Restrained condition on double Roman dominating functions

Abstract

We continue the study of restrained double Roman domination in graphs. For a graph G=(V(G),E(G)), a double Roman dominating function f is called a restrained double Roman dominating function (RDRD function) if the subgraph induced by \v∈ V(G) f(v)=0\ has no isolated vertices. The restrained double Roman domination number (RDRD number) γrdR(G) is the minimum weight Σv∈ V(G)f(v) taken over all RDRD functions of G. We first prove that the problem of computing γrdR is NP-hard even for planar graphs, but it is solvable in linear time when restricted to bounded clique-width graphs such as trees, cographs and distance-hereditary graphs. Relationships between γrdR and some well-known parameters such as restrained domination number γr, domination number γ and restrained Roman domination number γrR are investigated in this paper by bounding γrdR from below and above involving γr, γ and γrR for general graphs, respectively. We prove that γrdR(T)≥ n+2 for any tree T≠ K1,n-1 of order n≥2 and characterize the family of all trees attaining the lower bound. The characterization of graphs with small RDRD numbers is given in this paper.