[Aghababa, M. P. (2014). Chaotic behavior in fractional-order horizontal platform systems and its suppression using a fractional finite-time control strategy. J. Mech. Sci. Technol., 28 (5), 1875-1880.10.1007/s12206-014-0334-9]Search in Google Scholar
[Aghababa, M. P., Borjkhani, M. (2014). Chaotic fractional-order model for muscular blood vessel and its control via fractional control scheme. Complexity, 20 (2), 37-46.10.1002/cplx.21502]Search in Google Scholar
[Airaudo, M., Zanna, L. F. (2012). Interest rate rules, endogenous cycles, and chaotic dynamics in open economies. J. Econ. Dyn. Control, 36, 1566-584.10.1016/j.jedc.2012.06.003]Search in Google Scholar
[Banerjee, S., Mukhopadhyay, S., Amberto Rondoni L. (2012). Multi-image encryption based on synchronization of chaotic lasers and iris authentication. Opt. Laser Eng., 50 (7), 950-957.10.1016/j.optlaseng.2012.02.009]Search in Google Scholar
[Chai, Y. I., Chen, L., Wu, R., Dai, J. (2013). Q-S synchronization of the fractional-order unified system. PRAMANA - Journal of Physics, 80 (3), 449-461.10.1007/s12043-012-0488-x]Search in Google Scholar
[Cortes, F., Elejabarrieta, M. J. (2007). Finite element formulations for transient dynamic analysis in structural systems with viscoelastic treatments containing fractional derivative models. Int. J. Numer. Meth. Eng., 69, 2173-2195.10.1002/nme.1840]Search in Google Scholar
[Faieghi, M. R., Delavari, H. (2012). Chaos in fractional-order Genesio-Tesi system and its synchronization. Commun. Nonlinear Sci. Numer. Simulat., 17 (2), 731-741.10.1016/j.cnsns.2011.05.038]Search in Google Scholar
[Gao, W. (2012). Study on statistical properties of chaotic laser light. Phys. Lett. A, 331 (5), 292-297.]Search in Google Scholar
[Hernandez, R. T., Ramirez, V., Silva, G. I., Diwekar, U. M. (2014). A fractional calculus approach to the dynamic optimization of biological reactive systems. Part I: Fractional models for biological reactions. Chemical Engineering Science, 117, 217-228.10.1016/j.ces.2014.06.034]Search in Google Scholar
[Hosseinalipour, S. M., Tohidi, A., Shokrpour, M., Nouri, N. M. (2013). Introduction of a chaotic dough mixer. Part A: mathematical modeling and numerical simulation, J. Mech. Sci. Technol., 27 (5), 1329-1339.]Search in Google Scholar
[Kareem, S. O., Ojo, K. S., Njah, A. N. (2012). Function projective synchronization of identical and non-identical modified finance and Shimizu- Morioka systems. PRAMANA - Journal of Physics, 79 (1), 71-79.10.1007/s12043-012-0281-x]Search in Google Scholar
[Kupka, J. (2014). Some chaotic and mixing properties of fuzzified dynamical systems, Inf. Sci., 279, 642-653.]Search in Google Scholar
[Li, R., Chen, W. (2014). Lyapunov-based fractional-order controller design to synchronize a class of fractional-order chaotic systems. Nonlinear Dyn., 76 (1), 785-795.10.1007/s11071-013-1169-0]Search in Google Scholar
[Li, C., Tong, Y. (2013). Adaptive control and synchronization of a fractional- order chaotic system, PRAMANA - Journal of Physics, 80 (4), 583-592.10.1007/s12043-012-0500-5]Search in Google Scholar
[Matignon, D. (1996). Stability results for fractional differential equations with applications to control processing. In: IEEE-SMC Proceedings of the Computational Engineering in Systems and Application Multiconference. IMACS, Lille, France, Vol. 2, pp. 963-968.]Search in Google Scholar
[Monje, C. A., Chen, Y., Vinagre, B. M., Xue, D., Feliu, V. (2010). Fractional- order Systems and Controls. Springer. 2010. 415 pp.10.1007/978-1-84996-335-0]Search in Google Scholar
