An assessment of solvers for algebraically stabilized discretizations of convection–diffusion–reaction equations

IF 4.3 3区材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC

ACS Applied Electronic Materials Pub Date : 2021-10-29 DOI:10.1515/jnma-2021-0123

Abhinav K. Jha, Ondvrej P'artl, N. Ahmed, D. Kuzmin

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引用次数: 2

Abstract

Abstract We consider flux-corrected finite element discretizations of 3D convection-dominated transport problems and assess the computational efficiency of algorithms based on such approximations. The methods under investigation include flux-corrected transport schemes and monolithic limiters. We discretize in space using a continuous Galerkin method and ℙ1 or ℚ1 finite elements. Time integration is performed using the Crank–Nicolson method or an explicit strong stability preserving Runge–Kutta method. Nonlinear systems are solved using a fixed-point iteration method, which requires solution of large linear systems at each iteration or time step. The great variety of options in the choice of discretization methods and solver components calls for a dedicated comparative study of existing approaches. To perform such a study, we define new 3D test problems for time dependent and stationary convection–diffusion–reaction equations. The results of our numerical experiments illustrate how the limiting technique, time discretization and solver impact on the overall performance.

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对流-扩散-反应方程代数稳定离散化解的评估

我们考虑了三维对流主导输运问题的通量校正有限元离散化，并评估了基于这种近似的算法的计算效率。正在研究的方法包括通量校正输运方案和单片限制器。我们使用连续伽辽金方法和 1或π 1有限元在空间上离散化。时间积分采用Crank-Nicolson方法或显式强稳定保持龙格-库塔方法进行。非线性系统的求解采用不动点迭代法，该方法要求在每次迭代或时间步长求解大型线性系统。在选择离散化方法和求解器组件时，需要对现有方法进行专门的比较研究。为了进行这样的研究，我们定义了新的三维测试问题的时间依赖和平稳对流扩散反应方程。我们的数值实验结果说明了限制技术、时间离散化和求解器对整体性能的影响。

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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来源期刊

ACS Applied Electronic Materials Multiple-

CiteScore

7.20

自引率

4.30%

发文量

567