| dc.creator | BUOSI, Marcelo | |
| dc.creator | IZUMIYA, Shyuichi | |
| dc.creator | RUAS, Maria Aparecida Soares | |
| dc.date.accessioned | 2012-10-20T03:32:45Z | |
| dc.date.accessioned | 2018-07-04T15:38:12Z | |
| dc.date.available | 2012-10-20T03:32:45Z | |
| dc.date.available | 2018-07-04T15:38:12Z | |
| dc.date.created | 2012-10-20T03:32:45Z | |
| dc.date.issued | 2011 | |
| dc.identifier | GEOMETRIAE DEDICATA, v.154, n.1, p.9-26, 2011 | |
| dc.identifier | 0046-5755 | |
| dc.identifier | http://producao.usp.br/handle/BDPI/28826 | |
| dc.identifier | 10.1007/s10711-010-9565-9 | |
| dc.identifier | http://dx.doi.org/10.1007/s10711-010-9565-9 | |
| dc.identifier.uri | http://repositorioslatinoamericanos.uchile.cl/handle/2250/1625468 | |
| dc.description.abstract | We study horo-tight immersions of manifolds into hyperbolic spaces. The main result gives several characterizations of horo-tightness of spheres, answering a question proposed by Cecil and Ryan. For instance, we prove that a sphere is horo-tight if and only if it is tight in the hyperbolic sense. For codimension bigger than one, it follows that horo-tight spheres in hyperbolic space are metric spheres. We also prove that horo-tight hyperspheres are characterized by the property that both of its total absolute horospherical curvatures attend their minimum value. We also introduce the notion of weak horo-tightness: an immersion is weak horo-tight if only one of its total absolute curvature attends its minimum. We prove a characterization theorem for weak horo-tight hyperspheres. | |
| dc.language | eng | |
| dc.publisher | SPRINGER | |
| dc.relation | Geometriae Dedicata | |
| dc.rights | Copyright SPRINGER | |
| dc.rights | restrictedAccess | |
| dc.subject | Horo-tight immersion | |
| dc.subject | Sphere | |
| dc.subject | Hyperbolic space | |
| dc.subject | Horospherical geometry | |
| dc.subject | Totally absolute horospherical curvature | |
| dc.title | Horo-tight spheres in hyperbolic space | |
| dc.type | Artículos de revistas | |
