How to Quantize n Outputs of a Binary Symmetric Channel to n-1 Bits?

Abstract

Suppose that Yn is obtained by observing a uniform Bernoulli random vector Xn through a binary symmetric channel with crossover probability α. The "most informative Boolean function" conjecture postulates that the maximal mutual information between Yn and any Boolean function b(Xn) is attained by a dictator function. In this paper, we consider the "complementary" case in which the Boolean function is replaced by f:\0,1\n\0,1\n-1, namely, an n-1 bit quantizer, and show that I(f(Xn);Yn)≤ (n-1)·(1-h(α)) for any such f. Thus, in this case, the optimal function is of the form f(xn)=(x1,…,xn-1).