A solution to Frankl and Kupavskii's conjecture concerning Erdos-Kleitman matching problem

Abstract

For integers n s2, let e(n,s) be the maximum size of a family F⊂eq2[n] with no s pairwise disjoint members. The study of determining e(n,s) is closely related to its uniform counterpart, the well-known Erdos matching conjecture. Frankl and Kupavskii conjectured an exact formula for e((m+1)s-,s) when 1 s/2. We prove that for every fixed m3 and sufficiently large s, the extremal families for e((m+1)s-,s) are P(m,s,;L)\A⊂eq [n] |A|+|A L| m+1\ for some L with |L|=-1 when 1 (m+12m+1-o(1))s. In particular, this confirms the Frankl--Kupavskii conjecture for every fixed m3 and all sufficiently large s. For m=3, we determine the whole range of for which P(3,s,;L) is extremal, generalizing a theorem of Kupavskii and Sokolov.