Extremes of Gaussian Random Fields with maximum variance attained over smooth curves

Abstract

Let X(s,t), (s,t)∈ E, with E⊂ R2 a compact set, be a centered two dimensional Gaussian random field with continuous trajectories and variance function σ(s,t). Denote by L=\(s,t): σ(s,t)=(s',t')∈ Eσ(s',t')\. In this contribution, we derive the exact asymptotics of P((s,t)∈ EX(s,t)>u), as u∞, under condition that L is a smooth curve. We illustrate our findings by an application concerned with extremes of the aggregation of two independent fractional Brownian motions.