Simplicity of action-based C*-algebras from hyperbolic actions

Abstract

We study the simplicity of C*-algebras built from group actions. For a faithful isometric action of a group G on a countable metric space X, we use the associated action representation on 2(X) to define the action-based C*-algebra C*XG. We define generalized versions of the properties Pnaive and Panalytic relative to the action and show that the naive form implies the analytic form. We also prove that the properties Panalytic associated with a continuous action ensure the simplicity of the action-based C*-algebra. As an application, we deduce that big mapping class groups satisfy the property PnaiveX and the associated action-based C*-algebra is simple.