Numerical Solution of a Singularly Perturbed Three-Point Boundary Value Problem
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Date
2007
Authors
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Journal ISSN
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Publisher
Taylor & Francis Ltd
Abstract
We consider a uniform finite difference method on an S-mesh (Shishkin type mesh) for a singularly perturbed semilinear one-dimensional convection-diffusion three-point boundary value problem with zeroth-order reduced equation. We show that the method is first-order convergent in the discrete maximum norm, independently of the perturbation parameter except for a logarithmic factor. An effective iterative algorithm for solving the non-linear difference problem and some numerical results are presented.
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Keywords
Finite Difference, Singular Perturbation, Shishkin Mesh, Non-Local Boundary Condition
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Source
Volume
84
Issue
10
Start Page
1465
End Page
1481