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MINIMAL IMMERSIONS OF KÄHLER MANIFOLDS INTO EUCLIDEAN SPACES

Published online by Cambridge University Press:  08 October 2003

Antonio J. Di Scala
Antonio J. Di Scala
Affiliation:
The University of Hull, Cottingham Road, Hull, HU6 7RX A.J.Di-Scala@maths.hull.ac.uk
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Abstract

It is proved here that a minimal isometric immersion of a Kähler-Einstein or homogeneous Kähler-manifold into an Euclidean space must be totally geodesic. As an application, it is shown that an open subset of the real hyperbolic plane ${\mathbb R}H^2$ cannot be minimally immersed into the Euclidean space. As another application, a proof is given that if an irreducible Kähler manifold is minimally immersed in a Euclidean space, then its restricted holonomy group must be $U(n)$, where $n = \dim_{\mathbb C}M$.Supported by an EPSRC Grant GR/R69174.

Keywords

53B25 (primary)53C42 (secondary)
Type
Notes and Papers
Information
Bulletin of the London Mathematical Society , Volume 35 , Issue 6 , November 2003 , pp. 825 - 827
Copyright
© The London Mathematical Society 2003

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