论布西内斯克方程组非连续伽勒金方法的误差估算

IF 1 4区数学 Q3 MATHEMATICS, APPLIED Computational Methods in Applied Mathematics Pub Date : 2024-07-10 DOI:10.1515/cmam-2023-0202

Saumya Bajpai, Debendra Kumar Swain

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引用次数: 0

摘要

本文提出并分析了一种非连续 Galerkin 有限元方法，用于求解瞬态 Boussinesq 不可压缩导热流体流动方程。该方法利用上风法有效处理非线性对流项。我们讨论了半离散非连续 Galerkin 近似的新先验边界。此外，我们还为 L 2 \mathbf{L}^{2} 和能量规范下的半离散不连续 Galerkin 速度近似、L 2 L^{2} 和能量规范下的温度近似以及 L 2 L^{2} -规范下的压力近似建立了最佳先验误差估计。 -t > 0 t>0 时的 L 2 L^{2} 和能量规范中的温度近似和 L 2 L^{2} 中的压力近似。此外，在数据较小的假设下，我们证明了时间误差估计的一致性。我们还考虑了完全离散化的后向欧拉方案，并推导出完全离散的误差估计值。最后，我们提供了数值示例来支持理论结论。

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On Error Estimates of a discontinuous Galerkin Method of the Boussinesq System of Equations

In this paper, we propose and analyze a discontinuous Galerkin finite element method for solving the transient Boussinesq incompressible heat conducting fluid flow equations. This method utilizes an upwind approach to handle the nonlinear convective terms effectively. We discuss new a priori bounds for the semidiscrete discontinuous Galerkin approximations. Furthermore, we establish optimal a priori error estimates for the semidiscrete discontinuous Galerkin velocity approximation in L 2

\mathbf{L}^{2}

and energy norms, the temperature approximation in L 2

L^{2}

and energy norms and pressure approximation in L 2

L^{2}

-norm for t > 0

t>0

. Additionally, under the smallness assumption on the data, we prove uniform in time error estimates. We also consider a backward Euler scheme for full discretization and derive fully discrete error estimates. Finally, we provide numerical examples to support the theoretical conclusions.

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来源期刊

Computational Methods in Applied Mathematics MATHEMATICS, APPLIED-

CiteScore

2.40

自引率

7.70%

发文量

期刊介绍： The highly selective international mathematical journal Computational Methods in Applied Mathematics　(CMAM) considers original mathematical contributions to computational methods and numerical analysis with applications mainly related to PDEs. CMAM seeks to be interdisciplinary while retaining the common thread of numerical analysis, it is intended to be readily readable and meant for a wide circle of researchers in applied mathematics. The journal is published by De Gruyter on behalf of the Institute of Mathematics of the National Academy of Science of Belarus.