C*-exactness and property A for group actions
Abstract
For an action of a discrete group on a set X, we show that the Schreier graph on X has property A if and only if the permutation representation on 2X generates an exact C*-algebra. This is well known in the case of the left regular action on X= as the equivalence of C*-exactness and property A of its Cayley graph. This also generalizes Sako's theorem, which states that exactness of the uniform Roe algebra C*u(X) characterizes property A of X when X is uniformly locally finite.
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