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J. Bérenger (1994)
A perfectly matched layer for the absorption of electromagnetic wavesJournal of Computational Physics, 114
G. Aiello, S. Alfonzetti, S. Coco, N. Salerno (1996)
Finite element iterative solution of skin effect problems in open boundariesInternational Journal of Numerical Modelling-electronic Networks Devices and Fields, 9
P. Silvester, R. Ferrari (1983)
Finite Elements for Electrical Engineers
X. Brunotte, G. Meunier, J. Imhoff (1992)
Finite element modeling of unbounded problems using transformations: a rigorous, powerful and easy solutionIEEE Transactions on Magnetics, 28
S. Salon, J. D'Angelo (1988)
Applications of the hybrid finite element-boundary element method in electromagneticsIEEE Transactions on Magnetics, 24
G. Aiello, S. Alfonzetti, S. Coco, N. Salerno (1996)
A theoretical study of charge iterationCompel-the International Journal for Computation and Mathematics in Electrical and Electronic Engineering, 15
P. Silvester, D. Lowther, C. Carpenter, E. Wyatt (1977)
Exterior finite elements for 2-dimensional field problems with open boundaries, 124
C. Emson (1988)
Methods for the solution of open-boundary electromagnetic-field problems, 135
J. Brauer, S. Schaefer, Jin-Fa Lee, R. Mittra (1991)
Asymptotic boundary condition for three dimensional magnetostatic finite elementsIEEE Transactions on Magnetics, 27
P. Bettess (1988)
Finite element modelling of exterior electromagnetic problemsIEEE Transactions on Magnetics, 24
S. Groiss, O. Bíró, K. Preis, K. Richter (1997)
Finite element analysis of multiport filters using perfectly matched layersIEEE Transactions on Magnetics, 33
G. Aiello, S. Alfonzetti, G. Borzì (1997)
A Generalized Minimal Residual Acceleration of the Charge Iteration ProcedureJournal De Physique Iii, 7
O. Zienkiewicz, D. Kelly, P. Bettess (1977)
The coupling of the finite element method and boundary solution proceduresInternational Journal for Numerical Methods in Engineering, 11
I. Bardi, O. Bíró, K. Preis (1998)
Perfectly matched layers in static fieldsIEEE Transactions on Magnetics, 34
W. Pinello, M. Gribbons, A. Cangellaris (1996)
A new numerical grid truncation scheme for the finite difference of Laplace's equationIEEE Transactions on Magnetics, 32
D. Lowther, E. Freeman, B. Forghani (1989)
A sparse matrix open boundary method for finite element analysisIEEE Transactions on Magnetics, 25
I. Tičar, O. Bíró, K. Preis (1999)
A proof of the perfect matching property of PMLs in static fields, 35
G. Aiello, S. Alfonzetti, S. Coco (1994)
Charge iteration: A procedure for the finite element computation of unbounded electrical fieldsInternational Journal for Numerical Methods in Engineering, 37
This paper discusses the perfectly matched layer method recently proposed for the computation of static or quasistatic fields in open boundaries. In particular it is shown how the method can be derived by means of a particular co-ordinate transformation applied to a finite-size isotropic domain surrounding the system of interest. The method is therefore equivalent to a trivial truncation from the point of view of both accuracy and computing time.
COMPEL: The International Journal for Computation and Mathematics in Electrical and Electronic Engineering – Emerald Publishing
Published: Sep 1, 1999
Keywords: Electromagnetics; Finite element method; Magnetostatics; Open boundaries
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