The time of ultimate recovery in Gaussian risk model

Abstract

We analyze the distance RT(u) between the first and the last passage time of \X(t)-ct:t∈ [0,T]\ at level u in time horizon T∈(0,∞], where X is a centered Gaussian process with stationary increments and c∈R, given that the first passage time occurred before T. Under some tractable assumptions on X, we find (u) and G(x) such that u∞P(RT(u)>(u)x)=G(x), for x≥ 0. We distinguish two scenarios: T<∞ and T=∞, that lead to qualitatively different asymptotics. The obtained results provide exact asymptotics of the ultimate recovery time after the ruin in Gaussian risk model.