Abstract
Let X(t)=(X1(t),…,Xn(t)),t∈T⊂R be a centered vector-valued Gaussian process with independent components and continuous trajectories, and h(t)=(h1(t),…,hn(t)),t∈T be a vector-valued continuous function. We investigate the asymptotics ofP{supt∈Tmin1≤i≤n(Xi(t)+hi(t))>u} as u→∞. As an illustration to the derived results we analyze two important classes of X(t): with locally-stationary structure and with varying variances of the coordinates, and calculate exact asymptotics of simultaneous ruin probability and ruin time in a Gaussian risk model.
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