Observer-based Stabilization for a Class of Chaotic Systems in the Presence of Disturbance and Nonlinear Function: an LMI Approach

This paper presents the state feedback controller design based on observer for a class of chaotic systems in the presence of disturbance and Lipschitz nonlinearities via linear matrix inequality approach. The effect of external disturbances and nonlinear Lipschitz perturbation on the system stability is reduced. The central merits of the recommended technique are Lyapunov closed-loop stability, the convergence of estimation error to zero, and the elimination of the effect of disturbances and nonlinearities. Furthermore, the accuracy and efficiency of the proposed method is graphically illustrated with a numeric example