Feedback stabilization of nonlinear uncertain dynamic systems

This paper investigates the problem of stabilization of nonlinear systems submitted to a deterministic disturbance known by its bounds. The stabilization property is considered in terms of exponential decay of a Lyapunov-like function. As such systems cannot be stabilized by continuous state feedbac

17l this paper, we investigate the stabilization problem ~f nonlinear control systems via dynamic output jeedback. The combined control law and estimator is used first to stabilize a class ~?/ nonlinear control systems. TIw factorization theory is then used to develop an improved scheme Jor stabiliz

Stability of systems with hysteresis nonlinearities, parametric uncertainty and finite dimensional unmodelled dynamics is considered. Conditions for exponential decay of the signals in the system to an equilibrium position are given. The equilibrium is generally not unique. The stability condition i

The stability of a general class of saturating nonlinear feedback system-s excited by bounded inputs is investigated. Explicit bounds are obtained on the magnit& and duration of the error signal when it shoots out front the unsaturated zone into the saturation zone. Thus, when the linear plant of th