Maximal double Roman domination in graphs

Abstract

A maximal double Roman dominating function (MDRDF) on a graph G=(V,E) is a function f:V(G)→ \0,1,2,3\ such that (i) every vertex v with f(v)=0 is adjacent to least two vertices assigned 2 or to at least one vertex assigned 3, (ii) every vertex v with f(v)=1 is adjacent to at least one vertex assigned 2 or 3 and (iii) the set \w∈ V|~f(w)=0\ is not a dominating set of G . The weight of a MDRDF is the sum of its function values over all vertices, and the maximal double Roman domination number γ dRm(G) is the minimum weight of an MDRDF on G. In this paper, we initiate the study of maximal double Roman domination. We first show that the problem of determining γ dRm(G) is NP-complete for bipartite, chordal and planar graphs. But it is solvable in linear time for bounded clique-width graphs including trees, cographs and distance-hereditary graphs. Moreover, we establish various relationships relating γ dRm(G) to some domination parameters. For the class of trees, we show that for every tree T of order n≥ 4, γ dRm(T)≤ 54n and we characterize all trees attaining the bound. Finally, the exact values of γ dRm(G) are given for paths and cycles.