Finite-Time \(L_1\) Control for Positive Markovian Jump Systems with Partly K
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- 作者:Jiyang Wang ; Wenhai Qi ; Xianwen Gao
- 关键词:Positive Markovian jump systems ; Partly known transition rates ; Finite ; time boundedness ; Linear programming
- 刊名:Circuits, Systems, and Signal Processing
- 出版年:2016
- 出版时间:May 2016
- 年:2016
- 卷:35
- 期:5
- 页码:1751-1766
- 全文大小:801 KB
- 参考文献:1.A. Arunkumar, R. Sakthivel, K. Mathiyalagan, Ju H. Park, Robust stochastic stability of discrete-time fuzzy Markovian jump neural networks. ISA Trans. 53(4), 1006–1014 (2014)CrossRef
2.P. Bolzern, P. Colaneri, G. Nicolao, Stochastic stability of positive Markov jump linear systems. Automatica 50(4), 1181–1187 (2014)MathSciNet CrossRef MATH
3.L. Caccetta, V.G. Rumchev, A positive linear discrete-time model of capacity planning and its controllability properties. Math. Comput. Model. 40(1–2), 217–226 (2004)MathSciNet CrossRef MATH
4.X.M. Chen, J. Lam, H.K. Lam, Positive filtering for positive Takagi–Sugeno fuzzy systems under \(l_1\) performance. Inf. Sci. 299, 32–41 (2015)MathSciNet CrossRef
5.X.M. Chen, J. Lam, P. Li, Z. Shu, \(l_1\) -induced norm and controller synthesis of positive systems. Automatica 49(5), 1377–1385 (2013)MathSciNet CrossRef MATH
6.L. Farina, S. Rinaldi, Positive Linear Systems: Theory and Applications (Wiley, New York, 2000)CrossRef MATH
7.E. Fornasini, M.E. Valcher, Stability and stabilizability criteria for discrete-time positive switched systems. IEEE Trans. Autom. Control 57(5), 1208–1221 (2012)MathSciNet CrossRef
8.X.H. Ge, Q.L. Han, Distributed fault detection over sensor networks with Markovian switching topologies. Int. J. Gen. Syst. 43(3–4), 305–318 (2014)MathSciNet CrossRef MATH
9.E. Hernandez-Varga, P. Colaneri, R. Middleton, F. Blanchini, Discrete-time control for switched positive systems with application to mitigating viral escape. Int. J. Robust Nonlinear 21(10), 1093–1111 (2010)MathSciNet CrossRef MATH
10.A. Jadbabaie, J. Lin, A.S. Morse, Coordination of groups of mobile autonomous agents using nearest neighbor rules. IEEE Trans. Autom. Control 48(6), 988–1001 (2003)MathSciNet CrossRef
11.T. Kaczorek, Positive 1D and 2D Systems (Springer, New York, 2002)CrossRef MATH
12.H.Y. Li, H.J. Gao, P. Shi, X.D. Zhao, Fault-tolerant control of Markovian jump stochastic systems via the augmented sliding mode observer approach. Automatica 50(7), 1825–1834 (2014)MathSciNet CrossRef MATH
13.P. Li, J. Lam, Z. Shu, \(H_\infty \) positive filtering for positive linear discrete-time systems: an augmentation approach. IEEE Trans. Autom. Control 55(10), 2337–2342 (2010)MathSciNet CrossRef
14.X. Mao, Stability of stochastic differential equations with Markovian switching. Stoch. Proc. Appl. 79(1), 45–67 (1999)MathSciNet CrossRef MATH
15.O. Mason, R. Shorten, On linear copositive Lyapunov functions and the stability of switched positive linear systems. IEEE Trans. Autom. Control 52(7), 1346–1349 (2007)MathSciNet CrossRef
16.K. Mathiyalagan, J.H. Park, R. Sakthivel, S.M. Anthoni, Robust mixed \(H_\infty \) and passive filtering for networked Markov jump systems with impulses. Signal Process. 101, 162–173 (2014)CrossRef
17.K. Mathiyalagan, H.Y. Su, R. Sakthivel, Robust stochastic stability of discrete–time Markovian jump neural networks with leakage delay. Z. Naturforsch. A 69a, 70–80 (2014)
18.L.J. Shen, U. Buscher, Solving the serial batching problem in job shop manufacturing systems. Eur. J. Oper. Res. 221(1), 14–26 (2012)MathSciNet CrossRef MATH
19.R. Shorten, F. Wirth, D. Leith, A positive systems model of TCP-like congestion control: asymptotic results. IEEE/ACM Trans. Netw. 14(3), 616–629 (2006)MathSciNet CrossRef
20.Y. Song, J.X. Xie, M.R. Fei, W.Y. Hou, Mean square exponential stabilization of networked control systems with Markovian packet dropouts. Trans. Inst. Meas. Control 35(1), 75–82 (2013)CrossRef
21.M. Xiang, Z.R. Xiang, Finite-time \(L_1\) control for positive switched linear systems with time-varying delay. Commun. Nonlinear Sci. 18(11), 3158–3166 (2013)MathSciNet CrossRef MATH
22.J.F. Zhang, Z.Z. Han, H. Wu, Robust finite-time stability and stabilisation of switched positive systems. IET Control Theory Appl. 8(1), 67–75 (2014)MathSciNet CrossRef MATH
23.J.F. Zhang, Z.Z. Han, F. Zhu, Stochastic stability and stabilization of positive systems with Markovian jump parameters. Nonlinear Anal. Hybrid Syst. 12, 147–155 (2014)MathSciNet CrossRef MATH
24.X.D. Zhao, X.W. Liu, S. Yin, H.Y. Li, Improved results on stability of continuous-time switched positive linear systems. Automatica 50(2), 614–621 (2014)MathSciNet CrossRef
25.S.Q. Zhu, Q.L. Han, C.H. Zhang, \(L_1\) -gain performance analysis and positive filter design for positive discrete-time Markov jump linear systems: A linear programming approach. Automatica 50(8), 2098–2107 (2014)MathSciNet CrossRef MATH - 作者单位:Jiyang Wang (1)
Wenhai Qi (1)
Xianwen Gao (1)
1. College of Information Science and Engineering, Northeastern University, Shenyang, 110819, China - 刊物类别:Engineering
- 刊物主题:Electronic and Computer Engineering
- 出版者:Birkh盲user Boston
- ISSN:1531-5878
文摘
The paper deals with the problem of finite-time \(L_1\) control for positive Markovian jump systems with partly known transition rates. Firstly, by constructing a linear co-positive Lyapunov function, sufficient conditions for finite-time boundedness and \(L_1\) finite-time boundedness of the open-loop system are developed. Then, an effective method is proposed for the construction of the state feedback controller. These sufficient criteria are derived in the form of linear programming. A key point of this paper is to extend the special requirement of completely known transition rates to more general form that covers completely known and completely unknown transition rates as two special cases. Finally, two examples are given, which include a mathematical model of virus mutation treatment to illustrate the validity of the obtained results.