用于任意多面体网格上三维各向异性对流扩散方程的免插值单元中心有限体积方案

IF 2.6 3区物理与天体物理 Q1 PHYSICS, MATHEMATICAL

Communications in Computational Physics Pub Date : 2023-12-01 DOI:10.4208/cicp.oa-2023-0136

Shuai Miao,Jiming Wu, Yanzhong Yao

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引用次数: 0

摘要

现有的以单元为中心的有限体积方案大多需要引入辅助未知量，以便在网格扭曲或问题不连续时保持二阶精度，因此需要辅助未知量的插值算法。插值算法不仅构造困难，而且会带来额外的计算量。本文针对任意多面体网格上的异质和各向异性对流扩散问题，提出了一种无插值单元中心有限体积方案。我们为扩散项提出了一种新的无插值离散化方法，并为对流项提出了两种新的二阶上风算法。最有趣的是，该方案可以适应任何网格拓扑结构，并能严格处理任何不连续性。数值实验表明，这种新方案是稳健的，具有较小的模版，对扩散主导和对流主导问题都具有近似二阶精度。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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An Interpolation-Free Cell-Centered Finite Volume Scheme for 3D Anisotropic Convection-Diffusion Equations on Arbitrary Polyhedral Meshes

Most existing cell-centered finite volume schemes need to introduce auxiliary unknowns in order to maintain the second-order accuracy when the mesh is distorted or the problem is discontinuous, so interpolation algorithms of auxiliary unknowns are required. Interpolation algorithms are not only difficult to construct, but also bring extra computation. In this paper, an interpolation-free cell-centered finite volume scheme is proposed for the heterogeneous and anisotropic convection-diffusion problems on arbitrary polyhedral meshes. We propose a new interpolation-free discretization method for diffusion term, and two new second-order upwind algorithms for convection term. Most interestingly, the scheme can be adapted to any mesh topology and can handle any discontinuity strictly. Numerical experiments show that this new scheme is robust, possesses a small stencil, and has approximately second-order accuracy for both diffusion-dominated and convection-dominated problems.

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来源期刊

Communications in Computational Physics 物理-物理：数学物理

CiteScore

4.70

自引率

5.40%

发文量

审稿时长

9 months

期刊介绍： Communications in Computational Physics (CiCP) publishes original research and survey papers of high scientific value in computational modeling of physical problems. Results in multi-physics and multi-scale innovative computational methods and modeling in all physical sciences will be featured.