English

Processes of rth Largest

Probability 2016-08-01 v1

Abstract

For integers nrn\geq r, we treat the rrth largest of a sample of size nn as an R\mathbb{R}^\infty-valued stochastic process in rr which we denote M(r)\mathbf{M}^{(r)}. We show that the sequence regarded in this way satisfies the Markov property. We go on to study the asymptotic behaviour of M(r)\mathbf{M}^{(r)} as rr\to\infty, and, borrowing from classical extreme value theory, show that left-tail domain of attraction conditions on the underlying distribution of the sample guarantee weak limits for both the range of M(r)\mathbf{M}^{(r)} and M(r)\mathbf{M}^{(r)} itself, after norming and centering. In continuous time, an analogous process Y(r)r\mathbf{Y}^{(r)}r based on a two-dimensional Poisson process on R+×R\mathbb{R}_+\times \mathbb{R} is treated similarly, but we find that the continuous time problems have a distinctive additional feature: there are always infinitely many points below the rrth highest point up to time tt for any t>0t>0. This necessitates a different approach to the asymptotics in this case.

Keywords

Cite

@article{arxiv.1607.08674,
  title  = {Processes of rth Largest},
  author = {Boris Buchmann and Ross Maller and Sidney Resnick},
  journal= {arXiv preprint arXiv:1607.08674},
  year   = {2016}
}
R2 v1 2026-06-22T15:07:22.363Z