Adaptive control of a class of nonlinear systems with a triangular structure

An adaptive control approach to a class of nonlinear systems with a triangular structure is developed. The systems considered here are described by a set of second-order differential equations, and thus there are many applications to the control of mechanical systems. The design procedure of the control law is based on the idea of properly using the structure of the system, and sequentially developing an adaptive controller that is globally stable. A class of single-input single-output nonlinear systems with a triangular structure is defined and the stabilizability conditions are derived. A control strategy to stabilize the same class of systems with unknown parameters is developed and an adaptive controller for realizing the strategy is systematically designed. The constructive procedure used for generating the adaptive controller is shown to result in the closed-loop system being asymptotically stable at the origin. The approach is illustrated using an example of a coupled mechanical system.<<ETX>>

[1]  M. Vidyasagar Decomposition techniques for large-scale systems with nonadditive interactions: Stability and stabilizability , 1980 .

[2]  A. Isidori Nonlinear Control Systems , 1985 .

[3]  David G. Taylor,et al.  Adaptive Regulation of Nonlinear Systems with Unmodeled Dynamics , 1988, 1988 American Control Conference.

[4]  K. Nam,et al.  A model reference adaptive control scheme for pure-feedback nonlinear systems , 1988 .

[5]  Some nonlinear damping models in flexible structures , 1988 .

[6]  I. Kanellakopoulos,et al.  Robustness of Adaptive Nonlinear Control Under an Extended Matching Condition , 1989 .

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

[8]  Mark W. Spong,et al.  Adaptive control of flexible-joint manipulators , 1989, IEEE Control Systems Magazine.

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

[10]  J. Baillieul The Behavior of Super-Articulated Mechanisms Subject to Periodic Forcing , 1991 .

[11]  Anuradha M. Annaswamy,et al.  Manipulation of compliant objects with compliant fingerpads in the presence of nonlinear dynamics , 1991, [1991] Proceedings of the 30th IEEE Conference on Decision and Control.

[12]  C. Schwartz,et al.  Comments on "Adaptive control of linearizable systems" by S.S. Sastry and A. Isidori , 1992 .

[13]  Anuradha M. Annaswamy,et al.  Object Manipulation Using Compliant Fingerpads: Modeling and Control , 1993 .

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