English
Eremenko's conjecture, Devaney's hairs, and the growth of counterexamples
Multi angle
Auteurs : Brown, Andrew (Auteur de la Conférence)
CIRM (Editeur )
37F10 - Dynamics of complex polynomials, rational maps, entire and meromorphic functions; Fatou and Julia sets
37F15 - Expanding maps; hyperbolicity; structural stability
37F50 - Small divisors, rotation domains and linearization; Fatou and Julia sets
CIRM (Editeur )
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Résumé :
Fatou noticed in 1926 that certain transcendental entire functions have Julia sets in which there are curves of points that escape to infinity under iteration and he wondered whether this might hold for a more general class of functions. In 1989, Eremenko carried out an investigation of the escaping set of a transcendental entire function f, $I(f)=\left \{ z\in\mathbb{C}:\left | f^{n}\left ( z \right ) \right | \rightarrow \infty \right \}$ and produced a conjecture with a weak and a strong form. The strong form asks if every point in the escaping set of an arbitrary transcendental entire function can be joined to infinity by a curve in the escaping set.
This was answered in the negative by the 2011 paper of Rottenfusser, Rückert, Rempe, and Schleicher (RRRS) by constructing a tract that produces a function that cannot contain such a curve. In the same paper, it was also shown that if the function was of finite order, that is, log log $\left | f\left ( z \right ) \right |= \mathcal{O}\left ( log\left | z \right | \right )$ as $\left | z \right |\rightarrow \infty$, then every point in the escaping set can indeed be connected to infinity by a curve in the escaping set.
The counterexample $f$ used in the RRRS paper has growth such that log log $\left | f\left ( z \right ) \right |= \mathcal{O}\left ( log\left | z \right | \right )^{k}$ where $K > 12$ is an arbitrary constant. The question is, can this exponent, K, be decreased and can explicit calculations and counterexamples be performed and constructed that improve on this?
Codes MSC : This was answered in the negative by the 2011 paper of Rottenfusser, Rückert, Rempe, and Schleicher (RRRS) by constructing a tract that produces a function that cannot contain such a curve. In the same paper, it was also shown that if the function was of finite order, that is, log log $\left | f\left ( z \right ) \right |= \mathcal{O}\left ( log\left | z \right | \right )$ as $\left | z \right |\rightarrow \infty$, then every point in the escaping set can indeed be connected to infinity by a curve in the escaping set.
The counterexample $f$ used in the RRRS paper has growth such that log log $\left | f\left ( z \right ) \right |= \mathcal{O}\left ( log\left | z \right | \right )^{k}$ where $K > 12$ is an arbitrary constant. The question is, can this exponent, K, be decreased and can explicit calculations and counterexamples be performed and constructed that improve on this?
37F10 - Dynamics of complex polynomials, rational maps, entire and meromorphic functions; Fatou and Julia sets
37F15 - Expanding maps; hyperbolicity; structural stability
37F50 - Small divisors, rotation domains and linearization; Fatou and Julia sets
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Informations sur la Vidéo
Réalisateur : Hennenfent, GuillaumeLangue : Anglais Date de publication : 02/11/2021 Date de captation : 20/09/2021 Sous collection : Research talks arXiv category : Dynamical Systems ; Complex Variables Domaine : Dynamical Systems & ODE Format : MP4 (.mp4) - HD Durée : 00:21:59 Audience : Researchers Download : https://videos.cirm-math.fr/2021-09-20_Brown.mp4 
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Informations sur la Rencontre
Nom de la rencontre : Advancing Bridges in Complex Dynamics / Avancer les connections dans la dynamique complexeOrganisateurs de la rencontre : Benini, Anna Miriam ; Drach, Kostiantyn ; Dudko, Dzmitry ; Hlushchanka, Mikhail ; Schleicher, Dierk Dates : 20/09/2021 - 24/09/2021 Année de la rencontre : 2021 URL Congrès : https://conferences.cirm-math.fr/2546.html
Données de citation
DOI : 10.24350/CIRM.V.19811103Citer cette vidéo: Brown, Andrew (2021). Eremenko's conjecture, Devaney's hairs, and the growth of counterexamples. CIRM. Audiovisual resource. doi:10.24350/CIRM.V.19811103 URI : http://dx.doi.org/10.24350/CIRM.V.19811103 |
Voir aussi
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Bibliographie
- ROTTENFUSSER, Günter, RÜCKERT, Johannes, REMPE, Lasse, et al. Dynamic rays of bounded-type entire functions. Annals of mathematics, 2011, p. 77-125. - http://doi.org/10.4007/annals.2011.173.1.3
