An isoperimetric inequality for the Hamming cube and some consequences

Abstract

Our basic result, an isoperimetric inequality for Hamming cube Qn, can be written: \[ ∫ hAβ dμ 2 μ(A)(1-μ(A)). \] Here μ is uniform measure on V=\0,1\n (=V(Qn)); β=2(3/2); and, for S⊂eq V and x∈ V, \[ hS(x) = cases dV S(x) & if x ∈ S, 0 & if x S cases \] (where dT(x) is the number of neighbors of x in T). This implies inequalities involving mixtures of edge and vertex boundaries, with related stability results, and suggests some more general possibilities. One application, a stability result for the set of edges connecting two disjoint subsets of V of size roughly |V|/2, is a key step in showing that the number of maximal independent sets in Qn is (1+o(1))2n2[2n-2]. This asymptotic statement, whose proof will appear separately, was the original motivation for the present work.