Bibliographic Cross-Reference - Metamath Proof Explorer

Bibliographic Cross-References   This table collects in one place the bibliographic references made in the Metamath Proof Explorer's axiom, definition, and theorem Descriptions. If you are studying a particular set theory book, this list can be handy for finding out where any corresponding Metamath theorems might be located. Keep in mind that we usually give only one reference for a theorem that may appear in several books, so it can also be useful to browse the Related Theorems around a theorem of interest.

Bibliographic Cross-Reference for the Metamath Proof Explorer

Bibliographic Reference	Description	Metamath Proof Explorer Page(s)
[Adamek] p. 21	Definition 3.1	df-cat 17609
[Adamek] p. 21	Condition 3.1(b)	df-cat 17609
[Adamek] p. 22	Example 3.3(1)	df-setc 18018
[Adamek] p. 24	Example 3.3(4.c)	0cat 17630  0funcg 49067  df-termc 49455
[Adamek] p. 24	Example 3.3(4.d)	df-prstc 49532  prsthinc 49446
[Adamek] p. 24	Example 3.3(4.e)	df-mndtc 49560  df-mndtc 49560
[Adamek] p. 24	Example 3.3(4)(c)	discsnterm 49556
[Adamek] p. 25	Definition 3.5	df-oppc 17653
[Adamek] p. 25	Example 3.6(1)	oduoppcciso 49548
[Adamek] p. 25	Example 3.6(2)	oppgoppcco 49573  oppgoppchom 49572  oppgoppcid 49574
[Adamek] p. 28	Remark 3.9	oppciso 17723
[Adamek] p. 28	Remark 3.12	invf1o 17711  invisoinvl 17732
[Adamek] p. 28	Example 3.13	idinv 17731  idiso 17730
[Adamek] p. 28	Corollary 3.11	inveq 17716
[Adamek] p. 28	Definition 3.8	df-inv 17690  df-iso 17691  dfiso2 17714
[Adamek] p. 28	Proposition 3.10	sectcan 17697
[Adamek] p. 29	Remark 3.16	cicer 17748  cicerALT 49028
[Adamek] p. 29	Definition 3.15	cic 17741  df-cic 17738
[Adamek] p. 29	Definition 3.17	df-func 17800
[Adamek] p. 29	Proposition 3.14(1)	invinv 17712
[Adamek] p. 29	Proposition 3.14(2)	invco 17713  isoco 17719
[Adamek] p. 30	Remark 3.19	df-func 17800
[Adamek] p. 30	Example 3.20(1)	idfucl 17823
[Adamek] p. 30	Example 3.20(2)	diag1 49286
[Adamek] p. 32	Proposition 3.21	funciso 17816
[Adamek] p. 33	Example 3.26(1)	discsnterm 49556  discthing 49443
[Adamek] p. 33	Example 3.26(2)	df-thinc 49400  prsthinc 49446  thincciso 49435  thincciso2 49437  thincciso3 49438  thinccisod 49436
[Adamek] p. 33	Example 3.26(3)	df-mndtc 49560
[Adamek] p. 33	Proposition 3.23	cofucl 17830  cofucla 49078
[Adamek] p. 34	Remark 3.28(1)	cofidfth 49144
[Adamek] p. 34	Remark 3.28(2)	catciso 18053  catcisoi 49382
[Adamek] p. 34	Remark 3.28 (1)	embedsetcestrc 18108
[Adamek] p. 34	Definition 3.27(2)	df-fth 17849
[Adamek] p. 34	Definition 3.27(3)	df-full 17848
[Adamek] p. 34	Definition 3.27 (1)	embedsetcestrc 18108
[Adamek] p. 35	Corollary 3.32	ffthiso 17873
[Adamek] p. 35	Proposition 3.30(c)	cofth 17879
[Adamek] p. 35	Proposition 3.30(d)	cofull 17878
[Adamek] p. 36	Definition 3.33 (1)	equivestrcsetc 18093
[Adamek] p. 36	Definition 3.33 (2)	equivestrcsetc 18093
[Adamek] p. 39	Remark 3.42	2oppf 49114
[Adamek] p. 39	Definition 3.41	df-oppf 49105  funcoppc 17817
[Adamek] p. 39	Definition 3.44.	df-catc 18041  elcatchom 49379
[Adamek] p. 39	Proposition 3.43(c)	fthoppc 17867  fthoppf 49146
[Adamek] p. 39	Proposition 3.43(d)	fulloppc 17866  fulloppf 49145
[Adamek] p. 40	Remark 3.48	catccat 18050
[Adamek] p. 40	Definition 3.47	0funcg 49067  df-catc 18041
[Adamek] p. 45	Exercise 3G	incat 49583
[Adamek] p. 48	Remark 4.2(2)	cnelsubc 49586  nelsubc3 49053
[Adamek] p. 48	Remark 4.2(3)	imasubc 49133  imasubc2 49134  imasubc3 49138
[Adamek] p. 48	Example 4.3(1.a)	0subcat 17780
[Adamek] p. 48	Example 4.3(1.b)	catsubcat 17781
[Adamek] p. 48	Definition 4.1(1)	nelsubc3 49053
[Adamek] p. 48	Definition 4.1(2)	fullsubc 17792
[Adamek] p. 48	Definition 4.1(a)	df-subc 17754
[Adamek] p. 49	Remark 4.4	idsubc 49142
[Adamek] p. 49	Remark 4.4(1)	idemb 49141
[Adamek] p. 49	Remark 4.4(2)	idfullsubc 49143  ressffth 17882
[Adamek] p. 58	Exercise 4A	setc1onsubc 49584
[Adamek] p. 83	Definition 6.1	df-nat 17888
[Adamek] p. 87	Remark 6.14(a)	fuccocl 17909
[Adamek] p. 87	Remark 6.14(b)	fucass 17913
[Adamek] p. 87	Definition 6.15	df-fuc 17889
[Adamek] p. 88	Remark 6.16	fuccat 17915
[Adamek] p. 101	Definition 7.1	0funcg 49067  df-inito 17926
[Adamek] p. 101	Example 7.2(3)	0funcg 49067  df-termc 49455  initc 49073
[Adamek] p. 101	Example 7.2 (6)	irinitoringc 21421
[Adamek] p. 102	Definition 7.4	df-termo 17927  oppctermo 49218
[Adamek] p. 102	Proposition 7.3 (1)	initoeu1w 17954
[Adamek] p. 102	Proposition 7.3 (2)	initoeu2 17958
[Adamek] p. 103	Remark 7.8	oppczeroo 49219
[Adamek] p. 103	Definition 7.7	df-zeroo 17928
[Adamek] p. 103	Example 7.9 (3)	nzerooringczr 21422
[Adamek] p. 103	Proposition 7.6	termoeu1w 17961
[Adamek] p. 106	Definition 7.19	df-sect 17689
[Adamek] p. 107	Example 7.20(7)	thincinv 49451
[Adamek] p. 108	Example 7.25(4)	thincsect2 49450
[Adamek] p. 110	Example 7.33(9)	thincmon 49415
[Adamek] p. 110	Proposition 7.35	sectmon 17724
[Adamek] p. 112	Proposition 7.42	sectepi 17726
[Adamek] p. 185	Section 10.67	updjud 9863
[Adamek] p. 193	Definition 11.1(1)	df-lmd 49627
[Adamek] p. 193	Definition 11.3(1)	df-lmd 49627
[Adamek] p. 194	Definition 11.3(2)	df-lmd 49627
[Adamek] p. 202	Definition 11.27(1)	df-cmd 49628
[Adamek] p. 202	Definition 11.27(2)	df-cmd 49628
[Adamek] p. 478	Item Rng	df-ringc 20566
[AhoHopUll] p. 2	Section 1.1	df-bigo 48530
[AhoHopUll] p. 12	Section 1.3	df-blen 48552
[AhoHopUll] p. 318	Section 9.1	df-concat 14512  df-pfx 14612  df-substr 14582  df-word 14455  lencl 14474  wrd0 14480
[AkhiezerGlazman] p. 39	Linear operator norm	df-nmo 24629  df-nmoo 30724
[AkhiezerGlazman] p. 64	Theorem	hmopidmch 32132  hmopidmchi 32130
[AkhiezerGlazman] p. 65	Theorem 1	pjcmul1i 32180  pjcmul2i 32181
[AkhiezerGlazman] p. 72	Theorem	cnvunop 31897  unoplin 31899
[AkhiezerGlazman] p. 72	Equation 2	unopadj 31898  unopadj2 31917
[AkhiezerGlazman] p. 73	Theorem	elunop2 31992  lnopunii 31991
[AkhiezerGlazman] p. 80	Proposition 1	adjlnop 32065
[Alling] p. 125	Theorem 4.02(12)	cofcutrtime 27875
[Alling] p. 184	Axiom B	bdayfo 27622
[Alling] p. 184	Axiom O	sltso 27621
[Alling] p. 184	Axiom SD	nodense 27637
[Alling] p. 185	Lemma 0	nocvxmin 27724
[Alling] p. 185	Theorem	conway 27745
[Alling] p. 185	Axiom FE	noeta 27688
[Alling] p. 186	Theorem 4	slerec 27765  slerecd 27766
[Alling], p. 2	Definition	rp-brsslt 43405
[Alling], p. 3	Note	nla0001 43408  nla0002 43406  nla0003 43407
[Apostol] p. 18	Theorem I.1	addcan 11334  addcan2d 11354  addcan2i 11344  addcand 11353  addcani 11343
[Apostol] p. 18	Theorem I.2	negeu 11387
[Apostol] p. 18	Theorem I.3	negsub 11446  negsubd 11515  negsubi 11476
[Apostol] p. 18	Theorem I.4	negneg 11448  negnegd 11500  negnegi 11468
[Apostol] p. 18	Theorem I.5	subdi 11587  subdid 11610  subdii 11603  subdir 11588  subdird 11611  subdiri 11604
[Apostol] p. 18	Theorem I.6	mul01 11329  mul01d 11349  mul01i 11340  mul02 11328  mul02d 11348  mul02i 11339
[Apostol] p. 18	Theorem I.7	mulcan 11791  mulcan2d 11788  mulcand 11787  mulcani 11793
[Apostol] p. 18	Theorem I.8	receu 11799  xreceu 32892
[Apostol] p. 18	Theorem I.9	divrec 11829  divrecd 11937  divreci 11903  divreczi 11896
[Apostol] p. 18	Theorem I.10	recrec 11855  recreci 11890
[Apostol] p. 18	Theorem I.11	mul0or 11794  mul0ord 11802  mul0ori 11801
[Apostol] p. 18	Theorem I.12	mul2neg 11593  mul2negd 11609  mul2negi 11602  mulneg1 11590  mulneg1d 11607  mulneg1i 11600
[Apostol] p. 18	Theorem I.13	divadddiv 11873  divadddivd 11978  divadddivi 11920
[Apostol] p. 18	Theorem I.14	divmuldiv 11858  divmuldivd 11975  divmuldivi 11918  rdivmuldivd 20333
[Apostol] p. 18	Theorem I.15	divdivdiv 11859  divdivdivd 11981  divdivdivi 11921
[Apostol] p. 20	Axiom 7	rpaddcl 12951  rpaddcld 12986  rpmulcl 12952  rpmulcld 12987
[Apostol] p. 20	Axiom 8	rpneg 12961
[Apostol] p. 20	Axiom 9	0nrp 12964
[Apostol] p. 20	Theorem I.17	lttri 11276
[Apostol] p. 20	Theorem I.18	ltadd1d 11747  ltadd1dd 11765  ltadd1i 11708
[Apostol] p. 20	Theorem I.19	ltmul1 12008  ltmul1a 12007  ltmul1i 12077  ltmul1ii 12087  ltmul2 12009  ltmul2d 13013  ltmul2dd 13027  ltmul2i 12080
[Apostol] p. 20	Theorem I.20	msqgt0 11674  msqgt0d 11721  msqgt0i 11691
[Apostol] p. 20	Theorem I.21	0lt1 11676
[Apostol] p. 20	Theorem I.23	lt0neg1 11660  lt0neg1d 11723  ltneg 11654  ltnegd 11732  ltnegi 11698
[Apostol] p. 20	Theorem I.25	lt2add 11639  lt2addd 11777  lt2addi 11716
[Apostol] p. 20	Definition of positive numbers	df-rp 12928
[Apostol] p. 21	Exercise 4	recgt0 12004  recgt0d 12093  recgt0i 12064  recgt0ii 12065
[Apostol] p. 22	Definition of integers	df-z 12506
[Apostol] p. 22	Definition of positive integers	dfnn3 12176
[Apostol] p. 22	Definition of rationals	df-q 12884
[Apostol] p. 24	Theorem I.26	supeu 9381
[Apostol] p. 26	Theorem I.28	nnunb 12414
[Apostol] p. 26	Theorem I.29	arch 12415  archd 45149
[Apostol] p. 28	Exercise 2	btwnz 12613
[Apostol] p. 28	Exercise 3	nnrecl 12416
[Apostol] p. 28	Exercise 4	rebtwnz 12882
[Apostol] p. 28	Exercise 5	zbtwnre 12881
[Apostol] p. 28	Exercise 6	qbtwnre 13135
[Apostol] p. 28	Exercise 10(a)	zeneo 16285  zneo 12593  zneoALTV 47663
[Apostol] p. 29	Theorem I.35	cxpsqrtth 26672  msqsqrtd 15385  resqrtth 15197  sqrtth 15307  sqrtthi 15313  sqsqrtd 15384
[Apostol] p. 34	Theorem I.36 (principle of mathematical induction)	peano5nni 12165
[Apostol] p. 34	Theorem I.37 (well-ordering principle)	nnwo 12848
[Apostol] p. 361	Remark	crreczi 14169
[Apostol] p. 363	Remark	absgt0i 15342
[Apostol] p. 363	Example	abssubd 15398  abssubi 15346
[ApostolNT] p. 7	Remark	fmtno0 47534  fmtno1 47535  fmtno2 47544  fmtno3 47545  fmtno4 47546  fmtno5fac 47576  fmtnofz04prm 47571
[ApostolNT] p. 7	Definition	df-fmtno 47522
[ApostolNT] p. 8	Definition	df-ppi 27043
[ApostolNT] p. 14	Definition	df-dvds 16199
[ApostolNT] p. 14	Theorem 1.1(a)	iddvds 16215
[ApostolNT] p. 14	Theorem 1.1(b)	dvdstr 16240
[ApostolNT] p. 14	Theorem 1.1(c)	dvds2ln 16235
[ApostolNT] p. 14	Theorem 1.1(d)	dvdscmul 16228
[ApostolNT] p. 14	Theorem 1.1(e)	dvdscmulr 16230
[ApostolNT] p. 14	Theorem 1.1(f)	1dvds 16216
[ApostolNT] p. 14	Theorem 1.1(g)	dvds0 16217
[ApostolNT] p. 14	Theorem 1.1(h)	0dvds 16222
[ApostolNT] p. 14	Theorem 1.1(i)	dvdsleabs 16257
[ApostolNT] p. 14	Theorem 1.1(j)	dvdsabseq 16259
[ApostolNT] p. 14	Theorem 1.1(k)	divconjdvds 16261
[ApostolNT] p. 15	Definition	df-gcd 16441  dfgcd2 16492
[ApostolNT] p. 16	Definition	isprm2 16628
[ApostolNT] p. 16	Theorem 1.5	coprmdvds 16599
[ApostolNT] p. 16	Theorem 1.7	prminf 16862
[ApostolNT] p. 16	Theorem 1.4(a)	gcdcom 16459
[ApostolNT] p. 16	Theorem 1.4(b)	gcdass 16493
[ApostolNT] p. 16	Theorem 1.4(c)	absmulgcd 16495
[ApostolNT] p. 16	Theorem 1.4(d)1	gcd1 16474
[ApostolNT] p. 16	Theorem 1.4(d)2	gcdid0 16466
[ApostolNT] p. 17	Theorem 1.8	coprm 16657
[ApostolNT] p. 17	Theorem 1.9	euclemma 16659
[ApostolNT] p. 17	Theorem 1.10	1arith2 16875
[ApostolNT] p. 18	Theorem 1.13	prmrec 16869
[ApostolNT] p. 19	Theorem 1.14	divalg 16349
[ApostolNT] p. 20	Theorem 1.15	eucalg 16533
[ApostolNT] p. 24	Definition	df-mu 27044
[ApostolNT] p. 25	Definition	df-phi 16712
[ApostolNT] p. 25	Theorem 2.1	musum 27134
[ApostolNT] p. 26	Theorem 2.2	phisum 16737
[ApostolNT] p. 28	Theorem 2.5(a)	phiprmpw 16722
[ApostolNT] p. 28	Theorem 2.5(c)	phimul 16726
[ApostolNT] p. 32	Definition	df-vma 27041
[ApostolNT] p. 32	Theorem 2.9	muinv 27136
[ApostolNT] p. 32	Theorem 2.10	vmasum 27160
[ApostolNT] p. 38	Remark	df-sgm 27045
[ApostolNT] p. 38	Definition	df-sgm 27045
[ApostolNT] p. 75	Definition	df-chp 27042  df-cht 27040
[ApostolNT] p. 104	Definition	congr 16610
[ApostolNT] p. 106	Remark	dvdsval3 16202
[ApostolNT] p. 106	Definition	moddvds 16209
[ApostolNT] p. 107	Example 2	mod2eq0even 16292
[ApostolNT] p. 107	Example 3	mod2eq1n2dvds 16293
[ApostolNT] p. 107	Example 4	zmod1congr 13826
[ApostolNT] p. 107	Theorem 5.2(b)	modmul12d 13866
[ApostolNT] p. 107	Theorem 5.2(c)	modexp 14179
[ApostolNT] p. 108	Theorem 5.3	modmulconst 16234
[ApostolNT] p. 109	Theorem 5.4	cncongr1 16613
[ApostolNT] p. 109	Theorem 5.6	gcdmodi 17021
[ApostolNT] p. 109	Theorem 5.4 "Cancellation law"	cncongr 16615
[ApostolNT] p. 113	Theorem 5.17	eulerth 16729
[ApostolNT] p. 113	Theorem 5.18	vfermltl 16748
[ApostolNT] p. 114	Theorem 5.19	fermltl 16730
[ApostolNT] p. 116	Theorem 5.24	wilthimp 27015
[ApostolNT] p. 179	Definition	df-lgs 27239  lgsprme0 27283
[ApostolNT] p. 180	Example 1	1lgs 27284
[ApostolNT] p. 180	Theorem 9.2	lgsvalmod 27260
[ApostolNT] p. 180	Theorem 9.3	lgsdirprm 27275
[ApostolNT] p. 181	Theorem 9.4	m1lgs 27332
[ApostolNT] p. 181	Theorem 9.5	2lgs 27351  2lgsoddprm 27360
[ApostolNT] p. 182	Theorem 9.6	gausslemma2d 27318
[ApostolNT] p. 185	Theorem 9.8	lgsquad 27327
[ApostolNT] p. 188	Definition	df-lgs 27239  lgs1 27285
[ApostolNT] p. 188	Theorem 9.9(a)	lgsdir 27276
[ApostolNT] p. 188	Theorem 9.9(b)	lgsdi 27278
[ApostolNT] p. 188	Theorem 9.9(c)	lgsmodeq 27286
[ApostolNT] p. 188	Theorem 9.9(d)	lgsmulsqcoprm 27287
[Baer] p. 40	Property (b)	mapdord 41625
[Baer] p. 40	Property (c)	mapd11 41626
[Baer] p. 40	Property (e)	mapdin 41649  mapdlsm 41651
[Baer] p. 40	Property (f)	mapd0 41652
[Baer] p. 40	Definition of projectivity	df-mapd 41612  mapd1o 41635
[Baer] p. 41	Property (g)	mapdat 41654
[Baer] p. 44	Part (1)	mapdpg 41693
[Baer] p. 45	Part (2)	hdmap1eq 41788  mapdheq 41715  mapdheq2 41716  mapdheq2biN 41717
[Baer] p. 45	Part (3)	baerlem3 41700
[Baer] p. 46	Part (4)	mapdheq4 41719  mapdheq4lem 41718
[Baer] p. 46	Part (5)	baerlem5a 41701  baerlem5abmN 41705  baerlem5amN 41703  baerlem5b 41702  baerlem5bmN 41704
[Baer] p. 47	Part (6)	hdmap1l6 41808  hdmap1l6a 41796  hdmap1l6e 41801  hdmap1l6f 41802  hdmap1l6g 41803  hdmap1l6lem1 41794  hdmap1l6lem2 41795  mapdh6N 41734  mapdh6aN 41722  mapdh6eN 41727  mapdh6fN 41728  mapdh6gN 41729  mapdh6lem1N 41720  mapdh6lem2N 41721
[Baer] p. 48	Part 9	hdmapval 41815
[Baer] p. 48	Part 10	hdmap10 41827
[Baer] p. 48	Part 11	hdmapadd 41830
[Baer] p. 48	Part (6)	hdmap1l6h 41804  mapdh6hN 41730
[Baer] p. 48	Part (7)	mapdh75cN 41740  mapdh75d 41741  mapdh75e 41739  mapdh75fN 41742  mapdh7cN 41736  mapdh7dN 41737  mapdh7eN 41735  mapdh7fN 41738
[Baer] p. 48	Part (8)	mapdh8 41775  mapdh8a 41762  mapdh8aa 41763  mapdh8ab 41764  mapdh8ac 41765  mapdh8ad 41766  mapdh8b 41767  mapdh8c 41768  mapdh8d 41770  mapdh8d0N 41769  mapdh8e 41771  mapdh8g 41772  mapdh8i 41773  mapdh8j 41774
[Baer] p. 48	Part (9)	mapdh9a 41776
[Baer] p. 48	Equation 10	mapdhvmap 41756
[Baer] p. 49	Part 12	hdmap11 41835  hdmapeq0 41831  hdmapf1oN 41852  hdmapneg 41833  hdmaprnN 41851  hdmaprnlem1N 41836  hdmaprnlem3N 41837  hdmaprnlem3uN 41838  hdmaprnlem4N 41840  hdmaprnlem6N 41841  hdmaprnlem7N 41842  hdmaprnlem8N 41843  hdmaprnlem9N 41844  hdmapsub 41834
[Baer] p. 49	Part 14	hdmap14lem1 41855  hdmap14lem10 41864  hdmap14lem1a 41853  hdmap14lem2N 41856  hdmap14lem2a 41854  hdmap14lem3 41857  hdmap14lem8 41862  hdmap14lem9 41863
[Baer] p. 50	Part 14	hdmap14lem11 41865  hdmap14lem12 41866  hdmap14lem13 41867  hdmap14lem14 41868  hdmap14lem15 41869  hgmapval 41874
[Baer] p. 50	Part 15	hgmapadd 41881  hgmapmul 41882  hgmaprnlem2N 41884  hgmapvs 41878
[Baer] p. 50	Part 16	hgmaprnN 41888
[Baer] p. 110	Lemma 1	hdmapip0com 41904
[Baer] p. 110	Line 27	hdmapinvlem1 41905
[Baer] p. 110	Line 28	hdmapinvlem2 41906
[Baer] p. 110	Line 30	hdmapinvlem3 41907
[Baer] p. 110	Part 1.2	hdmapglem5 41909  hgmapvv 41913
[Baer] p. 110	Proposition 1	hdmapinvlem4 41908
[Baer] p. 111	Line 10	hgmapvvlem1 41910
[Baer] p. 111	Line 15	hdmapg 41917  hdmapglem7 41916
[Bauer], p. 483	Theorem 1.2	2irrexpq 26673  2irrexpqALT 26743
[BellMachover] p. 36	Lemma 10.3	idALT 23
[BellMachover] p. 97	Definition 10.1	df-eu 2562
[BellMachover] p. 460	Notation	df-mo 2533
[BellMachover] p. 460	Definition	mo3 2557
[BellMachover] p. 461	Axiom Ext	ax-ext 2701
[BellMachover] p. 462	Theorem 1.1	axextmo 2705
[BellMachover] p. 463	Axiom Rep	axrep5 5237
[BellMachover] p. 463	Scheme Sep	ax-sep 5246
[BellMachover] p. 463	Theorem 1.3(ii)	bj-bm1.3ii 37045  sepex 5250
[BellMachover] p. 466	Problem	axpow2 5317
[BellMachover] p. 466	Axiom Pow	axpow3 5318
[BellMachover] p. 466	Axiom Union	axun2 7693
[BellMachover] p. 468	Definition	df-ord 6323
[BellMachover] p. 469	Theorem 2.2(i)	ordirr 6338
[BellMachover] p. 469	Theorem 2.2(iii)	onelon 6345
[BellMachover] p. 469	Theorem 2.2(vii)	ordn2lp 6340
[BellMachover] p. 471	Definition of N	df-om 7823
[BellMachover] p. 471	Problem 2.5(ii)	uniordint 7757
[BellMachover] p. 471	Definition of Lim	df-lim 6325
[BellMachover] p. 472	Axiom Inf	zfinf2 9571
[BellMachover] p. 473	Theorem 2.8	limom 7838
[BellMachover] p. 477	Equation 3.1	df-r1 9693
[BellMachover] p. 478	Definition	rankval2 9747
[BellMachover] p. 478	Theorem 3.3(i)	r1ord3 9711  r1ord3g 9708
[BellMachover] p. 480	Axiom Reg	zfreg 9524
[BellMachover] p. 488	Axiom AC	ac5 10406  dfac4 10051
[BellMachover] p. 490	Definition of aleph	alephval3 10039
[BeltramettiCassinelli] p. 98	Remark	atlatmstc 39305
[BeltramettiCassinelli] p. 107	Remark 10.3.5	atom1d 32332
[BeltramettiCassinelli] p. 166	Theorem 14.8.4	chirred 32374  chirredi 32373
[BeltramettiCassinelli1] p. 400	Proposition P8(ii)	atoml2i 32362
[Beran] p. 3	Definition of join	sshjval3 31333
[Beran] p. 39	Theorem 2.3(i)	cmcm2 31595  cmcm2i 31572  cmcm2ii 31577  cmt2N 39236
[Beran] p. 40	Theorem 2.3(iii)	lecm 31596  lecmi 31581  lecmii 31582
[Beran] p. 45	Theorem 3.4	cmcmlem 31570
[Beran] p. 49	Theorem 4.2	cm2j 31599  cm2ji 31604  cm2mi 31605
[Beran] p. 95	Definition	df-sh 31186  issh2 31188
[Beran] p. 95	Lemma 3.1(S5)	his5 31065
[Beran] p. 95	Lemma 3.1(S6)	his6 31078
[Beran] p. 95	Lemma 3.1(S7)	his7 31069
[Beran] p. 95	Lemma 3.2(S8)	ho01i 31807
[Beran] p. 95	Lemma 3.2(S9)	hoeq1 31809
[Beran] p. 95	Lemma 3.2(S10)	ho02i 31808
[Beran] p. 95	Lemma 3.2(S11)	hoeq2 31810
[Beran] p. 95	Postulate (S1)	ax-his1 31061  his1i 31079
[Beran] p. 95	Postulate (S2)	ax-his2 31062
[Beran] p. 95	Postulate (S3)	ax-his3 31063
[Beran] p. 95	Postulate (S4)	ax-his4 31064
[Beran] p. 96	Definition of norm	df-hnorm 30947  dfhnorm2 31101  normval 31103
[Beran] p. 96	Definition for Cauchy sequence	hcau 31163
[Beran] p. 96	Definition of Cauchy sequence	df-hcau 30952
[Beran] p. 96	Definition of complete subspace	isch3 31220
[Beran] p. 96	Definition of converge	df-hlim 30951  hlimi 31167
[Beran] p. 97	Theorem 3.3(i)	norm-i-i 31112  norm-i 31108
[Beran] p. 97	Theorem 3.3(ii)	norm-ii-i 31116  norm-ii 31117  normlem0 31088  normlem1 31089  normlem2 31090  normlem3 31091  normlem4 31092  normlem5 31093  normlem6 31094  normlem7 31095  normlem7tALT 31098
[Beran] p. 97	Theorem 3.3(iii)	norm-iii-i 31118  norm-iii 31119
[Beran] p. 98	Remark 3.4	bcs 31160  bcsiALT 31158  bcsiHIL 31159
[Beran] p. 98	Remark 3.4(B)	normlem9at 31100  normpar 31134  normpari 31133
[Beran] p. 98	Remark 3.4(C)	normpyc 31125  normpyth 31124  normpythi 31121
[Beran] p. 99	Remark	lnfn0 32026  lnfn0i 32021  lnop0 31945  lnop0i 31949
[Beran] p. 99	Theorem 3.5(i)	nmcexi 32005  nmcfnex 32032  nmcfnexi 32030  nmcopex 32008  nmcopexi 32006
[Beran] p. 99	Theorem 3.5(ii)	nmcfnlb 32033  nmcfnlbi 32031  nmcoplb 32009  nmcoplbi 32007
[Beran] p. 99	Theorem 3.5(iii)	lnfncon 32035  lnfnconi 32034  lnopcon 32014  lnopconi 32013
[Beran] p. 100	Lemma 3.6	normpar2i 31135
[Beran] p. 101	Lemma 3.6	norm3adifi 31132  norm3adifii 31127  norm3dif 31129  norm3difi 31126
[Beran] p. 102	Theorem 3.7(i)	chocunii 31280  pjhth 31372  pjhtheu 31373  pjpjhth 31404  pjpjhthi 31405  pjth 25372
[Beran] p. 102	Theorem 3.7(ii)	ococ 31385  ococi 31384
[Beran] p. 103	Remark 3.8	nlelchi 32040
[Beran] p. 104	Theorem 3.9	riesz3i 32041  riesz4 32043  riesz4i 32042
[Beran] p. 104	Theorem 3.10	cnlnadj 32058  cnlnadjeu 32057  cnlnadjeui 32056  cnlnadji 32055  cnlnadjlem1 32046  nmopadjlei 32067
[Beran] p. 106	Theorem 3.11(i)	adjeq0 32070
[Beran] p. 106	Theorem 3.11(v)	nmopadji 32069
[Beran] p. 106	Theorem 3.11(ii)	adjmul 32071
[Beran] p. 106	Theorem 3.11(iv)	adjadj 31915
[Beran] p. 106	Theorem 3.11(vi)	nmopcoadj2i 32081  nmopcoadji 32080
[Beran] p. 106	Theorem 3.11(iii)	adjadd 32072
[Beran] p. 106	Theorem 3.11(vii)	nmopcoadj0i 32082
[Beran] p. 106	Theorem 3.11(viii)	adjcoi 32079  pjadj2coi 32183  pjadjcoi 32140
[Beran] p. 107	Definition	df-ch 31200  isch2 31202
[Beran] p. 107	Remark 3.12	choccl 31285  isch3 31220  occl 31283  ocsh 31262  shoccl 31284  shocsh 31263
[Beran] p. 107	Remark 3.12(B)	ococin 31387
[Beran] p. 108	Theorem 3.13	chintcl 31311
[Beran] p. 109	Property (i)	pjadj2 32166  pjadj3 32167  pjadji 31664  pjadjii 31653
[Beran] p. 109	Property (ii)	pjidmco 32160  pjidmcoi 32156  pjidmi 31652
[Beran] p. 110	Definition of projector ordering	pjordi 32152
[Beran] p. 111	Remark	ho0val 31729  pjch1 31649
[Beran] p. 111	Definition	df-hfmul 31713  df-hfsum 31712  df-hodif 31711  df-homul 31710  df-hosum 31709
[Beran] p. 111	Lemma 4.4(i)	pjo 31650
[Beran] p. 111	Lemma 4.4(ii)	pjch 31673  pjchi 31411
[Beran] p. 111	Lemma 4.4(iii)	pjoc2 31418  pjoc2i 31417
[Beran] p. 112	Theorem 4.5(i)->(ii)	pjss2i 31659
[Beran] p. 112	Theorem 4.5(i)->(iv)	pjssmi 32144  pjssmii 31660
[Beran] p. 112	Theorem 4.5(i)<->(ii)	pjss2coi 32143
[Beran] p. 112	Theorem 4.5(i)<->(iii)	pjss1coi 32142
[Beran] p. 112	Theorem 4.5(i)<->(vi)	pjnormssi 32147
[Beran] p. 112	Theorem 4.5(iv)->(v)	pjssge0i 32145  pjssge0ii 31661
[Beran] p. 112	Theorem 4.5(v)<->(vi)	pjdifnormi 32146  pjdifnormii 31662
[Bobzien] p. 116	Statement T3	stoic3 1776
[Bobzien] p. 117	Statement T2	stoic2a 1774
