The asymptotic stability of nonlinear autonomous systems
Document Type
Conference Proceeding
Publication Date
12-1-2007
Publication Title
Canadian Journal of Electrical and Computer Engineering
Volume
32
Issue
1
First Page
35
Keywords
Asymptotic stability, Lyapunov stability, Nonlinear autonomous systems
Last Page
43
Abstract
In this paper a new general method is developed by means of which one can ascertain whether a nonlinear autonomous system is asymptotically stable. The method is essentially an extension to nonlinear systems of a theorem developed earlier by the first author for linear autonomous systems. Necessary and sufficient conditions are specified, the satisfaction of which guarantees that the system being studied is asymptotically stable. The new method, by design, always uses a positive-definite fLinction which satisfies Lyapunov's stability theorem. However, the new method uses only one positive-definite function, in contrast to Lyapunov's stability theorem, which requires two functions to be definite at the same time. In addition, the new method specifies the stability function at the outset once a mathematical system model has been obtained.
DOI
10.1109/CJECE.2007.364329
ISSN
08408688
Recommended Citation
Christensen, Gustav S. and Saif, Mehrdad. (2007). The asymptotic stability of nonlinear autonomous systems. Canadian Journal of Electrical and Computer Engineering, 32 (1), 35-43.
https://scholar.uwindsor.ca/electricalengpub/379