Abstract
This paper is concerned with the problem of state feedback \(H_\infty \) stabilization of discrete two-dimensional switched delay systems with actuator saturation represented by the second Fornasini and Marchesini state-space model. Firstly, the saturation behavior is described with the help of the convex hull representation, and a sufficient condition for asymptotical stability of the closed-loop system is proposed in terms of linear matrix inequalities via the multiple Lyapunov functional approach. Then, a state feedback controller is designed to guarantee the \(H_\infty \) disturbance attenuation level of the corresponding closed-loop system. Finally, two examples are provided to validate the proposed results.
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References
S. Attasi, Systemes lineaires homogenes a deux indices (IRIA, Rapport, Laboria, 1973)
A. Benzaouia, A. Hmamed, F. Tadeo, Stability conditions for discrete 2-D switching systems, based on a multiple Lyapunov function. In European control conference 23–26 (2009)
A. Benzaouia, A. Hmamed, F. Tadeo, A.E. Hajjaji, Stabilisation of discrete 2-D time switching systems by state feedback control. Int. J. Syst. Sci. 42(3), 479–487 (2011)
M. Bisiacco, New results in 2-D optimal control theory. Multidimens. Syst. Signal Process. 6(3), 189–222 (1995)
S.P. Boyd, L. El Ghaoui, E. Feron, V. Balakrishnan, Linear Matrix Inequalities in System and Control Theory (SIAM, Philadelphia, 1994)
S.F. Chen, Delay-dependent stability for 2-D systems with time-varying delay subject to state saturation in the Roesser model. Appl. Math. Comput. 216(9), 2613–2622 (2010)
S.F. Chen, Stability analysis for 2-D systems with interval time-varying delays and saturation nonlinearities. Signal Process 90(7), 2265–2275 (2010)
Y. Chen, S. Fei, K. Zhang, L. Yu, Control of switched linear systems with actuator saturation and its applications. Math. Comput. Model. 56(1), 14–26 (2012)
X. Chen, J. Lam, H. Gao, S. Zhou, Stability analysis and control design for 2-D fuzzy systems via basis-dependent Lyapunov functions. Multidimens. Syst. Signal Process 24(3), 395–415 (2013)
D. Chen, H. Yu, Stability analysis of state saturation 2D discrete time-delay systems based on F-M model. Math. Probl. Eng. 2013, 9 (2013). Article ID 749782
B. Cichy, K. Gałkowski, P. Dąbkowski, H. Aschemann, A. Rauh, A new procedure for the design of iterative learning controllers using a 2D systems formulation of processes with uncertain spatio-temporal dynamics. Control Cybern 42(1), 9–26 (2013)
B. Cichy, K. Gałkowski, E. Rogers, Iterative learning control for spatio-temporal dynamics using Crank-Nicholson discretization. Multidimens. Syst. Signal Process 23(1–2), 185–208 (2012)
P. Dabkowski, K. Galkowski, O. Bachelier, E. Rogers, A. Kummert, J. Lam, Strong practical stability and stabilization of uncertain discrete linear repetitive processes. Numer. Linear Algebra Appl. 20(2), 220–233 (2013)
A. Dey, H. Kar, An LMI based criterion for the global asymptotic stability of 2-D discrete state-delayed systems with saturation nonlinearities. Digit. Signal Process. 22(4), 633–639 (2012)
C. Du, L. Xie, \(H_\infty \) Control and Filtering of Two-dimensional Systems (Springer, Berlin, 2002)
Z. Duan, Z. Xiang, State feedback \(H_\infty \) control for discrete 2-D switched systems. J. Franklin Inst. 350(6), 1513–1530 (2013)
Z. Duan, Z. Xiang, Output feedback \(H_\infty \) stabilization of 2-D discrete switched systems in FM LSS model. Circuits Syst. Signal Process 33(4), 1095–1117 (2014)
Z. Duan, Z. Xiang, H.R. Karimi, Delay-dependent \(H_\infty \) control for 2-D switched delay systems in the second FM model. J. Franklin Inst. 350(7), 1697–1718 (2013)
Z.Y. Feng, L. Xu, M. Wu, Y. He, Delay-dependent robust stability and stabilisation of uncertain two-dimensional discrete systems with time-varying delays. IET Control Theory Appl. 4(10), 1959–1971 (2010)
E. Fornasini, G. Marchesini, Doubly indexed dynamical systems: state space models and structural properties. Math. Syst. Theory 12(1), 59–72 (1978)
P. Gahinet, A. Nemirovskii, A.J. Laub, M. Chilali, The LMI control toolbox. In IEEE conference on decision and control, pp. 2038–2038 (1994)
K. Galkowski, J. Lam, E. Rogers, S. Xu, B. Sulikowski, W. Paszke, D.H. Owens, LMI based stability analysis and robust controller design for discrete linear repetitive processes. Int. J. Robust Nonlinear Control 13(13), 1195–1211 (2003)
K. Galkowski, E. Rogers, S. Xu, J. Lam, D.H. Owens, LMIs-a fundamental tool in analysis and controller design for discrete linear repetitive processes. IEEE Trans. Circuits Syst. I Fundam. Theory Appl. 49(6), 768–778 (2002)
C.Y. Gao, G.R. Duan, X.Y. Meng, Robust \(H_\infty \) filter design for 2-D discrete systems in Roesser model. Int. J. Innov. Comput. Inf. Control 5(4), 413–418 (2008)
