带内层抛物型对流扩散问题奇异摄动系统的鲁棒计算方法

IF 0.9 Q3 MATHEMATICS, APPLIED Computational and Mathematical Methods Pub Date : 2021-01-10 DOI:10.1002/cmm4.1146
Srinivasan Natesan, Maneesh K. Singh
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引用次数: 1

摘要

本文给出了具有不连续对流系数和源项的抛物型对流扩散初边值奇摄动系统的迎风有限差分格式的收敛性分析。采用均匀网格上时间导数的隐式欧拉格式和分段均匀Shishkin网格上空间导数的迎风有限差分格式构造了该数值格式。结果表明,该格式得到的数值解相对于扰动参数是一致收敛的。所提出的数值格式在空间上几乎是一阶的(直到一个对数因子),在时间上是一阶的。数值算例验证了理论结果。
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Robust computational method for singularly perturbed system of parabolic convection-diffusion problems with interior layers

In this article, we present the convergence analysis of an upwind finite difference scheme for singularly perturbed system of parabolic convection-diffusion initial-boundary-value problems with discontinuous convection coefficient and source term. The proposed numerical scheme is constructed by using the implicit-Euler scheme for the time derivative on the uniform mesh, and the upwind finite difference scheme for the spatial derivatives on a layer-resolving piecewise-uniform Shishkin mesh. It is shown that the numerical solution obtained by the proposed scheme converges uniformly with respect to the perturbation parameter. The proposed numerical scheme is of almost first-order (up to a logarithmic factor) in space and first-order in time. Numerical examples are carried out to verify the theoretical results.

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