Advanced search
Publication Cover
International Journal of Control Volume 91, 2018 - Issue 11: Special Issue dedicated to Alexander Poznyak on the occasion of his 70th birthday GUEST Editors Vladimir Kharitonov & Vadim Utkin
Submit an article Journal homepage
243
Views
12
CrossRef citations to date
0
Altmetric
Original Articles

Design of fractional-order hyperchaotic systems with maximum number of positive lyapunov exponents and their antisynchronisation using adaptive control

Manashita BorahDepartment of Electrical Engineering, Tezpur University, Tezpur, India, 784028;Department of Electrical Engineering, National Institute of Technology, Silchar, India, 788010
&
Binoy Krishna RoyDepartment of Electrical Engineering, National Institute of Technology, Silchar, India, 788010Correspondence[email protected] [email protected]
Pages 2615-2630 | Received 30 Mar 2016, Accepted 03 Dec 2016, Published online: 29 Dec 2016

References

  • Agrawal, S.K. , & Das, S . (2013). A modified adaptive control method for synchronization of some fractional chaotic systems with unknown parameters. Nonlinear Dyn , 73 , 907–919.
  • Aguila-Camacho, N. , Duarte-Mermoud, M.A. , & Gallegos, J.A . (2014). Lyapunov functions for fractional order systems. Commun Nonlinear Science of Numer Simulat , 19 , 2951–2957.
  • Borah, M. , & Roy, B.K . (in pressa). Dynamics of the fractional-order chaotic PMSG, its stabilisation using predictive control and circuit validation. IET Electric Power Applications . 1–10. doi: 10.1049/iet-epa.2016.0506.
  • Borah, M. , & Roy, B.K. ( in pressb). Hidden attractor dynamics of a novel non-equilibrium fractional-order chaotic system and its synchronisation control. IEEE Indian Control Conference . Guwahati: IIT Guwahati. 4-6th Jan, 2017 (accepted) .
  • Borah, M. , & Roy, B.K. (in pressc). Switching synchronisation control between integer-order and fractional-order dynamics of a chaotic system. IEEE Indian Control Conference . Guwahati: IIT Guwahati. 4-6th Jan, 2017 (accepted) .
  • Borah, M. , Roy, P. , & Roy, B.K . (2016). Synchronisation control of a novel fractional-order chaotic system with hidden attractor. IEEE Students ‘Technology Symposium . Kharagpur: IIT Kharagpur. 30th Sep- 2nd Oct, 2016.
  • Borah, M. , Singh, P.P. , & Roy, B.K . (2016). Improved chaotic dynamics of a fractional order system, its chaos-suppressed synchronisation and circuit implementation. Circuit, Systems and Signal Processing , 35 , 1871–1907.
  • Deng, H. , Li, T. , Wang, Q. , & Li, H . (2009). A fractional-order hyperchaotic system and its synchronization. Chaos, Solitons and Fractals , 41 , 962–969.
  • Diethelm, K. , Ford, N.J. , & Freed, A.D . (2002). A predictor-corrector approach for the numerical solution of fractional differential equations. Nonlinear Dynamics , 29 , 3–22.
  • Gao, Y. , Liang, C. , Wu, Q. , & Yuan, H . (2015). A new fractional-order hyperchaotic system and its modified projective synchronization. Chaos, Solitons & Fractals , 76 , 190–204.
  • Haubold, H.J. , Mathai, A.M. , & Saxena, R.K. (2011). Mittag-leffler functions and their applications. Journal of Applied Mathematics , 2011 , 1–51.
  • Kharitonov, V.L . (2012). On the uniqueness of Lyapunov matrices for a time-delay system. Systems & Control Letters , 61 , 397–402.
  • Li, C. , & Chen, G . (2004). Chaos and hyperchaos in the fractional-order Rossler equations. Physica A , 341 , 55–61.
