A constant lower bound for the union-closed sets conjecture
Abstract
We show that for any union-closed family F ⊂eq 2[n], F ≠ \\, there exists an i ∈ [n] which is contained in a 0.01 fraction of the sets in F. This is the first known constant lower bound, and improves upon the (2(|F|)-1) bounds of Knill and W\'ojick. Our result follows from an information theoretic strengthening of the conjecture. Specifically, we show that if A, B are independent samples from a distribution over subsets of [n] such that Pr[i ∈ A] < 0.01 for all i and H(A) > 0, then H(A B) > H(A).
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