Sharpness characterizes Hill functions

Abstract

While long treated as empirical fits, Hill functions have been postulated to be the universal Hopfield barrier for sharpness of input-output responses by Martinez-Corral, Nam, DePace, and Gunawardena. A Hopfield barrier is a fundamental limit on how well biological systems can process information without expending energy. Their case rested on numerical findings for Hill coefficients 4 and 6. We give a precise formulation and proof of this: measuring sharpness by the supremum of the derivative in semi-log scale, any rational function r(x)=(α0+α1 x+ ·s +αn xn)/(β0 + β1 x+ ·s + βn xn) with real coefficients 0≤ αi≤ βi has sharpness at most n/4, with equality if and only if r is a Hill function with Hill coefficient n.