Purely infinite C*-algebras associated to \'etale groupoids
Abstract
Let G be a Hausdorff, \'etale groupoid that is minimal and topologically principal. We show that C*r(G) is purely infinite simple if and only if all the nonzero positive elements of C0(G0) are infinite in Cr*(G). If G is a Hausdorff, ample groupoid, then we show that C*r(G) is purely infinite simple if and only if every nonzero projection in C0(G0) is infinite in C*r(G). We then show how this result applies to k-graph C*-algebras. Finally, we investigate strongly purely infinite groupoid C*-algebras.
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