Noise Stability and Correlation with Half Spaces

Abstract

Benjamini, Kalai and Schramm showed that a monotone function f : \-1,1\n \-1,1\ is noise stable if and only if it is correlated with a half-space (a set of the form \x: x, a b\). We study noise stability in terms of correlation with half-spaces for general (not necessarily monotone) functions. We show that a function f: \-1, 1\n \-1, 1\ is noise stable if and only if it becomes correlated with a half-space when we modify f by randomly restricting a constant fraction of its coordinates. Looking at random restrictions is necessary: we construct noise stable functions whose correlation with any half-space is o(1). The examples further satisfy that different restrictions are correlated with different half-spaces: for any fixed half-space, the probability that a random restriction is correlated with it goes to zero. We also provide quantitative versions of the above statements, and versions that apply for the Gaussian measure on Rn instead of the discrete cube. Our work is motivated by questions in learning theory and a recent question of Khot and Moshkovitz.