Amenable actions on finite simple C*-algebras arising from flows on Pimsner algebras

Abstract

Associated to a family of G--endomorphisms on a G-C*-algebra A satisfying certain minimality conditions, we give a G-C*-correspondence E over A whose Cuntz--Pimsner algebra OE is simple. For certain quasi-free flows γ (commuting with the G-action) on OE, we further prove the simplicity of the reduced crossed product OE γ R. We then classify the KMS weights of γ. This in particular gives a sufficient condition for OE and OEγ R to be stably finite (and to be stably projectionless). As the amenability of G A inherits to the induced actions G OE, OEγ R, this provides a new systematic framework to provide amenable actions on stably finite simple C*-algebras.