Self-Similar k-Graph C*-Algebras

Abstract

In this paper, we introduce a notion of a self-similar action of a group G on a k-graph , and associate it a universal C*-algebra G,. We prove that G, can be realized as the Cuntz-Pimsner algebra of a product system. If G is amenable and the action is pseudo free, then G, is shown to be isomorphic to a "path-like" groupoid C*-algebra. This facilitates studying the properties of G,. We show that G, is always nuclear and satisfies the Universal Coefficient Theorem; we characterize the simplicity of G, in terms of the underlying action; and we prove that, whenever G, is simple, there is a dichotomy: it is either stably finite or purely infinite, depending on whether has nonzero graph traces or not. Our main results generalize the recent work of Exel and Pardo on self-similar graphs.