| Description:
The following gives conventions used in the Metamath Proof Explorer
(MPE, set.mm) regarding labels.
For other conventions, see conventions 29642 and links therein.
Every statement has a unique identifying label, which serves the
same purpose as an equation number in a book.
We use various label naming conventions to provide
easy-to-remember hints about their contents.
Labels are not a 1-to-1 mapping, because that would create
long names that would be difficult to remember and tedious to type.
Instead, label names are relatively short while
suggesting their purpose.
Names are occasionally changed to make them more consistent or
as we find better ways to name them.
Here are a few of the label naming conventions:
- Axioms, definitions, and wff syntax.
As noted earlier, axioms are named "ax-NAME",
proofs of proven axioms are named "axNAME", and
definitions are named "df-NAME".
Wff syntax declarations have labels beginning with "w"
followed by short fragment suggesting its purpose.
- Hypotheses.
Hypotheses have the name of the final axiom or theorem, followed by
".", followed by a unique id (these ids are usually consecutive integers
starting with 1, e.g., for rgen 3063"rgen.1 $e |- ( x e. A -> ph ) $."
or letters corresponding to the (main) class variable used in the
hypothesis, e.g., for mdet0 22099: "mdet0.d $e |- D = ( N maDet R ) $.").
- Common names.
If a theorem has a well-known name, that name (or a short version of it)
is sometimes used directly. Examples include
barbara 2658 and stirling 44791.
- Principia Mathematica.
Proofs of theorems from Principia Mathematica often use a special
naming convention: "pm" followed by its identifier.
For example, Theorem *2.27 of [WhiteheadRussell] p. 104 is named
pm2.27 42.
- 19.x series of theorems.
Similar to the conventions for the theorems from Principia Mathematica,
theorems from Section 19 of [Margaris] p. 90 often use a special naming
convention: "19." resp. "r19." (for corresponding restricted quantifier
versions) followed by its identifier.
For example, Theorem 38 from Section 19 of [Margaris] p. 90 is labeled
19.38 1841, and the restricted quantifier version of Theorem 21 from
Section 19 of [Margaris] p. 90 is labeled r19.21 3251.
- Characters to be used for labels.
Although the specification of Metamath allows for dots/periods "." in
any label, it is usually used only in labels for hypotheses (see above).
Exceptions are the labels of theorems from Principia Mathematica and the
19.x series of theorems from Section 19 of [Margaris] p. 90 (see above)
and 0.999... 15823. Furthermore, the underscore "_" should not be used.
Finally, only lower case characters should be used (except the special
suffixes OLD, ALT, and ALTV mentioned in bullet point "Suffixes"), at
least in main set.mm (exceptions are tolerated in mathboxes).
- Syntax label fragments.
Most theorems are named using a concatenation of syntax label fragments
(omitting variables) that represent the important part of the theorem's
main conclusion. Almost every syntactic construct has a definition
labeled "df-NAME", and normally NAME is the syntax label fragment. For
example, the class difference construct (π΄ β π΅) is defined in
df-dif 3950, and thus its syntax label fragment is "dif". Similarly, the
subclass relation π΄ β π΅ has syntax label fragment "ss"
because it is defined in df-ss 3964. Most theorem names follow from
these fragments, for example, the theorem proving (π΄ β π΅) β π΄
involves a class difference ("dif") of a subset ("ss"), and thus is
labeled difss 4130. There are many other syntax label fragments, e.g.,
singleton construct {π΄} has syntax label fragment "sn" (because it
is defined in df-sn 4628), and the pair construct {π΄, π΅} has
fragment "pr" ( from df-pr 4630). Digits are used to represent
themselves. Suffixes (e.g., with numbers) are sometimes used to
distinguish multiple theorems that would otherwise produce the same
label.
- Phantom definitions.
