Level sets of functions and symmetry sets of surface sections

Diatta, A.; Giblin, P.; Guilfoyle, B.; Klingenberg, W.

doi:10.1007/11537908_9

Level sets of functions and symmetry sets of surface sections

Diatta, A.; Giblin, P.; Guilfoyle, B.; Klingenberg, W.

Authors

A. Diatta

P. Giblin

B. Guilfoyle

Dr Wilhelm Klingenberg wilhelm.klingenberg@durham.ac.uk
Associate Professor

Contributors

R. R. Martin
Editor

H. E. Bez
Editor

M. A. Sabin
Editor

Abstract

We prove that the level sets of a real C s function of two variables near a non-degenerate critical point are of class C [s/2] and apply this to the study of planar sections of surfaces close to the singular section by the tangent plane at an elliptic or hyperbolic point, and in particular at an umbilic point. We go on to use the results to study symmetry sets of the planar sections. We also analyse one of the cases coming from a degenerate critical point, corresponding to an elliptic cusp of Gauss on a surface, where the differentiability is reduced to C [s/4]. However in all our applications we assume C ∞ smoothness.

Citation

Diatta, A., Giblin, P., Guilfoyle, B., & Klingenberg, W. (2005, October). Level sets of functions and symmetry sets of surface sections. Presented at Mathematics of Surfaces XI: 11th IMA international conference, Loughborough

Presentation Conference Type	Conference Paper (published)
Conference Name	Mathematics of Surfaces XI: 11th IMA international conference
Publication Date	2005-10
Print ISSN	0302-9743
Publisher	Springer Verlag
Volume	3604
Pages	147-160
Series Title	Lecture Notes in Computer Science
Book Title	Mathematics of surfaces XI: 11th IMA international conference, Loughborough, UK, September 5-7, 2005: proceedings
DOI	https://doi.org/10.1007/11537908_9
Public URL	https://durham-repository.worktribe.com/output/1162779