Spectral dimension and random walks on the two dimensional uniform spanning tree
Abstract
We study simple random walk on the uniform spanning tree on Z2 . We obtain estimates for the transition probabilities of the random walk, the distance of the walk from its starting point after n steps, and exit times of both Euclidean balls and balls in the intrinsic graph metric. In particular, we prove that the spectral dimension of the uniform spanning tree on Z2 is 16/13 almost surely.
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