Characterization of hyperbolic groups via random walks

Abstract

Our first result gives a partial converse to a well-known theorem of A. Ancona for hyperbolic groups. We prove that a group G, equipped with a symmetric probability measure whose finite support generates G, is hyperbolic if it is nonamenable and satisfies the following condition: for a sufficiently small >0 and r≥slant0, and for every triple (x, y, z), belonging to a word geodesic of the Cayley graph, the probability that a random path from x to z intersects the closed ball of radius r centered at y is at least 1-. We note that if a group is hyperbolic then the above condition for r=0 is satisfied by Ancona's theorem and for any r>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 r does not intersect it is exponentially small with respect to r for r0.. The proof is based on a purely geometric criterion for the hyperbolicity of a connected graph.