Isometric immersions of the hyperbolic plane into the hyperbolic space
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Publication:5891738
DOI10.2748/tmj/1341249370zbMath1252.53015arXiv1009.3994OpenAlexW2030967932MaRDI QIDQ5891738
Publication date: 30 August 2012
Published in: Tôhoku Mathematical Journal. Second Series (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1009.3994
Geodesics in global differential geometry (53C22) Global submanifolds (53C40) Non-Euclidean differential geometry (53A35)
Related Items (6)
Complete flat fronts as hypersurfaces in Euclidean space ⋮ Isometric immersions with singularities between space forms of the same positive curvature ⋮ Extrinsically flat Möbius strips on given knots in 3-dimensional spaceforms ⋮ Global smooth geodesic foliations of the hyperbolic space ⋮ Spaces of geodesics of pseudo-Riemannian space forms and normal congruences of hypersurfaces ⋮ Characterization of manifolds of constant curvature by ruled surfaces
Cites Work
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- A parametrization of isometric immersions between hyperbolic spaces
- Flat surfaces with singularities in Euclidean 3-space
- On the space of oriented geodesics of hyperbolic 3-space
- Paracomplex structures and affine symmetric spaces
- Monopoles and geodesics
- Developable surfaces in hyperbolic space
- Singularities of flat fronts in hyperbolic space
- On isometric immersions between hyperbolic spaces
- Surfaces of Gaussian curvature zero in Euclidean 3-space
- On Spherical Image Maps Whose Jacobians Do Not Change Sign
- HOROCYCLIC SURFACES IN HYPERBOLIC 3-SPACE
- Geodesic flows of negatively curved manifolds with smooth stable and unstable foliations
- An Indefinite Kähler Metric on the Space of Oriented Lines
- ON THE GEOMETRY OF THE SPACE OF ORIENTED LINES OF THE HYPERBOLIC SPACE
- Isometric immersions of constant curvature manifolds
- Isometric immersions of the hyperbolic plane into the hyperbolic space
- Horospherical flat surfaces in hyperbolic 3-space
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