An isoperimetric inequality for antipodal subsets of the discrete cube

Abstract

A family of subsets of \1,2,…,n\ is said to be antipodal if it is closed under taking complements. We prove a best-possible isoperimetric inequality for antipodal families of subsets of \1,2,…,n\. Our inequality implies that for any k ∈ N, among all such families of size 2k, a family consisting of the union of a (k-1)-dimensional subcube and its antipode has the smallest possible edge boundary.