论文信息 - Geometric interpretation of discrete approaches to solving magnetostatic problems

Geometric interpretation of discrete approaches to solving magnetostatic problems

The finite-element approach can be considered as a tool for constructing finite dimensional systems of equations that approximate to field problems on the discrete level. Although the finite-element technique is explained typically in terms of variational or weighted-residual approaches, another, less familiar way is available to introduce the same ideas geometrically. Using magnetostatics as an example, we will show how finite-element-type system matrices can be developed by exploiting the geometric properties of so-called Whitney elements. The simple interpretation we gain thereby enables us to view also the convergence properties of finite-element-type schemes in an intuitive way.

L. Kettunen | F. Trevisan

[1] Alain Bossavit,et al. Generating Whitney forms of polynomial degree one and higher , 2002 .

[2] Enzo Tonti,et al. On the Geometrical Structure of Electromagnetism , 1999 .

[3] A. Tiero,et al. The geometry of linear heat conduction , 1991 .

[4] A. Bossavit. How weak is the "weak solution" in finite element methods? , 1998 .

[5] T. Tarhasaari,et al. Some realizations of a discrete Hodge operator: a reinterpretation of finite element techniques [for EM field analysis] , 1999 .

[6] Alain Bossavit,et al. Yee-like schemes on staggered cellular grids: a synthesis between FIT and FEM approaches , 2000 .

[7] T. Weiland. Time Domain Electromagnetic Field Computation with Finite Difference Methods , 1996 .

[8] L. Kettunen,et al. Yee‐like schemes on a tetrahedral mesh, with diagonal lumping , 1999 .

[9] E. Tonti. Finite Formulation of the Electromagnetic Field , 2001 .