Robust switching adaptive control of multi-input nonlinear systems

During the last decade a considerable progress has been made in the design of stabilizing controllers for nonlinear systems with known and unknown constant parameters. New design tools such as adaptive feedback linearization, adaptive back-stepping, control Lyapunov functions (CLFs) and robust control Lyapunov functions (RCLFs), nonlinear damping and switching adaptive control have been introduced. Most of the results developed are applicable to single-input feedback-linearizable systems and parametric-strict-feedback systems. These results, however, cannot be applied to multi-input feedback-linearizable systems, parametric-pure-feedback systems and systems that admit a linear-in-the-parameters CLF. In this paper, we develop a general procedure for designing robust adaptive controllers for a large class of multi-input nonlinear systems. This class of nonlinear systems includes as a special case multi-input feedback-linearizable systems, parametric-pure-feedback systems and systems that admit a linear-in-the-parameters CLF. The proposed approach uses tools from the theory of RCLF and the switching adaptive controllers proposed by the authors for overcoming the problem of computing the feedback control law when the estimation model becomes uncontrollable. The proposed control approach has also been shown to be robust with respect to exogenous bounded input disturbances.

[1]  W. Rudin Principles of mathematical analysis , 1964 .

[2]  A. S. Morse,et al.  Supervision of families of nonlinear controllers , 1996, Proceedings of 35th IEEE Conference on Decision and Control.

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

[4]  P. Kokotovic,et al.  Inverse Optimality in Robust Stabilization , 1996 .

[5]  Riccardo Marino,et al.  An extended direct scheme for robust adaptive nonlinear control , 1991, Autom..

[6]  L. Praly,et al.  Adaptive nonlinear regulation: estimation from the Lyapunov equation , 1992 .

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

[8]  A. Isidori,et al.  Adaptive control of linearizable systems , 1989 .

[9]  Elias B. Kosmatopoulos,et al.  A switching adaptive controller for feedback linearizable systems , 1999, IEEE Trans. Autom. Control..

[10]  G. Campion,et al.  Indirect adaptive state feedback control of linearly parametrized nonlinear systems , 1990 .

[11]  Elias B. Kosmatopoulos,et al.  Robust neural stabilizers for unknown systems , 1997, Proceedings of the 36th IEEE Conference on Decision and Control.

[12]  A. Annaswamy,et al.  Adaptive control of nonlinear systems with a triangular structure , 1994, IEEE Trans. Autom. Control..

[13]  A. Morse,et al.  Applications of hysteresis switching in parameter adaptive control , 1992 .

[14]  Yuandan Lin,et al.  A Smooth Converse Lyapunov Theorem for Robust Stability , 1996 .

[15]  P. Kokotovic,et al.  Adaptive nonlinear design with controller-identifier separation and swapping , 1995, IEEE Trans. Autom. Control..

[16]  I. Kanellakopoulos,et al.  Systematic Design of Adaptive Controllers for Feedback Linearizable Systems , 1991, 1991 American Control Conference.

[17]  Elias B. Kosmatopoulos,et al.  Universal stabilization using control Lyapunov functions, adaptive derivative feedback, and neural network approximators , 1998, IEEE Trans. Syst. Man Cybern. Part B.

[18]  Masayoshi Tomizuka,et al.  Adaptive Robust Control of a Class of Multivariable Nonlinear Systems , 1996 .

[19]  M. Polycarpou,et al.  On the existence and uniqueness of solutions in adaptive control systems , 1993, IEEE Trans. Autom. Control..

[20]  Eduardo D. Sontag,et al.  Control-Lyapunov Universal Formulas for Restricted Inputs , 1995 .

[21]  G. Goodwin,et al.  Hysteresis switching adaptive control of linear multivariable systems , 1994, IEEE Trans. Autom. Control..