Complex asymptotics of Poincar\'e functions and properties of Julia sets

Abstract

The asymptotic behaviour of the solutions of Poincar\'e's functional equation f(λ z)=p(f(z)) (λ>1) for p a real polynomial of degree ≥2 is studied in angular regions of the complex plain. The constancy of an occurring periodic function is characterised in terms of geometric properties of the Julia set of p. For real Julia sets we give inequalities for multipliers of Pommerenke-Levin-Yoccoz type. The distribution of zeros of f is related to the harmonic measure on the Julia set of p.