[Bobzien] p. 117	Statement T4	stoic4a 1777
[Bobzien] p. 117	Conclusion the contradictory	stoic1a 1772
[Bogachev] p. 16	Definition 1.5	df-oms 34276
[Bogachev] p. 17	Lemma 1.5.4	omssubadd 34284
[Bogachev] p. 17	Example 1.5.2	omsmon 34282
[Bogachev] p. 41	Definition 1.11.2	df-carsg 34286
[Bogachev] p. 42	Theorem 1.11.4	carsgsiga 34306
[Bogachev] p. 116	Definition 2.3.1	df-itgm 34337  df-sitm 34315
[Bogachev] p. 118	Chapter 2.4.4	df-itgm 34337
[Bogachev] p. 118	Definition 2.4.1	df-sitg 34314
[Bollobas] p. 1	Section I.1	df-edg 29028  isuhgrop 29050  isusgrop 29142  isuspgrop 29141
[Bollobas] p. 2	Section I.1	df-isubgr 47854  df-subgr 29248  uhgrspan1 29283  uhgrspansubgr 29271
[Bollobas] p. 3	Definition	df-gric 47874  gricuspgr 47911  isuspgrim 47889
[Bollobas] p. 3	Section I.1	cusgrsize 29435  df-clnbgr 47813  df-cusgr 29392  df-nbgr 29313  fusgrmaxsize 29445
[Bollobas] p. 4	Definition	df-upwlks 48115  df-wlks 29580
[Bollobas] p. 4	Section I.1	finsumvtxdg2size 29531  finsumvtxdgeven 29533  fusgr1th 29532  fusgrvtxdgonume 29535  vtxdgoddnumeven 29534
[Bollobas] p. 5	Notation	df-pths 29694
[Bollobas] p. 5	Definition	df-crcts 29766  df-cycls 29767  df-trls 29671  df-wlkson 29581
[Bollobas] p. 7	Section I.1	df-ushgr 29039
[BourbakiAlg1] p. 1	Definition 1	df-clintop 48181  df-cllaw 48167  df-mgm 18549  df-mgm2 48200
[BourbakiAlg1] p. 4	Definition 5	df-assintop 48182  df-asslaw 48169  df-sgrp 18628  df-sgrp2 48202
[BourbakiAlg1] p. 7	Definition 8	df-cmgm2 48201  df-comlaw 48168
[BourbakiAlg1] p. 12	Definition 2	df-mnd 18644
[BourbakiAlg1] p. 17	Chapter I.	mndlactf1 33010  mndlactf1o 33014  mndractf1 33012  mndractf1o 33015
[BourbakiAlg1] p. 92	Definition 1	df-ring 20155
[BourbakiAlg1] p. 93	Section I.8.1	df-rng 20073
[BourbakiAlg1] p. 298	Proposition 9	lvecendof1f1o 33622
[BourbakiAlg2] p. 113	Chapter 5.	assafld 33626  assarrginv 33625
[BourbakiAlg2] p. 116	Chapter 5,	fldextrspundgle 33666  fldextrspunfld 33664  fldextrspunlem1 33663  fldextrspunlem2 33665  fldextrspunlsp 33662  fldextrspunlsplem 33661
[BourbakiCAlg2], p. 228	Proposition 2	1arithidom 33501  dfufd2 33514
[BourbakiEns] p.	Proposition 8	fcof1 7244  fcofo 7245
[BourbakiTop1] p.	Remark	xnegmnf 13146  xnegpnf 13145
[BourbakiTop1] p.	Remark	rexneg 13147
[BourbakiTop1] p.	Remark 3	ust0 24140  ustfilxp 24133
[BourbakiTop1] p.	Axiom GT'	tgpsubcn 24010
[BourbakiTop1] p.	Criterion	ishmeo 23679
[BourbakiTop1] p.	Example 1	cstucnd 24204  iducn 24203  snfil 23784
[BourbakiTop1] p.	Example 2	neifil 23800
[BourbakiTop1] p.	Theorem 1	cnextcn 23987
[BourbakiTop1] p.	Theorem 2	ucnextcn 24224
[BourbakiTop1] p.	Theorem 3	df-hcmp 33940
[BourbakiTop1] p.	Paragraph 3	infil 23783
[BourbakiTop1] p.	Definition 1	df-ucn 24196  df-ust 24121  filintn0 23781  filn0 23782  istgp 23997  ucnprima 24202
[BourbakiTop1] p.	Definition 2	df-cfilu 24207
[BourbakiTop1] p.	Definition 3	df-cusp 24218  df-usp 24178  df-utop 24152  trust 24150
[BourbakiTop1] p.	Definition 6	df-pcmp 33839
[BourbakiTop1] p.	Property V_i	ssnei2 23036
[BourbakiTop1] p.	Theorem 1(d)	iscncl 23189
[BourbakiTop1] p.	Condition F_I	ustssel 24126
[BourbakiTop1] p.	Condition U_I	ustdiag 24129
[BourbakiTop1] p.	Property V_ii	innei 23045
[BourbakiTop1] p.	Property V_iv	neiptopreu 23053  neissex 23047
[BourbakiTop1] p.	Proposition 1	neips 23033  neiss 23029  ucncn 24205  ustund 24142  ustuqtop 24167
[BourbakiTop1] p.	Proposition 2	cnpco 23187  neiptopreu 23053  utop2nei 24171  utop3cls 24172
[BourbakiTop1] p.	Proposition 3	fmucnd 24212  uspreg 24194  utopreg 24173
[BourbakiTop1] p.	Proposition 4	imasncld 23611  imasncls 23612  imasnopn 23610
[BourbakiTop1] p.	Proposition 9	cnpflf2 23920
[BourbakiTop1] p.	Condition F_II	ustincl 24128
[BourbakiTop1] p.	Condition U_II	ustinvel 24130
[BourbakiTop1] p.	Property V_iii	elnei 23031
[BourbakiTop1] p.	Proposition 11	cnextucn 24223
[BourbakiTop1] p.	Condition F_IIb	ustbasel 24127
[BourbakiTop1] p.	Condition U_III	ustexhalf 24131
[BourbakiTop1] p.	Definition C'''	df-cmp 23307
[BourbakiTop1] p.	Axioms FI, FIIa, FIIb, FIII)	df-fil 23766
[BourbakiTop1] p.	Definition is due to Bourbaki (Def. 1	df-top 22814
[BourbakiTop2] p. 195	Definition 1	df-ldlf 33836
[BrosowskiDeutsh] p. 89	Proof follows	stoweidlem62 46053
[BrosowskiDeutsh] p. 89	Lemmas are written following	stowei 46055  stoweid 46054
[BrosowskiDeutsh] p. 90	Lemma 1	stoweidlem1 45992  stoweidlem10 46001  stoweidlem14 46005  stoweidlem15 46006  stoweidlem35 46026  stoweidlem36 46027  stoweidlem37 46028  stoweidlem38 46029  stoweidlem40 46031  stoweidlem41 46032  stoweidlem43 46034  stoweidlem44 46035  stoweidlem46 46037  stoweidlem5 45996  stoweidlem50 46041  stoweidlem52 46043  stoweidlem53 46044  stoweidlem55 46046  stoweidlem56 46047
[BrosowskiDeutsh] p. 90	Lemma 1	stoweidlem23 46014  stoweidlem24 46015  stoweidlem27 46018  stoweidlem28 46019  stoweidlem30 46021
[BrosowskiDeutsh] p. 91	Proof	stoweidlem34 46025  stoweidlem59 46050  stoweidlem60 46051
[BrosowskiDeutsh] p. 91	Lemma 1	stoweidlem45 46036  stoweidlem49 46040  stoweidlem7 45998
[BrosowskiDeutsh] p. 91	Lemma 2	stoweidlem31 46022  stoweidlem39 46030  stoweidlem42 46033  stoweidlem48 46039  stoweidlem51 46042  stoweidlem54 46045  stoweidlem57 46048  stoweidlem58 46049
[BrosowskiDeutsh] p. 91	Lemma 1	stoweidlem25 46016
[BrosowskiDeutsh] p. 91	Lemma proves that the function ` ` (as defined	stoweidlem17 46008
[BrosowskiDeutsh] p. 92	Proof	stoweidlem11 46002  stoweidlem13 46004  stoweidlem26 46017  stoweidlem61 46052
[BrosowskiDeutsh] p. 92	Lemma 2	stoweidlem18 46009
[Bruck] p. 1	Section I.1	df-clintop 48181  df-mgm 18549  df-mgm2 48200
[Bruck] p. 23	Section II.1	df-sgrp 18628  df-sgrp2 48202
[Bruck] p. 28	Theorem 3.2	dfgrp3 18953
[ChoquetDD] p. 2	Definition of mapping	df-mpt 5184
[Church] p. 129	Section II.24	df-ifp 1063  dfifp2 1064
[Clemente] p. 10	Definition IT	natded 30382
[Clemente] p. 10	Definition I` `m,n	natded 30382
[Clemente] p. 11	Definition E=>m,n	natded 30382
[Clemente] p. 11	Definition I=>m,n	natded 30382
[Clemente] p. 11	Definition E` `(1)	natded 30382
[Clemente] p. 11	Definition E` `(2)	natded 30382
[Clemente] p. 12	Definition E` `m,n,p	natded 30382
[Clemente] p. 12	Definition I` `n(1)	natded 30382
[Clemente] p. 12	Definition I` `n(2)	natded 30382
[Clemente] p. 13	Definition I` `m,n,p	natded 30382
[Clemente] p. 14	Proof 5.11	natded 30382
[Clemente] p. 14	Definition E` `n	natded 30382
[Clemente] p. 15	Theorem 5.2	ex-natded5.2-2 30384  ex-natded5.2 30383
[Clemente] p. 16	Theorem 5.3	ex-natded5.3-2 30387  ex-natded5.3 30386
[Clemente] p. 18	Theorem 5.5	ex-natded5.5 30389
[Clemente] p. 19	Theorem 5.7	ex-natded5.7-2 30391  ex-natded5.7 30390
[Clemente] p. 20	Theorem 5.8	ex-natded5.8-2 30393  ex-natded5.8 30392
[Clemente] p. 20	Theorem 5.13	ex-natded5.13-2 30395  ex-natded5.13 30394
[Clemente] p. 32	Definition I` `n	natded 30382
[Clemente] p. 32	Definition E` `m,n,p,a	natded 30382
[Clemente] p. 32	Definition E` `n,t	natded 30382
[Clemente] p. 32	Definition I` `n,t	natded 30382
[Clemente] p. 43	Theorem 9.20	ex-natded9.20 30396
[Clemente] p. 45	Theorem 9.20	ex-natded9.20-2 30397
[Clemente] p. 45	Theorem 9.26	ex-natded9.26-2 30399  ex-natded9.26 30398
[Cohen] p. 301	Remark	relogoprlem 26533
[Cohen] p. 301	Property 2	relogmul 26534  relogmuld 26567
[Cohen] p. 301	Property 3	relogdiv 26535  relogdivd 26568
[Cohen] p. 301	Property 4	relogexp 26538
[Cohen] p. 301	Property 1a	log1 26527
[Cohen] p. 301	Property 1b	loge 26528
[Cohen4] p. 348	Observation	relogbcxpb 26730
[Cohen4] p. 349	Property	relogbf 26734
[Cohen4] p. 352	Definition	elogb 26713
[Cohen4] p. 361	Property 2	relogbmul 26720
[Cohen4] p. 361	Property 3	logbrec 26725  relogbdiv 26722
[Cohen4] p. 361	Property 4	relogbreexp 26718
[Cohen4] p. 361	Property 6	relogbexp 26723
[Cohen4] p. 361	Property 1(a)	logbid1 26711
[Cohen4] p. 361	Property 1(b)	logb1 26712
[Cohen4] p. 367	Property	logbchbase 26714
[Cohen4] p. 377	Property 2	logblt 26727
[Cohn] p. 4	Proposition 1.1.5	sxbrsigalem1 34269  sxbrsigalem4 34271
[Cohn] p. 81	Section II.5	acsdomd 18498  acsinfd 18497  acsinfdimd 18499  acsmap2d 18496  acsmapd 18495
[Cohn] p. 143	Example 5.1.1	sxbrsiga 34274
[Connell] p. 57	Definition	df-scmat 22411  df-scmatalt 48381
[Conway] p. 4	Definition	slerec 27765  slerecd 27766
[Conway] p. 5	Definition	addsval 27909  addsval2 27910  df-adds 27907  df-muls 28050  df-negs 27967
[Conway] p. 7	Theorem	0slt1s 27778
[Conway] p. 16	Theorem 0(i)	ssltright 27820
[Conway] p. 16	Theorem 0(ii)	ssltleft 27819
[Conway] p. 16	Theorem 0(iii)	slerflex 27708
[Conway] p. 17	Theorem 3	addsass 27952  addsassd 27953  addscom 27913  addscomd 27914  addsrid 27911  addsridd 27912
[Conway] p. 17	Definition	df-0s 27773
[Conway] p. 17	Theorem 4(ii)	negnegs 27990
[Conway] p. 17	Theorem 4(iii)	negsid 27987  negsidd 27988
[Conway] p. 18	Theorem 5	sleadd1 27936  sleadd1d 27942
[Conway] p. 18	Definition	df-1s 27774
[Conway] p. 18	Theorem 6(ii)	negscl 27982  negscld 27983
[Conway] p. 18	Theorem 6(iii)	addscld 27927
[Conway] p. 19	Note	mulsunif2 28113
[Conway] p. 19	Theorem 7	addsdi 28098  addsdid 28099  addsdird 28100  mulnegs1d 28103  mulnegs2d 28104  mulsass 28109  mulsassd 28110  mulscom 28082  mulscomd 28083
[Conway] p. 19	Theorem 8(i)	mulscl 28077  mulscld 28078
[Conway] p. 19	Theorem 8(iii)	slemuld 28081  sltmul 28079  sltmuld 28080
[Conway] p. 20	Theorem 9	mulsgt0 28087  mulsgt0d 28088
[Conway] p. 21	Theorem 10(iv)	precsex 28160
[Conway] p. 23	Theorem 11	eqscut3 27770
[Conway] p. 24	Definition	df-reno 28398
[Conway] p. 24	Theorem 13(ii)	readdscl 28403  remulscl 28406  renegscl 28402
[Conway] p. 27	Definition	df-ons 28193  elons2 28199
[Conway] p. 27	Theorem 14	sltonex 28203
[Conway] p. 28	Theorem 15	onscutlt 28205  onswe 28210
[Conway] p. 29	Remark	madebday 27849  newbday 27851  oldbday 27850
[Conway] p. 29	Definition	df-made 27792  df-new 27794  df-old 27793
[CormenLeisersonRivest] p. 33	Equation 2.4	fldiv2 13799
[Crawley] p. 1	Definition of poset	df-poset 18254
[Crawley] p. 107	Theorem 13.2	hlsupr 39373
[Crawley] p. 110	Theorem 13.3	arglem1N 40177  dalaw 39873
[Crawley] p. 111	Theorem 13.4	hlathil 41948
[Crawley] p. 111	Definition of set W	df-watsN 39977
[Crawley] p. 111	Definition of dilation	df-dilN 40093  df-ldil 40091  isldil 40097
[Crawley] p. 111	Definition of translation	df-ltrn 40092  df-trnN 40094  isltrn 40106  ltrnu 40108
[Crawley] p. 112	Lemma A	cdlema1N 39778  cdlema2N 39779  exatleN 39391
[Crawley] p. 112	Lemma B	1cvrat 39463  cdlemb 39781  cdlemb2 40028  cdlemb3 40593  idltrn 40137  l1cvat 39041  lhpat 40030  lhpat2 40032  lshpat 39042  ltrnel 40126  ltrnmw 40138
[Crawley] p. 112	Lemma C	cdlemc1 40178  cdlemc2 40179  ltrnnidn 40161  trlat 40156  trljat1 40153  trljat2 40154  trljat3 40155  trlne 40172  trlnidat 40160  trlnle 40173
[Crawley] p. 112	Definition of automorphism	df-pautN 39978
[Crawley] p. 113	Lemma C	cdlemc 40184  cdlemc3 40180  cdlemc4 40181
[Crawley] p. 113	Lemma D	cdlemd 40194  cdlemd1 40185  cdlemd2 40186  cdlemd3 40187  cdlemd4 40188  cdlemd5 40189  cdlemd6 40190  cdlemd7 40191  cdlemd8 40192  cdlemd9 40193  cdleme31sde 40372  cdleme31se 40369  cdleme31se2 40370  cdleme31snd 40373  cdleme32a 40428  cdleme32b 40429  cdleme32c 40430  cdleme32d 40431  cdleme32e 40432  cdleme32f 40433  cdleme32fva 40424  cdleme32fva1 40425  cdleme32fvcl 40427  cdleme32le 40434  cdleme48fv 40486  cdleme4gfv 40494  cdleme50eq 40528  cdleme50f 40529  cdleme50f1 40530  cdleme50f1o 40533  cdleme50laut 40534  cdleme50ldil 40535  cdleme50lebi 40527  cdleme50rn 40532  cdleme50rnlem 40531  cdlemeg49le 40498  cdlemeg49lebilem 40526
[Crawley] p. 113	Lemma E	cdleme 40547  cdleme00a 40196  cdleme01N 40208  cdleme02N 40209  cdleme0a 40198  cdleme0aa 40197  cdleme0b 40199  cdleme0c 40200  cdleme0cp 40201  cdleme0cq 40202  cdleme0dN 40203  cdleme0e 40204  cdleme0ex1N 40210  cdleme0ex2N 40211  cdleme0fN 40205  cdleme0gN 40206  cdleme0moN 40212  cdleme1 40214  cdleme10 40241  cdleme10tN 40245  cdleme11 40257  cdleme11a 40247  cdleme11c 40248  cdleme11dN 40249  cdleme11e 40250  cdleme11fN 40251  cdleme11g 40252  cdleme11h 40253  cdleme11j 40254  cdleme11k 40255  cdleme11l 40256  cdleme12 40258  cdleme13 40259  cdleme14 40260  cdleme15 40265  cdleme15a 40261  cdleme15b 40262  cdleme15c 40263  cdleme15d 40264  cdleme16 40272  cdleme16aN 40246  cdleme16b 40266  cdleme16c 40267  cdleme16d 40268  cdleme16e 40269  cdleme16f 40270  cdleme16g 40271  cdleme19a 40290  cdleme19b 40291  cdleme19c 40292  cdleme19d 40293  cdleme19e 40294  cdleme19f 40295  cdleme1b 40213  cdleme2 40215  cdleme20aN 40296  cdleme20bN 40297  cdleme20c 40298  cdleme20d 40299  cdleme20e 40300  cdleme20f 40301  cdleme20g 40302  cdleme20h 40303  cdleme20i 40304  cdleme20j 40305  cdleme20k 40306  cdleme20l 40309  cdleme20l1 40307  cdleme20l2 40308  cdleme20m 40310  cdleme20y 40289  cdleme20zN 40288  cdleme21 40324  cdleme21d 40317  cdleme21e 40318  cdleme22a 40327  cdleme22aa 40326  cdleme22b 40328  cdleme22cN 40329  cdleme22d 40330  cdleme22e 40331  cdleme22eALTN 40332  cdleme22f 40333  cdleme22f2 40334  cdleme22g 40335  cdleme23a 40336  cdleme23b 40337  cdleme23c 40338  cdleme26e 40346  cdleme26eALTN 40348  cdleme26ee 40347  cdleme26f 40350  cdleme26f2 40352  cdleme26f2ALTN 40351  cdleme26fALTN 40349  cdleme27N 40356  cdleme27a 40354  cdleme27cl 40353  cdleme28c 40359  cdleme3 40224  cdleme30a 40365  cdleme31fv 40377  cdleme31fv1 40378  cdleme31fv1s 40379  cdleme31fv2 40380  cdleme31id 40381  cdleme31sc 40371  cdleme31sdnN 40374  cdleme31sn 40367  cdleme31sn1 40368  cdleme31sn1c 40375  cdleme31sn2 40376  cdleme31so 40366  cdleme35a 40435  cdleme35b 40437  cdleme35c 40438  cdleme35d 40439  cdleme35e 40440  cdleme35f 40441  cdleme35fnpq 40436  cdleme35g 40442  cdleme35h 40443  cdleme35h2 40444  cdleme35sn2aw 40445  cdleme35sn3a 40446  cdleme36a 40447  cdleme36m 40448  cdleme37m 40449  cdleme38m 40450  cdleme38n 40451  cdleme39a 40452  cdleme39n 40453  cdleme3b 40216  cdleme3c 40217  cdleme3d 40218  cdleme3e 40219  cdleme3fN 40220  cdleme3fa 40223  cdleme3g 40221  cdleme3h 40222  cdleme4 40225  cdleme40m 40454  cdleme40n 40455  cdleme40v 40456  cdleme40w 40457  cdleme41fva11 40464  cdleme41sn3aw 40461  cdleme41sn4aw 40462  cdleme41snaw 40463  cdleme42a 40458  cdleme42b 40465  cdleme42c 40459  cdleme42d 40460  cdleme42e 40466  cdleme42f 40467  cdleme42g 40468  cdleme42h 40469  cdleme42i 40470  cdleme42k 40471  cdleme42ke 40472  cdleme42keg 40473  cdleme42mN 40474  cdleme42mgN 40475  cdleme43aN 40476  cdleme43bN 40477  cdleme43cN 40478  cdleme43dN 40479  cdleme5 40227  cdleme50ex 40546  cdleme50ltrn 40544  cdleme51finvN 40543  cdleme51finvfvN 40542  cdleme51finvtrN 40545  cdleme6 40228  cdleme7 40236  cdleme7a 40230  cdleme7aa 40229  cdleme7b 40231  cdleme7c 40232  cdleme7d 40233  cdleme7e 40234  cdleme7ga 40235  cdleme8 40237  cdleme8tN 40242  cdleme9 40240  cdleme9a 40238  cdleme9b 40239  cdleme9tN 40244  cdleme9taN 40243  cdlemeda 40285  cdlemedb 40284  cdlemednpq 40286  cdlemednuN 40287  cdlemefr27cl 40390  cdlemefr32fva1 40397  cdlemefr32fvaN 40396  cdlemefrs32fva 40387  cdlemefrs32fva1 40388  cdlemefs27cl 40400  cdlemefs32fva1 40410  cdlemefs32fvaN 40409  cdlemesner 40283  cdlemeulpq 40207
[Crawley] p. 114	Lemma E	4atex 40063  4atexlem7 40062  cdleme0nex 40277  cdleme17a 40273  cdleme17c 40275  cdleme17d 40485  cdleme17d1 40276  cdleme17d2 40482  cdleme18a 40278  cdleme18b 40279  cdleme18c 40280  cdleme18d 40282  cdleme4a 40226
[Crawley] p. 115	Lemma E	cdleme21a 40312  cdleme21at 40315  cdleme21b 40313  cdleme21c 40314  cdleme21ct 40316  cdleme21f 40319  cdleme21g 40320  cdleme21h 40321  cdleme21i 40322  cdleme22gb 40281
[Crawley] p. 116	Lemma F	cdlemf 40550  cdlemf1 40548  cdlemf2 40549
[Crawley] p. 116	Lemma G	cdlemftr1 40554  cdlemg16 40644  cdlemg28 40691  cdlemg28a 40680  cdlemg28b 40690  cdlemg3a 40584  cdlemg42 40716  cdlemg43 40717  cdlemg44 40720  cdlemg44a 40718  cdlemg46 40722  cdlemg47 40723  cdlemg9 40621  ltrnco 40706  ltrncom 40725  tgrpabl 40738  trlco 40714
[Crawley] p. 116	Definition of G	df-tgrp 40730
[Crawley] p. 117	Lemma G	cdlemg17 40664  cdlemg17b 40649
[Crawley] p. 117	Definition of E	df-edring-rN 40743  df-edring 40744
[Crawley] p. 117	Definition of trace-preserving endomorphism	istendo 40747
[Crawley] p. 118	Remark	tendopltp 40767
[Crawley] p. 118	Lemma H	cdlemh 40804  cdlemh1 40802  cdlemh2 40803
[Crawley] p. 118	Lemma I	cdlemi 40807  cdlemi1 40805  cdlemi2 40806
[Crawley] p. 118	Lemma J	cdlemj1 40808  cdlemj2 40809  cdlemj3 40810  tendocan 40811
[Crawley] p. 118	Lemma K	cdlemk 40961  cdlemk1 40818  cdlemk10 40830  cdlemk11 40836  cdlemk11t 40933  cdlemk11ta 40916  cdlemk11tb 40918  cdlemk11tc 40932  cdlemk11u-2N 40876  cdlemk11u 40858  cdlemk12 40837  cdlemk12u-2N 40877  cdlemk12u 40859  cdlemk13-2N 40863  cdlemk13 40839  cdlemk14-2N 40865  cdlemk14 40841  cdlemk15-2N 40866  cdlemk15 40842  cdlemk16-2N 40867  cdlemk16 40844  cdlemk16a 40843  cdlemk17-2N 40868  cdlemk17 40845  cdlemk18-2N 40873  cdlemk18-3N 40887  cdlemk18 40855  cdlemk19-2N 40874  cdlemk19 40856  cdlemk19u 40957  cdlemk1u 40846  cdlemk2 40819  cdlemk20-2N 40879  cdlemk20 40861  cdlemk21-2N 40878  cdlemk21N 40860  cdlemk22-3 40888  cdlemk22 40880  cdlemk23-3 40889  cdlemk24-3 40890  cdlemk25-3 40891  cdlemk26-3 40893  cdlemk26b-3 40892  cdlemk27-3 40894  cdlemk28-3 40895  cdlemk29-3 40898  cdlemk3 40820  cdlemk30 40881  cdlemk31 40883  cdlemk32 40884  cdlemk33N 40896  cdlemk34 40897  cdlemk35 40899  cdlemk36 40900  cdlemk37 40901  cdlemk38 40902  cdlemk39 40903  cdlemk39u 40955  cdlemk4 40821  cdlemk41 40907  cdlemk42 40928  cdlemk42yN 40931  cdlemk43N 40950  cdlemk45 40934  cdlemk46 40935  cdlemk47 40936  cdlemk48 40937  cdlemk49 40938  cdlemk5 40823  cdlemk50 40939  cdlemk51 40940  cdlemk52 40941  cdlemk53 40944  cdlemk54 40945  cdlemk55 40948  cdlemk55u 40953  cdlemk56 40958  cdlemk5a 40822  cdlemk5auN 40847  cdlemk5u 40848  cdlemk6 40824  cdlemk6u 40849  cdlemk7 40835  cdlemk7u-2N 40875  cdlemk7u 40857  cdlemk8 40825  cdlemk9 40826  cdlemk9bN 40827  cdlemki 40828  cdlemkid 40923  cdlemkj-2N 40869  cdlemkj 40850  cdlemksat 40833  cdlemksel 40832  cdlemksv 40831  cdlemksv2 40834  cdlemkuat 40853  cdlemkuel-2N 40871  cdlemkuel-3 40885  cdlemkuel 40852  cdlemkuv-2N 40870  cdlemkuv2-2 40872  cdlemkuv2-3N 40886  cdlemkuv2 40854  cdlemkuvN 40851  cdlemkvcl 40829  cdlemky 40913  cdlemkyyN 40949  tendoex 40962
[Crawley] p. 120	Remark	dva1dim 40972
[Crawley] p. 120	Lemma L	cdleml1N 40963  cdleml2N 40964  cdleml3N 40965  cdleml4N 40966  cdleml5N 40967  cdleml6 40968  cdleml7 40969  cdleml8 40970  cdleml9 40971  dia1dim 41048
[Crawley] p. 120	Lemma M	dia11N 41035  diaf11N 41036  dialss 41033  diaord 41034  dibf11N 41148  djajN 41124
[Crawley] p. 120	Definition of isomorphism map	diaval 41019
[Crawley] p. 121	Lemma M	cdlemm10N 41105  dia2dimlem1 41051  dia2dimlem2 41052  dia2dimlem3 41053  dia2dimlem4 41054  dia2dimlem5 41055  diaf1oN 41117  diarnN 41116  dvheveccl 41099  dvhopN 41103
[Crawley] p. 121	Lemma N	cdlemn 41199  cdlemn10 41193  cdlemn11 41198  cdlemn11a 41194  cdlemn11b 41195  cdlemn11c 41196  cdlemn11pre 41197  cdlemn2 41182  cdlemn2a 41183  cdlemn3 41184  cdlemn4 41185  cdlemn4a 41186  cdlemn5 41188  cdlemn5pre 41187  cdlemn6 41189  cdlemn7 41190  cdlemn8 41191  cdlemn9 41192  diclspsn 41181
[Crawley] p. 121	Definition of phi(q)	df-dic 41160
[Crawley] p. 122	Lemma N	dih11 41252  dihf11 41254  dihjust 41204  dihjustlem 41203  dihord 41251  dihord1 41205  dihord10 41210  dihord11b 41209  dihord11c 41211  dihord2 41214  dihord2a 41206  dihord2b 41207  dihord2cN 41208  dihord2pre 41212  dihord2pre2 41213  dihordlem6 41200  dihordlem7 41201  dihordlem7b 41202
[Crawley] p. 122	Definition of isomorphism map	dihffval 41217  dihfval 41218  dihval 41219
[Diestel] p. 3	Definition	df-gric 47874  df-grim 47871  isuspgrim 47889
[Diestel] p. 3	Section 1.1	df-cusgr 29392  df-nbgr 29313
[Diestel] p. 3	Definition by	df-grisom 47870
[Diestel] p. 4	Section 1.1	df-isubgr 47854  df-subgr 29248  uhgrspan1 29283  uhgrspansubgr 29271
[Diestel] p. 5	Proposition 1.2.1	fusgrvtxdgonume 29535  vtxdgoddnumeven 29534
[Diestel] p. 27	Section 1.10	df-ushgr 29039
[EGA] p. 80	Notation 1.1.1	rspecval 33847
[EGA] p. 80	Proposition 1.1.2	zartop 33859
[EGA] p. 80	Proposition 1.1.2(i)	zarcls0 33851  zarcls1 33852
[EGA] p. 81	Corollary 1.1.8	zart0 33862
[EGA], p. 82	Proposition 1.1.10(ii)	zarcmp 33865
[EGA], p. 83	Corollary 1.2.3	rhmpreimacn 33868
[Eisenberg] p. 67	Definition 5.3	df-dif 3914
[Eisenberg] p. 82	Definition 6.3	dfom3 9576
[Eisenberg] p. 125	Definition 8.21	df-map 8778
[Eisenberg] p. 216	Example 13.2(4)	omenps 9584
[Eisenberg] p. 310	Theorem 19.8	cardprc 9909
[Eisenberg] p. 310	Corollary 19.7(2)	cardsdom 10484
[Enderton] p. 18	Axiom of Empty Set	axnul 5255
[Enderton] p. 19	Definition	df-tp 4590
[Enderton] p. 26	Exercise 5	unissb 4899
[Enderton] p. 26	Exercise 10	pwel 5331
[Enderton] p. 28	Exercise 7(b)	pwun 5524
[Enderton] p. 30	Theorem "Distributive laws"	iinin1 5038  iinin2 5037  iinun2 5032  iunin1 5031  iunin1f 32536  iunin2 5030  uniin1 32530  uniin2 32531
[Enderton] p. 31	Theorem "De Morgan's laws"	iindif2 5036  iundif2 5033
[Enderton] p. 32	Exercise 20	unineq 4247
[Enderton] p. 33	Exercise 23	iinuni 5057
[Enderton] p. 33	Exercise 25	iununi 5058
[Enderton] p. 33	Exercise 24(a)	iinpw 5065
