-
Metamath is a
formal language and an ****ociated
computer program (a
proof ****istant) for
archiving and
verifying mathematical proofs.
Several databases...
- example,
adding this
axiom supports category theory. The
Mizar system and
Metamath use Tarski–Grothendieck set
theory for
formal verification of proofs. Tarski–Grothendieck...
-
Releases Page". GitHub.
Retrieved 15
October 2023. "Release v0.198 ·
metamath/
Metamath-exe". GitHub. Farmer,
William M.; Guttman,
Joshua D.; Thayer, F. Javier...
-
Category theory (3rd ed.),
Heldermann Verlag, pp. 9–12 abeq2 –
Metamath Proof Explorer, us.
metamath.org, 1993-08-05,
retrieved 2016-03-09 J. R. Shoenfield, "Axioms...
- dictionary.
Wikisource has the text of the 1911 Encyclopædia
Britannica article "Axiom".
Axiom at
PhilPapers Axiom at PlanetMath.
Metamath axioms page...
-
classes are also used in Levy (2002),
Takeuti &
Zaring (1982), and in the
Metamath implementation of ZFC. The
axiom schemata of
replacement and separation...
-
Craig Huneke. A
formalised proof in
Metamath was
reported by
Alexander van der
Vekens in
October 2018 on the
Metamath mailing list. The
friendship graph...
-
Annalen 65 (1908), 261-281;
Axiom des
Unendlichen p. 266f. "
Metamath Proof Explorer".
Metamath. Paul
Halmos (1960)
Naive Set Theory. Princeton, NJ: D. Van...
- p. 119. ISBN 978-0-691-02906-1. "Proof
Explorer - Home Page -
Metamath". us.
metamath.org.
Retrieved 2 July 2024. Walicki, Michał (2017). Introduction...
-
language proofs mathematicians commonly present. One
verification project,
Metamath,
includes human-written, computer-verified
derivations of more than 12...