论文信息 - Some realizations of a discrete Hodge operator: a reinterpretation of finite element techniques [for EM field analysis]

Some realizations of a discrete Hodge operator: a reinterpretation of finite element techniques [for EM field analysis]

In this paper, some structures which underlie the numerical treatment of second-order boundary value problems are studied using magnetostatics as an example. The authors show that the construction of a discrete Hodge is a central problem. In this light, they interpret finite element techniques as a realization of the discrete Hodge operator in the Whitney complex. This enables one to view the Galerkin method as a way to set up circuit equations, the metric of space being encoded in the values of branch impedances.

T. Tarhasaari | L. Kettunen | A. Bossavit

[1] H. Flanders. Differential Forms with Applications to the Physical Sciences , 1964 .

[2] R. Albanese,et al. Integral formulation for 3D eddy-current computation using edge elements , 1988 .

[3] A. Bossavit. Whitney forms: a class of finite elements for three-dimensional computations in electromagnetism , 1988 .

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

[5] A. M. Winslow. Numerical Solution of the Quasilinear Poisson Equation in a Nonuniform Triangle Mesh , 1997 .

[6] C. Mattiussi. An Analysis of Finite Volume, Finite Element, and Finite Difference Methods Using Some Concepts from Algebraic Topology , 1997 .

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

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