Fluctuations of $\lambda$-geodesic Poisson hyperplanes in hyperbolic space
Abstract
Poisson processes of so-called -geodesic hyperplanes in -dimensional hyperbolic space are studied for . The case corresponds to genuine geodesic hyperplanes, the case to horospheres and to -equidistants. In the focus are the fluctuations of the centred and normalized total surface area of the union of all -geodesic hyperplanes in the Poisson process within a hyperbolic ball of radius centred at some fixed point, as . It is shown that for these random variables satisfy a quantitative central limit theorem precisely for and . The exact form of the non-Gaussian, infinitely divisible limiting distribution is determined for all higher space dimensions . The special case is in sharp contrast to this behaviour. In fact, for the total surface area of Poisson processes of horospheres, a non-standard central limit theorem with limiting variance is established for all space dimensions . We discuss the analogy between the problem studied here and the Random Energy Model whose partition function exhibits a similar structure of possible limit laws.
Cite
@article{arxiv.2205.12820,
title = {Fluctuations of $\lambda$-geodesic Poisson hyperplanes in hyperbolic space},
author = {Zakhar Kabluchko and Daniel Rosen and Christoph Thäle},
journal= {arXiv preprint arXiv:2205.12820},
year = {2024}
}
Comments
28 pages, 3 figures. Added some references, fixed some minor errors in Section 4