Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation
This paper deals with the numerical treatment of a singularly perturbed unsteady non-linear Burger-Huxley problem. Due to the simultaneous presence of a singular perturbation parameter and non-linearity in the problem applying classical numerical methods to solve this problem on a uniform mesh are u...
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Elsevier
2022-01-01
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Series: | MethodsX |
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Online Access: | http://www.sciencedirect.com/science/article/pii/S2215016122002655 |
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author | Imiru Takele Daba Gemechis File Duressa |
author_facet | Imiru Takele Daba Gemechis File Duressa |
author_sort | Imiru Takele Daba |
collection | DOAJ |
description | This paper deals with the numerical treatment of a singularly perturbed unsteady non-linear Burger-Huxley problem. Due to the simultaneous presence of a singular perturbation parameter and non-linearity in the problem applying classical numerical methods to solve this problem on a uniform mesh are unable to provide oscillation-free results unless they are applied with very fine meshes inside the region. Thus, to resolve this issue, a uniformly convergent computational scheme is proposed. The scheme is formulated: • First, the non-linear singularly perturbed problem is linearized using the Newton-Raphson-Kantorovich quasilinearization technique. • The resulting linear singularly perturbed problem is semi-discretized in time using the implicit Euler method to yield a system of singularly perturbed ordinary differential equations in space. • Finally, the system of singularly perturbed ordinary differential equations are solved using fitted exponential cubic spline method.The stability and uniform convergence of the proposed scheme are investigated. The scheme is stable and ε−uniformly convergent with first order in time and second order in space directions. To validate the applicability of the proposed scheme several test examples are considered. The obtained numerical results depict that the proposed scheme provides more accurate results than some methods available in the literature. |
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id | doaj.art-1dba28f6577e499ba7eb786f0d240a33 |
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issn | 2215-0161 |
language | English |
last_indexed | 2024-04-13T05:29:06Z |
publishDate | 2022-01-01 |
publisher | Elsevier |
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spelling | doaj.art-1dba28f6577e499ba7eb786f0d240a332022-12-22T03:00:30ZengElsevierMethodsX2215-01612022-01-019101886Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equationImiru Takele Daba0Gemechis File Duressa1Corresponding author.; Department of Mathematics, Dilla University, Dilla, EthiopiaDepartment of Mathematics, Jimma University, Jimma, EthiopiaThis paper deals with the numerical treatment of a singularly perturbed unsteady non-linear Burger-Huxley problem. Due to the simultaneous presence of a singular perturbation parameter and non-linearity in the problem applying classical numerical methods to solve this problem on a uniform mesh are unable to provide oscillation-free results unless they are applied with very fine meshes inside the region. Thus, to resolve this issue, a uniformly convergent computational scheme is proposed. The scheme is formulated: • First, the non-linear singularly perturbed problem is linearized using the Newton-Raphson-Kantorovich quasilinearization technique. • The resulting linear singularly perturbed problem is semi-discretized in time using the implicit Euler method to yield a system of singularly perturbed ordinary differential equations in space. • Finally, the system of singularly perturbed ordinary differential equations are solved using fitted exponential cubic spline method.The stability and uniform convergence of the proposed scheme are investigated. The scheme is stable and ε−uniformly convergent with first order in time and second order in space directions. To validate the applicability of the proposed scheme several test examples are considered. The obtained numerical results depict that the proposed scheme provides more accurate results than some methods available in the literature.http://www.sciencedirect.com/science/article/pii/S2215016122002655Uniformly Convergent Computational Method for Singularly Perturbed Unsteady Burger-Huxley Equation |
spellingShingle | Imiru Takele Daba Gemechis File Duressa Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation MethodsX Uniformly Convergent Computational Method for Singularly Perturbed Unsteady Burger-Huxley Equation |
title | Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation |
title_full | Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation |
title_fullStr | Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation |
title_full_unstemmed | Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation |
title_short | Uniformly convergent computational method for singularly perturbed unsteady burger-huxley equation |
title_sort | uniformly convergent computational method for singularly perturbed unsteady burger huxley equation |
topic | Uniformly Convergent Computational Method for Singularly Perturbed Unsteady Burger-Huxley Equation |
url | http://www.sciencedirect.com/science/article/pii/S2215016122002655 |
work_keys_str_mv | AT imirutakeledaba uniformlyconvergentcomputationalmethodforsingularlyperturbedunsteadyburgerhuxleyequation AT gemechisfileduressa uniformlyconvergentcomputationalmethodforsingularlyperturbedunsteadyburgerhuxleyequation |