Algorithmic aspects of disjunctive domination in graphs
Abstract
For a graph , a set is called a \emph{disjunctive dominating set} of if for every vertex , is either adjacent to a vertex of or has at least two vertices in at distance from it. The cardinality of a minimum disjunctive dominating set of is called the \emph{disjunctive domination number} of graph , and is denoted by . The \textsc{Minimum Disjunctive Domination Problem} (MDDP) is to find a disjunctive dominating set of cardinality . Given a positive integer and a graph , the \textsc{Disjunctive Domination Decision Problem} (DDDP) is to decide whether has a disjunctive dominating set of cardinality at most . In this article, we first propose a linear time algorithm for MDDP in proper interval graphs. Next we tighten the NP-completeness of DDDP by showing that it remains NP-complete even in chordal graphs. We also propose a -approximation algorithm for MDDP in general graphs and prove that MDDP can not be approximated within for any unless NP DTIME. Finally, we show that MDDP is APX-complete for bipartite graphs with maximum degree .
Keywords
Cite
@article{arxiv.1502.07718,
title = {Algorithmic aspects of disjunctive domination in graphs},
author = {B. S. Panda and Arti Pandey and S. Paul},
journal= {arXiv preprint arXiv:1502.07718},
year = {2015}
}