Sojourns of Stationary Gaussian Processes over a Random Interval

Abstract

We investigate asymptotics of the tail distribution of sojourn time ∫0T I(X(t)> u)dt, as u∞, where X is a centered stationary Gaussian process and T is an independent of X nonnegative random variable. The heaviness of the tail distribution of T impacts the form of the asymptotics, leading to four scenarios: the case of integrable T, the case of regularly varying T with index λ=1 and index λ∈(0,1) and the case of slowly varying tail distribution of T. The derived findings are illustrated by the analysis of the class of fractional Ornstein-Uhlenbeck processes.