Behaviors of entropy on finitely generated groups

Abstract

A variety of behaviors of entropy functions of random walks on finitely generated groups is presented, showing that for any 12≤ α≤β≤1, there is a group with measure μ equidistributed on a finite generating set such that \[ H ,μ(n) n=α , H ,μ(n) n=β .\] The groups involved are finitely generated subgroups of the group of automorphisms of an extended rooted tree. The return probability and the drift of a simple random walk Yn on such groups are also evaluated, providing an example of group with return probability satisfying \[| P(Yn=1)| n=13, | P(Yn=1)| n=1\] and drift satisfying \[ E\|Yn\| n=12, E\|Yn\| n=1.\]