[Enderton] p. 33	Exercise 24(b)	iunpw 7727  iunpwss 5066
[Enderton] p. 36	Definition	opthwiener 5469
[Enderton] p. 38	Exercise 6(a)	unipw 5405
[Enderton] p. 38	Exercise 6(b)	pwuni 4905
[Enderton] p. 41	Lemma 3D	opeluu 5425  rnex 7866  rnexg 7858
[Enderton] p. 41	Exercise 8	dmuni 5868  rnuni 6109
[Enderton] p. 42	Definition of a function	dffun7 6527  dffun8 6528
[Enderton] p. 43	Definition of function value	funfv2 6931
[Enderton] p. 43	Definition of single-rooted	funcnv 6569
[Enderton] p. 44	Definition (d)	dfima2 6022  dfima3 6023
[Enderton] p. 47	Theorem 3H	fvco2 6940
[Enderton] p. 49	Axiom of Choice (first form)	ac7 10402  ac7g 10403  df-ac 10045  dfac2 10061  dfac2a 10059  dfac2b 10060  dfac3 10050  dfac7 10062
[Enderton] p. 50	Theorem 3K(a)	imauni 7202
[Enderton] p. 52	Definition	df-map 8778
[Enderton] p. 53	Exercise 21	coass 6226
[Enderton] p. 53	Exercise 27	dmco 6215
[Enderton] p. 53	Exercise 14(a)	funin 6576
[Enderton] p. 53	Exercise 22(a)	imass2 6062
[Enderton] p. 54	Remark	ixpf 8870  ixpssmap 8882
[Enderton] p. 54	Definition of infinite Cartesian product	df-ixp 8848
[Enderton] p. 55	Axiom of Choice (second form)	ac9 10412  ac9s 10422
[Enderton] p. 56	Theorem 3M	eqvrelref 38594  erref 8668
[Enderton] p. 57	Lemma 3N	eqvrelthi 38597  erthi 8704
[Enderton] p. 57	Definition	df-ec 8650
[Enderton] p. 58	Definition	df-qs 8654
[Enderton] p. 61	Exercise 35	df-ec 8650
[Enderton] p. 65	Exercise 56(a)	dmun 5864
[Enderton] p. 68	Definition of successor	df-suc 6326
[Enderton] p. 71	Definition	df-tr 5210  dftr4 5216
[Enderton] p. 72	Theorem 4E	unisuc 6401  unisucg 6400
[Enderton] p. 73	Exercise 6	unisuc 6401  unisucg 6400
[Enderton] p. 73	Exercise 5(a)	truni 5225
[Enderton] p. 73	Exercise 5(b)	trint 5227  trintALT 44863
[Enderton] p. 79	Theorem 4I(A1)	nna0 8545
[Enderton] p. 79	Theorem 4I(A2)	nnasuc 8547  onasuc 8469
[Enderton] p. 79	Definition of operation value	df-ov 7372
[Enderton] p. 80	Theorem 4J(A1)	nnm0 8546
[Enderton] p. 80	Theorem 4J(A2)	nnmsuc 8548  onmsuc 8470
[Enderton] p. 81	Theorem 4K(1)	nnaass 8563
[Enderton] p. 81	Theorem 4K(2)	nna0r 8550  nnacom 8558
[Enderton] p. 81	Theorem 4K(3)	nndi 8564
[Enderton] p. 81	Theorem 4K(4)	nnmass 8565
[Enderton] p. 81	Theorem 4K(5)	nnmcom 8567
[Enderton] p. 82	Exercise 16	nnm0r 8551  nnmsucr 8566
[Enderton] p. 88	Exercise 23	nnaordex 8579
[Enderton] p. 129	Definition	df-en 8896
[Enderton] p. 132	Theorem 6B(b)	canth 7323
[Enderton] p. 133	Exercise 1	xpomen 9944
[Enderton] p. 133	Exercise 2	qnnen 16157
[Enderton] p. 134	Theorem (Pigeonhole Principle)	php 9148
[Enderton] p. 135	Corollary 6C	php3 9150
[Enderton] p. 136	Corollary 6E	nneneq 9147
[Enderton] p. 136	Corollary 6D(a)	pssinf 9179
[Enderton] p. 136	Corollary 6D(b)	ominf 9181
[Enderton] p. 137	Lemma 6F	pssnn 9109
[Enderton] p. 138	Corollary 6G	ssfi 9114
[Enderton] p. 139	Theorem 6H(c)	mapen 9082
[Enderton] p. 142	Theorem 6I(3)	xpdjuen 10109
[Enderton] p. 142	Theorem 6I(4)	mapdjuen 10110
[Enderton] p. 143	Theorem 6J	dju0en 10105  dju1en 10101
[Enderton] p. 144	Exercise 13	iunfi 9270  unifi 9271  unifi2 9272
[Enderton] p. 144	Corollary 6K	undif2 4436  unfi 9112  unfi2 9235
[Enderton] p. 145	Figure 38	ffoss 7904
[Enderton] p. 145	Definition	df-dom 8897
[Enderton] p. 146	Example 1	domen 8910  domeng 8911
[Enderton] p. 146	Example 3	nndomo 9158  nnsdom 9583  nnsdomg 9222
[Enderton] p. 149	Theorem 6L(a)	djudom2 10113
[Enderton] p. 149	Theorem 6L(c)	mapdom1 9083  xpdom1 9017  xpdom1g 9015  xpdom2g 9014
[Enderton] p. 149	Theorem 6L(d)	mapdom2 9089
[Enderton] p. 151	Theorem 6M	zorn 10436  zorng 10433
[Enderton] p. 151	Theorem 6M(4)	ac8 10421  dfac5 10058
[Enderton] p. 159	Theorem 6Q	unictb 10504
[Enderton] p. 164	Example	infdif 10137
[Enderton] p. 168	Definition	df-po 5539
[Enderton] p. 192	Theorem 7M(a)	oneli 6436
[Enderton] p. 192	Theorem 7M(b)	ontr1 6367
[Enderton] p. 192	Theorem 7M(c)	onirri 6435
[Enderton] p. 193	Corollary 7N(b)	0elon 6375
[Enderton] p. 193	Corollary 7N(c)	onsuci 7794
[Enderton] p. 193	Corollary 7N(d)	ssonunii 7737
[Enderton] p. 194	Remark	onprc 7734
[Enderton] p. 194	Exercise 16	suc11 6429
[Enderton] p. 197	Definition	df-card 9868
[Enderton] p. 197	Theorem 7P	carden 10480
[Enderton] p. 200	Exercise 25	tfis 7811
[Enderton] p. 202	Lemma 7T	r1tr 9705
[Enderton] p. 202	Definition	df-r1 9693
[Enderton] p. 202	Theorem 7Q	r1val1 9715
[Enderton] p. 204	Theorem 7V(b)	rankval4 9796
[Enderton] p. 206	Theorem 7X(b)	en2lp 9535
[Enderton] p. 207	Exercise 30	rankpr 9786  rankprb 9780  rankpw 9772  rankpwi 9752  rankuniss 9795
[Enderton] p. 207	Exercise 34	opthreg 9547
[Enderton] p. 208	Exercise 35	suc11reg 9548
[Enderton] p. 212	Definition of aleph	alephval3 10039
[Enderton] p. 213	Theorem 8A(a)	alephord2 10005
[Enderton] p. 213	Theorem 8A(b)	cardalephex 10019
[Enderton] p. 218	Theorem Schema 8E	onfununi 8287
[Enderton] p. 222	Definition of kard	karden 9824  kardex 9823
[Enderton] p. 238	Theorem 8R	oeoa 8538
[Enderton] p. 238	Theorem 8S	oeoe 8540
[Enderton] p. 240	Exercise 25	oarec 8503
[Enderton] p. 257	Definition of cofinality	cflm 10179
[FaureFrolicher] p. 57	Definition 3.1.9	mreexd 17583
[FaureFrolicher] p. 83	Definition 4.1.1	df-mri 17525
[FaureFrolicher] p. 83	Proposition 4.1.3	acsfiindd 18494  mrieqv2d 17580  mrieqvd 17579
[FaureFrolicher] p. 84	Lemma 4.1.5	mreexmrid 17584
[FaureFrolicher] p. 86	Proposition 4.2.1	mreexexd 17589  mreexexlem2d 17586
[FaureFrolicher] p. 87	Theorem 4.2.2	acsexdimd 18500  mreexfidimd 17591
[Frege1879] p. 11	Statement	df3or2 43750
[Frege1879] p. 12	Statement	df3an2 43751  dfxor4 43748  dfxor5 43749
[Frege1879] p. 26	Axiom 1	ax-frege1 43772
[Frege1879] p. 26	Axiom 2	ax-frege2 43773
[Frege1879] p. 26	Proposition 1	ax-1 6
[Frege1879] p. 26	Proposition 2	ax-2 7
[Frege1879] p. 29	Proposition 3	frege3 43777
[Frege1879] p. 31	Proposition 4	frege4 43781
[Frege1879] p. 32	Proposition 5	frege5 43782
[Frege1879] p. 33	Proposition 6	frege6 43788
[Frege1879] p. 34	Proposition 7	frege7 43790
[Frege1879] p. 35	Axiom 8	ax-frege8 43791  axfrege8 43789
[Frege1879] p. 35	Proposition 8	pm2.04 90  wl-luk-pm2.04 37426
[Frege1879] p. 35	Proposition 9	frege9 43794
[Frege1879] p. 36	Proposition 10	frege10 43802
[Frege1879] p. 36	Proposition 11	frege11 43796
[Frege1879] p. 37	Proposition 12	frege12 43795
[Frege1879] p. 37	Proposition 13	frege13 43804
[Frege1879] p. 37	Proposition 14	frege14 43805
[Frege1879] p. 38	Proposition 15	frege15 43808
[Frege1879] p. 38	Proposition 16	frege16 43798
[Frege1879] p. 39	Proposition 17	frege17 43803
[Frege1879] p. 39	Proposition 18	frege18 43800
[Frege1879] p. 39	Proposition 19	frege19 43806
[Frege1879] p. 40	Proposition 20	frege20 43810
[Frege1879] p. 40	Proposition 21	frege21 43809
[Frege1879] p. 41	Proposition 22	frege22 43801
[Frege1879] p. 42	Proposition 23	frege23 43807
[Frege1879] p. 42	Proposition 24	frege24 43797
[Frege1879] p. 42	Proposition 25	frege25 43799  rp-frege25 43787
[Frege1879] p. 42	Proposition 26	frege26 43792
[Frege1879] p. 43	Axiom 28	ax-frege28 43812
[Frege1879] p. 43	Proposition 27	frege27 43793
[Frege1879] p. 43	Proposition 28	con3 153
[Frege1879] p. 43	Proposition 29	frege29 43813
[Frege1879] p. 44	Axiom 31	ax-frege31 43816  axfrege31 43815
[Frege1879] p. 44	Proposition 30	frege30 43814
[Frege1879] p. 44	Proposition 31	notnotr 130
[Frege1879] p. 44	Proposition 32	frege32 43817
[Frege1879] p. 44	Proposition 33	frege33 43818
[Frege1879] p. 45	Proposition 34	frege34 43819
[Frege1879] p. 45	Proposition 35	frege35 43820
[Frege1879] p. 45	Proposition 36	frege36 43821
[Frege1879] p. 46	Proposition 37	frege37 43822
[Frege1879] p. 46	Proposition 38	frege38 43823
[Frege1879] p. 46	Proposition 39	frege39 43824
[Frege1879] p. 46	Proposition 40	frege40 43825
[Frege1879] p. 47	Axiom 41	ax-frege41 43827  axfrege41 43826
[Frege1879] p. 47	Proposition 41	notnot 142
[Frege1879] p. 47	Proposition 42	frege42 43828
[Frege1879] p. 47	Proposition 43	frege43 43829
[Frege1879] p. 47	Proposition 44	frege44 43830
[Frege1879] p. 47	Proposition 45	frege45 43831
[Frege1879] p. 48	Proposition 46	frege46 43832
[Frege1879] p. 48	Proposition 47	frege47 43833
[Frege1879] p. 49	Proposition 48	frege48 43834
[Frege1879] p. 49	Proposition 49	frege49 43835
[Frege1879] p. 49	Proposition 50	frege50 43836
[Frege1879] p. 50	Axiom 52	ax-frege52a 43839  ax-frege52c 43870  frege52aid 43840  frege52b 43871
[Frege1879] p. 50	Axiom 54	ax-frege54a 43844  ax-frege54c 43874  frege54b 43875
[Frege1879] p. 50	Proposition 51	frege51 43837
[Frege1879] p. 50	Proposition 52	dfsbcq 3752
[Frege1879] p. 50	Proposition 53	frege53a 43842  frege53aid 43841  frege53b 43872  frege53c 43896
[Frege1879] p. 50	Proposition 54	biid 261  eqid 2729
[Frege1879] p. 50	Proposition 55	frege55a 43850  frege55aid 43847  frege55b 43879  frege55c 43900  frege55cor1a 43851  frege55lem2a 43849  frege55lem2b 43878  frege55lem2c 43899
[Frege1879] p. 50	Proposition 56	frege56a 43853  frege56aid 43852  frege56b 43880  frege56c 43901
[Frege1879] p. 51	Axiom 58	ax-frege58a 43857  ax-frege58b 43883  frege58bid 43884  frege58c 43903
[Frege1879] p. 51	Proposition 57	frege57a 43855  frege57aid 43854  frege57b 43881  frege57c 43902
[Frege1879] p. 51	Proposition 58	spsbc 3763
[Frege1879] p. 51	Proposition 59	frege59a 43859  frege59b 43886  frege59c 43904
[Frege1879] p. 52	Proposition 60	frege60a 43860  frege60b 43887  frege60c 43905
[Frege1879] p. 52	Proposition 61	frege61a 43861  frege61b 43888  frege61c 43906
[Frege1879] p. 52	Proposition 62	frege62a 43862  frege62b 43889  frege62c 43907
[Frege1879] p. 52	Proposition 63	frege63a 43863  frege63b 43890  frege63c 43908
[Frege1879] p. 53	Proposition 64	frege64a 43864  frege64b 43891  frege64c 43909
[Frege1879] p. 53	Proposition 65	frege65a 43865  frege65b 43892  frege65c 43910
[Frege1879] p. 54	Proposition 66	frege66a 43866  frege66b 43893  frege66c 43911
[Frege1879] p. 54	Proposition 67	frege67a 43867  frege67b 43894  frege67c 43912
[Frege1879] p. 54	Proposition 68	frege68a 43868  frege68b 43895  frege68c 43913
[Frege1879] p. 55	Definition 69	dffrege69 43914
[Frege1879] p. 58	Proposition 70	frege70 43915
[Frege1879] p. 59	Proposition 71	frege71 43916
[Frege1879] p. 59	Proposition 72	frege72 43917
[Frege1879] p. 59	Proposition 73	frege73 43918
[Frege1879] p. 60	Definition 76	dffrege76 43921
[Frege1879] p. 60	Proposition 74	frege74 43919
[Frege1879] p. 60	Proposition 75	frege75 43920
[Frege1879] p. 62	Proposition 77	frege77 43922  frege77d 43728
[Frege1879] p. 63	Proposition 78	frege78 43923
[Frege1879] p. 63	Proposition 79	frege79 43924
[Frege1879] p. 63	Proposition 80	frege80 43925
[Frege1879] p. 63	Proposition 81	frege81 43926  frege81d 43729
[Frege1879] p. 64	Proposition 82	frege82 43927
[Frege1879] p. 65	Proposition 83	frege83 43928  frege83d 43730
[Frege1879] p. 65	Proposition 84	frege84 43929
[Frege1879] p. 66	Proposition 85	frege85 43930
[Frege1879] p. 66	Proposition 86	frege86 43931
[Frege1879] p. 66	Proposition 87	frege87 43932  frege87d 43732
[Frege1879] p. 67	Proposition 88	frege88 43933
[Frege1879] p. 68	Proposition 89	frege89 43934
[Frege1879] p. 68	Proposition 90	frege90 43935
[Frege1879] p. 68	Proposition 91	frege91 43936  frege91d 43733
[Frege1879] p. 69	Proposition 92	frege92 43937
[Frege1879] p. 70	Proposition 93	frege93 43938
[Frege1879] p. 70	Proposition 94	frege94 43939
[Frege1879] p. 70	Proposition 95	frege95 43940
[Frege1879] p. 71	Definition 99	dffrege99 43944
[Frege1879] p. 71	Proposition 96	frege96 43941  frege96d 43731
[Frege1879] p. 71	Proposition 97	frege97 43942  frege97d 43734
[Frege1879] p. 71	Proposition 98	frege98 43943  frege98d 43735
[Frege1879] p. 72	Proposition 100	frege100 43945
[Frege1879] p. 72	Proposition 101	frege101 43946
[Frege1879] p. 72	Proposition 102	frege102 43947  frege102d 43736
[Frege1879] p. 73	Proposition 103	frege103 43948
[Frege1879] p. 73	Proposition 104	frege104 43949
[Frege1879] p. 73	Proposition 105	frege105 43950
[Frege1879] p. 73	Proposition 106	frege106 43951  frege106d 43737
[Frege1879] p. 74	Proposition 107	frege107 43952
[Frege1879] p. 74	Proposition 108	frege108 43953  frege108d 43738
[Frege1879] p. 74	Proposition 109	frege109 43954  frege109d 43739
[Frege1879] p. 75	Proposition 110	frege110 43955
[Frege1879] p. 75	Proposition 111	frege111 43956  frege111d 43741
[Frege1879] p. 76	Proposition 112	frege112 43957
[Frege1879] p. 76	Proposition 113	frege113 43958
[Frege1879] p. 76	Proposition 114	frege114 43959  frege114d 43740
[Frege1879] p. 77	Definition 115	dffrege115 43960
[Frege1879] p. 77	Proposition 116	frege116 43961
[Frege1879] p. 78	Proposition 117	frege117 43962
[Frege1879] p. 78	Proposition 118	frege118 43963
[Frege1879] p. 78	Proposition 119	frege119 43964
[Frege1879] p. 78	Proposition 120	frege120 43965
[Frege1879] p. 79	Proposition 121	frege121 43966
[Frege1879] p. 79	Proposition 122	frege122 43967  frege122d 43742
[Frege1879] p. 79	Proposition 123	frege123 43968
[Frege1879] p. 80	Proposition 124	frege124 43969  frege124d 43743
[Frege1879] p. 81	Proposition 125	frege125 43970
[Frege1879] p. 81	Proposition 126	frege126 43971  frege126d 43744
[Frege1879] p. 82	Proposition 127	frege127 43972
[Frege1879] p. 83	Proposition 128	frege128 43973
[Frege1879] p. 83	Proposition 129	frege129 43974  frege129d 43745
[Frege1879] p. 84	Proposition 130	frege130 43975
[Frege1879] p. 85	Proposition 131	frege131 43976  frege131d 43746
[Frege1879] p. 86	Proposition 132	frege132 43977
[Frege1879] p. 86	Proposition 133	frege133 43978  frege133d 43747
[Fremlin1] p. 13	Definition 111G (b)	df-salgen 46304
[Fremlin1] p. 13	Definition 111G (d)	borelmbl 46627
[Fremlin1] p. 13	Proposition 111G (b)	salgenss 46327
[Fremlin1] p. 14	Definition 112A	ismea 46442
[Fremlin1] p. 15	Remark 112B (d)	psmeasure 46462
[Fremlin1] p. 15	Property 112C (a)	meadjun 46453  meadjunre 46467
[Fremlin1] p. 15	Property 112C (b)	meassle 46454
[Fremlin1] p. 15	Property 112C (c)	meaunle 46455
[Fremlin1] p. 16	Property 112C (d)	iundjiun 46451  meaiunle 46460  meaiunlelem 46459
[Fremlin1] p. 16	Proposition 112C (e)	meaiuninc 46472  meaiuninc2 46473  meaiuninc3 46476  meaiuninc3v 46475  meaiunincf 46474  meaiuninclem 46471
[Fremlin1] p. 16	Proposition 112C (f)	meaiininc 46478  meaiininc2 46479  meaiininclem 46477
[Fremlin1] p. 19	Theorem 113C	caragen0 46497  caragendifcl 46505  caratheodory 46519  omelesplit 46509
[Fremlin1] p. 19	Definition 113A	isome 46485  isomennd 46522  isomenndlem 46521
[Fremlin1] p. 19	Remark 113B (c)	omeunle 46507
[Fremlin1] p. 19	Definition 112Df	caragencmpl 46526  voncmpl 46612
[Fremlin1] p. 19	Definition 113A (ii)	omessle 46489
[Fremlin1] p. 20	Theorem 113C	carageniuncl 46514  carageniuncllem1 46512  carageniuncllem2 46513  caragenuncl 46504  caragenuncllem 46503  caragenunicl 46515
[Fremlin1] p. 21	Remark 113D	caragenel2d 46523
[Fremlin1] p. 21	Theorem 113C	caratheodorylem1 46517  caratheodorylem2 46518
[Fremlin1] p. 21	Exercise 113Xa	caragencmpl 46526
[Fremlin1] p. 23	Lemma 114B	hoidmv1le 46585  hoidmv1lelem1 46582  hoidmv1lelem2 46583  hoidmv1lelem3 46584
[Fremlin1] p. 25	Definition 114E	isvonmbl 46629
[Fremlin1] p. 29	Lemma 115B	hoidmv1le 46585  hoidmvle 46591  hoidmvlelem1 46586  hoidmvlelem2 46587  hoidmvlelem3 46588  hoidmvlelem4 46589  hoidmvlelem5 46590  hsphoidmvle2 46576  hsphoif 46567  hsphoival 46570
[Fremlin1] p. 29	Definition 1135 (b)	hoicvr 46539
[Fremlin1] p. 29	Definition 115A (b)	hoicvrrex 46547
[Fremlin1] p. 29	Definition 115A (c)	hoidmv0val 46574  hoidmvn0val 46575  hoidmvval 46568  hoidmvval0 46578  hoidmvval0b 46581
[Fremlin1] p. 30	Lemma 115B	hoiprodp1 46579  hsphoidmvle 46577
[Fremlin1] p. 30	Definition 115C	df-ovoln 46528  df-voln 46530
[Fremlin1] p. 30	Proposition 115D (a)	dmovn 46595  ovn0 46557  ovn0lem 46556  ovnf 46554  ovnome 46564  ovnssle 46552  ovnsslelem 46551  ovnsupge0 46548
[Fremlin1] p. 30	Proposition 115D (b)	ovnhoi 46594  ovnhoilem1 46592  ovnhoilem2 46593  vonhoi 46658
[Fremlin1] p. 31	Lemma 115F	hoidifhspdmvle 46611  hoidifhspf 46609  hoidifhspval 46599  hoidifhspval2 46606  hoidifhspval3 46610  hspmbl 46620  hspmbllem1 46617  hspmbllem2 46618  hspmbllem3 46619
[Fremlin1] p. 31	Definition 115E	voncmpl 46612  vonmea 46565
[Fremlin1] p. 31	Proposition 115D (a)(iv)	ovnsubadd 46563  ovnsubadd2 46637  ovnsubadd2lem 46636  ovnsubaddlem1 46561  ovnsubaddlem2 46562
[Fremlin1] p. 32	Proposition 115G (a)	hoimbl 46622  hoimbl2 46656  hoimbllem 46621  hspdifhsp 46607  opnvonmbl 46625  opnvonmbllem2 46624
[Fremlin1] p. 32	Proposition 115G (b)	borelmbl 46627
[Fremlin1] p. 32	Proposition 115G (c)	iccvonmbl 46670  iccvonmbllem 46669  ioovonmbl 46668
[Fremlin1] p. 32	Proposition 115G (d)	vonicc 46676  vonicclem2 46675  vonioo 46673  vonioolem2 46672  vonn0icc 46679  vonn0icc2 46683  vonn0ioo 46678  vonn0ioo2 46681
[Fremlin1] p. 32	Proposition 115G (e)	ctvonmbl 46680  snvonmbl 46677  vonct 46684  vonsn 46682
[Fremlin1] p. 35	Lemma 121A	subsalsal 46350
[Fremlin1] p. 35	Lemma 121A (iii)	subsaliuncl 46349  subsaliuncllem 46348
[Fremlin1] p. 35	Proposition 121B	salpreimagtge 46716  salpreimalegt 46700  salpreimaltle 46717
[Fremlin1] p. 35	Proposition 121B (i)	issmf 46719  issmff 46725  issmflem 46718
[Fremlin1] p. 35	Proposition 121B (ii)	issmfle 46736  issmflelem 46735  smfpreimale 46745
[Fremlin1] p. 35	Proposition 121B (iii)	issmfgt 46747  issmfgtlem 46746
[Fremlin1] p. 36	Definition 121C	df-smblfn 46687  issmf 46719  issmff 46725  issmfge 46761  issmfgelem 46760  issmfgt 46747  issmfgtlem 46746  issmfle 46736  issmflelem 46735  issmflem 46718
[Fremlin1] p. 36	Proposition 121B	salpreimagelt 46698  salpreimagtlt 46721  salpreimalelt 46720
[Fremlin1] p. 36	Proposition 121B (iv)	issmfge 46761  issmfgelem 46760
[Fremlin1] p. 36	Proposition 121D (a)	bormflebmf 46744
[Fremlin1] p. 36	Proposition 121D (b)	cnfrrnsmf 46742  cnfsmf 46731
[Fremlin1] p. 36	Proposition 121D (c)	decsmf 46758  decsmflem 46757  incsmf 46733  incsmflem 46732
[Fremlin1] p. 37	Proposition 121E (a)	pimconstlt0 46692  pimconstlt1 46693  smfconst 46740
[Fremlin1] p. 37	Proposition 121E (b)	smfadd 46756  smfaddlem1 46754  smfaddlem2 46755
[Fremlin1] p. 37	Proposition 121E (c)	smfmulc1 46787
[Fremlin1] p. 37	Proposition 121E (d)	smfmul 46786  smfmullem1 46782  smfmullem2 46783  smfmullem3 46784  smfmullem4 46785
[Fremlin1] p. 37	Proposition 121E (e)	smfdiv 46788
[Fremlin1] p. 37	Proposition 121E (f)	smfpimbor1 46791  smfpimbor1lem2 46790
[Fremlin1] p. 37	Proposition 121E (g)	smfco 46793
[Fremlin1] p. 37	Proposition 121E (h)	smfres 46781
[Fremlin1] p. 38	Proposition 121E (e)	smfrec 46780
[Fremlin1] p. 38	Proposition 121E (f)	smfpimbor1lem1 46789  smfresal 46779
[Fremlin1] p. 38	Proposition 121F (a)	smflim 46768  smflim2 46797  smflimlem1 46762  smflimlem2 46763  smflimlem3 46764  smflimlem4 46765  smflimlem5 46766  smflimlem6 46767  smflimmpt 46801
[Fremlin1] p. 38	Proposition 121F (b)	smfsup 46805  smfsuplem1 46802  smfsuplem2 46803  smfsuplem3 46804  smfsupmpt 46806  smfsupxr 46807
[Fremlin1] p. 38	Proposition 121F (c)	smfinf 46809  smfinflem 46808  smfinfmpt 46810
[Fremlin1] p. 39	Remark 121G	smflim 46768  smflim2 46797  smflimmpt 46801
[Fremlin1] p. 39	Proposition 121F	smfpimcc 46799
[Fremlin1] p. 39	Proposition 121H	smfdivdmmbl 46829  smfdivdmmbl2 46832  smfinfdmmbl 46840  smfinfdmmbllem 46839  smfsupdmmbl 46836  smfsupdmmbllem 46835
[Fremlin1] p. 39	Proposition 121F (d)	smflimsup 46819  smflimsuplem2 46812  smflimsuplem6 46816  smflimsuplem7 46817  smflimsuplem8 46818  smflimsupmpt 46820
[Fremlin1] p. 39	Proposition 121F (e)	smfliminf 46822  smfliminflem 46821  smfliminfmpt 46823
[Fremlin1] p. 80	Definition 135E (b)	df-smblfn 46687
[Fremlin1], p. 38	Proposition 121F (b)	fsupdm 46833  fsupdm2 46834
[Fremlin1], p. 39	Proposition 121H	adddmmbl 46824  adddmmbl2 46825  finfdm 46837  finfdm2 46838  fsupdm 46833  fsupdm2 46834  muldmmbl 46826  muldmmbl2 46827
[Fremlin1], p. 39	Proposition 121F (c)	finfdm 46837  finfdm2 46838
[Fremlin5] p. 193	Proposition 563Gb	nulmbl2 25470
[Fremlin5] p. 213	Lemma 565Ca	uniioovol 25513
[Fremlin5] p. 214	Lemma 565Ca	uniioombl 25523
[Fremlin5] p. 218	Lemma 565Ib	ftc1anclem6 37685
[Fremlin5] p. 220	Theorem 565Ma	ftc1anc 37688
[FreydScedrov] p. 283	Axiom of Infinity	ax-inf 9567  inf1 9551  inf2 9552
[Gleason] p. 117	Proposition 9-2.1	df-enq 10840  enqer 10850
[Gleason] p. 117	Proposition 9-2.2	df-1nq 10845  df-nq 10841
[Gleason] p. 117	Proposition 9-2.3	df-plpq 10837  df-plq 10843
[Gleason] p. 119	Proposition 9-2.4	caovmo 7606  df-mpq 10838  df-mq 10844
[Gleason] p. 119	Proposition 9-2.5	df-rq 10846
[Gleason] p. 119	Proposition 9-2.6	ltexnq 10904
[Gleason] p. 120	Proposition 9-2.6(i)	halfnq 10905  ltbtwnnq 10907
[Gleason] p. 120	Proposition 9-2.6(ii)	ltanq 10900
[Gleason] p. 120	Proposition 9-2.6(iii)	ltmnq 10901
[Gleason] p. 120	Proposition 9-2.6(iv)	ltrnq 10908
[Gleason] p. 121	Definition 9-3.1	df-np 10910
[Gleason] p. 121	Definition 9-3.1 (ii)	prcdnq 10922
[Gleason] p. 121	Definition 9-3.1(iii)	prnmax 10924
[Gleason] p. 122	Definition	df-1p 10911
[Gleason] p. 122	Remark (1)	prub 10923
[Gleason] p. 122	Lemma 9-3.4	prlem934 10962
[Gleason] p. 122	Proposition 9-3.2	df-ltp 10914
[Gleason] p. 122	Proposition 9-3.3	ltsopr 10961  psslinpr 10960  supexpr 10983  suplem1pr 10981  suplem2pr 10982
[Gleason] p. 123	Proposition 9-3.5	addclpr 10947  addclprlem1 10945  addclprlem2 10946  df-plp 10912
[Gleason] p. 123	Proposition 9-3.5(i)	addasspr 10951
