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A finite difference method on uniform meshes for solving the time-space fractional advection-diffusion equation

Allaoua Boudjedour, Iqbal M. Batiha, Selma Boucetta, Mohamed Dalah, Khaled Zennir, Adel Ouannas

2025Gulf Journal of Mathematics8 citationsDOIOpen Access PDF

Abstract

In order to investigate linear time and spatial fractional advection equations, we present a finite difference scheme (FDS) in this paper. The fractional Taylor series method for u at tj+1 and xi+1 is used to approximate the fractional derivatives. First, we construct our numerical scheme (NS) for the mathematical model. In the second part, we study the stability and convergence of our numerical scheme. Finally, the numerical simulations of the fractional advection equation, using the FDM, is plotted for several values of fractional parameters α and ν. It will be shown that the convergence is achieved properly which confirms the effectiveness of the proposed algorithm.

Topics & Concepts

Polygon meshAdvectionDiffusionFinite difference methodDiffusion equationSpace (punctuation)MathematicsConvection–diffusion equationMathematical analysisApplied mathematicsPhysicsComputer scienceGeometryThermodynamicsEngineeringOperating systemMetric (unit)Operations managementFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsNumerical methods for differential equations
A finite difference method on uniform meshes for solving the time-space fractional advection-diffusion equation | Litcius