A Second Order Weighted Numerical Scheme on Nonuniform Meshes for Convection Diffusion Parabolic Problems

L. Govindarao, J. Mohapatra
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引用次数: 4

Abstract

In this article, a singularly perturbed parabolic convection-diffusion equation on a rectangular domain is considered. The solution of the problem possesses regular boundary layer which appears in the spatial variable. To discretize the time derivative, we use two type of schemes, first the implicit Euler scheme and second the implicit trapezoidal scheme on a uniform mesh. For approximating the spatial derivatives, we use the monotone hybrid scheme, which is a combination of midpoint upwind scheme and central difference scheme with variable weights on Shishkin-type meshes (standard Shishkin mesh, Bakhvalov-Shishkin mesh and modified Bakhvalov-Shishkin mesh). We prove that both numerical schemes converge uniformly with respect to the perturbation parameter and are of second order accurate. Thomas algorithm is used to solve the tri-diagonal system. Finally, to support the theoretical results, we present a numerical experiment by using the proposed methods.
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对流扩散抛物问题非均匀网格的二阶加权数值格式
本文研究了一个矩形域上的奇摄动抛物型对流扩散方程。该问题的解具有正则边界层,该边界层出现在空间变量中。为了离散时间导数,我们使用两种类型的格式,第一种是均匀网格上的隐式欧拉格式,第二种是隐式梯形格式。为了逼近空间导数,我们使用单调混合格式,它是Shishkin型网格(标准Shishkin网格、Bakhvalov-Shishkin网格和修改的Bakhvalv-Shishkin网络)上中点逆风格式和变权中心差分格式的组合。我们证明了这两个数值格式相对于扰动参数一致收敛,并且是二阶精确的。Thomas算法用于求解三对角系统。最后,为了支持理论结果,我们使用所提出的方法进行了数值实验。
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CiteScore
1.70
自引率
8.30%
发文量
0
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