The mean Euler characteristic and excursion probability of Gaussian random fields with stationary increments

Abstract

Let X=\X(t),t∈ RN\ be a centered Gaussian random field with stationary increments and X(0)=0. For any compact rectangle T⊂ RN and u∈ R, denote by Au=\t∈ T:X(t)≥ u\ the excursion set. Under X(·)∈ C2(RN) and certain regularity conditions, the mean Euler characteristic of Au, denoted by E\(Au)\, is derived. By applying the Rice method, it is shown that, as u∞, the excursion probability P\t∈ TX(t)≥ u\ can be approximated by E\(Au)\ such that the error is exponentially smaller than E\(Au)\. This verifies the expected Euler characteristic heuristic for a large class of Gaussian random fields with stationary increments.