In some cases there are common label fragments for something that could
be in a definition, but for technical reasons is not. The is-element-of
(is member of) construct π΄ β π΅ does not have a df-NAME definition;
in this case its syntax label fragment is "el". Thus, because the
theorem beginning with (π΄ β (π΅ β {πΆ}) uses is-element-of
("el") of a class difference ("dif") of a singleton ("sn"), it is
labeled eldifsn 4789. An "n" is often used for negation (Β¬), e.g.,
nan 828.
- Exceptions.
Sometimes there is a definition df-NAME but the label fragment is not
the NAME part. The definition should note this exception as part of its
definition. In addition, the table below attempts to list all such
cases and marks them in bold. For example, the label fragment "cn"
represents complex numbers β (even though its definition is in
df-c 11112) and "re" represents real numbers β (Definition df-r 11116).
The empty set β
often uses fragment 0, even though it is defined
in df-nul 4322. The syntax construct (π΄ + π΅) usually uses the
fragment "add" (which is consistent with df-add 11117), but "p" is used as
the fragment for constant theorems. Equality (π΄ = π΅) often uses
"e" as the fragment. As a result, "two plus two equals four" is labeled
2p2e4 12343.
- Other markings.
In labels we sometimes use "com" for "commutative", "ass" for
"associative", "rot" for "rotation", and "di" for "distributive".
- Focus on the important part of the conclusion.
Typically the conclusion is the part the user is most interested in.
So, a rough guideline is that a label typically provides a hint
about only the conclusion; a label rarely says anything about the
hypotheses or antecedents.
If there are multiple theorems with the same conclusion
but different hypotheses/antecedents, then the labels will need
to differ; those label differences should emphasize what is different.
There is no need to always fully describe the conclusion; just
identify the important part. For example,
cos0 16089 is the theorem that provides the value for the cosine of 0;
we would need to look at the theorem itself to see what that value is.
The label "cos0" is concise and we use it instead of "cos0eq1".
There is no need to add the "eq1", because there will never be a case
where we have to disambiguate between different values produced by
the cosine of zero, and we generally prefer shorter labels if
they are unambiguous.
- Closures and values.
As noted above, if a function df-NAME is defined, there is typically a
proof of its value labeled "NAMEval" and of its closure labeled
"NAMEcl". E.g., for cosine (df-cos 16010) we have value cosval 16062 and
closure coscl 16066.
- Special cases.
Sometimes, syntax and related markings are insufficient to distinguish
different theorems. For example, there are over a hundred different
implication-only theorems. They are grouped in a more ad-hoc way that
attempts to make their distinctions clearer. These often use
abbreviations such as "mp" for "modus ponens", "syl" for syllogism, and
"id" for "identity". It is especially hard to give good names in the
propositional calculus section because there are so few primitives.
However, in most cases this is not a serious problem. There are a few
very common theorems like ax-mp 5 and syl 17 that you will have no
trouble remembering, a few theorem series like syl*anc and simp* that
you can use parametrically, and a few other useful glue things for
destructuring 'and's and 'or's (see natded 29645 for a list), and that is
about all you need for most things. As for the rest, you can just
assume that if it involves at most three connectives, then it is
probably already proved in set.mm, and searching for it will give you
the label.
- Suffixes.
Suffixes are used to indicate the form of a theorem (inference,
deduction, or closed form, see above).
Additionally, we sometimes suffix with "v" the label of a theorem adding
a disjoint variable condition, as in 19.21v 1942 versus 19.21 2200. This
often permits to prove the result using fewer axioms, and/or to
eliminate a nonfreeness hypothesis (such as β²π₯π in 19.21 2200).
If no constraint is put on axiom use, then the v-version can be proved
from the original theorem using nfv 1917. If two (resp. three) such
disjoint variable conditions are added, then the suffix "vv" (resp.
"vvv") is used, e.g., exlimivv 1935.
