Robust output feedback stabilization of single input single output nonlinear systems

A robust output feedback control which globally stabilizes a class of SISO minimum-phase nonlinear systems with known and constant relative degree containing a vector of unknown parameters is developed. The constant parameter vector is not restricted to enter linearly in the state equations but it is assumed to belong to a known compact set and an imprecise knowledge of the nonlinearities (e.g., lookup tables) is allowed. The class of nonlinear systems is determined by geometric conditions; an additional assumption, which generalizes the knowledge of the sign of high-frequency gain for linear systems, is also required. The nonlinearities are restricted to depend, in suitable coordinates, on the output only: no growth conditions, such as sector or Lipschitz, are required. The robust output feedback control stabilizes the system for every value of the parameter vector in a known compact set. The order of the compensator is equal to the relative degree minus one.<<ETX>>

[1]  H. Kwakernaak A condition for robust stabilizability , 1982 .

[2]  R. Marino,et al.  Dynamic output feedback linearization and global stabilization , 1991 .

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

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

[5]  Riccardo Marino,et al.  Global adaptive observers and output-feedback stabilization for a class of nonlinear systems , 1991 .

[6]  W. Boothby,et al.  Global state and feedback equivalence of nonlinear systems , 1985 .

[7]  G. Bastin,et al.  Adaptive Stabilization of Nonlinear-systems , 1991 .

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

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

[10]  Arthur J. Krener,et al.  Linearization by output injection and nonlinear observers , 1983 .

[11]  B. Ross Barmish,et al.  An iterative design procedure for simultaneous stabilization of MIMO systems , 1987, Autom..

[12]  W. Respondek Global Aspects of Linearization, Equivalence to Polynomial Forms and Decomposition of Nonlinear Control Systems , 1986 .

[13]  J. Tsinias Optimal controllers and output feedback stabilization , 1990 .

[14]  Christopher I. Byrnes,et al.  Stabilization and output regulation of nonlinear systems in the large , 1990, 29th IEEE Conference on Decision and Control.

[15]  K. Wei,et al.  Robust stabilizability for linear systems with both parameter variation and unstructured uncertainty , 1987, 26th IEEE Conference on Decision and Control.

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