On sharp isoperimetric inequalities on the hypercube

Abstract

We prove the sharp isoperimetric inequality E \,hA2(3/2) ≥ μ(A)* (2(1/μ(A)*))2(3/2) for all sets A ⊂eq \0,1\n, where μ denotes the uniform probability measure, μ(A)*=\μ(A), 1-μ(A)\, hA is supported on A and to each vertex x assigns the number of neighbour vertices in the complement of A. The inequality becomes equality for any subcube. Moreover, we provide lower bounds on E hAβ in terms of μ(A) for all β ∈ [1/2,1], improving, and in some cases tightening, previously known results. In particular, we obtain the sharp inequality EhA0.53≥ 2 μ(A)(1-μ(A)) for all sets with μ(A)≥ 1/2, which allows us to refine a recent result of Kahn and Park on isoperimetric inequalities about partitioning the hypercube. Furthermore, we derive Talagrand's isoperimetric inequalities for functions with values in a Banach space having finite cotype: for all f :\-1,1\n X, \|f\|∞≤ 1, and any p ∈ [1,2] we have \|Df\|p 1q3/2Cq(X) \|f\|22/p( e\|f\|2\|f\|1)1/q, where \| Df\|pp = E \| Σ1≤ j ≤ n x'j Dj f(x)\|p, x' is independent copy of x, and Cq(X) is the cotype q constant of X. Different proofs of the recently resolved Talagrand's conjecture will be presented.