Distribution of sizes of erased loops for loop-erased random walks

Abstract

We study the distribution of sizes of erased loops for loop-erased random walks on regular and fractal lattices. We show that for arbitrary graphs the probability P(l) of generating a loop of perimeter l is expressible in terms of the probability Pst(l) of forming a loop of perimeter l when a bond is added to a random spanning tree on the same graph by the simple relation P(l)=Pst(l)/l. On d-dimensional hypercubical lattices, P(l) varies as l-σ for large l, where σ=1+2/z for 1<d<4, where z is the fractal dimension of the loop-erased walks on the graph. On recursively constructed fractals with d < 2 this relation is modified to σ=1+2d/(dz), where d is the hausdorff and d is the spectral dimension of the fractal.

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