Title of article
Accurate discretization of a non-linear micromagnetic problem Original Research Article
Author/Authors
P.B. Monk، نويسنده , , O. Vacus، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2001
Pages
27
From page
5243
To page
5269
Abstract
In this paper we propose a finite element discretization of the Maxwell–Landau–Lifchitz–Gilbert equations governing the electromagnetic field in a ferromagnetic material. Our point of view is that it is desirable for the discrete problem to possess conservation properties similar to the continuous system. We first prove the existence of a new class of Liapunov functions for the continuous problem, and then for a variational formulation of the continuous problem. We also show a special continuous dependence result. Then we propose a family of mass-lumped finite element schemes for the problem. For the resulting semi-discrete problem we show that magnetization is conserved and that semi-discrete Liapunov functions exist. Finally we show the results of some computations that show the behavior of the fully discrete Liapunov functions.
Journal title
Computer Methods in Applied Mechanics and Engineering
Serial Year
2001
Journal title
Computer Methods in Applied Mechanics and Engineering
Record number
892305
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