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Excursion Probability of Certain Non-centered Smooth Gaussian Random Fields

Probability 2015-02-17 v1

Abstract

Let X={X(t):tT}X = \{X(t): t\in T \} be a non-centered, unit-variance, smooth Gaussian random field indexed on some parameter space TT, and let Au(X,T)={tT:X(t)u}A_u(X,T) = \{t\in T: X(t)\geq u\} be the excursion set of XX exceeding level uu. Under certain smoothness and regularity conditions, it is shown that, as uu\to \infty, the excursion probability P{suptTX(t)u}\mathbb{P}\{\sup_{t\in T} X(t)\ge u \} can be approximated by the expected Euler characteristic of Au(X,T)A_u(X,T), denoted by E{χ(Au(X,T))}\mathbb{E}\{\chi(A_u(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{χ(Au(X,T))}\mathbb{E}\{\chi(A_u(X,T))\} are also derived for two cases: (i) TT is a rectangle and XEXX-\mathbb{E} X is stationary; (ii) TT is an NN-dimensional sphere and XEXX-\mathbb{E} X is isotropic.

Keywords

Cite

@article{arxiv.1502.04414,
  title  = {Excursion Probability of Certain Non-centered Smooth Gaussian Random Fields},
  author = {Dan Cheng},
  journal= {arXiv preprint arXiv:1502.04414},
  year   = {2015}
}
R2 v1 2026-06-22T08:30:09.353Z