Template iterations of quadratic maps and hybrid Mandelbrot sets

TL;DR

This paper explores the behavior of critical orbits in non-autonomous quadratic systems guided by binary templates, defining and analyzing hybrid Mandelbrot sets with implications for complex dynamics.

Contribution

It introduces a novel framework for studying Mandelbrot sets in non-autonomous quadratic maps with binary templates, analyzing their topological properties and potential applications.

Findings

Defined the Mandelbrot set for non-autonomous quadratic maps with templates.

Analyzed the topological properties of these hybrid Mandelbrot sets.

Explored the implications of different template and parameter configurations.

Abstract

As a particular problem within the field of non-autonomous discrete systems, we consider iterations of two quadratic maps $f_{c_0}=z^2+c_0$ and $f_{c_1}=z^2+c_1$, according to a prescribed binary sequence, which we call a \emph{template}. We study the asymptotic behavior of the critical orbits, and define the Mandelbrot set in this case as the locus for which these orbits are bounded. However, unlike in the case of single maps, this concept can be understood in several ways. For a fixed template, one may consider this locus as a subset of the parameter space in $(c_0,c_1) \in \mathbb{C}^2$; for fixed quadratic parameters, one may consider the set of templates which produce a bounded critical orbit. In this paper, we consider both situations, as well as \emph{hybrid} combinations of them, we study basic topological properties of these sets and interpret them in light of potential applications.