Excursion Probability of Certain Non-centered Smooth Gaussian Random Fields

Abstract

Let X = \X(t): t∈ T \ be a non-centered, unit-variance, smooth Gaussian random field indexed on some parameter space T, and let Au(X,T) = \t∈ T: X(t)≥ u\ be the excursion set of X exceeding level u. Under certain smoothness and regularity conditions, it is shown that, as u ∞, the excursion probability P\t∈ T X(t) u \ can be approximated by the expected Euler characteristic of Au(X,T), denoted by E\(Au(X,T))\, such that the error is super-exponentially small. This verifies the expected Euler characteristic heuristic for a large class of non-centered smooth Gaussian random fields and provides a much more accurate approximation compared with those existing results by the double sum method. The explicit formulae for E\(Au(X,T))\ are also derived for two cases: (i) T is a rectangle and X-E X is stationary; (ii) T is an N-dimensional sphere and X-E X is isotropic.