Weak convergence of the intersection point process of Poisson hyperplanes

Abstract

This paper deals with the intersection point process of a stationary and isotropic Poisson hyperplane process in Rd of intensity t>0, where only hyperplanes that intersect a centred ball of radius R>0 are considered. Taking R=t-dd+1 it is shown that this point process converges in distribution, as t∞, to a Poisson point process on Rd\0\ whose intensity measure has power-law density proportional to \|x\|-(d+1) with respect to the Lebesgue measure. A bound on the speed of convergence in terms of the Kantorovich-Rubinstein distance is provided as well. In the background is a general functional Poisson approximation theorem on abstract Poisson spaces. Implications on the weak convergence of the convex hull of the intersection point process and the convergence of its f-vector are also discussed, disproving and correcting thereby a conjecture of Devroye and Toussaint [J.\ Algorithms 14.3 (1993), 381--394] in computational geometry.