On the existence of harmonic morphisms from symmetric spaces of rank one
Author
Summary, in English
In this paper we give a unified framework for constructing harmonic morphisms from the irreducible Riemannian symmetric spaces HHn, CHn, RH2n+l, HPn, CPn and RP2n+1 of rank one. Using this we give a positive answer to the global existence problem for the non-compact hyperbolic cases.
Department/s
- Mathematics (Faculty of Sciences)
- Differential Geometry
Publishing year
1997
Language
English
Pages
421-433
Publication/Series
Manuscripta Mathematica
Volume
93
Issue
4
Document type
Journal article
Publisher
Springer
Topic
- Geometry
Keywords
- MAPS
- FORMS
- MANIFOLDS
- PROJECTIVE SPACES
- CONFORMAL FOLIATIONS
- MINIMAL SUBMANIFOLDS
Status
Published
Research group
- Differential Geometry
ISBN/ISSN/Other
- ISSN: 1432-1785