A New Numerical Approach for a Singularly Perturbed Problem With Two Integral Boundary Conditions
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Date
2021
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Publisher
Springer Heidelberg
Abstract
In this study, finite difference method on a Shishkin mesh is applied to solve the singularly perturbed problem with integral boundary conditions. Some properties of the exact solution are obtained. Finite difference scheme on this mesh is constructed. The stability and convergence analysis of the method are shown as first-order convergent at the discrete maximum norm, regardless of the perturbation parameter e. Numerical results are shown by solving an example on the table and figure.
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Keywords
Singular Perturbation Equation, Finite Difference Scheme, Piecewise Uniform Mesh, Uniform Convergence, Integral Conditions
Turkish CoHE Thesis Center URL
WoS Q
Q1
Scopus Q
Q1
Source
Volume
40
Issue
6