The maximum mutual information between the output of a discrete symmetric channel and several classes of Boolean functions of its input

Abstract

We prove the Courtade-Kumar conjecture, for several classes of n-dimensional Boolean functions, for all n ≥ 2 and for all values of the error probability of the binary symmetric channel, 0 ≤ p ≤ 1/2. This conjecture states that the mutual information between any Boolean function of an n-dimensional vector of independent and identically distributed inputs to a memoryless binary symmetric channel and the corresponding vector of outputs is upper-bounded by 1-H(p), where H(p) represents the binary entropy function. That is, let X=[X1 … Xn] be a vector of independent and identically distributed Bernoulli(1/2) random variables, which are the input to a memoryless binary symmetric channel, with the error probability in the interval 0 ≤ p ≤ 1/2 and Y=[Y1 … Yn] the corresponding output. Let f:\0,1\n → \0,1\ be an n-dimensional Boolean function. Then, MI(f(X),Y) ≤ 1-H(p). Our proof employs Karamata's theorem, concepts from probability theory, transformations of random variables and vectors and algebraic manipulations.