Conversely, we sometimes suffix with "f" the label of a theorem
introducing such a hypothesis to eliminate the need for the disjoint
variable condition; e.g., euf 2570 derived from eu6 2568. The "f" stands
for "not free in" which is less restrictive than "does not occur in."
The suffix "b" often means "biconditional" (β, "iff" , "if and
only if"), e.g., sspwb 5448.
We sometimes suffix with "s" the label of an inference that manipulates
an antecedent, leaving the consequent unchanged. The "s" means that the
inference eliminates the need for a syllogism (syl 17) -type inference
in a proof. A theorem label is suffixed with "ALT" if it provides an
alternate less-preferred proof of a theorem (e.g., the proof is
clearer but uses more axioms than the preferred version).
The "ALT" may be further suffixed with a number if there is more
than one alternate theorem.
Furthermore, a theorem label is suffixed with "OLD" if there is a new
version of it and the OLD version is obsolete (and will be removed
within one year).
Finally, it should be mentioned that suffixes can be combined, for
example in cbvaldva 2408 (cbval 2397 in deduction form "d" with a not free
variable replaced by a disjoint variable condition "v" with a
conjunction as antecedent "a"). As a general rule, the suffixes for
the theorem forms ("i", "d" or "g") should be the first of multiple
suffixes, as for example in vtocldf 3541.
Here is a non-exhaustive list of common suffixes:
- a : theorem having a conjunction as antecedent
- b : theorem expressing a logical equivalence
- c : contraction (e.g., sylc 65, syl2anc 584), commutes
(e.g., biimpac 479)
- d : theorem in deduction form
- f : theorem with a hypothesis such as β²π₯π
- g : theorem in closed form having an "is a set" antecedent
- i : theorem in inference form
- l : theorem concerning something at the left
- r : theorem concerning something at the right
- r : theorem with something reversed (e.g., a biconditional)
- s : inference that manipulates an antecedent ("s" refers to an
application of syl 17 that is eliminated)
- t : theorem in closed form (not having an "is a set" antecedent)
- v : theorem with one (main) disjoint variable condition
- vv : theorem with two (main) disjoint variable conditions
- w : weak(er) form of a theorem
- ALT : alternate proof of a theorem
- ALTV : alternate version of a theorem or definition (mathbox
only)
- OLD : old/obsolete version of a theorem (or proof) or definition
- Reuse.
When creating a new theorem or axiom, try to reuse abbreviations used
elsewhere. A comment should explain the first use of an abbreviation.
The following table shows some commonly used abbreviations in labels, in
alphabetical order. For each abbreviation we provide a mnenomic, the
source theorem or the assumption defining it, an expression showing what
it looks like, whether or not it is a "syntax fragment" (an abbreviation
that indicates a particular kind of syntax), and hyperlinks to label
examples that use the abbreviation. The abbreviation is bolded if there
is a df-NAME definition but the label fragment is not NAME. This is
not a complete list of abbreviations, though we do want this to
eventually be a complete list of exceptions.
