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An efficient numerical scheme and its analysis for the multiterm time‐fractional convection‐diffusion‐reaction equation

Pradip Roul, Vikas Rohil

2023Mathematical Methods in the Applied Sciences13 citationsDOI

Abstract

This article aims at developing a robust numerical method based on graded mesh for solving the multiterm time‐fractional convection‐diffusion‐reaction (TFCDR) equation whose solution very likely exhibits a weak singularity at the initial time. The time‐fractional derivative in the model problem is described in terms of Liouville–Caputo. In order to handle the weak singularity at the initial time, we use a graded mesh technique for discretization of multiterm temporal fractional derivatives. The space derivatives are approximated by means of a compact finite difference (CFD) method. The proposed method is analyzed for its stability and convergence. Two numerical examples are considered to demonstrate the applicability and accuracy of the method. It is shown that the proposed graded mesh technique provides an optimal rate of convergence in time direction for the problem with nonsmooth exact solution, while the method on the uniform mesh yields a nonoptimal rate of convergence.

Topics & Concepts

DiscretizationMathematicsConvergence (economics)Rate of convergenceSingularityStability (learning theory)Fractional calculusMathematical analysisDiffusionConvection–diffusion equationTime derivativeNumerical analysisReaction–diffusion systemApplied mathematicsPhysicsComputer scienceThermodynamicsComputer networkEconomicsMachine learningChannel (broadcasting)Economic growthFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsNonlinear Differential Equations Analysis