Thick points for intersections of planar sample paths

Abstract

Let LnX(x) denote the number of visits to x ∈ Z2 of the simple planar random walk X, up till step n. Let X' be another simple planar random walk independent of X. We show that for any 0<b<1/(2 π), there are n1-2π b+o(1) points x ∈ Z2 for which LnX(x)LnX'(x)≥ b2 ( n)4. This is the discrete counterpart of our main result, that for any a<1, the Hausdorff dimension of the set of thick intersection points x for which r 0 I(x,r)/(r2| r|4)=a2, is almost surely 2-2a. Here I(x,r) is the projected intersection local time measure of the disc of radius r centered at x for two independent planar Brownian motions run till time 1. The proofs rely on a `multi-scale refinement' of the second moment method. In addition, we also consider analogous problems where we replace one of the Brownian motions by a transient stable process, or replace the disc of radius r centered at x by x+rK for general sets K.

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