Random-field random surfaces

Abstract

We study how the typical gradient and typical height of a random surface are modified by the addition of quenched disorder in the form of a random independent external field. The results provide quantitative estimates, sharp up to multiplicative constants, in the following cases. It is shown that for real-valued disordered random surfaces of the ∇ φ type with a uniformly convex interaction potential: (i) The gradient of the surface delocalizes in dimensions 1 d 2 and localizes in dimensions d3. (ii) The surface delocalizes in dimensions 1 d 4 and localizes in dimensions d 5. It is further shown that for the integer-valued disordered Gaussian free field: (i) The gradient of the surface delocalizes in dimensions d=1,2 and localizes in dimensions d3. (ii) The surface delocalizes in dimensions d=1,2. (iii) The surface localizes in dimensions d 3 at weak disorder strength. The behavior in dimensions d 3 at strong disorder is left open. The proofs rely on several tools: explicit identities satisfied by the expectation of the random surface, the Efron--Stein concentration inequality, a coupling argument for Langevin dynamics (originally due to Funaki and Spohn) and the Nash--Aronson estimate.

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