[Gleason] p. 123	Proposition 9-3.5(ii)	addcompr 10950
[Gleason] p. 123	Proposition 9-3.5(iii)	ltaddpr 10963
[Gleason] p. 123	Proposition 9-3.5(iv)	ltexpri 10972  ltexprlem1 10965  ltexprlem2 10966  ltexprlem3 10967  ltexprlem4 10968  ltexprlem5 10969  ltexprlem6 10970  ltexprlem7 10971
[Gleason] p. 123	Proposition 9-3.5(v)	ltapr 10974  ltaprlem 10973
[Gleason] p. 123	Proposition 9-3.5(vi)	addcanpr 10975
[Gleason] p. 124	Lemma 9-3.6	prlem936 10976
[Gleason] p. 124	Proposition 9-3.7	df-mp 10913  mulclpr 10949  mulclprlem 10948  reclem2pr 10977
[Gleason] p. 124	Theorem 9-3.7(iv)	1idpr 10958
[Gleason] p. 124	Proposition 9-3.7(i)	mulasspr 10953
[Gleason] p. 124	Proposition 9-3.7(ii)	mulcompr 10952
[Gleason] p. 124	Proposition 9-3.7(iii)	distrpr 10957
[Gleason] p. 124	Proposition 9-3.7(v)	recexpr 10980  reclem3pr 10978  reclem4pr 10979
[Gleason] p. 126	Proposition 9-4.1	df-enr 10984  enrer 10992
[Gleason] p. 126	Proposition 9-4.2	df-0r 10989  df-1r 10990  df-nr 10985
[Gleason] p. 126	Proposition 9-4.3	df-mr 10987  df-plr 10986  negexsr 11031  recexsr 11036  recexsrlem 11032
[Gleason] p. 127	Proposition 9-4.4	df-ltr 10988
[Gleason] p. 130	Proposition 10-1.3	creui 12157  creur 12156  cru 12154
[Gleason] p. 130	Definition 10-1.1(v)	ax-cnre 11117  axcnre 11093
[Gleason] p. 132	Definition 10-3.1	crim 15057  crimd 15174  crimi 15135  crre 15056  crred 15173  crrei 15134
[Gleason] p. 132	Definition 10-3.2	remim 15059  remimd 15140
[Gleason] p. 133	Definition 10.36	absval2 15226  absval2d 15390  absval2i 15340
[Gleason] p. 133	Proposition 10-3.4(a)	cjadd 15083  cjaddd 15162  cjaddi 15130
[Gleason] p. 133	Proposition 10-3.4(c)	cjmul 15084  cjmuld 15163  cjmuli 15131
[Gleason] p. 133	Proposition 10-3.4(e)	cjcj 15082  cjcjd 15141  cjcji 15113
[Gleason] p. 133	Proposition 10-3.4(f)	cjre 15081  cjreb 15065  cjrebd 15144  cjrebi 15116  cjred 15168  rere 15064  rereb 15062  rerebd 15143  rerebi 15115  rered 15166
[Gleason] p. 133	Proposition 10-3.4(h)	addcj 15090  addcjd 15154  addcji 15125
[Gleason] p. 133	Proposition 10-3.7(a)	absval 15180
[Gleason] p. 133	Proposition 10-3.7(b)	abscj 15221  abscjd 15395  abscji 15344
[Gleason] p. 133	Proposition 10-3.7(c)	abs00 15231  abs00d 15391  abs00i 15341  absne0d 15392
[Gleason] p. 133	Proposition 10-3.7(d)	releabs 15264  releabsd 15396  releabsi 15345
[Gleason] p. 133	Proposition 10-3.7(f)	absmul 15236  absmuld 15399  absmuli 15347
[Gleason] p. 133	Proposition 10-3.7(g)	sqabsadd 15224  sqabsaddi 15348
[Gleason] p. 133	Proposition 10-3.7(h)	abstri 15273  abstrid 15401  abstrii 15351
[Gleason] p. 134	Definition 10-4.1	df-exp 14003  exp0 14006  expp1 14009  expp1d 14088
[Gleason] p. 135	Proposition 10-4.2(a)	cxpadd 26621  cxpaddd 26659  expadd 14045  expaddd 14089  expaddz 14047
[Gleason] p. 135	Proposition 10-4.2(b)	cxpmul 26630  cxpmuld 26679  expmul 14048  expmuld 14090  expmulz 14049
[Gleason] p. 135	Proposition 10-4.2(c)	mulcxp 26627  mulcxpd 26670  mulexp 14042  mulexpd 14102  mulexpz 14043
[Gleason] p. 140	Exercise 1	znnen 16156
[Gleason] p. 141	Definition 11-2.1	fzval 13446
[Gleason] p. 168	Proposition 12-2.1(a)	climadd 15574  rlimadd 15585  rlimdiv 15588
[Gleason] p. 168	Proposition 12-2.1(b)	climsub 15576  rlimsub 15586
[Gleason] p. 168	Proposition 12-2.1(c)	climmul 15575  rlimmul 15587
[Gleason] p. 171	Corollary 12-2.2	climmulc2 15579
[Gleason] p. 172	Corollary 12-2.5	climrecl 15525
[Gleason] p. 172	Proposition 12-2.4(c)	climabs 15546  climcj 15547  climim 15549  climre 15548  rlimabs 15551  rlimcj 15552  rlimim 15554  rlimre 15553
[Gleason] p. 173	Definition 12-3.1	df-ltxr 11189  df-xr 11188  ltxr 13051
[Gleason] p. 175	Definition 12-4.1	df-limsup 15413  limsupval 15416
[Gleason] p. 180	Theorem 12-5.1	climsup 15612
[Gleason] p. 180	Theorem 12-5.3	caucvg 15621  caucvgb 15622  caucvgbf 45478  caucvgr 15618  climcau 15613
[Gleason] p. 182	Exercise 3	cvgcmp 15758
[Gleason] p. 182	Exercise 4	cvgrat 15825
[Gleason] p. 195	Theorem 13-2.12	abs1m 15278
[Gleason] p. 217	Lemma 13-4.1	btwnzge0 13766
[Gleason] p. 223	Definition 14-1.1	df-met 21290
[Gleason] p. 223	Definition 14-1.1(a)	met0 24264  xmet0 24263
[Gleason] p. 223	Definition 14-1.1(b)	metgt0 24280
[Gleason] p. 223	Definition 14-1.1(c)	metsym 24271
[Gleason] p. 223	Definition 14-1.1(d)	mettri 24273  mstri 24390  xmettri 24272  xmstri 24389
[Gleason] p. 225	Definition 14-1.5	xpsmet 24303
[Gleason] p. 230	Proposition 14-2.6	txlm 23568
[Gleason] p. 240	Theorem 14-4.3	metcnp4 25243
[Gleason] p. 240	Proposition 14-4.2	metcnp3 24461
[Gleason] p. 243	Proposition 14-4.16	addcn 24787  addcn2 15536  mulcn 24789  mulcn2 15538  subcn 24788  subcn2 15537
[Gleason] p. 295	Remark	bcval3 14247  bcval4 14248
[Gleason] p. 295	Equation 2	bcpasc 14262
[Gleason] p. 295	Definition of binomial coefficient	bcval 14245  df-bc 14244
[Gleason] p. 296	Remark	bcn0 14251  bcnn 14253
[Gleason] p. 296	Theorem 15-2.8	binom 15772
[Gleason] p. 308	Equation 2	ef0 16033
[Gleason] p. 308	Equation 3	efcj 16034
[Gleason] p. 309	Corollary 15-4.3	efne0 16040
[Gleason] p. 309	Corollary 15-4.4	efexp 16045
[Gleason] p. 310	Equation 14	sinadd 16108
[Gleason] p. 310	Equation 15	cosadd 16109
[Gleason] p. 311	Equation 17	sincossq 16120
[Gleason] p. 311	Equation 18	cosbnd 16125  sinbnd 16124
[Gleason] p. 311	Lemma 15-4.7	sqeqor 14157  sqeqori 14155
[Gleason] p. 311	Definition of ` `	df-pi 16014
[Godowski] p. 730	Equation SF	goeqi 32252
[GodowskiGreechie] p. 249	Equation IV	3oai 31647
[Golan] p. 1	Remark	srgisid 20129
[Golan] p. 1	Definition	df-srg 20107
[Golan] p. 149	Definition	df-slmd 33170
[Gonshor] p. 7	Definition	df-scut 27729
[Gonshor] p. 9	Theorem 2.5	slerec 27765  slerecd 27766
[Gonshor] p. 10	Theorem 2.6	cofcut1 27868  cofcut1d 27869
[Gonshor] p. 10	Theorem 2.7	cofcut2 27870  cofcut2d 27871
[Gonshor] p. 12	Theorem 2.9	cofcutr 27872  cofcutr1d 27873  cofcutr2d 27874
[Gonshor] p. 13	Definition	df-adds 27907
[Gonshor] p. 14	Theorem 3.1	addsprop 27923
[Gonshor] p. 15	Theorem 3.2	addsunif 27949
[Gonshor] p. 17	Theorem 3.4	mulsprop 28073
[Gonshor] p. 18	Theorem 3.5	mulsunif 28093
[Gonshor] p. 28	Lemma 4.2	halfcut 28381
[Gonshor] p. 28	Theorem 4.2	pw2cut 28383
[Gonshor] p. 30	Theorem 4.2	addhalfcut 28382
[Gonshor] p. 95	Theorem 6.1	addsbday 27964
[GramKnuthPat], p. 47	Definition 2.42	df-fwddif 36140
[Gratzer] p. 23	Section 0.6	df-mre 17523
[Gratzer] p. 27	Section 0.6	df-mri 17525
[Hall] p. 1	Section 1.1	df-asslaw 48169  df-cllaw 48167  df-comlaw 48168
[Hall] p. 2	Section 1.2	df-clintop 48181
[Hall] p. 7	Section 1.3	df-sgrp2 48202
[Halmos] p. 28	Partition ` `	df-parts 38750  dfmembpart2 38755
[Halmos] p. 31	Theorem 17.3	riesz1 32044  riesz2 32045
[Halmos] p. 41	Definition of Hermitian	hmopadj2 31920
[Halmos] p. 42	Definition of projector ordering	pjordi 32152
[Halmos] p. 43	Theorem 26.1	elpjhmop 32164  elpjidm 32163  pjnmopi 32127
[Halmos] p. 44	Remark	pjinormi 31666  pjinormii 31655
[Halmos] p. 44	Theorem 26.2	elpjch 32168  pjrn 31686  pjrni 31681  pjvec 31675
[Halmos] p. 44	Theorem 26.3	pjnorm2 31706
[Halmos] p. 44	Theorem 26.4	hmopidmpj 32133  hmopidmpji 32131
[Halmos] p. 45	Theorem 27.1	pjinvari 32170
[Halmos] p. 45	Theorem 27.3	pjoci 32159  pjocvec 31676
[Halmos] p. 45	Theorem 27.4	pjorthcoi 32148
[Halmos] p. 48	Theorem 29.2	pjssposi 32151
[Halmos] p. 48	Theorem 29.3	pjssdif1i 32154  pjssdif2i 32153
[Halmos] p. 50	Definition of spectrum	df-spec 31834
[Hamilton] p. 28	Definition 2.1	ax-1 6
[Hamilton] p. 31	Example 2.7(a)	idALT 23
[Hamilton] p. 73	Rule 1	ax-mp 5
[Hamilton] p. 74	Rule 2	ax-gen 1795
[Hatcher] p. 25	Definition	df-phtpc 24924  df-phtpy 24903
[Hatcher] p. 26	Definition	df-pco 24938  df-pi1 24941
[Hatcher] p. 26	Proposition 1.2	phtpcer 24927
[Hatcher] p. 26	Proposition 1.3	pi1grp 24983
[Hefferon] p. 240	Definition 3.12	df-dmat 22410  df-dmatalt 48380
[Helfgott] p. 2	Theorem	tgoldbach 47811
[Helfgott] p. 4	Corollary 1.1	wtgoldbnnsum4prm 47796
[Helfgott] p. 4	Section 1.2.2	ax-hgprmladder 47808  bgoldbtbnd 47803  bgoldbtbnd 47803  tgblthelfgott 47809
[Helfgott] p. 5	Proposition 1.1	circlevma 34626
[Helfgott] p. 69	Statement 7.49	circlemethhgt 34627
[Helfgott] p. 69	Statement 7.50	hgt750lema 34641  hgt750lemb 34640  hgt750leme 34642  hgt750lemf 34637  hgt750lemg 34638
[Helfgott] p. 70	Section 7.4	ax-tgoldbachgt 47805  tgoldbachgt 34647  tgoldbachgtALTV 47806  tgoldbachgtd 34646
[Helfgott] p. 70	Statement 7.49	ax-hgt749 34628
[Herstein] p. 54	Exercise 28	df-grpo 30472
[Herstein] p. 55	Lemma 2.2.1(a)	grpideu 18858  grpoideu 30488  mndideu 18654
[Herstein] p. 55	Lemma 2.2.1(b)	grpinveu 18888  grpoinveu 30498
[Herstein] p. 55	Lemma 2.2.1(c)	grpinvinv 18919  grpo2inv 30510
[Herstein] p. 55	Lemma 2.2.1(d)	grpinvadd 18932  grpoinvop 30512
[Herstein] p. 57	Exercise 1	dfgrp3e 18954
[Hitchcock] p. 5	Rule A3	mptnan 1768
[Hitchcock] p. 5	Rule A4	mptxor 1769
[Hitchcock] p. 5	Rule A5	mtpxor 1771
[Holland] p. 1519	Theorem 2	sumdmdi 32399
[Holland] p. 1520	Lemma 5	cdj1i 32412  cdj3i 32420  cdj3lem1 32413  cdjreui 32411
[Holland] p. 1524	Lemma 7	mddmdin0i 32410
[Holland95] p. 13	Theorem 3.6	hlathil 41948
[Holland95] p. 14	Line 15	hgmapvs 41878
[Holland95] p. 14	Line 16	hdmaplkr 41900
[Holland95] p. 14	Line 17	hdmapellkr 41901
[Holland95] p. 14	Line 19	hdmapglnm2 41898
[Holland95] p. 14	Line 20	hdmapip0com 41904
[Holland95] p. 14	Theorem 3.6	hdmapevec2 41823
[Holland95] p. 14	Lines 24 and 25	hdmapoc 41918
[Holland95] p. 204	Definition of involution	df-srng 20760
[Holland95] p. 212	Definition of subspace	df-psubsp 39490
[Holland95] p. 214	Lemma 3.3	lclkrlem2v 41515
[Holland95] p. 214	Definition 3.2	df-lpolN 41468
[Holland95] p. 214	Definition of nonsingular	pnonsingN 39920
[Holland95] p. 215	Lemma 3.3(1)	dihoml4 41364  poml4N 39940
[Holland95] p. 215	Lemma 3.3(2)	dochexmid 41455  pexmidALTN 39965  pexmidN 39956
[Holland95] p. 218	Theorem 3.6	lclkr 41520
[Holland95] p. 218	Definition of dual vector space	df-ldual 39110  ldualset 39111
[Holland95] p. 222	Item 1	df-lines 39488  df-pointsN 39489
[Holland95] p. 222	Item 2	df-polarityN 39890
[Holland95] p. 223	Remark	ispsubcl2N 39934  omllaw4 39232  pol1N 39897  polcon3N 39904
[Holland95] p. 223	Definition	df-psubclN 39922
[Holland95] p. 223	Equation for polarity	polval2N 39893
[Holmes] p. 40	Definition	df-xrn 38346
[Hughes] p. 44	Equation 1.21b	ax-his3 31063
[Hughes] p. 47	Definition of projection operator	dfpjop 32161
[Hughes] p. 49	Equation 1.30	eighmre 31942  eigre 31814  eigrei 31813
[Hughes] p. 49	Equation 1.31	eighmorth 31943  eigorth 31817  eigorthi 31816
[Hughes] p. 137	Remark (ii)	eigposi 31815
[Huneke] p. 1	Claim 1	frgrncvvdeq 30288
[Huneke] p. 1	Statement 1	frgrncvvdeqlem7 30284
[Huneke] p. 1	Statement 2	frgrncvvdeqlem8 30285
[Huneke] p. 1	Statement 3	frgrncvvdeqlem9 30286
[Huneke] p. 2	Claim 2	frgrregorufr 30304  frgrregorufr0 30303  frgrregorufrg 30305
[Huneke] p. 2	Claim 3	frgrhash2wsp 30311  frrusgrord 30320  frrusgrord0 30319
[Huneke] p. 2	Statement	df-clwwlknon 30067
[Huneke] p. 2	Statement 4	frgrwopreglem4 30294
[Huneke] p. 2	Statement 5	frgrwopreg1 30297  frgrwopreg2 30298  frgrwopregasn 30295  frgrwopregbsn 30296
[Huneke] p. 2	Statement 6	frgrwopreglem5 30300
[Huneke] p. 2	Statement 7	fusgreghash2wspv 30314
[Huneke] p. 2	Statement 8	fusgreghash2wsp 30317
[Huneke] p. 2	Statement 9	clwlksndivn 30065  numclwlk1 30350  numclwlk1lem1 30348  numclwlk1lem2 30349  numclwwlk1 30340  numclwwlk8 30371
[Huneke] p. 2	Definition 3	frgrwopreglem1 30291
[Huneke] p. 2	Definition 4	df-clwlks 29751
[Huneke] p. 2	Definition 6	2clwwlk 30326
[Huneke] p. 2	Definition 7	numclwwlkovh 30352  numclwwlkovh0 30351
[Huneke] p. 2	Statement 10	numclwwlk2 30360
[Huneke] p. 2	Statement 11	rusgrnumwlkg 29957
[Huneke] p. 2	Statement 12	numclwwlk3 30364
[Huneke] p. 2	Statement 13	numclwwlk5 30367
[Huneke] p. 2	Statement 14	numclwwlk7 30370
[Indrzejczak] p. 33	Definition ` `E	natded 30382  natded 30382
[Indrzejczak] p. 33	Definition ` `I	natded 30382
[Indrzejczak] p. 34	Definition ` `E	natded 30382  natded 30382
[Indrzejczak] p. 34	Definition ` `I	natded 30382
[Jech] p. 4	Definition of class	cv 1539  cvjust 2723
[Jech] p. 42	Lemma 6.1	alephexp1 10508
[Jech] p. 42	Equation 6.1	alephadd 10506  alephmul 10507
[Jech] p. 43	Lemma 6.2	infmap 10505  infmap2 10146
[Jech] p. 71	Lemma 9.3	jech9.3 9743
[Jech] p. 72	Equation 9.3	scott0 9815  scottex 9814
[Jech] p. 72	Exercise 9.1	rankval4 9796
[Jech] p. 72	Scheme "Collection Principle"	cp 9820
[Jech] p. 78	Note	opthprc 5695
[JonesMatijasevic] p. 694	Definition 2.3	rmxyval 42897
[JonesMatijasevic] p. 695	Lemma 2.15	jm2.15nn0 42985
[JonesMatijasevic] p. 695	Lemma 2.16	jm2.16nn0 42986
[JonesMatijasevic] p. 695	Equation 2.7	rmxadd 42909
[JonesMatijasevic] p. 695	Equation 2.8	rmyadd 42913
[JonesMatijasevic] p. 695	Equation 2.9	rmxp1 42914  rmyp1 42915
[JonesMatijasevic] p. 695	Equation 2.10	rmxm1 42916  rmym1 42917
[JonesMatijasevic] p. 695	Equation 2.11	rmx0 42907  rmx1 42908  rmxluc 42918
[JonesMatijasevic] p. 695	Equation 2.12	rmy0 42911  rmy1 42912  rmyluc 42919
[JonesMatijasevic] p. 695	Equation 2.13	rmxdbl 42921
[JonesMatijasevic] p. 695	Equation 2.14	rmydbl 42922
[JonesMatijasevic] p. 696	Lemma 2.17	jm2.17a 42942  jm2.17b 42943  jm2.17c 42944
[JonesMatijasevic] p. 696	Lemma 2.19	jm2.19 42975
[JonesMatijasevic] p. 696	Lemma 2.20	jm2.20nn 42979
[JonesMatijasevic] p. 696	Theorem 2.18	jm2.18 42970
[JonesMatijasevic] p. 697	Lemma 2.24	jm2.24 42945  jm2.24nn 42941
[JonesMatijasevic] p. 697	Lemma 2.26	jm2.26 42984
[JonesMatijasevic] p. 697	Lemma 2.27	jm2.27 42990  rmygeid 42946
[JonesMatijasevic] p. 698	Lemma 3.1	jm3.1 43002
[Juillerat] p. 11	Section *5	etransc 46274  etransclem47 46272  etransclem48 46273
[Juillerat] p. 12	Equation (7)	etransclem44 46269
[Juillerat] p. 12	Equation *(7)	etransclem46 46271
[Juillerat] p. 12	Proof of the derivative calculated	etransclem32 46257
[Juillerat] p. 13	Proof	etransclem35 46260
[Juillerat] p. 13	Part of case 2 proven in	etransclem38 46263
[Juillerat] p. 13	Part of case 2 proven	etransclem24 46249
[Juillerat] p. 13	Part of case 2: proven in	etransclem41 46266
[Juillerat] p. 14	Proof	etransclem23 46248
[KalishMontague] p. 81	Note 1	ax-6 1967
[KalishMontague] p. 85	Lemma 2	equid 2012
[KalishMontague] p. 85	Lemma 3	equcomi 2017
[KalishMontague] p. 86	Lemma 7	cbvalivw 2007  cbvaliw 2006  wl-cbvmotv 37494  wl-motae 37496  wl-moteq 37495
[KalishMontague] p. 87	Lemma 8	spimvw 1986  spimw 1970
[KalishMontague] p. 87	Lemma 9	spfw 2033  spw 2034
[Kalmbach] p. 14	Definition of lattice	chabs1 31495  chabs1i 31497  chabs2 31496  chabs2i 31498  chjass 31512  chjassi 31465  latabs1 18416  latabs2 18417
[Kalmbach] p. 15	Definition of atom	df-at 32317  ela 32318
[Kalmbach] p. 15	Definition of covers	cvbr2 32262  cvrval2 39260
[Kalmbach] p. 16	Definition	df-ol 39164  df-oml 39165
[Kalmbach] p. 20	Definition of commutes	cmbr 31563  cmbri 31569  cmtvalN 39197  df-cm 31562  df-cmtN 39163
[Kalmbach] p. 22	Remark	omllaw5N 39233  pjoml5 31592  pjoml5i 31567
[Kalmbach] p. 22	Definition	pjoml2 31590  pjoml2i 31564
[Kalmbach] p. 22	Theorem 2(v)	cmcm 31593  cmcmi 31571  cmcmii 31576  cmtcomN 39235
[Kalmbach] p. 22	Theorem 2(ii)	omllaw3 39231  omlsi 31383  pjoml 31415  pjomli 31414
[Kalmbach] p. 22	Definition of OML law	omllaw2N 39230
[Kalmbach] p. 23	Remark	cmbr2i 31575  cmcm3 31594  cmcm3i 31573  cmcm3ii 31578  cmcm4i 31574  cmt3N 39237  cmt4N 39238  cmtbr2N 39239
[Kalmbach] p. 23	Lemma 3	cmbr3 31587  cmbr3i 31579  cmtbr3N 39240
[Kalmbach] p. 25	Theorem 5	fh1 31597  fh1i 31600  fh2 31598  fh2i 31601  omlfh1N 39244
[Kalmbach] p. 65	Remark	chjatom 32336  chslej 31477  chsleji 31437  shslej 31359  shsleji 31349
[Kalmbach] p. 65	Proposition 1	chocin 31474  chocini 31433  chsupcl 31319  chsupval2 31389  h0elch 31234  helch 31222  hsupval2 31388  ocin 31275  ococss 31272  shococss 31273
[Kalmbach] p. 65	Definition of subspace sum	shsval 31291
[Kalmbach] p. 66	Remark	df-pjh 31374  pjssmi 32144  pjssmii 31660
[Kalmbach] p. 67	Lemma 3	osum 31624  osumi 31621
[Kalmbach] p. 67	Lemma 4	pjci 32179
[Kalmbach] p. 103	Exercise 6	atmd2 32379
[Kalmbach] p. 103	Exercise 12	mdsl0 32289
[Kalmbach] p. 140	Remark	hatomic 32339  hatomici 32338  hatomistici 32341
[Kalmbach] p. 140	Proposition 1	atlatmstc 39305
[Kalmbach] p. 140	Proposition 1(i)	atexch 32360  lsatexch 39029
[Kalmbach] p. 140	Proposition 1(ii)	chcv1 32334  cvlcvr1 39325  cvr1 39397
[Kalmbach] p. 140	Proposition 1(iii)	cvexch 32353  cvexchi 32348  cvrexch 39407
[Kalmbach] p. 149	Remark 2	chrelati 32343  hlrelat 39389  hlrelat5N 39388  lrelat 39000
[Kalmbach] p. 153	Exercise 5	lsmcv 21083  lsmsatcv 38996  spansncv 31632  spansncvi 31631
[Kalmbach] p. 153	Proposition 1(ii)	lsmcv2 39015  spansncv2 32272
[Kalmbach] p. 266	Definition	df-st 32190
[Kalmbach2] p. 8	Definition of adjoint	df-adjh 31828
[KanamoriPincus] p. 415	Theorem 1.1	fpwwe 10575  fpwwe2 10572
[KanamoriPincus] p. 416	Corollary 1.3	canth4 10576
[KanamoriPincus] p. 417	Corollary 1.6	canthp1 10583
[KanamoriPincus] p. 417	Corollary 1.4(a)	canthnum 10578
[KanamoriPincus] p. 417	Corollary 1.4(b)	canthwe 10580
[KanamoriPincus] p. 418	Proposition 1.7	pwfseq 10593
[KanamoriPincus] p. 419	Lemma 2.2	gchdjuidm 10597  gchxpidm 10598
[KanamoriPincus] p. 419	Theorem 2.1	gchacg 10609  gchhar 10608
[KanamoriPincus] p. 420	Lemma 2.3	pwdjudom 10144  unxpwdom 9518
[KanamoriPincus] p. 421	Proposition 3.1	gchpwdom 10599
[Kreyszig] p. 3	Property M1	metcl 24253  xmetcl 24252
[Kreyszig] p. 4	Property M2	meteq0 24260
[Kreyszig] p. 8	Definition 1.1-8	dscmet 24493
[Kreyszig] p. 12	Equation 5	conjmul 11875  muleqadd 11798
[Kreyszig] p. 18	Definition 1.3-2	mopnval 24359
[Kreyszig] p. 19	Remark	mopntopon 24360
[Kreyszig] p. 19	Theorem T1	mopn0 24419  mopnm 24365
[Kreyszig] p. 19	Theorem T2	unimopn 24417
[Kreyszig] p. 19	Definition of neighborhood	neibl 24422
[Kreyszig] p. 20	Definition 1.3-3	metcnp2 24463
[Kreyszig] p. 25	Definition 1.4-1	lmbr 23178  lmmbr 25191  lmmbr2 25192
[Kreyszig] p. 26	Lemma 1.4-2(a)	lmmo 23300
[Kreyszig] p. 28	Theorem 1.4-5	lmcau 25246
[Kreyszig] p. 28	Definition 1.4-3	iscau 25209  iscmet2 25227
[Kreyszig] p. 30	Theorem 1.4-7	cmetss 25249
[Kreyszig] p. 30	Theorem 1.4-6(a)	1stcelcls 23381  metelcls 25238
[Kreyszig] p. 30	Theorem 1.4-6(b)	metcld 25239  metcld2 25240
[Kreyszig] p. 51	Equation 2	clmvneg1 25032  lmodvneg1 20843  nvinv 30618  vcm 30555
[Kreyszig] p. 51	Equation 1a	clm0vs 25028  lmod0vs 20833  slmd0vs 33193  vc0 30553
[Kreyszig] p. 51	Equation 1b	lmodvs0 20834  slmdvs0 33194  vcz 30554
[Kreyszig] p. 58	Definition 2.2-1	imsmet 30670  ngpmet 24524  nrmmetd 24495
[Kreyszig] p. 59	Equation 1	imsdval 30665  imsdval2 30666  ncvspds 25094  ngpds 24525
[Kreyszig] p. 63	Problem 1	nmval 24510  nvnd 30667
[Kreyszig] p. 64	Problem 2	nmeq0 24539  nmge0 24538  nvge0 30652  nvz 30648
[Kreyszig] p. 64	Problem 3	nmrtri 24545  nvabs 30651
[Kreyszig] p. 91	Definition 2.7-1	isblo3i 30780
[Kreyszig] p. 92	Equation 2	df-nmoo 30724
[Kreyszig] p. 97	Theorem 2.7-9(a)	blocn 30786  blocni 30784
[Kreyszig] p. 97	Theorem 2.7-9(b)	lnocni 30785
[Kreyszig] p. 129	Definition 3.1-1	cphipeq0 25137  ipeq0 21580  ipz 30698
[Kreyszig] p. 135	Problem 2	cphpyth 25149  pythi 30829
[Kreyszig] p. 137	Lemma 3-2.1(a)	sii 30833
[Kreyszig] p. 137	Lemma 3.2-1(a)	ipcau 25171
[Kreyszig] p. 144	Equation 4	supcvg 15798
[Kreyszig] p. 144	Theorem 3.3-1	minvec 25369  minveco 30863
[Kreyszig] p. 196	Definition 3.9-1	df-aj 30729
[Kreyszig] p. 247	Theorem 4.7-2	bcth 25262
[Kreyszig] p. 249	Theorem 4.7-3	ubth 30852
[Kreyszig] p. 470	Definition of positive operator ordering	leop 32102  leopg 32101
[Kreyszig] p. 476	Theorem 9.4-2	opsqrlem2 32120
[Kreyszig] p. 525	Theorem 10.1-1	htth 30897
[Kulpa] p. 547	Theorem	poimir 37640
[Kulpa] p. 547	Equation (1)	poimirlem32 37639
[Kulpa] p. 547	Equation (2)	poimirlem31 37638
[Kulpa] p. 548	Theorem	broucube 37641
[Kulpa] p. 548	Equation (6)	poimirlem26 37633
[Kulpa] p. 548	Equation (7)	poimirlem27 37634
[Kunen] p. 10	Axiom 0	ax6e 2381  axnul 5255
[Kunen] p. 11	Axiom 3	axnul 5255
[Kunen] p. 12	Axiom 6	zfrep6 7913
[Kunen] p. 24	Definition 10.24	mapval 8788  mapvalg 8786
[Kunen] p. 30	Lemma 10.20	fodomg 10451
[Kunen] p. 31	Definition 10.24	mapex 7897
[Kunen] p. 95	Definition 2.1	df-r1 9693
[Kunen] p. 97	Lemma 2.10	r1elss 9735  r1elssi 9734
[Kunen] p. 107	Exercise 4	rankop 9787  rankopb 9781  rankuni 9792  rankxplim 9808  rankxpsuc 9811
[Kunen2] p. 47	Lemma I.9.9	relpfr 44937
[Kunen2] p. 53	Lemma I.9.21	trfr 44945
[Kunen2] p. 53	Lemma I.9.24(2)	wffr 44944
[Kunen2] p. 53	Definition I.9.20	tcfr 44946
[Kunen2] p. 95	Lemma I.16.2	ralabso 44951  rexabso 44952
[Kunen2] p. 96	Example I.16.3	disjabso 44958  n0abso 44959  ssabso 44957
[Kunen2] p. 111	Lemma II.2.4(1)	traxext 44960
[Kunen2] p. 111	Lemma II.2.4(2)	sswfaxreg 44970
[Kunen2] p. 111	Lemma II.2.4(3)	ssclaxsep 44965
[Kunen2] p. 111	Lemma II.2.4(4)	prclaxpr 44968
[Kunen2] p. 111	Lemma II.2.4(5)	uniclaxun 44969
[Kunen2] p. 111	Lemma II.2.4(6)	modelaxrep 44964
[Kunen2] p. 112	Corollary II.2.5	wfaxext 44976  wfaxpr 44981  wfaxreg 44983  wfaxrep 44977  wfaxsep 44978  wfaxun 44982
[Kunen2] p. 113	Lemma II.2.8	pwclaxpow 44967
[Kunen2] p. 113	Corollary II.2.9	wfaxpow 44980
[Kunen2] p. 114	Theorem II.2.13	wfaxext 44976
[Kunen2] p. 114	Lemma II.2.11(7)	modelac8prim 44975  omelaxinf2 44972
[Kunen2] p. 114	Corollary II.2.12	wfac8prim 44985  wfaxinf2 44984
