Effective resistances for supercritical percolation clusters in boxes

Abstract

Let Cn be the largest open cluster for supercritical Bernoulli bond percolation in [-n, n]d Zd with d 2. We obtain a sharp estimate for the effective resistance on Cn. As an application we show that the cover time for the simple random walk on Cn is comparable to nd ( n)2. Noting that the cover time for the simple random walk on [-n, n]d Zd is of order nd n for d 3 (and of order n2 ( n)2 for d = 2), this gives a quantitative difference between the two random walks for d 3.