Small Sets in Union-Closed Families

Abstract

Our aim in this note is to show that, for any ε>0, there exists a union-closed family F with (unique) smallest set S such that no element of S belongs to more than a fraction ε of the sets in F. More precisely, we give an example of a union-closed family with smallest set of size k such that no element of this set belongs to more than a fraction (1+o(1))2 k2k of the sets in F. We also give explicit examples of union-closed families containing `small' sets for which we have been unable to verify the Union-Closed Conjecture.