Polynomial localization of the 2D-Vertex Reinforced Jump Process
Abstract: We prove polynomial decay of the mixing field of the Vertex Reinforced Jump Process (VRJP) on $\Bbb{Z}2$ with bounded conductances. Using [17] we deduce that the VRJP on $\Bbb{Z}2$ with any constant conductances is almost surely recurrent. It gives a counterpart of the result of Merkl, Rolles [14] and Sabot, Zeng [17] for the 2-dimensional Edge Reinforced Random Walk.
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