| Abbreviation | Mnenomic | Source |
Expression | Syntax? | Example(s) |
|---|
| a | and (suffix) | |
| No | biimpa 477, rexlimiva 3147 |
| abl | Abelian group | df-abl 19645 |
Abel | Yes | ablgrp 19647, zringabl 21013 |
| abs | absorption | | | No |
ressabs 17190 |
| abs | absolute value (of a complex number) |
df-abs 15179 | (absβπ΄) | Yes |
absval 15181, absneg 15220, abs1 15240 |
| ad | adding | |
| No | adantr 481, ad2antlr 725 |
| add | add (see "p") | df-add 11117 |
(π΄ + π΅) | Yes |
addcl 11188, addcom 11396, addass 11193 |
| al | "for all" | |
βπ₯π | No | alim 1812, alex 1828 |
| ALT | alternative/less preferred (suffix) | |
| No | idALT 23 |
| an | and | df-an 397 |
(π β§ π) | Yes |
anor 981, iman 402, imnan 400 |
| ant | antecedent | |
| No | adantr 481 |
| ass | associative | |
| No | biass 385, orass 920, mulass 11194 |
| asym | asymmetric, antisymmetric | |
| No | intasym 6113, asymref 6114, posasymb 18268 |
| ax | axiom | |
| No | ax6dgen 2124, ax1cn 11140 |
| bas, base |
base (set of an extensible structure) | df-base 17141 |
(Baseβπ) | Yes |
baseval 17142, ressbas 17175, cnfldbas 20940 |
| b, bi | biconditional ("iff", "if and only if")
| df-bi 206 | (π β π) | Yes |
impbid 211, sspwb 5448 |
| br | binary relation | df-br 5148 |
π΄π
π΅ | Yes | brab1 5195, brun 5198 |
| c | commutes, commuted (suffix) | | |
No | biimpac 479 |
| c | contraction (suffix) | | |
No | sylc 65, syl2anc 584 |
| cbv | change bound variable | | |
No | cbvalivw 2010, cbvrex 3359 |
| cdm | codomain | |
| No | ffvelcdm 7080, focdmex 7938 |
| cl | closure | | | No |
ifclda 4562, ovrcl 7446, zaddcl 12598 |
| cn | complex numbers | df-c 11112 |
β | Yes | nnsscn 12213, nncn 12216 |
| cnfld | field of complex numbers | df-cnfld 20937 |
βfld | Yes | cnfldbas 20940, cnfldinv 20968 |
| cntz | centralizer | df-cntz 19175 |
(Cntzβπ) | Yes |
cntzfval 19178, dprdfcntz 19879 |
| cnv | converse | df-cnv 5683 |
β‘π΄ | Yes | opelcnvg 5878, f1ocnv 6842 |
| co | composition | df-co 5684 |
(π΄ β π΅) | Yes | cnvco 5883, fmptco 7123 |
| com | commutative | |
| No | orcom 868, bicomi 223, eqcomi 2741 |
| con | contradiction, contraposition | |
| No | condan 816, con2d 134 |
| csb | class substitution | df-csb 3893 |
β¦π΄ / π₯β¦π΅ | Yes |
csbid 3905, csbie2g 3935 |
| cyg | cyclic group | df-cyg 19740 |
CycGrp | Yes |
iscyg 19741, zringcyg 21030 |
| d | deduction form (suffix) | |
| No | idd 24, impbid 211 |
| df | (alternate) definition (prefix) | |
| No | dfrel2 6185, dffn2 6716 |
| di, distr | distributive | |
| No |
andi 1006, imdi 390, ordi 1004, difindi 4280, ndmovdistr 7592 |
| dif | class difference | df-dif 3950 |
(π΄ β π΅) | Yes |
difss 4130, difindi 4280 |
| div | division | df-div 11868 |
(π΄ / π΅) | Yes |
divcl 11874, divval 11870, divmul 11871 |
| dm | domain | df-dm 5685 |
