An upper bound for union-closed family size

Abstract

Let A be a union-closed family of sets with universe A ∈ AA = [n] = \1,·s,n\ and length . We prove that |A| ≤ Σi=0 ni, with equality if and only if A = i=0[n]n-i. Additionally, by showing that |A| ≤ p-1-1+2n(1-2-)p for any nonnegative integer p, we establish for all integers 1 ≤ k ≤ n that Σi=0k ni ≤ kp-1k-1+2n(1-2-k)p, where p= (n-k)/2(k1-2-k) + 1.

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