Asymptotics of supremum distribution of a Gaussian process over a Weibullian time

Abstract

Let \X(t):t∈[0,∞)\ be a centered Gaussian process with stationary increments and variance function σ2X(t). We study the exact asymptotics of P(t∈[0,T]X(t)>u) as u∞, where T is an independent of \X(t)\ non-negative Weibullian random variable. As an illustration, we work out the asymptotics of the supremum distribution of fractional Laplace motion.