Dual Circumference and Collinear Sets
Abstract
We show that, if a -vertex triangulation of maximum degree has a dual that contains a cycle of length , then has a non-crossing straight-line drawing in which some \emph{collinear set} of vertices lie on a line. Using the current lower bounds on the length of longest cycles in 3-regular 3-connected graphs, this implies that every -vertex planar graph of maximum degree has a collinear set of size . Very recently, Dujmovi\'c et. al. (SODA 2019) showed that, if is a collinear set in a triangulation then, for any point set with , has a non-crossing straight-line drawing in which the vertices of are drawn on the points in . Because of this, collinear sets have numerous applications in graph drawing and related areas.
Keywords
Cite
@article{arxiv.1811.03427,
title = {Dual Circumference and Collinear Sets},
author = {Vida Dujmović and Pat Morin},
journal= {arXiv preprint arXiv:1811.03427},
year = {2020}
}
Comments
Expanded presentation of some proofs