The Choquet-Deny theorem and distal properties of totally disconnected locally compact groups of polynomial growth

Abstract

We obtain sufficient and necessary conditions for the Choquet-Deny theorem to hold in the class of compactly generated totally disconnected locally compact groups of polynomial growth, and in a larger class of totally disconnected generalized FC-groups. The following conditions turn out to be equivalent when G is a metrizable compactly generated totally disconnected locally compact group of polynomial growth: (i) the Choquet-Deny theorem holds for G; (ii) the group of inner automorphisms of G acts distally on G; (iii) every inner automorphism of G is distal; (iv) the contraction subgroup of every inner automorphism of G is trivial; (v) G is a SIN group. We also show that for every probability measure μ on a totally disconnected compactly generated locally compact second countable group of polynomial growth, the Poisson boundary is a homogeneous space of G, and that it is a compact homogeneous space when the support of μ generates G.

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