Random walk on dynamical percolation in Euclidean lattices: separating critical and supercritical regimes

Abstract

We study the random walk on dynamical percolation of Zd (resp., the two-dimensional triangular lattice T), where each edge (resp., each site) can be either open or closed, refreshing its status at rate μ∈ (0,1/e]. The random walk moves along open edges in Zd (resp., open sites in T) at rate 1. For the critical regime p=pc, we prove the following two results: on T, the mean squared displacement of the random walk from 0 to t is at most O(tμ5/132-ε) for any ε>0; on Zd with d≥ 11, the corresponding upper bound for the mean squared displacement is O(t μ1/2(1/μ)). For the supercritical regime p>pc, we prove that the mean squared displacement on Zd is at least ct for some c=c(d)>0 that does not depend on μ.

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