A subspace of linear nonconforming finite element for nearly incompressible elasticity and Stokes flow

IF 3.8 2区数学 Q1 MATHEMATICS

Journal of Numerical Mathematics Pub Date : 2022-09-14 DOI:10.1515/jnma-2022-0010

Shangyou Zhang

引用次数: 0

Abstract

Abstract The linear nonconforming finite element, combined with constant finite element for pressure, is stable for the Stokes problem. But it does not satisfy the discrete Korn inequality. The linear conforming finite element satisfies the discrete Korn inequality, but is not stable for the Stokes problem and fails for the nearly incompressible elasticity problems. We enrich the linear conforming finite element by some nonconforming P1 bubbles, i.e., select a subspace of the linear nonconforming finite element space, so that the resulting linear nonconforming element is both stable and conforming enough to satisfy the Korn inequality, on HTC-type triangular and tetrahedral grids. Numerical tests in 2D and 3D are presented, confirming the analysis.

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近似不可压缩弹性和Stokes流的线性非协调有限元子空间

对于Stokes问题，线性非协调有限元与压力的恒定有限元相结合是稳定的。但它不满足离散Korn不等式。线性拟合有限元满足离散Korn不等式，但对于Stokes问题不稳定，对于近不可压缩弹性问题不稳定。我们通过一些不协调P1泡来丰富线性不协调有限元，即在线性不协调有限元空间中选择一个子空间，使得到的线性不协调单元在htc型三角形和四面体网格上既稳定又协调，足以满足Korn不等式。给出了二维和三维数值试验，验证了分析结果。

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

Journal of Numerical Mathematics 数学-数学

CiteScore

5.90

自引率

3.30%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Numerical Mathematics (formerly East-West Journal of Numerical Mathematics) contains high-quality papers featuring contemporary research in all areas of Numerical Mathematics. This includes the development, analysis, and implementation of new and innovative methods in Numerical Linear Algebra, Numerical Analysis, Optimal Control/Optimization, and Scientific Computing. The journal will also publish applications-oriented papers with significant mathematical content in computational fluid dynamics and other areas of computational engineering, finance, and life sciences.