计算电磁学的高阶向量基

CEM'11 Computational Electromagnetics International Workshop Pub Date : 2011-10-17 DOI:10.1109/CEM.2011.6047355

R. Graglia

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引用次数: 1

摘要

对于最常用的二维和三维单元，新的层次旋度和散度一致的向量基族是直接由正交标量多项式构造的，以增强它们的线性独立性，这比应用于最终向量函数的正交化更简单。这些函数跨越nsamdsamet的混合顺序(或简化)空间，并可用于处理由不同几何形状的混合单元组成的网格结构。

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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High-order vector bases for computational electromagnetics

New families of hierarchical curl and divergence-conforming vector bases for the most commonly used two — and three-dimensional cells are directly constructed from orthogonal scalar polynomials to enhance their linear independence, which is a simpler process than an orthogonalization applied to the final vector functions. These functions span the mixed-order (or reduced) spaces of Nédélec and can be used to deal with structures meshed by a mixture of cells of different geometry.

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CEM'11 Computational Electromagnetics International Workshop

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