Entropy lower bounds and sum-product phenomena

Abstract

Various lower bounds are established for the entropy of sums, products and their combinations. First, we derive a prime-field analogue of a version of the entropy power inequality established by Tao over torsion-free groups. Next, we prove an entropy sum-product statement: For independent and identically distributed random variables X,X', the maximum of H(X+X') and H(XX') is bounded below by a linear combination of the entropy and the min-entropy (R\'enyi entropy of order~∞) of X. This result, obtained by bounding entropies of the form H( X(Y+Z)) from above and below, is valid over arbitrary fields F. Over F= R, a slightly stronger inequality is derived. Finally, a weak version of a purely Shannon-entropic sum-product result is developed: If the entropic additive doubling of a random variable X over an arbitrary field is O(1), then its multiplicative doubling is at least proportional to H(X).