Spacelike surfaces in anti de Sitter four-space from a contact viewpoint
DOI10.1134/S0081543809040130zbMath1201.53063OpenAlexW1981778439WikidataQ126002262 ScholiaQ126002262MaRDI QIDQ600694
María Del Carmen Romero Fuster, Shyuichi Izumiya, Dong He Pei
Publication date: 1 November 2010
Published in: Proceedings of the Steklov Institute of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1134/s0081543809040130
singularitiesanti de Sitter 4-spaceGauss-Bonnet type theoremhorospherical Gauss mapsLagrangian Gauss mapsnullcone Legendrian Gauss maps
Classes of solutions; algebraically special solutions, metrics with symmetries for problems in general relativity and gravitational theory (83C20) Global submanifolds (53C40) Global differential geometry of Lorentz manifolds, manifolds with indefinite metrics (53C50)
Related Items (4)
Cites Work
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- On singularities of mappings of Euclidean spaces. I. Mappings of the plane into the plane
- The horospherical Gauss-Bonnet type theorem in hyperbolic space
- On contact between submanifolds
- Stability of caustics
- The lightlike flat geometry on spacelike submanifolds of codimension two in Minkowski space
- Singularities of lightlike hypersurfaces in Minkowski four-space
- On singularities of submanifolds of higher dimensional Euclidean spaces
- Stability of \(C^ \infty\) mappings. IV: Classification of stable germs by R-algebras
- The lightcone Gauss map of a spacelike surface in Minkowski 4-space
- The Intrinsic Conformal Structure and Gauss Map of a Light-Like Hypersurface in Minkowski Space
- The S 2 -Valued Gauss Maps and Split Total Curvature of a Space-Like Codimension-2 Surface in Minkowski Space
- On Generic Composites of Maps
- Global properties of codimension two spacelike submanifolds in Minkowski space
- The hyperbolic Gauss map and quasiconformal reflections.
- SINGULARITIES OF HYPERBOLIC GAUSS MAPS
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