Abstract
In this chapter, two types of control problems of impulsive systems on time scales are discussed. Section 10.1 formulates the controllability and observability of impulsive time-varying linear systems, and presents the controllability and observability results. In Section 10.2, pinning synchronization of linear dynamical networks (DNs) on time scales is studied. A pinning impulsive control scheme that takes into account time-delay effects is presented to achieve synchronization of DNs on time scales with the state of an isolated node. Based on the theory of time scales and the direct Lyapunov method, a synchronization criterion is established for linear DNs on general time scales. Numerical simulations are given to illustrate the effectiveness of the theoretical analysis.
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References
M. Bohner, A. Peterson, Dynamic Equations on Time Scales: An Introduction with Applications (Birkhäuser, Boston, 2001)
Z. Guan, T. Qian, X. Yu, On controllability and observability for a class of impulsive systems. Syst. Control Lett. 47(3), 247–257 (2002)
Z. Guan, T. Qian, X. Yu, Controllability and observability of linear time varying impulsive systems. IEEE Trans. Circuits Syst. I: Fund. Theory Appl. 49(8), 1198–1208 (2002)
A. Hu, Z. Xu, Pinning a complex dynamical network via impulsive control. Phys. Lett. A 374(2), 186–190 (2009)
M. Hu, L. Wang, Exponential synchronization of chaotic delayed neural networks on time scales. Int. J. Appl. Math. Stat. 34(4),96–103 (2013)
B. Liu, X. Liu, G. Chen, Robust impulsive synchronization of uncertain dynamical networks. IEEE Trans. Circuits Syst. I: Regul. Pap. 52(7), 1431–1441 (2005)
X. Liu, K. Zhang, Impulsive control for stabilisation of discrete delay systems and synchronisation of discrete delay dynamical networks. IET Control Theory Appl. 8(13), 1185–1195 (2014)
Y. Long, M. Wu, B. Liu, Robust impulsive synchronization of linear discrete dynamical networks. J. Control Theory Appl. 3(1), 20–26 (2005)
J. Lu, D. Ho, J. Cao, J. Kurths, Single impulsive controller for globally exponential synchronization of dynamical networks. Nonlinear Anal. Real World Appl. 14(1), 581–593 (2013)
J. Lu, J. Kurths, J. Cao, N. Mahdavi, C. Huang, Synchronization control for nonlinear stochastic dynamical networks: pinning impulsive strategy. IEEE Trans. Neural Netw. Learn. Syst. 23(2), 285–292 (2012)
T.A. Luk’yanova, A.A. Martynyuk, On the asymptotic stability of a neural network on a time scale. Nonlinear Oscillations 13(3), 372–388 (2010)
V. Lupulescua, A. Younus, Controllability and observability for a class of time-varying impulsive systems on time scales. Electron. J. Qual. Theory Differ. Equ. 95, 1–30 (2011)
V. Lupulescua, A. Younus, Controllability and observability for a class of linear impulsive dynamic systems on time scales. Math. Comput. Model. 54(5–6), 1300–1310 (2011)
Y. Tang, W.K. Wong, J.A. Fang, Q.Y. Miao, Pinning impulsive synchronization of stochastic delayed coupled networks. Chin. Phys. B 20(4), 040513 (10 pp.) (2011)
X. Yang, J. Cao, Z. Yang, Synchronization of coupled reaction-diffusion neural networks with time-varying delays via pinning-impulsive controller. SIAM J. Control Optim. 51(5), 3486–3510 (2013)
Q. Zhang, J. Lu, J. Zhao, Impulsive synchronization of general continuous and discrete-time complex dynamical networks. Commun. Nonlinear Sci. Numer. Simul. 15(4), 1063–1070 (2010)
S. Zhao, J. Sun, Controllability and observability for impulsive systems in complex fields. Nonlinear Anal. Real World Appl. 11(3), 1513–1521 (2010)
J. Zhou, Q. Wu, L. Xiang, Pinning complex delayed dynamical networks by a single impulsive controller. IEEE Trans. Circuits Syst. I Regul. Pap. 58(12), 2882–2893 (2011)
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Liu, X., Zhang, K. (2019). Control Problems on Time Scales. In: Impulsive Systems on Hybrid Time Domains. IFSR International Series in Systems Science and Systems Engineering, vol 33. Springer, Cham. https://doi.org/10.1007/978-3-030-06212-5_10
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DOI: https://doi.org/10.1007/978-3-030-06212-5_10
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