https://orcid.org/0000-0003-4335-6990
References
- B. Ahmad, M. Alghanmi, A. Alsaedi, and S.K. Ntouyas, Multi-Term fractional differential equations with generalized integral boundary conditions, Fractal Fract. 3(3) (2019), pp. 44.
- A.H. Bhrawy, T.M. Taha, and J.A.T. Machado, A review of operational matrices and spectral techniques for fractional calculus, Nonlinear Dyn. 81 (2015), pp. 1023–1052.
- A. Daşcıoğlu and D. Varol, Laguerre polynomial solutions of linear fractional integro-differential equations, Math. Sci. 15 (2021), pp. 47–54.
- K. Diethelm and N.J. Ford, Numerical solution of the Bagley-Torvik equation, BIT Numer. Math. 42 (2002), pp. 490–507.
- E.H. Doha, A.H. Bhrawy, and S.S. Ezz-Eldien, A new Jacobi operational matrix: An application for solving fractional differential equations, Appl. Math. Modell. 36 (2012), pp. 4931–4943.
- D. Dominici, Orthogonality of the Dickson polynomials of the (k+1)th kind, Rev. Un. Mat. Argentina 62(1) (2021), pp. 1–30.
- E. Hashemizadeh and M.A. Ebadi, A numerical solution by alternative Legendre polynomials on a model for novel coronavirus (COVID-19), Adv. Differ. Equ. 2020 (2020), pp. 527.
- J. Hou and C. Yang, Numerical solution of fractional-order Riccati differential equation by differential quadrature method based on Chebyshev polynomials, Adv. Differ. Equ. 365 (2017), pp. 2017.
- B. Jiny, B. Liz, and Z. Zhou, Correction of high-order BDF convolution quadrature for fractional evolution equations, SIAM J. Sci. Comput. 39(6) (2017), pp. A3129–A3152.
- A.A. Kilbas, H.M. Srivastava, and J.J. Trujillo, Theory and Applications of Fractional Differential Equations, Elsevier, San Diego, 2006.
- D. Kumar and J. Singh, Fractional Calculus in Medical and Health Science, Boca Raton, CRC Press, 2021.
- S. Kumar, F.G. Aguilar, J.E. Lavın-Delgado, and D. Baleanu, Derivation of operational matrix of Rabotnov fractional-exponential kernel and its application of fractional Lienard equation, Alexandria Eng. J. 59(5) (2020), pp. 2991–2997.
- Ö.K. Kürkçü, E. Aslan, M. Sezer, and O. İlhan, A numerical approach technique for solving generalized delay integro-differential equations with functional bounds by means of Dickson polynomials, Int. J. Comput. Methods 15(5) (2018), p. 1850039.
- X. Li, Numerical solution of fractional differential equations using cubic B-spline wavelet collocation method, Commun. Nonlinear Sci. Numer. Simul. 17(10) (2012), pp. 3934–3946.
- D. Li, H.L. Liao, W. Sun, J. Wang, and J. Zhang, Analysis of L1-Galerkin FEMs for time-fractional nonlinear parabolic problems, Commun. Comput. Phys. 24(1) (2018), pp. 86–103.
- D. Li, C. Wu, and Z. Zhang, Linearized Galerkin FEMs for nonlinear time fractional parabolic problems with non-smooth solutions in time direction, J. Sci. Comput. 80 (2019), pp. 403–419.
- D. Li, W. Sun, and C. Wu, A novel numerical approach to time-fractional parabolic equations with nonsmooth solutions, Numer. Math. Theor. Meth. Appl. 14 (2021), pp. 355–376.
- R. Lidl, G.L. Mullen, and G. Turnwald, Dickson Polynomials, Longman Scientific and Technical, Essex, 1993.
- Y. Lin and C. Xu, Finite difference/spectral approximations for the time-fractional diffusion equation, J. Comput. Phys. 225(2) (2007), pp. 1533–1552.
- D. Luo, J.R. Wang, and M. Feckan, Applying fractional calculus to analyze economic growth modelling, JAMSI 14(1) (2018), pp. 25–36.
- A.M. Nagy and A.A. El-Sayed, An accurate numerical technique for solving two-dimensional time fractional order diffusion equation, Int. J. Model. Simul. 39(3) (2019), pp. 214–221.
