On the asymptotic of convex hulls of Gaussian fields

Abstract

We consider a Gaussian field X = \Xt, t ∈ T\ with values in a Banach space B defined on a parametric set T equal to Rm or Zm. It is supposed that the distribution P of Xt is independent of t. We consider the asymptotic behavior of closed convex hulls Wn = \Xt, t ∈ Tn\ where (Tn) is an increasing sequence of subsets of T and we show that under some conditions of the weak dependence with probability 1 n→ ∞ 1bn\,Wn = E (in the sense of Hausdorff distance), where the limit shape E is the concentration ellipsoid of P. The asymptotic behavior of the mathematical expectations Ef(Wn), where f is an homogeneous function is also studied.