电磁理论与离散外微积分

IF 6.7 1区 计算机科学 Q1 Physics and Astronomy Progress in Electromagnetics Research-Pier Pub Date : 2017-01-01 DOI:10.2528/PIER17051501
Shu C. Chen, W. Chew
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引用次数: 13

摘要

在简单格上建立了一个自包含的电磁理论。离散外微积分(DEC)不处理向量场,而是研究电场和磁场的离散微分形式,采用环心对偶实现对角Hodge星算子。本文证明了高斯定理和斯托克斯定理在12内是固有满足的,并且在这个简单格上也可以推导出许多其他的电磁定理,如惠更斯原理、互易定理、坡因亭定理等,这些定理与协链间楔形积的适当定义一致。这些定理的保留保证了对麦克斯韦方程组的这种处理不会导致虚假的解。
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Electromagnetic Theory with Discrete Exterior Calculus
A self-contained electromagnetic theory is developed on a simplicial lattice. Instead of dealing with vectorial field, discrete exterior calculus (DEC) studies the discrete differential forms of electric and magnetic fields, and circumcenter dual is adopted to achieve diagonal Hodge star operators. In this paper, Gauss’ theorem and Stokes’ theorem are shown to be satisfied inherently within DEC. Many other electromagnetic theorems, such as Huygens’ principle, reciprocity theorem, and Poynting’s theorem, can also be derived on this simplicial lattice consistently with an appropriate definition of wedge product between cochains. The preservation of these theorems guarantees that this treatment of Maxwell’s equations will not lead to spurious solutions.
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来源期刊
CiteScore
7.20
自引率
3.00%
发文量
0
审稿时长
1.3 months
期刊介绍: Progress In Electromagnetics Research (PIER) publishes peer-reviewed original and comprehensive articles on all aspects of electromagnetic theory and applications. This is an open access, on-line journal PIER (E-ISSN 1559-8985). It has been first published as a monograph series on Electromagnetic Waves (ISSN 1070-4698) in 1989. It is freely available to all readers via the Internet.
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