  • Li, C. , Liao X. , & Yu, J . (2003). Synchronisation of fractional-order chaotic systems. Physical Review E , 68 , 067203-(1-3).
  • Li, C. , Sprott, J.C. , Thio, W. , & Zhu, H . (2014). A New Piecewise Linear Hyperchaotic Circuit. IEEE Transactions on Circuits and Systems—II: Express Briefs , 61 , 977–981.
  • Li, X. , & Wu, R . (2014). Hopf bifurcation analysis of a new commensurate fractional-order hyperchaotic system. Nonlinear Dynamics , 78 , 279–288.
  • Li, Z. , Liu, L. , Dehghan, S. , Chen, Y. , & Xue D . (2016). A review and evaluation of numerical tools for fractional calculus and fractional order controls. International Journal of Control , 1–17, doi: 10.1080/00207179.2015.1124290.
  • Maheri, M. , & Arifin, N.M . (2016). Synchronization of two different fractional-order chaotic systems with unknown parameters using a robust adaptive nonlinear controller. Nonlinear Dynamics , 85 , 825–838.
  • Monje, C.A. , Chen, Y. , Vinagre, B.M. , Xue, D. , & Feliu, V . (2010). Fractional-order systems and controls . London: Springer-Verlag London Limited. (pp. 36–45).
  • Pan, L. , Guan, Z. , & Zhou, L . (2013). Chaos multiscale-synchronization between two different fractional-order hyperchaotic systems based on feedback control. International Journal of Bifurcation and Chaos , 23 , 1350146 (16 pages).
  • Pan, L. , Zhou, L. , & Li, D . (2013). Synchronization of three-scroll unified chaotic system (TSUCS) and its hyper-chaotic system using active pinning control. Nonlinear Dynamics , 73 , 2059–2071.
  • Pan, L. , Zhou, W. , Zhou, L. , & Sun, K . (2011). Chaos synchronization between two different fractional-order hyperchaotic systems. Communications in Nonlinear Science and Numerical Simulation , 16 , 2628–2640.
  • Plestan, F. , Shtessel, Y. , Brégeault, V. , & Poznyak, A . (2010). New methodologies for adaptive sliding mode control. International Journal of Control , 83 , 1907–1919.
  • Shen, C. , Yu, S. , Lü, J. , & Chen, G . (2014). A systematic methodology for constructing hyperchaotic systems with multiple positive lyapunov exponents and circuit implementation. IEEE Transactions on Circuits and Systems—I: Regular papers , 61 , 854–864.
  • Shen, C. , Yu, S. , Lü, J. , & Chen, G . (2015). Constructing hyperchaotic systems at will. International Journal of Circuit Theory and Applications , 43 , 2093–2056.
  • Utkin, V.I. , & Poznyak A.S . (2013). Adaptive sliding mode control, In B. Bandopadhyay, S. Janardhanan & S.K. Spurgeon (Eds.), Advances in sliding mode control (21–53). Berlin- Heidelberg: Springer.
  • Wang, X. , & Song, J . (2009). Synchronization of the fractional order hyperchaos Lorenz systems with activation feedback control. Communications in Nonlinear Science of Numer Simulat , 14 , 3351–3357.
  • Wen, X.J. , Wu, Z.M. , & Lu, J.G . (2008). Stability analysis of a class of nonlinear fractional-order systems. IEEE Transactions on Circuits Syst.-II: Express Briefs , 55 , 1178–1182.
  • Wolf, A. , Swift, J.B. , Swinney, H.L. , & Vastano, J.A . (1985). Determining lyapunov exponents from a time series. Physica D , 16 , 285–317.
  • Xu, Y. , Zhou, W. , Fang, J. , Sun, W. , & Pan, L . (2015). Adaptive synchronization of stochastic time-varying delay dynamical networks with complex-variable systems. Nonlinear Dynamics , 81 , 1717–1726.
  • Yu, S. , & Chen, G . (2012). Anti-control of continuous-time dynamical systems. Communications in Nonlinear Science of Numer Simulat , 17 , 2617–2627.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.