Processes of rth Largest
Abstract
For integers , we treat the th largest of a sample of size as an -valued stochastic process in which we denote . We show that the sequence regarded in this way satisfies the Markov property. We go on to study the asymptotic behaviour of as , 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 and itself, after norming and centering. In continuous time, an analogous process based on a two-dimensional Poisson process on is treated similarly, but we find that the continuous time problems have a distinctive additional feature: there are always infinitely many points below the th highest point up to time for any . This necessitates a different approach to the asymptotics in this case.
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}
}