Periodic points and smooth rays

Petersen, Carsten; Zakeri, Saeed

doi:10.1090/ecgd/364

Periodic points and smooth rays
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by Carsten Lunde Petersen and Saeed Zakeri

Conform. Geom. Dyn. 25 (2021), 170-178

DOI: https://doi.org/10.1090/ecgd/364

Published electronically: October 27, 2021

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Abstract:

Let $P: \mathbb {C} \to \mathbb {C}$ be a polynomial map with disconnected filled Julia set $K_P$ and let $z_0$ be a repelling or parabolic periodic point of $P$. We show that if the connected component of $K_P$ containing $z_0$ is non-degenerate, then $z_0$ is the landing point of at least one smooth external ray. The statement is optimal in the sense that all but one cycle of rays landing at $z_0$ may be broken.

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