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== Termes privilégiés == | == Termes privilégiés == | ||
* Logique du premier ordre. | |||
** [https://www.btb.termiumplus.gc.ca/tpv2source?lang=fra&srchtxt=logique%20premier%20ordre&i=1&index=frt&src_id=IRIA-21984,GOEXP1984,BONINT1984,TESIN1984&rlang=fr&titl=logique%20du%20premier%20ordre&fchrcrdnm=1#resultrecs Termium] | |||
** Mémo : Cours logique - Mémo n˚5 | |||
Logique du premier ordre, | |||
Emmanuel Coquery, [https://liris.cnrs.fr/~ecoquery/dokuwiki/lib/exe/fetch.php?media=enseignement:logique:logique-memo5.pdf (pdf)] | |||
== Anglais == | == Anglais == | ||
Version du 24 mars 2018 à 08:50
Domaine
Vocabulary
Définition
Termes privilégiés
- Logique du premier ordre.
- Termium
- Mémo : Cours logique - Mémo n˚5
Logique du premier ordre, Emmanuel Coquery, (pdf)
Anglais
First-order logic
First-order logic—also known as first-order predicate calculus and predicate logic—is a collection of formal systems used in mathematics, philosophy, linguistics, and computer science. First-order logic uses quantified variables over non-logical objects and allows the use of sentences that contain variables, so that rather than propositions such as Socrates is a man one can have expressions in the form "there exists X such that X is Socrates and X is a man" and there exists is a quantifier while X is a variable.[1] This distinguishes it from propositional logic, which does not use quantifiers or relations.[2]
A theory about a topic is usually a first-order logic together with a specified domain of discourse over which the quantified variables range, finitely many functions from that domain to itself, finitely many predicates defined on that domain, and a set of axioms believed to hold for those things. Sometimes "theory" is understood in a more formal sense, which is just a set of sentences in first-order logic.
The adjective "first-order" distinguishes first-order logic from higher-order logic in which there are predicates having predicates or functions as arguments, or in which one or both of predicate quantifiers or function quantifiers are permitted.[3] In first-order theories, predicates are often associated with sets. In interpreted higher-order theories, predicates may be interpreted as sets of sets.
Contributeurs: Claude Coulombe, Imane Meziani, Pierre Labreche, wiki