dom π΄ | Yes | dmmpt 6236, iswrddm0 14484 |
| e, eq, equ | equals (equ for setvars, eq for
classes) | df-cleq 2724 |
π΄ = π΅ | Yes |
2p2e4 12343, uneqri 4150, equtr 2024 |
| edg | edge | df-edg 28297 |
(EdgβπΊ) | Yes |
edgopval 28300, usgredgppr 28442 |
| el | element of | |
π΄ β π΅ | Yes |
eldif 3957, eldifsn 4789, elssuni 4940 |
| en | equinumerous | df-en |
π΄ β π΅ | Yes | domen 8953, enfi 9186 |
| eu | "there exists exactly one" | eu6 2568 |
β!π₯π | Yes | euex 2571, euabsn 4729 |
| ex | exists (i.e. is a set) | |
β V | No | brrelex1 5727, 0ex 5306 |
| ex, e | "there exists (at least one)" |
df-ex 1782 |
βπ₯π | Yes | exim 1836, alex 1828 |
| exp | export | |
| No | expt 177, expcom 414 |
| f | "not free in" (suffix) | |
| No | equs45f 2458, sbf 2262 |
| f | function | df-f 6544 |
πΉ:π΄βΆπ΅ | Yes | fssxp 6742, opelf 6749 |
| fal | false | df-fal 1554 |
β₯ | Yes | bifal 1557, falantru 1576 |
| fi | finite intersection | df-fi 9402 |
(fiβπ΅) | Yes | fival 9403, inelfi 9409 |
| fi, fin | finite | df-fin 8939 |
Fin | Yes |
isfi 8968, snfi 9040, onfin 9226 |
| fld | field (Note: there is an alternative
definition Fld of a field, see df-fld 36848) | df-field 20310 |
Field | Yes | isfld 20318, fldidom 20915 |
| fn | function with domain | df-fn 6543 |
π΄ Fn π΅ | Yes | ffn 6714, fndm 6649 |
| frgp | free group | df-frgp 19572 |
(freeGrpβπΌ) | Yes |
frgpval 19620, frgpadd 19625 |
| fsupp | finitely supported function |
df-fsupp 9358 | π
finSupp π | Yes |
isfsupp 9361, fdmfisuppfi 9368, fsuppco 9393 |
| fun | function | df-fun 6542 |
Fun πΉ | Yes | funrel 6562, ffun 6717 |
| fv | function value | df-fv 6548 |
(πΉβπ΄) | Yes | fvres 6907, swrdfv 14594 |
| fz | finite set of sequential integers |
df-fz 13481 |
(π...π) | Yes | fzval 13482, eluzfz 13492 |
| fz0 | finite set of sequential nonnegative integers |
|
(0...π) | Yes | nn0fz0 13595, fz0tp 13598 |
| fzo | half-open integer range | df-fzo 13624 |
(π..^π) | Yes |
elfzo 13630, elfzofz 13644 |
| g | more general (suffix); eliminates "is a set"
hypotheses | |
| No | uniexg 7726 |
| gr | graph | |
| No | uhgrf 28311, isumgr 28344, usgrres1 28561 |
| grp | group | df-grp 18818 |
Grp | Yes | isgrp 18821, tgpgrp 23573 |
| gsum | group sum | df-gsum 17384 |
(πΊ Ξ£g πΉ) | Yes |
gsumval 18592, gsumwrev 19227 |
| hash | size (of a set) | df-hash 14287 |
(β―βπ΄) | Yes |
hashgval 14289, hashfz1 14302, hashcl 14312 |
| hb | hypothesis builder (prefix) | |
| No | hbxfrbi 1827, hbald 2168, hbequid 37767 |
| hm | (monoid, group, ring) homomorphism | |
| No | ismhm 18669, isghm 19086, isrhm 20249 |
| i | inference (suffix) | |
| No | eleq1i 2824, tcsni 9734 |
| i | implication (suffix) | |
| No | brwdomi 9559, infeq5i 9627 |
| id | identity | |
| No | biid 260 |
| iedg | indexed edge | df-iedg 28248 |
