On limit functions and their natural boundaries in infinite compositions of entire functions

In this article, we consider infinite sequences {Φ n } of entire functions in the complex plane C defined as compositions of the form where each f n , n = 1, 2, ... , is an entire function, and the limit functions Φ of such sequences. Under reasonable conditions on the sequence {f n }, and for the c...

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Bibliographic Details
Published in:Complex variables and elliptic equations 2007-09, Vol.52 (9), p.807-825
Main Author: Maalouf, Ramez N.
Format: Article
Language:English
Subjects:
AMS Subject Classifications
Boundary behaviour of analytic functions
Composition of entire functions
Entire functions
Iteration of analytic functions
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Summary:In this article, we consider infinite sequences {Φ n } of entire functions in the complex plane C defined as compositions of the form where each f n , n = 1, 2, ... , is an entire function, and the limit functions Φ of such sequences. Under reasonable conditions on the sequence {f n }, and for the cases where Φ exists and is a nonconstant analytic function, one finds that the boundary of the domain where {Φ n } converges to Φ is in fact the natural boundary of Φ, and that this boundary satisfies certain "expansion" properties when considered under the composition of the f n 's. We also consider the case of constant limit functions Φ. In the final section we discuss the connection between the coefficients of a power series representation of a nonconstant limit Φ and the sequence {a n } of a one parameter family of entire functions f n (z) = f (a n,z ), whose composition as in ( 1 ) converges in some domain to Φ.
ISSN:1747-6933
1747-6941
DOI:10.1080/17476930701627561