More on the convergence of Gaussian convex hulls

Abstract

A "law of large numbers" for consecutive convex hulls for weakly dependent Gaussian sequences \Xn\, having the same marginal distribution, is extended to the case when the sequence \Xn\ has a weak limit. Let B be a separable Banach space with a conjugate space B. Let \Xn\ be a centered B-valued Gaussian sequence satisfying two conditions: 1) Xn ⇒ X\;\; and 2) For every x* ∈ B n,m, |n-m|→ ∞E Xn, x* Xm, x*\;\; = \;\;0. Then with probability 1 the normalized convex hulls Wn = 1(2 n)1/2\, conv \\,X1,…,Xn\,\ converge in Hausdorff distance to the concentration ellipsoid of a limit Gaussian B-valued random element X. In addition, some related questions are discussed.