Speed of the random walk on the supercritical Gaussian Free Field percolation on regular trees

Abstract

In this paper, we study the random walk on a supercritical branching process with an uncountable and unbounded set of types supported on the d-regular tree Td (d≥ 3), namely the cluster Ch of the root in the level set of the Gaussian Free Field (GFF) above an arbitrary value h∈ (-∞, h). The value h∈ (0,∞) is the percolation threshold; in particular, Ch is infinite with positive probability. We show that on Ch conditioned to be infinite, the simple random walk is ballistic, and we give a law of large numbers and a Donsker theorem for its speed. To do so, we design a renewal construction that withstands the long-range dependencies in the structure of the tree. This allows us to translate underlying ergodic properties of Ch into regularity estimates for the random walk.