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Random walk on the randomly-oriented Manhattan lattice

Published 5 Feb 2018 in math.PR, math-ph, and math.MP | (1802.01558v2)

Abstract: In the randomly-oriented Manhattan lattice, every line in $\mathbb{Z}d$ is assigned a uniform random direction. We consider the directed graph whose vertex set is $\mathbb{Z}d$ and whose edges connect nearest neighbours, but only in the direction fixed by the line orientations. Random walk on this directed graph chooses uniformly from the $d$ legal neighbours at each step. We prove that this walk is superdiffusive in two and three dimensions. The model is diffusive in four and more dimensions.

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