Friedgut--Kalai--Naor theorem for slices of the Boolean cube

Abstract

The Friedgut--Kalai--Naor theorem states that if a Boolean function f \0,1\n \0,1\ is close (in L2-distance) to an affine function (x1,...,xn) = c0 + Σi ci xi, then f is close to a Boolean affine function (which necessarily depends on at most one coordinate). We prove a similar theorem for functions defined over [n]k = \(x1,...,xn) ∈ \0,1\n : Σi xi = k \.