Equidistants for families of surfaces
- Submitting institution
-
Liverpool Hope University
- Unit of assessment
- 11 - Computer Science and Informatics
- Output identifier
- GR13C
- Type
- D - Journal article
- DOI
-
10.5427/jsing.2020.21f
- Title of journal
- Journal of Singularities
- Article number
- 6
- First page
- 117
- Volume
- 21
- Issue
- -
- ISSN
- 1949-2006
- Open access status
- Compliant
- Month of publication
- -
- Year of publication
- 2020
- URL
-
http://journalofsing.org/volume21/article6.html
- Supplementary information
-
-
- Request cross-referral to
- 10 - Mathematical Sciences
- Output has been delayed by COVID-19
- No
- COVID-19 affected output statement
- -
- Forensic science
- No
- Criminology
- No
- Interdisciplinary
- No
- Number of additional authors
-
1
- Research group(s)
-
M - Mathematical Sciences Research (MSR)
- Citation count
- 0
- Proposed double-weighted
- No
- Reserve for an output with double weighting
- No
- Additional information
- This paper is the latest in a series of papers concerning the Lagrangian and Legendrian singularities of certain singular varieties associated with pairs of submanifolds in affine space. The paper is the first contribution that considers the case for surfaces where the Lagrangian submanifold is itself singular. Little is known about this situation and according to Vladimir Arnol’d (stated in 1989) only the simplest singularities in such cases have been studied.
- Author contribution statement
- -
- Non-English
- No
- English abstract
- -
