ORBi: Dang Quoc Vuong - Subproblem h-Conform Magnetodynamic Finite Element Formulation for Accurate Model of Multiply Connected Thin Regions

Reference : Subproblem h-Conform Magnetodynamic Finite Element Formulation for Accurate Model of Mul...


	Document type :	Scientific congresses and symposiums : Paper published in a book
	Discipline(s) :	Engineering, computing & technology : Electrical & electronics engineering
	To cite this reference:	http://hdl.handle.net/2268/128088

Title :	Subproblem h-Conform Magnetodynamic Finite Element Formulation for Accurate Model of Multiply Connected Thin Regions
Language :	English
Author, co-author :	Dang, Quoc Vuong [Université de Liège - ULg > Dép. d'électric., électron. et informat. (Inst.Montefiore) > Applied and Computational Electromagnetics (ACE) >]
	Dular, Patrick [Université de Liège - ULg > Dép. d'électric., électron. et informat. (Inst.Montefiore) > Applied and Computational Electromagnetics (ACE) >]
	Vazquez Sabariego, Ruth [Université de Liège - ULg > Dép. d'électric., électron. et informat. (Inst.Montefiore) > Applied and Computational Electromagnetics (ACE) >]
	Krahenbuhl, Laurent []
	Geuzaine, Christophe [Université de Liège - ULg > Dép. d'électric., électron. et informat. (Inst.Montefiore) > Applied and Computational Electromagnetics (ACE) >]
Publication date :	3-Jul-2012
Main document title :	Proceedings of the 7th European Conference on Numerical Methods in Electromagnetism (NUMELEC 2012)
Pages :	72-73
Audience :	International
Event name :	Proceedings of the 7th European Conference on Numerical Methods in Electromagnetism (NUMELEC 2012)
Event date :	from 3-7-2012 to 5-7-2012
Event place (city) :	Marseille
Event country :	France
Keywords :	[en] Eddy current, finite element method (FEM), magnetodynamics, subproblem method (SPM), thin shell (TS) ; subproblem method
Abstract :	[en] A subproblem $\vh$-conform eddy current finite element method is proposed for correcting the inaccuracies inherent to thin shell models. Such models replace volume thin regions by surfaces but neglect border effects in the vicinity of their edges and corners. The developed surface-to-volume correction problem is defined as a step of the multiple subproblems applied to a complete problem, consisting of inductors and magnetic or conducting regions, some of these being thin regions. The general case of multiply connected thin regions is considered.
Research units :	ACE
Target :	Researchers ; Professionals ; Students
Permalink :	http://hdl.handle.net/2268/128088

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Restricted access	2012_Numelec_ThinShellCorrectionSP.pdf		Publisher postprint	871.6 kB	Request copy

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