Limit theorems for random simplices in high dimensions

Abstract

Let r=r(n) be a sequence of integers such that r≤ n and let X1,…,Xr+1 be independent random points distributed according to the Gaussian, the Beta or the spherical distribution on Rn. Limit theorems for the log-volume and the volume of the random convex hull of X1,…,Xr+1 are established in high dimensions, that is, as r and n tend to infinity simultaneously. This includes, Berry-Esseen-type central limit theorems, log-normal limit theorems, moderate and large deviations. Also different types of mod-φ convergence are derived. The results heavily depend on the asymptotic growth of r relative to n. For example, we prove that the fluctuations of the volume of the simplex are normal (respectively, log-normal) if r=o(n) (respectively, r α n for some 0 < α < 1).