numbe...
m11nprm 47477	The eleventh Mersenne numb...
mod42tp1mod8 47478	If a number is ` 3 ` modul...
sfprmdvdsmersenne 47479	If ` Q ` is a safe prime (...
sgprmdvdsmersenne 47480	If ` P ` is a Sophie Germa...
lighneallem1 47481	Lemma 1 for ~ lighneal . ...
lighneallem2 47482	Lemma 2 for ~ lighneal . ...
lighneallem3 47483	Lemma 3 for ~ lighneal . ...
lighneallem4a 47484	Lemma 1 for ~ lighneallem4...
lighneallem4b 47485	Lemma 2 for ~ lighneallem4...
lighneallem4 47486	Lemma 3 for ~ lighneal . ...
lighneal 47487	If a power of a prime ` P ...
modexp2m1d 47488	The square of an integer w...
proththdlem 47489	Lemma for ~ proththd . (C...
proththd 47490	Proth's theorem (1878). I...
5tcu2e40 47491	5 times the cube of 2 is 4...
3exp4mod41 47492	3 to the fourth power is -...
41prothprmlem1 47493	Lemma 1 for ~ 41prothprm ....
41prothprmlem2 47494	Lemma 2 for ~ 41prothprm ....
41prothprm 47495	41 is a _Proth prime_. (C...
quad1 47496	A condition for a quadrati...
requad01 47497	A condition for a quadrati...
requad1 47498	A condition for a quadrati...
requad2 47499	A condition for a quadrati...
iseven 47504	The predicate "is an even ...
isodd 47505	The predicate "is an odd n...
evenz 47506	An even number is an integ...
oddz 47507	An odd number is an intege...
evendiv2z 47508	The result of dividing an ...
oddp1div2z 47509	The result of dividing an ...
oddm1div2z 47510	The result of dividing an ...
isodd2 47511	The predicate "is an odd n...
dfodd2 47512	Alternate definition for o...
dfodd6 47513	Alternate definition for o...
dfeven4 47514	Alternate definition for e...
evenm1odd 47515	The predecessor of an even...
evenp1odd 47516	The successor of an even n...
oddp1eveni 47517	The successor of an odd nu...
oddm1eveni 47518	The predecessor of an odd ...
evennodd 47519	An even number is not an o...
oddneven 47520	An odd number is not an ev...
enege 47521	The negative of an even nu...
onego 47522	The negative of an odd num...
m1expevenALTV 47523	Exponentiation of -1 by an...
m1expoddALTV 47524	Exponentiation of -1 by an...
dfeven2 47525	Alternate definition for e...
dfodd3 47526	Alternate definition for o...
iseven2 47527	The predicate "is an even ...
isodd3 47528	The predicate "is an odd n...
2dvdseven 47529	2 divides an even number. ...
m2even 47530	A multiple of 2 is an even...
2ndvdsodd 47531	2 does not divide an odd n...
2dvdsoddp1 47532	2 divides an odd number in...
2dvdsoddm1 47533	2 divides an odd number de...
dfeven3 47534	Alternate definition for e...
dfodd4 47535	Alternate definition for o...
dfodd5 47536	Alternate definition for o...
zefldiv2ALTV 47537	The floor of an even numbe...
zofldiv2ALTV 47538	The floor of an odd numer ...
oddflALTV 47539	Odd number representation ...
iseven5 47540	The predicate "is an even ...
isodd7 47541	The predicate "is an odd n...
dfeven5 47542	Alternate definition for e...
dfodd7 47543	Alternate definition for o...
gcd2odd1 47544	The greatest common diviso...
zneoALTV 47545	No even integer equals an ...
zeoALTV 47546	An integer is even or odd....
zeo2ALTV 47547	An integer is even or odd ...
nneoALTV 47548	A positive integer is even...
nneoiALTV 47549	A positive integer is even...
odd2np1ALTV 47550	An integer is odd iff it i...
oddm1evenALTV 47551	An integer is odd iff its ...
oddp1evenALTV 47552	An integer is odd iff its ...
oexpnegALTV 47553	The exponential of the neg...
oexpnegnz 47554	The exponential of the neg...
bits0ALTV 47555	Value of the zeroth bit. ...
bits0eALTV 47556	The zeroth bit of an even ...
bits0oALTV 47557	The zeroth bit of an odd n...
divgcdoddALTV 47558	Either ` A / ( A gcd B ) `...
opoeALTV 47559	The sum of two odds is eve...
opeoALTV 47560	The sum of an odd and an e...
omoeALTV 47561	The difference of two odds...
omeoALTV 47562	The difference of an odd a...
oddprmALTV 47563	A prime not equal to ` 2 `...
0evenALTV 47564	0 is an even number. (Con...
0noddALTV 47565	0 is not an odd number. (...
1oddALTV 47566	1 is an odd number. (Cont...
1nevenALTV 47567	1 is not an even number. ...
2evenALTV 47568	2 is an even number. (Con...
2noddALTV 47569	2 is not an odd number. (...
nn0o1gt2ALTV 47570	An odd nonnegative integer...
nnoALTV 47571	An alternate characterizat...
nn0oALTV 47572	An alternate characterizat...
nn0e 47573	An alternate characterizat...
nneven 47574	An alternate characterizat...
nn0onn0exALTV 47575	For each odd nonnegative i...
nn0enn0exALTV 47576	For each even nonnegative ...
nnennexALTV 47577	For each even positive int...
nnpw2evenALTV 47578	2 to the power of a positi...
epoo 47579	The sum of an even and an ...
emoo 47580	The difference of an even ...
epee 47581	The sum of two even number...
emee 47582	The difference of two even...
evensumeven 47583	If a summand is even, the ...
3odd 47584	3 is an odd number. (Cont...
4even 47585	4 is an even number. (Con...
5odd 47586	5 is an odd number. (Cont...
6even 47587	6 is an even number. (Con...
7odd 47588	7 is an odd number. (Cont...
8even 47589	8 is an even number. (Con...
evenprm2 47590	A prime number is even iff...
oddprmne2 47591	Every prime number not bei...
oddprmuzge3 47592	A prime number which is od...
evenltle 47593	If an even number is great...
odd2prm2 47594	If an odd number is the su...
even3prm2 47595	If an even number is the s...
mogoldbblem 47596	Lemma for ~ mogoldbb . (C...
perfectALTVlem1 47597	Lemma for ~ perfectALTV . ...
perfectALTVlem2 47598	Lemma for ~ perfectALTV . ...
perfectALTV 47599	The Euclid-Euler theorem, ...
fppr 47602	The set of Fermat pseudopr...
fpprmod 47603	The set of Fermat pseudopr...
fpprel 47604	A Fermat pseudoprime to th...
fpprbasnn 47605	The base of a Fermat pseud...
fpprnn 47606	A Fermat pseudoprime to th...
fppr2odd 47607	A Fermat pseudoprime to th...
11t31e341 47608	341 is the product of 11 a...
2exp340mod341 47609	Eight to the eighth power ...
341fppr2 47610	341 is the (smallest) _Pou...
4fppr1 47611	4 is the (smallest) Fermat...
8exp8mod9 47612	Eight to the eighth power ...
9fppr8 47613	9 is the (smallest) Fermat...
dfwppr 47614	Alternate definition of a ...
fpprwppr 47615	A Fermat pseudoprime to th...
fpprwpprb 47616	An integer ` X ` which is ...
fpprel2 47617	An alternate definition fo...
nfermltl8rev 47618	Fermat's little theorem wi...
nfermltl2rev 47619	Fermat's little theorem wi...
nfermltlrev 47620	Fermat's little theorem re...
isgbe 47627	The predicate "is an even ...
isgbow 47628	The predicate "is a weak o...
isgbo 47629	The predicate "is an odd G...
gbeeven 47630	An even Goldbach number is...
gbowodd 47631	A weak odd Goldbach number...
gbogbow 47632	A (strong) odd Goldbach nu...
gboodd 47633	An odd Goldbach number is ...
gbepos 47634	Any even Goldbach number i...
gbowpos 47635	Any weak odd Goldbach numb...
gbopos 47636	Any odd Goldbach number is...
gbegt5 47637	Any even Goldbach number i...
gbowgt5 47638	Any weak odd Goldbach numb...
gbowge7 47639	Any weak odd Goldbach numb...
gboge9 47640	Any odd Goldbach number is...
gbege6 47641	Any even Goldbach number i...
gbpart6 47642	The Goldbach partition of ...
gbpart7 47643	The (weak) Goldbach partit...
gbpart8 47644	The Goldbach partition of ...
gbpart9 47645	The (strong) Goldbach part...
gbpart11 47646	The (strong) Goldbach part...
6gbe 47647	6 is an even Goldbach numb...
7gbow 47648	7 is a weak odd Goldbach n...
8gbe 47649	8 is an even Goldbach numb...
9gbo 47650	9 is an odd Goldbach numbe...
