References
- Li R-G, Wu H-N. Secure communication on fractional-order chaotic systems via adaptive sliding mode control with teaching–learning–feed back-based optimization. Nonlinear Dyn. 2019;95(2):1221–1243. doi: 10.1007/s11071-018-4625-z
- Djennoune S, Bettayeb M, Al-Saggaf UM. Synchronization of fractional–order discrete–time chaotic systems by an exact delayed state reconstructor: application to secure communication. Int J Appl Math Comput Sci. 2019;29(1):179–194. doi: 10.2478/amcs-2019-0014
- Addabbo T, Ada F, Marco M, et al., “Piecewise linear chaotic maps in current mode CMOS circuits: nonlinear distortion analysis.” In 2019 IEEE International Symposium on Circuits and Systems (ISCAS), Sapporo, Japan, pp. 1–5, 2019.
- Zang X, Iqbal S, Zhu Y, et al. Applications of chaotic dynamics in robotics. Int J Adv Rob Syst. 2016;13(2):17. doi: 10.5772/62796
- Zouad F, Karim K, Hamid H. A new secure communication scheme using fractional order delayed chaotic system: design and electronics circuit simulation. Analog Integr Circ Sig Process. 2019;99(3):619–632. doi: 10.1007/s10470-018-01382-x
- Roy A, AP M, Banerjee S. Chaos-based image encryption using vertical-cavity surface-emitting lasers. Optik. 2019;176:119–131. doi: 10.1016/j.ijleo.2018.09.062
- Liu H, Zhang Y, Kadir A, et al. Image encryption using complex hyper chaotic system by injecting impulse into parameters. Appl Math Comput. 2019;360:83–93. doi: 10.1016/j.amc.2019.04.078
- Monje CA, Chen YQ, Vinagre BM, et al. Fractional-order systems, fundamentals and applications. London: Springer; 2010. doi: 10.1007/978-1-84996-335-0
- Mainardi F. AN HISTORICAL PERSPECTIVE ON FRACTIONAL CALCULUS IN LINEAR VISCOELASTICITY. Fractional Calculus Appl Anal. 2012;15(4):712–717. doi: 10.2478/s13540-012-0048-6
- Pintelon R, Schoukens J, Pauwels L, et al., “Diffusion systems: stability, modeling, and identification,” IEEE TRANSACTIONS ON INSTRUMENTATION AND MEASUREMENT, vol. 54, p. 7, 2005.
- Liu H-Y, He J-H, Li Z-B, et al. Fractional calculus for nanoscale flow and heat transfer. Int J Numer Methods Heat Fluid Flow. 2014;24(6):1227–1250. doi: 10.1108/HFF-07-2013-0240
- Magin RL. Fractional calculus models of complex dynamics in biological tissues. Comput Math Appl. 2010;59(5):1586–1593. doi: 10.1016/j.camwa.2009.08.039
- Ahmad I, Shafiq M. Synchronization control of externally disturbed chaotic spacecraft in pre-assigned settling time. Proc Inst Mech Eng Part I J Syst Control Eng. 2021;236(1):87–106. doi: 10.1177/09596518211018878
- Lu JG. Chaotic dynamics of the fractional-order Lü system and its synchronization. Phys Lett A. 2006;354(4):305–311. doi: 10.1016/j.physleta.2006.01.068
- Li T, Wang Y, Yang Y. Synchronization of fractional-order hyperchaotic systems via fractional-order controllers. Discrete Dyn Nat Soc. 2014;2014:1–14. doi: 10.1155/2014/408972
- Jia H, Tao Q, Chen Z. Analysis and circuit design of a fractional-order Lorenz system with different fractional orders. Systems Science & Control Engineering. 2014;2:745–750. doi: 10.1080/21642583.2014.886310 1
- He S, Sun K, Wang H. Complexity analysis and DSP implementation of the fractional-order Lorenz hyperchaotic system. Entropy. 2015;17(12):8299–8311. doi: 10.3390/e17127882
- Abolhassan R, Vahid JM, Dumitru B. Chaotic incommensurate fractional order Rössler system: Active control and synchronization. Adv Differ Equ. 2011;2011(1):12. doi: 10.1186/1687-1847-2011-15
- Cafagna D, Grassi G. Observer-based projective synchronization of fractional systems via a scalar signal: application to hyperchaotic Rössler systems. Nonlinear Dyn. 2012;68(1–2):117–128. doi: 10.1007/s11071-011-0208-y
- Yadav VK, Agrawal SK, Mishra V, et al. Hybrid synchronization of fractional order hyper chaotic Chen and Lu systems using active control method. Int J Appl Inf Syst. 2015;2:5. https://www.ijais.org/proceedings/icwccv2015/number2/798-1566
