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A residual-driven local iterative corrector scheme for the multiscale finite element method
Lam H. Nguyen,
Dominik Schillinger
Civil, Environmental, and Geo- Engineering
Research output
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Contribution to journal
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Article
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peer-review
12
Scopus citations
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Dive into the research topics of 'A residual-driven local iterative corrector scheme for the multiscale finite element method'. Together they form a unique fingerprint.
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Keyphrases
Corrector Problem
100%
Residual-driven
100%
Generalized multiscale Finite Element Method (GMsFEM)
100%
Iterative Scheme
66%
Multiscale Basis Functions
66%
Microcomputed Tomography
33%
Stress Analysis
33%
Parallel Computing
33%
Fine Mesh
33%
Vertebrae
33%
Scale Separation
33%
Trabecular Microarchitecture
33%
Residual-driven Correction
33%
Engineering
Multiscale
100%
Corrector
100%
Finite Element Analysis
100%
Basis Function
33%
Illustrates
16%
Fine Mesh
16%
Interface Element
16%
Parallel Computer
16%
Computer Science
Basis Function
100%
Iterative Scheme
100%
Finite Element Analysis
100%
Interface Element
50%
Parallel Computer
50%