C*-irreducibility of commensurated subgroups

Abstract

Given a commensurated subgroup of a group , we completely characterize when the inclusion ≤ is C*-irreducible and provide new examples of such inclusions. In particular, we obtain that PSL(n,Z)≤PGL(n,Q) is C*-irreducible for any n∈ N, and that the inclusion of a C*-simple group into its abstract commensurator is C*-irreducible. The main ingredient that we use is the fact that the action of a commensurated subgroup ≤ on its Furstenberg boundary ∂F can be extended in a unique way to an action of on ∂F. Finally, we also investigate the counterpart of this extension result for the universal minimal proximal space of a group.