Purely infinite labeled graph C*-algebras

Abstract

In this paper, we consider pure infiniteness of generalized Cuntz-Krieger algebras associated to labeled spaces (E,L,E). It is shown that a C*-algebra C*(E,L,E) is purely infinite in the sense that every nonzero hereditary subalgebra contains an infinite projection (we call this property (IH)) if (E, L,E) is disagreeable and every vertex connects to a loop. We also prove that under the condition analogous to (K) for usual graphs, C*(E,L,E)=C*(pA, sa) is purely infinite in the sense of Kirchberg and Rrdam if and only if every generating projection pA, A∈ E, is properly infinite, and also if and only if every quotient of C*(E,L,E) has the property (IH).