Max-stable processes and stationary systems of L\'evy particles

Abstract

We study stationary max-stable processes \η(t) t∈ R\ admitting a representation of the form η(t)=i∈ N(Ui+ Yi(t)), where Σi=1∞ δUi is a Poisson point process on R with intensity e-u d u, and Y1,Y2,… are i.i.d.\ copies of a process \Y(t) t∈ R\ obtained by running a L\'evy process for positive t and a dual L\'evy process for negative t. We give a general construction of such L\'evy-Brown-Resnick processes, where the restrictions of Y to the positive and negative half-axes are L\'evy processes with random birth and killing times. We show that these max-stable processes appear as limits of suitably normalized pointwise maxima of the form Mn(t)=i=1,…,n i(sn+t), where 1,2,… are i.i.d.\ L\'evy processes and sn is a sequence such that sn c n with c>0. Also, we consider maxima of the form i=1,…,n Zi(t/ n), where Z1,Z2,… are i.i.d.\ Ornstein--Uhlenbeck processes driven by an α-stable noise with skewness parameter β=-1. After a linear normalization, we again obtain limiting max-stable processes of the above form. This gives a generalization of the results of Brown and Resnick [Extreme values of independent stochastic processes, J.\ Appl.\ Probab., 14 (1977), pp.\ 732--739] to the totally skewed α-stable case.