[Kunen2] p. 148	Exercise II.9.2	nregmodelf1o 44998  permaxext 44988  permaxinf2 44996  permaxnul 44991  permaxpow 44992  permaxpr 44993  permaxrep 44989  permaxsep 44990  permaxun 44994
[Kunen2] p. 148	Definition II.9.1	brpermmodel 44986
[Kunen2] p. 149	Exercise II.9.3	permac8prim 44997
[KuratowskiMostowski] p. 109	Section. Eq. 14	iuniin 4964
[Lang] , p. 225	Corollary 1.3	finexttrb 33653
[Lang] p.	Definition	df-rn 5642
[Lang] p. 3	Statement	lidrideqd 18578  mndbn0 18659
[Lang] p. 3	Definition	df-mnd 18644
[Lang] p. 4	Definition of a (finite) product	gsumsplit1r 18596
[Lang] p. 4	Property of composites. Second formula	gsumccat 18750
[Lang] p. 5	Equation	gsumreidx 19831
[Lang] p. 5	Definition of an (infinite) product	gsumfsupp 48163
[Lang] p. 6	Example	nn0mnd 48160
[Lang] p. 6	Equation	gsumxp2 19894
[Lang] p. 6	Statement	cycsubm 19116
[Lang] p. 6	Definition	mulgnn0gsum 18994
[Lang] p. 6	Observation	mndlsmidm 19584
[Lang] p. 7	Definition	dfgrp2e 18877
[Lang] p. 30	Definition	df-tocyc 33079
[Lang] p. 32	Property (a)	cyc3genpm 33124
[Lang] p. 32	Property (b)	cyc3conja 33129  cycpmconjv 33114
[Lang] p. 53	Definition	df-cat 17609
[Lang] p. 53	Axiom CAT 1	cat1 18039  cat1lem 18038
[Lang] p. 54	Definition	df-iso 17691
[Lang] p. 57	Definition	df-inito 17926  df-termo 17927
[Lang] p. 58	Example	irinitoringc 21421
[Lang] p. 58	Statement	initoeu1 17953  termoeu1 17960
[Lang] p. 62	Definition	df-func 17800
[Lang] p. 65	Definition	df-nat 17888
[Lang] p. 91	Note	df-ringc 20566
[Lang] p. 92	Statement	mxidlprm 33434
[Lang] p. 92	Definition	isprmidlc 33411
[Lang] p. 128	Remark	dsmmlmod 21687
[Lang] p. 129	Proof	lincscm 48412  lincscmcl 48414  lincsum 48411  lincsumcl 48413
[Lang] p. 129	Statement	lincolss 48416
[Lang] p. 129	Observation	dsmmfi 21680
[Lang] p. 141	Theorem 5.3	dimkerim 33616  qusdimsum 33617
[Lang] p. 141	Corollary 5.4	lssdimle 33596
[Lang] p. 147	Definition	snlindsntor 48453
[Lang] p. 504	Statement	mat1 22367  matring 22363
[Lang] p. 504	Definition	df-mamu 22311
[Lang] p. 505	Statement	mamuass 22322  mamutpos 22378  matassa 22364  mattposvs 22375  tposmap 22377
[Lang] p. 513	Definition	mdet1 22521  mdetf 22515
[Lang] p. 513	Theorem 4.4	cramer 22611
[Lang] p. 514	Proposition 4.6	mdetleib 22507
[Lang] p. 514	Proposition 4.8	mdettpos 22531
[Lang] p. 515	Definition	df-minmar1 22555  smadiadetr 22595
[Lang] p. 515	Corollary 4.9	mdetero 22530  mdetralt 22528
[Lang] p. 517	Proposition 4.15	mdetmul 22543
[Lang] p. 518	Definition	df-madu 22554
[Lang] p. 518	Proposition 4.16	madulid 22565  madurid 22564  matinv 22597
[Lang] p. 561	Theorem 3.1	cayleyhamilton 22810
[Lang], p. 224	Proposition 1.2	extdgmul 33652  fedgmul 33620
[Lang], p. 561	Remark	chpmatply1 22752
[Lang], p. 561	Definition	df-chpmat 22747
[LarsonHostetlerEdwards] p. 278	Section 4.1	dvconstbi 44316
[LarsonHostetlerEdwards] p. 311	Example 1a	lhe4.4ex1a 44311
[LarsonHostetlerEdwards] p. 375	Theorem 5.1	expgrowth 44317
[LeBlanc] p. 277	Rule R2	axnul 5255
[Levy] p. 12	Axiom 4.3.1	df-clab 2708
[Levy] p. 59	Definition	df-ttrcl 9637
[Levy] p. 64	Theorem 5.6(ii)	frinsg 9680
[Levy] p. 338	Axiom	df-clel 2803  df-cleq 2721
[Levy] p. 357	Proof sketch of conservativity; for details see Appendix	df-clel 2803  df-cleq 2721
[Levy] p. 357	Statements yield an eliminable and weakly (that is, object-level) conservative extension of FOL= plus ~ ax-ext , see Appendix	df-clab 2708
[Levy] p. 358	Axiom	df-clab 2708
[Levy58] p. 2	Definition I	isfin1-3 10315
[Levy58] p. 2	Definition II	df-fin2 10215
[Levy58] p. 2	Definition Ia	df-fin1a 10214
[Levy58] p. 2	Definition III	df-fin3 10217
[Levy58] p. 3	Definition V	df-fin5 10218
[Levy58] p. 3	Definition IV	df-fin4 10216
[Levy58] p. 4	Definition VI	df-fin6 10219
[Levy58] p. 4	Definition VII	df-fin7 10220
[Levy58], p. 3	Theorem 1	fin1a2 10344
[Lipparini] p. 3	Lemma 2.1.1	nosepssdm 27631
[Lipparini] p. 3	Lemma 2.1.4	noresle 27642
[Lipparini] p. 6	Proposition 4.2	noinfbnd1 27674  nosupbnd1 27659
[Lipparini] p. 6	Proposition 4.3	noinfbnd2 27676  nosupbnd2 27661
[Lipparini] p. 7	Theorem 5.1	noetasuplem3 27680  noetasuplem4 27681
[Lipparini] p. 7	Corollary 4.4	nosupinfsep 27677
[Lopez-Astorga] p. 12	Rule 1	mptnan 1768
[Lopez-Astorga] p. 12	Rule 2	mptxor 1769
[Lopez-Astorga] p. 12	Rule 3	mtpxor 1771
[Maeda] p. 167	Theorem 1(d) to (e)	mdsymlem6 32387
[Maeda] p. 168	Lemma 5	mdsym 32391  mdsymi 32390
[Maeda] p. 168	Lemma 4(i)	mdsymlem4 32385  mdsymlem6 32387  mdsymlem7 32388
[Maeda] p. 168	Lemma 4(ii)	mdsymlem8 32389
[MaedaMaeda] p. 1	Remark	ssdmd1 32292  ssdmd2 32293  ssmd1 32290  ssmd2 32291
[MaedaMaeda] p. 1	Lemma 1.2	mddmd2 32288
[MaedaMaeda] p. 1	Definition 1.1	df-dmd 32260  df-md 32259  mdbr 32273
[MaedaMaeda] p. 2	Lemma 1.3	mdsldmd1i 32310  mdslj1i 32298  mdslj2i 32299  mdslle1i 32296  mdslle2i 32297  mdslmd1i 32308  mdslmd2i 32309
[MaedaMaeda] p. 2	Lemma 1.4	mdsl1i 32300  mdsl2bi 32302  mdsl2i 32301
[MaedaMaeda] p. 2	Lemma 1.6	mdexchi 32314
[MaedaMaeda] p. 2	Lemma 1.5.1	mdslmd3i 32311
[MaedaMaeda] p. 2	Lemma 1.5.2	mdslmd4i 32312
[MaedaMaeda] p. 2	Lemma 1.5.3	mdsl0 32289
[MaedaMaeda] p. 2	Theorem 1.3	dmdsl3 32294  mdsl3 32295
[MaedaMaeda] p. 3	Theorem 1.9.1	csmdsymi 32313
[MaedaMaeda] p. 4	Theorem 1.14	mdcompli 32408
[MaedaMaeda] p. 30	Lemma 7.2	atlrelat1 39307  hlrelat1 39387
[MaedaMaeda] p. 31	Lemma 7.5	lcvexch 39025
[MaedaMaeda] p. 31	Lemma 7.5.1	cvmd 32315  cvmdi 32303  cvnbtwn4 32268  cvrnbtwn4 39265
[MaedaMaeda] p. 31	Lemma 7.5.2	cvdmd 32316
[MaedaMaeda] p. 31	Definition 7.4	cvlcvrp 39326  cvp 32354  cvrp 39403  lcvp 39026
[MaedaMaeda] p. 31	Theorem 7.6(b)	atmd 32378
[MaedaMaeda] p. 31	Theorem 7.6(c)	atdmd 32377
[MaedaMaeda] p. 32	Definition 7.8	cvlexch4N 39319  hlexch4N 39379
[MaedaMaeda] p. 34	Exercise 7.1	atabsi 32380
[MaedaMaeda] p. 41	Lemma 9.2(delta)	cvrat4 39430
[MaedaMaeda] p. 61	Definition 15.1	0psubN 39736  atpsubN 39740  df-pointsN 39489  pointpsubN 39738
[MaedaMaeda] p. 62	Theorem 15.5	df-pmap 39491  pmap11 39749  pmaple 39748  pmapsub 39755  pmapval 39744
[MaedaMaeda] p. 62	Theorem 15.5.1	pmap0 39752  pmap1N 39754
[MaedaMaeda] p. 62	Theorem 15.5.2	pmapglb 39757  pmapglb2N 39758  pmapglb2xN 39759  pmapglbx 39756
[MaedaMaeda] p. 63	Equation 15.5.3	pmapjoin 39839
[MaedaMaeda] p. 67	Postulate PS1	ps-1 39464
[MaedaMaeda] p. 68	Lemma 16.2	df-padd 39783  paddclN 39829  paddidm 39828
[MaedaMaeda] p. 68	Condition PS2	ps-2 39465
[MaedaMaeda] p. 68	Equation 16.2.1	paddass 39825
[MaedaMaeda] p. 69	Lemma 16.4	ps-1 39464
[MaedaMaeda] p. 69	Theorem 16.4	ps-2 39465
[MaedaMaeda] p. 70	Theorem 16.9	lsmmod 19589  lsmmod2 19590  lssats 38998  shatomici 32337  shatomistici 32340  shmodi 31369  shmodsi 31368
[MaedaMaeda] p. 130	Remark 29.6	dmdmd 32279  mdsymlem7 32388
[MaedaMaeda] p. 132	Theorem 29.13(e)	pjoml6i 31568
[MaedaMaeda] p. 136	Lemma 31.1.5	shjshseli 31472
[MaedaMaeda] p. 139	Remark	sumdmdii 32394
[Margaris] p. 40	Rule C	exlimiv 1930
[Margaris] p. 49	Axiom A1	ax-1 6
[Margaris] p. 49	Axiom A2	ax-2 7
[Margaris] p. 49	Axiom A3	ax-3 8
[Margaris] p. 49	Definition	df-an 396  df-ex 1780  df-or 848  dfbi2 474
[Margaris] p. 51	Theorem 1	idALT 23
[Margaris] p. 56	Theorem 3	conventions 30379
[Margaris] p. 59	Section 14	notnotrALTVD 44897
[Margaris] p. 60	Theorem 8	jcn 162
[Margaris] p. 60	Section 14	con3ALTVD 44898
[Margaris] p. 79	Rule C	exinst01 44608  exinst11 44609
[Margaris] p. 89	Theorem 19.2	19.2 1976  19.2g 2189  r19.2z 4454
[Margaris] p. 89	Theorem 19.3	19.3 2203  rr19.3v 3630
[Margaris] p. 89	Theorem 19.5	alcom 2160
[Margaris] p. 89	Theorem 19.6	alex 1826
[Margaris] p. 89	Theorem 19.7	alnex 1781
[Margaris] p. 89	Theorem 19.8	19.8a 2182
[Margaris] p. 89	Theorem 19.9	19.9 2206  19.9h 2286  exlimd 2219  exlimdh 2290
[Margaris] p. 89	Theorem 19.11	excom 2163  excomim 2164
[Margaris] p. 89	Theorem 19.12	19.12 2326
[Margaris] p. 90	Section 19	conventions-labels 30380  conventions-labels 30380  conventions-labels 30380  conventions-labels 30380
[Margaris] p. 90	Theorem 19.14	exnal 1827
[Margaris] p. 90	Theorem 19.15	2albi 44360  albi 1818
[Margaris] p. 90	Theorem 19.16	19.16 2226
[Margaris] p. 90	Theorem 19.17	19.17 2227
[Margaris] p. 90	Theorem 19.18	2exbi 44362  exbi 1847
[Margaris] p. 90	Theorem 19.19	19.19 2230
[Margaris] p. 90	Theorem 19.20	2alim 44359  2alimdv 1918  alimd 2213  alimdh 1817  alimdv 1916  ax-4 1809  ralimdaa 3236  ralimdv 3147  ralimdva 3145  ralimdvva 3182  sbcimdv 3819
[Margaris] p. 90	Theorem 19.21	19.21 2208  19.21h 2287  19.21t 2207  19.21vv 44358  alrimd 2216  alrimdd 2215  alrimdh 1863  alrimdv 1929  alrimi 2214  alrimih 1824  alrimiv 1927  alrimivv 1928  hbralrimi 3123  r19.21be 3228  r19.21bi 3227  ralrimd 3240  ralrimdv 3131  ralrimdva 3133  ralrimdvv 3179  ralrimdvva 3190  ralrimi 3233  ralrimia 3234  ralrimiv 3124  ralrimiva 3125  ralrimivv 3176  ralrimivva 3178  ralrimivvva 3181  ralrimivw 3129
[Margaris] p. 90	Theorem 19.22	2exim 44361  2eximdv 1919  exim 1834  eximd 2217  eximdh 1864  eximdv 1917  rexim 3070  reximd2a 3245  reximdai 3237  reximdd 45135  reximddv 3149  reximddv2 3194  reximddv3 3150  reximdv 3148  reximdv2 3143  reximdva 3146  reximdvai 3144  reximdvva 3183  reximi2 3062
[Margaris] p. 90	Theorem 19.23	19.23 2212  19.23bi 2192  19.23h 2288  19.23t 2211  exlimdv 1933  exlimdvv 1934  exlimexi 44507  exlimiv 1930  exlimivv 1932  rexlimd3 45131  rexlimdv 3132  rexlimdv3a 3138  rexlimdva 3134  rexlimdva2 3136  rexlimdvaa 3135  rexlimdvv 3191  rexlimdvva 3192  rexlimdvvva 3193  rexlimdvw 3139  rexlimiv 3127  rexlimiva 3126  rexlimivv 3177
[Margaris] p. 90	Theorem 19.24	19.24 1991
[Margaris] p. 90	Theorem 19.25	19.25 1880
[Margaris] p. 90	Theorem 19.26	19.26 1870
[Margaris] p. 90	Theorem 19.27	19.27 2228  r19.27z 4464  r19.27zv 4465
[Margaris] p. 90	Theorem 19.28	19.28 2229  19.28vv 44368  r19.28z 4457  r19.28zf 45146  r19.28zv 4460  rr19.28v 3631
[Margaris] p. 90	Theorem 19.29	19.29 1873  r19.29d2r 3120  r19.29imd 3098
[Margaris] p. 90	Theorem 19.30	19.30 1881
[Margaris] p. 90	Theorem 19.31	19.31 2235  19.31vv 44366
[Margaris] p. 90	Theorem 19.32	19.32 2234  r19.32 47092
[Margaris] p. 90	Theorem 19.33	19.33-2 44364  19.33 1884
[Margaris] p. 90	Theorem 19.34	19.34 1992
[Margaris] p. 90	Theorem 19.35	19.35 1877
[Margaris] p. 90	Theorem 19.36	19.36 2231  19.36vv 44365  r19.36zv 4466
[Margaris] p. 90	Theorem 19.37	19.37 2233  19.37vv 44367  r19.37zv 4461
[Margaris] p. 90	Theorem 19.38	19.38 1839
[Margaris] p. 90	Theorem 19.39	19.39 1990
[Margaris] p. 90	Theorem 19.40	19.40-2 1887  19.40 1886  r19.40 3099
[Margaris] p. 90	Theorem 19.41	19.41 2236  19.41rg 44533
[Margaris] p. 90	Theorem 19.42	19.42 2237
[Margaris] p. 90	Theorem 19.43	19.43 1882
[Margaris] p. 90	Theorem 19.44	19.44 2238  r19.44zv 4463
[Margaris] p. 90	Theorem 19.45	19.45 2239  r19.45zv 4462
[Margaris] p. 110	Exercise 2(b)	eu1 2603
[Mayet] p. 370	Remark	jpi 32249  largei 32246  stri 32236
[Mayet3] p. 9	Definition of CH-states	df-hst 32191  ishst 32193
[Mayet3] p. 10	Theorem	hstrbi 32245  hstri 32244
[Mayet3] p. 1223	Theorem 4.1	mayete3i 31707
[Mayet3] p. 1240	Theorem 7.1	mayetes3i 31708
[MegPav2000] p. 2344	Theorem 3.3	stcltrthi 32257
[MegPav2000] p. 2345	Definition 3.4-1	chintcl 31311  chsupcl 31319
[MegPav2000] p. 2345	Definition 3.4-2	hatomic 32339
[MegPav2000] p. 2345	Definition 3.4-3(a)	superpos 32333
[MegPav2000] p. 2345	Definition 3.4-3(b)	atexch 32360
[MegPav2000] p. 2366	Figure 7	pl42N 39970
[MegPav2002] p. 362	Lemma 2.2	latj31 18428  latj32 18426  latjass 18424
[Megill] p. 444	Axiom C5	ax-5 1910  ax5ALT 38893
[Megill] p. 444	Section 7	conventions 30379
[Megill] p. 445	Lemma L12	aecom-o 38887  ax-c11n 38874  axc11n 2424
[Megill] p. 446	Lemma L17	equtrr 2022
[Megill] p. 446	Lemma L18	ax6fromc10 38882
[Megill] p. 446	Lemma L19	hbnae-o 38914  hbnae 2430
[Megill] p. 447	Remark 9.1	dfsb1 2479  sbid 2256  sbidd-misc 49701  sbidd 49700
[Megill] p. 448	Remark 9.6	axc14 2461
[Megill] p. 448	Scheme C4'	ax-c4 38870
[Megill] p. 448	Scheme C5'	ax-c5 38869  sp 2184
[Megill] p. 448	Scheme C6'	ax-11 2158
[Megill] p. 448	Scheme C7'	ax-c7 38871
[Megill] p. 448	Scheme C8'	ax-7 2008
[Megill] p. 448	Scheme C9'	ax-c9 38876
[Megill] p. 448	Scheme C10'	ax-6 1967  ax-c10 38872
[Megill] p. 448	Scheme C11'	ax-c11 38873
[Megill] p. 448	Scheme C12'	ax-8 2111
[Megill] p. 448	Scheme C13'	ax-9 2119
[Megill] p. 448	Scheme C14'	ax-c14 38877
[Megill] p. 448	Scheme C15'	ax-c15 38875
[Megill] p. 448	Scheme C16'	ax-c16 38878
[Megill] p. 448	Theorem 9.4	dral1-o 38890  dral1 2437  dral2-o 38916  dral2 2436  drex1 2439  drex2 2440  drsb1 2493  drsb2 2267
[Megill] p. 449	Theorem 9.7	sbcom2 2174  sbequ 2084  sbid2v 2507
[Megill] p. 450	Example in Appendix	hba1-o 38883  hba1 2293
[Mendelson] p. 35	Axiom A3	hirstL-ax3 46886
[Mendelson] p. 36	Lemma 1.8	idALT 23
[Mendelson] p. 69	Axiom 4	rspsbc 3839  rspsbca 3840  stdpc4 2069
[Mendelson] p. 69	Axiom 5	ax-c4 38870  ra4 3846  stdpc5 2209
[Mendelson] p. 81	Rule C	exlimiv 1930
[Mendelson] p. 95	Axiom 6	stdpc6 2028
[Mendelson] p. 95	Axiom 7	stdpc7 2251
[Mendelson] p. 225	Axiom system NBG	ru 3748
[Mendelson] p. 230	Exercise 4.8(b)	opthwiener 5469
[Mendelson] p. 231	Exercise 4.10(k)	inv1 4357
[Mendelson] p. 231	Exercise 4.10(l)	unv 4358
[Mendelson] p. 231	Exercise 4.10(n)	dfin3 4236
[Mendelson] p. 231	Exercise 4.10(o)	df-nul 4293
[Mendelson] p. 231	Exercise 4.10(q)	dfin4 4237
[Mendelson] p. 231	Exercise 4.10(s)	ddif 4100
[Mendelson] p. 231	Definition of union	dfun3 4235
[Mendelson] p. 235	Exercise 4.12(c)	univ 5406
[Mendelson] p. 235	Exercise 4.12(d)	pwv 4864
[Mendelson] p. 235	Exercise 4.12(j)	pwin 5522
[Mendelson] p. 235	Exercise 4.12(k)	pwunss 4577
[Mendelson] p. 235	Exercise 4.12(l)	pwssun 5523
[Mendelson] p. 235	Exercise 4.12(n)	uniin 4891
[Mendelson] p. 235	Exercise 4.12(p)	reli 5780
[Mendelson] p. 235	Exercise 4.12(t)	relssdmrn 6229
[Mendelson] p. 244	Proposition 4.8(g)	epweon 7731
[Mendelson] p. 246	Definition of successor	df-suc 6326
[Mendelson] p. 250	Exercise 4.36	oelim2 8536
[Mendelson] p. 254	Proposition 4.22(b)	xpen 9081
[Mendelson] p. 254	Proposition 4.22(c)	xpsnen 9002  xpsneng 9003
[Mendelson] p. 254	Proposition 4.22(d)	xpcomen 9009  xpcomeng 9010
[Mendelson] p. 254	Proposition 4.22(e)	xpassen 9012
[Mendelson] p. 255	Definition	brsdom 8923
[Mendelson] p. 255	Exercise 4.39	endisj 9005
[Mendelson] p. 255	Exercise 4.41	mapprc 8780
[Mendelson] p. 255	Exercise 4.43	mapsnen 8985  mapsnend 8984
[Mendelson] p. 255	Exercise 4.45	mapunen 9087
[Mendelson] p. 255	Exercise 4.47	xpmapen 9086
[Mendelson] p. 255	Exercise 4.42(a)	map0e 8832
[Mendelson] p. 255	Exercise 4.42(b)	map1 8988
[Mendelson] p. 257	Proposition 4.24(a)	undom 9006
[Mendelson] p. 258	Exercise 4.56(c)	djuassen 10108  djucomen 10107
[Mendelson] p. 258	Exercise 4.56(f)	djudom1 10112
[Mendelson] p. 258	Exercise 4.56(g)	xp2dju 10106
[Mendelson] p. 266	Proposition 4.34(a)	oa1suc 8472
[Mendelson] p. 266	Proposition 4.34(f)	oaordex 8499
[Mendelson] p. 275	Proposition 4.42(d)	entri3 10488
[Mendelson] p. 281	Definition	df-r1 9693
[Mendelson] p. 281	Proposition 4.45 (b) to (a)	unir1 9742
[Mendelson] p. 287	Axiom system MK	ru 3748
[MertziosUnger] p. 152	Definition	df-frgr 30238
[MertziosUnger] p. 153	Remark 1	frgrconngr 30273
[MertziosUnger] p. 153	Remark 2	vdgn1frgrv2 30275  vdgn1frgrv3 30276
[MertziosUnger] p. 153	Remark 3	vdgfrgrgt2 30277
[MertziosUnger] p. 153	Proposition 1(a)	n4cyclfrgr 30270
[MertziosUnger] p. 153	Proposition 1(b)	2pthfrgr 30263  2pthfrgrrn 30261  2pthfrgrrn2 30262
[Mittelstaedt] p. 9	Definition	df-oc 31231
[Monk1] p. 22	Remark	conventions 30379
[Monk1] p. 22	Theorem 3.1	conventions 30379
[Monk1] p. 26	Theorem 2.8(vii)	ssin 4198
[Monk1] p. 33	Theorem 3.2(i)	ssrel 5737  ssrelf 32593
[Monk1] p. 33	Theorem 3.2(ii)	eqrel 5738
[Monk1] p. 34	Definition 3.3	df-opab 5165
[Monk1] p. 36	Theorem 3.7(i)	coi1 6223  coi2 6224
[Monk1] p. 36	Theorem 3.8(v)	dm0 5874  rn0 5879
[Monk1] p. 36	Theorem 3.7(ii)	cnvi 6102
[Monk1] p. 37	Theorem 3.13(i)	relxp 5649
[Monk1] p. 37	Theorem 3.13(x)	dmxp 5882  rnxp 6131
[Monk1] p. 37	Theorem 3.13(ii)	0xp 5729  xp0 6119
[Monk1] p. 38	Theorem 3.16(ii)	ima0 6037
[Monk1] p. 38	Theorem 3.16(viii)	imai 6034
[Monk1] p. 39	Theorem 3.17	imaex 7870  imaexg 7869
[Monk1] p. 39	Theorem 3.16(xi)	imassrn 6031
[Monk1] p. 41	Theorem 4.3(i)	fnopfv 7029  funfvop 7004
[Monk1] p. 42	Theorem 4.3(ii)	funopfvb 6897
[Monk1] p. 42	Theorem 4.4(iii)	fvelima 6908
[Monk1] p. 43	Theorem 4.6	funun 6546
[Monk1] p. 43	Theorem 4.8(iv)	dff13 7211  dff13f 7212
[Monk1] p. 46	Theorem 4.15(v)	funex 7175  funrnex 7912
[Monk1] p. 50	Definition 5.4	fniunfv 7203
[Monk1] p. 52	Theorem 5.12(ii)	op2ndb 6188
[Monk1] p. 52	Theorem 5.11(viii)	ssint 4924
[Monk1] p. 52	Definition 5.13 (i)	1stval2 7964  df-1st 7947
[Monk1] p. 52	Definition 5.13 (ii)	2ndval2 7965  df-2nd 7948
[Monk1] p. 112	Theorem 15.17(v)	ranksn 9783  ranksnb 9756
[Monk1] p. 112	Theorem 15.17(iv)	rankuni2 9784
[Monk1] p. 112	Theorem 15.17(iii)	rankun 9785  rankunb 9779
[Monk1] p. 113	Theorem 15.18	r1val3 9767
[Monk1] p. 113	Definition 15.19	df-r1 9693  r1val2 9766
[Monk1] p. 117	Lemma	zorn2 10435  zorn2g 10432
[Monk1] p. 133	Theorem 18.11	cardom 9915
[Monk1] p. 133	Theorem 18.12	canth3 10490
[Monk1] p. 133	Theorem 18.14	carduni 9910
[Monk2] p. 105	Axiom C4	ax-4 1809
[Monk2] p. 105	Axiom C7	ax-7 2008
[Monk2] p. 105	Axiom C8	ax-12 2178  ax-c15 38875  ax12v2 2180
[Monk2] p. 108	Lemma 5	ax-c4 38870
[Monk2] p. 109	Lemma 12	ax-11 2158
[Monk2] p. 109	Lemma 15	equvini 2453  equvinv 2029  eqvinop 5442
[Monk2] p. 113	Axiom C5-1	ax-5 1910  ax5ALT 38893
[Monk2] p. 113	Axiom C5-2	ax-10 2142
[Monk2] p. 113	Axiom C5-3	ax-11 2158
[Monk2] p. 114	Lemma 21	sp 2184
[Monk2] p. 114	Lemma 22	axc4 2320  hba1-o 38883  hba1 2293
[Monk2] p. 114	Lemma 23	nfia1 2154
[Monk2] p. 114	Lemma 24	nfa2 2177  nfra2 3347  nfra2w 3272
[Moore] p. 53	Part I	df-mre 17523
[Munkres] p. 77	Example 2	distop 22915  indistop 22922  indistopon 22921
[Munkres] p. 77	Example 3	fctop 22924  fctop2 22925
[Munkres] p. 77	Example 4	cctop 22926
[Munkres] p. 78	Definition of basis	df-bases 22866  isbasis3g 22869
[Munkres] p. 78	Definition of a topology generated by a basis	df-topgen 17382  tgval2 22876
[Munkres] p. 79	Remark	tgcl 22889
[Munkres] p. 80	Lemma 2.1	tgval3 22883
[Munkres] p. 80	Lemma 2.2	tgss2 22907  tgss3 22906
[Munkres] p. 81	Lemma 2.3	basgen 22908  basgen2 22909
[Munkres] p. 83	Exercise 3	topdifinf 37330  topdifinfeq 37331  topdifinffin 37329  topdifinfindis 37327
[Munkres] p. 89	Definition of subspace topology	resttop 23080
[Munkres] p. 93	Theorem 6.1(1)	0cld 22958  topcld 22955
[Munkres] p. 93	Theorem 6.1(2)	iincld 22959
[Munkres] p. 93	Theorem 6.1(3)	uncld 22961
[Munkres] p. 94	Definition of closure	clsval 22957
[Munkres] p. 94	Definition of interior	ntrval 22956
[Munkres] p. 95	Theorem 6.5(a)	clsndisj 22995  elcls 22993
[Munkres] p. 95	Theorem 6.5(b)	elcls3 23003
[Munkres] p. 97	Theorem 6.6	clslp 23068  neindisj 23037
[Munkres] p. 97	Corollary 6.7	cldlp 23070
[Munkres] p. 97	Definition of limit point	islp2 23065  lpval 23059
[Munkres] p. 98	Definition of Hausdorff space	df-haus 23235
[Munkres] p. 102	Definition of continuous function	df-cn 23147  iscn 23155  iscn2 23158
[Munkres] p. 107	Theorem 7.2(g)	cncnp 23200  cncnp2 23201  cncnpi 23198  df-cnp 23148  iscnp 23157  iscnp2 23159
[Munkres] p. 127	Theorem 10.1	metcn 24464
[Munkres] p. 128	Theorem 10.3	metcn4 25244
[Nathanson] p. 123	Remark	reprgt 34605  reprinfz1 34606  reprlt 34603
[Nathanson] p. 123	Definition	df-repr 34593
[Nathanson] p. 123	Chapter 5.1	circlemethnat 34625
[Nathanson] p. 123	Proposition	breprexp 34617  breprexpnat 34618  itgexpif 34590
[NielsenChuang] p. 195	Equation 4.73	unierri 32083
[OeSilva] p. 2042	Section 2	ax-bgbltosilva 47804
[Pfenning] p. 17	Definition XM	natded 30382
[Pfenning] p. 17	Definition NNC	natded 30382  notnotrd 133
[Pfenning] p. 17	Definition ` `C	natded 30382
[Pfenning] p. 18	Rule"	natded 30382
[Pfenning] p. 18	Definition /\I	natded 30382
[Pfenning] p. 18	Definition ` `E	natded 30382  natded 30382  natded 30382  natded 30382  natded 30382
[Pfenning] p. 18	Definition ` `I	natded 30382  natded 30382  natded 30382  natded 30382  natded 30382
[Pfenning] p. 18	Definition ` `EL	natded 30382
[Pfenning] p. 18	Definition ` `ER	natded 30382
[Pfenning] p. 18	Definition ` `Ea,u	natded 30382
[Pfenning] p. 18	Definition ` `IR	natded 30382
[Pfenning] p. 18	Definition ` `Ia	natded 30382
[Pfenning] p. 127	Definition =E	natded 30382
[Pfenning] p. 127	Definition =I	natded 30382
[Ponnusamy] p. 361	Theorem 6.44	cphip0l 25135  df-dip 30680  dip0l 30697  ip0l 21578
[Ponnusamy] p. 361	Equation 6.45	cphipval 25176  ipval 30682
[Ponnusamy] p. 362	Equation I1	dipcj 30693  ipcj 21576
[Ponnusamy] p. 362	Equation I3	cphdir 25138  dipdir 30821  ipdir 21581  ipdiri 30809
[Ponnusamy] p. 362	Equation I4	ipidsq 30689  nmsq 25127
[Ponnusamy] p. 362	Equation 6.46	ip0i 30804
[Ponnusamy] p. 362	Equation 6.47	ip1i 30806
[Ponnusamy] p. 362	Equation 6.48	ip2i 30807
[Ponnusamy] p. 363	Equation I2	cphass 25144  dipass 30824  ipass 21587  ipassi 30820
[Prugovecki] p. 186	Definition of bra	braval 31923  df-bra 31829
[Prugovecki] p. 376	Equation 8.1	df-kb 31830  kbval 31933
[PtakPulmannova] p. 66	Proposition 3.2.17	atomli 32361
[PtakPulmannova] p. 68	Lemma 3.1.4	df-pclN 39875
[PtakPulmannova] p. 68	Lemma 3.2.20	atcvat3i 32375  atcvat4i 32376  cvrat3 39429  cvrat4 39430  lsatcvat3 39038
