On the Lattice of Boundaries and the Entropy Spectrum of Hyperbolic Groups

Abstract

Let be a non-elementary hyperbolic group and μ be a probability on . We study the μ-proximal, stationary actions, also known as boundary actions, of . In particular, we are interested in the spectrum of Furstenberg entropies of (,μ)-boundaries, and the lattice-theoretic and topological structure of the set BL(,μ) of boundaries. We prove that all hyperbolic groups have infinitely many distinct boundaries, which attain an infinite set of distinct entropies. Additionally, for simple random walks on non-abelian free groups Fd, we establish that there are infinitely many boundaries whose entropy is greater than 12-ε times the entropy of Poisson boundary, when the rank d is large. General results of independent interest about the order-theoretic and continuity properties of Furstenberg entropy for countable groups are attained along the way. This includes the result that under mild assumptions, the spectrum of boundary entropies Hbound(,μ) is closed.

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