On sizes of 1-cross intersecting set pair systems

Abstract

Let \(Ai,Bi)\i=1m be a set pair system. F\"uredi, Gy\'arf\'as and Kir\'aly called it 1-cross intersecting if |Ai Bj| is 1 when i≠ j and 0 if i=j. They studied such systems and their generalizations, and in particular considered m(a,b,1) -- the maximum size of a 1-cross intersecting set pair system in which |Ai|≤ a and |Bi|≤ b for all i. F\"uredi, Gy\'arf\'as and Kir\'aly proved that m(n,n,1)≥ 5(n-1)/2 and asked whether there are upper bounds on m(n,n,1) significantly better than the classical bound 2n n of Bollob\' as for cross intersecting set pair systems. Answering one of their questions, Holzman recently proved that if a,b≥ 2, then m(a,b,1)≤ 2930a+ba. He also conjectured that the factor 2930 in his bound can be replaced by 56. The goal of this paper is to prove this bound.