Rays to renormalizations

Abstract

Let P be a non-linear polynomial, KP the filled Julia set of P, f a renormalization of P and Kf the filled Julia set of f. We show, loosely speaking, that there is a finite-to-one function λ from the set of P-external rays having limit points in Kf onto the set of f-external rays to Kf such that R and λ(R) share the same limit set. In particular, if a point of the Julia set Jf=∂ Kf of a renormalization is accessible from C Kf then it is accessible through an external ray of P (the inverse is obvious). Another interesting corollary is that: a component of KP Kf can meet Kf only at a single (pre-)periodic point. We study also a correspondence induced by λ on arguments of rays. These results are generalizations to all polynomials (covering notably the case of connected Julia set KP) of some results of Levin-Przytycki, Blokh-Childers-Levin-Oversteegen-Schleicher and Petersen-Zakeri where the case is considered when KP is disconnected and Kf is a periodic component of KP.