Numerical Approximation of Spatially Loaded Time-Fractional Diffusion Equation
-
Published:2024
Issue:12
Volume:58
Page:89-94
-
ISSN:2405-8963
-
Container-title:IFAC-PapersOnLine
-
language:en
-
Short-container-title:IFAC-PapersOnLine
Author:
Kumari Shweta,Mehra Mani
Reference22 articles.
1. Finite-difference methods for solving loaded parabolic equations;Abdullayev;Computational Mathematics and Mathematical Physics,2016
2. Approach to the numerical solution of optimal control problems for loaded differential equations with nonlocal conditions;Abdullayev;Computational Mathematics and Mathematical Physics,2019
3. Alikhanov, A., Beshtokov, M., and Mehra, M. (2021). The Crank-Nicholson type compact difference scheme for a loaded time-fractional Hallaire’s equation. Fractional Calculus and Applied Analysis.
4. A finite-difference method for solving initial-boundary value problems for loaded differential and integro-differential equations;Bondarev;Differential Equations,2000
5. Diethelm, K. and Freed, A.D. (1999). On the solution of nonlinear fractional-order differential equations used in the modeling of viscoplasticity. In Scientific computing in chemical engineering II, 217–224. Springer.