(iEdgβπΊ) | Yes |
iedgval0 28289, edgiedgb 28303 |
| idm | idempotent | |
| No | anidm 565, tpidm13 4759 |
| im, imp | implication (label often omitted) |
df-im 15044 | (π΄ β π΅) | Yes |
iman 402, imnan 400, impbidd 209 |
| ima | image | df-ima 5688 |
(π΄ β π΅) | Yes | resima 6013, imaundi 6146 |
| imp | import | |
| No | biimpa 477, impcom 408 |
| in | intersection | df-in 3954 |
(π΄ β© π΅) | Yes | elin 3963, incom 4200 |
| inf | infimum | df-inf 9434 |
inf(β+, β*, < ) | Yes |
fiinfcl 9492, infiso 9499 |
| is... | is (something a) ...? | |
| No | isring 20053 |
| j | joining, disjoining | |
| No | jc 161, jaoi 855 |
| l | left | |
| No | olcd 872, simpl 483 |
| map | mapping operation or set exponentiation |
df-map 8818 | (π΄ βm π΅) | Yes |
mapvalg 8826, elmapex 8838 |
| mat | matrix | df-mat 21899 |
(π Mat π
) | Yes |
matval 21902, matring 21936 |
| mdet | determinant (of a square matrix) |
df-mdet 22078 | (π maDet π
) | Yes |
mdetleib 22080, mdetrlin 22095 |
| mgm | magma | df-mgm 18557 |
Magma | Yes |
mgmidmo 18575, mgmlrid 18582, ismgm 18558 |
| mgp | multiplicative group | df-mgp 19982 |
(mulGrpβπ
) | Yes |
mgpress 19996, ringmgp 20055 |
| mnd | monoid | df-mnd 18622 |
Mnd | Yes | mndass 18630, mndodcong 19404 |
| mo | "there exists at most one" | df-mo 2534 |
β*π₯π | Yes | eumo 2572, moim 2538 |
| mp | modus ponens | ax-mp 5 |
| No | mpd 15, mpi 20 |
| mpo | maps-to notation for an operation |
df-mpo 7410 | (π₯ β π΄, π¦ β π΅ β¦ πΆ) | Yes |
mpompt 7518, resmpo 7524 |
| mpt | modus ponendo tollens | |
| No | mptnan 1770, mptxor 1771 |
| mpt | maps-to notation for a function |
df-mpt 5231 | (π₯ β π΄ β¦ π΅) | Yes |
fconstmpt 5736, resmpt 6035 |
| mpt2 | maps-to notation for an operation (deprecated).
We are in the process of replacing mpt2 with mpo in labels. |
df-mpo 7410 | (π₯ β π΄, π¦ β π΅ β¦ πΆ) | Yes |
mpompt 7518, resmpo 7524 |
| mul | multiplication (see "t") | df-mul 11118 |
(π΄ Β· π΅) | Yes |
mulcl 11190, divmul 11871, mulcom 11192, mulass 11194 |
| n, not | not | |
Β¬ π | Yes |
nan 828, notnotr 130 |
| ne | not equal | df-ne | π΄ β π΅ |
Yes | exmidne 2950, neeqtrd 3010 |
| nel | not element of | df-nel | π΄ β π΅
|
Yes | neli 3048, nnel 3056 |
| ne0 | not equal to zero (see n0) | |
β 0 | No |
negne0d 11565, ine0 11645, gt0ne0 11675 |
| nf | "not free in" (prefix) | |
| No | nfnd 1861 |
| ngp | normed group | df-ngp 24083 |
NrmGrp | Yes | isngp 24096, ngptps 24102 |
| nm | norm (on a group or ring) | df-nm 24082 |
(normβπ) | Yes |
nmval 24089, subgnm 24133 |
| nn | positive integers | df-nn 12209 |
β | Yes | nnsscn 12213, nncn 12216 |
| nn0 | nonnegative integers | df-n0 12469 |
β0 | Yes | nnnn0 12475, nn0cn 12478 |
| n0 | not the empty set (see ne0) | |
β β
| No | n0i 4332, vn0 4337, ssn0 4399 |
| OLD | old, obsolete (to be removed soon) | |
