A parallel solver for the \(hp\)-version of finite element methods
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Publication:1371905
DOI10.1016/0045-7825(95)00942-6zbMath0918.73109OpenAlexW2052629981WikidataQ126583336 ScholiaQ126583336MaRDI QIDQ1371905
Publication date: 4 March 1999
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0045-7825(95)00942-6
parallel virtual machinemesh topologyglobal stiffness matrixfrontal matrixdynamic load distribution algorithmelimination operationsmessage passing library
Finite element methods applied to problems in solid mechanics (74S05) Parallel numerical computation (65Y05)
Related Items (3)
On operator splitting approach for parallel multi-frontal FE flow computation in a multiply dilated vessel ⋮ Error estimates and adaptive finite element methods ⋮ FEM and BEM parallel processing: theory and applications – a bibliography (1996‐2002)
Uses Software
Cites Work
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- Use of linear algebra kernels to build an efficient finite element solver
- Parallel implementation of multifrontal schemes
- Reordering sparse matrices for parallel elimination
- Additive Schwarz methods for the \(p\)-version finite element method
- A Fast Algorithm for Reordering Sparse Matrices for Parallel Factorization
- Partitioning Sparse Matrices with Eigenvectors of Graphs
- The Multifrontal Solution of Indefinite Sparse Symmetric Linear
- Modification of the minimum-degree algorithm by multiple elimination
- The Evolution of the Minimum Degree Ordering Algorithm
- Thep-Version of the Finite Element Method
- The Multifrontal Method for Sparse Matrix Solution: Theory and Practice
- Parallel Implementation of the $hp$-Version of the Finite Element Method on a Shared-Memory Architecture
- An Algorithm for Reducing the Bandwidth and Profile of a Sparse Matrix
- p-convergent finite element approximations in fracture mechanics
- Performance of the h–p version of the finite element method with various elements
- A frontal solution program for finite element analysis
- Nested Dissection of a Regular Finite Element Mesh
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