Journal of Applied Nonlinear Dynamics
Stabilization of Unstable Periodic Orbits in a Three-Dimensional Chaotic System
Using Time-Delay Autosynchronization Control Method
Journal of Applied Nonlinear Dynamics 12(3) (2023) 453--464 | DOI:10.5890/JAND.2023.09.003
Abdul Hussain Surosh$^{{1,2}} $, Reza Khoshsiar Ghaziani$ ^{{1}} $, Javad Alidousti$ ^{{1}} $
$ ^{mathrm{1}} $ Department of Applied Mathematics, Shahrekord University, Shahrekord, P.O.Box 115, Iran
$ ^{mathrm{2}} $ Department of Mathematics, Baghlan University, Pol-e-Khomri, Baghlan, Afghanistan
Download Full Text PDF
Abstract
This paper is concerned with controlling complex dynamics of a three-dimensional chaotic system consisting of two quadratic cross-products and one square term. We use Pyragas' time-delayed feedback control (TDFC) known as time delay autosynchronization (TDAS) method to stabilize the unstable equilibrium point and unstable periodic orbits of the system. An explicit formula is derived to determine the critical value of time delay $ \tau_{0} $ for which when the delay passes through a certain threshold critical value, the chaotic dynamical system undergoes a Hopf bifurcation. Furthermore, by choosing the appropriate range of feedback strength $ K $ and control parameter $ \tau $ as a free parameters, existence of Hopf bifurcation is investigated theoretically and numerically. Finally, some numerical simulations are presented to verify the analytical results.
\vspace{0.2cm}
References
-
[1]  | Kocamaz, U.E., Göksu, A., Taskın, H., and Uyaroglu, Y. (2020), Control of chaotic two-predator one-prey model with single state control signals, Journal of Intelligent Manufacturing, 32, 1-10.
|
-
[2]  | Yang, J., Zhang, E., and Liu, M. (2016), Bifurcation analysis and chaos control in a modified finance system with delayed feedback, International Journal of Bifurcation and Chaos, 26(6), 1-14.
|
-
[3]  | Song, Y. and Wei, J. (2004), Bifurcation analysis for Chen's system with delayed feedback and its application to control of chaos, Chaos, Solitons and Fractals, 22, 75–91.
|
-
[4]  | Wang, H., Wang, Q., and Zheng, Y. (2014), Bifurcation analysis for Hindmarsh-Rose neuronal model with time-delayed feedback control and application to chaos control, Science China,Technological Sciences, 57(5), 872–878.
|
-
[5]  |
Wang, Z., Sun, W., Wei, Z., and Zhang, S. (2015), Dynamics and delayed feedback control for a 3D jerk system with hidden attractor, Nonlinear Dynamics, 82(2015), 577-588.
|
-
[6]  |
Xiao, M. and Cao, J. (2007), Bifurcation analysis and chaos control for lü system with delayed feedback, International Journal of Bifurcation and Chaos, 17(12), 4309–4322.
|
-
[7]  |
Xu, C. and Zhang, Q. (2015), On the chaos control of the Qi system, Journal of Engineering Mathematics, 90, 1-15.
|
-
[8]  |
Höhne, K., Benner, H., Shirahama, H., and Just, W. (2008), Chaos control by time–delayed feedback with an unstable control loop, ENOC, 4, 1–4.
|
-
[9]  |
Feng, Y. and Wei, Z. (2015), Delayed feedback control and bifurcation analysis of the generalized Sprott B system with hidden attractors, The European Physical Journal Special Topics, 224, 1619–1636.
|
-
[10]  |
Jiang, S., Wei, Z., Zhang, J., Liu, H., and Wang, S. (2012), A new chaotic system based on delayed feedback control method, Fifth International Workshop on Chaos-fractals Theories and Applications, 1–4.
|
-
[11]  |
Rezaie, B. and Jahed Motlagh, M.R. (2011), An adaptive delayed feedback control method for stabilizing chaotic time-delayed systems, Nonlinear Dynamics, 64, 1–10.
|
-
[12]  |
Vasegh, N. and Sedigh, A.K. (2009), Chaos control in delayed chaotic systems via sliding mode based delayed feedback, Chaos, Solitons and Fractals, 40, 159–165.
