English

Improved Bounds for Guarding Plane Graphs with Edges

Computational Geometry 2018-04-20 v1

Abstract

An "edge guard set" of a plane graph GG is a subset Γ\Gamma of edges of GG such that each face of GG is incident to an endpoint of an edge in Γ\Gamma. Such a set is said to guard GG. We improve the known upper bounds on the number of edges required to guard any nn-vertex embedded planar graph GG: 1- We present a simple inductive proof for a theorem of Everett and Rivera-Campo (1997) that GG can be guarded with at most 2n5 \frac{2n}{5} edges, then extend this approach with a deeper analysis to yield an improved bound of 3n8\frac{3n}{8} edges for any plane graph. 2- We prove that there exists an edge guard set of GG with at most n3+α9\frac{n}{3}+\frac{\alpha}{9} edges, where α\alpha is the number of quadrilateral faces in GG. This improves the previous bound of n3+α\frac{n}{3} + \alpha by Bose, Kirkpatrick, and Li (2003). Moreover, if there is no short path between any two quadrilateral faces in GG, we show that n3\frac{n}{3} edges suffice, removing the dependence on α\alpha.

Keywords

Cite

@article{arxiv.1804.07150,
  title  = {Improved Bounds for Guarding Plane Graphs with Edges},
  author = {Ahmad Biniaz and Prosenjit Bose and Aurélien Ooms and Sander Verdonschot},
  journal= {arXiv preprint arXiv:1804.07150},
  year   = {2018}
}

Comments

12 pages, to appear in SWAT 2018

R2 v1 2026-06-23T01:28:42.352Z