Simultaneous ruin probability for multivariate gaussian risk model

Abstract

Let Z(t)=(Z1(t) ,…, Zd(t)) , t ∈ R where Zi(t), t∈ R, i=1,...,d are mutually independent centered Gaussian processes with continuous sample paths a.s. and stationary increments. For X(t)= A Z(t),\ t∈R, where A is a nonsingular d× d real-valued matrix, u, c∈Rd and T>0 we derive tight bounds for \[ P\∃t∈ [0,T]: i=1d \ Xi(t)- ci t > ui\\ \] and find exact asymptotics as (u1,...,ud)= (u a1,..., uad) and u∞.

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