11gbo 47651	11 is an odd Goldbach numb...
stgoldbwt 47652	If the strong ternary Gold...
sbgoldbwt 47653	If the strong binary Goldb...
sbgoldbst 47654	If the strong binary Goldb...
sbgoldbaltlem1 47655	Lemma 1 for ~ sbgoldbalt :...
sbgoldbaltlem2 47656	Lemma 2 for ~ sbgoldbalt :...
sbgoldbalt 47657	An alternate (related to t...
sbgoldbb 47658	If the strong binary Goldb...
sgoldbeven3prm 47659	If the binary Goldbach con...
sbgoldbm 47660	If the strong binary Goldb...
mogoldbb 47661	If the modern version of t...
sbgoldbmb 47662	The strong binary Goldbach...
sbgoldbo 47663	If the strong binary Goldb...
nnsum3primes4 47664	4 is the sum of at most 3 ...
nnsum4primes4 47665	4 is the sum of at most 4 ...
nnsum3primesprm 47666	Every prime is "the sum of...
nnsum4primesprm 47667	Every prime is "the sum of...
nnsum3primesgbe 47668	Any even Goldbach number i...
nnsum4primesgbe 47669	Any even Goldbach number i...
nnsum3primesle9 47670	Every integer greater than...
nnsum4primesle9 47671	Every integer greater than...
nnsum4primesodd 47672	If the (weak) ternary Gold...
nnsum4primesoddALTV 47673	If the (strong) ternary Go...
evengpop3 47674	If the (weak) ternary Gold...
evengpoap3 47675	If the (strong) ternary Go...
nnsum4primeseven 47676	If the (weak) ternary Gold...
nnsum4primesevenALTV 47677	If the (strong) ternary Go...
wtgoldbnnsum4prm 47678	If the (weak) ternary Gold...
stgoldbnnsum4prm 47679	If the (strong) ternary Go...
bgoldbnnsum3prm 47680	If the binary Goldbach con...
bgoldbtbndlem1 47681	Lemma 1 for ~ bgoldbtbnd :...
bgoldbtbndlem2 47682	Lemma 2 for ~ bgoldbtbnd ....
bgoldbtbndlem3 47683	Lemma 3 for ~ bgoldbtbnd ....
bgoldbtbndlem4 47684	Lemma 4 for ~ bgoldbtbnd ....
bgoldbtbnd 47685	If the binary Goldbach con...
tgoldbachgtALTV 47688	Variant of Thierry Arnoux'...
bgoldbachlt 47689	The binary Goldbach conjec...
tgblthelfgott 47691	The ternary Goldbach conje...
tgoldbachlt 47692	The ternary Goldbach conje...
tgoldbach 47693	The ternary Goldbach conje...
clnbgrprc0 47696	The closed neighborhood is...
clnbgrcl 47697	If a class ` X ` has at le...
clnbgrval 47698	The closed neighborhood of...
dfclnbgr2 47699	Alternate definition of th...
dfclnbgr4 47700	Alternate definition of th...
dfclnbgr3 47701	Alternate definition of th...
clnbgrnvtx0 47702	If a class ` X ` is not a ...
clnbgrel 47703	Characterization of a memb...
clnbgrvtxel 47704	Every vertex ` K ` is a me...
clnbgrisvtx 47705	Every member ` N ` of the ...
clnbgrssvtx 47706	The closed neighborhood of...
clnbgrn0 47707	The closed neighborhood of...
clnbupgr 47708	The closed neighborhood of...
clnbupgrel 47709	A member of the closed nei...
clnbgr0vtx 47710	In a null graph (with no v...
clnbgr0edg 47711	In an empty graph (with no...
clnbgrsym 47712	In a graph, the closed nei...
predgclnbgrel 47713	If a (not necessarily prop...
clnbgredg 47714	A vertices connected by an...
clnbgrssedg 47715	The vertices connected by ...
edgusgrclnbfin 47716	The size of the closed nei...
clnbusgrfi 47717	The closed neighborhood of...
clnbfiusgrfi 47718	The closed neighborhood of...
clnbgrlevtx 47719	The size of the closed nei...
dfsclnbgr2 47720	Alternate definition of th...
sclnbgrel 47721	Characterization of a memb...
sclnbgrelself 47722	A vertex ` N ` is a member...
sclnbgrisvtx 47723	Every member ` X ` of the ...
dfclnbgr5 47724	Alternate definition of th...
dfnbgr5 47725	Alternate definition of th...
dfnbgrss 47726	Subset chain for different...
dfvopnbgr2 47727	Alternate definition of th...
vopnbgrel 47728	Characterization of a memb...
vopnbgrelself 47729	A vertex ` N ` is a member...
dfclnbgr6 47730	Alternate definition of th...
dfnbgr6 47731	Alternate definition of th...
dfsclnbgr6 47732	Alternate definition of a ...
dfnbgrss2 47733	Subset chain for different...
isisubgr 47736	The subgraph induced by a ...
isubgriedg 47737	The edges of an induced su...
isubgrvtxuhgr 47738	The subgraph induced by th...
isubgrvtx 47739	The vertices of an induced...
isubgruhgr 47740	An induced subgraph of a h...
isubgrsubgr 47741	An induced subgraph of a h...
isubgrupgr 47742	An induced subgraph of a p...
isubgrumgr 47743	An induced subgraph of a m...
isubgrusgr 47744	An induced subgraph of a s...
isubgr0uhgr 47745	The subgraph induced by an...
grimfn 47751	The graph isomorphism func...
grimdmrel 47752	The domain of the graph is...
isgrim 47754	An isomorphism of graphs i...
grimprop 47755	Properties of an isomorphi...
grimf1o 47756	An isomorphism of graphs i...
isuspgrim0lem 47757	An isomorphism of simple p...
isuspgrim0 47758	An isomorphism of simple p...
uspgrimprop 47759	An isomorphism of simple p...
isuspgrimlem 47760	Lemma for ~ isuspgrim . (...
isuspgrim 47761	A class is an isomorphism ...
grimidvtxedg 47762	The identity relation rest...
grimid 47763	The identity relation rest...
grimuhgr 47764	If there is a graph isomor...
grimcnv 47765	The converse of a graph is...
grimco 47766	The composition of graph i...
brgric 47767	The relation "is isomorphi...
brgrici 47768	Prove that two graphs are ...
gricrcl 47769	Reverse closure of the "is...
dfgric2 47770	Alternate, explicit defini...
gricbri 47771	Implications of two graphs...
gricushgr 47772	The "is isomorphic to" rel...
gricuspgr 47773	The "is isomorphic to" rel...
gricrel 47774	The "is isomorphic to" rel...
gricref 47775	Graph isomorphism is refle...
gricsym 47776	Graph isomorphism is symme...
gricsymb 47777	Graph isomorphism is symme...
grictr 47778	Graph isomorphism is trans...
gricer 47779	Isomorphism is an equivale...
gricen 47780	Isomorphic graphs have equ...
opstrgric 47781	A graph represented as an ...
ushggricedg 47782	A simple hypergraph (with ...
isubgrgrim 47783	Isomorphic subgraphs induc...
uhgrimisgrgriclem 47784	Lemma for ~ uhgrimisgrgric...
uhgrimisgrgric 47785	For isomorphic hypergraphs...
clnbgrisubgrgrim 47786	Isomorphic subgraphs induc...
clnbgrgrimlem 47787	Lemma for ~ clnbgrgrim : ...
clnbgrgrim 47788	Graph isomorphisms between...
grimedg 47789	Graph isomorphisms map edg...
grtriproplem 47792	Lemma for ~ grtriprop . (...
grtri 47793	The triangles in a graph. ...
grtriprop 47794	The properties of a triang...
grtrif1o 47795	Any bijection onto a trian...
isgrtri 47796	A triangle in a graph. (C...
grtrissvtx 47797	A triangle is a subset of ...
grtriclwlk3 47798	A triangle induces a close...
grtrimap 47799	Conditions for mapping tri...
grimgrtri 47800	Graph isomorphisms map tri...
usgrgrtrirex 47801	Conditions for a simple gr...
grlimfn 47805	The graph local isomorphis...
grlimdmrel 47806	The domain of the graph lo...
isgrlim 47808	A local isomorphism of gra...
isgrlim2 47809	A local isomorphism of gra...
grlimprop 47810	Properties of a local isom...
grlimf1o 47811	A local isomorphism of gra...
grlimprop2 47812	Properties of a local isom...
uhgrimgrlim 47813	An isomorphism of hypergra...
uspgrlimlem1 47814	Lemma 1 for ~ uspgrlim . ...
uspgrlimlem2 47815	Lemma 2 for ~ uspgrlim . ...
uspgrlimlem3 47816	Lemma 3 for ~ uspgrlim . ...
uspgrlimlem4 47817	Lemma 4 for ~ uspgrlim . ...
uspgrlim 47818	A local isomorphism of sim...
usgrlimprop 47819	Properties of a local isom...
grlimgrtrilem1 47820	Lemma 3 for ~ grlimgrtri ....
grlimgrtrilem2 47821	Lemma 3 for ~ grlimgrtri ....
grlimgrtri 47822	Local isomorphisms between...
brgrlic 47823	The relation "is locally i...
brgrilci 47824	Prove that two graphs are ...
grlicrel 47825	The "is locally isomorphic...
grlicrcl 47826	Reverse closure of the "is...
dfgrlic2 47827	Alternate, explicit defini...
grilcbri 47828	Implications of two graphs...
dfgrlic3 47829	Alternate, explicit defini...
grilcbri2 47830	Implications of two graphs...
grlicref 47831	Graph local isomorphism is...
grlicsym 47832	Graph local isomorphism is...
grlicsymb 47833	Graph local isomorphism is...
