References
- M. Babalola, B. Iyorzor, and I. Odesanya, Chaos control of a modified 4-d memristor chaotic oscillator via passive control technique, Niger. J. Technol. 37 (2018), pp. 480.
- S. Dai and D. Schaeffer, Chaos for cardiac arrhythmias through a one-dimensional modulation equation for alternans, Chaos 20 (2010), pp. 1–8.
- W. Ding, F. Liu, H. Chen, N. Wang, and D. Liang, Sliding mode control of fractional-order delayed memristive chaotic system with uncertainty and disturbance, Commun. Theor. Phys. 68(6) (2017), pp. 741.
- L. Dzyubak, O. Dzyubak, and J. Awrejcewicz, Controlling and stabilizing unpredictable behavior of metabolic reactions and carcinogenesis in biological systems, Nonlinear Dyn. 97(3) (2019), pp. 1853–1866.
- R. Eftimie, C.K. Macnamara, J. Dushoff, J.L. Bramson, and D.J.D Earn, Bifurcations and chaotic dynamics in a tumour-immune-virus system, Math. Model. Nat. Phenom. 11(5) (2016), pp. 65–85.
- M. Feki, Sliding mode based control and synchronization of chaotic systems in presence of parametric uncertainties, Appl. Slid. Mode Control Sci. Eng. 709 (2017), pp. 35–59.
- J.M.V. Grzybowski, E.E.N. Macau, and T. Yoneyama, Isochronal synchronization of time delay and delay-coupled chaotic systems, J. Phys. A: Math. Theor. 44(17) (2011), pp. 1–16.
- D. Guegan, Chaos in economics and finance, Annu. Rev. Control 33(1) (2009), pp. 89–93.
- R. Guo, U.E. Vincent, and B.A. Idowu, Synchronization of chaos in RCL-shunted josephson junction using a simple adaptive controller, Phys. Scr. 79(3) (2009), pp. 1–6.
- S. Hadhrami, A. Saaban, A. Ibrahim, M. Shahzad, and I. Ahmad, Linear active control algorithm to synchronize a nonlinear hiv/aids dynamical system, Asian J. Appl. Sci. Eng. 3 (2014), pp. 96–113.
- R. Klages, Chaos: A very short introduction, J. Phys. A: Math. Theor. 40(29) (2007), pp. 8604–8605.
- R.K. Maddali, D. Ahluwalia, A. Chaudhuri, and S. Sarif Hassan, Dynamics of a three dimensional chaotic cancer model, Int. J. Math. Trends Technol. 53(5) (2018), pp. 353–368.
- G.M. Mahmoud, M.A. Al-Kashif, and A.A. Farghaly, Chaotic and hyperchaotic attractors of a complex nonlinear system, J. Phys. A: Math. Theor. 41(5) (2008), pp. 1–12.
- J. Malinzi, A. Eladdadi, and P. Sibanda, Modelling the spatiotemporal dynamics of chemovirotherapy cancer treatment, J. Biol. Dyn. 11(1) (2017), pp. 244–274.
- J. Malinzi, R. Ouifki, A. Eladdadi, D.F.M Torres, and K.A. White, Enhancement of chemotherapy using oncolytic virotherapy: mathematical and optimal control analysis, Math. Biosci. Eng. 15(2) (2018), pp. 1435.
- M. Marwan and S. Ahmad, Bifurcation analysis for energy transport system and its optimal control using parameter self-tuning law, Soft. Comput. 24 (2020), pp. 17221–17231.
- M. Marwan, S. Ahmad, M. Aqeel, and M. Sabir, Control analysis of rucklidge chaotic system, J. Dyn. Syst. Meas. Control 141(4) (2019), pp. 1–7.
- S. Moon, J.M. Seo, B.-S. Han, J. Park, and J.-J. Baik, A physically extended lorenz system, Chaos: Interdiscip. J. Nonlinear Sci. 29(6) (2019), pp. 1–12.
- L. Moysis, E. Petavratzis, M. Marwan, C. Volos, H. Nistazakis, and S. Ahmad, Analysis, synchronization, and robotic application of a modified hyperjerk chaotic system, Complexity 2020 (2020), pp. 1–15.
- T. Prosen, Chaos and complexity of quantum motion, J. Phys. A: Math. Theor. 40(28) (2007), pp. 7881–7918.
- M. Sabir, M. Marwan, S. Ahmad, M. Fiaz, and F. Khan, Observer and descriptor satisfying incremental quadratic constraint for class of chaotic systems and its applications in a quadrotor chaotic system, Chaos, Solit. Fractals 137 (2020), pp. 1–13.
- M. Saleem, T. Agrawal, and A. Anees, A study of tumour growth based on stoichiometric principles: a continuous model and its discrete analogue, J. Biol. Dyn. 8(1) (2014), pp. 117–134.
- M. Shahzad, Chaos control in three dimensional cancer model by state space exact linearization based on lie algebra, Mathematics 4 (2016), pp. 33.
- B.N. Soufiani and M.U. Salamci, Chaotic behavior in virotherapy for cancer treatment, Int. Conf. Inf. Commun. Autom. Technol. (2017), pp. 1–6.
- S. Vaidyanathan, Adaptive control of a chemical chaotic reactor, Int. J. PharmTech Res. 8(3) (2015), pp. 377–382.
- H.C. Wei, A mathematical model of tumour growth with Beddington-Deangelis functional response: a case of cancer without disease, J. Biol. Dyn. 12(1) (2018), pp. 194–210.