Domination in designs
Abstract
We commence the study of domination in the incidence graphs of combinatorial designs. Let be a combinatorial design and denote by the domination number of the incidence (Levy) graph of . We obtain a number of results about the domination numbers of various kinds of designs. For instance, a finite projective plane of order , which is a symmetric -design, has . %We also show that for any symmetric -design it holds that . We study at depth the domination numbers of Steiner systems and in particular of Steiner triple systems. We show that a has and also obtain a number of upper bounds. The tantalizing conjecture that all Steiner triple systems on vertices have the same domination number is proposed and is verified up to . The structure of minimal dominating sets is also investigated, both for its own sake and as a tool in deriving lower bounds on . Finally, a number of open questions are proposed.
Cite
@article{arxiv.1405.3436,
title = {Domination in designs},
author = {Felix Goldberg and Deepak Rajendraprasad and Rogers Mathew},
journal= {arXiv preprint arXiv:1405.3436},
year = {2014}
}