Reversibility of the non-backtracking random walk

Abstract

Let G be a connected graph of uniformly bounded degree. A k non-backtracking random walk (k-NBRW) (Xn)n =0∞ on G evolves according to the following rule: Given (Xn)n =0s, at time s+1 the walk picks at random some edge which is incident to Xs that was not crossed in the last k steps and moves to its other end-point. If no such edge exists then it makes a simple random walk step. Assume that for some R>0 every ball of radius R in G contains a simple cycle of length at least k. We show that under some "nice" random time change the k-NBRW becomes reversible. This is used to prove that it is recurrent iff the simple random walk is.