DocumentCode
3173852
Title
An invariance principle for time-varying systems
Author
Hancock, Edward J. ; Papachristodoulou, A.
Author_Institution
Dept. of Eng. Sci., Univ. of Oxford, Oxford, UK
fYear
2012
fDate
10-13 Dec. 2012
Firstpage
4597
Lastpage
4602
Abstract
In this paper we propose an invariance principle for time-varying dynamical systems. We first present a novel proof of the Krasovskii-Lasalle invariance principle for forward time using invariance properties of regions of attraction, rather than the invariance property of the limit set. We then propose an invariance principle for bounded time-varying systems, in the spirit of the classical result, by using the Lasalle-Yoshizawa theorem and a uniformity condition. The simple, practical use of the theorem is shown using an example of a pendulum with time-varying parameters.
Keywords
differential equations; invariance; time-varying systems; Krasovskii-Lasalle invariance principle; Lasalle-Yoshizawa theorem; bounded time-varying systems; forward time; pendulum; time-varying dynamical systems; time-varying parameters; uniformity condition; Asymptotic stability; Equations; Lyapunov methods; Observability; Stability analysis; Time varying systems; Trajectory;
fLanguage
English
Publisher
ieee
Conference_Titel
Decision and Control (CDC), 2012 IEEE 51st Annual Conference on
Conference_Location
Maui, HI
ISSN
0743-1546
Print_ISBN
978-1-4673-2065-8
Electronic_ISBN
0743-1546
Type
conf
DOI
10.1109/CDC.2012.6426537
Filename
6426537
Link To Document