Connected Dominating Sets in Triangulations
Abstract
We show that every -vertex triangulation has a connected dominating set of size at most . Equivalently, every vertex triangulation has a spanning tree with at least leaves. Prior to the current work, the best known bounds were , which follows from work of Albertson, Berman, Hutchinson, and Thomassen (J. Graph Theory \textbf{14}(2):247--258). One immediate consequence of this result is an improved bound for the SEFENOMAP graph drawing problem of Angelini, Evans, Frati, and Gudmundsson (J. Graph Theory \textbf{82}(1):45--64). As a second application, we show that for every set of points in every -vertex planar graph has a one-bend non-crossing drawing in which some set of vertices is drawn on the points of . The main result extends to -vertex triangulations of genus- surfaces, and implies that these have connected dominating sets of size at most .
Cite
@article{arxiv.2312.03399,
title = {Connected Dominating Sets in Triangulations},
author = {Prosenjit Bose and Vida Dujmović and Hussein Houdrouge and Pat Morin and Saeed Odak},
journal= {arXiv preprint arXiv:2312.03399},
year = {2024}
}
Comments
Linear-time algorithm; extension to genus-o(n) surfaces; corrections to proof of Lemma 9