Union-Closed vs Upward-Closed Families of Finite Sets

Abstract

A finite family F of subsets of a finite set X is union-closed whenever f,g∈F implies f g∈F. These families are well known because of Frankl's conjecture. In this paper we developed further the connection between union-closed families and upward-closed families started in Reimer (2003) using rising operators. With these techniques we are able to obtain tight lower bounds to the average of the length of the elements of F and to prove that the number of joint-irreducible elements of F can not exceed 2n n/2+n n/2+1 where |X| = n.