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Complete Recursive Axiomatizations
Theorem: Let a set of first-order sentences be a recursively enumerable axiomatization for a complete and consistent theory, that is:
- is recursively enumerable: there exists an enumerateion of the set and there exists an algorithm that given computes ;
- is complete: for each FOL sentence , either or ;
Then there exists an algorithm for checking, given , whether .
Proof.
In other words, if a complete theory has a recursively enumerable axiomatization, then this theory is decidable.
(Note: a finite axiomatization is recursively enumerable. Typical axiomatizations that use “axiom schemas” are also recursively enumerable.)
Conversely: if a theory is undecidable (there is no algorithm for deciding whether a sentence is true or false), then the theory does not have a recursive axiomatization.
Example: the theory of integers with multiplication and quantifiers is undecidable
- consequently, there are no complete axiomatizations for it, no decidable set of axioms from which the truth value of facts about natural numbers follows
- this result is one part of Goedel's incompleteness theorem