Schmalz, Gerd; Slovak, J

Author(s)

Schmalz, Gerd

Slovak, J

Publication Date

2003

Abstract

The aim of this article is to show how the individual harmonic components of the torsion of the canonical Cartan connection of embedded hyperbolic and elliptic CRmanifolds at a given point can be read off from the third order terms of the defining equation given in normal form. The general theory ensures that the vanishing of each of these one-dimensional components implies striking geometric consequences and we link each of them to an easily computable coefficient in the normal form. This allows to correct a mistake in [SS00] where it was claimed that four torsion components out of six vanish automatically for embedded CR-manifolds. The failure in that article appears already in Lemma 1.1 where the second order osculation was not dealt with carefully enough. At the same time, the rest of [SS00] is essentially worked out for abstract CR–structures and so the validity of the procedures and results has not been effected in general. In what follows, we use the terminology and notation of [SS00] without further comments.

Citation

The Asian Journal of Mathematics, 7(3), p. 303-306

ISSN

1093-6106

Link

https://hdl.handle.net/1959.11/2955

Publisher

International Press

Title

Addendum to 'The Geometry of Hyperbolic and Elliptic CR-Manifolds of Codimension Two'

Type of document

Journal Article

Entity Type

Publication

Author(s)	Schmalz, Gerd Slovak, J
Publication Date	2003
Abstract	The aim of this article is to show how the individual harmonic components of the torsion of the canonical Cartan connection of embedded hyperbolic and elliptic CRmanifolds at a given point can be read off from the third order terms of the defining equation given in normal form. The general theory ensures that the vanishing of each of these one-dimensional components implies striking geometric consequences and we link each of them to an easily computable coefficient in the normal form. This allows to correct a mistake in [SS00] where it was claimed that four torsion components out of six vanish automatically for embedded CR-manifolds. The failure in that article appears already in Lemma 1.1 where the second order osculation was not dealt with carefully enough. At the same time, the rest of [SS00] is essentially worked out for abstract CR–structures and so the validity of the procedures and results has not been effected in general. In what follows, we use the terminology and notation of [SS00] without further comments.
Citation	The Asian Journal of Mathematics, 7(3), p. 303-306
ISSN	1093-6106
Link	https://hdl.handle.net/1959.11/2955
Publisher	International Press
Title	Addendum to 'The Geometry of Hyperbolic and Elliptic CR-Manifolds of Codimension Two'
Type of document	Journal Article
Entity Type	Publication

Addendum to 'The Geometry of Hyperbolic and Elliptic CR-Manifolds of Codimension Two'

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