On the Courtade-Kumar conjecture for certain classes of Boolean functions

Abstract

We prove the Courtade-Kumar conjecture, for certain classes of n-dimensional Boolean functions, ∀ n≥ 2 and for all values of the error probability of the binary symmetric channel, ∀ 0 ≤ p ≤ 12. Let X=[X1...Xn] be a vector of independent and identically distributed Bernoulli(12) random variables, which are the input to a memoryless binary symmetric channel, with the error probability in the interval 0 ≤ p ≤ 12, and Y=[Y1...Yn] the corresponding output. Let f:\0,1\n → \0,1\ be an n-dimensional Boolean function. Then, the Courtade-Kumar conjecture states that the mutual information MI(f(X),Y) ≤ 1-H(p), where H(p) is the binary entropy function.