A comment on Ryser's conjecture for intersecting hypergraphs

Abstract

Let τ(H) be the cover number and (H) be the matching number of a hypergraph H. Ryser conjectured that every r-partite hypergraph H satisfies the inequality τ(H) ≤ (r-1) (H). This conjecture is open for all r 4. For intersecting hypergraphs, namely those with (H)=1, Ryser's conjecture reduces to τ(H) ≤ r-1. Even this conjecture is extremely difficult and is open for all r 6. For infinitely many r there are examples of intersecting r-partite hypergraphs with τ(H)=r-1, demonstrating the tightness of the conjecture for such r. However, all previously known constructions are not optimal as they use far too many edges. How sparse can an intersecting r-partite hypergraph be, given that its cover number is as large as possible, namely τ(H) r-1? In this paper we solve this question for r 5, give an almost optimal construction for r=6, prove that any r-partite intersecting hypergraph with τ(H) r-1 must have at least (3-118)r(1-o(1)) ≈ 2.764r(1-o(1)) edges, and conjecture that there exist constructions with (r) edges.