Improvement on the Erdos-Kleitman conjecture via the KKL theorem

Abstract

In 1974, Erdos and Kleitman conjectured that if a family F⊂eq 2[n] contains no matching of size \(s\) and is maximal with respect to this property, then |F| (1-2-(s-1))· 2n. For decades, the best general lower bound remained the trivial 2n-1. About a decade ago, Frankl and Tokushige emphasized that obtaining a bound of the form (12+)· 2n for some >0 is a challenging problem. A breakthrough of Bucic, Letzter, Sudakov and Tran in 2018 showed that |F| (1-1s)· 2n via two very elegant and quite different approaches. Our main result shows that |F| ( 1 - 1s + (s-2) n25n )· 2n by exploiting a connection to the cornerstone result of Kahn, Kalai and Linial on influences of Boolean functions. Independently, we can also obtain a weaker improvement combining the linear algebra method with a combinatorial twist.

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