I. Ghous, Z. Xiang, Robust state feedback \(H_\infty \) control for uncertain 2-D continuous state delayed systems in the Roesser model. Multidim. Syst. Signal Process (2014). doi:10.1007/s11045-014-0301-8
T. Hu, Z. Lin, Control Systems with Actuator Saturation: Analysis and Design (Springer, Boston, 2001)
S. Huang, Z. Xiang, Delay-dependent stability for discrete 2-D switched systems with state delays in the Roesser model. Circuits Syst. Signal Process 32(6), 2821–2837 (2013)
S. Huang, Z. Xiang, Robust reliable control of uncertain 2-D discrete switched systems with state delays. Trans. Inst. Meas. Control 36(1), 119–130 (2014)
S. Huang, Z. Xiang, H.R. Karimi, Stabilization and controller design of 2-D discrete switched systems with state delays under asynchronous switching. Abstr. Appl. Anal. 2013, 12 (2013). Article ID 961870
S. Huang, Z. Xiang, H. Reza Karimi, Robust \(l_2 \)-gain control for 2-D nonlinear stochastic systems with time-varying delays and actuator saturation. J. Franklin Inst. 350(7), 1865–1885 (2013)
C.A. Ibanez, M.S. Suarez-Castanon, O.O. Gutierrez-Frias, A switching controller for the stabilization of the damping inverted pendulum cart system. Int. J. Innov. Comput. Inf. Control 9(9), 3585–3597 (2013)
T. Kaczorek, Two-Dimensional Linear Systems (Springer, Berlin, 1985)
T. Kaczorek, New stability tests of positive standard and fractional linear systems. Circuits Syst. 2(04), 261 (2011)
J. Kurek, Stability of nonlinear time-varying digital 2-D Fornasini-Marchesini system. Multidimens. Syst. Signal Process 25(1), 235–244 (2014)
J. Liang, Z. Wang, X. Liu, Robust state estimation for two-dimensional stochastic time-delay systems with missing measurements and sensor saturation. Multidimens. Syst. Signal Process 25(1), 157–177 (2014)
W.S. Lu, Two-Dimensional Digital Filters (CRC Press, New York, 1992)
W.S. Lu, E.B. Lee, Stability analysis for two-dimensional systems via a Lyapunov approach. IEEE Trans. Circuits Syst. 32(1), 61–68 (1985)
C. Onat, A new concept on PI design for time delay systems: weighted geometrical center. Int. J. Innov. Comput. Inf. Control 9(4), 1539–1556 (2013)
R.P. Roesser, A discrete state-space model for linear image processing. IEEE Trans. Autom. Control 20(1), 1–10 (1975)
S. Saat, D. Huang, S.K. Nguang, Robust state feedback control of uncertain polynomial discrete-time systems: an integral action approach. Int. J. Innov. Comput. Inf. Control 9(3), 1233–1244 (2013)
V. Singh, Stability analysis of 2-D linear discrete systems based on the Fornasini-Marchesini second model: stability with asymmetric Lyapunov matrix. Digit. Signal Process 26, 183–186 (2014)
Z. Xiang, S. Huang, Stability analysis and stabilization of discrete-time 2-D switched systems. Circuits Syst. Signal Process 32(1), 401–414 (2013)
J. Xu, L. Yu, \(H_\infty \) control for 2-D discrete state delayed systems in the second FM model. Acta Autom. Sin. 34(7), 809–813 (2008)
J. Xu, L. Yu, Delay-dependent guaranteed cost control for uncertain 2-D discrete systems with state delay in the FM second model. J. Franklin Inst. 346(2), 159–174 (2009)
H. Xu, Y. Zou, J. Lu, S. Xu, Robust \(H_\infty \) control for a class of uncertain nonlinear two-dimensional systems with state delays. J. Franklin Inst. 342(7), 877–891 (2005)
R. Yang, P. Shi, G.P. Liu, H. Gao, Network-based feedback control for systems with mixed delays based on quantization and dropout compensation. Automatica 47(12), 2805–2809 (2011)
S. Ye, W. Wang, Stability analysis and stabilisation for a class of 2-D nonlinear discrete systems. Int. J. Syst. Sci. 42(5), 839–851 (2011)
S. Ye, Y. Zou, W. Wang, J. Yao, Delay-dependent stability analysis for two-dimensional discrete systems with shift delays by the general models. In 10th IEEE international conference on control, automation, Robotics and vision, pp. 973–978 (2008)
Acknowledgments
This work was supported by the National Natural Science Foundation of China under Grant No. 61273120, the Postgraduate Innovation Project of Jiangsu Province (Grant Nos. CXZZ13_0208, KYLX_0378), the Jiangsu Scientific and Technological Support Plan (Grant No. BE2012175), the Jiangsu Province “333Project” (Grant No. BRA2012163) and the Visiting Scholar Foundation of Key Lab in University under Grant No. GZKF-201203. The authors would like to thank the Editor-in-Chief, Dr. M.N.S. Swamy, for his helpful comments in improving the presentation of the paper.
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Ghous, I., Xiang, Z. & Karimi, H.R. State Feedback \(H_\infty \) Control For 2-D Switched Delay Systems with Actuator Saturation in the Second FM Model. Circuits Syst Signal Process 34, 2167–2192 (2015). https://doi.org/10.1007/s00034-014-9960-9
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DOI: https://doi.org/10.1007/s00034-014-9960-9