Randomized Geodesic Flow on Hyperbolic Groups

Abstract

Motivated by Gromov's geodesic flow problem on hyperbolic groups G, we develop in this paper an analog using random walks. This leads to a notion of a harmonic analog of the Bowen-Margulis-Sullivan measure on ∂2 G. We provide three different but related constructions of : 1) by moving the base-point along a quasigeodesic ray 2) by moving the base-point along random walk trajectories 3) directly as a push-forward under the boundary map to ∂2 G of a measure inherited from studying all bi-infinite random walk trajectories (with no restriction on base-point) on GZ. Of these, the third construction is the most involved and needs new techniques. It relies on developing a framework where we can treat bi-infinite random walk trajectories as analogs of bi-infinite geodesics on complete simply connected negatively curved manifolds. Geodesic flow on a hyperbolic group is typically not well-defined due to non-uniqueness of geodesics. We circumvent this problem in the random walk setup by considering all trajectories. We thus get a well-defined discrete flow that we call the randomized geodesic flow, given by the Z-shift on bi-infinite random walk trajectories. The Z-shift is the random analog of the time one map of the geodesic flow. As an analog of ergodicity of the geodesic flow on a closed negatively curved manifold, we establish ergodicity of the G-action on (∂2G, ). As a consequence of our construction, we prove that the randomized geodesic flow is exponentially mixing of all orders and establish a functional CLT.

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