Intersections of Poisson k-flats in hyperbolic space: completing the picture

Abstract

In recent years there has been a lot of interest in the study of isometry invariant Poisson processes of k-flats in d-dimensional hyperbolic space Hd, for 0 k d-1. A phenomenon that has no counterpart in euclidean geometry arises in the investigation of the total k-dimensional volume Fr of the process inside a spherical observation window Br of radius r when one lets r tend to infinity. While Fr is asymptotically normally distributed for 2k≤ d+1, it has been shown to obey a nonstandard central limit theorem for 2k>d+1. The intersection process of order m, for d-m(d-k) ≥ 0, of the original process η consists of all intersections of distinct flats E1,…,Em ∈ η with (E1… Em) = d-m(d-k). For this intersection process, the total d-m(d-k)-dimensional volume F(m)r of the process in Br, again as r ∞, is of particular interest. For 2k ≤ d+1 it has been shown that F(m)r is again asymptotically normally distributed. For m ≥ 2, the limit is so far unknown, although it has been shown for certain d and k that it cannot be a normal distribution. We determine the limit distribution for all values of d,k,m. In addition, we establish explicit rates of convergence in the Kolmogorov distance and discuss properties of the limit distribution. Furthermore we show that the asymptotic covariance matrix of the vector (F(1)r,…,F(m)r) has full rank when 2k < d+1 and rank one when 2k ≥ d+1.

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