English

Characterization of hyperbolic groups via random walks

Group Theory 2025-07-30 v1

Abstract

Our first result gives a partial converse to a well-known theorem of A. Ancona for hyperbolic groups. We prove that a group GG, equipped with a symmetric probability measure whose finite support generates GG, is hyperbolic if it is nonamenable and satisfies the following condition: for a sufficiently small ε>0\varepsilon >0 and r0r\geqslant0, and for every triple (x,y,z)(x, y, z), belonging to a word geodesic of the Cayley graph, the probability that a random path from xx to zz intersects the closed ball of radius rr centered at yy is at least 1ε.1-\varepsilon. We note that if a group is hyperbolic then the above condition for r=0r=0 is satisfied by Ancona's theorem and for any r>0r>0 follows from this paper. Another our theorem claims that a finitely generated group is hyperbolic if and only if the probability that a random path, connecting two antipodal points of an open ball of radius rr does not intersect it is exponentially small with respect to rr for r0r\gg0.. The proof is based on a purely geometric criterion for the hyperbolicity of a connected graph.

Keywords

Cite

@article{arxiv.2507.22005,
  title  = {Characterization of hyperbolic groups via random walks},
  author = {Victor Gerasimov and Leonid Potyagailo},
  journal= {arXiv preprint arXiv:2507.22005},
  year   = {2025}
}
R2 v1 2026-07-01T04:24:26.791Z