Intersecting extremal constructions in Ryser's Conjecture for r-partite hypergraphs
Abstract
Ryser's Conjecture states that for any -partite -uniform hypergraph the vertex cover number is at most times the matching number. This conjecture is only known to be true for . For intersecting hypergraphs, Ryser's Conjecture reduces to saying that the edges of every -partite intersecting hypergraph can be covered by vertices. This special case of the conjecture has only been proven for . It is interesting to study hypergraphs which are extremal in Ryser's Conjecture i.e, those hypergraphs for which the vertex cover number is exactly times the matching number. There are very few known constructions of such graphs. For large the only known constructions come from projective planes and exist only when is a prime power. Mansour, Song and Yuster studied how few edges a hypergraph which is extremal for Ryser's Conjecture can have. They defined as the minimum integer so that there exist an -partite intersecting hypergraph with and with edges. They showed that , , and . In this paper we focus on the cases when and 7. We show that improving previous bounds. We also show that , giving the first known extremal hypergraphs for the case of Ryser's Conjecture. These results have been obtained independently by Aharoni, Barat, and Wanless.
Cite
@article{arxiv.1409.4938,
title = {Intersecting extremal constructions in Ryser's Conjecture for r-partite hypergraphs},
author = {Ahmad Abu-Khazneh and Alexey Pokrovskiy},
journal= {arXiv preprint arXiv:1409.4938},
year = {2014}
}
Comments
20 pages, 1 table