grlictr 47834	Graph local isomorphism is...
grlicer 47835	Local isomorphism is an eq...
grlicen 47836	Locally isomorphic graphs ...
gricgrlic 47837	Isomorphic hypergraphs are...
usgrexmpl1lem 47838	Lemma for ~ usgrexmpl1 . ...
usgrexmpl1 47839	` G ` is a simple graph of...
usgrexmpl1vtx 47840	The vertices ` 0 , 1 , 2 ,...
usgrexmpl1edg 47841	The edges ` { 0 , 1 } , { ...
usgrexmpl1tri 47842	` G ` contains a triangle ...
usgrexmpl2lem 47843	Lemma for ~ usgrexmpl2 . ...
usgrexmpl2 47844	` G ` is a simple graph of...
usgrexmpl2vtx 47845	The vertices ` 0 , 1 , 2 ,...
usgrexmpl2edg 47846	The edges ` { 0 , 1 } , { ...
usgrexmpl2nblem 47847	Lemma for ~ usgrexmpl2nb0 ...
usgrexmpl2nb0 47848	The neighborhood of the fi...
usgrexmpl2nb1 47849	The neighborhood of the se...
usgrexmpl2nb2 47850	The neighborhood of the th...
usgrexmpl2nb3 47851	The neighborhood of the fo...
usgrexmpl2nb4 47852	The neighborhood of the fi...
usgrexmpl2nb5 47853	The neighborhood of the si...
usgrexmpl2trifr 47854	` G ` is triangle-free. (...
usgrexmpl12ngric 47855	The graphs ` H ` and ` G `...
usgrexmpl12ngrlic 47856	The graphs ` H ` and ` G `...
1hegrlfgr 47857	A graph ` G ` with one hyp...
upwlksfval 47860	The set of simple walks (i...
isupwlk 47861	Properties of a pair of fu...
isupwlkg 47862	Generalization of ~ isupwl...
upwlkbprop 47863	Basic properties of a simp...
upwlkwlk 47864	A simple walk is a walk. ...
upgrwlkupwlk 47865	In a pseudograph, a walk i...
upgrwlkupwlkb 47866	In a pseudograph, the defi...
upgrisupwlkALT 47867	Alternate proof of ~ upgri...
upgredgssspr 47868	The set of edges of a pseu...
uspgropssxp 47869	The set ` G ` of "simple p...
uspgrsprfv 47870	The value of the function ...
uspgrsprf 47871	The mapping ` F ` is a fun...
uspgrsprf1 47872	The mapping ` F ` is a one...
uspgrsprfo 47873	The mapping ` F ` is a fun...
uspgrsprf1o 47874	The mapping ` F ` is a bij...
uspgrex 47875	The class ` G ` of all "si...
uspgrbispr 47876	There is a bijection betwe...
uspgrspren 47877	The set ` G ` of the "simp...
uspgrymrelen 47878	The set ` G ` of the "simp...
uspgrbisymrel 47879	There is a bijection betwe...
uspgrbisymrelALT 47880	Alternate proof of ~ uspgr...
ovn0dmfun 47881	If a class operation value...
xpsnopab 47882	A Cartesian product with a...
xpiun 47883	A Cartesian product expres...
ovn0ssdmfun 47884	If a class' operation valu...
fnxpdmdm 47885	The domain of the domain o...
cnfldsrngbas 47886	The base set of a subring ...
cnfldsrngadd 47887	The group addition operati...
cnfldsrngmul 47888	The ring multiplication op...
plusfreseq 47889	If the empty set is not co...
mgmplusfreseq 47890	If the empty set is not co...
0mgm 47891	A set with an empty base s...
opmpoismgm 47892	A structure with a group a...
copissgrp 47893	A structure with a constan...
copisnmnd 47894	A structure with a constan...
0nodd 47895	0 is not an odd integer. ...
1odd 47896	1 is an odd integer. (Con...
2nodd 47897	2 is not an odd integer. ...
oddibas 47898	Lemma 1 for ~ oddinmgm : ...
oddiadd 47899	Lemma 2 for ~ oddinmgm : ...
oddinmgm 47900	The structure of all odd i...
nnsgrpmgm 47901	The structure of positive ...
nnsgrp 47902	The structure of positive ...
nnsgrpnmnd 47903	The structure of positive ...
nn0mnd 47904	The set of nonnegative int...
gsumsplit2f 47905	Split a group sum into two...
gsumdifsndf 47906	Extract a summand from a f...
gsumfsupp 47907	A group sum of a family ca...
iscllaw 47914	The predicate "is a closed...
iscomlaw 47915	The predicate "is a commut...
clcllaw 47916	Closure of a closed operat...
isasslaw 47917	The predicate "is an assoc...
asslawass 47918	Associativity of an associ...
mgmplusgiopALT 47919	Slot 2 (group operation) o...
sgrpplusgaopALT 47920	Slot 2 (group operation) o...
intopval 47927	The internal (binary) oper...
intop 47928	An internal (binary) opera...
clintopval 47929	The closed (internal binar...
assintopval 47930	The associative (closed in...
assintopmap 47931	The associative (closed in...
isclintop 47932	The predicate "is a closed...
clintop 47933	A closed (internal binary)...
assintop 47934	An associative (closed int...
isassintop 47935	The predicate "is an assoc...
clintopcllaw 47936	The closure law holds for ...
assintopcllaw 47937	The closure low holds for ...
assintopasslaw 47938	The associative low holds ...
assintopass 47939	An associative (closed int...
ismgmALT 47948	The predicate "is a magma"...
iscmgmALT 47949	The predicate "is a commut...
issgrpALT 47950	The predicate "is a semigr...
iscsgrpALT 47951	The predicate "is a commut...
mgm2mgm 47952	Equivalence of the two def...
sgrp2sgrp 47953	Equivalence of the two def...
lmod0rng 47954	If the scalar ring of a mo...
nzrneg1ne0 47955	The additive inverse of th...
lidldomn1 47956	If a (left) ideal (which i...
lidlabl 47957	A (left) ideal of a ring i...
lidlrng 47958	A (left) ideal of a ring i...
zlidlring 47959	The zero (left) ideal of a...
uzlidlring 47960	Only the zero (left) ideal...
lidldomnnring 47961	A (left) ideal of a domain...
0even 47962	0 is an even integer. (Co...
1neven 47963	1 is not an even integer. ...
2even 47964	2 is an even integer. (Co...
2zlidl 47965	The even integers are a (l...
2zrng 47966	The ring of integers restr...
2zrngbas 47967	The base set of R is the s...
2zrngadd 47968	The group addition operati...
2zrng0 47969	The additive identity of R...
2zrngamgm 47970	R is an (additive) magma. ...
2zrngasgrp 47971	R is an (additive) semigro...
2zrngamnd 47972	R is an (additive) monoid....
2zrngacmnd 47973	R is a commutative (additi...
2zrngagrp 47974	R is an (additive) group. ...
2zrngaabl 47975	R is an (additive) abelian...
2zrngmul 47976	The ring multiplication op...
2zrngmmgm 47977	R is a (multiplicative) ma...
2zrngmsgrp 47978	R is a (multiplicative) se...
2zrngALT 47979	The ring of integers restr...
2zrngnmlid 47980	R has no multiplicative (l...
2zrngnmrid 47981	R has no multiplicative (r...
2zrngnmlid2 47982	R has no multiplicative (l...
2zrngnring 47983	R is not a unital ring. (...
cznrnglem 47984	Lemma for ~ cznrng : The ...
cznabel 47985	The ring constructed from ...
cznrng 47986	The ring constructed from ...
cznnring 47987	The ring constructed from ...
rngcvalALTV 47990	Value of the category of n...
rngcbasALTV 47991	Set of objects of the cate...
rngchomfvalALTV 47992	Set of arrows of the categ...
rngchomALTV 47993	Set of arrows of the categ...
elrngchomALTV 47994	A morphism of non-unital r...
rngccofvalALTV 47995	Composition in the categor...
rngccoALTV 47996	Composition in the categor...
rngccatidALTV 47997	Lemma for ~ rngccatALTV . ...
rngccatALTV 47998	The category of non-unital...
rngcidALTV 47999	The identity arrow in the ...
rngcsectALTV 48000	A section in the category ...
rngcinvALTV 48001	An inverse in the category...
rngcisoALTV 48002	An isomorphism in the cate...
rngchomffvalALTV 48003	The value of the functiona...
rngchomrnghmresALTV 48004	The value of the functiona...
rngcrescrhmALTV 48005	The category of non-unital...
rhmsubcALTVlem1 48006	Lemma 1 for ~ rhmsubcALTV ...
rhmsubcALTVlem2 48007	Lemma 2 for ~ rhmsubcALTV ...
rhmsubcALTVlem3 48008	Lemma 3 for ~ rhmsubcALTV ...
rhmsubcALTVlem4 48009	Lemma 4 for ~ rhmsubcALTV ...
rhmsubcALTV 48010	According to ~ df-subc , t...
rhmsubcALTVcat 48011	The restriction of the cat...
ringcvalALTV 48014	Value of the category of r...
funcringcsetcALTV2lem1 48015	Lemma 1 for ~ funcringcset...
funcringcsetcALTV2lem2 48016	Lemma 2 for ~ funcringcset...
