Almost isoperimetric subsets of the discrete cube

Abstract

We show that a set A ⊂ \0,1\n with edge-boundary of size at most |A| (2(2n/|A|) + ε) can be made into a subcube by at most (2 ε/2(1/ε))|A| additions and deletions, provided ε is less than an absolute constant. We deduce that if A ⊂ \0,1\n has size 2t for some t ∈ N, and cannot be made into a subcube by fewer than δ |A| additions and deletions, then its edge-boundary has size at least |A| 2(2n/|A|) + |A| δ 2(1/δ) = 2t(n-t+δ 2(1/δ)), provided δ is less than an absolute constant. This is sharp whenever δ = 1/2j for some j ∈ \1,2,…,t\.