A L\'opez-Escobar theorem for metric structures, and the topological Vaught conjecture

Abstract

We show that a version of L\'opez-Escobar's theorem holds in the setting of logic for metric structures. More precisely, let U denote the Urysohn sphere and let Mod(L,U) be the space of metric L-structures supported on U. Then for any Iso(U)-invariant Borel function f Mod(L, U)→ 0,1], there exists a sentence φ of Lω1ω such that for all M∈ Mod(L,U) we have f(M)=φ M. At the same time we introduce a variant Lω1ω of Lω1ω in which the usual quantifiers are replaced with category quantifiers, and establish the analogous theorem for Lω1ω. This answers a question of Ivanov and Majcher-Iwanow. We prove several consequences, for example every orbit equivalence relation of a Polish group action is Borel isomorphic to the isomorphism relation on the set of models of a given Lω1ω-sentence that are supported on the Urysohn sphere. This in turn provides a model-theoretic reformulation of the topological Vaught conjecture.