On the inclusion of bounded harmonic functions of random walks

Abstract

We investigate the conditions under which the space of bounded harmonic functions of a probability measure μ on a group G is contained in that of another measure θ. We establish that asymptotic commutativity, defined by the condition \|μ*t*θ - θ*μ*t\|TV 0 as t ∞, is sufficient to guarantee the inclusion H∞(G, μ) ⊂eq H∞(G, θ), provided θ is absolutely continuous with respect to a convex combination of convolution powers of μ. By employing martingale convergence techniques rather than ergodic-theoretic arguments, we demonstrate that this result holds without topological assumptions on G (such as local compactness) and extends to general Markov chains. Furthermore, utilizing hitting models for the Poisson boundary, we characterise the inclusion H∞(G, μ) ⊂eq H∞(G, θ) as equivalent to the asymptotic invariance of θ under μ in the weak* topology. We apply these results to provide a probabilistic proof of the Choquet-Deny theorem for nilpotent groups, among other applications.