Lines in the plane with the $L_1$ metric

TL;DR

This paper proves that in the plane with the Manhattan ($L_1$) metric, any non-collinear set of n points determines at least half as many lines as points, improving previous bounds and extending to the $L_{ty}$ metric.

Contribution

The paper establishes a new lower bound of loor(n/2)or lines determined by non-collinear points in the plane with the $L_1$ metric, improving previous results.

Findings

At least loor(n/2)or $L_1$ metric

Extension of the bound to $L_{ty}$ metric

Improved lower bounds over previous work

Abstract

A well-known theorem in plane geometry states that any set of $n$ non-collinear points in the plane determines at least $n$ lines. Chen and Chv\'{a}tal asked whether an analogous statement holds within the framework of finite metric spaces, with lines defined using the notion of {\em betweenness}. In this paper, we prove that in the plane with the $L_1$ (also called Manhattan) metric, a non-collinear set of $n$ points induces at least $\lceil n/2\rceil$ lines. This is an improvement of the previous lower bound of $n/37$, with substantially different proof. As a consequence, we also get the same lower bound for non-collinear point sets in the plane with the $L_{\infty}$ metric.