English

Characterizing extremal coefficient functions and extremal correlation functions

Probability 2012-05-08 v1

Abstract

We focus on two dependency quantities of a max-stable random field XX on some space TT: the extremal coefficient function θ\theta which we define on finite sets of TT and the extremal correlation function χ(s,t)=limx\PP(XsxXtx)\chi(s,t)=\lim_{x \uparrow \infty} \PP(X_s \geq x \mid X_t \geq x). We fully characterize extremal coefficient functions θ\theta by a property called complete alternation and construct a corresponding max-stable random field. Simple properties and consequences concerning the convex geometry of extremal coefficients are derived. We study how the continuity of XX, θ\theta and χ\chi are linked to each other, and we show that extremal correlation functions χ\chi allow for convex combinations in general, and for products and pointwise limits if the resulting function is continuous. These are operations which are well-known for positive definite functions, but the latter are non-trivial for extremal correlation functions. Finally, we regard some additional implications, when the random field XX on T=RdT=\mathbb{R}^d is stationary.

Keywords

Cite

@article{arxiv.1205.1315,
  title  = {Characterizing extremal coefficient functions and extremal correlation functions},
  author = {Kirstin Strokorb and Martin Schlather},
  journal= {arXiv preprint arXiv:1205.1315},
  year   = {2012}
}

Comments

25 pages, 2 figures

R2 v1 2026-06-21T20:59:26.943Z