Speed of random walk on dynamical percolation in nonamenable transitive graphs
Abstract
Let G be a nonamenable transitive unimodular graph. In dynamical percolation, every edge in G refreshes its status at rate μ>0, and following the refresh, each edge is open independently with probability p. The random walk traverses G only along open edges, moving at rate 1. In the critical regime p=pc, we prove that the speed of the random walk is at most O(μ (1/μ)), provided that μ e-1. In the supercritical regime p>pc, we prove that the speed on G is of order 1 (uniformly in μ), while in the subcritical regime p<pc, the speed is of order μ 1.
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