Title :
H∞ control for a class of non-minimum phase switched systems
Author :
Zhao Shengzhi ; Zuo Shumei
Author_Institution :
Sch. of Math., Liaoning Univ., Shenyang, China
Abstract :
In this paper, we study H∞ control for a class of cascade non-minimum phase switched nonlinear systems. When arbitrary subsystem´s H∞ control problem is not solvable, we design state feedback controllers and switching laws by using structural properties to guarantee both internal stability of the resulting closed-loop systems and prescribed L2-gain from disturbance input to the controlled output by using multiple Lyapunov function technique. A sufficient condition for the problem to be solvable is attributed to solving lower-dimension partial differential inequalities. These methods do not rely on the solutions of Hamilton-Jacobi inequalities.
Keywords :
H∞ control; Lyapunov methods; cascade systems; closed loop systems; control system synthesis; nonlinear control systems; partial differential equations; stability; state feedback; time-varying systems; H∞ control problem; Hamilton-Jacobi inequalities; L2-gain; cascade non-minimum phase switched nonlinear systems; closed-loop system stability; lower-dimension partial differential inequalities; multiple Lyapunov function technique; state feedback controller design; switching laws; Linear systems; Lyapunov methods; Nonlinear systems; State feedback; Switched systems; Switches; H∞ Control; L2-gain; Multiple Lyapunov Functions; Stability; Switched Nonlinear Systems;
Conference_Titel :
Control Conference (CCC), 2011 30th Chinese
Conference_Location :
Yantai
Print_ISBN :
978-1-4577-0677-6
Electronic_ISBN :
1934-1768
