Maximizing Maximal Angles for Plane Straight-Line Graphs

Abstract

Let G=(S, E) be a plane straight-line graph on a finite point set S⊂2 in general position. The incident angles of a vertex p ∈ S of G are the angles between any two edges of G that appear consecutively in the circular order of the edges incident to p. A plane straight-line graph is called φ-open if each vertex has an incident angle of size at least φ. In this paper we study the following type of question: What is the maximum angle φ such that for any finite set S⊂2 of points in general position we can find a graph from a certain class of graphs on S that is φ-open? In particular, we consider the classes of triangulations, spanning trees, and paths on S and give tight bounds in most cases.