Non-Realizability of the Poisson Boundary

Abstract

We show that for any countable group G equipped with a probability measure μ , there exists a randomized stopping time τ such that (G, μ τ ) admits a strictly larger space of bounded harmonic functions than (G,μ) , unless this space is trivial for all measures on G . In particular, we exhibit an irreducible probability measure on the free group F2 such that the Poisson boundary is strictly larger than the geometric boundary equipped with the hitting measure, resolving a longstanding open problem. As another consequence, there is never a nontrivial universal topological realization of the Poisson boundary for any countable group.