[PtakPulmannova] p. 68	Definition 3.2.18	cvbr 32261  cvrval 39255  df-cv 32258  df-lcv 39005  lspsncv0 21088
[PtakPulmannova] p. 72	Lemma 3.3.6	pclfinN 39887
[PtakPulmannova] p. 74	Lemma 3.3.10	pclcmpatN 39888
[Quine] p. 16	Definition 2.1	df-clab 2708  rabid 3424  rabidd 45142
[Quine] p. 17	Definition 2.1''	dfsb7 2279
[Quine] p. 18	Definition 2.7	df-cleq 2721
[Quine] p. 19	Definition 2.9	conventions 30379  df-v 3446
[Quine] p. 34	Theorem 5.1	eqabb 2867
[Quine] p. 35	Theorem 5.2	abid1 2864  abid2f 2922
[Quine] p. 40	Theorem 6.1	sb5 2276
[Quine] p. 40	Theorem 6.2	sb6 2086  sbalex 2243
[Quine] p. 41	Theorem 6.3	df-clel 2803
[Quine] p. 41	Theorem 6.4	eqid 2729  eqid1 30446
[Quine] p. 41	Theorem 6.5	eqcom 2736
[Quine] p. 42	Theorem 6.6	df-sbc 3751
[Quine] p. 42	Theorem 6.7	dfsbcq 3752  dfsbcq2 3753
[Quine] p. 43	Theorem 6.8	vex 3448
[Quine] p. 43	Theorem 6.9	isset 3458
[Quine] p. 44	Theorem 7.3	spcgf 3554  spcgv 3559  spcimgf 3513
[Quine] p. 44	Theorem 6.11	spsbc 3763  spsbcd 3764
[Quine] p. 44	Theorem 6.12	elex 3465
[Quine] p. 44	Theorem 6.13	elab 3643  elabg 3640  elabgf 3638
[Quine] p. 44	Theorem 6.14	noel 4297
[Quine] p. 48	Theorem 7.2	snprc 4677
[Quine] p. 48	Definition 7.1	df-pr 4588  df-sn 4586
[Quine] p. 49	Theorem 7.4	snss 4745  snssg 4743
[Quine] p. 49	Theorem 7.5	prss 4780  prssg 4779
[Quine] p. 49	Theorem 7.6	prid1 4722  prid1g 4720  prid2 4723  prid2g 4721  snid 4622  snidg 4620
[Quine] p. 51	Theorem 7.12	snex 5386
[Quine] p. 51	Theorem 7.13	prex 5387
[Quine] p. 53	Theorem 8.2	unisn 4886  unisnALT 44908  unisng 4885
[Quine] p. 53	Theorem 8.3	uniun 4890
[Quine] p. 54	Theorem 8.6	elssuni 4897
[Quine] p. 54	Theorem 8.7	uni0 4895
[Quine] p. 56	Theorem 8.17	uniabio 6466
[Quine] p. 56	Definition 8.18	dfaiota2 47080  dfiota2 6453
[Quine] p. 57	Theorem 8.19	aiotaval 47089  iotaval 6470
[Quine] p. 57	Theorem 8.22	iotanul 6477
[Quine] p. 58	Theorem 8.23	iotaex 6472
[Quine] p. 58	Definition 9.1	df-op 4592
[Quine] p. 61	Theorem 9.5	opabid 5480  opabidw 5479  opelopab 5497  opelopaba 5491  opelopabaf 5499  opelopabf 5500  opelopabg 5493  opelopabga 5488  opelopabgf 5495  oprabid 7401  oprabidw 7400
[Quine] p. 64	Definition 9.11	df-xp 5637
[Quine] p. 64	Definition 9.12	df-cnv 5639
[Quine] p. 64	Definition 9.15	df-id 5526
[Quine] p. 65	Theorem 10.3	fun0 6565
[Quine] p. 65	Theorem 10.4	funi 6532
[Quine] p. 65	Theorem 10.5	funsn 6553  funsng 6551
[Quine] p. 65	Definition 10.1	df-fun 6501
[Quine] p. 65	Definition 10.2	args 6052  dffv4 6837
[Quine] p. 68	Definition 10.11	conventions 30379  df-fv 6507  fv2 6835
[Quine] p. 124	Theorem 17.3	nn0opth2 14213  nn0opth2i 14212  nn0opthi 14211  omopthi 8602
[Quine] p. 177	Definition 25.2	df-rdg 8355
[Quine] p. 232	Equation i	carddom 10483
[Quine] p. 284	Axiom 39(vi)	funimaex 6588  funimaexg 6587
[Quine] p. 331	Axiom system NF	ru 3748
[ReedSimon] p. 36	Definition (iii)	ax-his3 31063
[ReedSimon] p. 63	Exercise 4(a)	df-dip 30680  polid 31138  polid2i 31136  polidi 31137
[ReedSimon] p. 63	Exercise 4(b)	df-ph 30792
[ReedSimon] p. 195	Remark	lnophm 31998  lnophmi 31997
[Retherford] p. 49	Exercise 1(i)	leopadd 32111
[Retherford] p. 49	Exercise 1(ii)	leopmul 32113  leopmuli 32112
[Retherford] p. 49	Exercise 1(iv)	leoptr 32116
[Retherford] p. 49	Definition VI.1	df-leop 31831  leoppos 32105
[Retherford] p. 49	Exercise 1(iii)	leoptri 32115
[Retherford] p. 49	Definition of operator ordering	leop3 32104
[Roman] p. 4	Definition	df-dmat 22410  df-dmatalt 48380
[Roman] p. 18	Part Preliminaries	df-rng 20073
[Roman] p. 19	Part Preliminaries	df-ring 20155
[Roman] p. 46	Theorem 1.6	isldepslvec2 48467
[Roman] p. 112	Note	isldepslvec2 48467  ldepsnlinc 48490  zlmodzxznm 48479
[Roman] p. 112	Example	zlmodzxzequa 48478  zlmodzxzequap 48481  zlmodzxzldep 48486
[Roman] p. 170	Theorem 7.8	cayleyhamilton 22810
[Rosenlicht] p. 80	Theorem	heicant 37642
[Rosser] p. 281	Definition	df-op 4592
[RosserSchoenfeld] p. 71	Theorem 12.	ax-ros335 34629
[RosserSchoenfeld] p. 71	Theorem 13.	ax-ros336 34630
[Rotman] p. 28	Remark	pgrpgt2nabl 48347  pmtr3ncom 19389
[Rotman] p. 31	Theorem 3.4	symggen2 19385
[Rotman] p. 42	Theorem 3.15	cayley 19328  cayleyth 19329
[Rudin] p. 164	Equation 27	efcan 16038
[Rudin] p. 164	Equation 30	efzval 16046
[Rudin] p. 167	Equation 48	absefi 16140
[Sanford] p. 39	Remark	ax-mp 5  mto 197
[Sanford] p. 39	Rule 3	mtpxor 1771
[Sanford] p. 39	Rule 4	mptxor 1769
[Sanford] p. 40	Rule 1	mptnan 1768
[Schechter] p. 51	Definition of antisymmetry	intasym 6076
[Schechter] p. 51	Definition of irreflexivity	intirr 6079
[Schechter] p. 51	Definition of symmetry	cnvsym 6073
[Schechter] p. 51	Definition of transitivity	cotr 6071
[Schechter] p. 78	Definition of Moore collection of sets	df-mre 17523
[Schechter] p. 79	Definition of Moore closure	df-mrc 17524
[Schechter] p. 82	Section 4.5	df-mrc 17524
[Schechter] p. 84	Definition (A) of an algebraic closure system	df-acs 17526
[Schechter] p. 139	Definition AC3	dfac9 10066
[Schechter] p. 141	Definition (MC)	dfac11 43044
[Schechter] p. 149	Axiom DC1	ax-dc 10375  axdc3 10383
[Schechter] p. 187	Definition of "ring with unit"	isring 20157  isrngo 37884
[Schechter] p. 276	Remark 11.6.e	span0 31521
[Schechter] p. 276	Definition of span	df-span 31288  spanval 31312
[Schechter] p. 428	Definition 15.35	bastop1 22913
[Schloeder] p. 1	Lemma 1.3	onelon 6345  onelord 43233  ordelon 6344  ordelord 6342
[Schloeder] p. 1	Lemma 1.7	onepsuc 43234  sucidg 6403
[Schloeder] p. 1	Remark 1.5	0elon 6375  onsuc 7767  ord0 6374  ordsuci 7764
[Schloeder] p. 1	Theorem 1.9	epsoon 43235
[Schloeder] p. 1	Definition 1.1	dftr5 5213
[Schloeder] p. 1	Definition 1.2	dford3 43010  elon2 6331
[Schloeder] p. 1	Definition 1.4	df-suc 6326
[Schloeder] p. 1	Definition 1.6	epel 5534  epelg 5532
[Schloeder] p. 1	Theorem 1.9(i)	elirr 9526  epirron 43236  ordirr 6338
[Schloeder] p. 1	Theorem 1.9(ii)	oneltr 43238  oneptr 43237  ontr1 6367
[Schloeder] p. 1	Theorem 1.9(iii)	oneltri 6363  oneptri 43239  ordtri3or 6352
[Schloeder] p. 2	Lemma 1.10	ondif1 8442  ord0eln0 6376
[Schloeder] p. 2	Lemma 1.13	elsuci 6389  onsucss 43248  trsucss 6410
[Schloeder] p. 2	Lemma 1.14	ordsucss 7773
[Schloeder] p. 2	Lemma 1.15	onnbtwn 6416  ordnbtwn 6415
[Schloeder] p. 2	Lemma 1.16	orddif0suc 43250  ordnexbtwnsuc 43249
[Schloeder] p. 2	Lemma 1.17	fin1a2lem2 10330  onsucf1lem 43251  onsucf1o 43254  onsucf1olem 43252  onsucrn 43253
[Schloeder] p. 2	Lemma 1.18	dflim7 43255
[Schloeder] p. 2	Remark 1.12	ordzsl 7801
[Schloeder] p. 2	Theorem 1.10	ondif1i 43244  ordne0gt0 43243
[Schloeder] p. 2	Definition 1.11	dflim6 43246  limnsuc 43247  onsucelab 43245
[Schloeder] p. 3	Remark 1.21	omex 9572
[Schloeder] p. 3	Theorem 1.19	tfinds 7816
[Schloeder] p. 3	Theorem 1.22	omelon 9575  ordom 7832
[Schloeder] p. 3	Definition 1.20	dfom3 9576
[Schloeder] p. 4	Lemma 2.2	1onn 8581
[Schloeder] p. 4	Lemma 2.7	ssonuni 7736  ssorduni 7735
[Schloeder] p. 4	Remark 2.4	oa1suc 8472
[Schloeder] p. 4	Theorem 1.23	dfom5 9579  limom 7838
[Schloeder] p. 4	Definition 2.1	df-1o 8411  df1o2 8418
[Schloeder] p. 4	Definition 2.3	oa0 8457  oa0suclim 43257  oalim 8473  oasuc 8465
[Schloeder] p. 4	Definition 2.5	om0 8458  om0suclim 43258  omlim 8474  omsuc 8467
[Schloeder] p. 4	Definition 2.6	oe0 8463  oe0m1 8462  oe0suclim 43259  oelim 8475  oesuc 8468
[Schloeder] p. 5	Lemma 2.10	onsupuni 43211
[Schloeder] p. 5	Lemma 2.11	onsupsucismax 43261
[Schloeder] p. 5	Lemma 2.12	onsssupeqcond 43262
[Schloeder] p. 5	Lemma 2.13	limexissup 43263  limexissupab 43265  limiun 43264  limuni 6382
[Schloeder] p. 5	Lemma 2.14	oa0r 8479
[Schloeder] p. 5	Lemma 2.15	om1 8483  om1om1r 43266  om1r 8484
[Schloeder] p. 5	Remark 2.8	oacl 8476  oaomoecl 43260  oecl 8478  omcl 8477
[Schloeder] p. 5	Definition 2.9	onsupintrab 43213
[Schloeder] p. 6	Lemma 2.16	oe1 8485
[Schloeder] p. 6	Lemma 2.17	oe1m 8486
[Schloeder] p. 6	Lemma 2.18	oe0rif 43267
[Schloeder] p. 6	Theorem 2.19	oasubex 43268
[Schloeder] p. 6	Theorem 2.20	nnacl 8552  nnamecl 43269  nnecl 8554  nnmcl 8553
[Schloeder] p. 7	Lemma 3.1	onsucwordi 43270
[Schloeder] p. 7	Lemma 3.2	oaword1 8493
[Schloeder] p. 7	Lemma 3.3	oaword2 8494
[Schloeder] p. 7	Lemma 3.4	oalimcl 8501
[Schloeder] p. 7	Lemma 3.5	oaltublim 43272
[Schloeder] p. 8	Lemma 3.6	oaordi3 43273
[Schloeder] p. 8	Lemma 3.8	1oaomeqom 43275
[Schloeder] p. 8	Lemma 3.10	oa00 8500
[Schloeder] p. 8	Lemma 3.11	omge1 43279  omword1 8514
[Schloeder] p. 8	Remark 3.9	oaordnr 43278  oaordnrex 43277
[Schloeder] p. 8	Theorem 3.7	oaord3 43274
[Schloeder] p. 9	Lemma 3.12	omge2 43280  omword2 8515
[Schloeder] p. 9	Lemma 3.13	omlim2 43281
[Schloeder] p. 9	Lemma 3.14	omord2lim 43282
[Schloeder] p. 9	Lemma 3.15	omord2i 43283  omordi 8507
[Schloeder] p. 9	Theorem 3.16	omord 8509  omord2com 43284
[Schloeder] p. 10	Lemma 3.17	2omomeqom 43285  df-2o 8412
[Schloeder] p. 10	Lemma 3.19	oege1 43288  oewordi 8532
[Schloeder] p. 10	Lemma 3.20	oege2 43289  oeworde 8534
[Schloeder] p. 10	Lemma 3.21	rp-oelim2 43290
[Schloeder] p. 10	Lemma 3.22	oeord2lim 43291
[Schloeder] p. 10	Remark 3.18	omnord1 43287  omnord1ex 43286
[Schloeder] p. 11	Lemma 3.23	oeord2i 43292
[Schloeder] p. 11	Lemma 3.25	nnoeomeqom 43294
[Schloeder] p. 11	Remark 3.26	oenord1 43298  oenord1ex 43297
[Schloeder] p. 11	Theorem 4.1	oaomoencom 43299
[Schloeder] p. 11	Theorem 4.2	oaass 8502
[Schloeder] p. 11	Theorem 3.24	oeord2com 43293
[Schloeder] p. 12	Theorem 4.3	odi 8520
[Schloeder] p. 13	Theorem 4.4	omass 8521
[Schloeder] p. 14	Remark 4.6	oenass 43301
[Schloeder] p. 14	Theorem 4.7	oeoa 8538
[Schloeder] p. 15	Lemma 5.1	cantnftermord 43302
[Schloeder] p. 15	Lemma 5.2	cantnfub 43303  cantnfub2 43304
[Schloeder] p. 16	Theorem 5.3	cantnf2 43307
[Schwabhauser] p. 10	Axiom A1	axcgrrflx 28894  axtgcgrrflx 28442
[Schwabhauser] p. 10	Axiom A2	axcgrtr 28895
[Schwabhauser] p. 10	Axiom A3	axcgrid 28896  axtgcgrid 28443
[Schwabhauser] p. 10	Axioms A1 to A3	df-trkgc 28428
[Schwabhauser] p. 11	Axiom A4	axsegcon 28907  axtgsegcon 28444  df-trkgcb 28430
[Schwabhauser] p. 11	Axiom A5	ax5seg 28918  axtg5seg 28445  df-trkgcb 28430
[Schwabhauser] p. 11	Axiom A6	axbtwnid 28919  axtgbtwnid 28446  df-trkgb 28429
[Schwabhauser] p. 12	Axiom A7	axpasch 28921  axtgpasch 28447  df-trkgb 28429
[Schwabhauser] p. 12	Axiom A8	axlowdim2 28940  df-trkg2d 34649
[Schwabhauser] p. 13	Axiom A8	axtglowdim2 28450
[Schwabhauser] p. 13	Axiom A9	axtgupdim2 28451  df-trkg2d 34649
[Schwabhauser] p. 13	Axiom A10	axeuclid 28943  axtgeucl 28452  df-trkge 28431
[Schwabhauser] p. 13	Axiom A11	axcont 28956  axtgcont 28449  axtgcont1 28448  df-trkgb 28429
[Schwabhauser] p. 27	Theorem 2.1	cgrrflx 35968
[Schwabhauser] p. 27	Theorem 2.2	cgrcomim 35970
[Schwabhauser] p. 27	Theorem 2.3	cgrtr 35973
[Schwabhauser] p. 27	Theorem 2.4	cgrcoml 35977
[Schwabhauser] p. 27	Theorem 2.5	cgrcomr 35978  tgcgrcomimp 28457  tgcgrcoml 28459  tgcgrcomr 28458
[Schwabhauser] p. 28	Theorem 2.8	cgrtriv 35983  tgcgrtriv 28464
[Schwabhauser] p. 28	Theorem 2.10	5segofs 35987  tg5segofs 34657
[Schwabhauser] p. 28	Definition 2.10	df-afs 34654  df-ofs 35964
[Schwabhauser] p. 29	Theorem 2.11	cgrextend 35989  tgcgrextend 28465
[Schwabhauser] p. 29	Theorem 2.12	segconeq 35991  tgsegconeq 28466
[Schwabhauser] p. 30	Theorem 3.1	btwnouttr2 36003  btwntriv2 35993  tgbtwntriv2 28467
[Schwabhauser] p. 30	Theorem 3.2	btwncomim 35994  tgbtwncom 28468
[Schwabhauser] p. 30	Theorem 3.3	btwntriv1 35997  tgbtwntriv1 28471
[Schwabhauser] p. 30	Theorem 3.4	btwnswapid 35998  tgbtwnswapid 28472
[Schwabhauser] p. 30	Theorem 3.5	btwnexch2 36004  btwnintr 36000  tgbtwnexch2 28476  tgbtwnintr 28473
[Schwabhauser] p. 30	Theorem 3.6	btwnexch 36006  btwnexch3 36001  tgbtwnexch 28478  tgbtwnexch3 28474
[Schwabhauser] p. 30	Theorem 3.7	btwnouttr 36005  tgbtwnouttr 28477  tgbtwnouttr2 28475
[Schwabhauser] p. 32	Theorem 3.13	axlowdim1 28939
[Schwabhauser] p. 32	Theorem 3.14	btwndiff 36008  tgbtwndiff 28486
[Schwabhauser] p. 33	Theorem 3.17	tgtrisegint 28479  trisegint 36009
[Schwabhauser] p. 34	Theorem 4.2	ifscgr 36025  tgifscgr 28488
[Schwabhauser] p. 34	Theorem 4.11	colcom 28538  colrot1 28539  colrot2 28540  lncom 28602  lnrot1 28603  lnrot2 28604
[Schwabhauser] p. 34	Definition 4.1	df-ifs 36021
[Schwabhauser] p. 35	Theorem 4.3	cgrsub 36026  tgcgrsub 28489
[Schwabhauser] p. 35	Theorem 4.5	cgrxfr 36036  tgcgrxfr 28498
[Schwabhauser] p. 35	Statement 4.4	ercgrg 28497
[Schwabhauser] p. 35	Definition 4.4	df-cgr3 36022  df-cgrg 28491
[Schwabhauser] p. 35	Definition instead (given	df-cgrg 28491
[Schwabhauser] p. 36	Theorem 4.6	btwnxfr 36037  tgbtwnxfr 28510
[Schwabhauser] p. 36	Theorem 4.11	colinearperm1 36043  colinearperm2 36045  colinearperm3 36044  colinearperm4 36046  colinearperm5 36047
[Schwabhauser] p. 36	Definition 4.8	df-ismt 28513
[Schwabhauser] p. 36	Definition 4.10	df-colinear 36020  tgellng 28533  tglng 28526
[Schwabhauser] p. 37	Theorem 4.12	colineartriv1 36048
[Schwabhauser] p. 37	Theorem 4.13	colinearxfr 36056  lnxfr 28546
[Schwabhauser] p. 37	Theorem 4.14	lineext 36057  lnext 28547
[Schwabhauser] p. 37	Theorem 4.16	fscgr 36061  tgfscgr 28548
[Schwabhauser] p. 37	Theorem 4.17	linecgr 36062  lncgr 28549
[Schwabhauser] p. 37	Definition 4.15	df-fs 36023
[Schwabhauser] p. 38	Theorem 4.18	lineid 36064  lnid 28550
[Schwabhauser] p. 38	Theorem 4.19	idinside 36065  tgidinside 28551
[Schwabhauser] p. 39	Theorem 5.1	btwnconn1 36082  tgbtwnconn1 28555
[Schwabhauser] p. 41	Theorem 5.2	btwnconn2 36083  tgbtwnconn2 28556
[Schwabhauser] p. 41	Theorem 5.3	btwnconn3 36084  tgbtwnconn3 28557
[Schwabhauser] p. 41	Theorem 5.5	brsegle2 36090
[Schwabhauser] p. 41	Definition 5.4	df-segle 36088  legov 28565
[Schwabhauser] p. 41	Definition 5.5	legov2 28566
[Schwabhauser] p. 42	Remark 5.13	legso 28579
[Schwabhauser] p. 42	Theorem 5.6	seglecgr12im 36091
[Schwabhauser] p. 42	Theorem 5.7	seglerflx 36093
[Schwabhauser] p. 42	Theorem 5.8	segletr 36095
[Schwabhauser] p. 42	Theorem 5.9	segleantisym 36096
[Schwabhauser] p. 42	Theorem 5.10	seglelin 36097
[Schwabhauser] p. 42	Theorem 5.11	seglemin 36094
[Schwabhauser] p. 42	Theorem 5.12	colinbtwnle 36099
[Schwabhauser] p. 42	Proposition 5.7	legid 28567
[Schwabhauser] p. 42	Proposition 5.8	legtrd 28569
[Schwabhauser] p. 42	Proposition 5.9	legtri3 28570
[Schwabhauser] p. 42	Proposition 5.10	legtrid 28571
[Schwabhauser] p. 42	Proposition 5.11	leg0 28572
[Schwabhauser] p. 43	Theorem 6.2	btwnoutside 36106
[Schwabhauser] p. 43	Theorem 6.3	broutsideof3 36107
[Schwabhauser] p. 43	Theorem 6.4	broutsideof 36102  df-outsideof 36101
[Schwabhauser] p. 43	Definition 6.1	broutsideof2 36103  ishlg 28582
[Schwabhauser] p. 44	Theorem 6.4	hlln 28587
[Schwabhauser] p. 44	Theorem 6.5	hlid 28589  outsideofrflx 36108
[Schwabhauser] p. 44	Theorem 6.6	hlcomb 28583  hlcomd 28584  outsideofcom 36109
[Schwabhauser] p. 44	Theorem 6.7	hltr 28590  outsideoftr 36110
[Schwabhauser] p. 44	Theorem 6.11	hlcgreu 28598  outsideofeu 36112
[Schwabhauser] p. 44	Definition 6.8	df-ray 36119
[Schwabhauser] p. 45	Part 2	df-lines2 36120
[Schwabhauser] p. 45	Theorem 6.13	outsidele 36113
[Schwabhauser] p. 45	Theorem 6.15	lineunray 36128
[Schwabhauser] p. 45	Theorem 6.16	lineelsb2 36129  tglineelsb2 28612
[Schwabhauser] p. 45	Theorem 6.17	linecom 36131  linerflx1 36130  linerflx2 36132  tglinecom 28615  tglinerflx1 28613  tglinerflx2 28614
[Schwabhauser] p. 45	Theorem 6.18	linethru 36134  tglinethru 28616
[Schwabhauser] p. 45	Definition 6.14	df-line2 36118  tglng 28526
[Schwabhauser] p. 45	Proposition 6.13	legbtwn 28574
[Schwabhauser] p. 46	Theorem 6.19	linethrueu 36137  tglinethrueu 28619
[Schwabhauser] p. 46	Theorem 6.21	lineintmo 36138  tglineineq 28623  tglineinteq 28625  tglineintmo 28622
[Schwabhauser] p. 46	Theorem 6.23	colline 28629
[Schwabhauser] p. 46	Theorem 6.24	tglowdim2l 28630
[Schwabhauser] p. 46	Theorem 6.25	tglowdim2ln 28631
[Schwabhauser] p. 49	Theorem 7.3	mirinv 28646
[Schwabhauser] p. 49	Theorem 7.7	mirmir 28642
[Schwabhauser] p. 49	Theorem 7.8	mirreu3 28634
[Schwabhauser] p. 49	Definition 7.5	df-mir 28633  ismir 28639  mirbtwn 28638  mircgr 28637  mirfv 28636  mirval 28635
[Schwabhauser] p. 50	Theorem 7.8	mirreu 28644
[Schwabhauser] p. 50	Theorem 7.9	mireq 28645
[Schwabhauser] p. 50	Theorem 7.10	mirinv 28646
[Schwabhauser] p. 50	Theorem 7.11	mirf1o 28649
[Schwabhauser] p. 50	Theorem 7.13	miriso 28650
[Schwabhauser] p. 51	Theorem 7.14	mirmot 28655
[Schwabhauser] p. 51	Theorem 7.15	mirbtwnb 28652  mirbtwni 28651
[Schwabhauser] p. 51	Theorem 7.16	mircgrs 28653
[Schwabhauser] p. 51	Theorem 7.17	miduniq 28665
[Schwabhauser] p. 52	Lemma 7.21	symquadlem 28669
[Schwabhauser] p. 52	Theorem 7.18	miduniq1 28666
[Schwabhauser] p. 52	Theorem 7.19	miduniq2 28667
[Schwabhauser] p. 52	Theorem 7.20	colmid 28668
[Schwabhauser] p. 53	Lemma 7.22	krippen 28671
[Schwabhauser] p. 55	Lemma 7.25	midexlem 28672
[Schwabhauser] p. 57	Theorem 8.2	ragcom 28678
[Schwabhauser] p. 57	Definition 8.1	df-rag 28674  israg 28677
[Schwabhauser] p. 58	Theorem 8.3	ragcol 28679
[Schwabhauser] p. 58	Theorem 8.4	ragmir 28680
[Schwabhauser] p. 58	Theorem 8.5	ragtrivb 28682
[Schwabhauser] p. 58	Theorem 8.6	ragflat2 28683
[Schwabhauser] p. 58	Theorem 8.7	ragflat 28684
[Schwabhauser] p. 58	Theorem 8.8	ragtriva 28685
[Schwabhauser] p. 58	Theorem 8.9	ragflat3 28686  ragncol 28689
[Schwabhauser] p. 58	Theorem 8.10	ragcgr 28687
[Schwabhauser] p. 59	Theorem 8.12	perpcom 28693
[Schwabhauser] p. 59	Theorem 8.13	ragperp 28697
[Schwabhauser] p. 59	Theorem 8.14	perpneq 28694
[Schwabhauser] p. 59	Definition 8.11	df-perpg 28676  isperp 28692
[Schwabhauser] p. 59	Definition 8.13	isperp2 28695
[Schwabhauser] p. 60	Theorem 8.18	foot 28702
[Schwabhauser] p. 62	Lemma 8.20	colperpexlem1 28710  colperpexlem2 28711
[Schwabhauser] p. 63	Theorem 8.21	colperpex 28713  colperpexlem3 28712
[Schwabhauser] p. 64	Theorem 8.22	mideu 28718  midex 28717
[Schwabhauser] p. 66	Lemma 8.24	opphllem 28715
[Schwabhauser] p. 67	Theorem 9.2	oppcom 28724
[Schwabhauser] p. 67	Definition 9.1	islnopp 28719
[Schwabhauser] p. 68	Lemma 9.3	opphllem2 28728
[Schwabhauser] p. 68	Lemma 9.4	opphllem5 28731  opphllem6 28732
[Schwabhauser] p. 69	Theorem 9.5	opphl 28734
[Schwabhauser] p. 69	Theorem 9.6	axtgpasch 28447
[Schwabhauser] p. 70	Theorem 9.6	outpasch 28735
[Schwabhauser] p. 71	Theorem 9.8	lnopp2hpgb 28743
[Schwabhauser] p. 71	Definition 9.7	df-hpg 28738  hpgbr 28740
[Schwabhauser] p. 72	Lemma 9.10	hpgerlem 28745
[Schwabhauser] p. 72	Theorem 9.9	lnoppnhpg 28744
[Schwabhauser] p. 72	Theorem 9.11	hpgid 28746
[Schwabhauser] p. 72	Theorem 9.12	hpgcom 28747
[Schwabhauser] p. 72	Theorem 9.13	hpgtr 28748
[Schwabhauser] p. 73	Theorem 9.18	colopp 28749
[Schwabhauser] p. 73	Theorem 9.19	colhp 28750
[Schwabhauser] p. 88	Theorem 10.2	lmieu 28764
[Schwabhauser] p. 88	Definition 10.1	df-mid 28754
[Schwabhauser] p. 89	Theorem 10.4	lmicom 28768
[Schwabhauser] p. 89	Theorem 10.5	lmilmi 28769
[Schwabhauser] p. 89	Theorem 10.6	lmireu 28770
[Schwabhauser] p. 89	Theorem 10.7	lmieq 28771
[Schwabhauser] p. 89	Theorem 10.8	lmiinv 28772
[Schwabhauser] p. 89	Theorem 10.9	lmif1o 28775
[Schwabhauser] p. 89	Theorem 10.10	lmiiso 28777
[Schwabhauser] p. 89	Definition 10.3	df-lmi 28755
[Schwabhauser] p. 90	Theorem 10.11	lmimot 28778
[Schwabhauser] p. 91	Theorem 10.12	hypcgr 28781
[Schwabhauser] p. 92	Theorem 10.14	lmiopp 28782
[Schwabhauser] p. 92	Theorem 10.15	lnperpex 28783
[Schwabhauser] p. 92	Theorem 10.16	trgcopy 28784  trgcopyeu 28786
[Schwabhauser] p. 95	Definition 11.2	dfcgra2 28810
[Schwabhauser] p. 95	Definition 11.3	iscgra 28789
[Schwabhauser] p. 95	Proposition 11.4	cgracgr 28798
[Schwabhauser] p. 95	Proposition 11.10	cgrahl1 28796  cgrahl2 28797
[Schwabhauser] p. 96	Theorem 11.6	cgraid 28799
[Schwabhauser] p. 96	Theorem 11.9	cgraswap 28800
[Schwabhauser] p. 97	Theorem 11.7	cgracom 28802
[Schwabhauser] p. 97	Theorem 11.8	cgratr 28803
[Schwabhauser] p. 97	Theorem 11.21	cgrabtwn 28806  cgrahl 28807
[Schwabhauser] p. 98	Theorem 11.13	sacgr 28811
[Schwabhauser] p. 98	Theorem 11.14	oacgr 28812
[Schwabhauser] p. 98	Theorem 11.15	acopy 28813  acopyeu 28814
[Schwabhauser] p. 101	Theorem 11.24	inagswap 28821
[Schwabhauser] p. 101	Theorem 11.25	inaghl 28825
[Schwabhauser] p. 101	Definition 11.23	isinag 28818
[Schwabhauser] p. 102	Lemma 11.28	cgrg3col4 28833
[Schwabhauser] p. 102	Definition 11.27	df-leag 28826  isleag 28827
[Schwabhauser] p. 107	Theorem 11.49	tgsas 28835  tgsas1 28834  tgsas2 28836  tgsas3 28837
[Schwabhauser] p. 108	Theorem 11.50	tgasa 28839  tgasa1 28838
[Schwabhauser] p. 109	Theorem 11.51	tgsss1 28840  tgsss2 28841  tgsss3 28842
[Shapiro] p. 230	Theorem 6.5.1	dchrhash 27215  dchrsum 27213  dchrsum2 27212  sumdchr 27216
[Shapiro] p. 232	Theorem 6.5.2	dchr2sum 27217  sum2dchr 27218
[Shapiro], p. 199	Lemma 6.1C.2	ablfacrp 19982  ablfacrp2 19983
[Shapiro], p. 328	Equation 9.2.4	vmasum 27160
[Shapiro], p. 329	Equation 9.2.7	logfac2 27161
[Shapiro], p. 329	Equation 9.2.9	logfacrlim 27168
[Shapiro], p. 331	Equation 9.2.13	vmadivsum 27426
[Shapiro], p. 331	Equation 9.2.14	rplogsumlem2 27429
[Shapiro], p. 336	Exercise 9.1.7	vmalogdivsum 27483  vmalogdivsum2 27482
[Shapiro], p. 375	Theorem 9.4.1	dirith 27473  dirith2 27472
[Shapiro], p. 375	Equation 9.4.3	rplogsum 27471  rpvmasum 27470  rpvmasum2 27456
[Shapiro], p. 376	Equation 9.4.7	rpvmasumlem 27431
[Shapiro], p. 376	Equation 9.4.8	dchrvmasum 27469
