INF-SUP STABLE FINITE ELEMENTS ON BARYCENTRIC REFINEMENTS PRODUCING DIVERGENCE-FREE APPROXIMATIONS IN ARBITRARY DIMENSIONS

Guzman Johnny; Neilan Michael

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INF-SUP STABLE FINITE ELEMENTS ON BARYCENTRIC REFINEMENTS PRODUCING DIVERGENCE-FREE APPROXIMATIONS IN ARBITRARY DIMENSIONS

机译：inf-sup稳定的有限元上的成分细化，产生任意尺寸的无分歧近似值

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摘要

We construct several stable finite element pairs for the Stokes problem on barycentric refinements in arbitrary dimensions. A key feature of the spaces is that the divergence maps the discrete velocity space onto the discrete pressure space; thus, when applied to models of incompressible flows, the pairs yield divergence-free velocity approximations. The key result is a local inf-sup stability that holds for any dimension and for any polynomial degree. With this result, we construct global divergence-free and stable pairs in arbitrary dimension and for any polynomial degree.

机译：我们在任意尺寸的重心改进上构建几个稳定的有限元对。空间的一个关键特征是分歧将离散的速度空间映射到离散压力空间上; 因此，当应用于不可压缩流动的模型时，对产生无分歧的速度近似。关键结果是局部INF-SUP稳定性，其适用于任何维度和任何多项式程度。通过这种结果，我们在任意尺寸和任何多项式程度下构建全球偏差和稳定对。

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来源
《SIAM Journal on Numerical Analysis》 |2018年第5期|共19页
作者
Guzman Johnny; Neilan Michael;
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作者单位

Brown Univ Div Appl Math Providence RI 02912 USA;

Univ Pittsburgh Dept Math Pittsburgh PA 15260 USA;

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原文格式 PDF
正文语种 eng
中图分类数值分析;
关键词
inf-sup stable; divergence-free; Barycenter refinement; Stokes;

机译：inf-sup稳定;无分歧;重心细化;斯托克斯;

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专利

1. INF-SUP STABLE FINITE ELEMENTS ON BARYCENTRIC REFINEMENTS PRODUCING DIVERGENCE-FREE APPROXIMATIONS IN ARBITRARY DIMENSIONS [J] . Guzman Johnny, Neilan Michael SIAM Journal on Numerical Analysis . 2018,第5期

机译：inf-sup稳定的有限元上的成分细化，产生任意尺寸的无分歧近似值
2. Inf-sup stable non-conforming finite elements of arbitrary order on triangles [J] . Gunar Matthies, Lutz Tobiska Numerische Mathematik . 2005,第2期

机译：三角形上任意阶的Inf-sup稳定非协调有限元
3. Robust error bounds for finite element approximation of reaction-diffusion problems with non-constant reaction coefficient in arbitrary space dimension (vol 281, pg 184, 2014) [J] . Ainsworth Mark, Vejchodsky Tomas Computer Methods in Applied Mechanics and Engineering . 2016,第FEBa1期

机译：在任意空间维中具有非恒定反应系数的反应扩散问题的有限元逼近的鲁棒误差界（vol 281，pg 184，2014）
4. Finite dimensional approximations of unstable infinite dimensional systems [C] . Gu, G., Khargonekar, . 1990

机译：不稳定无限维系统的有限维逼近
5. An extended finite element method for dislocations in arbitrary three-dimensional entities. [D] . Oswald, Jay. 2011

机译：用于任意三维实体中位错的扩展有限元方法。
6. QUADRATIC SERENDIPITY FINITE ELEMENTS ON POLYGONS USING GENERALIZED BARYCENTRIC COORDINATES [O] . ALEXANDER RAND, ANDREW GILLETTE, CHANDRAJIT BAJAJ -1

机译：广义重心坐标在多边形上的二次随机有限元。
7. Inf-sup stable finite elements on barycentric refinements producing divergence--free approximations in arbitrary dimensions [O] . Guzman, Johnny, Neilan, Michael 2017

机译：重心稳定有限元的重心精化产生发散 - 任意维度的自由近似
8. Rationale for p-Refinement with the Vector Helmholtz Equation and Two Dimensional Vector Finite Elements [R] . Preissig, R. S. , Peterson, A. F. 2004

机译：用矢量亥姆霍兹方程和二维向量有限元法进行p-细化的基本原理

INF-SUP STABLE FINITE ELEMENTS ON BARYCENTRIC REFINEMENTS PRODUCING DIVERGENCE-FREE APPROXIMATIONS IN ARBITRARY DIMENSIONS

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