Title :
H∞ control of 2-D polynomial Roesser model via sum of square approach
Author :
Li Xiaofeng ; Wang Weiqun ; Li Lizhen
Author_Institution :
Sch. of Sci., Nanjing Univ. of Sci. & Technol., Nanjing, China
Abstract :
1-D polynomial systems are generalization of conventional 1-D linear systems and can represent nonlinear control systems effectively. In this paper, conventional 2-D Roesser models are extended to that with polynomial system matrices, i.e. 2-D polynomial Roesser model. The problems of stability analysis and Hx control for 2-D polynomial Roesser model are considered in this paper. A sufficient condition for the stability of 2-D polynomial Roesser model is proposed and an Hx polynomial controller is obtained in terms of sum of squares (SOS). An example is provided to show the effectiveness of the approach.
Keywords :
H∞ control; linear systems; matrix algebra; nonlinear control systems; polynomials; stability; 2D polynomial Roesser model; H∞ control; SOS; linear systems; nonlinear control systems; polynomial controller; polynomial system matrices; stability analysis; sum of square approach; Analytical models; Asymptotic stability; Fuzzy systems; Mathematical model; Polynomials; Stability analysis; Thermal stability; 2-D Polynomial Roesser Models; Asymptotically Stable; H∞ Control; Sum Of Squares (SOS);
Conference_Titel :
Control Conference (CCC), 2011 30th Chinese
Conference_Location :
Yantai
Print_ISBN :
978-1-4577-0677-6
Electronic_ISBN :
1934-1768
