# Rational maps with Fatou components of arbitrarily large connectivity

**Authors:** Jordi Canela

arXiv: 1704.00544 · 2017-04-04

## TL;DR

This paper investigates how the connectivity of Fatou components in a family of rational maps varies with parameters, demonstrating the existence of maps with Fatou components of arbitrarily large finite connectivity.

## Contribution

It proves the existence of rational maps with Fatou components of arbitrarily large finite connectivity, expanding understanding of dynamical plane structures.

## Key findings

- All critical point configurations occur in parameter space
- Existence of maps with arbitrarily large finite connectivity Fatou components
- Analysis of how connectivity varies with parameters

## Abstract

We study the family of singular perturbations of Blaschke products $B_{a,\lambda}(z)=z^3\frac{z-a}{1-\overline{a}z}+\frac{\lambda}{z^2}$. We analyse how the connectivity of the Fatou components varies as we move continuously the parameter $\lambda$. We prove that all possible escaping configurations of the critical point $c_-(a,\lambda)$ take place within the parameter space. In particular, we prove that there are maps $B_{a,\lambda}$ which have Fatou components of arbitrarily large finite connectivity within their dynamical planes.

## Full text

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## Figures

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## References

20 references — full list in the complete paper: https://tomesphere.com/paper/1704.00544/full.md

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Source: https://tomesphere.com/paper/1704.00544