Finite simple labeled graph C*-algebras of Cantor minimal subshifts

Abstract

It is now well known that a simple graph C*-algebra C*(E) of a directed graph E is either AF or purely infinite. In this paper, we address the question of whether this is the case for labeled graph C*-algebras recently introduced by Bates and Pask as one of the generalizations of graph C*-algebras, and show that there exists a family of simple unital labeled graph C*-algebras which are neither AF nor purely infinite. Actually these algebras are shown to be isomorphic to crossed products C(X)×T Z where the dynamical systems (X,T) are Cantor minimal subshifts. Then it is an immediate consequence of well known results about this type of crossed products that each labeled graph C*-algebra in the family obtained here is an A T algebra with real rank zero and has Z as its K1-group.