metaaxioms

Metaaxioms are principles that govern the choice, justification, and use of axioms within a formal system. They operate at the meta-level, meaning they are statements about the theory's own axioms rather than propositions expressed in the theory's object language. Metaaxioms can guide how axioms are selected, how inference rules are justified, and how the system should be interpreted relative to intended models or semantics.

Typical metaaxioms address independence of axioms (no axiom is derivable from the others within the system),

In practice, metaaxioms are studied in metamathematics and philosophy of mathematics. They are not universally fixed;

The term metaaxiom is not always used with strict consistency, and some authors treat these principles as