English

Computational complexity aspects of super domination

Combinatorics 2023-02-20 v1

Abstract

Let GG be a graph. A dominating set DV(G)D\subseteq V(G) is a super dominating set if for every vertex xV(G)Dx\in V(G) \setminus D there exists yDy\in D such that NG(y)(V(G)D))={x}N_G(y)\cap (V(G)\setminus D)) = \{x\}. The cardinality of a smallest super dominating set of GG is the super domination number of GG. An exact formula for the super domination number of a tree TT is obtained and demonstrated that a smallest super dominating set of TT can be computed in linear time. It is proved that it is NP-complete to decide whether the super domination number of a graph GG is at most a given integer if GG is a bipartite graph of girth at least 88. The super domination number is determined for all kk-subdivisions of graphs. Interestingly, in half of the cases the exact value can be efficiently computed from the obtained formulas, while in the other cases the computation is hard. While obtaining these formulas, II-matching numbers are introduced and proved that they are computationally hard to determine.

Keywords

Cite

@article{arxiv.2302.08862,
  title  = {Computational complexity aspects of super domination},
  author = {Csilla Bujtás and Nima Ghanbari and Sandi Klavžar},
  journal= {arXiv preprint arXiv:2302.08862},
  year   = {2023}
}
R2 v1 2026-06-28T08:42:44.216Z