Quantitative estimates of discrete harmonic measures

Abstract

A theorem of Bourgain states that the harmonic measure for a domain in d is supported on a set of Hausdorff dimension strictly less than d Bourgain. We apply Bourgain's method to the discrete case, i.e., to the distribution of the first entrance point of a random walk into a subset of d, d≥ 2. By refining the argument, we prove that for all >0 there exists (d,)<d and N(d,), such that for any n>N(d,), any x ∈ d, and any A⊂ \1,..., n\d | \y∈d A,x(y) ≥ n- \| ≤ n(d,), where A,x (y) denotes the probability that y is the first entrance point of the simple random walk starting at x into A. Furthermore, must converge to d as ∞.

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