Maxima of independent, non-identically distributed Gaussian vectors

Abstract

Let Xi,n,n∈ N,1≤ i≤ n, be a triangular array of independent Rd-valued Gaussian random vectors with correlation matrices i,n. We give necessary conditions under which the row-wise maxima converge to some max-stable distribution which generalizes the class of H\"usler-Reiss distributions. In the bivariate case, the conditions will also be sufficient. Using these results, new models for bivariate extremes are derived explicitly. Moreover, we define a new class of stationary, max-stable processes as max-mixtures of Brown-Resnick processes. As an application, we show that these processes realize a large set of extremal correlation functions, a natural dependence measure for max-stable processes. This set includes all functions (γ(h)),h∈ Rd, where is a completely monotone function and γ is an arbitrary variogram.