| No | 19.43OLD 1886 |
| on | ordinal number | df-on 6365 |
π΄ β On | Yes |
elon 6370, 1on 8474 onelon 6386 |
| op | ordered pair | df-op 4634 |
β¨π΄, π΅β© | Yes | dfopif 4869, opth 5475 |
| or | or | df-or 846 |
(π β¨ π) | Yes |
orcom 868, anor 981 |
| ot | ordered triple | df-ot 4636 |
β¨π΄, π΅, πΆβ© | Yes |
euotd 5512, fnotovb 7455 |
| ov | operation value | df-ov 7408 |
(π΄πΉπ΅) | Yes
| fnotovb 7455, fnovrn 7578 |
| p | plus (see "add"), for all-constant
theorems | df-add 11117 |
(3 + 2) = 5 | Yes |
3p2e5 12359 |
| pfx | prefix | df-pfx 14617 |
(π prefix πΏ) | Yes |
pfxlen 14629, ccatpfx 14647 |
| pm | Principia Mathematica | |
| No | pm2.27 42 |
| pm | partial mapping (operation) | df-pm 8819 |
(π΄ βpm π΅) | Yes | elpmi 8836, pmsspw 8867 |
| pr | pair | df-pr 4630 |
{π΄, π΅} | Yes |
elpr 4650, prcom 4735, prid1g 4763, prnz 4780 |
| prm, prime | prime (number) | df-prm 16605 |
β | Yes | 1nprm 16612, dvdsprime 16620 |
| pss | proper subset | df-pss 3966 |
π΄ β π΅ | Yes | pssss 4094, sspsstri 4101 |
| q | rational numbers ("quotients") | df-q 12929 |
β | Yes | elq 12930 |
| r | reversed (suffix) | |
| No | pm4.71r 559, caovdir 7637 |
| r | right | |
| No | orcd 871, simprl 769 |
| rab | restricted class abstraction |
df-rab 3433 | {π₯ β π΄ β£ π} | Yes |
rabswap 3441, df-oprab 7409 |
| ral | restricted universal quantification |
df-ral 3062 | βπ₯ β π΄π | Yes |
ralnex 3072, ralrnmpo 7543 |
| rcl | reverse closure | |
| No | ndmfvrcl 6924, nnarcl 8612 |
| re | real numbers | df-r 11116 |
β | Yes | recn 11196, 0re 11212 |
| rel | relation | df-rel 5682 | Rel π΄ |
Yes | brrelex1 5727, relmpoopab 8076 |
| res | restriction | df-res 5687 |
(π΄ βΎ π΅) | Yes |
opelres 5985, f1ores 6844 |
| reu | restricted existential uniqueness |
df-reu 3377 | β!π₯ β π΄π | Yes |
nfreud 3429, reurex 3380 |
| rex | restricted existential quantification |
df-rex 3071 | βπ₯ β π΄π | Yes |
rexnal 3100, rexrnmpo 7544 |
| rmo | restricted "at most one" |
df-rmo 3376 | β*π₯ β π΄π | Yes |
nfrmod 3428, nrexrmo 3397 |
| rn | range | df-rn 5686 | ran π΄ |
Yes | elrng 5889, rncnvcnv 5931 |
| ring | (unital) ring | df-ring 20051 |
Ring | Yes |
ringidval 20000, isring 20053, ringgrp 20054 |
| rng | non-unital ring | df-rng 46635 |
Rng | Yes |
isrng 46636, rngabl 46637, rnglz 46650 |
| rot | rotation | |
| No | 3anrot 1100, 3orrot 1092 |
| s | eliminates need for syllogism (suffix) |
| | No | ancoms 459 |
| sb | (proper) substitution (of a set) |
df-sb 2068 | [π¦ / π₯]π | Yes |
spsbe 2085, sbimi 2077 |
| sbc | (proper) substitution of a class |
df-sbc 3777 | [π΄ / π₯]π | Yes |
sbc2or 3785, sbcth 3791 |
| sca | scalar | df-sca 17209 |
(Scalarβπ») | Yes |
resssca 17284, mgpsca 19989 |
| simp | simple, simplification | |
| No | simpl 483, simp3r3 1283 |