[Shapiro], p. 377	Lemma 9.4.1	dchrisum 27436  dchrisumlem1 27433  dchrisumlem2 27434  dchrisumlem3 27435  dchrisumlema 27432
[Shapiro], p. 377	Equation 9.4.11	dchrvmasumlem1 27439
[Shapiro], p. 379	Equation 9.4.16	dchrmusum 27468  dchrmusumlem 27466  dchrvmasumlem 27467
[Shapiro], p. 380	Lemma 9.4.2	dchrmusum2 27438
[Shapiro], p. 380	Lemma 9.4.3	dchrvmasum2lem 27440
[Shapiro], p. 382	Lemma 9.4.4	dchrisum0 27464  dchrisum0re 27457  dchrisumn0 27465
[Shapiro], p. 382	Equation 9.4.27	dchrisum0fmul 27450
[Shapiro], p. 382	Equation 9.4.29	dchrisum0flb 27454
[Shapiro], p. 383	Equation 9.4.30	dchrisum0fno1 27455
[Shapiro], p. 403	Equation 10.1.16	pntrsumbnd 27510  pntrsumbnd2 27511  pntrsumo1 27509
[Shapiro], p. 405	Equation 10.2.1	mudivsum 27474
[Shapiro], p. 406	Equation 10.2.6	mulogsum 27476
[Shapiro], p. 407	Equation 10.2.7	mulog2sumlem1 27478
[Shapiro], p. 407	Equation 10.2.8	mulog2sum 27481
[Shapiro], p. 418	Equation 10.4.6	logsqvma 27486
[Shapiro], p. 418	Equation 10.4.8	logsqvma2 27487
[Shapiro], p. 419	Equation 10.4.10	selberg 27492
[Shapiro], p. 420	Equation 10.4.12	selberg2lem 27494
[Shapiro], p. 420	Equation 10.4.14	selberg2 27495
[Shapiro], p. 422	Equation 10.6.7	selberg3 27503
[Shapiro], p. 422	Equation 10.4.20	selberg4lem1 27504
[Shapiro], p. 422	Equation 10.4.21	selberg3lem1 27501  selberg3lem2 27502
[Shapiro], p. 422	Equation 10.4.23	selberg4 27505
[Shapiro], p. 427	Theorem 10.5.2	chpdifbnd 27499
[Shapiro], p. 428	Equation 10.6.2	selbergr 27512
[Shapiro], p. 429	Equation 10.6.8	selberg3r 27513
[Shapiro], p. 430	Equation 10.6.11	selberg4r 27514
[Shapiro], p. 431	Equation 10.6.15	pntrlog2bnd 27528
[Shapiro], p. 434	Equation 10.6.27	pntlema 27540  pntlemb 27541  pntlemc 27539  pntlemd 27538  pntlemg 27542
[Shapiro], p. 435	Equation 10.6.29	pntlema 27540
[Shapiro], p. 436	Lemma 10.6.1	pntpbnd 27532
[Shapiro], p. 436	Lemma 10.6.2	pntibnd 27537
[Shapiro], p. 436	Equation 10.6.34	pntlema 27540
[Shapiro], p. 436	Equation 10.6.35	pntlem3 27553  pntleml 27555
[Stewart] p. 91	Lemma 7.3	constrss 33726
[Stewart] p. 92	Definition 7.4.	df-constr 33713
[Stewart] p. 96	Theorem 7.10	constraddcl 33745  constrinvcl 33756  constrmulcl 33754  constrnegcl 33746  constrsqrtcl 33762
[Stewart] p. 97	Theorem 7.11	constrextdg2 33732
[Stewart] p. 98	Theorem 7.12	constrext2chn 33742
[Stewart] p. 99	Theorem 7.13	2sqr3nconstr 33764
[Stewart] p. 99	Theorem 7.14	cos9thpinconstr 33774
[Stoll] p. 13	Definition corresponds to	dfsymdif3 4265
[Stoll] p. 16	Exercise 4.4	0dif 4364  dif0 4337
[Stoll] p. 16	Exercise 4.8	difdifdir 4451
[Stoll] p. 17	Theorem 5.1(5)	unvdif 4434
[Stoll] p. 19	Theorem 5.2(13)	undm 4256
[Stoll] p. 19	Theorem 5.2(13')	indm 4257
[Stoll] p. 20	Remark	invdif 4238
[Stoll] p. 25	Definition of ordered triple	df-ot 4594
[Stoll] p. 43	Definition	uniiun 5017
[Stoll] p. 44	Definition	intiin 5018
[Stoll] p. 45	Definition	df-iin 4954
[Stoll] p. 45	Definition indexed union	df-iun 4953
[Stoll] p. 176	Theorem 3.4(27)	iman 401
[Stoll] p. 262	Example 4.1	dfsymdif3 4265
[Strang] p. 242	Section 6.3	expgrowth 44317
[Suppes] p. 22	Theorem 2	eq0 4309  eq0f 4306
[Suppes] p. 22	Theorem 4	eqss 3959  eqssd 3961  eqssi 3960
[Suppes] p. 23	Theorem 5	ss0 4361  ss0b 4360
[Suppes] p. 23	Theorem 6	sstr 3952  sstrALT2 44817
[Suppes] p. 23	Theorem 7	pssirr 4062
[Suppes] p. 23	Theorem 8	pssn2lp 4063
[Suppes] p. 23	Theorem 9	psstr 4066
[Suppes] p. 23	Theorem 10	pssss 4057
[Suppes] p. 25	Theorem 12	elin 3927  elun 4112
[Suppes] p. 26	Theorem 15	inidm 4186
[Suppes] p. 26	Theorem 16	in0 4354
[Suppes] p. 27	Theorem 23	unidm 4116
[Suppes] p. 27	Theorem 24	un0 4353
[Suppes] p. 27	Theorem 25	ssun1 4137
[Suppes] p. 27	Theorem 26	ssequn1 4145
[Suppes] p. 27	Theorem 27	unss 4149
[Suppes] p. 27	Theorem 28	indir 4245
[Suppes] p. 27	Theorem 29	undir 4246
[Suppes] p. 28	Theorem 32	difid 4335
[Suppes] p. 29	Theorem 33	difin 4231
[Suppes] p. 29	Theorem 34	indif 4239
[Suppes] p. 29	Theorem 35	undif1 4435
[Suppes] p. 29	Theorem 36	difun2 4440
[Suppes] p. 29	Theorem 37	difin0 4433
[Suppes] p. 29	Theorem 38	disjdif 4431
[Suppes] p. 29	Theorem 39	difundi 4249
[Suppes] p. 29	Theorem 40	difindi 4251
[Suppes] p. 30	Theorem 41	nalset 5263
[Suppes] p. 39	Theorem 61	uniss 4875
[Suppes] p. 39	Theorem 65	uniop 5470
[Suppes] p. 41	Theorem 70	intsn 4944
[Suppes] p. 42	Theorem 71	intpr 4942  intprg 4941
[Suppes] p. 42	Theorem 73	op1stb 5426
[Suppes] p. 42	Theorem 78	intun 4940
[Suppes] p. 44	Definition 15(a)	dfiun2 4992  dfiun2g 4990
[Suppes] p. 44	Definition 15(b)	dfiin2 4993
[Suppes] p. 47	Theorem 86	elpw 4563  elpw2 5284  elpw2g 5283  elpwg 4562  elpwgdedVD 44899
[Suppes] p. 47	Theorem 87	pwid 4581
[Suppes] p. 47	Theorem 89	pw0 4772
[Suppes] p. 48	Theorem 90	pwpw0 4773
[Suppes] p. 52	Theorem 101	xpss12 5646
[Suppes] p. 52	Theorem 102	xpindi 5787  xpindir 5788
[Suppes] p. 52	Theorem 103	xpundi 5700  xpundir 5701
[Suppes] p. 54	Theorem 105	elirrv 9525
[Suppes] p. 58	Theorem 2	relss 5736
[Suppes] p. 59	Theorem 4	eldm 5854  eldm2 5855  eldm2g 5853  eldmg 5852
[Suppes] p. 59	Definition 3	df-dm 5641
[Suppes] p. 60	Theorem 6	dmin 5865
[Suppes] p. 60	Theorem 8	rnun 6106
[Suppes] p. 60	Theorem 9	rnin 6107
[Suppes] p. 60	Definition 4	dfrn2 5842
[Suppes] p. 61	Theorem 11	brcnv 5836  brcnvg 5833
[Suppes] p. 62	Equation 5	elcnv 5830  elcnv2 5831
[Suppes] p. 62	Theorem 12	relcnv 6064
[Suppes] p. 62	Theorem 15	cnvin 6105
[Suppes] p. 62	Theorem 16	cnvun 6103
[Suppes] p. 63	Definition	dftrrels2 38559
[Suppes] p. 63	Theorem 20	co02 6221
[Suppes] p. 63	Theorem 21	dmcoss 5927
[Suppes] p. 63	Definition 7	df-co 5640
[Suppes] p. 64	Theorem 26	cnvco 5839
[Suppes] p. 64	Theorem 27	coass 6226
[Suppes] p. 65	Theorem 31	resundi 5953
[Suppes] p. 65	Theorem 34	elima 6025  elima2 6026  elima3 6027  elimag 6024
[Suppes] p. 65	Theorem 35	imaundi 6110
[Suppes] p. 66	Theorem 40	dminss 6114
[Suppes] p. 66	Theorem 41	imainss 6115
[Suppes] p. 67	Exercise 11	cnvxp 6118
[Suppes] p. 81	Definition 34	dfec2 8651
[Suppes] p. 82	Theorem 72	elec 8694  elecALTV 38248  elecg 8692
[Suppes] p. 82	Theorem 73	eqvrelth 38595  erth 8702  erth2 8703
[Suppes] p. 83	Theorem 74	eqvreldisj 38598  erdisj 8705
[Suppes] p. 83	Definition 35,	df-parts 38750  dfmembpart2 38755
[Suppes] p. 89	Theorem 96	map0b 8833
[Suppes] p. 89	Theorem 97	map0 8837  map0g 8834
[Suppes] p. 89	Theorem 98	mapsn 8838  mapsnd 8836
[Suppes] p. 89	Theorem 99	mapss 8839
[Suppes] p. 91	Definition 12(ii)	alephsuc 9997
[Suppes] p. 91	Definition 12(iii)	alephlim 9996
[Suppes] p. 92	Theorem 1	enref 8933  enrefg 8932
[Suppes] p. 92	Theorem 2	ensym 8951  ensymb 8950  ensymi 8952
[Suppes] p. 92	Theorem 3	entr 8954
[Suppes] p. 92	Theorem 4	unen 8994
[Suppes] p. 94	Theorem 15	endom 8927
[Suppes] p. 94	Theorem 16	ssdomg 8948
[Suppes] p. 94	Theorem 17	domtr 8955
[Suppes] p. 95	Theorem 18	sbth 9038
[Suppes] p. 97	Theorem 23	canth2 9071  canth2g 9072
[Suppes] p. 97	Definition 3	brsdom2 9042  df-sdom 8898  dfsdom2 9041
[Suppes] p. 97	Theorem 21(i)	sdomirr 9055
[Suppes] p. 97	Theorem 22(i)	domnsym 9044
[Suppes] p. 97	Theorem 21(ii)	sdomnsym 9043
[Suppes] p. 97	Theorem 22(ii)	domsdomtr 9053
[Suppes] p. 97	Theorem 22(iv)	brdom2 8930
[Suppes] p. 97	Theorem 21(iii)	sdomtr 9056
[Suppes] p. 97	Theorem 22(iii)	sdomdomtr 9051
[Suppes] p. 98	Exercise 4	fundmen 8979  fundmeng 8980
[Suppes] p. 98	Exercise 6	xpdom3 9016
[Suppes] p. 98	Exercise 11	sdomentr 9052
[Suppes] p. 104	Theorem 37	fofi 9238
[Suppes] p. 104	Theorem 38	pwfi 9244
[Suppes] p. 105	Theorem 40	pwfi 9244
[Suppes] p. 111	Axiom for cardinal numbers	carden 10480
[Suppes] p. 130	Definition 3	df-tr 5210
[Suppes] p. 132	Theorem 9	ssonuni 7736
[Suppes] p. 134	Definition 6	df-suc 6326
[Suppes] p. 136	Theorem Schema 22	findes 7856  finds 7852  finds1 7855  finds2 7854
[Suppes] p. 151	Theorem 42	isfinite 9581  isfinite2 9221  isfiniteg 9224  unbnn 9219
[Suppes] p. 162	Definition 5	df-ltnq 10847  df-ltpq 10839
[Suppes] p. 197	Theorem Schema 4	tfindes 7819  tfinds 7816  tfinds2 7820
[Suppes] p. 209	Theorem 18	oaord1 8492
[Suppes] p. 209	Theorem 21	oaword2 8494
[Suppes] p. 211	Theorem 25	oaass 8502
[Suppes] p. 225	Definition 8	iscard2 9905
[Suppes] p. 227	Theorem 56	ondomon 10492
[Suppes] p. 228	Theorem 59	harcard 9907
[Suppes] p. 228	Definition 12(i)	aleph0 9995
[Suppes] p. 228	Theorem Schema 61	onintss 6372
[Suppes] p. 228	Theorem Schema 62	onminesb 7749  onminsb 7750
[Suppes] p. 229	Theorem 64	alephval2 10501
[Suppes] p. 229	Theorem 65	alephcard 9999
[Suppes] p. 229	Theorem 66	alephord2i 10006
[Suppes] p. 229	Theorem 67	alephnbtwn 10000
[Suppes] p. 229	Definition 12	df-aleph 9869
[Suppes] p. 242	Theorem 6	weth 10424
[Suppes] p. 242	Theorem 8	entric 10486
[Suppes] p. 242	Theorem 9	carden 10480
[Szendrei] p. 11	Line 6	df-cloneop 35676
[Szendrei] p. 11	Paragraph 3	df-suppos 35680
[TakeutiZaring] p. 8	Axiom 1	ax-ext 2701
[TakeutiZaring] p. 13	Definition 4.5	df-cleq 2721
[TakeutiZaring] p. 13	Proposition 4.6	df-clel 2803
[TakeutiZaring] p. 13	Proposition 4.9	cvjust 2723
[TakeutiZaring] p. 13	Proposition 4.7(3)	eqtr 2749
[TakeutiZaring] p. 14	Definition 4.16	df-oprab 7373
[TakeutiZaring] p. 14	Proposition 4.14	ru 3748
[TakeutiZaring] p. 15	Axiom 2	zfpair 5371
[TakeutiZaring] p. 15	Exercise 1	elpr 4610  elpr2 4612  elpr2g 4611  elprg 4608
[TakeutiZaring] p. 15	Exercise 2	elsn 4600  elsn2 4625  elsn2g 4624  elsng 4599  velsn 4601
[TakeutiZaring] p. 15	Exercise 3	elop 5422
[TakeutiZaring] p. 15	Exercise 4	sneq 4595  sneqr 4800
[TakeutiZaring] p. 15	Definition 5.1	dfpr2 4606  dfsn2 4598  dfsn2ALT 4607
[TakeutiZaring] p. 16	Axiom 3	uniex 7697
[TakeutiZaring] p. 16	Exercise 6	opth 5431
[TakeutiZaring] p. 16	Exercise 7	opex 5419
[TakeutiZaring] p. 16	Exercise 8	rext 5403
[TakeutiZaring] p. 16	Corollary 5.8	unex 7700  unexg 7699
[TakeutiZaring] p. 16	Definition 5.3	dftp2 4651
[TakeutiZaring] p. 16	Definition 5.5	df-uni 4868
[TakeutiZaring] p. 16	Definition 5.6	df-in 3918  df-un 3916
[TakeutiZaring] p. 16	Proposition 5.7	unipr 4884  uniprg 4883
[TakeutiZaring] p. 17	Axiom 4	vpwex 5327
[TakeutiZaring] p. 17	Exercise 1	eltp 4649
[TakeutiZaring] p. 17	Exercise 5	elsuc 6392  elsucg 6390  sstr2 3950
[TakeutiZaring] p. 17	Exercise 6	uncom 4117
[TakeutiZaring] p. 17	Exercise 7	incom 4168
[TakeutiZaring] p. 17	Exercise 8	unass 4131
[TakeutiZaring] p. 17	Exercise 9	inass 4187
[TakeutiZaring] p. 17	Exercise 10	indi 4243
[TakeutiZaring] p. 17	Exercise 11	undi 4244
[TakeutiZaring] p. 17	Definition 5.9	df-pss 3931  df-ss 3928
[TakeutiZaring] p. 17	Definition 5.10	df-pw 4561
[TakeutiZaring] p. 18	Exercise 7	unss2 4146
[TakeutiZaring] p. 18	Exercise 9	dfss2 3929  sseqin2 4182
[TakeutiZaring] p. 18	Exercise 10	ssid 3966
[TakeutiZaring] p. 18	Exercise 12	inss1 4196  inss2 4197
[TakeutiZaring] p. 18	Exercise 13	nss 4008
[TakeutiZaring] p. 18	Exercise 15	unieq 4878
[TakeutiZaring] p. 18	Exercise 18	sspwb 5404  sspwimp 44900  sspwimpALT 44907  sspwimpALT2 44910  sspwimpcf 44902
[TakeutiZaring] p. 18	Exercise 19	pweqb 5411
[TakeutiZaring] p. 19	Axiom 5	ax-rep 5229
[TakeutiZaring] p. 20	Definition	df-rab 3403
[TakeutiZaring] p. 20	Corollary 5.16	0ex 5257
[TakeutiZaring] p. 20	Definition 5.12	df-dif 3914
[TakeutiZaring] p. 20	Definition 5.14	dfnul2 4295
[TakeutiZaring] p. 20	Proposition 5.15	difid 4335
[TakeutiZaring] p. 20	Proposition 5.17(1)	n0 4312  n0f 4308  neq0 4311  neq0f 4307
[TakeutiZaring] p. 21	Axiom 6	zfreg 9524
[TakeutiZaring] p. 21	Axiom 6'	zfregs 9661
[TakeutiZaring] p. 21	Theorem 5.22	setind 9663
[TakeutiZaring] p. 21	Definition 5.20	df-v 3446
[TakeutiZaring] p. 21	Proposition 5.21	vprc 5265
[TakeutiZaring] p. 22	Exercise 1	0ss 4359
[TakeutiZaring] p. 22	Exercise 3	ssex 5271  ssexg 5273
[TakeutiZaring] p. 22	Exercise 4	inex1 5267
[TakeutiZaring] p. 22	Exercise 5	ruv 9531
[TakeutiZaring] p. 22	Exercise 6	elirr 9526
[TakeutiZaring] p. 22	Exercise 7	ssdif0 4325
[TakeutiZaring] p. 22	Exercise 11	difdif 4094
[TakeutiZaring] p. 22	Exercise 13	undif3 4259  undif3VD 44864
[TakeutiZaring] p. 22	Exercise 14	difss 4095
[TakeutiZaring] p. 22	Exercise 15	sscon 4102
[TakeutiZaring] p. 22	Definition 4.15(3)	df-ral 3045
[TakeutiZaring] p. 22	Definition 4.15(4)	df-rex 3054
[TakeutiZaring] p. 23	Proposition 6.2	xpex 7709  xpexg 7706
[TakeutiZaring] p. 23	Definition 6.4(1)	df-rel 5638
[TakeutiZaring] p. 23	Definition 6.4(2)	fun2cnv 6571
[TakeutiZaring] p. 24	Definition 6.4(3)	f1cnvcnv 6747  fun11 6574
[TakeutiZaring] p. 24	Definition 6.4(4)	dffun4 6513  svrelfun 6572
[TakeutiZaring] p. 24	Definition 6.5(1)	dfdm3 5841
[TakeutiZaring] p. 24	Definition 6.5(2)	dfrn3 5843
[TakeutiZaring] p. 24	Definition 6.6(1)	df-res 5643
[TakeutiZaring] p. 24	Definition 6.6(2)	df-ima 5644
[TakeutiZaring] p. 24	Definition 6.6(3)	df-co 5640
[TakeutiZaring] p. 25	Exercise 2	cnvcnvss 6155  dfrel2 6150
[TakeutiZaring] p. 25	Exercise 3	xpss 5647
[TakeutiZaring] p. 25	Exercise 5	relun 5765
[TakeutiZaring] p. 25	Exercise 6	reluni 5772
[TakeutiZaring] p. 25	Exercise 9	inxp 5785
[TakeutiZaring] p. 25	Exercise 12	relres 5965
[TakeutiZaring] p. 25	Exercise 13	opelres 5945  opelresi 5947
[TakeutiZaring] p. 25	Exercise 14	dmres 5972
[TakeutiZaring] p. 25	Exercise 15	resss 5961
[TakeutiZaring] p. 25	Exercise 17	resabs1 5966
[TakeutiZaring] p. 25	Exercise 18	funres 6542
[TakeutiZaring] p. 25	Exercise 24	relco 6068
[TakeutiZaring] p. 25	Exercise 29	funco 6540
[TakeutiZaring] p. 25	Exercise 30	f1co 6749
[TakeutiZaring] p. 26	Definition 6.10	eu2 2602
[TakeutiZaring] p. 26	Definition 6.11	conventions 30379  df-fv 6507  fv3 6858
[TakeutiZaring] p. 26	Corollary 6.8(1)	cnvex 7881  cnvexg 7880
[TakeutiZaring] p. 26	Corollary 6.8(2)	dmex 7865  dmexg 7857
[TakeutiZaring] p. 26	Corollary 6.8(3)	rnex 7866  rnexg 7858
[TakeutiZaring] p. 26	Corollary 6.9(1)	xpexb 44436
[TakeutiZaring] p. 26	Corollary 6.9(2)	xpexcnv 7876
[TakeutiZaring] p. 27	Corollary 6.13	fvex 6853
[TakeutiZaring] p. 27	Theorem 6.12(1)	tz6.12-1-afv 47168  tz6.12-1-afv2 47235  tz6.12-1 6863  tz6.12-afv 47167  tz6.12-afv2 47234  tz6.12 6865  tz6.12c-afv2 47236  tz6.12c 6862
[TakeutiZaring] p. 27	Theorem 6.12(2)	tz6.12-2-afv2 47231  tz6.12-2 6828  tz6.12i-afv2 47237  tz6.12i 6868
[TakeutiZaring] p. 27	Definition 6.15(1)	df-fn 6502
[TakeutiZaring] p. 27	Definition 6.15(3)	df-f 6503
[TakeutiZaring] p. 27	Definition 6.15(4)	df-fo 6505  wfo 6497
[TakeutiZaring] p. 27	Definition 6.15(5)	df-f1 6504  wf1 6496
[TakeutiZaring] p. 27	Definition 6.15(6)	df-f1o 6506  wf1o 6498
[TakeutiZaring] p. 28	Exercise 4	eqfnfv 6985  eqfnfv2 6986  eqfnfv2f 6989
[TakeutiZaring] p. 28	Exercise 5	fvco 6941
[TakeutiZaring] p. 28	Theorem 6.16(1)	fnex 7173
[TakeutiZaring] p. 28	Proposition 6.17	resfunexg 7171
[TakeutiZaring] p. 29	Exercise 9	funimaex 6588  funimaexg 6587
[TakeutiZaring] p. 29	Definition 6.18	df-br 5103
[TakeutiZaring] p. 29	Definition 6.19(1)	df-so 5540
[TakeutiZaring] p. 30	Definition 6.21	dffr2 5592  dffr3 6059  eliniseg 6054  iniseg 6057
[TakeutiZaring] p. 30	Definition 6.22	df-eprel 5531
[TakeutiZaring] p. 30	Proposition 6.23	fr2nr 5608  fr3nr 7728  frirr 5607
[TakeutiZaring] p. 30	Definition 6.24(1)	df-fr 5584
[TakeutiZaring] p. 30	Definition 6.24(2)	dfwe2 7730
[TakeutiZaring] p. 31	Exercise 1	frss 5595
[TakeutiZaring] p. 31	Exercise 4	wess 5617
[TakeutiZaring] p. 31	Proposition 6.26	tz6.26 6308  tz6.26i 6309  wefrc 5625  wereu2 5628
[TakeutiZaring] p. 32	Theorem 6.27	wfi 6310  wfii 6311
[TakeutiZaring] p. 32	Definition 6.28	df-isom 6508
[TakeutiZaring] p. 33	Proposition 6.30(1)	isoid 7286
[TakeutiZaring] p. 33	Proposition 6.30(2)	isocnv 7287
[TakeutiZaring] p. 33	Proposition 6.30(3)	isotr 7293
[TakeutiZaring] p. 33	Proposition 6.31(1)	isomin 7294
[TakeutiZaring] p. 33	Proposition 6.31(2)	isoini 7295
[TakeutiZaring] p. 33	Proposition 6.32(1)	isofr 7299
[TakeutiZaring] p. 33	Proposition 6.32(3)	isowe 7306
[TakeutiZaring] p. 34	Proposition 6.33	f1oiso 7308
[TakeutiZaring] p. 35	Notation	wtr 5209
[TakeutiZaring] p. 35	Theorem 7.2	trelpss 44437  tz7.2 5614
[TakeutiZaring] p. 35	Definition 7.1	dftr3 5215
[TakeutiZaring] p. 36	Proposition 7.4	ordwe 6333
[TakeutiZaring] p. 36	Proposition 7.5	tz7.5 6341
[TakeutiZaring] p. 36	Proposition 7.6	ordelord 6342  ordelordALT 44520  ordelordALTVD 44849
[TakeutiZaring] p. 37	Corollary 7.8	ordelpss 6348  ordelssne 6347
[TakeutiZaring] p. 37	Proposition 7.7	tz7.7 6346
[TakeutiZaring] p. 37	Proposition 7.9	ordin 6350
[TakeutiZaring] p. 38	Corollary 7.14	ordeleqon 7738
[TakeutiZaring] p. 38	Corollary 7.15	ordsson 7739
[TakeutiZaring] p. 38	Definition 7.11	df-on 6324
[TakeutiZaring] p. 38	Proposition 7.10	ordtri3or 6352
[TakeutiZaring] p. 38	Proposition 7.12	onfrALT 44532  ordon 7733
[TakeutiZaring] p. 38	Proposition 7.13	onprc 7734
[TakeutiZaring] p. 39	Theorem 7.17	tfi 7809
[TakeutiZaring] p. 40	Exercise 3	ontr2 6368
[TakeutiZaring] p. 40	Exercise 7	dftr2 5211
[TakeutiZaring] p. 40	Exercise 9	onssmin 7748
[TakeutiZaring] p. 40	Exercise 11	unon 7786
[TakeutiZaring] p. 40	Exercise 12	ordun 6426
[TakeutiZaring] p. 40	Exercise 14	ordequn 6425
[TakeutiZaring] p. 40	Proposition 7.19	ssorduni 7735
[TakeutiZaring] p. 40	Proposition 7.20	elssuni 4897
[TakeutiZaring] p. 41	Definition 7.22	df-suc 6326
[TakeutiZaring] p. 41	Proposition 7.23	sssucid 6402  sucidg 6403
[TakeutiZaring] p. 41	Proposition 7.24	onsuc 7767
[TakeutiZaring] p. 41	Proposition 7.25	onnbtwn 6416  ordnbtwn 6415
[TakeutiZaring] p. 41	Proposition 7.26	onsucuni 7783
[TakeutiZaring] p. 42	Exercise 1	df-lim 6325
[TakeutiZaring] p. 42	Exercise 4	omssnlim 7837
[TakeutiZaring] p. 42	Exercise 7	ssnlim 7842
[TakeutiZaring] p. 42	Exercise 8	onsucssi 7797  ordelsuc 7775
[TakeutiZaring] p. 42	Exercise 9	ordsucelsuc 7777
[TakeutiZaring] p. 42	Definition 7.27	nlimon 7807
[TakeutiZaring] p. 42	Definition 7.28	dfom2 7824
[TakeutiZaring] p. 42	Proposition 7.30(1)	peano1 7845
[TakeutiZaring] p. 42	Proposition 7.30(2)	peano2 7846
[TakeutiZaring] p. 42	Proposition 7.30(3)	peano3 7847
[TakeutiZaring] p. 43	Remark	omon 7834
[TakeutiZaring] p. 43	Axiom 7	inf3 9564  omex 9572
[TakeutiZaring] p. 43	Theorem 7.32	ordom 7832
[TakeutiZaring] p. 43	Corollary 7.31	find 7851
[TakeutiZaring] p. 43	Proposition 7.30(4)	peano4 7848
[TakeutiZaring] p. 43	Proposition 7.30(5)	peano5 7849
[TakeutiZaring] p. 44	Exercise 1	limomss 7827
[TakeutiZaring] p. 44	Exercise 2	int0 4922
[TakeutiZaring] p. 44	Exercise 3	trintss 5228
[TakeutiZaring] p. 44	Exercise 4	intss1 4923
[TakeutiZaring] p. 44	Exercise 5	intex 5294
[TakeutiZaring] p. 44	Exercise 6	oninton 7751
[TakeutiZaring] p. 44	Exercise 11	ordintdif 6371
[TakeutiZaring] p. 44	Definition 7.35	df-int 4907
[TakeutiZaring] p. 44	Proposition 7.34	noinfep 9589
[TakeutiZaring] p. 45	Exercise 4	onint 7746
[TakeutiZaring] p. 47	Lemma 1	tfrlem1 8321
[TakeutiZaring] p. 47	Theorem 7.41(1)	tfr1 8342
[TakeutiZaring] p. 47	Theorem 7.41(2)	tfr2 8343
[TakeutiZaring] p. 47	Theorem 7.41(3)	tfr3 8344
[TakeutiZaring] p. 49	Theorem 7.44	tz7.44-1 8351  tz7.44-2 8352  tz7.44-3 8353
[TakeutiZaring] p. 50	Exercise 1	smogt 8313
[TakeutiZaring] p. 50	Exercise 3	smoiso 8308
[TakeutiZaring] p. 50	Definition 7.46	df-smo 8292
[TakeutiZaring] p. 51	Proposition 7.49	tz7.49 8390  tz7.49c 8391
[TakeutiZaring] p. 51	Proposition 7.48(1)	tz7.48-1 8388
[TakeutiZaring] p. 51	Proposition 7.48(2)	tz7.48-2 8387
[TakeutiZaring] p. 51	Proposition 7.48(3)	tz7.48-3 8389
[TakeutiZaring] p. 53	Proposition 7.53	2eu5 2649
[TakeutiZaring] p. 54	Proposition 7.56(1)	leweon 9940
[TakeutiZaring] p. 54	Proposition 7.58(1)	r0weon 9941
[TakeutiZaring] p. 56	Definition 8.1	oalim 8473  oasuc 8465
[TakeutiZaring] p. 57	Remark	tfindsg 7817
[TakeutiZaring] p. 57	Proposition 8.2	oacl 8476
[TakeutiZaring] p. 57	Proposition 8.3	oa0 8457  oa0r 8479
[TakeutiZaring] p. 57	Proposition 8.16	omcl 8477
[TakeutiZaring] p. 58	Corollary 8.5	oacan 8489
[TakeutiZaring] p. 58	Proposition 8.4	nnaord 8560  nnaordi 8559  oaord 8488  oaordi 8487
[TakeutiZaring] p. 59	Proposition 8.6	iunss2 5008  uniss2 4901
[TakeutiZaring] p. 59	Proposition 8.7	oawordri 8491
[TakeutiZaring] p. 59	Proposition 8.8	oawordeu 8496  oawordex 8498
[TakeutiZaring] p. 59	Proposition 8.9	nnacl 8552
[TakeutiZaring] p. 59	Proposition 8.10	oaabs 8589
[TakeutiZaring] p. 60	Remark	oancom 9580
[TakeutiZaring] p. 60	Proposition 8.11	oalimcl 8501
[TakeutiZaring] p. 62	Exercise 1	nnarcl 8557
[TakeutiZaring] p. 62	Exercise 5	oaword1 8493
[TakeutiZaring] p. 62	Definition 8.15	om0x 8460  omlim 8474  omsuc 8467
[TakeutiZaring] p. 62	Definition 8.15(a)	om0 8458
[TakeutiZaring] p. 63	Proposition 8.17	nnecl 8554  nnmcl 8553
[TakeutiZaring] p. 63	Proposition 8.19	nnmord 8573  nnmordi 8572  omord 8509  omordi 8507
[TakeutiZaring] p. 63	Proposition 8.20	omcan 8510
[TakeutiZaring] p. 63	Proposition 8.21	nnmwordri 8577  omwordri 8513
[TakeutiZaring] p. 63	Proposition 8.18(1)	om0r 8480
[TakeutiZaring] p. 63	Proposition 8.18(2)	om1 8483  om1r 8484
[TakeutiZaring] p. 64	Proposition 8.22	om00 8516
[TakeutiZaring] p. 64	Proposition 8.23	omordlim 8518
[TakeutiZaring] p. 64	Proposition 8.24	omlimcl 8519
[TakeutiZaring] p. 64	Proposition 8.25	odi 8520
[TakeutiZaring] p. 65	Theorem 8.26	omass 8521
[TakeutiZaring] p. 67	Definition 8.30	nnesuc 8549  oe0 8463  oelim 8475  oesuc 8468  onesuc 8471
[TakeutiZaring] p. 67	Proposition 8.31	oe0m0 8461
[TakeutiZaring] p. 67	Proposition 8.32	oen0 8527
[TakeutiZaring] p. 67	Proposition 8.33	oeordi 8528
[TakeutiZaring] p. 67	Proposition 8.31(2)	oe0m1 8462
[TakeutiZaring] p. 67	Proposition 8.31(3)	oe1m 8486