funcringcsetcALTV2lem3 48017	Lemma 3 for ~ funcringcset...
funcringcsetcALTV2lem4 48018	Lemma 4 for ~ funcringcset...
funcringcsetcALTV2lem5 48019	Lemma 5 for ~ funcringcset...
funcringcsetcALTV2lem6 48020	Lemma 6 for ~ funcringcset...
funcringcsetcALTV2lem7 48021	Lemma 7 for ~ funcringcset...
funcringcsetcALTV2lem8 48022	Lemma 8 for ~ funcringcset...
funcringcsetcALTV2lem9 48023	Lemma 9 for ~ funcringcset...
funcringcsetcALTV2 48024	The "natural forgetful fun...
ringcbasALTV 48025	Set of objects of the cate...
ringchomfvalALTV 48026	Set of arrows of the categ...
ringchomALTV 48027	Set of arrows of the categ...
elringchomALTV 48028	A morphism of rings is a f...
ringccofvalALTV 48029	Composition in the categor...
ringccoALTV 48030	Composition in the categor...
ringccatidALTV 48031	Lemma for ~ ringccatALTV ....
ringccatALTV 48032	The category of rings is a...
ringcidALTV 48033	The identity arrow in the ...
ringcsectALTV 48034	A section in the category ...
ringcinvALTV 48035	An inverse in the category...
ringcisoALTV 48036	An isomorphism in the cate...
ringcbasbasALTV 48037	An element of the base set...
funcringcsetclem1ALTV 48038	Lemma 1 for ~ funcringcset...
funcringcsetclem2ALTV 48039	Lemma 2 for ~ funcringcset...
funcringcsetclem3ALTV 48040	Lemma 3 for ~ funcringcset...
funcringcsetclem4ALTV 48041	Lemma 4 for ~ funcringcset...
funcringcsetclem5ALTV 48042	Lemma 5 for ~ funcringcset...
funcringcsetclem6ALTV 48043	Lemma 6 for ~ funcringcset...
funcringcsetclem7ALTV 48044	Lemma 7 for ~ funcringcset...
funcringcsetclem8ALTV 48045	Lemma 8 for ~ funcringcset...
funcringcsetclem9ALTV 48046	Lemma 9 for ~ funcringcset...
funcringcsetcALTV 48047	The "natural forgetful fun...
srhmsubcALTVlem1 48048	Lemma 1 for ~ srhmsubcALTV...
srhmsubcALTVlem2 48049	Lemma 2 for ~ srhmsubcALTV...
srhmsubcALTV 48050	According to ~ df-subc , t...
sringcatALTV 48051	The restriction of the cat...
crhmsubcALTV 48052	According to ~ df-subc , t...
cringcatALTV 48053	The restriction of the cat...
drhmsubcALTV 48054	According to ~ df-subc , t...
drngcatALTV 48055	The restriction of the cat...
fldcatALTV 48056	The restriction of the cat...
fldcALTV 48057	The restriction of the cat...
fldhmsubcALTV 48058	According to ~ df-subc , t...
opeliun2xp 48059	Membership of an ordered p...
eliunxp2 48060	Membership in a union of C...
mpomptx2 48061	Express a two-argument fun...
cbvmpox2 48062	Rule to change the bound v...
dmmpossx2 48063	The domain of a mapping is...
mpoexxg2 48064	Existence of an operation ...
ovmpordxf 48065	Value of an operation give...
ovmpordx 48066	Value of an operation give...
ovmpox2 48067	The value of an operation ...
fdmdifeqresdif 48068	The restriction of a condi...
offvalfv 48069	The function operation exp...
ofaddmndmap 48070	The function operation app...
mapsnop 48071	A singleton of an ordered ...
fprmappr 48072	A function with a domain o...
mapprop 48073	An unordered pair containi...
ztprmneprm 48074	A prime is not an integer ...
2t6m3t4e0 48075	2 times 6 minus 3 times 4 ...
ssnn0ssfz 48076	For any finite subset of `...
nn0sumltlt 48077	If the sum of two nonnegat...
bcpascm1 48078	Pascal's rule for the bino...
altgsumbc 48079	The sum of binomial coeffi...
altgsumbcALT 48080	Alternate proof of ~ altgs...
zlmodzxzlmod 48081	The ` ZZ `-module ` ZZ X. ...
zlmodzxzel 48082	An element of the (base se...
zlmodzxz0 48083	The ` 0 ` of the ` ZZ `-mo...
zlmodzxzscm 48084	The scalar multiplication ...
zlmodzxzadd 48085	The addition of the ` ZZ `...
zlmodzxzsubm 48086	The subtraction of the ` Z...
zlmodzxzsub 48087	The subtraction of the ` Z...
mgpsumunsn 48088	Extract a summand/factor f...
mgpsumz 48089	If the group sum for the m...
mgpsumn 48090	If the group sum for the m...
exple2lt6 48091	A nonnegative integer to t...
pgrple2abl 48092	Every symmetric group on a...
pgrpgt2nabl 48093	Every symmetric group on a...
invginvrid 48094	Identity for a multiplicat...
rmsupp0 48095	The support of a mapping o...
domnmsuppn0 48096	The support of a mapping o...
rmsuppss 48097	The support of a mapping o...
mndpsuppss 48098	The support of a mapping o...
scmsuppss 48099	The support of a mapping o...
rmsuppfi 48100	The support of a mapping o...
rmfsupp 48101	A mapping of a multiplicat...
mndpsuppfi 48102	The support of a mapping o...
mndpfsupp 48103	A mapping of a scalar mult...
scmsuppfi 48104	The support of a mapping o...
scmfsupp 48105	A mapping of a scalar mult...
suppmptcfin 48106	The support of a mapping w...
mptcfsupp 48107	A mapping with value 0 exc...
fsuppmptdmf 48108	A mapping with a finite do...
lmodvsmdi 48109	Multiple distributive law ...
gsumlsscl 48110	Closure of a group sum in ...
assaascl0 48111	The scalar 0 embedded into...
assaascl1 48112	The scalar 1 embedded into...
ply1vr1smo 48113	The variable in a polynomi...
ply1sclrmsm 48114	The ring multiplication of...
coe1id 48115	Coefficient vector of the ...
coe1sclmulval 48116	The value of the coefficie...
ply1mulgsumlem1 48117	Lemma 1 for ~ ply1mulgsum ...
ply1mulgsumlem2 48118	Lemma 2 for ~ ply1mulgsum ...
ply1mulgsumlem3 48119	Lemma 3 for ~ ply1mulgsum ...
ply1mulgsumlem4 48120	Lemma 4 for ~ ply1mulgsum ...
ply1mulgsum 48121	The product of two polynom...
evl1at0 48122	Polynomial evaluation for ...
evl1at1 48123	Polynomial evaluation for ...
linply1 48124	A term of the form ` x - C...
lineval 48125	A term of the form ` x - C...
linevalexample 48126	The polynomial ` x - 3 ` o...
dmatALTval 48131	The algebra of ` N ` x ` N...
dmatALTbas 48132	The base set of the algebr...
dmatALTbasel 48133	An element of the base set...
dmatbas 48134	The set of all ` N ` x ` N...
lincop 48139	A linear combination as op...
lincval 48140	The value of a linear comb...
dflinc2 48141	Alternative definition of ...
lcoop 48142	A linear combination as op...
lcoval 48143	The value of a linear comb...
lincfsuppcl 48144	A linear combination of ve...
linccl 48145	A linear combination of ve...
lincval0 48146	The value of an empty line...
lincvalsng 48147	The linear combination ove...
lincvalsn 48148	The linear combination ove...
lincvalpr 48149	The linear combination ove...
lincval1 48150	The linear combination ove...
lcosn0 48151	Properties of a linear com...
lincvalsc0 48152	The linear combination whe...
lcoc0 48153	Properties of a linear com...
linc0scn0 48154	If a set contains the zero...
lincdifsn 48155	A vector is a linear combi...
linc1 48156	A vector is a linear combi...
lincellss 48157	A linear combination of a ...
lco0 48158	The set of empty linear co...
lcoel0 48159	The zero vector is always ...
lincsum 48160	The sum of two linear comb...
lincscm 48161	A linear combinations mult...
lincsumcl 48162	The sum of two linear comb...
lincscmcl 48163	The multiplication of a li...
lincsumscmcl 48164	The sum of a linear combin...
lincolss 48165	According to the statement...
ellcoellss 48166	Every linear combination o...
lcoss 48167	A set of vectors of a modu...
lspsslco 48168	Lemma for ~ lspeqlco . (C...
lcosslsp 48169	Lemma for ~ lspeqlco . (C...
lspeqlco 48170	Equivalence of a _span_ of...
rellininds 48174	The class defining the rel...
linindsv 48176	The classes of the module ...
islininds 48177	The property of being a li...
linindsi 48178	The implications of being ...
linindslinci 48179	The implications of being ...
islinindfis 48180	The property of being a li...
islinindfiss 48181	The property of being a li...
linindscl 48182	A linearly independent set...
lindepsnlininds 48183	A linearly dependent subse...
islindeps 48184	The property of being a li...
lincext1 48185	Property 1 of an extension...
lincext2 48186	Property 2 of an extension...
lincext3 48187	Property 3 of an extension...
lindslinindsimp1 48188	Implication 1 for ~ lindsl...
