Convex Polygons in Cartesian Products
Abstract
We study several problems concerning convex polygons whose vertices lie in a Cartesian product of two sets of real numbers (for short, \emph{grid}). First, we prove that every such grid contains points in convex position and that this bound is tight up to a constant factor. We generalize this result to dimensions (for a fixed ), and obtain a tight lower bound of for the maximum number of points in convex position in a -dimensional grid. Second, we present polynomial-time algorithms for computing the longest - or -monotone convex polygonal chain in a grid that contains no two points with the same - or -coordinate. We show that the maximum size of a convex polygon with such unique coordinates can be efficiently approximated up to a factor of . 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.
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)