English

Limit theorems for random simplices in high dimensions

Probability 2017-08-03 v1 Metric Geometry

Abstract

Let r=r(n)r=r(n) be a sequence of integers such that rnr\leq n and let X1,,Xr+1X_1,\ldots,X_{r+1} be independent random points distributed according to the Gaussian, the Beta or the spherical distribution on Rn\mathbb{R}^n. Limit theorems for the log-volume and the volume of the random convex hull of X1,,Xr+1X_1,\ldots,X_{r+1} are established in high dimensions, that is, as rr and nn 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\phi convergence are derived. The results heavily depend on the asymptotic growth of rr relative to nn. For example, we prove that the fluctuations of the volume of the simplex are normal (respectively, log-normal) if r=o(n)r=o(n) (respectively, rαnr\sim \alpha n for some 0<α<10 < \alpha < 1).

Keywords

Cite

@article{arxiv.1708.00471,
  title  = {Limit theorems for random simplices in high dimensions},
  author = {Julian Grote and Zakhar Kabluchko and Christoph Thäle},
  journal= {arXiv preprint arXiv:1708.00471},
  year   = {2017}
}
R2 v1 2026-06-22T21:04:01.492Z