An improved bound on q norms of noisy functions

Abstract

Let Tε, 0 ε 1/2, be the noise operator acting on functions on the boolean cube \0,1\n. Let f be a nonnegative function on \0,1\n and let q 1. In arXiv:1809.09696 the q norm of Tε f was upperbounded by the average q norm of conditional expectations of f, given sets whose elements are chosen at random with probability λ, depending on q and on ε. In this note we prove this inequality for integer q 2 with a better (smaller) parameter λ. The new inequality is tight for characteristic functions of subcubes. As an application, following arXiv:2008.07236, we show that a Reed-Muller code C of rate R decodes errors on BSC(p) with high probability if \[ R ~<~ 1 - 2(1 + 4p(1-p)). \] This is a (minor) improvement on the estimate in arXiv:2008.07236.