English

Upper paired domination versus upper domination

Combinatorics 2023-06-22 v3 Discrete Mathematics

Abstract

A paired dominating set PP is a dominating set with the additional property that PP has a perfect matching. While the maximum cardainality of a minimal dominating set in a graph GG is called the upper domination number of GG, denoted by Γ(G)\Gamma(G), the maximum cardinality of a minimal paired dominating set in GG is called the upper paired domination number of GG, denoted by Γpr(G)\Gamma_{pr}(G). By Henning and Pradhan (2019), we know that Γpr(G)2Γ(G)\Gamma_{pr}(G)\leq 2\Gamma(G) for any graph GG without isolated vertices. We focus on the graphs satisfying the equality Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G). We give characterizations for two special graph classes: bipartite and unicyclic graphs with Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G) by using the results of Ulatowski (2015). Besides, we study the graphs with Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G) and a restricted girth. In this context, we provide two characterizations: one for graphs with Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G) and girth at least 6 and the other for C3C_3-free cactus graphs with Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G). We also pose the characterization of the general case of C3C_3-free graphs with Γpr(G)=2Γ(G)\Gamma_{pr}(G)= 2\Gamma(G) as an open question.

Keywords

Cite

@article{arxiv.2104.02446,
  title  = {Upper paired domination versus upper domination},
  author = {Hadi Alizadeh and Didem Gözüpek},
  journal= {arXiv preprint arXiv:2104.02446},
  year   = {2023}
}
R2 v1 2026-06-24T00:53:03.720Z