Numerical Implementation of Meshless Method for Electromagnetic Field Governing Equations

Numerical Implementation of Meshless Method for Electromagnetic Field Governing Equations

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摘要 For electromagnetic governing equations formulated by magnetic vector potential and electric scalar potential,its detailed numerical implementation is achieved by using meshless method and Galerkin approach.And essential boundary and interface condition of electromagnetic field are imposed by means of Lagrange multiplier method.Furthermore,the influences of interpolation point number at essential boundary and interface on computational results are also discussed.Examples are given to validate the effects of meshless method and Lagrange multiplier approach for electromagnetic field. For electromagnetic governing equations formulated by magnetic vector potential and electric scalar potential, its detailed numerical implementation is achieved by using meshless method and Galerkin approach. And essential boundary and interface condition of electromagnetic field are imposed by means of Lagrange mul- tiplier method. Furthermore, the influences of interpolation point number at essential boundary and interface on computational results are also discussed. Examples are given to validate the effects of meshless method and Lagrange multiplier approach for electromagnetic field.

作者阳恩会王石刚莫锦秋徐威曹家勇

机构地区 School of Mechanical Engineering

出处《Journal of Shanghai Jiaotong university(Science)》 EI 2010年第5期535-540,共6页 上海交通大学学报（英文版）

基金 the National Natural Science Foundation of China(No.50875169)

关键词 meshless method electromagnetic equations Lagrange multiplier magnetic vector potential meshless method, electromagnetic equations, Lagrange multiplier, magnetic vector potential

分类号 TM15 [电气工程—电工理论与新技术] O441 [理学—电磁学]

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1MARECHAL Y, COULOMB J L, MEUNIER G, et al. Use of the diffuse element method for electromagnetic field computation [J]. IEEE Transactions on Magnetics, 1993, 29(2): 1475-1478.
2BATRA R C, PORFIRI M, SPINELLO D. Analysis of electrostatic MEMS using meshless local Perov- Galerkin (MLPG) method [J]. Engineering Analysis with Boundary Elements, 2006, 30(11): 949-962.
3LIu S Z, YANG Q X, CHEN H Y, et al. Improvement of the element-free Galerkin method for electromagnetic field calculation [J]. IEEE Transactions on Applied Superconductivity, 2004, 14(2): 1866-1869.
4LEE K M, LI Q, SUN H. Effects of numerical formulation on magnetic field computation using meshless methods [J]. IEEE Transactions on Magnetics, 2006, 42(9): 2164-2171.
5BOTTAUSCIO O, CHIAMPI M, MANZIN A. Eddy current problems in nonlinear media by the element-free Galerkin method [J]. Journal of Magnetism and Magnetic Materials, 2006, 304(2): e823-e825.
6BELYTSCHKO T, KRONGAUZ Y, ORGAN D, et al. Meshless methods: An overview and recent developments [J]. Computer Methods in Applied Mechanicals and Engineering, 1996, 139(1-4): 3-47.
7FERNANDEZ-MENDEZ S, HUERTA A. Imposing essential boundary conditions in mesh-free methods [J]. Computer Methods in Applied Mechanicals and Engineering, 2004, 193(12-14): 1257-1275.
8CORDES L W, MORAN B. Treatment of material discontinuity in the element-free Galerkin-method [J]. Computer Methods in Applied Mechanics and Engineering, 1996, 139(1-4): 75-89.
9HERAULT C, MARECHAL Y. Boundary and interface conditions in meshless methods [J]. IEEE Transactions on Magnetics, 1999, 35(3): 1450-1453.
10CONWAY J T. Trigonometric integrals for the magnetic field of the coil of rectangular cross section [J]. IEEE Transactions on Magnetics, 2006, 42(5): 1538-1548.

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Numerical Implementation of Meshless Method for Electromagnetic Field Governing Equations

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