English

On defensive alliances and line graphs

Combinatorics 2007-05-23 v1

Abstract

Let Γ\Gamma be a simple graph of size mm and degree sequence δ1δ2...δn\delta_1\ge \delta_2\ge ... \ge \delta_n. Let L(Γ){\cal L}(\Gamma) denotes the line graph of Γ\Gamma. The aim of this paper is to study mathematical properties of the alliance number, a(L(Γ){a}({\cal L}(\Gamma), and the global alliance number, γa(L(Γ))\gamma_{a}({\cal L}(\Gamma)), of the line graph of a simple graph. We show that δn+δn112a(L(Γ))δ1.\lceil\frac{\delta_{n}+\delta_{n-1}-1}{2}\rceil \le {a}({\cal L}(\Gamma))\le \delta_1. In particular, if Γ\Gamma is a δ\delta-regular graph (δ>0\delta>0), then a(L(Γ))=δa({\cal L}(\Gamma))=\delta, and if Γ\Gamma is a (δ1,δ2)(\delta_1,\delta_2)-semiregular bipartite graph, then a(L(Γ))=δ1+δ212a({\cal L}(\Gamma))=\lceil \frac{\delta_1+\delta_2-1}{2} \rceil. As a consequence of the study we compare a(L(Γ))a({\cal L}(\Gamma)) and a(Γ){a}(\Gamma), and we characterize the graphs having a(L(Γ))<4a({\cal L}(\Gamma))<4. Moreover, we show that the global-connected alliance number of L(Γ){\cal L}(\Gamma) is bounded by γca(L(Γ))D(Γ)+m11,\gamma_{ca}({\cal L}(\Gamma)) \ge \lceil\sqrt{D(\Gamma)+m-1}-1\rceil, where D(Γ)D(\Gamma) denotes the diameter of Γ\Gamma, and we show that the global alliance number of L(Γ){\cal L}(\Gamma) is bounded by γa(L(Γ))2mδ1+δ2+1\gamma_{a}({\cal L}(\Gamma))\geq \lceil\frac{2m}{\delta_{1}+\delta_{2}+1}\rceil. The case of strong alliances is studied by analogy.

Keywords

Cite

@article{arxiv.math/0602434,
  title  = {On defensive alliances and line graphs},
  author = {J. M. Sigarreta and J. A. Rodriguez},
  journal= {arXiv preprint arXiv:math/0602434},
  year   = {2007}
}