Stability Analysis and Stabilization of Discrete-Time 2D Switched Systems

This paper is concerned with stability analysis and stabilization problems for two-dimensional (2D) discrete switched systems represented by a model of Roesser type. First, sufficient conditions for the exponential stability of the 2D discrete switched system are derived via the average dwell time approach. Then, based on this result, a state feedback controller is designed to achieve the exponential stability of the corresponding closed-loop system. All the results are presented in linear matrix inequalities (LMIs) form. A numerical example is given to illustrate the effectiveness of the proposed method.

[1]  Abdellah Benzaouia,et al.  Stability conditions for discrete 2D switching systems, based on a multiple Lyapunov function , 2009, 2009 European Control Conference (ECC).

[2]  Wu-Sheng Lu,et al.  Comments on stability analysis for two-dimensional systems via a Lyapunov approach , 1985 .

[3]  Vladimir A. Yakubovich,et al.  Linear Matrix Inequalities in System and Control Theory (S. Boyd, L. E. Ghaoui, E. Feron, and V. Balakrishnan) , 1995, SIAM Rev..

[4]  Stephen P. Boyd,et al.  Linear Matrix Inequalities in Systems and Control Theory , 1994 .

[5]  Shyh-Feng Chen Stability analysis for 2-D systems with interval time-varying delays and saturation nonlinearities , 2010, Signal Process..

[6]  Shengyuan Xu,et al.  LMIs - a fundamental tool in analysis and controller design for discrete linear repetitive processes , 2002 .

[7]  Bo Hu,et al.  Stability analysis of switched systems with stable and unstable subsystems: An average dwell time approach , 2001, Int. J. Syst. Sci..

[8]  K. Teo,et al.  A LMI approach to stability analysis and synthesis of impulsive switched systems with time delays , 2008 .

[9]  R. Decarlo,et al.  Asymptotic stability of m-switched systems using Lyapunov functions , 1992, [1992] Proceedings of the 31st IEEE Conference on Decision and Control.

[10]  T. Kaczorek Two-Dimensional Linear Systems , 1985 .

[11]  Thomas Parisini,et al.  INTERNATIONAL SYMPOSIUM ON INTELLIGENT CONTROL , 2009 .

[12]  Jerzy Klamka controllability of 2-D nonlinear systems , 1997 .

[13]  Anton Kummert,et al.  Stabilization of Discrete Linear Repetitive Processes with Switched Dynamics , 2006, Multidimens. Syst. Signal Process..

[14]  Lihua Xie,et al.  H[∞] control and filtering of two-dimensional systems , 2002 .

[15]  Brian D. O. Anderson,et al.  Stability and the matrix Lyapunov equation for discrete 2-dimensional systems , 1986 .

[16]  Ahmed El Hajjaji,et al.  Stabilisation of discrete 2D time switching systems by state feedback control , 2011, Int. J. Syst. Sci..

[17]  G. Marchesini,et al.  Stability analysis of 2-D systems , 1980 .

[18]  M. Branicky Multiple Lyapunov functions and other analysis tools for switched and hybrid systems , 1998, IEEE Trans. Autom. Control..

[19]  Maria Elena Valcher,et al.  On the internal stability and asymptotic behavior of 2-D positive systems , 1997 .

[20]  Vimal Singh,et al.  Stability of 2-D systems described by the Fornasini-Marchesini first model , 2003, IEEE Trans. Signal Process..

[21]  K. Hu,et al.  Improved robust H8 filtering for uncertain discrete-time switched systems , 2009 .

[22]  J. Klamka Constrained controllability of positive 2D systems , 1998 .

[23]  Andreas Antoniou,et al.  Two-Dimensional Digital Filters , 2020 .

[24]  J. Klamka Controllability of 2-D systems , 2005, The Fourth International Workshop on Multidimensional Systems, 2005. NDS 2005..

[25]  Claudio De Persis,et al.  Proceedings of the 38th IEEE conference on decision and control , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[26]  Rafael Castro-Linares,et al.  Trajectory tracking for non-holonomic cars: A linear approach to controlled leader-follower formation , 2010, 49th IEEE Conference on Decision and Control (CDC).

[27]  A. Morse,et al.  Stability of switched systems with average dwell-time , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[28]  Krzysztof Galkowski,et al.  Control Systems Theory and Applications for Linear Repetitive Processes - Recent Progress and Open Research Questions , 2007 .

[29]  Yijing Wang,et al.  Delay-dependent Robust H∞ Control for a Class of Switched Systems with Time Delay , 2008, 2008 IEEE International Symposium on Intelligent Control.

[30]  E. Yaz Linear Matrix Inequalities In System And Control Theory , 1998, Proceedings of the IEEE.

[31]  W.-s. Lu,et al.  Comments on "Stability for Two-Dimensional Systems via a Lyapunov Approach , 1985 .

[32]  M. Fahmy,et al.  Stability and overflow oscillations in 2-D state-space digital filters , 1981 .

[33]  Yuan Gong Sun,et al.  Delay-dependent robust stability and stabilization for discrete-time switched systems with mode-dependent time-varying delays , 2006, Appl. Math. Comput..

[34]  Ilya V. Kolmanovsky,et al.  Predictive energy management of a power-split hybrid electric vehicle , 2009, 2009 American Control Conference.

[35]  Krzysztof Galkowski,et al.  Multi-machine operations modelled and controlled as switched linear repetitive processes , 2008, Int. J. Control.

[36]  Guangming Xie,et al.  Delay-dependent robust stability and Hinfinity control for uncertain discrete-time switched systems with mode-dependent time delays , 2007, Appl. Math. Comput..

[37]  Shuxia Ye,et al.  Stability analysis and stabilisation for a class of 2-D nonlinear discrete systems , 2011, Int. J. Syst. Sci..

[38]  Tadeusz Kaczorek,et al.  New Stability Tests of Positive Standard and Fractional Linear Systems , 2011, Circuits Syst..

[39]  J. Klamka CONTROLLABILITY OF 2D CONTINUOUS-DISCRETE SYSTEMS WITH DELAYS IN CONTROL , 1998 .