Excursion Probabilities of Isotropic and Locally Isotropic Gaussian Random Fields on Manifolds

Abstract

Let X= \X(p), p∈ M\ be a centered Gaussian random field, where M is a smooth Riemannian manifold. For a suitable compact subset D⊂ M, we obtain the approximations to excursion probability P\p∈ D X(p) u \, as u ∞, for two cases: (i) X is smooth and isotropic; (ii) X is non-smooth and locally isotropic. For case (i), the expected Euler characteristic approximation is formulated explicitly; while for case (ii), it is shown that the asymptotics is similar to Pickands' approximation on Euclidean space which involves Pickands' constant and the volume of D. These extend the results in Cheng:2014 from sphere to general Riemannian manifolds.