Generalized gauge actions on k-graph C*-algebras: KMS states and Hausdorff structure

Abstract

For a finite, strongly connected k-graph , an Huef, Laca, Raeburn and Sims studied the KMS states associated to the preferred dynamics of the k-graph C*-algebra C*(). They found that these KMS states are determined by the periodicity of and a certain Borel probability measure M on the infinite path space ∞ of . Here we consider different dynamics on C*(), which arise from a functor y: R+ and were first proposed by McNamara in his thesis. We show that the KMS states associated to McNamara's dynamics are again parametrized by the periodicity group of and a family of Borel probability measures on the infinite path space. Indeed, these measures also arise as Hausdorff measures on ∞, and the associated Hausdorff dimension is intimately linked to the inverse temperatures at which KMS states exist. Our construction of the metrics underlying the Hausdorff structure uses the functors y: R+; the stationary k-Bratteli diagram associated to ; and the concept of exponentially self-similar weights on Bratteli diagrams.