English

Algorithmic Aspects of Secure Connected Domination in Graphs

Discrete Mathematics 2020-02-04 v1 Computational Complexity

Abstract

Let G=(V,E)G = (V,E) be a simple, undirected and connected graph. A connected dominating set SVS \subseteq V is a secure connected dominating set of GG, if for each uVS u \in V\setminus S, there exists vSv\in S such that (u,v)E(u,v) \in E and the set (S{v}){u}(S \setminus \{ v \}) \cup \{ u \} is a connected dominating set of GG. The minimum size of a secure connected dominating set of GG denoted by γsc(G) \gamma_{sc} (G), is called the secure connected domination number of GG. Given a graph G G and a positive integer k, k, the Secure Connected Domination (SCDM) problem is to check whether G G has a secure connected dominating set of size at most k. k. In this paper, we prove that the SCDM problem is NP-complete for doubly chordal graphs, a subclass of chordal graphs. We investigate the complexity of this problem for some subclasses of bipartite graphs namely, star convex bipartite, comb convex bipartite, chordal bipartite and chain graphs. The Minimum Secure Connected Dominating Set (MSCDS) problem is to find a secure connected dominating set of minimum size in the input graph. We propose a (Δ(G)+1) (\Delta(G)+1) - approximation algorithm for MSCDS, where Δ(G) \Delta(G) is the maximum degree of the input graph G G and prove that MSCDS cannot be approximated within (1ϵ)ln(V) (1 -\epsilon) ln(| V |) for any ϵ>0 \epsilon > 0 unless NPDTIME(VO(loglogV)) NP \subseteq DTIME(| V |^{O(log log | V |)}) even for bipartite graphs. Finally, we show that the MSCDS is APX-complete for graphs with Δ(G)=4\Delta(G)=4.

Keywords

Cite

@article{arxiv.2001.11250,
  title  = {Algorithmic Aspects of Secure Connected Domination in Graphs},
  author = {Jakkepalli Pavan Kumar and P. Venkata Subba Reddy},
  journal= {arXiv preprint arXiv:2001.11250},
  year   = {2020}
}
R2 v1 2026-06-23T13:24:56.264Z