On convex hull of Gaussian samples

Abstract

Let Xi = Xi(t), t ∈ T be i.i.d. copies of a centered Gaussian process X = X(t), t ∈ T with values in Rd defined on a separable metric space T. It is supposed that X is bounded. We consider the asymptotic behaviour of convex hulls Wn = \ X1(t), Xn(t), t ∈ T and show that with probability 1 n ∞ 12 n Wn = W (in the sense of Hausdorff distance), where the limit shape W is defined by the covariance structure of X: W = \Kt, t∈ T, Kt being the concentration ellipsoid of X(t). The asymptotic behavior of the mathematical expectations Ef(Wn), where f is an homogeneous functional is also studied.