Complex analysis and a class of Weingarten surfaces

dc.contributor.author

Bryant, R

dc.date.accessioned

2016-12-05T18:46:13Z

dc.date.issued

2011-05-27

dc.description.abstract

An idea of Hopf's for applying complex analysis to the study of constant mean curvature spheres is generalized to cover a wider class of spheres, namely, those satisfying a Weingarten relation of a certain type, namely H = f(H^2-K) for some smooth function f, where H and K are the mean and Gauss curvatures, respectively. The results are either not new or are minor extensions of known results, but the method, which involves introducing a different conformal structure on the surface than the one induced by the first fundamental form, is different from the one used by Hopf and requires less technical results from the theory of PDE than Hopf's methods. This is a TeXed version of a manuscript dating from early 1984. It was never submitted for publication, though it circulated to some people and has been referred to from time to time in published articles. It is being provided now for the convenience of those who have asked for a copy. Except for the correction of various grammatical or typographical mistakes and infelicities and the addition of some (clearly marked) comments at the end of the introduction, the text is that of the original.

dc.identifier

https://arxiv.org/abs/1105.5589

dc.identifier.uri

https://hdl.handle.net/10161/13146

dc.title

Complex analysis and a class of Weingarten surfaces

dc.type

Other article

duke.contributor.orcid

Bryant, R|0000-0002-4890-2471

pubs.author-url

https://arxiv.org/abs/1105.5589

pubs.confidential

false

pubs.organisational-group

Duke

pubs.organisational-group

Mathematics

pubs.organisational-group

Trinity College of Arts & Sciences

pubs.start-date

2011-05-27

Files

Original bundle

Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
1105.5589v1.pdf
Size:
152.6 KB
Format:
Adobe Portable Document Format