The fractional representations of a class of nonlinear systems

Author

Krener, Arthur ; Zhu, Yi

Author_Institution

Dept. of Math., California Univ., Davis, CA, USA

fYear

1989

fDate

13-15 Dec 1989

Firstpage

963

Abstract

Right and left coprime fractional representations are shown to exist for a special class of nonlinear systems that have both controller and observer forms. A generalized Bezout identity is given for this class of nonlinear systems. Using the controller form, it is possible to design a nonlinear feedback controller. The given system can be right factorized into a composite of a stable postprocessor and an inverse of a stable preprocessor. The right-coprimeness concept is based on this right factorization. When the postprocessor and preprocessor are combined, they form a higher dimensional system. The existence of a stable left inverse of this higher order system constitutes the authors´ definition of right coprimeness

Keywords

control system synthesis; feedback; nonlinear control systems; control system synthesis; feedback controller; fractional representations; generalized Bezout identity; nonlinear control systems; right-coprimeness; stable postprocessor; stable preprocessor; Adaptive control; Control systems; Jacobian matrices; Linear approximation; Linear systems; Mathematics; Nonlinear control systems; Nonlinear systems; State-space methods;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 1989., Proceedings of the 28th IEEE Conference on

Conference_Location

Tampa, FL

Type

conf

DOI

10.1109/CDC.1989.70269

Filename

70269