An efficient reconstruction algorithm for diffusion on triangular grids using the nodal discontinuous Galerkin method

Song Yang; Srinivasan Bhuvana

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An efficient reconstruction algorithm for diffusion on triangular grids using the nodal discontinuous Galerkin method

机译：利用节点不连续Galerkin方法的三角网分散的高效重建算法

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High-energy-density (HED) hydrodynamics studies such as those relevant to inertial confinement fusion and astrophysics require highly disparate densities, temperatures, viscosities, and other diffusion parameters over relatively short spatial scales. This presents a challenge for high-order accurate methods to effectively resolve the hydrodynamics at these scales, particularly in the presence of highly disparate diffusion. A significant volume of engineering and physics applications use an unstructured discontinuous Galerkin (DG) method developed based on the finite element mesh generation and algorithmic framework. This work discusses the application of an affine reconstructed nodal DG method for unstructured grids of triangles. Solving the diffusion terms in the DG method is nontrivial due to the solution representations being piecewise continuous. Hence, the diffusive flux is not defined on the interface of elements. The proposed numerical approach reconstructs a smooth solution in a parallelogram that is enclosed by the quadrilateral formed by two adjacent triangle elements. The interface between these two triangles is the diagonal of the enclosed parallelogram. Similar to triangles, the mapping of parallelograms from a physical domain to a reference domain is an affine mapping, which is necessary for an accurate and efficient implementation of the numerical algorithm. Thus, all computations can still be performed on the reference domain, which promotes efficiency in computation and storage. This reconstruction does not make assumptions on choice of polynomial basis. Reconstructed DG algorithms have previously been developed for modal implementations of the convection & ndash;diffusion equations. However, to the best of the authors & rsquo; knowledge, this is the first practical guideline that has been proposed for applying the reconstructed algorithm on a nodal discontinuous Galerkin method with a focus on accuracy and efficiency. The algorithm is demonstrated on a number of benchmark cases as well as a challenging substantive problem in HED hydrodynamics with highly disparate diffusion parameters. (c) 2021 Elsevier B.V. All rights reserved.

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《Computer physics communications》 |2021年第1期|共15页
作者
Song Yang; Srinivasan Bhuvana;
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作者单位

Virginia Tech Kevin T Crofton Dept Aerosp &

Ocean Engn Blacksburg VA 24060 USA;

Virginia Tech Kevin T Crofton Dept Aerosp &

Ocean Engn Blacksburg VA 24060 USA;

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原文格式 PDF
正文语种 eng
中图分类计算机的应用;
关键词
Nodal discontinuous Galerkin method; Reconstruction; Convection-diffusion equation; Computational efficiency; Unstructured; Triangle elements; High-energy-density hydrodynamics;

机译：节点不连续的Galerkin方法;重建;对流扩散方程;计算效率;非结构化;三角形元素;高能密度流体动力学;

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1. Nodal Discontinuous Galerkin Method for Time-Domain Lorentz Model Equations in Meta-Materials [J] . Shanghui Jia, Changhui Yao, Shuai Su 高等学校计算数学学报（英文版） . 2018,第001期
2. Nodal Discontinuous Galerkin Method for Aeroacoustics and Comparison with Finite Difference Schemes [J] . Chen Eryun, Li Zhi, Ma Zunling, 南京航空航天大学学报（英文版） . 2014,第003期
3. High-Order Local Discontinuous Galerkin Algorithm with Time Second-Order Schemes for the Two-Dimensional Nonlinear Fractional Diffusion Equation [J] . Min Zhang, Yang Liu, Hong Li 应用数学与计算数学学报(英文) . 2020,第004期
4. Nodal discontinuous Galerkin methods for fractional diffusion equations on 2D domain with triangular meshes [J] . Qiu Liangliang, Deng Weihua, Hesthaven Jan S. Journal of Computational Physics . 2015,第Null期

机译：带有三角网格的二维域分数阶扩散方程的节点间断不连续Galerkin方法
5. Discontinuous Galerkin methods with nodal and hybrid modalodal triangular, quadrilateral, and polygonal elements for nonlinear shallow water flow [J] . D. Wirasaet, E.J. Kubatko, C.E. Michoski, Computer Methods in Applied Mechanics and Engineering . 2014,第MARa1期

机译：非线性浅水流动的节点和混合模/节点三角形，四边形和多边形单元的不连续Galerkin方法
6. A numerical analysis of the nodal Discontinuous Galerkin scheme via Flux Reconstruction for the advection-diffusion equation [J] . Watkins Jerry, Asthana Kartikey, Jameson Antony Computers & Fluids . 2016,第Null期

机译：对流扩散方程的节点非连续Galerkin方案通量重建的数值分析
7. Recovery-based Discontinuous Galerkin for Diffusion on Triangular Grid [C] . Loc Khieu AIAA computational fluid dynamics conference . 2017

机译：基于恢复的不连续的Galerkin用于三角形网格上的扩散
8. Efficient predictor/multi-corrector algorithms based on high-order accurate time-discontinuous Galerkin methods for second-order hyperbolic systems. [D] . Kunthong, Prapot. 2005

机译：基于高阶精确时间不连续Galerkin方法的二阶双曲系统的高效预测器/多校正器算法。
9. Superconvergence of the local discontinuous Galerkin method for nonlinear convection-diffusion problems [O] . Hui Bi, Chengeng Qian -1

机译：非线性对流扩散问题的局部不连续Galerkin方法的超收敛性
10. An efficient reconstruction algorithm for diffusion on triangular grids using the nodal discontinuous Galerkin method [O] . Yang Song, Bhuvana Srinivasan 2021

机译：利用节点不连续Galerkin方法的三角网分散的高效重建算法
11. Nodal High-Order Discontinuous Galerkin Methods for the Spherical Shallow Water Equations. [R] . Giraldo, F. X., Hesthaven, J. S., Warburton, T. 2002

机译：球形浅水方程的节点高阶间断Galerkin方法。

An efficient reconstruction algorithm for diffusion on triangular grids using the nodal discontinuous Galerkin method

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