A DISCONTINUOUS GALERKIN FINITE ELEMENT METHOD FOR MULTIPHASE VISCOUS FLOW
- Submitting institution
-
University of Oxford
- Unit of assessment
- 11 - Computer Science and Informatics
- Output identifier
- 1959
- Type
- D - Journal article
- DOI
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10.1137/14098497X
- Title of journal
- SIAM JOURNAL ON SCIENTIFIC COMPUTING
- Article number
- -
- First page
- B591
- Volume
- 37
- Issue
- 4
- ISSN
- 1064-8275
- Open access status
- Out of scope for open access requirements
- Month of publication
- -
- Year of publication
- 2015
- URL
-
-
- Supplementary information
-
-
- Request cross-referral to
- -
- Output has been delayed by COVID-19
- No
- COVID-19 affected output statement
- -
- Forensic science
- No
- Criminology
- No
- Interdisciplinary
- No
- Number of additional authors
-
0
- Research group(s)
-
-
- Citation count
- 5
- Proposed double-weighted
- No
- Reserve for an output with double weighting
- No
- Additional information
- Multiphase flow is a commonly used mathematical model for engineered tissue and for tumour development. Computing solutions for such flows is thus an important problem. Heuristic methods are usually applied to continuous finite element solutions to smooth the discontinuities in the solutions predicted by these models. The discontinuous finite element method presented in this paper allows discontinuous solutions to be computed without the need for heuristics.
- Author contribution statement
- -
- Non-English
- No
- English abstract
- -