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 $\Gamma=(\gamma_1,\ldots,\gamma_n)$ and a set of function $H={h_i:K\to\mathbb{R}}{i=1}^d$ satisfying suitable conditions, we define a generalized gauge action on Kawjiwara-Watatani algebras $\mathcal{O}\Gamma$ and their Toeplitz extensions $\mathcal{T}\Gamma$. We then characterize the KMS states for this action. For each $\beta\in(0,\infty)$, there is a Ruelle operator $\mathcal{L}{H,\beta}$ and the existence of KMS states at inverse temperature $\beta$ is related to this operator. The critical inverse temperature $\beta_c$ is such that $\mathcal{L}{H,\beta_c}$ has spectral radius 1. If $\beta<\beta_c$, there are no KMS states on $\mathcal{O}\Gamma$ and $\mathcal{T}\Gamma$; if $\beta=\beta_c$, there is a unique KMS state on $\mathcal{O}\Gamma$ and $\mathcal{T}\Gamma$ which is given by the eigenmeasure of $\mathcal{L}{H,\beta_c}$; and if $\beta>\beta_c$, including $\beta=\infty$, the extreme points of the set of KMS states on $\mathcal{T}\Gamma$ are parametrized by the elements of $K$ and on $\mathcal{O}\Gamma$ by the set of branched points.