Mathematics – Operator Algebras
Scientific paper
2008-01-25
Mathematics
Operator Algebras
Scientific paper
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 $\phi, \psi: C\to A$ are approximately unitarily equivalent if and only if $$ [\phi]=[\psi] {\rm in} KL(C,A) and \tau\circ \phi=\tau\circ \psi \tforal \tau\in T(A), $$ where $T(A)$ is the tracial state space of $A.$ In this paper we prove the following: Given $\kappa\in KL(C,A)$ with $\kappa(K_0(C)_+\setminus \{0\})\subset K_0(A)_+\setminus \{0\}$ and with $\kappa([1_C])=[1_A]$ and a continuous affine map $\lambda: T(A)\to T_{\mathtt{f}}(C)$ which is compatible with $\kappa,$ where $T_{\mathtt{f}}(C)$ is the convex set of all faithful tracial states, there exists a unital monomorphism $\phi: C\to A$ such that $$ [\phi]=\kappa\andeqn \tau\circ \phi(c)=\lambda(\tau)(c) $$ for all $c\in C_{s.a.}$ and $\tau\in T(A).$ Denote by ${\rm Mon}_{au}^e(C,A)$ the set of approximate unitary equivalence classes of unital monomorphisms. We provide a bijective map $$ \Lambda: {\rm Mon}_{au}^e (C,A)\to KLT(C,A)^{++}, $$ where $KLT(C,A)^{++}$ is the set of compatible pairs of elements in $KL(C,A)^{++}$ and continuous affine maps from $T(A)$ to $T_{\mathtt{f}}(C).$ Moreover, we realized that there are compact metric spaces $X$, unital simple AF-algebras $A$ and $\kappa\in KL(C(X), A)$ with $\kappa(K_0(C(X))_+\setminus\{0\})\subset K_0(A)_+\setminus \{0\}$ for which there is no \hm $h: C(X)\to A$ so that $[h]=\kappa.$
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