Cones generated by random points on half-spheres and convex hulls of Poisson point processes

Abstract

Let U1,U2,… be random points sampled uniformly and independently from the d-dimensional upper half-sphere. We show that, as n∞, the f-vector of the (d+1)-dimensional convex cone Cn generated by U1,…,Un weakly converges to a certain limiting random vector, without any normalization. We also show convergence of all moments of the f-vector of Cn and identify the limiting constants for the expectations. We prove that the expected Grassmann angles of Cn can be expressed through the expected f-vector. This yields convergence of expected Grassmann angles and conic intrinsic volumes and answers thereby a question of B\'ar\'any, Hug, Reitzner and Schneider [Random points in halfspheres, Rand. Struct. Alg., 2017]. Our approach is based on the observation that the random cone Cn weakly converges, after a suitable rescaling, to a random cone whose intersection with the tangent hyperplane of the half-sphere at its north pole is the convex hull of the Poisson point process with power-law intensity function proportional to \|x\|-(d+γ), where γ=1. We compute the expected number of facets, the expected intrinsic volumes and the expected T-functional of this random convex hull for arbitrary γ>0.