The value of continuity: Refined isogeometric analysis and fast direct solvers
We propose the use of highly continuous finite element spaces interconnected with low continuity hyperplanes to maximize the performance of direct solvers. Starting from a highly continuous Isogeometric Analysis (IGA) discretization, we introduce . C0-separators to reduce the interconnection between...
| Main Authors: | , , , , , |
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| Format: | Journal Article |
| Published: |
2016
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| Online Access: | http://hdl.handle.net/20.500.11937/50863 |
| _version_ | 1848758554488471552 |
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| author | Garcia, D. Pardo, D. Dalcin, L. Paszynski, M. Collier, N. Calo, Victor |
| author_facet | Garcia, D. Pardo, D. Dalcin, L. Paszynski, M. Collier, N. Calo, Victor |
| author_sort | Garcia, D. |
| building | Curtin Institutional Repository |
| collection | Online Access |
| description | We propose the use of highly continuous finite element spaces interconnected with low continuity hyperplanes to maximize the performance of direct solvers. Starting from a highly continuous Isogeometric Analysis (IGA) discretization, we introduce . C0-separators to reduce the interconnection between degrees of freedom in the mesh. By doing so, both the solution time and best approximation errors are simultaneously improved. We call the resulting method "refined Isogeometric Analysis (rIGA)". To illustrate the impact of the continuity reduction, we analyze the number of Floating Point Operations (FLOPs), computational times, and memory required to solve the linear system obtained by discretizing the Laplace problem with structured meshes and uniform polynomial orders. Theoretical estimates demonstrate that an optimal continuity reduction may decrease the total computational time by a factor between . p2 and . p3, with . p being the polynomial order of the discretization. Numerical results indicate that our proposed refined isogeometric analysis delivers a speed-up factor proportional to . p2. In a . 2D mesh with four million elements and . p=5, the linear system resulting from rIGA is solved 22 times faster than the one from highly continuous IGA. In a . 3D mesh with one million elements and . p=3, the linear system is solved 15 times faster for the refined than the maximum continuity isogeometric analysis. |
| first_indexed | 2025-11-14T09:45:50Z |
| format | Journal Article |
| id | curtin-20.500.11937-50863 |
| institution | Curtin University Malaysia |
| institution_category | Local University |
| last_indexed | 2025-11-14T09:45:50Z |
| publishDate | 2016 |
| recordtype | eprints |
| repository_type | Digital Repository |
| spelling | curtin-20.500.11937-508632018-08-28T00:16:25Z The value of continuity: Refined isogeometric analysis and fast direct solvers Garcia, D. Pardo, D. Dalcin, L. Paszynski, M. Collier, N. Calo, Victor We propose the use of highly continuous finite element spaces interconnected with low continuity hyperplanes to maximize the performance of direct solvers. Starting from a highly continuous Isogeometric Analysis (IGA) discretization, we introduce . C0-separators to reduce the interconnection between degrees of freedom in the mesh. By doing so, both the solution time and best approximation errors are simultaneously improved. We call the resulting method "refined Isogeometric Analysis (rIGA)". To illustrate the impact of the continuity reduction, we analyze the number of Floating Point Operations (FLOPs), computational times, and memory required to solve the linear system obtained by discretizing the Laplace problem with structured meshes and uniform polynomial orders. Theoretical estimates demonstrate that an optimal continuity reduction may decrease the total computational time by a factor between . p2 and . p3, with . p being the polynomial order of the discretization. Numerical results indicate that our proposed refined isogeometric analysis delivers a speed-up factor proportional to . p2. In a . 2D mesh with four million elements and . p=5, the linear system resulting from rIGA is solved 22 times faster than the one from highly continuous IGA. In a . 3D mesh with one million elements and . p=3, the linear system is solved 15 times faster for the refined than the maximum continuity isogeometric analysis. 2016 Journal Article http://hdl.handle.net/20.500.11937/50863 10.1016/j.cma.2016.08.017 fulltext |
| spellingShingle | Garcia, D. Pardo, D. Dalcin, L. Paszynski, M. Collier, N. Calo, Victor The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title | The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title_full | The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title_fullStr | The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title_full_unstemmed | The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title_short | The value of continuity: Refined isogeometric analysis and fast direct solvers |
| title_sort | value of continuity: refined isogeometric analysis and fast direct solvers |
| url | http://hdl.handle.net/20.500.11937/50863 |