DocumentCode
802687
Title
Noncausal multipliers for nonlinear system stability
Author
Venkatesh, Yedatore V.
Author_Institution
Indian Institute of Science, Bangalore, India
Volume
15
Issue
2
fYear
1970
fDate
4/1/1970 12:00:00 AM
Firstpage
195
Lastpage
204
Abstract
Using the Popov approach, new absolute stability conditions in multiplier form are derived for a single-loop system with a time-invariant stable linear element 
in the forward path and a nonlinear time-varying gain 
in the feedback path. The classes of nonlinearities considered are the monotonic, odd monotonic, and power law. The stability multiplier contains causal and noncausal terms; for absolute stability, the latter give rise to a lower bound (which is believed to be new) on 
and the former, as in earlier investigations, to an upper bound on . Asymptotic stability conditions for a linear system are realized as a limiting case of the absolute stability conditions derived for the power law nonlinearity.
in the forward path and a nonlinear time-varying gain in the feedback path. The classes of nonlinearities considered are the monotonic, odd monotonic, and power law. The stability multiplier contains causal and noncausal terms; for absolute stability, the latter give rise to a lower bound (which is believed to be new) on and the former, as in earlier investigations, to an upper bound on . Asymptotic stability conditions for a linear system are realized as a limiting case of the absolute stability conditions derived for the power law nonlinearity.Keywords
Absolute stability; Nonlinear systems, time-varying; Popov stability; Time-varying systems, nonlinear; Asymptotic stability; Feedback; Impedance; Integral equations; Linear systems; Nonlinear systems; Time varying systems; Transfer functions; Upper bound; Vectors;
fLanguage
English
Journal_Title
Automatic Control, IEEE Transactions on
Publisher
ieee
ISSN
0018-9286
Type
jour
DOI
10.1109/TAC.1970.1099404
Filename
1099404
Link To Document