H(div)-conforming 有限元张量与约束条件

IF 1.4 Q2 MATHEMATICS, APPLIED Results in Applied Mathematics Pub Date : 2024-08-01 DOI:10.1016/j.rinam.2024.100494

Long Chen , Xuehai Huang

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引用次数: 0

摘要

本研究开发了 H(div)-conforming 有限元张量的统一构造，包括矢量张量、对称矩阵张量、无痕矩阵张量，以及一般具有线性约束的张量。它基于将拉格朗日元素几何分解为每个子复数上的气泡函数。子复数上的每个张量进一步分解为切向分量和法向分量。切向分量构成气泡函数空间，而法线分量则是迹线的特征。一些自由度可以重新分配到 (n-1) 维面。所开发的有限元空间符合 H(div)，并满足离散 inf-sup 条件。此外，还建立了约束张量空间的内在基础。

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H(div)-conforming finite element tensors with constraints

A unified construction of $H (div)$ -conforming finite element tensors, including vector element, symmetric matrix element, traceless matrix element, and, in general, tensors with linear constraints, is developed in this work. It is based on the geometric decomposition of Lagrange elements into bubble functions on each sub-simplex. Each tensor at a sub-simplex is further decomposed into tangential and normal components. The tangential component forms the bubble function space, while the normal component characterizes the trace. Some degrees of freedom can be redistributed to $(n - 1)$ -dimensional faces. The developed finite element spaces are $H (div)$ -conforming and satisfy the discrete inf-sup condition. Intrinsic bases of the constraint tensor space are also established.