Multiply connected wandering domains of meromorphic functions: Internal dynamics and connectivity

Autor:	Gustavo Rodrigues Ferreira
Rok vydání:	2022
Předmět:	Mathematics::Dynamical Systems Mathematics::Complex Variables General Mathematics FOS: Mathematics Dynamical Systems (math.DS) Mathematics - Dynamical Systems
Zdroj:	Journal of the London Mathematical Society. 106:1897-1919
ISSN:	1469-7750 0024-6107
DOI:	10.1112/jlms.12613
Popis:	We discuss how the nine-way classification scheme devised by Benini et al. for the dynamics of simply connected wandering domains of entire functions, based on the long-term behaviour of the hyperbolic distance between iterates of pairs of points and also the distance between orbits and the domains' boundaries, carries over to the general case of multiply connected wandering domains of meromorphic functions. Most strikingly, we see that not all pairs of points in such a wandering domain behave in the same way relative to the hyperbolic distance, and that the connectivity of the wandering domain greatly influences its possible internal dynamics. After illustrating our results with the well-studied case of Baker wandering domains, we further illustrate the diversity of multiply connected wandering domains in general by constructing a meromorphic function with a wandering domain without eventual connectivity. Finally, we show that an analogue of the "convergence to the boundary" classification of Benini et al. does hold in general, and add new information about how this convergence takes place. Comment: 21 pages, 4 figures
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_dedup___::320135e29ada0eb59f955539bf86de64 https://doi.org/10.1112/jlms.12613 Zobrazit plný text záznamu Plný text