Note: Union-closed families with small average overlap densities


Abstract in English

In this very short note, we point out that the average overlap density of a union-closed family $mathcal{F}$ of subsets of ${1,2,ldots,n}$ may be as small as $Theta((log log |mathcal{F}|)/(log |mathcal{F}|))$, for infinitely many positive integers $n$.

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