Four dimensional loop-erased random walk
Abstract
The loop-erased random walk (LERW) in Z4 is the process obtained by erasing loops chronologically for simple random walk. We prove that the escape probability of the LERW renormalized by ( n)13 converges almost surely and in Lp for all p>0. Along the way, we extend previous results by the first author building on slowly recurrent sets. We provide two applications for the escape probability. We construct the two-sided LERW, and we construct a 1 spin model coupled with the wired spanning forests on Z4 with the bi-Laplacian Gaussian field on R4 as its scaling limit.
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