Remarks on relative categoricity
Abstract: We make some elementary observations about relative categoricity and the Gaifman property. T will be a complete theory in a countable language L with a distinguished unary predicate P. We will assume L is relational and T has quantifier elimination. For M a model of of T, MP is the substructure of M with universe P(M), and TP is the common L-theory of these MP. T is said to be relatively categorical if for any models M_1, M_2 of T any isomorphism between M_1P and M_2P lifts to an isomorphism between M_1 and M_2. T has the Gaifman property (or P-existence) if every model of TP is of the form MP for a model M of T. It was conjectured that if T is relatively categorical then T has the Gaifman property. T is said to be relatively (omega, omega) categorical if relative categoricity holds when restricted to countable models of T. We observe that (i) if T is relatively (omega, omega) categorical then any model of TP of cardinality at most aleph_1 is of the form MP for M a model of T, and (ii) if in addition every model M of T is in the algebraic closure of P(M) together with a (finite) subset of M, then T is relatively categorical and has the Gaifman property.
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