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Paper detail

Determining subgroups via stationary measures

In this paper, we consider random walks on the isometry groups of general metric spaces. Under some mild conditions, we show that if two non-elementary random walks on a discrete subgroup of the isometry group have non-singular stationary measures, then subgroups generated by the random walks are commensurable. This result in particular applies to separable Gromov hyperbolic spaces and Teichmüller spaces. As a specific application, we prove singularity between stationary measures associated to random walks on different fiber subgroups of the fundamental group of a hyperbolic 3-manifold fibering over the circle.

preprint2026arXivOpen access
Dongryul M. KimAndrew Zimmer
math.GRmath.DSmath.PRmath.GT
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Dongryul M. KimAndrew Zimmer

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