|
-
[13]  |
Jiang, Z., Guo, Y., and Zhang, T. (2019), Double delayed feedback control of a nonlinear finance system, Discrete Dynamics in Nature and Society, 1–17.
|
-
[14]  |
Ott, E., Grebogi, C., and Yorke, J.A. (1990), Controlling chaos, Physical Review Letters, 64(11), 1196–1199.
|
-
[15]  |
Pyragas, K. (1992), Continuous control of chaos by self-controlling feedback, Physics letters A, 170(6), 421–428.
|
-
[16]  |
Pyragas, V. and Pyragas, K. (2019), State-dependent act-and-wait time-delayed feedback control algorithm, Communications in Nonlinear Science and Numerical Simulation, 73, 338-350.
|
-
[17]  |
Sieber, J. (2021), Generic stabilizability for time-delayed feedback control, Physical and Engineering Sciences, 472, 1–19.
|
-
[18]  |
Kuznetsov, N.V., Leonov, G.A. and Shumafov, M.M. (2015), A short survey on Pyragas time-delay feedback stabilization and odd number limitation, IFAC-PapersOnLine, 48(11), 706–709.
|
-
[19]  |
Gjurchinovski, A., Sandev, T., and Urumov, V. (2011), Delayed feedback control of fractional-order chaotic systems, Journal of Physics A: Mathematical and Theoretical,
43(44), 445102.
|
-
[20]  |
Jiang, Z. and Zhang, T. (2020), Feedback control of a chaotic finance system with two delays, Complexity, 1–17.
|
-
[21]  |
Guan, X., Feng, G., Chen, C., and Chen, G. (2007), A full delayed feedback controller design method for time-delay chaotic systems, Physica D, 227, 36–42.
|
-
[22]  |
Payragas, K. (2006), Delayed feedback control of chaos, Mathematical, Physical and Engineering Sciences, 364, 2309–2334.
|
-
[23]  | Vasegh, N. and Sedigh, A. K. (2008), Delayed feedback control of time-delayed chaotic systems: Analytical approach at Hopf bifurcation, Physics Letters A, 372, 5110–5114.
|
-
[24]  |
Son, W.S. and Park, Y.J. (2011), Delayed feedback on the dynamical model of a financial system, Chaos, Solitons $\&$ Fractals, 44, 208–217.
|
-
[25]  |
Pyragas, V. and Pyragas, K. (2015), Relation between the extended time-delayed feedback control algorithm and the method of harmonic oscillators, Physical Review E, 92(022925), 1–8.
|
-
[26]  |
Guan, X., Chen, C., Peng, H., and Fan, Z. (2003), Time-delayed feedback control of time-delay chaotic systems, International Journal of Bifurcation and Chaos, 13(1), 193–205.
|
-
[27]  |
Just, W., Bennar, H., and Scholl, E. (2003), Control of chaos by time-delayed feedback: A survey of theoretical and experimental aspects, Advances in Solid State Physics, 43, 589–603.
|
-
[28]  | Li, C., Li, H., and Tong, Y. (2013), Analysis of a novel three-dimensional chaotic system, Optik, 124, 1516–1522.
|
-
[29]  |
Ding, Y., Jiang, W. and Wang, H. (2010), Delayed feedback control and bifurcation analysis of Rossler chaotic system, Nonlinear Dynamics, 61, 707–715.
|
-
[30]  |
Zhao, H., Lin, Y., and Dai, Y. (2011), Bifurcation analysis and control of chaos for a hybrid ratio-dependent three species food chain, Applied Mathematics and Computation, 218, 1533–1546.
|
-
[31]  |
Lancaster, P. and Tismenetsky, M. (1985), The Theory of Matrices with Applications, Academic Press: London.
|
-
[32]  |
Ruan, S.G. and Wei, J.J. (2001), On the zeros of a third degree exponential polynomial with applications to a delayed model for the control of testosterone secretion, Mathematical Medicine and Biology, 18(1), 41–52.
|
-
[33]  |
Ruan, S.G. and Wei, J.J. (2003), On the zero of some transcendential functions with applications to stability of delay differential equations with two delays, Dynamics of Continuous, Discrete and Impulsive Systems Series A, 10(6), 863–874.
|
-
[34]  |
Hassard, B., Kazarino, D. and Wan, Y. (1981), Theory and Applications of Hopf Bifurcation, Cambridge University Press: Cambridge.
|