English

Exact cube-root fluctuations in an area-constrained random walk model

Probability 2023-11-22 v1 Mathematical Physics math.MP

Abstract

This article is devoted to the study of the behaviour of a (1+1)-dimensional model of random walk conditioned to enclose an area of order N2N^2. Such a conditioning enforces a globally concave trajectory. We study the local deviations of the walk from its convex hull. To this end, we introduce two quantities -- the mean facet length MeanFL\mathsf{MeanFL} and the mean local roughness MeanLR\mathsf{MeanLR} -- measuring the typical longitudinal and transversal fluctuations around the boundary of the convex hull of the random walk. Our main result is that MeanFL\mathsf{MeanFL} is of order N2/3N^{2/3} and MeanLR\mathsf{MeanLR} is of order N1/3N^{1/3}. Moreover, following the strategy of Hammond (Ann. Prob., 2012), we identify the polylogarithmic corrections in the scaling of the maximal facet length and of the maximal local roughness, showing that the former one scales as N2/3(logN)1/3N^{2/3}(\log N)^{1/3}, while the latter scales as N1/3(logN)2/3N^{1/3}(\log N)^{2/3}. The object of study is intended to be a toy model for the interface of a two-dimensional statistical mechanics model (such as the Ising model) in the phase separation regime -- we discuss this issue at the end of this work.

Keywords

Cite

@article{arxiv.2311.12780,
  title  = {Exact cube-root fluctuations in an area-constrained random walk model},
  author = {Lucas D'Alimonte and Romain Panis},
  journal= {arXiv preprint arXiv:2311.12780},
  year   = {2023}
}

Comments

48 pages, 8 figures

R2 v1 2026-06-28T13:27:39.836Z