Lifting KK-elements, asymptotical unitary equivalence and classification of simple C*-algebras

Abstract

Let A and C be two unital simple C*-algebas with tracial rank zero. Suppose that C is amenable and satisfies the Universal Coefficient Theorem. Denote by KKe(C,A)++ the set of those for which (K0(C)+\0\)⊂ K0(A)+\0\ and ([1C])=[1A]. Suppose that ∈ KKe(C,A)++. We show that there is a unital monomorphism φ: C A such that [φ]=. Suppose that C is a unital AH-algebra and λ: T(A) Tf(C) is a continuous affine map for which τ(([p]))=λ(τ)(p) for all projections p in all matrix algebras of C and any τ∈ T(A), where T(A) is the simplex of tracial states of A and Tf(C) is the convex set of faithful tracial states of C. We prove that there is a unital monomorphism φ: C A such that φ induces both and λ. Suppose that h: C A is a unital monomorphism and γ ∈ Hom((C), (A)). We show that there exists a unital monomorphism φ: C A such that [φ]=[h] in KK(C,A), τ φ=τ h for all tracial states τ and the associated rotation map can be given by γ. Applications to classification of simple C*-algebras are also given.