English

Extreme Value Statistics of Jump Processes

Statistical Mechanics 2023-09-08 v1 Probability

Abstract

We investigate extreme value statistics (EVS) of general discrete time and continuous space symmetric jump processes. We first show that for unbounded jump processes, the semi-infinite propagator G0(x,n)G_0(x,n), defined as the probability for a particle issued from 00 to be at position xx after nn steps whilst staying positive, is the key ingredient needed to derive a variety of joint distributions of extremes and times at which they are reached. Along with exact expressions, we extract novel universal asymptotic behaviors of such quantities. For bounded, semi-infinite jump processes killed upon first crossing of zero, we introduce the \textit{strip probability} μ0,x(n)\mu_{0,\underline{x}}(n), defined as the probability that a particle issued from 0 remains positive and reaches its maximum xx on its nthn^{\rm th} step exactly. We show that μ0,x(n)\mu_{0,\underline{x}}(n) is the essential building block to address EVS of semi-infinite jump processes, and obtain exact expressions and universal asymptotic behaviors of various joint distributions.

Keywords

Cite

@article{arxiv.2309.03301,
  title  = {Extreme Value Statistics of Jump Processes},
  author = {Jérémie Klinger and Raphaël Voituriez and Olivier Bénichou},
  journal= {arXiv preprint arXiv:2309.03301},
  year   = {2023}
}

Comments

5 pages + 8 pages SM

R2 v1 2026-06-28T12:14:41.695Z