Publication Date
1998
Journal or Book Title
DUKE MATHEMATICAL JOURNAL
Abstract
In this note we classify all Bonnet pairs on a simply connected domain. Our main intent was to apply what we call a quaternionic function theory to a concrete problem in differential geometry. The ideas are simple: conformal immersions into quaternions or imaginary quaternions take the place of chart maps for a Riemann surface. Starting from a reference immersion we construct all conformal immersions of a given (simply connected) Riemann surface (up to translational periods) by spin transformations. With this viewpoint in mind we discuss how to construct all Bonnet pairs on a simply connected domain from isothermic surfaces and vice versa. Isothermic surfaces are solutions to a certain soliton equation and thus a simple dimension count tells us that we obtain Bonnet pairs which are not part of any of the classical Bonnet families. The corresponcence between Bonnet pairs and isothermic surfaces is explicit and to each isothermic surface we obtain a 4-parameter family of Bonnet pairs.
Pages
637-644
Volume
92
Issue
3
Recommended Citation
Kamberov, G; Pedit, F; and Pinkall, U, "Bonnet pairs and isothermic surfaces" (1998). DUKE MATHEMATICAL JOURNAL. 763.
Retrieved from https://scholarworks.umass.edu/math_faculty_pubs/763
Comments
This is the pre-published version harvested from arXiv. The published version is located at http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.dmj/1077231680