Faces in rectilinear drawings of complete graphs

Abstract

We initiate the study of extremal problems about faces in convex rectilinear drawings of~Kn, that is, drawings where vertices are represented by points in the plane in convex position and edges by line segments between the points representing the end-vertices. We show that if a convex rectilinear drawing of Kn does not contain a common interior point of at least three edges, then there is always a face forming a convex 5-gon while there are such drawings without any face forming a convex k-gon with k ≥ 6. A convex rectilinear drawing of Kn is regular if its vertices correspond to vertices of a regular convex n-gon. We characterize positive integers n for which regular drawings of Kn contain a face forming a convex 5-gon. To our knowledge, this type of problems has not been considered in the literature before and so we also pose several new natural open problems.