lindslinindimp2lem1 48189	Lemma 1 for ~ lindslininds...
lindslinindimp2lem2 48190	Lemma 2 for ~ lindslininds...
lindslinindimp2lem3 48191	Lemma 3 for ~ lindslininds...
lindslinindimp2lem4 48192	Lemma 4 for ~ lindslininds...
lindslinindsimp2lem5 48193	Lemma 5 for ~ lindslininds...
lindslinindsimp2 48194	Implication 2 for ~ lindsl...
lindslininds 48195	Equivalence of definitions...
linds0 48196	The empty set is always a ...
el0ldep 48197	A set containing the zero ...
el0ldepsnzr 48198	A set containing the zero ...
lindsrng01 48199	Any subset of a module is ...
lindszr 48200	Any subset of a module ove...
snlindsntorlem 48201	Lemma for ~ snlindsntor . ...
snlindsntor 48202	A singleton is linearly in...
ldepsprlem 48203	Lemma for ~ ldepspr . (Co...
ldepspr 48204	If a vector is a scalar mu...
lincresunit3lem3 48205	Lemma 3 for ~ lincresunit3...
lincresunitlem1 48206	Lemma 1 for properties of ...
lincresunitlem2 48207	Lemma for properties of a ...
lincresunit1 48208	Property 1 of a specially ...
lincresunit2 48209	Property 2 of a specially ...
lincresunit3lem1 48210	Lemma 1 for ~ lincresunit3...
lincresunit3lem2 48211	Lemma 2 for ~ lincresunit3...
lincresunit3 48212	Property 3 of a specially ...
lincreslvec3 48213	Property 3 of a specially ...
islindeps2 48214	Conditions for being a lin...
islininds2 48215	Implication of being a lin...
isldepslvec2 48216	Alternative definition of ...
lindssnlvec 48217	A singleton not containing...
lmod1lem1 48218	Lemma 1 for ~ lmod1 . (Co...
lmod1lem2 48219	Lemma 2 for ~ lmod1 . (Co...
lmod1lem3 48220	Lemma 3 for ~ lmod1 . (Co...
lmod1lem4 48221	Lemma 4 for ~ lmod1 . (Co...
lmod1lem5 48222	Lemma 5 for ~ lmod1 . (Co...
lmod1 48223	The (smallest) structure r...
lmod1zr 48224	The (smallest) structure r...
lmod1zrnlvec 48225	There is a (left) module (...
lmodn0 48226	Left modules exist. (Cont...
zlmodzxzequa 48227	Example of an equation wit...
zlmodzxznm 48228	Example of a linearly depe...
zlmodzxzldeplem 48229	A and B are not equal. (C...
zlmodzxzequap 48230	Example of an equation wit...
zlmodzxzldeplem1 48231	Lemma 1 for ~ zlmodzxzldep...
zlmodzxzldeplem2 48232	Lemma 2 for ~ zlmodzxzldep...
zlmodzxzldeplem3 48233	Lemma 3 for ~ zlmodzxzldep...
zlmodzxzldeplem4 48234	Lemma 4 for ~ zlmodzxzldep...
zlmodzxzldep 48235	{ A , B } is a linearly de...
ldepsnlinclem1 48236	Lemma 1 for ~ ldepsnlinc ....
ldepsnlinclem2 48237	Lemma 2 for ~ ldepsnlinc ....
lvecpsslmod 48238	The class of all (left) ve...
ldepsnlinc 48239	The reverse implication of...
ldepslinc 48240	For (left) vector spaces, ...
suppdm 48241	If the range of a function...
eluz2cnn0n1 48242	An integer greater than 1 ...
divge1b 48243	The ratio of a real number...
divgt1b 48244	The ratio of a real number...
ltsubaddb 48245	Equivalence for the "less ...
ltsubsubb 48246	Equivalence for the "less ...
ltsubadd2b 48247	Equivalence for the "less ...
divsub1dir 48248	Distribution of division o...
expnegico01 48249	An integer greater than 1 ...
elfzolborelfzop1 48250	An element of a half-open ...
pw2m1lepw2m1 48251	2 to the power of a positi...
zgtp1leeq 48252	If an integer is between a...
flsubz 48253	An integer can be moved in...
fldivmod 48254	Expressing the floor of a ...
mod0mul 48255	If an integer is 0 modulo ...
modn0mul 48256	If an integer is not 0 mod...
m1modmmod 48257	An integer decreased by 1 ...
difmodm1lt 48258	The difference between an ...
nn0onn0ex 48259	For each odd nonnegative i...
nn0enn0ex 48260	For each even nonnegative ...
nnennex 48261	For each even positive int...
nneop 48262	A positive integer is even...
nneom 48263	A positive integer is even...
nn0eo 48264	A nonnegative integer is e...
nnpw2even 48265	2 to the power of a positi...
zefldiv2 48266	The floor of an even integ...
zofldiv2 48267	The floor of an odd intege...
nn0ofldiv2 48268	The floor of an odd nonneg...
flnn0div2ge 48269	The floor of a positive in...
flnn0ohalf 48270	The floor of the half of a...
logcxp0 48271	Logarithm of a complex pow...
regt1loggt0 48272	The natural logarithm for ...
fdivval 48275	The quotient of two functi...
fdivmpt 48276	The quotient of two functi...
fdivmptf 48277	The quotient of two functi...
refdivmptf 48278	The quotient of two functi...
fdivpm 48279	The quotient of two functi...
refdivpm 48280	The quotient of two functi...
fdivmptfv 48281	The function value of a qu...
refdivmptfv 48282	The function value of a qu...
bigoval 48285	Set of functions of order ...
elbigofrcl 48286	Reverse closure of the "bi...
elbigo 48287	Properties of a function o...
elbigo2 48288	Properties of a function o...
elbigo2r 48289	Sufficient condition for a...
elbigof 48290	A function of order G(x) i...
elbigodm 48291	The domain of a function o...
elbigoimp 48292	The defining property of a...
elbigolo1 48293	A function (into the posit...
rege1logbrege0 48294	The general logarithm, wit...
rege1logbzge0 48295	The general logarithm, wit...
fllogbd 48296	A real number is between t...
relogbmulbexp 48297	The logarithm of the produ...
relogbdivb 48298	The logarithm of the quoti...
logbge0b 48299	The logarithm of a number ...
logblt1b 48300	The logarithm of a number ...
fldivexpfllog2 48301	The floor of a positive re...
nnlog2ge0lt1 48302	A positive integer is 1 if...
logbpw2m1 48303	The floor of the binary lo...
fllog2 48304	The floor of the binary lo...
blenval 48307	The binary length of an in...
blen0 48308	The binary length of 0. (...
blenn0 48309	The binary length of a "nu...
blenre 48310	The binary length of a pos...
blennn 48311	The binary length of a pos...
blennnelnn 48312	The binary length of a pos...
blennn0elnn 48313	The binary length of a non...
blenpw2 48314	The binary length of a pow...
blenpw2m1 48315	The binary length of a pow...
nnpw2blen 48316	A positive integer is betw...
nnpw2blenfzo 48317	A positive integer is betw...
nnpw2blenfzo2 48318	A positive integer is eith...
nnpw2pmod 48319	Every positive integer can...
blen1 48320	The binary length of 1. (...
blen2 48321	The binary length of 2. (...
nnpw2p 48322	Every positive integer can...
nnpw2pb 48323	A number is a positive int...
blen1b 48324	The binary length of a non...
blennnt2 48325	The binary length of a pos...
nnolog2flm1 48326	The floor of the binary lo...
blennn0em1 48327	The binary length of the h...
blennngt2o2 48328	The binary length of an od...
blengt1fldiv2p1 48329	The binary length of an in...
blennn0e2 48330	The binary length of an ev...
digfval 48333	Operation to obtain the ` ...
digval 48334	The ` K ` th digit of a no...
digvalnn0 48335	The ` K ` th digit of a no...
nn0digval 48336	The ` K ` th digit of a no...
dignn0fr 48337	The digits of the fraction...
dignn0ldlem 48338	Lemma for ~ dignnld . (Co...
dignnld 48339	The leading digits of a po...
dig2nn0ld 48340	The leading digits of a po...
dig2nn1st 48341	The first (relevant) digit...
dig0 48342	All digits of 0 are 0. (C...
digexp 48343	The ` K ` th digit of a po...
dig1 48344	All but one digits of 1 ar...
0dig1 48345	The ` 0 ` th digit of 1 is...
0dig2pr01 48346	The integers 0 and 1 corre...
dig2nn0 48347	A digit of a nonnegative i...
0dig2nn0e 48348	The last bit of an even in...
0dig2nn0o 48349	The last bit of an odd int...
dig2bits 48350	The ` K ` th digit of a no...
dignn0flhalflem1 48351	Lemma 1 for ~ dignn0flhalf...
dignn0flhalflem2 48352	Lemma 2 for ~ dignn0flhalf...
dignn0ehalf 48353	The digits of the half of ...
dignn0flhalf 48354	The digits of the rounded ...
nn0sumshdiglemA 48355	Lemma for ~ nn0sumshdig (i...
nn0sumshdiglemB 48356	Lemma for ~ nn0sumshdig (i...
nn0sumshdiglem1 48357	Lemma 1 for ~ nn0sumshdig ...
nn0sumshdiglem2 48358	Lemma 2 for ~ nn0sumshdig ...
nn0sumshdig 48359	A nonnegative integer can ...
nn0mulfsum 48360	Trivial algorithm to calcu...
nn0mullong 48361	Standard algorithm (also k...
naryfval 48364	The set of the n-ary (endo...
naryfvalixp 48365	The set of the n-ary (endo...
naryfvalel 48366	An n-ary (endo)function on...
naryrcl 48367	Reverse closure for n-ary ...
naryfvalelfv 48368	The value of an n-ary (end...
naryfvalelwrdf 48369	An n-ary (endo)function on...
