Asymptotic initial-value method for singularly-perturbed boundary-value problems for second-order ordinary differential equations
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Publication:1411392
DOI10.1023/A:1022118420907zbMath1043.34060OpenAlexW116797183MaRDI QIDQ1411392
Publication date: 27 October 2003
Published in: Journal of Optimization Theory and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1023/a:1022118420907
ordinary differential equationsasymptotic expansionsboundary layerstwo-point boundary value problemssmall parametersinitial value methodssingular-perturbation problemsnonturning points
Numerical solution of boundary value problems involving ordinary differential equations (65L10) Perturbations, asymptotics of solutions to ordinary differential equations (34E10) Linear boundary value problems for ordinary differential equations (34B05)
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Cites Work
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- A second order monotone upwind scheme
- Initial-value technique for a class of nonlinear singular perturbation problems
- New initial-value method for singularly perturbed boundary-value problems
- Perturbation methods in applied mathematics
- A boundary value technique for singular perturbation problems
- Initial-value technique for singularly perturbed boundary-value problems for second-order ordinary differential equations arising in chemical reactor theory
- Initial-value technique for singularly-perturbed turning-point problems exhibiting twin boundary layers
- Booster method for singularly-perturbed one-dimensional convection-diffusion Neumann problems
- A ``booster method for singular perturbation problems arising in chemical reactor theory
- Parallel initial-value algorithms for singularly perturbed boundary-value problems
- A nonasymptotic method for general linear singular perturbation problems
- Initial-value methods for second-order singularly perturbed boundary- value problems
- A computational method for solving singular perturbation problems
- Collocation for Singular Perturbation Problems II: Linear First Order Systems Without Turning Points
- Collocation for Singular Perturbation Problems III: Nonlinear Problems without Turning Points
- Collocation for Singular Perturbation Problems I: First Order Systems with Constant Coefficients
- Adaptivity and Error Estimation for the Finite Element Method Applied to Convection Diffusion Problems
- An Adaptive Shooting Method for Singularly Perturbed Boundary Value Problems
- A Uniformly Accurate Finite Element Method for a Singular Perturbation Problem in Conservative Form
- Numerical Methods for Singular Perturbation Problems
- Collocation with Polynomial and Tension Splines for Singularly-Perturbed Boundary Value Problems
- ‘Shooting method' for singular perturbation problems arising in chemical reactor theory
- “Booster method” for singularly perturbed robin problems i
- ‘Shooting method’ for singularly perturbed one-dimensional reaction-diffusion neumann problems
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