Extremes of multidimensional stationary Gaussian random fields

Abstract

Let \X(t):t=(t1, t2, …, td)∈[0,∞)d\ be a centered stationary Gaussian field with almost surely continuous sample paths, unit variance and correlation function r satisfying conditions r(t)<1 for every t≠ 0 and r(t)=1-Σi=1d |ti|αi + o(Σi=1d |ti|αi), as t0, with constants α1, α2, …, αd ∈(0,2]. The main result of this contribution is the description of the asymptotic behaviour of P(\X(t): t∈Jxm \≤slant u), as u∞, for some Jordan-measurable sets Jxm of volume proportional to P(\X(t):t∈[0,1]d\>u)-1(1+o(1)).