English

The continuum disordered pinning model

Probability 2014-12-03 v2

Abstract

Any renewal processes on N\mathbb{N} with a polynomial tail, with exponent α(0,1)\alpha \in (0,1), has a non-trivial scaling limit, known as the α\alpha-stable regenerative set. In this paper we consider Gibbs transformations of such renewal processes in an i.i.d. random environment, called disordered pinning models. We show that for α(1/2,1)\alpha \in (1/2, 1) these models have a universal scaling limit, which we call the continuum disordered pinning model (CDPM). This is a random closed subset of R\mathbb{R} in a white noise random environment, with subtle features: -Any fixed a.s. property of the α\alpha-stable regenerative set (e.g., its Hausdorff dimension) is also an a.s. property of the CDPM, for almost every realization of the environment. -Nonetheless, the law of the CDPM is singular with respect to the law of the α\alpha-stable regenerative set, for almost every realization of the environment. The existence of a disordered continuum model, such as the CDPM, is a manifestation of disorder relevance for pinning models with α(1/2,1)\alpha \in (1/2, 1).

Keywords

Cite

@article{arxiv.1406.5088,
  title  = {The continuum disordered pinning model},
  author = {Francesco Caravenna and Rongfeng Sun and Nikos Zygouras},
  journal= {arXiv preprint arXiv:1406.5088},
  year   = {2014}
}

Comments

35 pages. Minor changes, explanations added. To appear in PTRF

R2 v1 2026-06-22T04:42:28.690Z