Stationary boundaries on the space of amenable subgroups and C*-simplicity

Abstract

We give a sufficient condition for a countable group G to possess a probability measure μ that admits a non-trivial μ-boundary modeled in the space Subam(G) of amenable subgroups of G. In particular, for such μ the space Subam(G) is not uniquely μ-stationary. This contrasts with a theorem of Hartman-Kalantar, which states that a countable group G is C*-simple if and only if there exists μ∈ Prob(G) such that Subam(G) is uniquely μ-stationary. Our criterion applies to (permutational) wreath products, which include groups that are C*-simple, and to Thompson's group F, whose C*-simplicity is equivalent to its non-amenability and therefore remains an open problem. We also show that any non-trivial μ-boundary modeled on Subam(G) is supported on amenable normalish subgroups, in the sense of Breuillard-Kalantar-Kennedy-Ozawa. As a consequence, we conclude that a countable group with no finite normal subgroups and no amenable normalish subgroups acts essentially freely on all its Poisson boundaries.

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