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Delay-dependent stability and stabilization of uncertain discrete-time markovian jump singular systems with time delay

Published online by Cambridge University Press:  17 February 2009

Shuping Ma ,
Xinzhi Liu  and
Chenghui Zhang
Shuping Ma
Affiliation:
School of Mathematics and System Science Shandong UniversityJinan 250100 Chinamashup@sdu.edu.cn. School of Computer Science and Technology Shandong UniversityJinan China
Xinzhi Liu
Affiliation:
School of Control and Engineering Shandong UniversityJinan 250061 China Department of Applied Mathematics University of WaterlooWaterloo Ontario Canada N2L 3G1xzliu@uwaterloo.ca.
Chenghui Zhang
Affiliation:
School of Control and Engineering Shandong UniversityJinan 250061 China
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This paper discusses robust stochastic stability and stabilization of time-delay discrete Markovian jump singular systems with parameter uncertainties. Based on the restricted system equivalent (RES) transformation, a delay-dependent linear matrix inequalities condition for time-delay discrete-time Markovian jump singular systems to be regular, causal and stochastically stable is established. With this condition, problems of robust stochastic stability and stabilization are solved, and delay-dependent linear matrix inequalities are obtained. A numerical example is also given to illustrate the effectiveness of this method.2000Mathematics subject classification: primary 39A12; secondary 93C55.

Keywords

discrete Markovian jump singular systemtime-delay systemdelaydependentlinear matrix inequality (LMI)robust stochastic stability and stabilization.
Type
Research Article
Information
The ANZIAM Journal , Volume 49 , Issue 1 , July 2007 , pp. 111 - 129
Copyright
Copyright © Australian Mathematical Society 2007

References

[1]Aplevich, J. D., Implicit Linear Systems (Springer-Verlag, Berlin, 1991).CrossRefGoogle Scholar
[2]Boukas, E. K., “Static output feedback control for stochastic hybrid systems: LMI approach”, Automatical J IPAC 42(2006) 183188.CrossRefGoogle Scholar
[3]Boukas, E. K. and Al-Muthairi, N. F., “Delay-dependent stabilization of singular linear systems with delays”, Int J Innovative Comput Information Contr. 2 (2006) 283291.Google Scholar
[4]Boukas, E. K. and Liu, Z. K., “Robust stability and H∞ control of discrete-time jump linear systems with time-delays: an LMI approach”, in Proceedings of the 39th IEEE Conference on Decision and Control, Sydney, Australia, (1999), 1527–1532.Google Scholar
[5]Boukas, E. K. and Liu, Z. K., “Robust H∞ control of discrete-time Markovian jump linear systems with mode-dependent time-delays”, IEEE Trans Automat Contr. 46 (2001) 1918–1924.CrossRefGoogle Scholar
[6]Cao, Y. Y. and Lams, J., “Stochastic stabilizability and Hx control for discrete-time jump linear systems with time delay”, J Franklin Inst. 336 (1999) 12631281.CrossRefGoogle Scholar
[7]Chen, B., Lam, J. andXu, S., “Memory state feedback guaranteed cost control for neutral delay systems”, Int J Innovative Comput Information Contr. 2 (2006) 293303.Google Scholar
[8]Chen, W. H., Guan, Z. H. andYu, P., “Delay-dependent stability and H∞ control of uncertain discrete-time Markovian jump systems with mode-dependent time delays”, Systems Control Lett. 52 (2004) 361376.CrossRefGoogle Scholar
[9]Dai, L.,Singular Control Systems. Lecture Notes in Control and Information Sciences(Springer-Verlag, New York, 1989.Google Scholar
[10]Fridman, E. and U. Shaked, “A descriptor system approach to Hx control of linear time-delay systems”, IEEE Trans Automat Contr. 47 2002 253270.CrossRefGoogle Scholar
[11]Fridman, E. and U. Shaked, “An improved stabilization method for linear time-delay systems”, IEEE Trans Automat Contr. 47 2002 19311937.CrossRefGoogle Scholar
[12]He, Y., M. Wu, J. H. She and G. P. Liu, “Delay-dependent robust stability criteria for uncertain neutral systems with mixed delays”, Systems Control Lett.51 2004 5765.CrossRefGoogle Scholar
[13]He, Y., M. Wu, J. H. She and G. P. Liu, “Parameter-dependent Lyapunov functional for stability of time-delay systems with polytopic type uncertainties”, IEEE Trans Automat Contr. 49, 2004 828832.CrossRefGoogle Scholar
[14]Ma, S.P. and Z. L. Cheng, “An LMI approach to robust stabilization for uncertain discrete-time singular systems”, in Proceedings of the 41st IEEE CDC, Las Vegas, Nevada, USA, 2002, 1090– 1095.Google Scholar
[15] S. P. Ma and Z. L. Cheng, “Delay-dependent robust stabilization for uncertain discrete-time singular systems with time-delay", in Proceedings of the Sixth World Congress on Intelligent Control and Automation, Dalian, China, 2006), 2081–2085.Google Scholar
[16]Petersen, I.R., “A stabilization algorithm for a class of uncertain linear systems”,Systems Control Lett. 8 1987 351357.CrossRefGoogle Scholar
[17]Shi, P. and E. K. Boukas, “On Hx control design for singular continuous-time delay systems with parametric uncertainties”,Nonlinear Dyn Syst Theory 4(2004)5971.Google Scholar
[18]Shi, P., E. K. Boukas and K. Agarwal, “Control of Markovianjump discrete-time systems with norm bounded uncertainty and unknown delay”, IEEE Trans Automat Contr.44(1999)21392144.Google Scholar
[19]Wu, M., Y. He and J. H. She, “New delay-dependent stability criteria and stabilizing method for neutral systems”,IEEE Trans Automat Contr. 49 (2004)22662271.CrossRefGoogle Scholar
[20]Wu, M., Y. He, J. H. She and G. P. Liu, “Delay-dependent criteria for robust stability of time-varying delay systems”,Automatica J IPAC 40(2004)14351439.CrossRefGoogle Scholar
[21]Xu, S., P. V. Dooren, R. Stefan and J. Lam, “Robust stability and stabilization for singular systems with state delay and parameter uncertainty”, IEEE Trans Automat Contr. 47(2002)11221128.Google Scholar
[22]Xu, S.and J. Lam, “Robust stability and stabilization of discrete singular systems: An equivalent characterization””,IEEE Trans Automat Contr. 49(2004)568574.CrossRefGoogle Scholar
[23]Xu, S., J. Lam and C. Yang, “Robust H∞ control for discrete singular systems with state delay and parameter uncertainty“”, Dyn Contin Discrete Impuls Syst Ser B Appl Algorithms 9(2002) 539554.Google Scholar
[24]Yue, D., J. Lam and D. W. C. Ho, “Reliable H, control of uncertain descriptor systems with multiple delays””,IEE Proceedings - Control Theory and Applications 150(2003)557564CrossRefGoogle Scholar