Please use this identifier to cite or link to this item: https://doi.org/10.15480/882.180
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Title: Interior and modal masters in condensation methods for eigenvalue problems
Language: English
Authors: Voß, Heinrich 
Issue Date: Jan-1997
Part of Series: Preprints des Institutes für Mathematik 
Volume number: 11
Abstract (english): In the dynamic analysis of structures condensation methods are often used to reduce the number of degrees of freedom to manageable size. Substructuring and choosing the master variables as the degrees of freedom on the interfaces of the substructures yields data structures which are well suited to be implemented on parallel computers. In this paper we discuss the additional use of interior masters and modal masters in substructuring. The data structure is preserved such that the condensed problem can be determined substructurewise.
URI: http://tubdok.tub.tuhh.de/handle/11420/182
DOI: 10.15480/882.180
Institute: Mathematik E-10 
Type: ResearchPaper
License: In Copyright In Copyright
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