English

Minimal surfaces in random environment

Mathematical Physics 2025-01-22 v2 math.MP Probability

Abstract

A minimal surface in a random environment (MSRE) is a surface which minimizes the sum of its elastic energy and its environment potential energy, subject to prescribed boundary conditions. Apart from their intrinsic interest, such surfaces are further motivated by connections with disordered spin systems and first-passage percolation models. We wish to study the geometry of dd-dimensional minimal surfaces in a (d+n)(d+n)-dimensional random environment. Specializing to a model that we term harmonic MSRE, in an ``independent'' random environment, we rigorously establish bounds on the geometric and energetic fluctuations of the minimal surface, as well as versions of the scaling relation χ=2ξ+d2\chi=2\xi+d-2 that ties together these two types of fluctuations. In particular, we prove, for all values of nn, that the surfaces are delocalized in dimensions d4d\le 4 and localized in dimensions d5d\ge 5. Moreover, the surface delocalizes with power-law fluctuations when d3d\le 3 and sub-power-law fluctuations when d=4d=4. Our localization results apply also to harmonic minimal surfaces in a periodic random environment.

Cite

@article{arxiv.2401.06768,
  title  = {Minimal surfaces in random environment},
  author = {Barbara Dembin and Dor Elboim and Daniel Hadas and Ron Peled},
  journal= {arXiv preprint arXiv:2401.06768},
  year   = {2025}
}

Comments

78 pages, 3 figures. Extended discussion section. Added an overview of proof section. Minor revisions to the proofs

R2 v1 2026-06-28T14:15:33.090Z