On a Family of Rational Perturbations of the Doubling Map

TL;DR

This paper explores the parameter space of a family of rational maps, specifically Blaschke products, analyzing Julia set connectivity, hyperbolic components, and their relation to degree 4 polynomials using quasiconformal surgery.

Contribution

It provides a detailed classification of hyperbolic components and connects the family to degree 4 polynomials, advancing understanding of their dynamical properties.

Findings

Connectivity of Julia sets varies with parameter a

Classification of hyperbolic components by critical orbits

Parametrization of disjoint type hyperbolic components

Abstract

The goal of this paper is to investigate the parameter plane of a rational family of perturbations of the doubling map given by the Blaschke products $B_a(z)=z^3\frac{z-a}{1-\bar{a}z}$. First we study the basic properties of these maps such as the connectivity of the Julia set as a function of the parameter $a$. We use techniques of quasiconformal surgery to explore the relation between certain members of the family and the degree 4 polynomials $\left(\overline{\overline{z}^2+c}\right)^2+c$. In parameter space, we classify the different hyperbolic components according to the critical orbits and we show how to parametrize those of disjoint type.