DocumentCode :
801963
Title :
Slowly varying system ẋ = A(t)x
Author :
Desoer, C.
Author_Institution :
University of California, Berkeley, CA, USA
Volume :
14
Issue :
6
fYear :
1969
fDate :
12/1/1969 12:00:00 AM
Firstpage :
780
Lastpage :
781
Abstract :
A limiting case of great importance in engineering is that of slowly varying parameters. For systems described by 
, one would intuitively expect that if, for each 
, the frozen system is stable, then the time-varying system should also be stable. Provided 
is small enough, Rosenbrock has shown that this is the case [1]. Rosenbrock used a continuity argument [1, p. 75]. In this correspondence explicit bounds and slightly sharper results are obtained. Finally, it is pointed out that these results are useful in the study of the exact behavior of non-linear lumped systems with slowly varying operating points.
, one would intuitively expect that if, for each , the frozen system is stable, then the time-varying system should also be stable. Provided is small enough, Rosenbrock has shown that this is the case [1]. Rosenbrock used a continuity argument [1, p. 75]. In this correspondence explicit bounds and slightly sharper results are obtained. Finally, it is pointed out that these results are useful in the study of the exact behavior of non-linear lumped systems with slowly varying operating points.Keywords :
Nonlinear systems; Circuit stability; Laplace equations; NASA; Nonlinear circuits;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1969.1099336
Filename :
1099336
Link To Document :
