[1] J. Mohapatra, S. P. Mohapatra, A. Nath, An approximation technique for a system of time-fractional differential equations arising in population dynamics, J. Math. Model. 13(3) (2025) 519-531
[2] B. Ghosh, J. Mohapatra, A Comparative Study of Efficient Numerical Schemes for Time-Fractional
Subdiffusion Equation Involving Singularity, Nat. Acad. Sci. Lett. (2024) 1-5.
[3] B. Ghosh, J. Mohapatra, Cubic B-spline based numerical schemes for delayed time-fractional
advection-diffusion equations involving mild singularities, Phys. Scripta 99 (2024) 085-236.
[4] M.H. Heydari, M. Razzaghi, Z. Avazzadeh, Orthonormal piecewise Bernoulli functions: Applica-
tion for optimal control problems generated using fractional integro-differential equations, J. Vib.
Control 29 (2023) 1164-1175.
[5] A. Singh, A. Kanaujiya, J. Mohapatra, Fractional Legendre wavelet approach resolving multi-scale
optimal control problems involving Caputo-Fabrizio derivative, Numer. Algorithms (2024) 1-32.
[6] S. Soradi-Zeid, Efficient radial basis functions approaches for solving a class of fractional optimal
control problems, Comput. Appl. Math. 39 (2020) 20.
[7] M.A. Zaky, A Legendre collocation method for distributed-order fractional optimal control prob-
lems, Nonlinear Dynam. 91 (2018) 2667-2681.
[8] M.H. Heydari, M. Razzaghi, C. Cattani, Fractional Chebyshev cardinal wavelets: application for
fractional quadratic integro-differential equations, Int. J. Comput. Math 100 (2023) 479-496.
[9] S.M. Nosrati, H. Afshari, J. Alzabut, G. Alobaidi, Using fractional Bernoulli Wavelets for solving
fractional diffusion wave equations with initial and boundary conditions, Fractal Fract. 5 (2021)
212.
[10] A. Singh, A. Kanaujiya, J. Mohapatra, Chelyshkov wavelet method for solving multidimensional
variable order fractional optimal control problem, J. Appl. Math. Comput. (2024) 1-26.
[11] R.L. Bagley, P.J. Torvik, On the existence of the order domain and the solution of distributed order
equations-Part I, Nonlinear Dyn. 2 (2000) 865-882.
[12] Z. Li, Y. Luchko, M.M. Yamamoto, Analyticity of solutions to a distributed order time-fractional
diffusion equation and its application to an inverse problem, Comput. Math. Appl. 73 (2017) 1041-
1052.
[13] F. Mainardi, A. Mura, G. Pagnini, R. Gorenflo, Time-fractional diffusion of distributed order, J.
Vib. Control 14 (2008) 1267-1290.
[14] M.A. Iqbal, U. Saeed, S.T. Mohyud-Din, Modified Laguerre wavelets method for delay differential
equations of fractional-order, Egypt. J. Basic Appl. Sci. 2 (2015) 50-54.
[15] S. Sabermahani, Y. Ordokhani, Solving distributed-order fractional optimal control problems via
the Fibonacci wavelet method, J. Vib. Control 30 (2024) 418-432.
[16] S. Mashayekhi, M. Razzaghi, Numerical solution of distributed order fractional differential equa-
tions by hybrid functions, J. Comput. Phys.315 (2016) 169-181.
[17] A. Singh, A. Kanaujiya, J. Mohapatra, Euler wavelets method for optimal control problems of
fractional integro-differential equations, J. Comput. Appl. Math. 454 (2025) 116178.
[18] H. Marasi, M. Derakhshan, A composite collocation method based on the fractional Chelyshkov
wavelets for distributed-order fractional mobile-immobile advection-dispersion equation, Math.
Model. Anal. 27 (2022) 590-609.
[19] A. Alizadeh, S. Effati, An iterative approach for solving fractional optimal control problems, J. Vib.
Control 24 (2018) 18-36.
[20] S.S. Zeid, M. Youse, Approximated solutions of linear quadratic fractional optimal control prob-
lems J. Appl. Math. Stat. Inform. 12 (2016) 8394.
[21] P. Rahimkhani, Y. Ordokhani, Numerical investigation of distributed-order fractional optimal con-
trol problems via Bernstein wavelets, Optim. Control Appl. Methods 42 (2021) 355-373.
[22] I. Malmir, New pure multi-order fractional optimal control problems with constraints: QP and LP
methods, ISA Trans. 153 (2024) 155-190.
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