AF-embedding of the crossed products of AH-algebras by finitely generated abelian groups

Abstract

Let X be a compact metric space and let be a k (k 1) action on X. We give a solution to a version of Voiculescu's problem of AF-embedding: The crossed product C(X)k can be embedded into a unital simple AF-algebra if and only if X admits a strictly positive -invariant Borel probability measure. Let C be a unital AH-algebra, let G be a finitely generated abelian group and let : G Aut(C) be a monomorphism. We show that C G can be embedded into a unital simple AF-algebra if and only if C admits a faithful -invariant tracial state.