- Pecora LM, Carroll TL. Synchronization of chaotic systems. Chaos. 2015;25(9):11. doi: 10.1063/1.4917383
- Meng F, Zeng X, Wang Z. Impulsive anti-synchronization control for fractional-order chaotic circuit with memristor. Indian J Phys. 2019;93(9):1187–1194. doi: 10.1007/s12648-019-01386-x
- Chithra A, Mohamed IR. Synchronization and chaotic communication in nonlinear circuits with nonlinear coupling. Comput Electron. 2017;16(3):833–844. doi: 10.1007/s10825-017-1013-8
- Aziz M, Al-Azzawi SF. Three important phenomena of chaos synchronization between two different hyperchaotic systems via adaptive control method. Theor Appl Math. 2016;3(1):7. doi: 10.11648/j.ijtam.20170301.16
- Ahmad I, Shafiq M. Oscillation free robust adaptive synchronization of chaotic systems with parametric uncertainties. Trans Inst Meas Control. 2020;42(11):1977–1996. doi:10.1177/0142331220903668
- Dongmo ED, Ojo KS, Woafo P, et al. Difference Synchronization of identical and non-identical Chaotic and hyperchaotic systems of different orders using active backstepping design. Comput Nonlinear Dyn. 2018;13(5):9. doi: 10.1115/1.4039626
- Ouannas A, Abdelmalek S, Bendoukha S. Coexistence of some chaos synchronization types in fractional-order differential equations. Electron J Differ Equations. 2017;2017:15.
- Liu H, Chen Y, Li G, et al. Adaptive fuzzy synchronization of fractional-order chaotic (hyperchaotic) systems with input saturation and unknown parameters. Complexity. 2017;2017:1–16. doi: 10.1155/2017/6853826
- Mohadeszadeh M, Delavari H. Synchronization of fractional-order hyper-chaotic systems based on a new adaptive sliding mode contro. Int J Dyn Control. 2017;5(1):124–134. doi: 10.1007/s40435-015-0177-y
- Mahmoud GM, Mahmoud EE, Ahmed ME. On the hyperchaotic complex Lü system. Nonlinear Dynamic. 2009;58(4):725–738. doi: 10.1007/s11071-009-9513-0
- Singh S. Single input sliding mode control for hyperchaotic Lu system with parameter uncertainty. Int J Dyn Control. 2016;4(4):504–514. doi: 10.1007/s40435-015-0167-0
- Yadav VK, Shukla VK, Srivastava M, et al. Stability analysis, control of simple chaotic system and its hybrid projective synchronization with fractional lu system. J Appl Nonlinear Dyn. 2020;9(1):93–107. doi: 10.5890/JAND.2020.03.008
- Singh P, Roy B. Comparative performances of synchronisation between different classes of chaotic systems using three control techniques. Annu Rev Control. 2018;45:152–165. doi: 10.1016/j.arcontrol.2018.03.003
- Deepika D, Kaur S, Narayan S. Uncertainty and disturbance estimator based robust synchronization for a class of uncertain fractional chaotic system via fractional order sliding mode control. Chaos, Solitons & Fractals. 2018;115:196–203. doi: 10.1016/j.chaos.2018.07.028
- Afzal H, Rafiq Mufti M, Din SU, et al. Modeling and inverse complex generalized synchronization and parameter identification of non-identical nonlinear complex systems using adaptive integral sliding mode control. IEEE Access. 2020;8:38950–38969. doi: 10.1109/ACCESS.2020.2974863
- Takhi H, Kemih K, Moysis L, et al. Passivity based control and synchronization of perturbed uncertain chaotic systems and their microcontroller implementation. Int J Dynam Control. 2020;8(3):973–990. doi: 10.1007/s40435-020-00618-x
- Chena A, Lu J, Lü J, et al. Generating hyperchaotic Lü attractor via state feedback control. Phys A Stat Mech Appli. 2006;364:103–110. doi:10.1016/j.physa.2005.09.039
- Sabir M, Sudheer S. Hybrid synchronization of hyperchaotic Lu system. Pramana. 2009;73(4):781–786. doi: 10.1007/s12043-009-0145-1
- Singh S, Han S, Lee S. Adaptive single input sliding mode control for hybrid-synchronization of uncertain hyperchaotic Lu systems. J Franklin Inst. 2021;358(15):1–28. doi: 10.1016/j.jfranklin.2021.07.037