English

High-dimensional limits arising from hyperbolic Poisson k-plane processes

Probability 2025-11-26 v1

Abstract

We consider a stationary Poisson process of kk-planes in the dd-dimensional hyperbolic space Hd\mathbb H^d of constant curvature 1-1, with d4d \ge 4 and 1kd11 \le k \le d-1. It is known that, after centring and normalization, the total kk-volume of all intersections of kk-planes with a geodesic ball of radius RR converges in distribution, as RR \to \infty, to a non-Gaussian infinitely divisible random variable Zd,kZ_{d,k} whenever 2k>d+12k > d+1. We investigate the distributional behaviour of Zd,kZ_{d,k} in the high-dimensional regime dd \to \infty and depending on how fast kk grows in relation to dd. We derive precise conditions for the variance normalized sequence to converge in law to a standard Gaussian random variable or to a degenerate law, respectively, and show that an alternative rescaling of the L\'evy measures yields an explicit non-Gaussian infinitely divisible limit for fixed codimension dkd-k and a standard Gaussian limit for dkd-k \to \infty.

Keywords

Cite

@article{arxiv.2511.20519,
  title  = {High-dimensional limits arising from hyperbolic Poisson k-plane processes},
  author = {Tillmann Bühler and Daniel Hug and Christoph Thäle},
  journal= {arXiv preprint arXiv:2511.20519},
  year   = {2025}
}
R2 v1 2026-07-01T07:54:35.534Z