Paper Info
Title
Multiscale Finite Element Modeling of Nonlinear Magnetoquasistatic Problems using Magnetic Induction Conforming Formulations
Abstract
In this paper we develop magnetic induction conforming multiscale formulations for magnetoquasistatic problems involving periodic materials. The formulations are derived using the periodic homogenization theory and applied within a heterogeneous multiscale approach. Therefore the fine-scale problem is replaced by a macroscale problem defined on a coarse mesh that covers the entire domain and many mesoscale problems defined on finely-meshed small areas around some points of interest of the macroscale mesh (e.g., numerical quadrature points). The exchange of information between these macro and meso problems is thoroughly explained in this paper. For the sake of validation, we consider a two-dimensional geometry of an idealized periodic soft magnetic composite.
Year
DOI
Venue
2018
10.1137/16M1081609
MULTISCALE MODELING & SIMULATION
Keywords
Field
DocType
multiscale modeling,computational homogenization,magnetoquasistatic problems,finite element method,composite materials,eddy currents,magnetic hysteresis,asymptotic expansion,convergence theory
Mathematical optimization,Nonlinear system,Electromagnetic induction,Homogenization (chemistry),Mathematical analysis,Numerical integration,Finite element method,Point of interest,Macro,Periodic graph (geometry),Mathematics
Journal
Volume
Issue
ISSN
16
1
1540-3459
Citations 
PageRank 
References 
0
0.34
7
Authors
5
Name
Order
Citations
PageRank
Innocent Niyonzima141.50
Ruth Vazquez Sabariego211.71
Patrick Dular300.68
Kevin Jacques400.34
Christophe Geuzaine59012.51