Abstract
This paper describes multi-switching synchronization schemes between three similar chaotic fractional-order systems. The Rössler fractional system is considered to apply the technique. With multi-switch combination synchronization, two drive system state variables are synchronized with different response system state variables at the same time. The multi-switching combination synchronization of three fractional-order equivalent systems was investigated based on the stability of fractional-order chaotic systems. Appropriate controllers have been configured to synchronize three similar fractional-order chaotic systems. Numerical calculations were carried out in Matlab to support the theoretical argument.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
References
Ayub, K., et al.: Dynamical behavior and reduced-order combination synchronization of a novel chaotic system. Int. J. Dyn. Control 6(3), 1160–1174 (2018)
Azar, A.T., Serrano, F.E.: Fractional order sliding mode PID controller/observer for continuous nonlinear switched systems with PSO parameter tuning. In: International Conference on Advanced Machine Learning Technologies and Applications, pp. 13–22. Springer, Cham (2018)
Caponetto, R.: Fractional Order Systems: Modeling and Control Applications, vol. 72. World Scientific, Hackensack (2010)
Ghoudelbourk, S., Dib, D., Omeiri, A., Azar, A.T.: MPPT control in wind energy conversion systems and the application of fractional control (PI\(^{\upalpha }\)) in pitch wind turbine. Int. J. Model. Identif. Control. (IJMIC) 26(2), 140–151 (2016)
Kassim, S., Hamiche, H., Djennoune, S., Bettayeb, M.: A novel secure image transmission scheme based on synchronization of fractional-order discrete-time hyperchaotic systems. Nonlinear Dyn. 88(4), 2473–2489 (2017)
Khan, A., Shikha: Robust adaptive sliding mode control technique for combination synchronisation of non-identical time delay chaotic systems. Int. J. Model. Ident. Control 31(3), 268–277 (2019)
Khan, A., Singh, S., Azar, A.T.: Combination-combination anti-synchronization of four fractional order identical hyperchaotic systems. In: Hassanien, A.E., Azar, A.T., Gaber, T., Bhatnagar, R., F. Tolba, M. (eds.) The International Conference on Advanced Machine Learning Technologies and Applications (AMLTA2019), pp. 406–414. Springer, Cham (2020)
Khan, A., Singh, S., Azar, A.T.: Synchronization between a novel integer-order hyperchaotic system and a fractional-order hyperchaotic system using tracking control. In: Hassanien, A.E., Azar, A.T., Gaber, T., Bhatnagar, R., F. Tolba, M. (eds.) The International Conference on Advanced Machine Learning Technologies and Applications (AMLTA2019), pp. 382–391. Springer, Cham (2020)
Khan, A., et al.: Combination synchronization of time-delay chaotic system via robust adaptive sliding mode control. Pramana 88(6), 91 (2017)
Khan, A., et al.: Combination synchronization of Genesio time delay chaotic system via robust adaptive sliding mode control. Int. J. Dyn. Control 6(2), 758–767 (2018)
Li, C., Chen, G.: Chaos and hyperchaos in the fractional-order Rössler equations. Physica A 341, 55–61 (2004)
Lyapunov, A.M.: The general problem of the stability of motion. Int. J. Control 55(3), 531–534 (1992)
Machado, J.T., Kiryakova, V., Mainardi, F.: Recent history of fractional calculus. Commun. Nonlinear Sci. Numer. Simul. 16(3), 1140–1153 (2011)
Magin, R.L.: Fractional Calculus in Bioengineering. Begell House Publishers, Redding (2006)
Ouannas, A., Grassi, G., Azar, A.T., Singh, S.: New control schemes for fractional chaos synchronization. In: International Conference on Advanced Intelligent Systems and Informatics, pp 52–63. Springer, Cham (2018)
Pano-Azucena, A.D., de Jesus Rangel-Magdaleno, J., Tlelo-Cuautle, E., de Jesus Quintas-Valles, A.: Arduino-based chaotic secure communication system using multi-directional multi-scroll chaotic oscillators. Nonlinear Dyn. 87(4), 2203–2217 (2017)
Podlubny, I.: Fractional Differential Equations: An Introduction to Fractional Derivatives, Fractional Differential Equations, to Methods of Their Solution and Some of Their Applications, vol. 198. Elsevier, Amsterdam (1998)
Prajapati, N., Khan, A., Khattar, D.: On multi switching compound synchronization of non identical chaotic systems. Chin. J. Phys. 56(4), 1656–1666 (2018)
Runzi, L., Yinglan, W.: Finite-time stochastic combination synchronization of three different chaotic systems and its application in secure communication. Chaos Interdisc. J. Nonlinear Sci. 22(2), 023109 (2012)
Runzi, L., Yinglan, W., Shucheng, D.: Combination synchronization of three classic chaotic systems using active backstepping design. Chaos Interdisc. J. Nonlinear Sci. 21(4), 043114 (2011)
Singh, S., Azar, A.T., Ouannas, A., Zhu, Q., Zhang, W., Na, J.: Sliding mode control technique for multi-switching synchronization of chaotic systems. In: 9th International Conference on Modelling, Identification and Control (ICMIC), pp. 880–885. IEEE (2017)
Singh, S., Azar, A.T., Bhat, M.A., Vaidyanathan, S., Ouannas, A.: Active control for multi-switching combination synchronization of non-identical chaotic systems. In: Advances in System Dynamics and Control, pp. 129–162. IGI Global (2018)
Singh, S., Azar, A.T., Vaidyanathan, S., Ouannas, A., Bhat, M.A.: Multiswitching synchronization of commensurate fractional order hyperchaotic systems via active control. In: Mathematical Techniques of Fractional Order Systems, pp. 319–345. Elsevier (2018)
Singh, S., Azar, A.T., Zhu, Q.: Multi-switching master-slave synchronization of non-identical chaotic systems. In: Innovative Techniques and Applications of Modelling, Identification and Control, pp. 321–330. Springer (2018)
Ucar, A., Lonngren, K.E., Bai, E.W.: Multi-switching synchronization of chaotic systems with active controllers. Chaos, Solitons Fractals 38(1), 254–262 (2008)
Vaidyanathan, S., Azar, A.T., Rajagopal, K., Sambas, A., Kacar, S., Cavusoglu, U.: A new hyperchaotic temperature fluctuations model, its circuit simulation, FPGA implementation and an application to image encryption. Int. J. Simul. Process Model. 13(3), 281–296 (2018)
Author information
Authors and Affiliations
Corresponding author
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2020 Springer Nature Switzerland AG
About this paper
Cite this paper
Singh, S., Azar, A.T. (2020). Multi-switching Combination Synchronization of Fractional Order Chaotic Systems. In: Hassanien, AE., Azar, A., Gaber, T., Oliva, D., Tolba, F. (eds) Proceedings of the International Conference on Artificial Intelligence and Computer Vision (AICV2020). AICV 2020. Advances in Intelligent Systems and Computing, vol 1153. Springer, Cham. https://doi.org/10.1007/978-3-030-44289-7_61
Download citation
DOI: https://doi.org/10.1007/978-3-030-44289-7_61
Published:
Publisher Name: Springer, Cham
Print ISBN: 978-3-030-44288-0
Online ISBN: 978-3-030-44289-7
eBook Packages: Intelligent Technologies and RoboticsIntelligent Technologies and Robotics (R0)