Selfless inclusions arising from commensurator groups of hyperbolic groups
Abstract
We provide new examples of C*-selfless groups and inclusions. In particular, we prove that the commensurator group Comm(H) of a torsion-free hyperbolic group H is C*-selfless. Our approach involves showing that the Gromov boundary ∂ H is a topologically free extreme boundary for Comm(H), Aut(H), and for other groups that contain H in an almost normal way.
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