Phase transition for recurrence of stationary random walks on lamplighter groups

Abstract

We introduce and study a class of random walks on lamplighter groups H G, where H is a nontrivial finitely generated group and G is an infinite finitely generated group, called stationary random walks. At each step, the walk switches the lamp at its current position, moves in the base group with a drift towards the identity, and switches the lamp again at the new position. We show that when G is virtually-Z and H is finite, these walks exhibit a phase transition between recurrence and transience, while when~G is not virtually-Z or H is infinite, they are always transient. In the case G=Z, we determine the exact critical parameter and provide a quantitative description of this phase transition.

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