Evolving surface finite element method for the Cahn-Hilliard equation
- Submitting institution
-
The University of Leeds
- Unit of assessment
- 11 - Computer Science and Informatics
- Output identifier
- UOA11-2951
- Type
- D - Journal article
- DOI
-
10.1007/s00211-014-0644-y
- Title of journal
- Numerische Mathematik
- Article number
- -
- First page
- 483
- Volume
- 129
- Issue
- 3
- ISSN
- 0029-599X
- Open access status
- Out of scope for open access requirements
- Month of publication
- June
- Year of publication
- 2014
- 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
- Yes
- Number of additional authors
-
1
- Research group(s)
-
D - CSE (Computational Science and Engineering)
- Citation count
- 24
- Proposed double-weighted
- No
- Reserve for an output with double weighting
- No
- Additional information
- The mathematical and computational study of PDEs on curved and moving domains is a growing field that needs many different approaches. This work provides a new model (used in, e.g., doi:10.1016/j.cma.2019.03.022 and doi:10.1051/m2an/2017037) and new tools for analyzing these approaches which have been applied to other nonlinear surface problems by the community (e.g. doi:10.3389/fams.2020.00021). A preprint of this work was key for Ranner receiving an EPSRC Doctoral Prize Fellowship.
- Author contribution statement
- -
- Non-English
- No
- English abstract
- -
