A complete solution of the Erdos-Kleitman matching problem for n 3s

Abstract

Given integers n s 2, let e(n,s) stand for the maximum size of a family of subsets of an n-element set that contains no s pairwise disjoint members. The study of this quantity goes back to the 1960s, when Kleitman determined e(sm-1,s) and e(sm,s) for all integer m,s 1. The question of determining e(n,s) is closely connected to its uniform counterpart, the subject of the famous Erdos Matching Conjecture. The problem of determining e(n,s) has proven to be very hard and, in spite of some progress during these years, even a general conjecture concerning the value of e(n,s) is missing. In this paper, we completely solve the problem for n 3s. In this regime, the average size of a set in an s-matching is at most 3, and it is a delicate interplay between the `missing' 2- and 3-element sets that plays a key role here. Four types of extremal families appear in the characterization. Our result sheds light on how the extremal function e(n,s) may behave in general.

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