Coloring non-crossing strings

Abstract

For a family of geometric objects in the plane F=\S1,…,Sn\, define (F) as the least integer such that the elements of F can be colored with colors, in such a way that any two intersecting objects have distinct colors. When 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 (F) 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 F of pseudo-segments (a.k.a. strings) that do not cross. In other words, any two strings of 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 F. We give bounds on (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 Hlinen\'y (1998) on the chromatic number of contact systems of strings.