Stabilised approximation of interior-layer solutions of a singularly perturbed semilinear reaction-diffusion problem
Kopteva, Natalia and Stynes, Martin (2011) Stabilised approximation of interior-layer solutions of a singularly perturbed semilinear reaction-diffusion problem. Numerische Mathematik, 119 (4). pp. 787-810. ISSN 0029-599X (https://doi.org/10.1007/s00211-011-0395-y)
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Abstract
A semilinear reaction–diffusion two-point boundary value problem, whose second-order derivative is multiplied by a small positive parameter ε 2 , is considered. It can have multiple solutions. The numerical computation of solutions having interior transition layers is analysed. It is demonstrated that the accurate computation of such solutions is exceptionally difficult. To address this difficulty, we propose an artificial-diffusion stabilization. For both standard and stabilised finite difference methods on suitable Shishkin meshes, we prove existence and investigate the accuracy of computed solutions by constructing discrete sub- and super-solutions. Convergence results are deduced that depend on the relative sizes of ε and N, where N is the number of mesh intervals. Numerical experiments are given in support of these theoretical results. Practical issues in using Newton’s method to compute a discrete solution are discussed.
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Item type: Article ID code: 44820 Dates: DateEventDecember 2011Published15 July 2011Published OnlineSubjects: Science > Mathematics Department: Faculty of Science > Mathematics and Statistics Depositing user: Pure Administrator Date deposited: 12 Sep 2013 14:52 Last modified: 11 Nov 2024 10:29 URI: https://strathprints.strath.ac.uk/id/eprint/44820