A note on saturation for k-wise intersecting families
Abstract
A family F of subsets of \1,…,n\ is called k-wise intersecting if any k members of F have non-empty intersection, and it is called maximal k-wise intersecting if no family strictly containing F satisfies this condition. We show that for each k≥ 2 there is a maximal k-wise intersecting family of size O(2n/(k-1)). Up to a constant factor, this matches the best known lower bound, and answers an old question of Erdos and Kleitman, recently studied by Hendrey, Lund, Tompkins, and Tran.
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