There is a deep and well known relationship between the
geometry of the classical hyperbolic space and the Moebius geometry of
its boundary at infinity. We generalize this relation to more general
negatively curved spaces. In particular we are interested in a
characterization of the boundaries of rank one symmetric
spaces in terms of Moebius geometry. This is joined work with Sergei
Buyalo and Thomas Foertsch.
| When? | 05.03.2013 17:15 |
|---|---|
| Where? | PER 08 Phys 2.52 Chemin du Musée 3, 1700 Fribourg |
| Contact | Department of Mathematics isabella.schmutz@unifr.ch |