- A.M. Nagy, N.H. Sweilam, and A.A. El-Sayed, New operational matrix for solving multi-term variable order fractional differential equations, J. Comput. Nonlinear Dynam. 13 (2018), pp. 011001–011007.
- Z. Odibat and S. Momani, The variational iteration method: an efficient scheme for handling fractional partial differential equations in fluid mechanics, Comput. Math. Appl. 58 (2009), pp. 2199–2208.
- Z.M. Odibat and N.T. Shawagfeh, Generalized Taylor's formula, Appl. Math. Comput. 186 (2007), pp. 286–293.
- K.M. Owolabi, Numerical simulation of fractional-order reaction–diffusion equations with the Riesz and Caputo derivatives, Neural. Comput. Applic. 32 (2020), pp. 4093–4104.
- S.I. Pakchin, M. Lakestani, and H. Kheiri, Numerical approach for solving a class of nonlinear fractional differential equation, Bull. Iranian Math. Soc. 42(5) (2016), pp. 1107–1126.
- I. Podlubny, Fractional Differential Equations, Academic Press, San Diego, 1999.
- Y.Z. Povstenko, Signaling problem for time-fractional diffusion-wave equation in a half-space in the case of angular symmetry, Nonlinear Dyn. 55 (2010), pp. 593–605.
- A. Saadatmandi and M. Dehghan, A new operational matrix for solving fractional-order differential equations, Comput. Math. Appl. 59(3) (2010), pp. 1326–1336.
- A. Saadatmandi, A. Khani, and M.R. Azizi, A sinc-Gauss-Jacobi collocation method for solving Volterra's population growth model with fractional order, Tbilisi Math. J. 11(2) (2018), pp. 123–137.
- T. Stoll, Complete Decomposition of Dickson-Type Recursive Polynomials and a Related Diophantine Equation, Formal Power Series and Algebraic Combinatorics, Tianjin, China, 2007.
- H.G. Sun, Y. Zhang, D. Baleanu, W. Chen, and Y.Q. Chen, A new collection of real world applications of fractional calculus in science and engineering, Commun. Nonlinear Sci. Numer. Simul. 64 (2018), pp. 213–231.
- N.H. Sweilam, A.M. Nagy, and A.A. El-Sayed, Numerical approach for solving space fractional order diffusion equations using shifted Chebyshev polynomials of the fourth kind, Turk. J. Math. 40 (2016), pp. 1283–1297.
- N.H. Sweilam, A.M. Nagy, and A.A. El-Sayed, Solving time-fractional order telegraph equation via Sinc–Legendre collocation method, Mediterr. J. Math. 13 (2016), pp. 5119–5133.
- P. Torvik and R. Bagley, On the appearance of the fractional derivative in the behavior of real materials, J. Appl. Mech. 51 (1984), pp. 294–298.
- Q. Wang and J.L. Yucas, Dickson polynomials over finite fields, Finite Fields Appl. 18(4) (2012), pp. 814–831.
- P. Wei, X. Liao, and K-W. Wong, Key exchange based on Dickson polynomials over finite field with 2m, J. Comput. (Taipei) 6(12) (2011), pp. 2546–2551.
- H.Ç. Yaslan, Legendre collocation method for the nonlinear space-time fractional partial differential equations, Iran J. Sci. Technol. Trans. Sci. 44 (2020), pp. 239–249.
- Q. Zhang and T. Li, Asymptotic stability of compact and linear θ-methods for space fractional delay deneralized diffusion equation, J. Sci. Comput. 81(3) (2019), pp. 2413–2446.
- Q. Zhang, M. Chen, Y. Xu, and D. Xu, Compact θ-method for the generalized delay diffusion equation, Appl. Math. Comput. 316 (2018), pp. 357–369.
- Q. Zhang, X. Lin, K. Pan, and Y. Ren, Linearized ADI schemes for two-dimensional space-fractional nonlinear Ginzburg-Landau equation, Comput. Math. Appl. 80 (2020), pp. 1201–1220.
- Q. Zhang, L. Zhang, and H.W. Sun, A three-level finite difference method with preconditioning technique for two-dimensional nonlinear fractional complex Ginzburg-Landau equations, J. Comput. Appl. Math. 389 (2021), p. 113355.