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Comparative Study of Finite Difference and Finite Element Methods for Solving 2D Parabolic Convection–Diffusion–Reaction Equations With Variable Coefficients

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  • Endalew Getnet Tsega

Abstract

This study investigates the numerical solution of two‐dimensional parabolic convection–diffusion–reaction (CDR) equations with variable coefficients using the finite difference method (FDM) and the finite element method (FEM). The FDM employs central differences for spatial discretization and the implicit Euler method for time integration, while the FEM uses the Galerkin approach with rectangular elements and three‐point Gauss–Legendre quadrature for spatial integrals, followed by implicit Euler discretization in time. Three test problems are considered to compare accuracy and efficiency. For small diffusion coefficients, the FEM provides higher accuracy, whereas for larger diffusion coefficients, both methods deliver nearly identical accuracy. Despite its improved accuracy in certain cases, the FEM typically involves a higher computational cost than the FDM. Based on the results, the study recommends the use of FEM for problems with boundary or interior layers.

Suggested Citation

  • Endalew Getnet Tsega, 2025. "Comparative Study of Finite Difference and Finite Element Methods for Solving 2D Parabolic Convection–Diffusion–Reaction Equations With Variable Coefficients," International Journal of Differential Equations, John Wiley & Sons, vol. 2025(1).
  • Handle: RePEc:wly:jnijde:v:2025:y:2025:i:1:n:2126609
    DOI: 10.1155/ijde/2126609
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    References listed on IDEAS

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    1. Endalew Getnet Tsega & Saranya Shekar, 2024. "Numerical Solution of Two-Dimensional Nonlinear Unsteady Advection-Diffusion-Reaction Equations with Variable Coefficients," International Journal of Mathematics and Mathematical Sciences, Hindawi, vol. 2024, pages 1-12, March.
    2. Ndivhuwo Ndou & Phumlani Dlamini & Byron Alexander Jacobs, 2024. "Solving the Advection Diffusion Reaction Equations by Using the Enhanced Higher-Order Unconditionally Positive Finite Difference Method," Mathematics, MDPI, vol. 12(7), pages 1-23, March.
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