On defensive alliances and line graphs
Abstract
Let be a simple graph of size m and degree sequence δ1 δ2 ... δn. Let L() denotes the line graph of . The aim of this paper is to study mathematical properties of the alliance number, a( L(), and the global alliance number, γa( L()), of the line graph of a simple graph. We show that δn+δn-1-12 a( L()) δ1. In particular, if is a δ-regular graph (δ>0), then a( L())=δ, and if is a (δ1,δ2)-semiregular bipartite graph, then a( L())= δ1+δ2-12 . As a consequence of the study we compare a( L()) and a(), and we characterize the graphs having a( L())<4. Moreover, we show that the global-connected alliance number of L() is bounded by γca( L()) D()+m-1-1, where D() denotes the diameter of , and we show that the global alliance number of L() is bounded by γa( L())≥ 2mδ1+δ2+1. The case of strong alliances is studied by analogy.
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