English

On Max-Stable Processes and the Functional D-Norm

Probability 2012-11-13 v3

Abstract

We introduce a functional domain of attraction approach for stochastic processes, which is more general than the usual one based on weak convergence. The distribution function G of a continuous max-stable process on [0,1] is introduced and it is shown that G can be represented via a norm on functional space, called D-norm. This is in complete accordance with the multivariate case and leads to the definition of functional generalized Pareto distributions (GPD) W. These satisfy W=1+log(G) in their upper tails, again in complete accordance with the uni- or multivariate case. Applying this framework to copula processes we derive characterizations of the domain of attraction condition for copula processes in terms of tail equivalence with a functional GPD. \delta-neighborhoods of a functional GPD are introduced and it is shown that these are characterized by a polynomial rate of convergence of functional extremes, which is well-known in the multivariate case.

Keywords

Cite

@article{arxiv.1107.5136,
  title  = {On Max-Stable Processes and the Functional D-Norm},
  author = {Stefan Aulbach and Michael Falk and Martin Hofmann},
  journal= {arXiv preprint arXiv:1107.5136},
  year   = {2012}
}

Comments

22 pages

R2 v1 2026-06-21T18:42:11.466Z