English

Dual Circumference and Collinear Sets

Combinatorics 2020-09-07 v4

Abstract

We show that, if a nn-vertex triangulation TT of maximum degree Δ\Delta has a dual that contains a cycle of length \ell, then TT has a non-crossing straight-line drawing in which some \emph{collinear set} of Ω(/Δ4)\Omega(\ell/\Delta^4) 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 nn-vertex planar graph of maximum degree Δ\Delta has a collinear set of size Ω(n0.8/Δ4)\Omega(n^{0.8}/\Delta^4). Very recently, Dujmovi\'c et. al. (SODA 2019) showed that, if SS is a collinear set in a triangulation TT then, for any point set XR2X\subset\mathbb{R}^2 with X=S|X|=|S|, TT has a non-crossing straight-line drawing in which the vertices of SS are drawn on the points in XX. 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

R2 v1 2026-06-23T05:09:00.456Z