On the Most Informative Boolean Functions of the Very Noisy Channel

Abstract

Let Xn be a uniformly distributed n-dimensional binary vector, and Yn be the result of passing Xn through a binary symmetric channel (BSC) with crossover probability α. A recent conjecture postulated by Courtade and Kumar states that for any Boolean function f:\0,1\n\0,1\, I(f(Xn);Yn) 1-H(α). Although the conjecture has been proved to be true in the dimension-free high noise regime by Samorodnitsky, here we present a calculus-based approach to show a dimension-dependent result by examining the second derivative of H(α)-H(f(Xn)|Yn) at α=1/2. Along the way, we show that the dictator function is the most informative function in the high noise regime.