Mutual-visibility of the disjointness graph of segments in R2

Abstract

Let G=(V(G),E(G)) be a simple graph, and let U⊂eq V(G). Two distinct vertices x,y∈ U are U-mutually visible if G contains a shortest x-y path that is internally disjoint from U. U is called a mutual-visibility set of G if any two vertices of U are U-mutually visible. The mutual-visibility number μ(G) of G is the size of a largest mutual-visibility set of G. Let P be a set of n≥ 3 points in R2 in general position. The disjointness graph of segments D(P) of P is the graph whose vertices are all the closed straight line segments with endpoints in P, two of which are adjacent in D(P) if and only if they are disjoint. In this paper we establish tight lower and upper bounds for μ(D(P)), and show that almost all edge disjointness graphs have diameter 2.