Iterated Entropy Derivatives and Binary Entropy Inequalities

Abstract

We embark on a systematic study of the (k+1)-th derivative of xk-rH(xr), where H(x):=-x x-(1-x)(1-x) is the binary entropy and k>r≥ 1 are integers. Our motivation is the conjectural entropy inequality αk H(xk)≥ xk-1H(x), where 0<αk<1 is given by a functional equation. The k=2 case was the key technical tool driving recent breakthroughs on the union-closed sets conjecture. We express dk+1dxk+1xk-rH(xr) as a rational function, an infinite series, and a sum over generalized Stirling numbers. This allows us to reduce the proof of the entropy inequality for real k to showing that an associated polynomial has only two real roots in the interval (0,1), which also allows us to prove the inequality for fractional exponents such as k=3/2. The proof suggests a new framework for proving tight inequalities for the sum of polynomials times the logarithms of polynomials, which converts the inequality into a statement about the real roots of a simpler associated polynomial.

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