Sojourn times of Gaussian processes with trend

Abstract

We derive exact tail asymptotics of sojourn time above the level u≥ 0 P(v(u)∫0T I(X(t)-ct>u)d t>x), x≥ 0 as u∞, where X is a Gaussian process with continuous sample paths, c>0, v(u) is a positive function of u and T∈ (0,∞]. Additionally, we analyze asymptotic distributional properties of τu(x):=∈f\t≥ 0: v(u) ∫0t I(X(s)-cs>u)d s>x\, as u∞, x≥ 0, where ∈f=∞. The findings of this contribution are illustrated by a detailed analysis of a class of Gaussian processes with stationary increments and a family of self-similar processes.