Construction of Arbitrary Order Finite Element Degree-of-Freedom Maps on Polygonal and Polyhedral Cell Meshes

Matthew W. Scroggs, Jørgen S. Dokken, C. Richardson, G. N. Wells
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引用次数: 54

Abstract

We develop a method for generating degree-of-freedom maps for arbitrary order Ciarlet-type finite element spaces for any cell shape. The approach is based on the composition of permutations and transformations by cell sub-entity. Current approaches to generating degree-of-freedom maps for arbitrary order problems typically rely on a consistent orientation of cell entities that permits the definition of a common local coordinate system on shared edges and faces. However, while orientation of a mesh is straightforward for simplex cells and is a local operation, it is not a strictly local operation for quadrilateral cells and, in the case of hexahedral cells, not all meshes are orientable. The permutation and transformation approach is developed for a range of element types, including arbitrary degree Lagrange, serendipity, and divergence- and curl-conforming elements, and for a range of cell shapes. The approach is local and can be applied to cells of any shape, including general polytopes and meshes with mixed cell types. A number of examples are presented and the developed approach has been implemented in open-source libraries.
多边形和多面体单元网格上任意阶有限元自由度映射的构造
本文提出了一种用于任意单元形状的任意阶ciarlet型有限元空间的自由度映射生成方法。该方法是基于细胞子实体的排列和转换的组合。当前为任意顺序问题生成自由度地图的方法通常依赖于单元实体的一致方向,允许在共享边和面上定义公共局部坐标系。然而,虽然网格的定向对于单纯形细胞来说是直接的,并且是一个局部操作,但对于四边形细胞来说并不是一个严格的局部操作,在六面体细胞的情况下,并不是所有的网格都是可定向的。排列和转换方法适用于一系列元素类型,包括任意程度的拉格朗日,偶然性,发散和卷曲一致的元素,以及一系列细胞形状。这种方法是局部的,可以应用于任何形状的细胞,包括一般的多面体和混合细胞类型的网格。文中给出了一些示例,并且开发的方法已经在开源库中实现。
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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