High Order varepsilon-Uniform Methods for Singularly Perturbed Reaction-Diffusion Problems
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The central difference scheme for reaction-diffusion problems, when fitted Shishkin type meshes are used, gives uniformly convergent methods of almost second order. In this work, we construct HOC (High Order Compact) compact monotone finite difference schemes, defined on a priori Shishkin meshes, uniformly convergent with respect the diffusion parameter ?, which have order three and four except for a logarithmic factor. We show some numerical experiments which support the theoretical results.
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