https://orcid.org/0000-0003-2959-4212
References
- Abdul-Hassan, N. Y., Ali, A. H., & Park, C. (2022). A new fifth-order iterative method free from second derivative for solving nonlinear equations. Journal of Applied Mathematics and Computing, 68(5), 2877–2886. doi:10.1007/s12190-021-01647-1
- Agarwal, P., Attary, M., Maghasedi, M., & Kumam, P. (2020). Solving higher-order boundary and initial value problems via Chebyshev–spectral method: Application in elastic foundation. Symmetry, 12(6), 987. doi:10.3390/sym12060987
- Ali, A. H., & Pales, Z. (2022). Taylor-type expansions in terms of exponential polynomials. Mathematical Inequalities & Applications, 25(4), 1123–1141. doi:10.7153/mia-2022-25-69
- Al-Jawary, M. A., Rahdi, G. H., & Ravnik, J. (2020). Boundary-domain integral method and homotopy analysis method for systems of nonlinear boundary value problems in environmental engineering. Arab Journal of Basic and Applied Sciences, 27(1), 121–133. doi:10.1080/25765299.2020.1728021
- Ascher, U. M., & Petzold, L. R. (1998). Computer methods for ordinary differential equations and differential-algebraic equations. Society for Industrial and Applied Mathematics, Vol. 61. Philadelphia. pp. 1–307.
- Ehiemua, M. E., Agbeboh, G. U., & Ataman, J. O. (2020). On the derivation and implementation of a four-stage harmonic Runge-Kutta scheme for solving initial value problems in ordinary differential equations. Abacus (Mathematics Science Series), 47(1), 311–318.
- Hatun, M., & Vatansever, F. (2016). Differential equation solver simulator for Runge-Kutta methods. Uludağ Üniversitesi Mühendislik Fakültesi Dergisi, 21(1), 145–162.
- Kadum, Z. J., & Abdul-Hassan, N. Y. (2023). New numerical methods for solving the initial value problem based on a symmetrical quadrature integration formula using hybrid functions. Symmetry, 15(3), 631. doi:10.3390/sym15030631
- Kutniv, M. V., Datsko, B. Y., Kunynets, A. V., & Włoch, A. (2020). A new approach to constructing of explicit one-step methods of high order for singular initial value problems for nonlinear ordinary differential equations. Applied Numerical Mathematics, 148, 140–151. doi:10.1016/j.apnum.2019.09.006
- Lin, J., Zhang, Y., & Liu, C. S. (2021). Solving nonlinear third-order three-point boundary value problems by boundary shape functions methods. Advances in Difference Equations, 2021(1), 1–23. doi:10.1186/s13662-021-03288-x
- McLachlan, R. I., & Offen, C. (2019). Symplectic integration of boundary value problems. Numerical Algorithms, 81(4), 1219–1233. doi:10.1007/s11075-018-0599-7
- Olaniyan, A. S., Awe, S. G., & Akanbi, M. A. (2021). Improved third-order runge- kutta methods based on the convex combination. Journal of Mathematical and Computational Science, 3, 410–1413.
- Postawa, K., Szczygieł, J., & Kułażyński, M. (2020). A comprehensive comparison of ODE solvers for biochemical problems. Renewable Energy. 156, 624–633. doi:10.1016/j.renene.2020.04.089
- Ralston, A. (1962). Runge-Kutta methods with minimum error bounds. Mathematics of Computation, 16(80), 431–437. doi:10.1090/S0025-5718-1962-0150954-0
- Ramos, H., & Rufai, M. A. (2018). Third derivative modification of k-step block Falkner methods for the numerical solution of second order initial-value problems. Applied Mathematics and Computation, 333, 231–245. doi:10.1016/j.amc.2018.03.098
- Ramos, H., & Rufai, M. A. (2020). Numerical solution of boundary value problems by using an optimized two-step block method. Numerical Algorithms, 84(1), 229–251. doi:10.1007/s11075-019-00753-3
- Ricardo, H. (2020). A modern introduction to differential equations (2nd ed.). Amsterdam: Academic Press/Elsevier.
- Rizaner, F. B., & Rizaner, A. (2018). Approximate solutions of initial value problems for ordinary differential equations using radial basis function networks. Neural Processing Letters, 48(2), 1063–1071. doi:10.1007/s11063-017-9761-9
- Shiralashetti, S. C., & Kumbinarasaiah, S. (2019). New generalized operational matrix of integration to solve nonlinear singular boundary value problems using Hermite wavelets. Arab Journal of Basic and Applied Sciences, 26(1), 385–396. doi:10.1080/25765299.2019.1646090
- Yun, B. I. (2022). An improved implicit Euler method for solving initial value problems. Journal of the Korean Society for Industrial and Applied Mathematics, 26(3), 138–155.