Reduced products of UHF algebras under forcing axioms

Abstract

If An is a sequence of C*-algebras, then the C*-algebra Π An / An is called a reduced product. We prove, assuming Todorcevic's Axiom and Martin's Axiom, that every isomorphism between two reduced products of separable, unital UHF algebras must be definable in a strong sense. As a corollary we deduce that two such reduced products Π An / An and Π Bn / Bn are isomorphic if and only if, up to an almost-permutation of N, An is isomorphic to Bn.