The Teichmüller space of the Hirsch foliation

Álvarez, Sebastien - Lessa Echeverriarza, Pablo

Resumen:

We prove that the Teichmüller space of the Hirsch foliation (a minimal foliation of a closed 3-manifold by non-compact hyperbolic surfaces) is homeomorphic to the space of closed curves in the plane. This allows us to show that the space of hyperbolic metrics on the foliation is a trivial principal fiber bundle. And that the structure group of this bundle, the arc-connected component of the identity in the group of homeomorphisms which are smooth on each leaf and vary continuously in the smooth topology in the transverse direction of the foliation, is contractible.


Detalles Bibliográficos
2018
Teichmüller theory
Riemann surface foliations
Inglés
Universidad de la República
COLIBRI
https://hdl.handle.net/20.500.12008/22560
Acceso abierto
Licencia Creative Commons Atribución - Sin Derivadas (CC - By-ND 4.0)
Resumen:
Sumario:We prove that the Teichmüller space of the Hirsch foliation (a minimal foliation of a closed 3-manifold by non-compact hyperbolic surfaces) is homeomorphic to the space of closed curves in the plane. This allows us to show that the space of hyperbolic metrics on the foliation is a trivial principal fiber bundle. And that the structure group of this bundle, the arc-connected component of the identity in the group of homeomorphisms which are smooth on each leaf and vary continuously in the smooth topology in the transverse direction of the foliation, is contractible.