In this paper, we use Chebyshev polynomials to seek the numerical solution of a class of multi-variable order fractional differential equation (MVODEs) that the fractional derivative is described in the Caputo-Prabhakar sense. Using operational matrices, the original equations are transferred to a system of algebraic equations. By solving the system of equations, the numerical solutions are acquired that this system may be solved numerically using an iterative algorithm. The effectiveness and convergence analysis of the numerical scheme is illustrated through four numerical examples.
Derakhshan, M., & Aminataei, A. (2020). A new approach for solving multi-variable orders differential equations with Prabhakar function. Journal of Mathematical Modeling, 8(2), 139-155. doi: 10.22124/jmm.2020.15702.1380
MLA
MohammadHossein Derakhshan; Azim Aminataei. "A new approach for solving multi-variable orders differential equations with Prabhakar function". Journal of Mathematical Modeling, 8, 2, 2020, 139-155. doi: 10.22124/jmm.2020.15702.1380
HARVARD
Derakhshan, M., Aminataei, A. (2020). 'A new approach for solving multi-variable orders differential equations with Prabhakar function', Journal of Mathematical Modeling, 8(2), pp. 139-155. doi: 10.22124/jmm.2020.15702.1380
VANCOUVER
Derakhshan, M., Aminataei, A. A new approach for solving multi-variable orders differential equations with Prabhakar function. Journal of Mathematical Modeling, 2020; 8(2): 139-155. doi: 10.22124/jmm.2020.15702.1380
)