Coloring non-crossing strings

TL;DR

This paper investigates coloring problems for families of non-crossing strings in the plane, providing bounds on the minimum number of colors needed based on how many strings touch at most at any point.

Contribution

It establishes new bounds on the chromatic number for families of non-crossing strings, specifically showing $k$-touching segments can be colored with $k+5$ colors, addressing a longstanding question.

Findings

k-touching segments can be colored with k+5 colors

Provides bounds on chromatic number based on touch complexity

Partially answers Hliněný's 1998 question

Abstract

For a family of geometric objects in the plane $\mathcal{F}=\{S_1,\ldots,S_n\}$, define $\chi(\mathcal{F})$ as the least integer $\ell$ such that the elements of $\mathcal{F}$ can be colored with $\ell$ colors, in such a way that any two intersecting objects have distinct colors. When $\mathcal{F}$ is a set of pseudo-disks that may only intersect on their boundaries, and such that any point of the plane is contained in at most $k$ pseudo-disks, it can be proven that $\chi(\mathcal{F})\le 3k/2 + o(k)$ since the problem is equivalent to cyclic coloring of plane graphs. In this paper, we study the same problem when pseudo-disks are replaced by a family $\mathcal{F}$ of pseudo-segments (a.k.a. strings) that do not cross. In other words, any two strings of $\mathcal{F}$ are only allowed to "touch" each other. Such a family is said to be $k$-touching if no point of the plane is contained in more than $k$ elements of $\mathcal{F}$. We give bounds on $\chi(\mathcal{F})$ as a function of $k$, and in particular we show that $k$-touching segments can be colored with $k+5$ colors. This partially answers a question of Hlin\v{e}n\'y (1998) on the chromatic number of contact systems of strings.