Characterizing relative decidability in terms of model completeness
Abstract
A theory T is said to be relatively decidable if for every model of T, one can compute the elementary diagram of that model from its atomic diagram together with T. We verify a conjecture of Chubb, Miller, and Solomon by showing that for complete theories T, T is relatively decidable if and only if T has a conservative model complete extension of the form T \(c)\ where T ∃ x \; (x). We also show that no such characterization works for incomplete theories.
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