0aryfvalel 48370	A nullary (endo)function o...
0aryfvalelfv 48371	The value of a nullary (en...
1aryfvalel 48372	A unary (endo)function on ...
fv1arycl 48373	Closure of a unary (endo)f...
1arympt1 48374	A unary (endo)function in ...
1arympt1fv 48375	The value of a unary (endo...
1arymaptfv 48376	The value of the mapping o...
1arymaptf 48377	The mapping of unary (endo...
1arymaptf1 48378	The mapping of unary (endo...
1arymaptfo 48379	The mapping of unary (endo...
1arymaptf1o 48380	The mapping of unary (endo...
1aryenef 48381	The set of unary (endo)fun...
1aryenefmnd 48382	The set of unary (endo)fun...
2aryfvalel 48383	A binary (endo)function on...
fv2arycl 48384	Closure of a binary (endo)...
2arympt 48385	A binary (endo)function in...
2arymptfv 48386	The value of a binary (end...
2arymaptfv 48387	The value of the mapping o...
2arymaptf 48388	The mapping of binary (end...
2arymaptf1 48389	The mapping of binary (end...
2arymaptfo 48390	The mapping of binary (end...
2arymaptf1o 48391	The mapping of binary (end...
2aryenef 48392	The set of binary (endo)fu...
itcoval 48397	The value of the function ...
itcoval0 48398	A function iterated zero t...
itcoval1 48399	A function iterated once. ...
itcoval2 48400	A function iterated twice....
itcoval3 48401	A function iterated three ...
itcoval0mpt 48402	A mapping iterated zero ti...
itcovalsuc 48403	The value of the function ...
itcovalsucov 48404	The value of the function ...
itcovalendof 48405	The n-th iterate of an end...
itcovalpclem1 48406	Lemma 1 for ~ itcovalpc : ...
itcovalpclem2 48407	Lemma 2 for ~ itcovalpc : ...
itcovalpc 48408	The value of the function ...
itcovalt2lem2lem1 48409	Lemma 1 for ~ itcovalt2lem...
itcovalt2lem2lem2 48410	Lemma 2 for ~ itcovalt2lem...
itcovalt2lem1 48411	Lemma 1 for ~ itcovalt2 : ...
itcovalt2lem2 48412	Lemma 2 for ~ itcovalt2 : ...
itcovalt2 48413	The value of the function ...
ackvalsuc1mpt 48414	The Ackermann function at ...
ackvalsuc1 48415	The Ackermann function at ...
ackval0 48416	The Ackermann function at ...
ackval1 48417	The Ackermann function at ...
ackval2 48418	The Ackermann function at ...
ackval3 48419	The Ackermann function at ...
ackendofnn0 48420	The Ackermann function at ...
ackfnnn0 48421	The Ackermann function at ...
ackval0val 48422	The Ackermann function at ...
ackvalsuc0val 48423	The Ackermann function at ...
ackvalsucsucval 48424	The Ackermann function at ...
ackval0012 48425	The Ackermann function at ...
ackval1012 48426	The Ackermann function at ...
ackval2012 48427	The Ackermann function at ...
ackval3012 48428	The Ackermann function at ...
ackval40 48429	The Ackermann function at ...
ackval41a 48430	The Ackermann function at ...
ackval41 48431	The Ackermann function at ...
ackval42 48432	The Ackermann function at ...
ackval42a 48433	The Ackermann function at ...
ackval50 48434	The Ackermann function at ...
fv1prop 48435	The function value of unor...
fv2prop 48436	The function value of unor...
submuladdmuld 48437	Transformation of a sum of...
affinecomb1 48438	Combination of two real af...
affinecomb2 48439	Combination of two real af...
affineid 48440	Identity of an affine comb...
1subrec1sub 48441	Subtract the reciprocal of...
resum2sqcl 48442	The sum of two squares of ...
resum2sqgt0 48443	The sum of the square of a...
resum2sqrp 48444	The sum of the square of a...
resum2sqorgt0 48445	The sum of the square of t...
reorelicc 48446	Membership in and outside ...
rrx2pxel 48447	The x-coordinate of a poin...
rrx2pyel 48448	The y-coordinate of a poin...
prelrrx2 48449	An unordered pair of order...
prelrrx2b 48450	An unordered pair of order...
rrx2pnecoorneor 48451	If two different points ` ...
rrx2pnedifcoorneor 48452	If two different points ` ...
rrx2pnedifcoorneorr 48453	If two different points ` ...
rrx2xpref1o 48454	There is a bijection betwe...
rrx2xpreen 48455	The set of points in the t...
rrx2plord 48456	The lexicographical orderi...
rrx2plord1 48457	The lexicographical orderi...
rrx2plord2 48458	The lexicographical orderi...
rrx2plordisom 48459	The set of points in the t...
rrx2plordso 48460	The lexicographical orderi...
ehl2eudisval0 48461	The Euclidean distance of ...
ehl2eudis0lt 48462	An upper bound of the Eucl...
lines 48467	The lines passing through ...
line 48468	The line passing through t...
rrxlines 48469	Definition of lines passin...
rrxline 48470	The line passing through t...
rrxlinesc 48471	Definition of lines passin...
rrxlinec 48472	The line passing through t...
eenglngeehlnmlem1 48473	Lemma 1 for ~ eenglngeehln...
eenglngeehlnmlem2 48474	Lemma 2 for ~ eenglngeehln...
eenglngeehlnm 48475	The line definition in the...
rrx2line 48476	The line passing through t...
rrx2vlinest 48477	The vertical line passing ...
rrx2linest 48478	The line passing through t...
rrx2linesl 48479	The line passing through t...
rrx2linest2 48480	The line passing through t...
elrrx2linest2 48481	The line passing through t...
spheres 48482	The spheres for given cent...
sphere 48483	A sphere with center ` X `...
rrxsphere 48484	The sphere with center ` M...
2sphere 48485	The sphere with center ` M...
2sphere0 48486	The sphere around the orig...
line2ylem 48487	Lemma for ~ line2y . This...
line2 48488	Example for a line ` G ` p...
line2xlem 48489	Lemma for ~ line2x . This...
line2x 48490	Example for a horizontal l...
line2y 48491	Example for a vertical lin...
itsclc0lem1 48492	Lemma for theorems about i...
itsclc0lem2 48493	Lemma for theorems about i...
itsclc0lem3 48494	Lemma for theorems about i...
itscnhlc0yqe 48495	Lemma for ~ itsclc0 . Qua...
itschlc0yqe 48496	Lemma for ~ itsclc0 . Qua...
itsclc0yqe 48497	Lemma for ~ itsclc0 . Qua...
itsclc0yqsollem1 48498	Lemma 1 for ~ itsclc0yqsol...
itsclc0yqsollem2 48499	Lemma 2 for ~ itsclc0yqsol...
itsclc0yqsol 48500	Lemma for ~ itsclc0 . Sol...
itscnhlc0xyqsol 48501	Lemma for ~ itsclc0 . Sol...
itschlc0xyqsol1 48502	Lemma for ~ itsclc0 . Sol...
itschlc0xyqsol 48503	Lemma for ~ itsclc0 . Sol...
itsclc0xyqsol 48504	Lemma for ~ itsclc0 . Sol...
itsclc0xyqsolr 48505	Lemma for ~ itsclc0 . Sol...
itsclc0xyqsolb 48506	Lemma for ~ itsclc0 . Sol...
itsclc0 48507	The intersection points of...
itsclc0b 48508	The intersection points of...
itsclinecirc0 48509	The intersection points of...
itsclinecirc0b 48510	The intersection points of...
itsclinecirc0in 48511	The intersection points of...
itsclquadb 48512	Quadratic equation for the...
itsclquadeu 48513	Quadratic equation for the...
2itscplem1 48514	Lemma 1 for ~ 2itscp . (C...
2itscplem2 48515	Lemma 2 for ~ 2itscp . (C...
2itscplem3 48516	Lemma D for ~ 2itscp . (C...
