Dominating Sets inducing Large Components in Maximal Outerplanar Graphs
Combinatorics
2015-11-30 v1
Abstract
For a maximal outerplanar graph of order at least , Matheson and Tarjan showed that has domination number at most . Similarly, for a maximal outerplanar graph of order at least , Dorfling, Hattingh, and Jonck showed, by a completely different approach, that has total domination number at most unless is isomorphic to one of two exceptional graphs of order . We present a unified proof of a common generalization of these two results. For every positive integer , we specify a set of graphs of order at least and at most such that every maximal outerplanar graph of order at least that does not belong to has a dominating set of order at most such that every component of the subgraph of induced by has order at least .
Cite
@article{arxiv.1511.08713,
title = {Dominating Sets inducing Large Components in Maximal Outerplanar Graphs},
author = {José D. Alvarado and Simone Dantas and Dieter Rautenbach},
journal= {arXiv preprint arXiv:1511.08713},
year = {2015}
}