A dichotomy for simple self-similar graph C-algebras

Abstract

We investigate the pure infiniteness and stable finiteness of the Exel-Pardo C*-algebras OG,E for countable self-similar graphs (G,E,). In particular, we associate a specific ordinary graph E to (G,E,) such that some properties such as simpleness, stable finiteness or pure infiniteness of the graph C*-algebra C*(E) imply that of OG,E. Among others, this follows a dichotomy for simple OG,E: if (G,E,) contains no G-circuits, then OG,E is stably finite; otherwise, OG,E is purely infinite. Furthermore, Li and Yang recently introduced self-similar k-graph C*-algebras OG,. We also show that when |0|<∞ and OG, is simple, then it is purely infinite.