Odd-Sunflowers

Abstract

Extending the notion of sunflowers, we call a family of at least two sets an odd-sunflower if every element of the underlying set is contained in an odd number of sets or in none of them. It follows from the Erd os--Szemer\'edi conjecture, recently proved by Naslund and Sawin, that there is a constant μ<2 such that every family of subsets of an n-element set that contains no odd-sunflower consists of at most μn sets. We construct such families of size at least 1.5021n. We also characterize minimal odd-sunflowers of triples.

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