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Numerical method for solving two‐dimensional of the space and space–time fractional coupled reaction‐diffusion equations

Adel R. Hadhoud, Abdulqawi A. M. Rageh, Praveen Agarwal

2022Mathematical Methods in the Applied Sciences16 citationsDOI

Abstract

This paper proposes the shifted Legendre Gauss–Lobatto collocation (SL‐GLC) scheme to solve two‐dimensional space‐fractional coupled reaction–diffusion equations (SFCRDEs). The proposed method is implemented by expressing the function and its spatial fractional derivatives as a finite expansion of shifted Legendre polynomials. Then the expansion coefficients are determined by reducing the SFCRDEs with their initial and boundary conditions to a system of ordinary differential equations for these coefficients. Subsequently, we applied the proposed method to discretize the temporal and spatial variables to convert the two‐dimensional spacetime fractional coupled reaction–diffusion equations (STFCRDEs) to a system of algebraic equations. Some results regarding the error estimation are obtained. Several examples are discussed to validate the capability and efficiency of the proposed scheme.

Topics & Concepts

MathematicsLegendre polynomialsCollocation methodDiscretizationAlgebraic equationMathematical analysisReaction–diffusion systemFractional calculusApplied mathematicsSpace (punctuation)Boundary value problemCollocation (remote sensing)Differential equationOrdinary differential equationNonlinear systemComputer scienceMachine learningPhysicsOperating systemQuantum mechanicsFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsNonlinear Differential Equations Analysis