Edge-Isoperimetric Inequalities and Ball-Noise Stability: Linear Programming and Probabilistic Approaches

Abstract

Let Qnr be the graph with vertex set \-1,1\n in which two vertices are joined if their Hamming distance is at most r. The edge-isoperimetric problem for Qnr is that: For every (n,r,M) such that 1 r n and 1 M2n, determine the minimum edge-boundary size of a subset of vertices of Qnr with a given size M. In this paper, we apply two different approaches to prove bounds for this problem. The first approach is a linear programming approach and the second is a probabilistic approach. Our bound derived by the first approach generalizes the tight bound for M=2n-1 derived by Kahn, Kalai, and Linial in 1989. Moreover, our bound is also tight for M=2n-2 and rn2-1. Our bounds derived by the second approach are expressed in terms of the noise stability, and they are shown to be asymptotically tight as n∞ when r=2β n2+1 and M=α2n for fixed α,β∈(0,1), and is tight up to a factor 2 when r=2β n2 and M=α2n. In fact, the edge-isoperimetric problem is equivalent to a ball-noise stability problem which is a variant of the traditional (i.i.d.-) noise stability problem. Our results can be interpreted as bounds for the ball-noise stability problem.