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Nonexistence results
and convex hull property for maximal surfaces in Minkowski
three-space
Rosa Maria Barreiro Chaves and Leonor Ferrer |
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Vol. 231 (2007), No. 1, 1–26
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Abstract |
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We study properly immersed maximal surfaces with nonempty boundary and singularities in three-dimensional Minkowski space. We use the maximum principle and scaling arguments to obtain nonexistence results for these surfaces when the boundary is planar. We also give sufficient conditions for such surfaces to satisfy the convex hull property. |
Keywordsmaximal surfaces |
Mathematical Subject ClassificationPrimary: 53C50 Secondary: 53C42, 53C80 |
MilestonesReceived: 15 December 2005 |
Authors |
| Rosa Maria Barreiro Chaves | |
| Departamento de
Matemática Instituto de Matemática e Estatística Universidade de São Paulo Rua do Matão, 1010 05508-090 São Paulo, SP Brazil |
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| http://www.ime.usp.br | |
| Leonor Ferrer | |
| Departamento de Geometría y
Topología Universidad de Granada 18071, Granada Spain |
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| http://www.ugr.es/~lferrer | |
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