Quadratic-type Lyapunov functions for singularly perturbed systems

Asymptotic stability of nonlinear singularly perturbed systems is investigated via Lyapunov stability techniques. A quadratic-type Lyapunov function for the singularly perturbed system is obtained as a weighted sum of quadratic-type Lyapunov functions for two lower order systems.

[1]  P. Kokotovic,et al.  A two stage Lyapunov-Bellman feedback design of a class of nonlinear systems , 1980, 1980 19th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.

[2]  Hassan K. Khalil,et al.  Asymptotic stability of nonlinear multiparameter singularly perturbed systems , 1981, Autom..

[3]  J. Willems The computation of finite stability regions by means of open Liapunov surfaces , 1969 .

[4]  L. Grujic Uniform asymptotic stability of non-linear singularly perturbed general and large-scale systems , 1981 .

[5]  L. Chua,et al.  A qualitative analysis of the behavior of dynamic nonlinear networks: Stability of autonomous networks , 1976 .

[6]  H. Sasaki An Approximate Incorporation of Field Flux Decay into Transient Stability Analyses of Multimachine Power Systems by the Second Method of Lyapunov , 1979, IEEE Transactions on Power Apparatus and Systems.

[7]  Jacques L. Willems Comments on “Transient stability of an a.c. generator by Lyapunov's direct method” , 1969 .

[8]  Charles Concordia,et al.  Concepts of Synchronous Machine Stability as Affected by Excitation Control , 1969 .

[9]  Petar V. Kokotovic,et al.  Singular perturbations and order reduction in control theory - An overview , 1975, at - Automatisierungstechnik.

[10]  Muhammad W. Siddiqee Transient stability of an a.c. generator by Lyapunov's direct method† , 1968 .

[11]  J. Chow Asymptotic Stability of a Class of Non-linear Singularly Perturbed Systems† , 1978 .

[12]  M. Araki Stability of large-scale nonlinear systems--Quadratic-order theory of composite-system method using M-matrices , 1978 .