Order-2 Delaunay Triangulations Optimize Angles
Abstract
The local angle property of the (order-) Delaunay triangulations of a generic set in asserts that the sum of two angles opposite a common edge is less than . This paper extends this property to higher order and uses it to generalize two classic properties from order- to order-: (1) among the complete level- hypertriangulations of a generic point set in , the order- Delaunay triangulation lexicographically maximizes the sorted angle vector; (2) among the maximal level- hypertriangulations of a generic point set in , the order- Delaunay triangulation is the only one that has the local angle property. We also use our method of establishing (2) to give a new short proof of the angle vector optimality for the (order-1) Delaunay triangulation. For order-, both properties have been instrumental in numerous applications of Delaunay triangulations, and we expect that their generalization will make order- Delaunay triangulations more attractive to applications as well.
Cite
@article{arxiv.2310.18238,
title = {Order-2 Delaunay Triangulations Optimize Angles},
author = {Herbert Edelsbrunner and Alexey Garber and Morteza Saghafian},
journal= {arXiv preprint arXiv:2310.18238},
year = {2024}
}
Comments
32 pages, 9 figures