https://orcid.org/0000-0001-9832-1424
References
- Alexander, M. E., Summers, A. R., & Moghadas, S. M. (2006). Neimark-Sacker bifurcations in a non-standard numerical scheme for a class of positivity preserving ODEs. Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, 462(2074), 3167–3184.
- Alison, L. H. (2018). Mathematical models of HIV latency. Current Topics in Microbiology and Immunology, 417, 131–156.
- Alshabanat, A., Jleli, M., Kumar, S., & Samet, B. (2020). Generalization of Caputo-Fabrizio fractional derivative and applications to electrical circuits. Frontiers in Physics, 8, 64.
- Anderson, R. M., & May, R. M. (1991). Infectious diseases of humans: Dynamics and control. New York: Oxford University Press.
- Arenas, A. J., Parra, G., & Charpentier, C. M. (2010). A nonstandard numerical scheme of predictor-corrector type for epidemic models. Computers & Mathematics with Applications, 59(12), 3740–3749.
- Baleanu, D., Jleli, M., Kumar, S., & Samet, B. (2020). A fractional derivative with two singular kernels and application to a heat conduction problem. Advances in Difference Equations, 2020, 252.
- Farman, M., Ahmad, A., Akgul, A., & Imtiaz, S. (2020). Analysis and dynamical behavior of fractional order cancer model with vaccine strategy. Mathematical Method in the Applied Sciences. doi:10.1002/mma.6240
- Farman, M., Akgul, A., Baleanu, D., Imtiaz, S., & Ahmad, A. (2020). Analysis of fractional order chaotic financial model with minimum interest rate impact. Fractal and Fractional, 4(3), 43.
- Farman, M., Saleem, M. U., Ahmad, A., & Ahmad, M. O. (2018). Analysis and numerical solution of SEIR epidemic model of measles with non-integer time fractional derivatives by using Laplace adomian decomposition method. Ain Shams Engineering Journal, 9(4), 3391–3397.
- Farman, M., Saleem, M. U., Ahmad, A., Imtiaz, S., Tabassum, M. F., Akram, S., & Ahmad, M. O. (2020). A control of glucose level in insulin therapies for the development of artificial pancreas by Atangana Baleanu fractional derivative. Alexandria Engineering Journal, 59(4), 2639–2648.
- Farman, M., Saleem, M. U., Ahmad, M. O., & Ahmad, A. (2018). Stability analysis and control of glucose insulin glucagon system in human. Chines Journal of Physics, 56(4), 1362–1369.
- Farman, M., Saleem, M. U., Tabassum, M. F., Ahmad, A., & Ahmad, M. O. (2019). A linear control of composite model for glucose insulin glucagon. Ain Shamas Engineering Journal, 10(4), 867–872.
- Fatmawati, H. T. (2016). An optimal treatment control of TB HIV coinfection. International Journal of Mathematics and Mathematical Sciences, 2016, 8261208.
- Gonzalez-Parra, G., Arenas, A. J., & Charpentier, B. M. (2010). Combination of nonstandard schemes and Richard son’s extrapolation to improve the numerical solution of population models. Mathematical and Computer Modelling, 52(7–8), 1030–1036.
- Huang, Y., Wu, H., & Acosta, E. P. (2010). Hierarchical Bayesian inference for HIV dynamic differential equation models incorporating multiple treatment factors. Biometrical Journal, 52(4), 470–486. doi:10.1002/bimj.200900173
- Jordan, P. M. (2003). A nonstandard finite difference scheme for nonlinear heat transfer in a thin finite rod. The Journal of Difference Equations and Applications, 9(11), 1015–1021.
- Kumar, S., Ghosh, S., Lotayif, M. S. M., & Samet, B. (2020). A model for describing the velocity of a particle in Brownian motion by Robotnov function based fractional operator. Alexandria Engineering Journal, 59(3), 1435–1449.
- Kumar, S., Ghosh, S., Samet, B., & Goufo, E. F. D. (2020). An analysis for heat equations arises in diffusion process using new Yang Abdel Aty Cattani fractional operator. Mathematical Methods in the Applied Sciences, 43(9), 6062–6080.
