English

A Note on Roman \{2\}-domination problem in graphs

Combinatorics 2019-02-19 v3 Optimization and Control

Abstract

For a graph G=(V,E)G=(V,E), a Roman {2}\{2\}-dominating function (R2DF)f:V{0,1,2}f:V\rightarrow \{0,1,2\} has the property that for every vertex vVv\in V with f(v)=0f(v)=0, either there exists a neighbor uN(v)u\in N(v), with f(u)=2f(u)=2, or at least two neighbors x,yN(v)x,y\in N(v) having f(x)=f(y)=1f(x)=f(y)=1. The weight of a R2DF is the sum f(V)=vVf(v)f(V)=\sum_{v\in V}{f(v)}, and the minimum weight of a R2DF is the Roman {2}\{2\}-domination number γ{R2}(G)\gamma_{\{R2\}}(G). A R2DF is independent if the set of vertices having positive function values is an independent set. The independent Roman {2}\{2\}-domination number i{R2}(G)i_{\{R2\}}(G) is the minimum weight of an independent Roman {2}\{2\}-dominating function on GG. In this paper, we show that the decision problem associated with γ{R2}(G)\gamma_{\{R2\}}(G) is NP-complete even when restricted to split graphs. We design a linear time algorithm for computing the value of i{R2}(T)i_{\{R2\}}(T) for any tree TT. This answers an open problem raised by Rahmouni and Chellali [Independent Roman {2}\{2\}-domination in graphs, Discrete Applied Mathematics 236 (2018), 408-414]. Chellali, Haynes, Hedetniemi and McRae \cite{chellali2016roman} have showed that Roman {2}\{2\}-domination number can be computed for the class of trees in linear time. As a generalization, we present a linear time algorithm for solving the Roman {2}\{2\}-domination problem in block graphs.

Keywords

Cite

@article{arxiv.1804.09338,
  title  = {A Note on Roman \{2\}-domination problem in graphs},
  author = {Hangdi Chen and Changhong Lu},
  journal= {arXiv preprint arXiv:1804.09338},
  year   = {2019}
}
R2 v1 2026-06-23T01:34:49.425Z