Roman domination and Mycieleki's structure in graphs

Abstract

For a graph G=(V,E), a function f:V→ \0,1,2\ is called Roman dominating function (RDF) if for any vertex v with f(v)=0, there is at least one vertex w in its neighborhood with f(w)=2. The weight of an RDF f of G is the value f(V)=Σv∈ Vf(v). The minimum weight of an RDF of G is its Roman domination number and denoted by γ R(G). In this paper, we first show that γR(G)+1≤ γR(μ (G))≤ γR(G)+2, where μ (G) is the Mycielekian graph of G, and then characterize the graphs achieving equality in these bounds. Then for any positive integer m, we compute the Roman domination number of the m-Mycieleskian μm(G) of a special Roman graph G in terms on γR(G). Finally we present several graphs to illustrate the discussed graphs.