The groupoid approach to equilibrium states on right LCM semigroup C*-algebras

Abstract

Given a right LCM semigroup S and a homomorphism N S[1,+∞), we use the groupoid approach to study the KMSβ-states on C*(S) with respect to the dynamics induced by N. We establish necessary and sufficient conditions for the existence and uniqueness of KMSβ-states. As an application, we show that the sufficient condition for the uniqueness obtained for so-called generalized scales is necessary as well. Our most complete results are obtained for inverse temperatures β at which the ζ-function of N is finite. In this case we get an explicit bijective correspondence between the KMSβ-states on C*(S) and the tracial states on C*(ker N).