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Accelerated fitted operator finite difference method for singularly perturbed delay differential equations with non-local boundary condition

Habtamu Garoma Debela, Gemechis File Duressa

2020Journal of the Egyptian Mathematical Society29 citationsDOIOpen Access PDF

Abstract

Abstract In this paper, accelerated fitted finite difference method for solving singularly perturbed delay differential equation with non-local boundary condition is considered. To treat the non-local boundary condition, Simpson’s rule is applied. The stability and parameter uniform convergence for the proposed method are proved. To validate the applicability of the scheme, two model problems are considered for numerical experimentation and solved for different values of the perturbation parameter ε and mesh size h . The numerical results are tabulated in terms of maximum absolute errors and rate of convergence, and it is observed that the present method is more accurate and ε -uniformly convergent for h ≥ ε where the classical numerical methods fails to give good result, and it also improves the results of the methods existing in the literature.

Topics & Concepts

MathematicsBoundary value problemPerturbation (astronomy)Convergence (economics)Rate of convergenceSingular perturbationMathematical analysisDifferential equationFinite difference methodOperator (biology)Stability (learning theory)Uniform convergenceBoundary (topology)Numerical analysisApplied mathematicsBiochemistryPhysicsElectrical engineeringChannel (broadcasting)Economic growthBandwidth (computing)EngineeringGeneMachine learningQuantum mechanicsRepressorTranscription factorComputer scienceEconomicsChemistryComputer networkDifferential Equations and Numerical MethodsAdvanced Mathematical Modeling in EngineeringNumerical methods for differential equations
Accelerated fitted operator finite difference method for singularly perturbed delay differential equations with non-local boundary condition | Litcius