On the product of cross-intersecting families with maximal covering number

Abstract

For integers k , ≥ 2 let m(k,) denote the maximum of |F| |G| where the maximum is taken over all pairs of cross-intersecting families, F being a k-graph with covering number and G a -graph with covering number k (see the paper for the definitions). Erdos and Lovasz initiated the study of the one family version. That is, they provided lower and upper bounds on the maximal size m(k)=|F| where F is an intersecting k-graph with covering number k. In many similar situations m(k,k)=m(k)2 holds. However, as our results show m(k,k)/m(k)2 is tending to infinity as k grows(Th.1.5) . For k>k0 we establish the exact value m(k,k)=(kk-1+k-1)2(Th.1.6). As to smaller values we prove m(3,3)=121 (Th.1.7) and determine m(2,k) for all k≥ 2 (Th.1.8).