Crossed product C*-algebras by finite group actions with the tracial Rokhlin property

Abstract

Let A be a stably finite simple unital C*-algebra and suppose α is an action of a finite group G with the tracial Rokhlin property. Suppose further A has real rank zero and the order on projections over A is determined by traces. Then the crossed product C*-algebra C*(G,A, α) also has real rank zero and order on projections over A is determined by traces. Moreover, if A also has stable rank one, then C*(G,A, α) also has stable rank one.