axiomatisation

Axiomatisation (also spelled axiomatization) is the process of formulating a formal system by specifying a set of axioms from which all theorems of the system can be derived. It is a central practice in logic, mathematics, and computer science, and is used in some sciences to clarify foundational assumptions. In an axiomatised theory, axioms are chosen to be simple, self-evident, or at least widely accepted starting points, and a deductive apparatus (rules of inference) is used to derive more complex results. Axioms may be independent (no axiom follows from the others) and the theory seeks to be consistent (no contradictions).

In mathematics and logic, axiomatisation aims to provide a rigorous foundation for a subject. Famous examples

Important limiting notions accompany axiomatisation. Completeness, whereby every statement expressible in the system is either provable

In practice, axiomatisation reflects aims and convictions about a domain: it clarifies assumptions, enables formal analysis,