Loop-Erased Walks Intersect Infinitely Often in Four Dimensions
Abstract
In this short note we show that the paths two independent loop-erased random walks in four dimensions intersect infinitely often. We actually prove the stronger result that the cut-points of the two walks intersect infinitely often.
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Pages: 35-42
Publication Date: June 6, 1998
DOI: 10.1214/ECP.v3-991
References
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