| sn | singleton | df-sn 4628 |
{π΄} | Yes | eldifsn 4789 |
| sp | specialization | |
| No | spsbe 2085, spei 2393 |
| ss | subset | df-ss 3964 |
π΄ β π΅ | Yes | difss 4130 |
| struct | structure | df-struct 17076 |
Struct | Yes | brstruct 17077, structfn 17085 |
| sub | subtract | df-sub 11442 |
(π΄ β π΅) | Yes |
subval 11447, subaddi 11543 |
| sup | supremum | df-sup 9433 |
sup(π΄, π΅, < ) | Yes |
fisupcl 9460, supmo 9443 |
| supp | support (of a function) | df-supp 8143 |
(πΉ supp π) | Yes |
ressuppfi 9386, mptsuppd 8168 |
| swap | swap (two parts within a theorem) |
| | No | rabswap 3441, 2reuswap 3741 |
| syl | syllogism | syl 17 |
| No | 3syl 18 |
| sym | symmetric | |
| No | df-symdif 4241, cnvsym 6110 |
| symg | symmetric group | df-symg 19229 |
(SymGrpβπ΄) | Yes |
symghash 19239, pgrpsubgsymg 19271 |
| t |
times (see "mul"), for all-constant theorems |
df-mul 11118 |
(3 Β· 2) = 6 | Yes |
3t2e6 12374 |
| th, t |
theorem |
|
|
No |
nfth 1803, sbcth 3791, weth 10486, ancomst 465 |
| tp | triple | df-tp 4632 |
{π΄, π΅, πΆ} | Yes |
eltpi 4690, tpeq1 4745 |
| tr | transitive | |
| No | bitrd 278, biantr 804 |
| tru, t |
true, truth |
df-tru 1544 |
β€ |
Yes |
bitru 1550, truanfal 1575, biimt 360 |
| un | union | df-un 3952 |
(π΄ βͺ π΅) | Yes |
uneqri 4150, uncom 4152 |
| unit | unit (in a ring) |
df-unit 20164 | (Unitβπ
) | Yes |
isunit 20179, nzrunit 20293 |
| v |
setvar (especially for specializations of
theorems when a class is replaced by a setvar variable) |
|
x |
Yes |
cv 1540, vex 3478, velpw 4606, vtoclf 3547 |
| v |
disjoint variable condition used in place of nonfreeness
hypothesis (suffix) |
|
|
No |
spimv 2389 |
| vtx |
vertex |
df-vtx 28247 |
(VtxβπΊ) |
Yes |
vtxval0 28288, opvtxov 28254 |
| vv |
two disjoint variable conditions used in place of nonfreeness
hypotheses (suffix) |
|
|
No |
19.23vv 1946 |
| w | weak (version of a theorem) (suffix) | |
| No | ax11w 2126, spnfw 1983 |
| wrd | word |
df-word 14461 | Word π | Yes |
iswrdb 14466, wrdfn 14474, ffz0iswrd 14487 |
| xp | cross product (Cartesian product) |
df-xp 5681 | (π΄ Γ π΅) | Yes |
elxp 5698, opelxpi 5712, xpundi 5742 |
| xr | eXtended reals | df-xr 11248 |
β* | Yes | ressxr 11254, rexr 11256, 0xr 11257 |
| z | integers (from German "Zahlen") |
df-z 12555 | β€ | Yes |
elz 12556, zcn 12559 |
| zn | ring of integers mod π | df-zn 21047 |
(β€/nβ€βπ) | Yes |
znval 21078, zncrng 21091, znhash 21105 |
| zring | ring of integers | df-zring 21010 |
β€ring | Yes | zringbas 21015, zringcrng 21011
|
| 0, z |
slashed zero (empty set) | df-nul 4322 |
β
| Yes |
n0i 4332, vn0 4337; snnz 4779, prnz 4780 |
(Contributed by the Metamath team, 27-Dec-2016.) Date of last revision.
(Revised by the Metamath team, 22-Sep-2022.)
(Proof modification is discouraged.) (New usage is
discouraged.) |
