Intersecting extremal constructions in Ryser's Conjecture for r-partite hypergraphs

Abstract

Ryser's Conjecture states that for any r-partite r-uniform hypergraph the vertex cover number is at most r-1 times the matching number. This conjecture is only known to be true for r≤ 3. For intersecting hypergraphs, Ryser's Conjecture reduces to saying that the edges of every r-partite intersecting hypergraph can be covered by r-1 vertices. This special case of the conjecture has only been proven for r ≤ 5. 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 r-1 times the matching number. There are very few known constructions of such graphs. For large r the only known constructions come from projective planes and exist only when r-1 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 f(r) as the minimum integer so that there exist an r-partite intersecting hypergraph H with τ(H) = r -1 and with f(r) edges. They showed that f(3) = 3, f(4) = 6, f(5) = 9, and 12≤ f(6)≤ 15. In this paper we focus on the cases when r=6 and 7. We show that f(6)=13 improving previous bounds. We also show that f(7)≤ 22, giving the first known extremal hypergraphs for the r=7 case of Ryser's Conjecture. These results have been obtained independently by Aharoni, Barat, and Wanless.