Boundary of the Range of a random walk and the F\"olner property

Abstract

The range process Rn of a random walk is the collection of sites visited by the random walk up to time n. In this work we deal with the question of whether the range process of a random walk or the range process of a cocycle over an ergodic transformation is almost surely a F\"olner sequence and show the following results: % (a) The size of the inner boundary |∂ Rn| of the range of recurrent aperiodic random walks on Z2 with finite variance and aperiodic random walks in Z in the standard domain of attraction of the Cauchy distribution, divided by n2(n), converges to a constant almost surely. % (b) We establish a formula for the F\"olner asymptotic of transient cocycles over an ergodic probability preserving transformation and use it to show that for transient random walk on groups which are not virtually cyclic, for almost every path, the range is not a F\"olner sequence. % (c) For aperiodic random walks in the domain of attraction of symmetric α- stable distributions with 1<α≤ 2, we prove a sharp polynomial upper bound for the decay at infinity of |∂ Rn|/|Rn|. This last result shows that the range process of these random walks is almost surely a F\"olner sequence.