Geometry of the Uniform Spanning Forest: Transitions in Dimensions 4, 8, 12

Abstract

The uniform spanning forest (USF) in Zd is the weak limit of random, uniformly chosen, spanning trees in [-n,n]d. Pemantle proved that the USF consists a.s. of a single tree if and only if d <= 4. We prove that any two components of the USF in Zd are adjacent a.s. if 5 <= d <= 8, but not if d >= 9. More generally, let N(x,y) be the minimum number of edges outside the USF in a path joining x and y in Zd. Then a.s. maxN(x,y) : x,y in Zd is the integer part of (d-1)/4. The notion of stochastic dimension for random relations in the lattice is introduced and used in the proof.

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