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- Nadirashvili_surface abstract "In differential geometry, a Nadirashvili surface is an immersed complete bounded minimal surface in R3 with negative curvature. The first example of such a surface was constructed by Nadirashvili (1996). This simultaneously answered a question of Hadamard about whether there was an immersed complete bounded surface in R3 with negative curvature, and a question of Eugenio Calabi and Shing-Tung Yau about whether there was an immersed complete bounded minimal surface in R3.Hilbert (1901) showed that a complete immersed surface in R3 cannot have constant negative curvature, and Efimov (1963) show that the curvature cannot be bounded above by a negative constant. So Nadirashvili's surface necessarily has points where the curvature is arbitrarily close to 0.".
- Nadirashvili_surface wikiPageID "30581694".
- Nadirashvili_surface wikiPageRevisionID "447949845".
- Nadirashvili_surface hasPhotoCollection Nadirashvili_surface.
- Nadirashvili_surface subject Category:Differential_geometry.
- Nadirashvili_surface subject Category:Surfaces.
- Nadirashvili_surface type Artifact100021939.
- Nadirashvili_surface type Object100002684.
- Nadirashvili_surface type PhysicalEntity100001930.
- Nadirashvili_surface type Surface104362025.
- Nadirashvili_surface type Surfaces.
- Nadirashvili_surface type Whole100003553.
- Nadirashvili_surface comment "In differential geometry, a Nadirashvili surface is an immersed complete bounded minimal surface in R3 with negative curvature. The first example of such a surface was constructed by Nadirashvili (1996).".
- Nadirashvili_surface label "Nadirashvili surface".
- Nadirashvili_surface sameAs m.0g9wcf5.
- Nadirashvili_surface sameAs Q6957863.
- Nadirashvili_surface sameAs Q6957863.
- Nadirashvili_surface sameAs Nadirashvili_surface.
- Nadirashvili_surface wasDerivedFrom Nadirashvili_surface?oldid=447949845.
- Nadirashvili_surface isPrimaryTopicOf Nadirashvili_surface.