Return probability and recurrence for the random walk driven by two-dimensional Gaussian free field

Abstract

Given any γ>0 and for η=\ηv\v∈ Z2 denoting a sample of the two-dimensional discrete Gaussian free field on Z2 pinned at the origin, we consider the random walk on~ Z2 among random conductances where the conductance of edge (u, v) is given by eγ(ηu + ηv). We show that, for almost every~η, this random walk is recurrent and that, with probability tending to~1 as T ∞, the return probability at time~2T decays as T-1+o(1). In addition, we prove a version of subdiffusive behavior by showing that the expected exit time from a ball of radius~N scales as N(γ)+o(1) with (γ)>2 for all~γ>0. Our results rely on delicate control of the effective resistance for this random network. In particular, we show that the effective resistance between two vertices at Euclidean distance~N behaves as~No(1).