Model completeness and relative decidability

Abstract

We study the implications of model completeness of a theory for the effectiveness of presentations of models of that theory. It is immediate that for a computable model A of a computably enumerable, model complete theory, the entire elementary diagram E( A) must be decidable. We prove that indeed a c.e. theory T is model complete if and only if there is a uniform procedure that succeeds in deciding E( A) from the atomic diagram ( A) for all countable models A of T. Moreover, if every presentation of a single isomorphism type A has this property of relative decidability, then there must be a procedure with succeeds uniformly for all presentations of an expansion ( A,a) by finitely many new constants. We end with a conjecture about the situation when all models of a theory are relatively decidable.