[Muthukumar, P., Balasubramaniam, P., Ratnavelu, K. (2015). Fast projective synchronization of fractional order chaotic and reverse chaotic systems with its application to an affine affine cipher using date of birth (DOB). Nonlinear Dynamics, 80 (4), 1883-1897.10.1007/s11071-014-1583-y]Search in Google Scholar
[Padula, F., Visioli, A. (2014). Inversion-based feedforward and reference signal design for fractional constrained control systems. Automatica, 50 (8), 2169-2178.10.1016/j.automatica.2014.06.007]Search in Google Scholar
[Pai, M. C. (2014). Global synchronization of uncertain chaotic systems via discrete-time sliding mode control. Appl. Math. Comput., 227 (15), 663-671.10.1016/j.amc.2013.11.075]Search in Google Scholar
[Pakzad, M. A., Pakzad, S., Nekoui, M. A. (2013). Stability analysis of time-delayed linear fractional-order systems. Int. J. Control Autom. Syst., 11 (3), 519-525.10.1007/s12555-012-0164-4]Search in Google Scholar
[Pan, I., Korre, A., Das, S., Durucan, S. (2012). Chaos suppression in a fractional order financial system using intelligent regrouping PSO based fractional fuzzy control policy in the presence of fractional Gaussian noise. Nonlinear Dyn., 70 (4), 2445-2461.10.1007/s11071-012-0632-7]Search in Google Scholar
[Provata, A., Katsaloulis, P., Verganelakis, D. A. (2012). Dynamics of chaotic maps for modelling the multifractal spectrum of human brain Diffusion Tensor Images. Chaos Solitons Fractals, 45, 174-180.10.1016/j.chaos.2011.11.009]Search in Google Scholar
[Sarbaz, Y., Towhidkhah, F., Jafari, A., Gharibzadeh, S. (2012). Do the chaotic features of gait change in Parkinson’s disease? J. Theor. Biol., 307, 160-167.10.1016/j.jtbi.2012.04.03222588024]Search in Google Scholar
[Srivastava, M., Ansari, S. P., Agrawal, S. K., Das, S., Leunga Y. T. (2014). Anti-synchronization between identical and non-identical fractional-order chaotic systems using active control method. Nonlinear Dyn.,76 (2), 905-914.10.1007/s11071-013-1177-0]Search in Google Scholar
[Tripathy, M. C., Mondal, D., Biswas, K., Sen, S. (2015a). Design and performance study of phase-locked loop using fractional-order loop filter. Int. J. Circ. Theor. Appl., 43 (6), 776-792.10.1002/cta.1972]Search in Google Scholar
[Tripathy, M. C., Mondal, D., Biswas, K., Sen, S. (2015b). Experimental studies on realization of fractional inductors and fractional-order bandpass filters. Int. J. Circ. Theor. Appl., 43 (9), 1183-1196.10.1002/cta.2004]Search in Google Scholar
[Wang, J. R., Li, X. (2014). Periodic BVP for integer/fractional order nonlinear differential equations with non-instantaneous impulses. J. Appl. Math. Comput., 46 (1), 321-334.10.1007/s12190-013-0751-4]Search in Google Scholar
[Xiao, X., Zhou, L., Zhang, Z. (2014). Synchronization of chaotic Lur’e systems with quantized sampled-data controller. Commun. Nonlinear Sci. Numer. Simulat., 19 (6), 2039-2047.10.1016/j.cnsns.2013.10.020]Search in Google Scholar
[Yin, C., Dadras, S., Zhong, S., Chen, Y. Q. (2013). Control of a novel class of fractional-order chaotic systems via adaptive sliding mode control approach. Appl. Math. Modelling, 37 (4), 2469-2483.10.1016/j.apm.2012.06.002]Search in Google Scholar
[Zhang, L., Yan, Y. (2014). Robust synchronization of two different uncertain fractional-order chaotic systems via adaptive sliding mode control. Nonlinear Dyn., 76 (3), 1761-1767.10.1007/s11071-014-1244-1]Search in Google Scholar