Two Results on Union-Closed Families
Abstract
We show that there is some absolute constant c>0, such that for any union-closed family F ⊂eq 2[n], if |F| ≥ (12-c)2n, then there is some element i ∈ [n] that appears in at least half of the sets of F. We also show that for any union-closed family F ⊂eq 2[n], the number of sets which are not in F that cover a set in F is at most 2n-1, and provide examples where the inequality is tight.
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