The expected Euler characteristic approximation to excursion probabilities of smooth Gaussian random fields with general variance functions

Abstract

Consider a centered smooth Gaussian random field \X(t), t∈ T \ with a general (nonconstant) variance function. In this work, we demonstrate that as u ∞, the excursion probability P\t∈ T X(t) ≥ u\ can be accurately approximated by E\(Au)\ such that the error decays at a super-exponential rate. Here, Au = \t∈ T: X(t)≥ u\ represents the excursion set above u, and E\(Au)\ is the expectation of its Euler characteristic (Au). This result substantiates the expected Euler characteristic heuristic for a broad class of smooth Gaussian random fields with diverse covariance structures. In addition, we employ the Laplace method to derive explicit approximations to the excursion probabilities.