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On the existence of harmonic morphisms from symmetric spaces of rank one

På svenska

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

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