We consider Lorentz manifolds which carry a conformal gradient field with at least one zero. All such manifolds are necessarily locally conformally flat. If in addition the manifold is developable and the image of a development map is great enough one can describe the global conformal type by a 3-regular graph provided with two additional datas. We get this conformal invariants using certain conformal development maps into the projective standard quadric. All conformal diffeomorphisms of this projective quadric are nothing else than the projectivities of the ambient real projective space which preserve the quadric. In the proofs we often use this fact. As a by-product of a general existence theorem we give an infinite number of locally conformally flat Lorentz metrics on the differentiable manifold R^n which are in pairs not conformally equivalent.
Identifer | oai:union.ndltd.org:DUETT/oai:DUETT:duett-09132001-110146 |
Date | 13 September 2001 |
Creators | Becker, Markus |
Contributors | Prof. Dr. U. Dierkes, Prof. Dr. W. Kühnel |
Publisher | Gerhard-Mercator-Universitaet Duisburg |
Source Sets | Dissertations and other Documents of the Gerhard-Mercator-University Duisburg |
Language | German |
Detected Language | English |
Type | text |
Format | application/octet-stream, text/html, application/pdf |
Source | http://www.ub.uni-duisburg.de/ETD-db/theses/available/duett-09132001-110146/ |
Rights | unrestricted, I hereby certify that, if appropriate, I have obtained and attached hereto a written permission statement from the owner(s) of each third party copyrighted matter to be included in my thesis, dissertation, or project report, allowing distribution as specified below. I certify that the version I submitted is the same as that approved by my advisory committee. Hiermit erteile ich der Universitaet Duisburg das nicht-ausschliessliche Recht unter den unten angegebenen Bedingungen, meine Dissertation, Staatsexamens- oder Diplomarbeit, meinen Forschungs- oder Projektbericht zu veroeffentlichen und zu archivieren. Ich behalte das Urheberrecht und das Recht das Dokument zu veroeffentlichen und in anderen Arbeiten weiterzuverwenden. |
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