Title :
Meshless method based on orthogonal basis for computational electromagnetics
Author :
Zhang, Yong ; Shao, K.R. ; Xie, D.X. ; Lavers, J.D.
Author_Institution :
Coll. of Electr. & Electron. Eng., Huazhong Univ. of Sci. & Technol., Wuhan, China
fDate :
5/1/2005 12:00:00 AM
Abstract :
This paper discovers and researches problems on numerical oscillations of the solution in element-free Galerkin method (EFGM) when it uses high order polynomial basis, and puts forward the meshless method based on orthogonal basis (MLMBOB), which is composed of essential boundary conditions with Penalty method, then gets the numerical solutions of the partial differential equations. This method holds nearly all qualities of EFGM and removes many drawbacks of it, and it has high accuracy when high order orthogonal basis is used. Therefore, it is fit for many problems in engineering computational electromagnetics. Examples are given to prove the proposed method.
Keywords :
Galerkin method; boundary-value problems; computational electromagnetics; least squares approximations; partial differential equations; polynomials; element-free Galerkin method; engineering computational electromagnetics; essential boundary conditions; high order polynomial basis; meshless method; moving least square approximations; numerical oscillation; orthogonal basis; partial differential equations; penalty method; Boundary conditions; Computational electromagnetics; Educational institutions; Least squares approximation; Matrices; Moment methods; Multilevel systems; Partial differential equations; Polynomials; Shape; Meshless method; moving least square approximations; numerical oscillation; orthogonal basis; penalty method;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2005.844545
