Abstract
The finite-time stability and stabilization of a class of fractional-order switched singular continuous-time systems with order \(0<\alpha <1\) are investigated in this paper. First, by employing the average dwell time switching technique, together with the introduction of multiple Lyapunov functions, some sufficient conditions of the finite-time stability and finite-time boundedness are derived for the considered system. Second, based on the obtained conditions, suitable state feedback controllers can be designed if a set of linear matrix inequalities are feasible. Finally, an illustrative example is presented to show the effectiveness of the proposed results.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
N. Aguila-Camacho, M.A. Duarte-Mermoud, J.A. Gallegos, Lyapunov functions for fractional order systems. Commun. Nonlinear Sci. 19(9), 2951–2957 (2014)
R.L. Bagley, R.A. Calico, Fractional order state equations for the control of viscoelastically damped structures. J. Guid. Control Dyn. 1(4), 304–311 (1989)
G.P. Chen, Y. Yang, Finite-time stability of switched positive linear systems. Int. J. Robust Nonlinear Control 24(1), 179–190 (2014)
J.P. Clerc, A.M.S. Tremblay, G. Albinet, C. Mitescu, AC response of fractal networks. J. de Physique Lett. 45(19), 913–924 (1984)
H. Delavari, D. Baleanu, J. Sadati, Stability analysis of Caputo fractional-order nonlinear systems. Nonlinear Dyn. 67(4), 2433–2439 (2012)
L. Ding, Q.L. Han, X.M. Zhang, Distributed secondary control for active power sharing and frequency regulation in islanded microgrids using an event-triggered communication mechanism. IEEE Trans. Ind. Inform. to be published. https://doi.org/10.1109/TII.2018.2884494
X. Gao, J.B. Yu, Synchronization of two coupled fractional-order chaotic oscillators. Chaos Solitons Fract. 26(1), 141–145 (2005)
L. Gaul, P. Klein, S. Kemple, Damping description involving fractional operators. Mech. Syst. Signal Process. 5(2), 81–88 (1991)
X. Ge, Q.L. Han, X.M. Zhang, Achieving cluster formation of multi-agent systems under aperiodic sampling and communication delays. IEEE Trans. Ind. Electron. 65(4), 3417–3426 (2018)
M. Ichise, Y. Nagayanagi, T. Kojima, An analog simulation of non-integer order transfer functions for analysis of electrode processes. J. Electroanal. Chem. 33(2), 253–265 (1971)
T. Kaczorek, Singular fractional linear systems and electrical circuits. Int. J. Appl. Math. Comput. Sci. 21(2), 379–384 (2011)
T. Kaczorek, Stability of positive fractional switched continuous-time linear systems. B. Pol. Acad. Sci-Tech. 61(2), 349–352 (2013)
S.T. Li, X.M. Liu, Y.Y. Tan, Optimal switching time control of discrete-time switched autonomous systems. Int. J. Innov. Comput. I. 11(6), 2043–2050 (2015)
Y. Li, Y.Q. Chen, I. Podlubny, Mittag-Leffler stability of fractional order nonlinear dynamic systems. Automatica 45(8), 1965–1969 (2009)
C. Lin, B. Chen, P. Shi, J.P. Yu, Necessary and sufficient conditions of observer-based stabilization for a class of fractional-order descriptor systems. Syst. Control Lett. 112, 31–35 (2018)
S. Liu, X. Wu, X.F. Zhou, Asymptotical stability of Riemann–Liouville fractional nonlinear systems. Nonlinear Dyn. 86(1), 65–71 (2016)
J.G. Lu, Y.Q. Chen, Robust stability and stabilization of fractional-order interval systems with the fractional order \(0<\alpha <1\) case. IEEE Trans. Autom. Control 55(1), 152–158 (2015)
Y.J. Ma, B.W. Wu, Y.E. Wang, Finite-time stability and finite-time boundedness of fractional order linear systems. Neurocomputing 173(3), 2076–2082 (2016)
S. Marir, M. Chadli, D. Bouagada, New admissibility conditions for singular linear continuous-time fractional-order systems. J. Frankl. Inst. 354, 752–766 (2017)
E.T. McAdams, A. Lackermeier, J.A. McLaughlin, D. Macken, J. Jossinet, The linear and non-linear electrical properties of the electrode–electrolyte interface. Biosens. Bioelectron. 10(1), 67–74 (1995)
C.A. Monje, Y.Q. Chen, B.M. Vinagre, D.Y. Xue, V. Feliu, Fractional-Order Systems and Controls (Springer, London, 2010)
