This work is licensed under the Creative Commons Attribution 4.0 International License.
İlhan, E., & Kıymaz, İ. (2020). A generalization of truncated M-fractional derivative and applications to fractional differential equations. Applied Mathematics and Nonlinear Sciences, 5(1), 171-188.Search in Google Scholar
Atangana, A., Akgül, A., & Owolabi, K. M. (2020). Analysis of fractal fractional differential equations. Alexandria Engineering Journal, 59(3), 1117-1134.Search in Google Scholar
Arqub, O. A., & Al-Smadi, M. (2020). Fuzzy conformable fractional differential equations: novel extended approach and new numerical solutions. Soft Computing, 24(16), 12501-12522.Search in Google Scholar
Wu, G. C., Luo, M., Huang, L. L., & Banerjee, S. (2020). Short memory fractional differential equations for new memristor and neural network design. Nonlinear Dynamics, 100(4), 3611-3623.Search in Google Scholar
Khalid, N., Abbas, M., Iqbal, M. K., Singh, J., & Ismail, A. I. M. (2020). A computational approach for solving time fractional differential equation via spline functions. Alexandria Engineering Journal, 59(5), 3061-3078.Search in Google Scholar
Bachir, F. S., Abbas, S. A. I. D., Benbachir, M., & Benchohra, M. (2021). Hilfer-Hadamard fractional differential equations: Existence and attractivity. Advances in the Theory of Nonlinear Analysis and its Application, 5(1), 49-57.Search in Google Scholar
Abro, K. A. (2022). Numerical study and chaotic oscillations for aerodynamic model of wind turbine via fractal and fractional differential operators. Numerical Methods for Partial Differential Equations, 38(5), 1180-1194.Search in Google Scholar
Subashini, R., Jothimani, K., Nisar, K. S., & Ravichandran, C. (2020). New results on nonlocal functional integro-differential equations via Hilfer fractional derivative. Alexandria Engineering Journal, 59(5), 2891-2899.Search in Google Scholar
Touchent, K. A., Hammouch, Z., & Mekkaoui, T. (2020). A modified invariant subspace method for solving partial differential equations with non-singular kernel fractional derivatives. Applied Mathematics and Nonlinear Sciences, 5(2), 35-48.Search in Google Scholar
Vijayakumar, V., & Udhayakumar, R. (2021). A new exploration on the existence of Sobolev‐type Hilfer fractional neutral integro‐differential equations with infinite delay. Numerical Methods for Partial Differential Equations, 37(1), 750-766.Search in Google Scholar
Baleanu, D., Etemad, S., & Rezapour, S. (2020). On a fractional hybrid integro-differential equation with mixed hybrid integral boundary value conditions by using three operators. Alexandria Engineering Journal, 59(5), 3019-3027.Search in Google Scholar
Singh, H. (2021). Numerical simulation for fractional delay differential equations. International Journal of Dynamics and Control, 9(2), 463-474.Search in Google Scholar
Owolabi, K. M., Atangana, A., & Akgul, A. (2020). Modelling and analysis of fractal-fractional partial differential equations: application to reaction-diffusion model. Alexandria Engineering Journal, 59(4), 2477-2490.Search in Google Scholar