Published October 1986
| Published
Journal Article
Open
Stable Attracting Sets in Dynamical Systems and in Their One-Step Discretizations
- Creators
- Kloeden, P. E.
- Lorenz, J.
Chicago
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Abstract
We consider a dynamical system described by a system of ordinary differential equations which possesses a compact attracting set Λ of arbitrary shape. Under the assumption of uniform asymptotic stability of Λ in the sense of Lyapunov, we show that discretized versions of the dynamical system involving one-step numerical methods have nearby attracting sets Λ(h), which are also uniformly asymptotically stable. Our proof uses the properties of a Lyapunov function which characterizes the stability of Λ.
Additional Information
© 1986 Society for Industrial and Applied Mathematics. Received by the editors May 28, 1985, and in revised form January 20, 1986. This research was supported by National Science Foundation Grants DMS83-12264 and DMS84-00885, and by U.S. Army contract DAAG29-85-K-0092.Attached Files
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Additional details
- Eprint ID
- 32149
- Resolver ID
- CaltechAUTHORS:20120627-134902327
- NSF
- DMS83-12264
- NSF
- DMS84-00885
- U. S. Army Contract
- DAAG29-85-K-0092
- Created
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2012-06-27Created from EPrint's datestamp field
- Updated
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2021-11-09Created from EPrint's last_modified field