论文信息 - Lyapunov design of stabilizing controllers for cascaded systems

Lyapunov design of stabilizing controllers for cascaded systems

The design of a state feedback law for an affine nonlinear system to render a (as small as possible) compact neighborhood of the equilibrium of interest globally attractive is discussed. Following Z. Artstein's theorem (1983), the problem can be solved by designing a so-called control Lyapunov function. For systems which are in a cascade form, a Lyapunov function meeting Artstein's conditions is designed, assuming the knowledge of a control law stabilizing the equilibrium of the head nonlinear subsystem. In particular, for planar systems, this gives sufficient and necessary conditions for a compact neighborhood of the equilibrium to be stabilized. >

J. Coron | L. Praly | B. 'Andréa-Novel

[1] Eduardo Sontag,et al. Remarks on continuous feedback , 1980, 1980 19th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.

[2] Z. Artstein. Stabilization with relaxed controls , 1983 .

[3] R. Marino. On the largest feedback linearizable subsystem , 1986 .

[4] John Tsinias. Stabilizations of affine in control nonlinear systems , 1988 .

[5] R. Marino. Feedback stabilization of single-input nonlinear systems , 1988 .

[6] M. Kawski. Stabilization of nonlinear systems in the plane , 1989 .

[7] P. Kokotovic,et al. A positive real condition for global stabilization of nonlinear systems , 1989 .

[8] B. d'Andrea-Novel,et al. Lyapunov design of stabilizing controllers , 1989, Proceedings of the 28th IEEE Conference on Decision and Control,.

[9] W. P. Dayawansa,et al. Asymptotic stabilization of two dimensional real analytic systems , 1989 .

[10] John Tsinias,et al. Sufficient lyapunov-like conditions for stabilization , 1989, Math. Control. Signals Syst..

[11] Eduardo Sontag. A universal construction of Artstein's theorem on nonlinear stabilization , 1989 .