Published 2003
| Version Published
Journal Article
Open
Periodic points and dynamic rays of exponential maps
Creators
Abstract
We investigate the dynamics of exponential maps z->e^z ; the goal is a description by means of dynamic rays. We discuss landing properties of dynamic rays and show that in many important cases, repelling and parabolic periodic points are landing points of periodic dynamic rays. For postsingularly finite exponential maps, we use spider theory to show that a dynamic ray lands at the singular value.
Additional Information
© 2003 Academia Scientiarum Fennica. We would like to thank John Milnor for the invitation to the Institute for Mathematical Sciences at Stony Brook where this work started, and for the hospitality there. We would also like to thank the Studienstiftung des deutschen Volkes for its support all along and in particular during the stay in Stony Brook. Moreover, we have enjoyed helpful discussions with Noel Baker, Bob Devaney, Adrien Douady, John Hubbard, Lasse Rempe, Phil Rippon and Mitsuhiro Shishura.Attached Files
Published - SCHaasf03.pdf
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SCHaasf03.pdf
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Additional details
Identifiers
- Eprint ID
- 755
- Resolver ID
- CaltechAUTHORS:SCHaasf03
Funding
- Studienstiftung des deutschen Volkes
Dates
- Created
-
2005-09-27Created from EPrint's datestamp field
- Updated
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2020-05-18Created from EPrint's last_modified field