Asymptotic Improvement of the Sunflower Bound

TL;DR

This paper proves that the classical sunflower bound can be asymptotically improved by an exponential factor, reducing the number of sets needed to guarantee a sunflower of size k, advancing understanding of the sunflower conjecture.

Contribution

It establishes a new exponential reduction factor for the sunflower bound, moving closer to resolving the longstanding sunflower conjecture.

Findings

The sunflower bound can be reduced by a factor of approximately (1/ log s)^s.

For k ≥ s^ε, the bound is improved to include a (1/ log s)^s factor.

Any family of size at least (√10-2)^2 (k/(√10-2))^s s! contains a sunflower of size k.

Abstract

A sunflower with a core $Y$ is a family ${\cal B}$ of sets such that $U \cap U' = Y$ for each two different elements $U$ and $U'$ in ${\cal B}$. The well-known sunflower lemma states that a given family ${\cal F}$ of sets, each of cardinality at most $s$, includes a sunflower of cardinality $k$ if $|{\cal F}|> (k-1)^s s!$. Since Erd\"os and Rado proved it in 1960, it has not been known for more than half a century whether the sunflower bound $(k-1)^s s!$ can be improved asymptotically for any $k$ and $s$. It is conjectured that it can be reduced to $c_k^s$ for some real number $c_k>0$ depending only on $k$, which is called the sunflower conjecture. This paper shows that the general sunflower bound can be indeed reduced by an exponential factor: We prove that ${\cal F}$ includes a sunflower of cardinality $k$ if \[ |{\cal F|} \ge \left( \sqrt{10} -2 \right)^2 \left[ k \cdot \min \left( \frac{1}{\sqrt{10}-2}, \frac{c}{\log \min(k, s)} \right) \right]^s s!, \] for a constant $c>0$, and any $k \ge 2$ and $s \ge 2$. For instance, whenever $k \ge s^\epsilon$ for a given constant $\epsilon \in (0,1)$, the sunflower bound is reduced from $(k-1)^s s!$ to $(k-1)^s s! \cdot \left[ O \left( \frac{1}{\log s} \right) \right]^s$, achieving the reduction ratio of $\left[ O \left( \frac{1}{\log s} \right) \right]^s$. Also any ${\cal F}$ of cardinality at least $\left(\sqrt{10}-2 \right)^2 \left( \frac{k}{\sqrt{10}-2} \right)^s s!$ includes a sunflower of cardinality $k$, where $\frac{1}{\sqrt{10}-2}=0.8603796\ldots$. Our result demonstrates that the sunflower bound can be improved by a factor of less than a small constant to the power $s$, giving hope for further update.