Random walks on nilpotent groups driven by measures supported on powers of generators

Abstract

We study the decay of convolution powers of a large family μS,a of measures on finitely generated nilpotent groups. Here, S=(s1,...,sk) is a generating k-tuple of group elements and a= (α1,...,αk) is a k-tuple of reals in the interval (0,2). The symmetric measure μS,a is supported by S*=\sim, 1 i k,\,m∈ Z\ and gives probability proportional to (1+m)-αi-1 to si m, i=1,...,k, m∈ N. We determine the behavior of the probability of return μS,a(n)(e) as n tends to infinity. This behavior depends in somewhat subtle ways on interactions between the k-tuple a and the positions of the generators si within the lower central series Gj=[Gj-1,G], G1=G.