Logarithmic corrections to the Alexander-Orbach conjecture for the four-dimensional uniform spanning tree
Abstract
We compute the precise logarithmic corrections to Alexander-Orbach behaviour for various quantities describing the geometric and spectral properties of the four-dimensional uniform spanning tree. In particular, we prove that the volume of an intrinsic n-ball in the tree is n2 ( n)-1/3+o(1), that the typical intrinsic displacement of an n-step random walk is n1/3 ( n)1/9-o(1), and that the n-step return probability of the walk decays as n-2/3( n)1/9-o(1).
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