English

Offensive alliances in cubic graphs

Combinatorics 2014-02-04 v1

Abstract

An offensive alliance in a graph Γ=(V,E)\Gamma=(V,E) is a set of vertices SVS\subset V where for every vertex vv in its boundary it holds that the majority of vertices in vv's closed neighborhood are in SS. In the case of strong offensive alliance, strict majority is required. An alliance SS is called global if it affects every vertex in V\SV\backslash S, that is, SS is a dominating set of Γ\Gamma. The global offensive alliance number γo(Γ)\gamma_o(\Gamma) (respectively, global strong offensive alliance number γo^(Γ)\gamma_{\hat{o}}(\Gamma)) is the minimum cardinality of a global offensive (respectively, global strong offensive) alliance in Γ\Gamma. If Γ\Gamma has global independent offensive alliances, then the \emph{global independent offensive alliance number} γi(Γ)\gamma_i(\Gamma) is the minimum cardinality among all independent global offensive alliances of Γ\Gamma. In this paper we study mathematical properties of the global (strong) alliance number of cubic graphs. For instance, we show that for all connected cubic graph of order nn, 2n5γi(Γ)n2γo^(Γ)3n4γo^(L(Γ))=γo(L(Γ))n,\frac{2n}{5}\le \gamma_i(\Gamma)\le \frac{n}{2}\le \gamma_{\hat{o}}(\Gamma)\le \frac{3n}{4} \le \gamma_{\hat{o}}({\cal L}(\Gamma))=\gamma_{o}({\cal L}(\Gamma))\le n, where L(Γ){\cal L}(\Gamma) denotes the line graph of Γ\Gamma. All the above bounds are tight.

Keywords

Cite

@article{arxiv.math/0610023,
  title  = {Offensive alliances in cubic graphs},
  author = {J. A. Rodriguez and J. M. Sigarreta},
  journal= {arXiv preprint arXiv:math/0610023},
  year   = {2014}
}