Tail Asymptotics for the Extremes of Bivariate Gaussian Random Fields
Abstract
Let \X(t)= (X1(t),X2(t))T,\ t ∈ RN\ be an R2-valued continuous locally stationary Gaussian random field with E[X(t)]=0. For any compact sets A1, A2 ⊂ RN, precise asymptotic behavior of the excursion probability \[ P(s∈ A1 X1(s)>u,\, t∈ A2 X2(t)>u),\ \ as \ u → ∞ \] is investigated by applying the double sum method. The explicit results depend not only on the smoothness parameters of the coordinate fields X1 and X2, but also on their maximum correlation .
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