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Exponential Time Differencing-Padé Finite Element Method for Nonlinear Convection-Diffusion-Reaction Equations with Time Constant Delay

Haishen Dai, Qiumei Huang, Cheng Wang Cheng Wang

2023Journal of Computational Mathematics10 citationsDOI

Abstract

In this paper, ETD3-Pad\u00e9 and ETD4-Pad\u00e9 Galerkin finite element methods are proposed and analyzed for nonlinear delayed convection-diffusion-reaction equations with Dirichlet boundary conditions. An ETD-based RK is used for time integration of the corresponding equation. To overcome a well-known difficulty of numerical instability associated with the computation of the exponential operator, the Pad\u00e9 approach is used for such an exponential operator approximation, which in turn leads to the corresponding ETD-Pad\u00e9 schemes. An unconditional $L^2$ numerical stability is proved for the proposed numerical schemes, under a global Lipshitz continuity assumption. In addition, optimal rate error estimates are provided, which gives the convergence order of $O(k^{3}+h^{r})$ (ETD3-Pad\u00e9) or $O(k^{4}+h^{r})$ (ETD4-Pad\u00e9) in the $L^2$ norm, respectively. Numerical experiments are presented to demonstrate the robustness of the proposed numerical schemes.

Topics & Concepts

Exponential functionNonlinear systemFinite element methodConstant (computer programming)Exponential decayMathematical analysisFick's laws of diffusionMathematicsDiffusionReaction–diffusion systemApplied mathematicsMechanicsPhysicsComputer scienceThermodynamicsQuantum mechanicsProgramming languageNuclear physicsDifferential Equations and Numerical MethodsNumerical methods for differential equationsAdvanced Numerical Methods in Computational Mathematics
Exponential Time Differencing-Padé Finite Element Method for Nonlinear Convection-Diffusion-Reaction Equations with Time Constant Delay | Litcius