Mathematics – Operator Algebras
Scientific paper
2006-12-18
Mathematics
Operator Algebras
Scientific paper
Let $A$ be a unital AH-algebra and let $\alpha\in Aut(A)$ be an automorphism. A necessary condition for $A\rtimes_{\alpha}\Z$ being embedded into a unital simple AF-algebra is the existence of a faithful tracial state. If in addition, there is an automorphism $\kappa$ with $\kappa_{*1}=-{\rm id}_{K_1(A)}$ such that $\alpha\circ \kappa$ and $\kappa\circ \af$ are asymptotically unitarily equivalent, then $A\rtimes_{\af}\Z$ can be embedded into a unital simple AF-algebra. Consequently, in the case that $A$ is a unital AH-algebra (not necessarily simple) with torsion $K_1(A),$ $A\rtimes_{\alpha}\Z$ can be embedded into a unital simple AF-algebra if and only if $A$ admits a faithful $\alpha$-invariant tracial state. We also show that if $A$ is a unital A$\T$-algebra then $A\rtimes_{\alpha}\Z$ can be embedded into a unital simple AF-algebra if and only if $A$ admits a faithful $\af$-invariant tracial state. If $X$ is a compact metric space and $\Lambda: \Z^2\to Aut(C(X))$ is a \hm then $C(X)\rtimes_{\Lambda}\Z^2$ can be asymptotically embedded into a unital simple AF-algebra provided that $X$ admits a strictly positive $\Lambda$-invariant probability measure. Consequently $C(X)\rtimes_{\Lambda}\Z^2$ is quasidiagonal if $X$ admits a strictly positive $\Lambda$-invariant Borel probability measure.
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