Boundary maps, germs and quasi-regular representations

Abstract

We investigate the tracial and ideal structures of C*-algebras of quasi-regular representations of stabilizers of boundary actions. Our main tool is the notion of boundary maps, namely -equivariant unital completely positive maps from -C*-algebras to C(∂F), where ∂F denotes the Furstenberg boundary of a group . For a unitary representation π coming from the groupoid of germs of a boundary action, we show that there is a unique boundary map on C*π(). Consequently, we completely describe the tracial structure of the C*-algebras C*π(), and for any -boundary X, we completely characterize the simplicity of the C*-algebras generated by the quasi-regular representations λ/x associated to stabilizer subgroups x for any x∈ X. As an application, we show that the C*-algebra generated by the quasi-regular representation λT/F associated to Thompson's groups F≤ T does not admit traces and is simple.