2itscp 48517	A condition for a quadrati...
itscnhlinecirc02plem1 48518	Lemma 1 for ~ itscnhlineci...
itscnhlinecirc02plem2 48519	Lemma 2 for ~ itscnhlineci...
itscnhlinecirc02plem3 48520	Lemma 3 for ~ itscnhlineci...
itscnhlinecirc02p 48521	Intersection of a nonhoriz...
inlinecirc02plem 48522	Lemma for ~ inlinecirc02p ...
inlinecirc02p 48523	Intersection of a line wit...
inlinecirc02preu 48524	Intersection of a line wit...
pm4.71da 48525	Deduction converting a bic...
logic1 48526	Distribution of implicatio...
logic1a 48527	Variant of ~ logic1 . (Co...
logic2 48528	Variant of ~ logic1 . (Co...
pm5.32dav 48529	Distribution of implicatio...
pm5.32dra 48530	Reverse distribution of im...
exp12bd 48531	The import-export theorem ...
mpbiran3d 48532	Equivalence with a conjunc...
mpbiran4d 48533	Equivalence with a conjunc...
dtrucor3 48534	An example of how ~ ax-5 w...
ralbidb 48535	Formula-building rule for ...
ralbidc 48536	Formula-building rule for ...
r19.41dv 48537	A complex deduction form o...
rmotru 48538	Two ways of expressing "at...
reutru 48539	Two ways of expressing "ex...
reutruALT 48540	Alternate proof for ~ reut...
ssdisjd 48541	Subset preserves disjointn...
ssdisjdr 48542	Subset preserves disjointn...
disjdifb 48543	Relative complement is ant...
predisj 48544	Preimages of disjoint sets...
vsn 48545	The singleton of the unive...
mosn 48546	"At most one" element in a...
mo0 48547	"At most one" element in a...
mosssn 48548	"At most one" element in a...
mo0sn 48549	Two ways of expressing "at...
mosssn2 48550	Two ways of expressing "at...
unilbss 48551	Superclass of the greatest...
inpw 48552	Two ways of expressing a c...
mof0 48553	There is at most one funct...
mof02 48554	A variant of ~ mof0 . (Co...
mof0ALT 48555	Alternate proof for ~ mof0...
eufsnlem 48556	There is exactly one funct...
eufsn 48557	There is exactly one funct...
eufsn2 48558	There is exactly one funct...
mofsn 48559	There is at most one funct...
mofsn2 48560	There is at most one funct...
mofsssn 48561	There is at most one funct...
mofmo 48562	There is at most one funct...
mofeu 48563	The uniqueness of a functi...
elfvne0 48564	If a function value has a ...
fdomne0 48565	A function with non-empty ...
f1sn2g 48566	A function that maps a sin...
f102g 48567	A function that maps the e...
f1mo 48568	A function that maps a set...
f002 48569	A function with an empty c...
map0cor 48570	A function exists iff an e...
fvconstr 48571	Two ways of expressing ` A...
fvconstrn0 48572	Two ways of expressing ` A...
fvconstr2 48573	Two ways of expressing ` A...
fvconst0ci 48574	A constant function's valu...
fvconstdomi 48575	A constant function's valu...
f1omo 48576	There is at most one eleme...
f1omoALT 48577	There is at most one eleme...
iccin 48578	Intersection of two closed...
iccdisj2 48579	If the upper bound of one ...
iccdisj 48580	If the upper bound of one ...
mreuniss 48581	The union of a collection ...
clduni 48582	The union of closed sets i...
opncldeqv 48583	Conditions on open sets ar...
opndisj 48584	Two ways of saying that tw...
clddisj 48585	Two ways of saying that tw...
neircl 48586	Reverse closure of the nei...
opnneilem 48587	Lemma factoring out common...
opnneir 48588	If something is true for a...
opnneirv 48589	A variant of ~ opnneir wit...
opnneilv 48590	The converse of ~ opnneir ...
opnneil 48591	A variant of ~ opnneilv . ...
opnneieqv 48592	The equivalence between ne...
opnneieqvv 48593	The equivalence between ne...
restcls2lem 48594	A closed set in a subspace...
restcls2 48595	A closed set in a subspace...
restclsseplem 48596	Lemma for ~ restclssep . ...
restclssep 48597	Two disjoint closed sets i...
cnneiima 48598	Given a continuous functio...
iooii 48599	Open intervals are open se...
icccldii 48600	Closed intervals are close...
i0oii 48601	` ( 0 [,) A ) ` is open in...
io1ii 48602	` ( A (,] 1 ) ` is open in...
sepnsepolem1 48603	Lemma for ~ sepnsepo . (C...
sepnsepolem2 48604	Open neighborhood and neig...
sepnsepo 48605	Open neighborhood and neig...
sepdisj 48606	Separated sets are disjoin...
seposep 48607	If two sets are separated ...
sepcsepo 48608	If two sets are separated ...
sepfsepc 48609	If two sets are separated ...
seppsepf 48610	If two sets are precisely ...
seppcld 48611	If two sets are precisely ...
isnrm4 48612	A topological space is nor...
dfnrm2 48613	A topological space is nor...
dfnrm3 48614	A topological space is nor...
iscnrm3lem1 48615	Lemma for ~ iscnrm3 . Sub...
iscnrm3lem2 48616	Lemma for ~ iscnrm3 provin...
iscnrm3lem3 48617	Lemma for ~ iscnrm3lem4 . ...
iscnrm3lem4 48618	Lemma for ~ iscnrm3lem5 an...
iscnrm3lem5 48619	Lemma for ~ iscnrm3l . (C...
iscnrm3lem6 48620	Lemma for ~ iscnrm3lem7 . ...
iscnrm3lem7 48621	Lemma for ~ iscnrm3rlem8 a...
iscnrm3rlem1 48622	Lemma for ~ iscnrm3rlem2 ....
iscnrm3rlem2 48623	Lemma for ~ iscnrm3rlem3 ....
iscnrm3rlem3 48624	Lemma for ~ iscnrm3r . Th...
iscnrm3rlem4 48625	Lemma for ~ iscnrm3rlem8 ....
iscnrm3rlem5 48626	Lemma for ~ iscnrm3rlem6 ....
iscnrm3rlem6 48627	Lemma for ~ iscnrm3rlem7 ....
iscnrm3rlem7 48628	Lemma for ~ iscnrm3rlem8 ....
iscnrm3rlem8 48629	Lemma for ~ iscnrm3r . Di...
iscnrm3r 48630	Lemma for ~ iscnrm3 . If ...
iscnrm3llem1 48631	Lemma for ~ iscnrm3l . Cl...
iscnrm3llem2 48632	Lemma for ~ iscnrm3l . If...
iscnrm3l 48633	Lemma for ~ iscnrm3 . Giv...
iscnrm3 48634	A completely normal topolo...
iscnrm3v 48635	A topology is completely n...
iscnrm4 48636	A completely normal topolo...
isprsd 48637	Property of being a preord...
lubeldm2 48638	Member of the domain of th...
glbeldm2 48639	Member of the domain of th...
lubeldm2d 48640	Member of the domain of th...
glbeldm2d 48641	Member of the domain of th...
lubsscl 48642	If a subset of ` S ` conta...
glbsscl 48643	If a subset of ` S ` conta...
lubprlem 48644	Lemma for ~ lubprdm and ~ ...
lubprdm 48645	The set of two comparable ...
lubpr 48646	The LUB of the set of two ...
glbprlem 48647	Lemma for ~ glbprdm and ~ ...
glbprdm 48648	The set of two comparable ...
glbpr 48649	The GLB of the set of two ...
joindm2 48650	The join of any two elemen...
joindm3 48651	The join of any two elemen...
meetdm2 48652	The meet of any two elemen...
meetdm3 48653	The meet of any two elemen...
posjidm 48654	Poset join is idempotent. ...
posmidm 48655	Poset meet is idempotent. ...
toslat 48656	A toset is a lattice. (Co...
isclatd 48657	The predicate "is a comple...
intubeu 48658	Existential uniqueness of ...
unilbeu 48659	Existential uniqueness of ...
ipolublem 48660	Lemma for ~ ipolubdm and ~...
ipolubdm 48661	The domain of the LUB of t...
ipolub 48662	The LUB of the inclusion p...
ipoglblem 48663	Lemma for ~ ipoglbdm and ~...
ipoglbdm 48664	The domain of the GLB of t...
ipoglb 48665	The GLB of the inclusion p...
ipolub0 48666	The LUB of the empty set i...
ipolub00 48667	The LUB of the empty set i...
ipoglb0 48668	The GLB of the empty set i...
mrelatlubALT 48669	Least upper bounds in a Mo...
mrelatglbALT 48670	Greatest lower bounds in a...
mreclat 48671	A Moore space is a complet...
topclat 48672	A topology is a complete l...
toplatglb0 48673	The empty intersection in ...
toplatlub 48674	Least upper bounds in a to...
toplatglb 48675	Greatest lower bounds in a...
toplatjoin 48676	Joins in a topology are re...
toplatmeet 48677	Meets in a topology are re...
topdlat 48678	A topology is a distributi...
elmgpcntrd 48679	The center of a ring. (Co...
asclelbas 48680	Lifted scalars are in the ...
asclcntr 48681	The algebra scalars functi...
asclcom 48682	Scalars are commutative af...
catprslem 48683	Lemma for ~ catprs . (Con...
catprs 48684	A preorder can be extracte...
catprs2 48685	A category equipped with t...
catprsc 48686	A construction of the preo...
catprsc2 48687	An alternate construction ...
endmndlem 48688	A diagonal hom-set in a ca...
idmon 48689	An identity arrow, or an i...
idepi 48690	An identity arrow, or an i...
funcf2lem 48691	A utility theorem for prov...
isthinc 48694	The predicate "is a thin c...
isthinc2 48695	A thin category is a categ...
isthinc3 48696	A thin category is a categ...
thincc 48697	A thin category is a categ...
thinccd 48698	A thin category is a categ...
thincssc 48699	A thin category is a categ...
isthincd2lem1 48700	Lemma for ~ isthincd2 and ...
thincmo2 48701	Morphisms in the same hom-...
thincmo 48702	There is at most one morph...
thincmoALT 48703	Alternate proof for ~ thin...
thincmod 48704	At most one morphism in ea...
thincn0eu 48705	In a thin category, a hom-...
thincid 48706	In a thin category, a morp...
thincmon 48707	In a thin category, all mo...
thincepi 48708	In a thin category, all mo...
isthincd2lem2 48709	Lemma for ~ isthincd2 . (...
isthincd 48710	The predicate "is a thin c...
isthincd2 48711	The predicate " ` C ` is a...
oppcthin 48712	The opposite category of a...
subthinc 48713	A subcategory of a thin ca...
functhinclem1 48714	Lemma for ~ functhinc . G...
functhinclem2 48715	Lemma for ~ functhinc . (...
functhinclem3 48716	Lemma for ~ functhinc . T...
functhinclem4 48717	Lemma for ~ functhinc . O...
functhinc 48718	A functor to a thin catego...
fullthinc 48719	A functor to a thin catego...
fullthinc2 48720	A full functor to a thin c...
thincfth 48721	A functor from a thin cate...
thincciso 48722	Two thin categories are is...
