axioms

An axiom is a statement that is accepted as true without proof within a given formal system. Axioms provide the foundational assumptions from which theorems are derived through logical deduction. They are chosen to encode the essential properties and relationships of the objects under study and serve as the starting point for mathematical reasoning. The collection of axioms, together with rules of inference, defines the formal theory.

Axioms come in several forms. Some are single statements; others are axiom schemes, where an infinite family

Axoms also underpin algebraic structures. For groups, the axioms express associativity, identity, and inverses; for rings

In logic, systems include both logical axiom schemas and inference rules that govern deduction. The study of