We prove that a finite topology properly embedded Bryant surface in a complete hyperbolic 3-manifold has finite total curvature. This permits us to describe the geometry of the ends of such a Bryant surface. Our theory applies to a larger class of Bryant surfaces, which we call quasi-embedded. We give many examples of these surfaces and we show their end structure is modelled on the quotient of a ruled Bryant catenoid end by a parabolic isometry. When the ambient hyperbolic 3-manifold is hyperbolic 3-space, the theorems we prove here were established by Collin, Hauswirth and Rosenberg, 2001.

Publié le : 2002-01-14
Classification: 

@article{1090351084,
     author = {Hauswirth, Laurent and Roitman, Pedro and Rosenberg, Harold},
     title = {The Geometry of Finite Topology Bryant Surfaces Quasi-Embedded in a Hyperbolic Manifold},
     journal = {J. Differential Geom.},
     volume = {60},
     number = {1},
     year = {2002},
     pages = { 55-101},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1090351084}
}

Hauswirth, Laurent; Roitman, Pedro; Rosenberg, Harold. The Geometry of Finite Topology Bryant Surfaces Quasi-Embedded in a Hyperbolic Manifold. J. Differential Geom., Tome 60 (2002) no. 1, pp.  55-101. http://gdmltest.u-ga.fr/item/1090351084/