The Range of Approximate Unitary Equivalence Classes of Homomorphisms from AH-algebras

Abstract

Let C be a unital AH-algebra and A be a unital simple C*-algebra with tracial rank zero. It has been shown that two unital monomorphisms φ, : C A are approximately unitarily equivalent if and only if [φ]=[] in KL(C,A) and τ φ=τ τ∈ T(A), where T(A) is the tracial state space of A. In this paper we prove the following: Given ∈ KL(C,A) with (K0(C)+ \0\)⊂ K0(A)+ \0\ and with ([1C])=[1A] and a continuous affine map λ: T(A) Tf(C) which is compatible with , where Tf(C) is the convex set of all faithful tracial states, there exists a unital monomorphism φ: C A such that [φ]= τ φ(c)=λ(τ)(c) for all c∈ Cs.a. and τ∈ T(A). Denote by Monaue(C,A) the set of approximate unitary equivalence classes of unital monomorphisms. We provide a bijective map : Monaue (C,A) KLT(C,A)++, where KLT(C,A)++ is the set of compatible pairs of elements in KL(C,A)++ and continuous affine maps from T(A) to Tf(C). Moreover, we realized that there are compact metric spaces X, unital simple AF-algebras A and ∈ KL(C(X), A) with (K0(C(X))+\0\)⊂ K0(A)+ \0\ for which there is no h: C(X) A so that [h]=.