Italian domination in generalized Petersen graphs

Abstract

In a graph G=(V,E), each vertex v∈ V is labelled with 0, 1 or 2 such that each vertex labelled with 0 is adjacent to at least one vertex labelled 2 or two vertices labelled 1. Such kind of labelling is called an Italian dominating function (IDF) of G. The weight of an IDF f is w(f)=Σv∈ Vf(v). The Italian domination number of G is γI(G)=f w(f). Gao et al. (2019) have determined the value of γI(P(n,3)). In this article, we focus on the study of the Italian domination number of generalized Petersen graphs P(n, k), k≠3. We determine the values of γI(P(n, 1)), γI(P(n, 2)) and γI(P(n, k)) for k4, k2,3(5) and n0(5). For other P(n,k), we present a bound of γI(P(n, k)). With the obtained results, we partially solve the open problem presented by Bresar et al. (2007) by giving P(n,1) is an example for which γI=γr2 and characterizing P(n,2) for which γI(P(n,2))=γr2(P(n,2)). Moreover, our results imply P(n,1) (n0(\ 4)) is Italian, P(n,1) (n0(\ 4)) and P(n,2) are not Italian.