Lines, betweenness and metric spaces
Abstract
A classic theorem of Euclidean geometry asserts that any noncollinear set of points in the plane determines at least distinct lines. Chen and Chv\'atal conjectured that this holds for an arbitrary finite metric space, with a certain natural definition of lines in a metric space. We prove that in any metric space with points, either there is a line containing all the points or there are at least lines. This is the first polynomial lower bound on the number of lines in general finite metric spaces. In the more general setting of pseudometric betweenness, we prove a corresponding bound of lines. When the metric space is induced by a connected graph, we prove that either there is a line containing all the points or there are lines, improving the previous bound. We also prove that the number of lines in an -point metric space is at least , where is the number of different distances in the space, and we give an lower bound on the number of lines in metric spaces induced by graphs with constant diameter, as well as spaces where all the positive distances are from \{1, 2, 3\}.
Cite
@article{arxiv.1412.8283,
title = {Lines, betweenness and metric spaces},
author = {Pierre Aboulker and Xiaomin Chen and Guangda Huzhang and Rohan Kapadia and Cathryn Supko},
journal= {arXiv preprint arXiv:1412.8283},
year = {2014}
}
Comments
20 pages