November 2022 Some transcendental entire functions with irrationally indifferent fixed points
Masashi Kisaka, Hiroto Naba
Author Affiliations +
Kodai Math. J. 45(3): 369-387 (November 2022). DOI: 10.2996/kmj45304

Abstract

Let $S$ be the set of all transcendental entire functions of the form $P(z) \exp (Q(z))$, where $P$ and $Q$ are polynomials. In this paper, by using the theory of polynomial-like mappings, we construct various kinds of functions in $S$ with irrationally indifferent fixed points as follows:

(1) We construct functions in $S$ with bounded type Siegel disks centered at points other than the origin bounded by quasicircles containing critical points. This is an extension of Zakeri's result in [24] for $f \in S$.

(2) We construct functions in $S$ with Cremer points whose multipliers satisfy some Cremer's condition in [6] only for rational functions. Our method shows that this condition can be applicable even in some transcendental cases.

(3) For any integer $d \geq 2$ and some $c \in {\mathbf C} \setminus \{0\}$, we show that the function of the form $e^{2\pi i \theta}z(1 + cz)^{d-1}e^z\,(\theta \in {\mathbf R} \setminus {\mathbf Q})$ has a Siegel point at the origin if and only if $\theta$ is a Brjuno number. This is an extension of Geyer's result in [11].

(4) For the function of the form $(e^{2\pi i\theta}z+\alpha z^2)e^z \,(\theta \in {\mathbf R} \setminus {\mathbf Q}, \alpha \in {\mathbf C} \setminus \{0\})$, we show that if $\alpha$ and $\theta$ satisfy some condition, then the Siegel disk centered at the origin is bounded by a Jordan curve containing a critical point, which is not a quasicircle. Moreover, we can choose $\alpha$ and $\theta$ so that the Lebesgue measure of the Julia set is positive and can also choose them so that it is zero. This is an extension of Keen and Zhang's result in [13].

Citation

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Masashi Kisaka. Hiroto Naba. "Some transcendental entire functions with irrationally indifferent fixed points." Kodai Math. J. 45 (3) 369 - 387, November 2022. https://doi.org/10.2996/kmj45304

Information

Received: 26 May 2022; Published: November 2022
First available in Project Euclid: 1 December 2022

MathSciNet: MR4516947
zbMATH: 1503.30072
Digital Object Identifier: 10.2996/kmj45304

Subjects:
Primary: 37F10
Secondary: 30D05 , 37F31

Keywords: Cremer points , polynomial-like mappings , quasiconformal surgery , Siegel disks

Rights: Copyright © 2022 Tokyo Institute of Technology, Department of Mathematics

Vol.45 • No. 3 • November 2022
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