Extremes of independent stochastic processes: a point process approach

Abstract

For each n≥ 1, let Xin, i ≥ 1 be independent copies of a nonnegative continuous stochastic process Xn=(Xn(t))t∈ T indexed by a compact metric space T. We are interested in the process of partial maxima [ Mn(u,t) = \Xin(t), 1 ≤ i≤ [nu], u≥ 0,\ t∈ T.] where the brackets [\,·\,] denote the integer part. Under a regular variation condition on the sequence of processes Xn, we prove that the partial maxima process Mn weakly converges to a superextremal process M as n∞. We use a point process approach based on the convergence of empirical measures. Properties of the limit process are investigated: we characterize its finite-dimensional distributions, prove that it satisfies an homogeneous Markov property, and show in some cases that it is max-stable and self-similar. Convergence of further order statistics is also considered. We illustrate our results on the class of log-normal processes in connection with some recent results on the extremes of Gaussian processes established by Kabluchko.