English

A Greedy Partition Lemma for Directed Domination

Combinatorics 2010-10-13 v1

Abstract

A directed dominating set in a directed graph DD is a set SS of vertices of VV such that every vertex uV(D)Su \in V(D) \setminus S has an adjacent vertex vv in SS with vv directed to uu. The directed domination number of DD, denoted by γ(D)\gamma(D), is the minimum cardinality of a directed dominating set in DD. The directed domination number of a graph GG, denoted Γd(G)\Gamma_d(G), which is the maximum directed domination number γ(D)\gamma(D) over all orientations DD of GG. The directed domination number of a complete graph was first studied by Erd\"{o}s [Math. Gaz. 47 (1963), 220--222], albeit in disguised form. In this paper we prove a Greedy Partition Lemma for directed domination in oriented graphs. Applying this lemma, we obtain bounds on the directed domination number. In particular, if α\alpha denotes the independence number of a graph GG, we show that αΓd(G)α(1+2ln(n/α))\alpha \le \Gamma_d(G) \le \alpha(1+2\ln(n/\alpha)).

Keywords

Cite

@article{arxiv.1010.2467,
  title  = {A Greedy Partition Lemma for Directed Domination},
  author = {Yair Caro and Michael A. Henning},
  journal= {arXiv preprint arXiv:1010.2467},
  year   = {2010}
}

Comments

12 pages

R2 v1 2026-06-21T16:27:29.600Z