Categoricity without Power

Abstract

We prove an analogue of Morley's categoricity theorem where cardinality is replaced by the recursion-theoretic notion of arithmetic degree. We say that a complete arithmetically definable theory T is D-categorical if any two arithmetically extendible models of T of arithmetic degree D, considered over a common elementary submodel with arithmetical elementary diagram, are isomorphic over that submodel by an isomorphism which preserves the complexity of sets of degree D. Here an arithmetically extendible model means an elementary substructure of a model whose elementary diagram is arithmetical. Our main result is: If T is D1-categorical for some nonzero arithmetic degree D1, then T is D2-categorical for every nonzero arithmetic degree D2. We also show that, assuming ZFC, D-categoricity for some nonzero arithmetic degree is equivalent to uncountable categoricity.