RATIONAL SPECTRAL COLLOCATION METHOD FOR A COUPLED SYSTEM OF SINGULARLY PERTURBED BOUNDARY VALUE PROBLEMS 被引量：4

RATIONAL SPECTRAL COLLOCATION METHOD FOR A COUPLED SYSTEM OF SINGULARLY PERTURBED BOUNDARY VALUE PROBLEMS

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摘要 A, novel collocation method for a coupled system of singularly perturbed linear equations is presented. This method is based on rational spectral collocation method in barycentric form with sinh transform. By sinh transform, the original Chebyshev points are mapped into the transformed ones clustered near the singular points of the solution. The results from asymptotic analysis about the singularity solution are employed to determine the parameters in this sinh transform. Numerical experiments are carried out to demonstrate the high accuracy and efficiency of our method. A, novel collocation method for a coupled system of singularly perturbed linear equations is presented. This method is based on rational spectral collocation method in barycentric form with sinh transform. By sinh transform, the original Chebyshev points are mapped into the transformed ones clustered near the singular points of the solution. The results from asymptotic analysis about the singularity solution are employed to determine the parameters in this sinh transform. Numerical experiments are carried out to demonstrate the high accuracy and efficiency of our method.

作者 Suqin Chen Yingwei Wang Xionghua Wu

机构地区 Department of Mathematics

出处《Journal of Computational Mathematics》 SCIE CSCD 2011年第4期458-473,共16页 计算数学（英文）

基金 Acknowledgments. The support from the National Natural Science Foundation of China under Grants No.10671146 and No.50678122 is acknowledged. The authors are grateful to the referee and the editor for helpful comments and suggestions.

关键词 Singular perturbation Coupled system Rational spectral collocation method Boundary layer REACTION-DIFFUSION Convection-diffusion. Singular perturbation, Coupled system, Rational spectral collocation method,Boundary layer, Reaction-diffusion, Convection-diffusion.

分类号 O241.8 [理学—计算数学] TN248.1 [电子电信—物理电子学]

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Journal of Computational Mathematics

2011年第4期

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