EconPapers    
Economics at your fingertips  

EconPapers Home
About EconPapers

Working Papers
Journal Articles
Books and Chapters
Software Components

Authors

JEL codes
New Economics Papers

Advanced Search


EconPapers FAQ
Archive maintainers FAQ
Cookies at EconPapers

Format for printing

The RePEc blog
The RePEc plagiarism page

 

On the Automorphic Group of an Entire Function

Ronen Peretz ()
Additional contact information
Ronen Peretz: Ben Gurion University of the Negev, Department of Mathematics

A chapter in Advancements in Complex Analysis, 2020, pp 363-448 from Springer

Abstract: Abstract This paper develops further the theory of the automorphic group of non-constant entire functions. This theory has already a long history that essentially started with two remarkable papers of Tatsujirô Shimizu that were published in 1931. The elements ϕ(z) of the group are defined by the automorphic equation f(ϕ(z)) = f(z), where f(z) is entire. Tatsujirô Shimizu also refers to the functions of this group as those functions that are determined by f −1 ∘ f. He proved many remarkable properties of those automorphic functions. He indicated how they induce a beautiful geometric structure on the complex plane. Those structures were termed by Tatsujirô Shimizu, the system of normal polygonal domains, and the more refined system of the fundamental domains of f(z). The last system if exists tiles up the complex plane with remarkable geometric tiles that are conformally mapped to one another by the automorphic functions. In the Ph.D thesis of the author, those tiles were also called the system of the maximal domains of f(z). One cannot avoid noticing the many similarities between this automorphic group and its accompanying geometric structures and analytic properties, and the more tame discrete groups that appear in the theory of hyperbolic geometry and also the arithmetic groups in number theory. This paper pursues further the theory initiated by Tatsujirô Shimizu, towards understanding global properties of the automorphic group, rather than just understanding the properties of the individual automorphic functions. We hope to be able in sequel papers to generalize arithmetic and analytic tools such as the Selberg trace formula, to this new setting.

Date: 2020
References: Add references at CitEc
Citations:

There are no downloads for this item, see the EconPapers FAQ for hints about obtaining it.

Related works:
This item may be available elsewhere in EconPapers: Search for items with the same title.

Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text

Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-3-030-40120-7_10

Ordering information: This item can be ordered from
http://www.springer.com/9783030401207

DOI: 10.1007/978-3-030-40120-7_10

Access Statistics for this chapter

More chapters in Springer Books from Springer
Bibliographic data for series maintained by Sonal Shukla () and Springer Nature Abstracting and Indexing ().

 
Share

RePEc
This site is part of RePEc and all the data displayed here is part of the RePEc data set.

Is your work missing from RePEc? Here is how to contribute.

Questions or problems? Check the EconPapers FAQ or send mail to .

Örebro UniversityEconPapers is hosted by the School of Business at Örebro University.

Page updated 2026-05-22
Handle: RePEc:spr:sprchp:978-3-030-40120-7_10