KMS States of Self-Similar k-Graph C*-Algebras

Abstract

Let G be a countable discrete amenable group, and be a strongly connected finite k-graph. If (G,) is a pseudo free and locally faithful self-similar action which satisfies the finite-state condition, then the structure of the KMS simplex of the C*-algebra G, associated to (G,) is described: it is either empty or affinely isomorphic to the tracial state space of the C*-algebra of the periodicity group G, of (G,), depending on whether the Perron-Frobenius eigenvector of preserves the G-action. As applications of our main results, we also exhibit several classes of important examples.