Z-stable Graph Algebras

Abstract

We introduce a divisibility-type condition for directed graphs that is necessary for Z-stability of the corresponding graph C*-algebra. We prove that this condition is sufficient if either the graph E has no cycles or the algebra C*(E) has finitely many ideals. Under the further assumption that E is a finite graph, we provide a complete characterization of Z-stability of C*(E). We conjecture that our divisibility condition and Condition (K) are equivalent to Z-stability of the graph algebra. We prove that it is equivalent to C*(E) being pure, verifying the Generalized Toms--Winter Conjecture for graph algebras with finitely many ideals.

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