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A robust numerical scheme for singularly perturbed parabolic reaction-diffusion problems via the method of lines

Nana Adjoah Mbroh, Justin B. Munyakazi

2021International Journal of Computer Mathematics30 citationsDOI

Abstract

In this paper, we consider one- and two-dimensional singularly perturbed parabolic reaction-diffusion problems. We propose a parameter-uniform numerical scheme to solve these problems. The continuous problem is first discretized in the space variable using a fitted operator finite difference method. The partial differential equation is thus transformed into a system of initial value problems which are then integrated in time with the Crank–Nicolson finite difference method. A convergence analysis shows that the scheme is second-order ε-uniform convergent in space and time. Richardson extrapolation of the space variable results in a fourth order ε-uniform convergence. Numerical experiments on two test examples confirm the theoretical findings.

Topics & Concepts

MathematicsRichardson extrapolationDiscretizationParabolic partial differential equationPartial differential equationMathematical analysisConvergence (economics)Uniform convergenceExtrapolationInitial value problemFinite differenceMethod of linesFinite difference methodOperator (biology)Numerical analysisCrank–Nicolson methodReaction–diffusion systemApplied mathematicsRate of convergenceVariable (mathematics)Differential equationOrdinary differential equationEconomic growthDifferential algebraic equationComputer networkEngineeringTranscription factorRepressorBiochemistryGeneBandwidth (computing)Computer scienceEconomicsChemistryElectrical engineeringChannel (broadcasting)Differential Equations and Numerical Methods