English

Complexity and Algorithms for Semipaired Domination in Graphs

Discrete Mathematics 2019-04-02 v1

Abstract

For a graph G=(V,E)G=(V,E) with no isolated vertices, a set DVD\subseteq V is called a semipaired dominating set of G if (i)(i) DD is a dominating set of GG, and (ii)(ii) DD can be partitioned into two element subsets such that the vertices in each two element set are at distance at most two. The minimum cardinality of a semipaired dominating set of GG is called the semipaired domination number of GG, and is denoted by γpr2(G)\gamma_{pr2}(G). The \textsc{Minimum Semipaired Domination} problem is to find a semipaired dominating set of GG of cardinality γpr2(G)\gamma_{pr2}(G). In this paper, we initiate the algorithmic study of the \textsc{Minimum Semipaired Domination} problem. We show that the decision version of the \textsc{Minimum Semipaired Domination} problem is NP-complete for bipartite graphs and split graphs. On the positive side, we present a linear-time algorithm to compute a minimum cardinality semipaired dominating set of interval graphs and trees. We also propose a 1+ln(2Δ+2)1+\ln(2\Delta+2)-approximation algorithm for the \textsc{Minimum Semipaired Domination} problem, where Δ\Delta denote the maximum degree of the graph and show that the \textsc{Minimum Semipaired Domination} problem cannot be approximated within (1ϵ)lnV(1-\epsilon) \ln|V| for any ϵ>0\epsilon > 0 unless NP \subseteq DTIME(VO(loglogV))(|V|^{O(\log\log|V|)}).

Keywords

Cite

@article{arxiv.1904.00964,
  title  = {Complexity and Algorithms for Semipaired Domination in Graphs},
  author = {Michael A. Henning and Arti Pandey and Vikash Tripathi},
  journal= {arXiv preprint arXiv:1904.00964},
  year   = {2019}
}

Comments

arXiv admin note: text overlap with arXiv:1711.10891

R2 v1 2026-06-23T08:25:43.171Z