Totally real algebraic numbers in generalized Mandelbrot set

Kevin G. Hare; Chatchai Noytaptim

arXiv:2405.10395·math.DS·May 20, 2024

Totally real algebraic numbers in generalized Mandelbrot set

Kevin G. Hare, Chatchai Noytaptim

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Abstract

In this article, we study some potential theoretical and topological aspects of the generalized Mandelbrot set introduced by Baker and DeMarco. For $α$ real, we study the set of all totally real algebraic parameters $c$ such that $α$ is preperiodic under the iteration of the one-parameter family $f_{c} (x) = x^{2} + c$ . We show that when $∣ α ∣ < 2$ and rational then the set of totally real algebraic parameters $c$ with this property is finite, whereas if $∣ α ∣ \geq 2$ and rational then this set is countably infinite. As an unexpected consequence of this study, we also show that when $∣ α ∣ \geq 2$ then parameters $c$ such that $α$ is $f_{c}$ -periodic are necessarily real. As a special case, we classify all totally real algebraic integers $c$ such that $α = \pm 1$ is preperiodic.

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TopicsNeural Networks and Applications · Cognitive Computing and Networks · Mathematical Dynamics and Fractals