axiomsystem

Axiomsystem is a formal framework in which a language is equipped with a specified set of axioms and inference rules designed to derive theorems. It serves as the foundational structure for formal reasoning in mathematics, logic, and related disciplines.

Components of an axiomsystem include a formal language specifying symbols and formation rules; an axiom set

Common examples of axiomsystems include propositional calculus with a minimal axiom base and inference rules; first-order

Uses and significance of axiomsystems span formal verification, automated theorem proving, and foundational research in mathematics.

History and terminology: Modern emphasis on axiomatization arose in the 19th and 20th centuries with the work

See also: formal logic, axiomatization, proof theory, model theory, automated theorem proving.