Majority out-dominating functions in digraphs

Abstract

At least two different notions have been published under the name "majority domination in graphs": Majority dominating functions and majority dominating sets. In this work we extend the former concept to digraphs. Given a digraph D=(V,A), a function f : V → \-1,1\ such that f(N+[v])≥1 for at least half of the vertices v in V is a majority out-dominating function (MODF) of D. The weight of a MODF f is w(f)=Σv∈ Vf(v), and the minimum weight of a MODF in D is the majority out-domination number of D, denoted γ+maj(D). In this work we introduce these concepts and prove some results regarding them, among which the fact that the decision problem of finding a majority out-dominating function of a given weight is NP-complete.