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A hierarchical multiscale framework for problems with multiscale source terms

✍ Scribed by Arif Masud; Leopoldo P. Franca

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
255 KB
Volume
197
Category
Article
ISSN
0045-7825

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✦ Synopsis

This paper presents a hierarchical multiscale framework for problems that involve multiscale source terms. An assumption on the additive decomposition of the source function results in consistent decoupling of the fully coupled system and constitutes the new method. The structure of this decomposition is investigated and its mathematical implications are delineated. This method results in variational embedding of fine-scale information that is derived from the fine-scale equations, in the corresponding coarse-scale equations. It therefore provides a mathematically consistent way of bridging information between disparate spatial scales in the response function that are induced by multiscale forcing functions.

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A parallel and multiscale strategy for the parametric study of transient dynamic problems with friction
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## Abstract The objective of this work is to develop an efficient strategy for the parametric study of dynamic problems involving contacts with friction. Our approach is based on the multiscale LATIN method with domain decomposition. This is a mixed method that deals with the forces and velocities