A linear-time algorithm for semitotal domination in strongly chordal graphs
Abstract
In a graph with no isolated vertex, a dominating set , is called a semitotal dominating set if for every vertex there is another vertex , such that distance between and is at most two in . Given a graph without isolated vertices, the Minimum Semitotal Domination problem is to find a minimum cardinality semitotal dominating set of . The semitotal domination number, denoted by , is the minimum cardinality of a semitotal dominating set of . The decision version of the problem remains NP-complete even when restricted to chordal graphs, chordal bipartite graphs, and planar graphs. Galby et al. in [6] proved that the problem can be solved in polynomial time for bounded MIM-width graphs which includes many well known graph classes, but left the complexity of the problem in strongly chordal graphs unresolved. Henning and Pandey in [20] also asked to resolve the complexity status of the problem in strongly chordal graphs. In this paper, we resolve the complexity of the problem in strongly chordal graphs by designing a linear-time algorithm for the problem.
Cite
@article{arxiv.2109.02142,
title = {A linear-time algorithm for semitotal domination in strongly chordal graphs},
author = {Vikash Tripathi and Arti Pandey and Anil Maheshwari},
journal= {arXiv preprint arXiv:2109.02142},
year = {2021}
}