Offensive alliances in cubic graphs
Abstract
An offensive alliance in a graph is a set of vertices where for every vertex in its boundary it holds that the majority of vertices in 's closed neighborhood are in . In the case of strong offensive alliance, strict majority is required. An alliance is called global if it affects every vertex in , that is, is a dominating set of . The global offensive alliance number (respectively, global strong offensive alliance number ) is the minimum cardinality of a global offensive (respectively, global strong offensive) alliance in . If has global independent offensive alliances, then the \emph{global independent offensive alliance number} is the minimum cardinality among all independent global offensive alliances of . 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 , where denotes the line graph of . All the above bounds are tight.
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}
}