Extrema of locally stationary Gaussian fields on growing manifolds

Abstract

We consider a class of non-homogeneous, continuous, centered Gaussian random fields \Xh(t), t ∈ Mh;\,0 < h 1\ where Mh denotes a rescaled smooth manifold, i.e. Mh = 1h M, and study the limit behavior of the extreme values of these Gaussian random fields when h tends to zero, which means that the manifold is growing. Our main result can be thought of as a generalization of a classical result of Bickel and Rosenblatt (1973a), and also of results by Mikhaleva and Piterbarg (1997).