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On new approximations of Caputo–Prabhakar fractional derivative and their application to reaction–diffusion problems with variable coefficients

Anshima Singh, Sunil Kumar, J. Vigo‐Aguiar

2023Mathematical Methods in the Applied Sciences10 citationsDOI

Abstract

This article is devoted to constructing and analyzing two new approximations (CPL2‐1 and CPL‐2 formulas) for the Caputo–Prabhakar fractional derivative. The error bounds for the CPL2‐1 and CPL‐2 formulas are proved to be of order and , respectively, where is the order of time‐fractional derivative. The newly developed approximations are then used in the numerical treatment of a reaction–diffusion problem with variable coefficients defined in the Caputo–Prabhakar sense. Moreover, the space variable in the developed numerical schemes, CFD 1 and CFD 2 , is discretized using a fourth‐order compact difference operator. Both schemes' stability and convergence analysis are demonstrated thoroughly using the discrete energy method. It is shown that the convergence orders of CFD 1 and CFD 2 schemes are and , respectively, where and represent the mesh spacing in time and space directions, respectively. In addition, numerical results are obtained for three test problems to confirm the theory and demonstrate the efficiency and superiority of the proposed schemes.

Topics & Concepts

MathematicsDiscretizationConvergence (economics)Variable (mathematics)Stability (learning theory)Fractional calculusApplied mathematicsComputational fluid dynamicsOperator (biology)Space (punctuation)Reaction–diffusion systemDerivative (finance)Numerical analysisMathematical analysisComputer scienceRepressorOperating systemFinancial economicsTranscription factorPhysicsMechanicsBiochemistryChemistryEconomicsEconomic growthMachine learningGeneFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsNonlinear Differential Equations Analysis