I. N’Doye, M. Darouach, M. Zasadzinski, Robust stabilization of uncertain descriptor fractional-order systems. Automatica 49(6), 1907–1913 (2013)
I. Podlubny, Fractional differential equations. Int. J. Differ. Equ. 3, 553–563 (2010)
W.H. Qi, G.D. Zong, J. Cheng, T.C. Jiao, Robust finite-time stabilization for positive delayed semi-Markovian switching systems. Appl. Math. Comput. 351, 139–152 (2019)
Y.H. Wei, J.C. Wang, T.Y. Liu, Y. Wang, Fixed pole based modeling and simulation schemes for fractional order systems. ISA Trans. 84, 43–54 (2019)
Y.H. Wei, J.C. Wang, T.Y. Liu, Y. Wang, Sufficient and necessary conditions for stabilizing singular fractional order systems with partially measurable state. J. Frankl. Inst. 356(4), 1975–1990 (2019)
T.B. Wu, F.B. Li, C.H. Yang, W.H. Gui, Event-based fault detection filtering for complex networked jump systems. IEEE-ASME T. Mech. 23(2), 497–505 (2018)
Y. Yang, G.P. Chen, Finite-time stability of fractional order impulsive switched systems. Int. J. Robust Nonlinear Control 25, 2207–2222 (2015)
J.F. Zhang, X.D. Zhao, Y. Chen, Finite-time stability and stabilization of fractional order positive switched systems. Circuits Syst. Signal Process. 35(7), 2450–2470 (2016)
M. Zhang, P. Shi, L. Ma, Cai J, Su H, Network-based fuzzy control for nonlinear Markov jump systems subject to quantization and dropout compensation. Fuzzy Sets Syst. (2018). https://doi.org/10.1016/j.fss.2018.09.007
M. Zhang, P. Shi, L. Ma, Cai J, Su H, Quantized feedback control of fuzzy Markov jump systems. IEEE Trans. Cybern. 49(9), 3375–3384 (2018)
X.F. Zhang, Y.Q. Chen, Admissibility and robust stabilization of continuous linear singular fractional order systems with the fractional order \(\alpha \): The \(0<\alpha <1\) case. ISA Trans. 82, 42–50 (2018)
X.M. Zhang, Q.L. Han, Network-based \(H_\infty \) filtering using a logic jumping-like trigger. Automatica 49(5), 1428–1435 (2013)
X.M. Zhang, Q.L. Han, J. Wang, Admissible delay upper bounds for global asymptotic stability of neural networks with time-varying delays. IEEE Trans. Neural Netw. Learn. Syst. 29(11), 5319–5329 (2018)
X.M. Zhang, Q.L. Han, A. Seuret, F. Gouaisbaut, Y. He, Overview of recent advances in stability of linear systems with time-varying delays. IET Control Theory Appl. 13(1), 1–16 (2019)
Y.L. Zhang, B.W. Wu, Y.E. Wang, Finite-time stability for switched singular systems. Acta Phys. Sinica. 63(17), 32–41 (2014)
L. Zhou, L. Cheng, J. She, Z. Zhang, Generalized extended state observer-based repetitive control for systems with mismatched disturbances. Int. J. Robust Nonlinear Control (to be published). https://doi.org/10.1002/rnc.4582
L. Zhou, D.W.C. Ho, G. Zhai, Stability analysis of switched linear singular systems. Automatica 49(5), 1481–1487 (2013)
L. Zhou, J. She, S. Zhou, Robust \(H_\infty \) control of an observer-based repetitive-control system. J. Frankl. Inst. 355(12), 4952–4969 (2018)
L. Zhou, J. She, S. Zhou, C. Li, Compensation for state-dependent nonlinearity in a modified repetitive-control system. Int. J. Robust Nonlinear Control 28(1), 213–226 (2018)
Z. Zuo, Q.L. Han, B. Ning, X. Ge, X.M. Zhang, An overview of recent advances in fixed-time cooperative control of multi-agent systems. IEEE Trans. Ind. Inform. 14(6), 2322–2334 (2018)
Acknowledgements
This work was supported by the National Natural Science Foundation of China (No. 61403241), by the Fundamental Research Funds for the Central Universities (Nos. GK201703009, GK201903004, GK201905001) and also by the China Scholarship Council (No. 201806870032).
Author information
Authors and Affiliations
Corresponding author
Additional information
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Feng, T., Wu, B., Liu, L. et al. Finite-Time Stability and Stabilization of Fractional-Order Switched Singular Continuous-Time Systems. Circuits Syst Signal Process 38, 5528–5548 (2019). https://doi.org/10.1007/s00034-019-01159-1
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00034-019-01159-1