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Bibliographic Details
Main Authors: Ishwariya, R., Miller, J. J. H., Valarmathi, S.
Format: Preprint
Published: 2019
Subjects:
Online Access:https://arxiv.org/abs/1906.01598
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author Ishwariya, R.
Miller, J. J. H.
Valarmathi, S.
author_facet Ishwariya, R.
Miller, J. J. H.
Valarmathi, S.
contents In this paper, a class of linear parabolic singularly perturbed second order differential equations of reaction-diffusion type with initial and Robin boundary conditions is considered. The solution u of this equation is smooth, whereas the first derivative in the space variable exhibits parabolic boundary layers. A numerical method composed of a classical finite difference scheme on a piecewise uniform Shishkin mesh is suggested. This method is proved to be first order convergent in time and essentially first order convergent in the space variable in the maximum norm uniformly in the perturbation parameters.
format Preprint
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institution arXiv
publishDate 2019
record_format arxiv
spellingShingle A parameter uniform essentially first order convergent numerical method for a parabolic singularly perturbed differential equation of reaction-diffusion type with initial and Robin boundary conditions
Ishwariya, R.
Miller, J. J. H.
Valarmathi, S.
Numerical Analysis
In this paper, a class of linear parabolic singularly perturbed second order differential equations of reaction-diffusion type with initial and Robin boundary conditions is considered. The solution u of this equation is smooth, whereas the first derivative in the space variable exhibits parabolic boundary layers. A numerical method composed of a classical finite difference scheme on a piecewise uniform Shishkin mesh is suggested. This method is proved to be first order convergent in time and essentially first order convergent in the space variable in the maximum norm uniformly in the perturbation parameters.
title A parameter uniform essentially first order convergent numerical method for a parabolic singularly perturbed differential equation of reaction-diffusion type with initial and Robin boundary conditions
topic Numerical Analysis
url https://arxiv.org/abs/1906.01598