The maximum product of weights of cross-intersecting families

Abstract

Two families A and B of sets are said to be cross-t-intersecting if each set in A intersects each set in B in at least t elements. An active problem in extremal set theory is to determine the maximum product of sizes of cross-t-intersecting subfamilies of a given family. We prove a cross-t-intersection theorem for weighted subsets of a set by means of a new subfamily alteration method, and use the result to provide solutions for three natural families. For r∈[n]=\1,2,…,n\, let [n] r be the family of r-element subsets of [n], and let [n]≤ r be the family of subsets of [n] that have at most r elements. Let Fn,r,t be the family of sets in [n]≤ r that contain [t]. We show that if g:[m]≤ r→R+ and h:[n]≤ s→R+ are functions that obey certain conditions, A⊂eq[m]≤ r, B⊂eq[n]≤ s, and A and B are cross-t-intersecting, then \[ΣA∈Ag(A)ΣB∈Bh(B)≤ΣC∈Fm,r,tg(C)ΣD∈Fn,s,th(D),\] and equality holds if A=Fm,r,t and B=Fn,s,t. We prove this in a more general setting and characterise the cases of equality. We use the result to show that the maximum product of sizes of two cross-t-intersecting families A⊂eq[m] r and B⊂eq[n] s is m-t r-tn-t s-t for \m,n\≥ n0(r,s,t), where n0(r,s,t) is close to best possible. We obtain analogous results for families of integer sequences and for families of multisets. The results yield generalisations for k≥2 cross-t-intersecting families, and Erdos-Ko-Rado-type results.