About sunflowers

Abstract

Alon, Shpilka and Umans considered the following version of usual sunflower-free subset: a subset F⊂eq \1,… ,D\n for D>2 is sunflower-free if for every distinct triple x,y,z∈ F there exists a coordinate i where exactly two of xi,yi,zi are equal. Combining the polynomial method with character theory Naslund and Sawin proved that any sunflower-free set F⊂eq \1,… ,D\n has size | F|≤ cDn, where cD=322/3(D-1)2/3. In this short note we give a new upper bound for the size of sunflower-free subsets of \1,… ,D\n. Our main result is a new upper bound for the size of sunflower-free k-uniform subsets. More precisely, let k be an arbitrary integer. Let F be a sunflower-free k-uniform set system. Consider M:=|F∈ F F|. Then | F|≤ 3(2k3+1)(21/3· 3e)k( Mk -1)2k3. In the proof we use Naslund and Sawin's result about sunflower-free subsets in \1,… ,D\n.