Return Probability and Recurrence for the Random Walk Driven by Two-Dimensional Gaussian Free Field

Given any γ > 0 and for η = { η v } v ∈ Z 2 denoting a sample of the two-dimensional discrete Gaussian free field on Z 2 pinned at the origin, we consider the random walk on  Z 2 among random conductances where the conductance of edge ( u ,  v ) is given by e γ ( η u + η v ) . We show that, for a...

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Bibliographic Details
Published in:Communications in mathematical physics 2020, Vol.373 (1), p.45-106
Main Authors: Biskup, Marek, Ding, Jian, Goswami, Subhajit
Format: Article
Language:English
Subjects:
Apexes
Classical and Quantum Gravitation
Complex Systems
Economic models
Euclidean geometry
Mathematical and Computational Physics
Mathematical Physics
Physics
Physics and Astronomy
Quantum Physics
Random walk
Random walk theory
Relativity Theory
Resistance
Theoretical
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Summary:Given any γ > 0 and for η = { η v } v ∈ Z 2 denoting a sample of the two-dimensional discrete Gaussian free field on Z 2 pinned at the origin, we consider the random walk on  Z 2 among random conductances where the conductance of edge ( u ,  v ) is given by e γ ( η u + η v ) . We show that, for almost every  η , this random walk is recurrent and that, with probability tending to 1 as T → ∞ , the return probability at time 2 T decays as T - 1 + o ( 1 ) . In addition, we prove a version of subdiffusive behavior by showing that the expected exit time from a ball of radius  N scales as N ψ ( γ ) + o ( 1 ) with ψ ( γ ) > 2 for all  γ > 0 . Our results rely on delicate control of the effective resistance for this random network. In particular, we show that the effective resistance between two vertices at Euclidean distance  N behaves as  N o ( 1 ) .
ISSN:0010-3616
1432-0916
DOI:10.1007/s00220-019-03589-z