- Kumar, S., Kumar, A., Abbas, S., Al Qurashi, M., & Baleanu, D. (2020). A modified analytical approach with existence and uniqueness for fractional Cauchy reaction–diffusion equations. Advances in Difference Equations, 2020(1), 28.
- Kumar, S., Kumar, A., Odibat, Z., Aldhaifallah, M., & Nisar, K. S. (2020). A comparison study of two modified analytical approach for the solution of nonlinear fractional shallow water equations in fluid flow. AIMS Mathematics, 5(4), 3035–3055.
- Kumar, S., Kumar, R., Agarwal, R. P., & Samet, B. (2020). A study of fractional Lotka Volterra population model using Haar wavelet and Adams Bashforth Moulton methods. Mathematical Methods in the Applied Sciences, 43(8), 5564–5578.
- Kumar, S., Kumar, R., Cattani, C., & Samet, B. (2020). Chaotic behaviour of fractional predator-prey dynamical system. Chaos, Solitons and Fractals, 135, 109811.
- Kumar, S., Nisar, K. S., Kumar, R., Cattani, C., & Samet, B. (2020). A new Rabotnov fractional exponential function based fractional derivative for diffusion equation under external force. Mathematical Methods in the Applied Sciences, 43(7), 4460–4471.
- Lawn, S. D., & Zumla, A. I. (2011). Tuberculosis. Lancet, 378(9785), 57–72.
- Mickens, R. (1994). Nonstandard finite difference models of differential equations. Singapore: World Scientific.
- Mickens, R. (2000). Advances in the applications of nonstandard finite difference schemes. Singapore: World Scientific.
- Mickens, R. E. (2005). Advances in the applications of nonstandard finite difference schemes. Singapore: Wiley-Interscience.
- Mickens, R. E. (2007). Calculation of denominator functions for nonstandard finite difference schemes for differential equations satisfying a positivity condition. Numerical Methods for Partial Differential Equations, 23(3), 672–691.
- Nowak, M. A., & May, R. M. C. (2000). Virus dynamics: Mathematical principles of immunology and virology. New York: Oxford University Press.
- Odibat, Z., & Kumar, S. (2019). A robust computational algorithm of homotopy asymptotic method for solving systems of fractional differential equations. Journal of Computational and Nonlinear Dynamics, 14(8), 081004.
- Raza, A., Farman, M., Akgul, A., Iqbal, S., & Ahmad, A. (2020). Simulation and numerical solution of fractional order ebola virus model with novel technique. Bioengineering Journal, 7(4), 194–207.
- Sadegh, Z., & Miehran, N. A. (2015). Nonstandard finite difference scheme for solving fractional-order model of HIV-1 infection of CD4+ T-cells. Iranian Journal of Mathematical Chemistry, 6(2), 169–184.
- Saleem, M. U., Farman, M., Ahmad, A., Ehsan, H., & Ahmad, M. O. (2020). A Caputo Fabrizio fractional order model for control of glucose in insulin therapies for diabetes. Ain Shamas Engineering Journal. doi:10.1016/j.asej.2020.03.006
- Saleem, M. U., Farman, M., Ahmad, M. O., & Rizwan, M. (2017). A control of artificial human pancreas. Chinese Journal of Physics, 55(6), 2273–2282.
- Saleem, M. U., Farman, M., Rizwan, M., Ahmad, M. O., & Ahmad, A. (2018). Controllability and observability of glucose insulin glucagon systems in human. Chinese Journal of Physics, 56(5), 1909–1916.
- Silva, C. J., & Torres, D. F. M. (2018). Global stability for a HIV/AIDS model. Communications Faculty of Sciences University of Ankara Series, 67(1), 93–101.
- Tahir, M., Inayat, A. S., & Zaman, G. (2019). Prevention strategy for superinfection mathematical model tuberculosis and HIV associated with AIDS. Cogent Mathematics and Statistics, 6, 1637166.
- Veeresha, P., Prakasha, D. G., & Kumar, S. (2020). A fractional model for propagation of classical optical solitons by using nonsingular derivative. Mathematical Methods in the Applied Sciences. doi:10.1002/mma.6335