0thincg 48723	Any structure with an empt...
0thinc 48724	The empty category (see ~ ...
indthinc 48725	An indiscrete category in ...
indthincALT 48726	An alternate proof for ~ i...
prsthinc 48727	Preordered sets as categor...
setcthin 48728	A category of sets all of ...
setc2othin 48729	The category ` ( SetCat ``...
thincsect 48730	In a thin category, one mo...
thincsect2 48731	In a thin category, ` F ` ...
thincinv 48732	In a thin category, ` F ` ...
thinciso 48733	In a thin category, ` F : ...
thinccic 48734	In a thin category, two ob...
prstcval 48737	Lemma for ~ prstcnidlem an...
prstcnidlem 48738	Lemma for ~ prstcnid and ~...
prstcnid 48739	Components other than ` Ho...
prstcbas 48740	The base set is unchanged....
prstcleval 48741	Value of the less-than-or-...
prstclevalOLD 48742	Obsolete proof of ~ prstcl...
prstcle 48743	Value of the less-than-or-...
prstcocval 48744	Orthocomplementation is un...
prstcocvalOLD 48745	Obsolete proof of ~ prstco...
prstcoc 48746	Orthocomplementation is un...
prstchomval 48747	Hom-sets of the constructe...
prstcprs 48748	The category is a preorder...
prstcthin 48749	The preordered set is equi...
prstchom 48750	Hom-sets of the constructe...
prstchom2 48751	Hom-sets of the constructe...
prstchom2ALT 48752	Hom-sets of the constructe...
postcpos 48753	The converted category is ...
postcposALT 48754	Alternate proof for ~ post...
postc 48755	The converted category is ...
mndtcval 48758	Value of the category buil...
mndtcbasval 48759	The base set of the catego...
mndtcbas 48760	The category built from a ...
mndtcob 48761	Lemma for ~ mndtchom and ~...
mndtcbas2 48762	Two objects in a category ...
mndtchom 48763	The only hom-set of the ca...
mndtcco 48764	The composition of the cat...
mndtcco2 48765	The composition of the cat...
mndtccatid 48766	Lemma for ~ mndtccat and ~...
mndtccat 48767	The function value is a ca...
mndtcid 48768	The identity morphism, or ...
grptcmon 48769	All morphisms in a categor...
grptcepi 48770	All morphisms in a categor...
nfintd 48771	Bound-variable hypothesis ...
nfiund 48772	Bound-variable hypothesis ...
nfiundg 48773	Bound-variable hypothesis ...
iunord 48774	The indexed union of a col...
iunordi 48775	The indexed union of a col...
spd 48776	Specialization deduction, ...
spcdvw 48777	A version of ~ spcdv where...
tfis2d 48778	Transfinite Induction Sche...
bnd2d 48779	Deduction form of ~ bnd2 ....
dffun3f 48780	Alternate definition of fu...
setrecseq 48783	Equality theorem for set r...
nfsetrecs 48784	Bound-variable hypothesis ...
setrec1lem1 48785	Lemma for ~ setrec1 . Thi...
setrec1lem2 48786	Lemma for ~ setrec1 . If ...
setrec1lem3 48787	Lemma for ~ setrec1 . If ...
setrec1lem4 48788	Lemma for ~ setrec1 . If ...
setrec1 48789	This is the first of two f...
setrec2fun 48790	This is the second of two ...
setrec2lem1 48791	Lemma for ~ setrec2 . The...
setrec2lem2 48792	Lemma for ~ setrec2 . The...
setrec2 48793	This is the second of two ...
setrec2v 48794	Version of ~ setrec2 with ...
setrec2mpt 48795	Version of ~ setrec2 where...
setis 48796	Version of ~ setrec2 expre...
elsetrecslem 48797	Lemma for ~ elsetrecs . A...
elsetrecs 48798	A set ` A ` is an element ...
setrecsss 48799	The ` setrecs ` operator r...
setrecsres 48800	A recursively generated cl...
vsetrec 48801	Construct ` _V ` using set...
0setrec 48802	If a function sends the em...
onsetreclem1 48803	Lemma for ~ onsetrec . (C...
onsetreclem2 48804	Lemma for ~ onsetrec . (C...
onsetreclem3 48805	Lemma for ~ onsetrec . (C...
onsetrec 48806	Construct ` On ` using set...
elpglem1 48809	Lemma for ~ elpg . (Contr...
elpglem2 48810	Lemma for ~ elpg . (Contr...
elpglem3 48811	Lemma for ~ elpg . (Contr...
elpg 48812	Membership in the class of...
pgindlem 48813	Lemma for ~ pgind . (Cont...
pgindnf 48814	Version of ~ pgind with ex...
pgind 48815	Induction on partizan game...
sbidd 48816	An identity theorem for su...
sbidd-misc 48817	An identity theorem for su...
gte-lte 48822	Simple relationship betwee...
gt-lt 48823	Simple relationship betwee...
gte-lteh 48824	Relationship between ` <_ ...
gt-lth 48825	Relationship between ` < `...
ex-gt 48826	Simple example of ` > ` , ...
ex-gte 48827	Simple example of ` >_ ` ,...
sinhval-named 48834	Value of the named sinh fu...
coshval-named 48835	Value of the named cosh fu...
tanhval-named 48836	Value of the named tanh fu...
sinh-conventional 48837	Conventional definition of...
sinhpcosh 48838	Prove that ` ( sinh `` A )...
secval 48845	Value of the secant functi...
cscval 48846	Value of the cosecant func...
cotval 48847	Value of the cotangent fun...
seccl 48848	The closure of the secant ...
csccl 48849	The closure of the cosecan...
cotcl 48850	The closure of the cotange...
reseccl 48851	The closure of the secant ...
recsccl 48852	The closure of the cosecan...
recotcl 48853	The closure of the cotange...
recsec 48854	The reciprocal of secant i...
reccsc 48855	The reciprocal of cosecant...
reccot 48856	The reciprocal of cotangen...
rectan 48857	The reciprocal of tangent ...
sec0 48858	The value of the secant fu...
onetansqsecsq 48859	Prove the tangent squared ...
cotsqcscsq 48860	Prove the tangent squared ...
ifnmfalse 48861	If A is not a member of B,...
logb2aval 48862	Define the value of the ` ...
comraddi 48869	Commute RHS addition. See...
mvlraddi 48870	Move the right term in a s...
mvrladdi 48871	Move the left term in a su...
assraddsubi 48872	Associate RHS addition-sub...
joinlmuladdmuli 48873	Join AB+CB into (A+C) on L...
joinlmulsubmuld 48874	Join AB-CB into (A-C) on L...
joinlmulsubmuli 48875	Join AB-CB into (A-C) on L...
mvlrmuld 48876	Move the right term in a p...
mvlrmuli 48877	Move the right term in a p...
i2linesi 48878	Solve for the intersection...
i2linesd 48879	Solve for the intersection...
alimp-surprise 48880	Demonstrate that when usin...
alimp-no-surprise 48881	There is no "surprise" in ...
empty-surprise 48882	Demonstrate that when usin...
empty-surprise2 48883	"Prove" that false is true...
eximp-surprise 48884	Show what implication insi...
eximp-surprise2 48885	Show that "there exists" w...
alsconv 48890	There is an equivalence be...
alsi1d 48891	Deduction rule: Given "al...
alsi2d 48892	Deduction rule: Given "al...
alsc1d 48893	Deduction rule: Given "al...
alsc2d 48894	Deduction rule: Given "al...
alscn0d 48895	Deduction rule: Given "al...
alsi-no-surprise 48896	Demonstrate that there is ...
5m4e1 48897	Prove that 5 - 4 = 1. (Co...
2p2ne5 48898	Prove that ` 2 + 2 =/= 5 `...
resolution 48899	Resolution rule. This is ...
testable 48900	In classical logic all wff...
aacllem 48901	Lemma for other theorems a...
amgmwlem 48902	Weighted version of ~ amgm...
amgmlemALT 48903	Alternate proof of ~ amgml...
amgmw2d 48904	Weighted arithmetic-geomet...
young2d 48905	Young's inequality for ` n...