Small, Anthony (1999) Duality for a class of minimal surfaces in Rn+1. Tohoku Mathematical Journal, 51 (4). pp. 585-601. ISSN 0040-8735
Text
AS-Duality-1999.pdf
Download (817kB)
AS-Duality-1999.pdf
Download (817kB)
Abstract
Much is known about the geometry of a minimal surface in Euclidean space
whose Gauss map takes values on a linear subspace of the quadric hypersurface. We consider
minimal surfaces whose Gauss maps take values on rational normal curves. These are the
non-degenerate minimal surfaces with smallest possible Gaussian images. We show that the
geometry of such a minimal surface may be understood in terms of an auxiliary holomorphic
curve on the total space of a line bundle over the Gaussian image. This is related to classical
osculation duality. Natural analogues in higher dimensions of Enneper's surface, Henneberg's
surface and surfaces with Platonic symmetries are described in terms of algebraic curves.
Item Type: | Article |
---|---|
Keywords: | Duality; minimal surfaces; Rn+1; |
Academic Unit: | Faculty of Science and Engineering > Mathematics and Statistics |
Item ID: | 10101 |
Depositing User: | Dr. Anthony Small |
Date Deposited: | 15 Oct 2018 17:24 |
Journal or Publication Title: | Tohoku Mathematical Journal |
Publisher: | Tohoku University, Mathematical Institute |
Refereed: | Yes |
URI: | https://mural.maynoothuniversity.ie/id/eprint/10101 |
Use Licence: | This item is available under a Creative Commons Attribution Non Commercial Share Alike Licence (CC BY-NC-SA). Details of this licence are available here |
Repository Staff Only (login required)
Downloads
Downloads per month over past year