On Angles in Higher Order Brillouin Tessellations and Related Tilings in the Plane

Herbert Edelsbrunner; Alexey Garber; Mohadese Ghafari; Teresa Heiss; Morteza Saghafian

doi:10.1007/s00454-023-00566-1

On Angles in Higher Order Brillouin Tessellations and Related Tilings in the Plane

Discrete Comput Geom. 2024;72(1):29-48. doi: 10.1007/s00454-023-00566-1. Epub 2023 Sep 7.

Authors

Herbert Edelsbrunner¹, Alexey Garber², Mohadese Ghafari³, Teresa Heiss¹, Morteza Saghafian¹

Affiliations

¹ IST Austria (Institute of Science and Technology Austria), Klosterneuburg, Austria.
² School of Mathematical and Statistical Sciences, University of Texas Rio Grande Valley, Brownsville, TX USA.
³ Department of Computer Engineering, Sharif University of Technology, Tehran, Iran.

Abstract

For a locally finite set in $R^{2}$ , the order-k Brillouin tessellations form an infinite sequence of convex face-to-face tilings of the plane. If the set is coarsely dense and generic, then the corresponding infinite sequences of minimum and maximum angles are both monotonic in k. As an example, a stationary Poisson point process in $R^{2}$ is locally finite, coarsely dense, and generic with probability one. For such a set, the distributions of angles in the Voronoi tessellations, Delaunay mosaics, and Brillouin tessellations are independent of the order and can be derived from the formula for angles in order-1 Delaunay mosaics given by Miles (Math. Biosci. 6, 85-127 (1970)).

Keywords: Angles; Computational experiments; Delaunay and Iglesias mosaics; Higher order; Orthogonal dual; Poisson point processes; Voronoi and Brillouin tessellations.