On groups, slow heat kernel decay yields Liouville property and sharp entropy bounds

Abstract

Let μ be a symmetric probability measure of finite entropy on a group G. We show that if - μ(2n)(id)=o(n1/2), then the pair (G,μ) has the Liouville property (all bounded μ-harmonic functions on G are constant). Furthermore, if - μ(2n)(id)=O(nβ) where β∈(0,1/2), then the entropy of the n-fold convolution power μ(n) satisfies H(μ(n))=O(nβ1-β). This improves earlier results of Gournay and of Saloff-Coste and the second author. We extend the bounds to transitive graphs and illustrate their sharpness on a family of groups.