Iteration of the rational function z-1/z and a Hausdorff moment sequence

Abstract

In a previous paper we considered a positive function f, uniquely determined for s>0 by the requirements f(1)=1, log(1/f) is convex and the functional equation f(s)=psi(f(s+1)) with psi(s)=s-1/s. We prove that the meromorphic extension of f to the whole complex plane is given by the formula f(z)=limn∞psi n(lambdan(lambdan+1/lambdan)z), where the numbers lambdan are defined by lambda0=0 and the recursion lambdan+1=(1/2)(lambdan+sqrtlambdan2+4). The numbers mn=1/lambdan+1 form a Hausdorff moment sequence of a probability measure μ such that ∫ tz-1dμ(t)=1/f(z)