KMS states for generalized gauge actions on C*-algebras associated with self-similar sets

Abstract

Given a self-similar K set defined from an iterated function system =(γ1,…,γn) and a set of function H=\hi:K\i=1d satisfying suitable conditions, we define a generalized gauge action on Kawjiwara-Watatani algebras O and their Toeplitz extensions T. We then characterize the KMS states for this action. For each β∈(0,∞), there is a Ruelle operator LH,β and the existence of KMS states at inverse temperature β is related to this operator. The critical inverse temperature βc is such that LH,βc has spectral radius 1. If β<βc, there are no KMS states on O and T; if β=βc, there is a unique KMS state on O and T which is given by the eigenmeasure of LH,βc; and if β>βc, including β=∞, the extreme points of the set of KMS states on T are parametrized by the elements of K and on O by the set of branched points.