English

Dominating Sets inducing Large Components in Maximal Outerplanar Graphs

Combinatorics 2015-11-30 v1

Abstract

For a maximal outerplanar graph GG of order nn at least 33, Matheson and Tarjan showed that GG has domination number at most n/3n/3. Similarly, for a maximal outerplanar graph GG of order nn at least 55, Dorfling, Hattingh, and Jonck showed, by a completely different approach, that GG has total domination number at most 2n/52n/5 unless GG is isomorphic to one of two exceptional graphs of order 1212. We present a unified proof of a common generalization of these two results. For every positive integer kk, we specify a set Hk{\cal H}_k of graphs of order at least 4k+44k+4 and at most 4k22k4k^2-2k such that every maximal outerplanar graph GG of order nn at least 2k+12k+1 that does not belong to Hk{\cal H}_k has a dominating set DD of order at most kn2k+1\lfloor\frac{kn}{2k+1}\rfloor such that every component of the subgraph G[D]G[D] of GG induced by DD has order at least kk.

Keywords

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}
}
R2 v1 2026-06-22T11:55:39.696Z