Title :
Updatable reduced order models for the finite element method
Author :
Xu, Xin ; Adams, Robert J.
Author_Institution :
Electr. & Comput. Eng., Univ. of Kentucky, Lexington, KY, USA
Abstract :
Matrix factorization and inversion methods based on overlapped localizing local global solution (OL-LOGOS) modes have been shown to have approximately O(N log N) or better complexity for low frequency electromagnetic problems. This efficiency of the OL-LOGOS factorization method makes it a good candidate for developing reduced order models (ROMs) for specific analysis and design tasks. This paper discusses how to build a reduced order model using the OL-LOGOS factorization for the finite element method (FEM). It is also shown that the resulting ROM can be rapidly updated when local changes are made to the underlying geometry. In some cases, the ROM update can be performed at a cost which scales as o(N).
Keywords :
computational electromagnetics; inverse problems; matrix decomposition; reduced order systems; OL-LOGOS factorization; ROM update; complexity; finite element method; inversion method; low frequency electromagnetic problem; matrix factorization; overlapped localizing local global solution modes; updatable reduced order model; Computers; Finite element methods; Geometry; Indexes; Matrix decomposition; Read only memory; Reduced order systems; FEM; Fast Direct solver; Reduced order model;
Conference_Titel :
Antennas and Propagation (APSURSI), 2011 IEEE International Symposium on
Conference_Location :
Spokane, WA
Print_ISBN :
978-1-4244-9562-7
DOI :
10.1109/APS.2011.5997232
