Title :
H∞-control of discrete-time nonlinear systems
Author :
Lin, Wei ; Byrnes, Christopher I.
Author_Institution :
Dept. of Syst. Sci. & Math., Washington Univ., St. Louis, MO, USA
fDate :
4/1/1996 12:00:00 AM
Abstract :
This paper presents an explicit solution to the problem of disturbance attenuation with internal stability via full information feedback, state feedback, and dynamic output feedback, respectively, for discrete-time nonlinear systems. The H∞-control theory is first developed for affine systems and then extended to general nonlinear systems based on the concepts of dissipation inequality, differential game, and LaSalle´s invariance principle in discrete time. A substantial difficulty that V(A(x)+B(x)u+E(x)w) [respectively, V(f(x,u,w))] is no longer quadratic in [wu] arising in the case of discrete-time nonlinear systems has been surmounted in the paper. In the case of a linear system, we show how the results reduce to the well-known ones recently proposed in the literature
Keywords :
H∞ control; discrete time systems; game theory; invariance; nonlinear systems; stability; state feedback; H∞-control; LaSalle´s invariance principle; affine systems; differential game; discrete-time nonlinear systems; dissipation inequality; disturbance attenuation; dynamic output feedback; internal stability; state feedback; Attenuation; Control systems; H infinity control; Industrial engineering; Nonlinear control systems; Nonlinear systems; Output feedback; Stability; State estimation; State feedback;
Journal_Title :
Automatic Control, IEEE Transactions on
