English

Convex Polygons in Cartesian Products

Computational Geometry 2021-10-05 v2 Discrete Mathematics

Abstract

We study several problems concerning convex polygons whose vertices lie in a Cartesian product of two sets of nn real numbers (for short, \emph{grid}). First, we prove that every such grid contains Ω(logn)\Omega(\log n) points in convex position and that this bound is tight up to a constant factor. We generalize this result to dd dimensions (for a fixed dNd\in \mathbb{N}), and obtain a tight lower bound of Ω(logd1n)\Omega(\log^{d-1}n) for the maximum number of points in convex position in a dd-dimensional grid. Second, we present polynomial-time algorithms for computing the longest xx- or yy-monotone convex polygonal chain in a grid that contains no two points with the same xx- or yy-coordinate. We show that the maximum size of a convex polygon with such unique coordinates can be efficiently approximated up to a factor of 22. Finally, we present exponential bounds on the maximum number of point sets in convex position in such grids, and for some restricted variants. These bounds are tight up to polynomial factors.

Keywords

Cite

@article{arxiv.1812.11332,
  title  = {Convex Polygons in Cartesian Products},
  author = {Jean-Lou De Carufel and Adrian Dumitrescu and Wouter Meulemans and Tim Ophelders and Claire Pennarun and Csaba D Tóth and Sander Verdonschot},
  journal= {arXiv preprint arXiv:1812.11332},
  year   = {2021}
}

Comments

26 pages, 10 figures, a preliminary version was presented at the 35th International Symposium on Computational Geometry (SoCG 2019)

R2 v1 2026-06-23T06:58:41.348Z