A lemma on a finite union-closed family of finite sets and its applications
Abstract
Suppose that F is a finite union-closed family of sets with A∈ FA=\1,2,…,m\ and m≥ 2. Fix i∈ \1,2,…,m\ and denote G:=\A \i\: A∈ F\. For j∈ \1,2,…,m\\i\, let Gj:=\A∈G: j∈ A\ and Fj:=\A∈F: j∈ A\. In this note, we will prove a lemma which says that if |Gj||G|≥ c\,(c∈ (0,1]), then |Fj||F|≥ 11+2(1-c)/c. Several applications of this lemma will be given.
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