Interior and modal masters in condensation methods for eigenvalue problems

Voß, Heinrich

doi:10.15480/882.180

Interior and modal masters in condensation methods for eigenvalue problems

Citation Link: https://doi.org/10.15480/882.180

Publikationstyp

Working Paper

Date Issued

1997-01

Sprache

English

Author(s)

Voß, Heinrich

Institut

Mathematik E-10

TORE-DOI

10.15480/882.180

TORE-URI

http://tubdok.tub.tuhh.de/handle/11420/182

First published in

Preprints des Institutes für Mathematik

Number in series

11

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.

DDC Class

510: Mathematik

Lizenz

http://rightsstatements.org/vocab/InC/1.0/

Name

rep11.pdf

Size

112.58 KB

Format

Adobe PDF

Options

Interior and modal masters in condensation methods for eigenvalue problems