Homomorphisms from AH-algebras

Abstract

Let C be a general unital AH-algebra and let A be a unital simple C*-algebra with tracial rank at most one. Suppose that φ, : C A are two unital monomorphisms. We show that φ and are approximately unitarily equivalent if and only if [φ]&=&[] in KL(C,A), φ&=& φ&=&, where φ and are continuous affine maps from tracial state space T(A) of A to faithful tracial state space T f(C) of C induced by φ and , respectively, and φ and are induced homomorphisms from K1(C) into (T(A))/A(K0(A)), where (T(A)) is the space of all real affine continuous functions on T(A) and A(K0(A)) is the closure of the image of K0(A) in the affine space (T(A)). In particular, the above holds for C=C(X), the algebra of continuous functions on a compact metric space. An approximate version of this is also obtained. We also show that, given a triple of compatible elements ∈ KLe(C,A)++, an affine map γ: T(C) T f(C) and a : K1(C) (T(A))/A(K0(A)), there exists a unital monomorphism φ: C A such that [h]=, h=γ and φ=.