[TakeutiZaring] p. 68	Corollary 8.34	oeord 8529
[TakeutiZaring] p. 68	Corollary 8.36	oeordsuc 8535
[TakeutiZaring] p. 68	Proposition 8.35	oewordri 8533
[TakeutiZaring] p. 68	Proposition 8.37	oeworde 8534
[TakeutiZaring] p. 69	Proposition 8.41	oeoa 8538
[TakeutiZaring] p. 70	Proposition 8.42	oeoe 8540
[TakeutiZaring] p. 73	Theorem 9.1	trcl 9657  tz9.1 9658
[TakeutiZaring] p. 76	Definition 9.9	df-r1 9693  r10 9697  r1lim 9701  r1limg 9700  r1suc 9699  r1sucg 9698
[TakeutiZaring] p. 77	Proposition 9.10(2)	r1ord 9709  r1ord2 9710  r1ordg 9707
[TakeutiZaring] p. 78	Proposition 9.12	tz9.12 9719
[TakeutiZaring] p. 78	Proposition 9.13	rankwflem 9744  tz9.13 9720  tz9.13g 9721
[TakeutiZaring] p. 79	Definition 9.14	df-rank 9694  rankval 9745  rankvalb 9726  rankvalg 9746
[TakeutiZaring] p. 79	Proposition 9.16	rankel 9768  rankelb 9753
[TakeutiZaring] p. 79	Proposition 9.17	rankuni2b 9782  rankval3 9769  rankval3b 9755
[TakeutiZaring] p. 79	Proposition 9.18	rankonid 9758
[TakeutiZaring] p. 79	Proposition 9.15(1)	rankon 9724
[TakeutiZaring] p. 79	Proposition 9.15(2)	rankr1 9763  rankr1c 9750  rankr1g 9761
[TakeutiZaring] p. 79	Proposition 9.15(3)	ssrankr1 9764
[TakeutiZaring] p. 80	Exercise 1	rankss 9778  rankssb 9777
[TakeutiZaring] p. 80	Exercise 2	unbndrank 9771
[TakeutiZaring] p. 80	Proposition 9.19	bndrank 9770
[TakeutiZaring] p. 83	Axiom of Choice	ac4 10404  dfac3 10050
[TakeutiZaring] p. 84	Theorem 10.3	dfac8a 9959  numth 10401  numth2 10400
[TakeutiZaring] p. 85	Definition 10.4	cardval 10475
[TakeutiZaring] p. 85	Proposition 10.5	cardid 10476  cardid2 9882
[TakeutiZaring] p. 85	Proposition 10.9	oncard 9889
[TakeutiZaring] p. 85	Proposition 10.10	carden 10480
[TakeutiZaring] p. 85	Proposition 10.11	cardidm 9888
[TakeutiZaring] p. 85	Proposition 10.6(1)	cardon 9873
[TakeutiZaring] p. 85	Proposition 10.6(2)	cardne 9894
[TakeutiZaring] p. 85	Proposition 10.6(3)	cardonle 9886
[TakeutiZaring] p. 87	Proposition 10.15	pwen 9091
[TakeutiZaring] p. 88	Exercise 1	en0 8966
[TakeutiZaring] p. 88	Exercise 7	infensuc 9096
[TakeutiZaring] p. 89	Exercise 10	omxpen 9020
[TakeutiZaring] p. 90	Corollary 10.23	cardnn 9892
[TakeutiZaring] p. 90	Definition 10.27	alephiso 10027
[TakeutiZaring] p. 90	Proposition 10.20	nneneq 9147
[TakeutiZaring] p. 90	Proposition 10.22	onomeneq 9155
[TakeutiZaring] p. 90	Proposition 10.26	alephprc 10028
[TakeutiZaring] p. 90	Corollary 10.21(1)	php5 9152
[TakeutiZaring] p. 91	Exercise 2	alephle 10017
[TakeutiZaring] p. 91	Exercise 3	aleph0 9995
[TakeutiZaring] p. 91	Exercise 4	cardlim 9901
[TakeutiZaring] p. 91	Exercise 7	infpss 10145
[TakeutiZaring] p. 91	Exercise 8	infcntss 9249
[TakeutiZaring] p. 91	Definition 10.29	df-fin 8899  isfi 8924
[TakeutiZaring] p. 92	Proposition 10.32	onfin 9156
[TakeutiZaring] p. 92	Proposition 10.34	imadomg 10463
[TakeutiZaring] p. 92	Proposition 10.33(2)	xpdom2 9013
[TakeutiZaring] p. 93	Proposition 10.35	fodomb 10455
[TakeutiZaring] p. 93	Proposition 10.36	djuxpdom 10115  unxpdom 9176
[TakeutiZaring] p. 93	Proposition 10.37	cardsdomel 9903  cardsdomelir 9902
[TakeutiZaring] p. 93	Proposition 10.38	sucxpdom 9178
[TakeutiZaring] p. 94	Proposition 10.39	infxpen 9943
[TakeutiZaring] p. 95	Definition 10.42	df-map 8778
[TakeutiZaring] p. 95	Proposition 10.40	infxpidm 10491  infxpidm2 9946
[TakeutiZaring] p. 95	Proposition 10.41	infdju 10136  infxp 10143
[TakeutiZaring] p. 96	Proposition 10.44	pw2en 9025  pw2f1o 9023
[TakeutiZaring] p. 96	Proposition 10.45	mapxpen 9084
[TakeutiZaring] p. 97	Theorem 10.46	ac6s3 10416
[TakeutiZaring] p. 98	Theorem 10.46	ac6c5 10411  ac6s5 10420
[TakeutiZaring] p. 98	Theorem 10.47	unidom 10472
[TakeutiZaring] p. 99	Theorem 10.48	uniimadom 10473  uniimadomf 10474
[TakeutiZaring] p. 100	Definition 11.1	cfcof 10203
[TakeutiZaring] p. 101	Proposition 11.7	cofsmo 10198
[TakeutiZaring] p. 102	Exercise 1	cfle 10183
[TakeutiZaring] p. 102	Exercise 2	cf0 10180
[TakeutiZaring] p. 102	Exercise 3	cfsuc 10186
[TakeutiZaring] p. 102	Exercise 4	cfom 10193
[TakeutiZaring] p. 102	Proposition 11.9	coftr 10202
[TakeutiZaring] p. 103	Theorem 11.15	alephreg 10511
[TakeutiZaring] p. 103	Proposition 11.11	cardcf 10181
[TakeutiZaring] p. 103	Proposition 11.13	alephsing 10205
[TakeutiZaring] p. 104	Corollary 11.17	cardinfima 10026
[TakeutiZaring] p. 104	Proposition 11.16	carduniima 10025
[TakeutiZaring] p. 104	Proposition 11.18	alephfp 10037  alephfp2 10038
[TakeutiZaring] p. 106	Theorem 11.20	gchina 10628
[TakeutiZaring] p. 106	Theorem 11.21	mappwen 10041
[TakeutiZaring] p. 107	Theorem 11.26	konigth 10498
[TakeutiZaring] p. 108	Theorem 11.28	pwcfsdom 10512
[TakeutiZaring] p. 108	Theorem 11.29	cfpwsdom 10513
[Tarski] p. 67	Axiom B5	ax-c5 38869
[Tarski] p. 67	Scheme B5	sp 2184
[Tarski] p. 68	Lemma 6	avril1 30442  equid 2012
[Tarski] p. 69	Lemma 7	equcomi 2017
[Tarski] p. 70	Lemma 14	spim 2385  spime 2387  spimew 1971
[Tarski] p. 70	Lemma 16	ax-12 2178  ax-c15 38875  ax12i 1966
[Tarski] p. 70	Lemmas 16 and 17	sb6 2086
[Tarski] p. 75	Axiom B7	ax6v 1968
[Tarski] p. 77	Axiom B6 (p. 75) of system S2	ax-5 1910  ax5ALT 38893
[Tarski], p. 75	Scheme B8 of system S2	ax-7 2008  ax-8 2111  ax-9 2119
[Tarski1999] p. 178	Axiom 4	axtgsegcon 28444
[Tarski1999] p. 178	Axiom 5	axtg5seg 28445
[Tarski1999] p. 179	Axiom 7	axtgpasch 28447
[Tarski1999] p. 180	Axiom 7.1	axtgpasch 28447
[Tarski1999] p. 185	Axiom 11	axtgcont1 28448
[Truss] p. 114	Theorem 5.18	ruc 16187
[Viaclovsky7] p. 3	Corollary 0.3	mblfinlem3 37646
[Viaclovsky8] p. 3	Proposition 7	ismblfin 37648
[Weierstrass] p. 272	Definition	df-mdet 22505  mdetuni 22542
[WhiteheadRussell] p. 96	Axiom *1.2	pm1.2 903
[WhiteheadRussell] p. 96	Axiom *1.3	olc 868
[WhiteheadRussell] p. 96	Axiom *1.4	pm1.4 869
[WhiteheadRussell] p. 96	Axiom *1.5 (Assoc)	pm1.5 919
[WhiteheadRussell] p. 97	Axiom *1.6 (Sum)	orim2 969
[WhiteheadRussell] p. 100	Theorem *2.01	pm2.01 188
[WhiteheadRussell] p. 100	Theorem *2.02	ax-1 6
[WhiteheadRussell] p. 100	Theorem *2.03	con2 135
[WhiteheadRussell] p. 100	Theorem *2.04	pm2.04 90  wl-luk-pm2.04 37426
[WhiteheadRussell] p. 100	Theorem *2.05	frege5 43782  imim2 58  wl-luk-imim2 37421
[WhiteheadRussell] p. 100	Theorem *2.06	adh-minimp-imim1 47013  imim1 83
[WhiteheadRussell] p. 101	Theorem *2.1	pm2.1 896
[WhiteheadRussell] p. 101	Theorem *2.06	barbara 2656  syl 17
[WhiteheadRussell] p. 101	Theorem *2.07	pm2.07 902
[WhiteheadRussell] p. 101	Theorem *2.08	id 22  wl-luk-id 37424
[WhiteheadRussell] p. 101	Theorem *2.11	exmid 894
[WhiteheadRussell] p. 101	Theorem *2.12	notnot 142
[WhiteheadRussell] p. 101	Theorem *2.13	pm2.13 897
[WhiteheadRussell] p. 102	Theorem *2.14	notnotr 130  notnotrALT2 44909  wl-luk-notnotr 37425
[WhiteheadRussell] p. 102	Theorem *2.15	con1 146
[WhiteheadRussell] p. 103	Theorem *2.16	ax-frege28 43812  axfrege28 43811  con3 153
[WhiteheadRussell] p. 103	Theorem *2.17	ax-3 8
[WhiteheadRussell] p. 103	Theorem *2.18	pm2.18 128
[WhiteheadRussell] p. 104	Theorem *2.2	orc 867
[WhiteheadRussell] p. 104	Theorem *2.3	pm2.3 924
[WhiteheadRussell] p. 104	Theorem *2.21	pm2.21 123  wl-luk-pm2.21 37418
[WhiteheadRussell] p. 104	Theorem *2.24	pm2.24 124
[WhiteheadRussell] p. 104	Theorem *2.25	pm2.25 889
[WhiteheadRussell] p. 104	Theorem *2.26	pm2.26 941
[WhiteheadRussell] p. 104	Theorem *2.27	conventions-labels 30380  pm2.27 42  wl-luk-pm2.27 37416
[WhiteheadRussell] p. 104	Theorem *2.31	pm2.31 922
[WhiteheadRussell] p. 104	Proof begins with references *2.21 ( ~ pm2.21 ) and *14.26 ( ~ eupickbi )	mopickr 38338
[WhiteheadRussell] p. 105	Theorem *2.32	pm2.32 923
[WhiteheadRussell] p. 105	Theorem *2.36	pm2.36 971
[WhiteheadRussell] p. 105	Theorem *2.37	pm2.37 972
[WhiteheadRussell] p. 105	Theorem *2.38	pm2.38 970
[WhiteheadRussell] p. 105	Definition *2.33	df-3or 1087
[WhiteheadRussell] p. 106	Theorem *2.4	pm2.4 906
[WhiteheadRussell] p. 106	Theorem *2.41	pm2.41 907
[WhiteheadRussell] p. 106	Theorem *2.42	pm2.42 944
[WhiteheadRussell] p. 106	Theorem *2.43	pm2.43 56
[WhiteheadRussell] p. 106	Theorem *2.45	pm2.45 881
[WhiteheadRussell] p. 106	Theorem *2.46	pm2.46 882
[WhiteheadRussell] p. 107	Theorem *2.5	pm2.5 169  pm2.5g 168
[WhiteheadRussell] p. 107	Theorem *2.6	pm2.6 191
[WhiteheadRussell] p. 107	Theorem *2.47	pm2.47 883
[WhiteheadRussell] p. 107	Theorem *2.48	pm2.48 884
[WhiteheadRussell] p. 107	Theorem *2.49	pm2.49 885
[WhiteheadRussell] p. 107	Theorem *2.51	pm2.51 172
[WhiteheadRussell] p. 107	Theorem *2.52	pm2.52 173
[WhiteheadRussell] p. 107	Theorem *2.53	pm2.53 851
[WhiteheadRussell] p. 107	Theorem *2.54	pm2.54 852
[WhiteheadRussell] p. 107	Theorem *2.55	orel1 888
[WhiteheadRussell] p. 107	Theorem *2.56	orel2 890
[WhiteheadRussell] p. 107	Theorem *2.61	pm2.61 192
[WhiteheadRussell] p. 107	Theorem *2.62	pm2.62 899
[WhiteheadRussell] p. 107	Theorem *2.63	pm2.63 942
[WhiteheadRussell] p. 107	Theorem *2.64	pm2.64 943
[WhiteheadRussell] p. 107	Theorem *2.65	pm2.65 193
[WhiteheadRussell] p. 107	Theorem *2.67	pm2.67-2 891  pm2.67 892
[WhiteheadRussell] p. 107	Theorem *2.521	pm2.521 176  pm2.521g 174  pm2.521g2 175
[WhiteheadRussell] p. 107	Theorem *2.621	pm2.621 898
[WhiteheadRussell] p. 108	Theorem *2.8	pm2.8 974
[WhiteheadRussell] p. 108	Theorem *2.68	pm2.68 900
[WhiteheadRussell] p. 108	Theorem *2.69	looinv 203
[WhiteheadRussell] p. 108	Theorem *2.73	pm2.73 975
[WhiteheadRussell] p. 108	Theorem *2.74	pm2.74 976
[WhiteheadRussell] p. 108	Theorem *2.75	pm2.75 933
[WhiteheadRussell] p. 108	Theorem *2.76	pm2.76 931
[WhiteheadRussell] p. 108	Theorem *2.77	ax-2 7
[WhiteheadRussell] p. 108	Theorem *2.81	pm2.81 973
[WhiteheadRussell] p. 108	Theorem *2.82	pm2.82 977
[WhiteheadRussell] p. 108	Theorem *2.83	pm2.83 84
[WhiteheadRussell] p. 108	Theorem *2.85	pm2.85 932
[WhiteheadRussell] p. 108	Theorem *2.86	pm2.86 109
[WhiteheadRussell] p. 111	Theorem *3.1	pm3.1 993
[WhiteheadRussell] p. 111	Theorem *3.2	pm3.2 469  pm3.2im 160
[WhiteheadRussell] p. 111	Theorem *3.11	pm3.11 994
[WhiteheadRussell] p. 111	Theorem *3.12	pm3.12 995
[WhiteheadRussell] p. 111	Theorem *3.13	pm3.13 996
[WhiteheadRussell] p. 111	Theorem *3.14	pm3.14 997
[WhiteheadRussell] p. 111	Theorem *3.21	pm3.21 471
[WhiteheadRussell] p. 111	Theorem *3.22	pm3.22 459
[WhiteheadRussell] p. 111	Theorem *3.24	pm3.24 402
[WhiteheadRussell] p. 112	Theorem *3.35	pm3.35 802
[WhiteheadRussell] p. 112	Theorem *3.3 (Exp)	pm3.3 448
[WhiteheadRussell] p. 112	Theorem *3.31 (Imp)	pm3.31 449
[WhiteheadRussell] p. 112	Theorem *3.26 (Simp)	simpl 482  simplim 167
[WhiteheadRussell] p. 112	Theorem *3.27 (Simp)	simpr 484  simprim 166
[WhiteheadRussell] p. 112	Theorem *3.33 (Syll)	pm3.33 764
[WhiteheadRussell] p. 112	Theorem *3.34 (Syll)	pm3.34 765
[WhiteheadRussell] p. 112	Theorem *3.37 (Transp)	pm3.37 807
[WhiteheadRussell] p. 113	Fact)	pm3.45 622
[WhiteheadRussell] p. 113	Theorem *3.4	pm3.4 809
[WhiteheadRussell] p. 113	Theorem *3.41	pm3.41 492
[WhiteheadRussell] p. 113	Theorem *3.42	pm3.42 493
[WhiteheadRussell] p. 113	Theorem *3.44	jao 962  pm3.44 961
[WhiteheadRussell] p. 113	Theorem *3.47	anim12 808
[WhiteheadRussell] p. 113	Theorem *3.43 (Comp)	pm3.43 473
[WhiteheadRussell] p. 114	Theorem *3.48	pm3.48 965
[WhiteheadRussell] p. 116	Theorem *4.1	con34b 316
[WhiteheadRussell] p. 117	Theorem *4.2	biid 261
[WhiteheadRussell] p. 117	Theorem *4.11	notbi 319
[WhiteheadRussell] p. 117	Theorem *4.12	con2bi 353
[WhiteheadRussell] p. 117	Theorem *4.13	notnotb 315
[WhiteheadRussell] p. 117	Theorem *4.14	pm4.14 806
[WhiteheadRussell] p. 117	Theorem *4.15	pm4.15 832
[WhiteheadRussell] p. 117	Theorem *4.21	bicom 222
[WhiteheadRussell] p. 117	Theorem *4.22	biantr 805  bitr 804
[WhiteheadRussell] p. 117	Theorem *4.24	pm4.24 563
[WhiteheadRussell] p. 117	Theorem *4.25	oridm 904  pm4.25 905
[WhiteheadRussell] p. 118	Theorem *4.3	ancom 460
[WhiteheadRussell] p. 118	Theorem *4.4	andi 1009
[WhiteheadRussell] p. 118	Theorem *4.31	orcom 870
[WhiteheadRussell] p. 118	Theorem *4.32	anass 468
[WhiteheadRussell] p. 118	Theorem *4.33	orass 921
[WhiteheadRussell] p. 118	Theorem *4.36	anbi1 633
[WhiteheadRussell] p. 118	Theorem *4.37	orbi1 917
[WhiteheadRussell] p. 118	Theorem *4.38	pm4.38 637
[WhiteheadRussell] p. 118	Theorem *4.39	pm4.39 978
[WhiteheadRussell] p. 118	Definition *4.34	df-3an 1088
[WhiteheadRussell] p. 119	Theorem *4.41	ordi 1007
[WhiteheadRussell] p. 119	Theorem *4.42	pm4.42 1053
[WhiteheadRussell] p. 119	Theorem *4.43	pm4.43 1024
[WhiteheadRussell] p. 119	Theorem *4.44	pm4.44 998
[WhiteheadRussell] p. 119	Theorem *4.45	orabs 1000  pm4.45 999  pm4.45im 827
[WhiteheadRussell] p. 120	Theorem *4.5	anor 984
[WhiteheadRussell] p. 120	Theorem *4.6	imor 853
[WhiteheadRussell] p. 120	Theorem *4.7	anclb 545
[WhiteheadRussell] p. 120	Theorem *4.51	ianor 983
[WhiteheadRussell] p. 120	Theorem *4.52	pm4.52 986
[WhiteheadRussell] p. 120	Theorem *4.53	pm4.53 987
[WhiteheadRussell] p. 120	Theorem *4.54	pm4.54 988
[WhiteheadRussell] p. 120	Theorem *4.55	pm4.55 989
[WhiteheadRussell] p. 120	Theorem *4.56	ioran 985  pm4.56 990
[WhiteheadRussell] p. 120	Theorem *4.57	oran 991  pm4.57 992
[WhiteheadRussell] p. 120	Theorem *4.61	pm4.61 404
[WhiteheadRussell] p. 120	Theorem *4.62	pm4.62 856
[WhiteheadRussell] p. 120	Theorem *4.63	pm4.63 397
[WhiteheadRussell] p. 120	Theorem *4.64	pm4.64 849
[WhiteheadRussell] p. 120	Theorem *4.65	pm4.65 405
[WhiteheadRussell] p. 120	Theorem *4.66	pm4.66 850
[WhiteheadRussell] p. 120	Theorem *4.67	pm4.67 398
[WhiteheadRussell] p. 120	Theorem *4.71	pm4.71 557  pm4.71d 561  pm4.71i 559  pm4.71r 558  pm4.71rd 562  pm4.71ri 560
[WhiteheadRussell] p. 121	Theorem *4.72	pm4.72 951
[WhiteheadRussell] p. 121	Theorem *4.73	iba 527
[WhiteheadRussell] p. 121	Theorem *4.74	biorf 936
[WhiteheadRussell] p. 121	Theorem *4.76	jcab 517  pm4.76 518
[WhiteheadRussell] p. 121	Theorem *4.77	jaob 963  pm4.77 964
[WhiteheadRussell] p. 121	Theorem *4.78	pm4.78 934
[WhiteheadRussell] p. 121	Theorem *4.79	pm4.79 1005
[WhiteheadRussell] p. 122	Theorem *4.8	pm4.8 392
[WhiteheadRussell] p. 122	Theorem *4.81	pm4.81 393
[WhiteheadRussell] p. 122	Theorem *4.82	pm4.82 1025
[WhiteheadRussell] p. 122	Theorem *4.83	pm4.83 1026
[WhiteheadRussell] p. 122	Theorem *4.84	imbi1 347
[WhiteheadRussell] p. 122	Theorem *4.85	imbi2 348
[WhiteheadRussell] p. 122	Theorem *4.86	bibi1 351
[WhiteheadRussell] p. 122	Theorem *4.87	bi2.04 387  impexp 450  pm4.87 843
[WhiteheadRussell] p. 123	Theorem *5.1	pm5.1 823
[WhiteheadRussell] p. 123	Theorem *5.11	pm5.11 946  pm5.11g 945
[WhiteheadRussell] p. 123	Theorem *5.12	pm5.12 947
[WhiteheadRussell] p. 123	Theorem *5.13	pm5.13 949
[WhiteheadRussell] p. 123	Theorem *5.14	pm5.14 948
[WhiteheadRussell] p. 124	Theorem *5.15	pm5.15 1014
[WhiteheadRussell] p. 124	Theorem *5.16	pm5.16 1015
[WhiteheadRussell] p. 124	Theorem *5.17	pm5.17 1013
[WhiteheadRussell] p. 124	Theorem *5.18	nbbn 383  pm5.18 381
[WhiteheadRussell] p. 124	Theorem *5.19	pm5.19 386
[WhiteheadRussell] p. 124	Theorem *5.21	pm5.21 824
[WhiteheadRussell] p. 124	Theorem *5.22	xor 1016
[WhiteheadRussell] p. 124	Theorem *5.23	dfbi3 1049
[WhiteheadRussell] p. 124	Theorem *5.24	pm5.24 1050
[WhiteheadRussell] p. 124	Theorem *5.25	dfor2 901
[WhiteheadRussell] p. 125	Theorem *5.3	pm5.3 572
[WhiteheadRussell] p. 125	Theorem *5.4	pm5.4 388
[WhiteheadRussell] p. 125	Theorem *5.5	pm5.5 361
[WhiteheadRussell] p. 125	Theorem *5.6	pm5.6 1003
[WhiteheadRussell] p. 125	Theorem *5.7	pm5.7 955
[WhiteheadRussell] p. 125	Theorem *5.31	pm5.31 830
[WhiteheadRussell] p. 125	Theorem *5.32	pm5.32 573
[WhiteheadRussell] p. 125	Theorem *5.33	pm5.33 835
[WhiteheadRussell] p. 125	Theorem *5.35	pm5.35 825
[WhiteheadRussell] p. 125	Theorem *5.36	pm5.36 833
[WhiteheadRussell] p. 125	Theorem *5.41	imdi 389  pm5.41 390
[WhiteheadRussell] p. 125	Theorem *5.42	pm5.42 543
[WhiteheadRussell] p. 125	Theorem *5.44	pm5.44 542
[WhiteheadRussell] p. 125	Theorem *5.53	pm5.53 1006
[WhiteheadRussell] p. 125	Theorem *5.54	pm5.54 1019
[WhiteheadRussell] p. 125	Theorem *5.55	pm5.55 950
[WhiteheadRussell] p. 125	Theorem *5.61	pm5.61 1002
[WhiteheadRussell] p. 125	Theorem *5.62	pm5.62 1020
[WhiteheadRussell] p. 125	Theorem *5.63	pm5.63 1021
[WhiteheadRussell] p. 125	Theorem *5.71	pm5.71 1029
[WhiteheadRussell] p. 125	Theorem *5.501	pm5.501 366
[WhiteheadRussell] p. 126	Theorem *5.74	pm5.74 270
[WhiteheadRussell] p. 126	Theorem *5.75	pm5.75 1030
[WhiteheadRussell] p. 146	Theorem *10.12	pm10.12 44340
[WhiteheadRussell] p. 146	Theorem *10.14	pm10.14 44341
[WhiteheadRussell] p. 147	Theorem *10.22	19.26 1870
[WhiteheadRussell] p. 149	Theorem *10.251	pm10.251 44342
[WhiteheadRussell] p. 149	Theorem *10.252	pm10.252 44343
[WhiteheadRussell] p. 149	Theorem *10.253	pm10.253 44344
[WhiteheadRussell] p. 150	Theorem *10.3	alsyl 1893
[WhiteheadRussell] p. 151	Theorem *10.301	albitr 44345
[WhiteheadRussell] p. 155	Theorem *10.42	pm10.42 44346
[WhiteheadRussell] p. 155	Theorem *10.52	pm10.52 44347
[WhiteheadRussell] p. 155	Theorem *10.53	pm10.53 44348
[WhiteheadRussell] p. 155	Theorem *10.541	pm10.541 44349
[WhiteheadRussell] p. 156	Theorem *10.55	pm10.55 44351
[WhiteheadRussell] p. 156	Theorem *10.56	pm10.56 44352
[WhiteheadRussell] p. 156	Theorem *10.57	pm10.57 44353
[WhiteheadRussell] p. 156	Theorem *10.542	pm10.542 44350
[WhiteheadRussell] p. 159	Axiom *11.07	pm11.07 2091
[WhiteheadRussell] p. 159	Theorem *11.11	pm11.11 44356
[WhiteheadRussell] p. 159	Theorem *11.12	pm11.12 44357
[WhiteheadRussell] p. 159	Theorem PM*11.1	2stdpc4 2071
[WhiteheadRussell] p. 160	Theorem *11.21	alrot3 2161
[WhiteheadRussell] p. 160	Theorem *11.22	2exnaln 1829
[WhiteheadRussell] p. 160	Theorem *11.25	2nexaln 1830
[WhiteheadRussell] p. 161	Theorem *11.3	19.21vv 44358
[WhiteheadRussell] p. 162	Theorem *11.32	2alim 44359
[WhiteheadRussell] p. 162	Theorem *11.33	2albi 44360
[WhiteheadRussell] p. 162	Theorem *11.34	2exim 44361
[WhiteheadRussell] p. 162	Theorem *11.36	spsbce-2 44363
[WhiteheadRussell] p. 162	Theorem *11.341	2exbi 44362
[WhiteheadRussell] p. 163	Theorem *11.42	19.40-2 1887
[WhiteheadRussell] p. 163	Theorem *11.43	19.36vv 44365
[WhiteheadRussell] p. 163	Theorem *11.44	19.31vv 44366
[WhiteheadRussell] p. 163	Theorem *11.421	19.33-2 44364
[WhiteheadRussell] p. 164	Theorem *11.5	2nalexn 1828
[WhiteheadRussell] p. 164	Theorem *11.46	19.37vv 44367
[WhiteheadRussell] p. 164	Theorem *11.47	19.28vv 44368
[WhiteheadRussell] p. 164	Theorem *11.51	2exnexn 1846
[WhiteheadRussell] p. 164	Theorem *11.52	pm11.52 44369
[WhiteheadRussell] p. 164	Theorem *11.53	pm11.53 2344
[WhiteheadRussell] p. 164	Theorem *11.521	2exanali 1860
[WhiteheadRussell] p. 165	Theorem *11.6	pm11.6 44374
[WhiteheadRussell] p. 165	Theorem *11.56	aaanv 44370
[WhiteheadRussell] p. 165	Theorem *11.57	pm11.57 44371
[WhiteheadRussell] p. 165	Theorem *11.58	pm11.58 44372
[WhiteheadRussell] p. 165	Theorem *11.59	pm11.59 44373
[WhiteheadRussell] p. 166	Theorem *11.7	pm11.7 44378
[WhiteheadRussell] p. 166	Theorem *11.61	pm11.61 44375
[WhiteheadRussell] p. 166	Theorem *11.62	pm11.62 44376
[WhiteheadRussell] p. 166	Theorem *11.63	pm11.63 44377
[WhiteheadRussell] p. 166	Theorem *11.71	pm11.71 44379
[WhiteheadRussell] p. 175	Definition *14.02	df-eu 2562
[WhiteheadRussell] p. 178	Theorem *13.13	pm13.13a 44389  pm13.13b 44390
[WhiteheadRussell] p. 178	Theorem *13.14	pm13.14 44391
[WhiteheadRussell] p. 178	Theorem *13.18	pm13.18 3006
[WhiteheadRussell] p. 178	Theorem *13.181	pm13.181 3007
[WhiteheadRussell] p. 178	Theorem *13.183	pm13.183 3629
[WhiteheadRussell] p. 179	Theorem *13.21	2sbc6g 44397
[WhiteheadRussell] p. 179	Theorem *13.22	2sbc5g 44398
[WhiteheadRussell] p. 179	Theorem *13.192	pm13.192 44392
[WhiteheadRussell] p. 179	Theorem *13.193	2pm13.193 44535  pm13.193 44393
[WhiteheadRussell] p. 179	Theorem *13.194	pm13.194 44394
[WhiteheadRussell] p. 179	Theorem *13.195	pm13.195 44395
[WhiteheadRussell] p. 179	Theorem *13.196	pm13.196a 44396
[WhiteheadRussell] p. 184	Theorem *14.12	pm14.12 44403
[WhiteheadRussell] p. 184	Theorem *14.111	iotasbc2 44402
[WhiteheadRussell] p. 184	Definition *14.01	iotasbc 44401
[WhiteheadRussell] p. 185	Theorem *14.121	sbeqalb 3813
[WhiteheadRussell] p. 185	Theorem *14.122	pm14.122a 44404  pm14.122b 44405  pm14.122c 44406
[WhiteheadRussell] p. 185	Theorem *14.123	pm14.123a 44407  pm14.123b 44408  pm14.123c 44409
[WhiteheadRussell] p. 189	Theorem *14.2	iotaequ 44411
[WhiteheadRussell] p. 189	Theorem *14.18	pm14.18 44410
[WhiteheadRussell] p. 189	Theorem *14.202	iotavalb 44412
[WhiteheadRussell] p. 190	Theorem *14.22	iota4 6480
[WhiteheadRussell] p. 190	Theorem *14.205	iotasbc5 44413
[WhiteheadRussell] p. 191	Theorem *14.23	iota4an 6481
[WhiteheadRussell] p. 191	Theorem *14.24	pm14.24 44414
[WhiteheadRussell] p. 192	Theorem *14.25	sbiota1 44416
[WhiteheadRussell] p. 192	Theorem *14.26	eupick 2626  eupickbi 2629  sbaniota 44417
[WhiteheadRussell] p. 192	Theorem *14.242	iotavalsb 44415
[WhiteheadRussell] p. 192	Theorem *14.271	eubi 2577
[WhiteheadRussell] p. 193	Theorem *14.272	iotasbcq 44419
[WhiteheadRussell] p. 235	Definition *30.01	conventions 30379  df-fv 6507
[WhiteheadRussell] p. 360	Theorem *54.43	pm54.43 9930  pm54.43lem 9929
[Young] p. 141	Definition of operator ordering	leop2 32103
[Young] p. 142	Example 12.2(i)	0leop 32109  idleop 32110
[vandenDries] p. 42	Lemma 61	irrapx1 42809
[vandenDries] p. 43	Theorem 62	pellex 42816  pellexlem1 42810

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