[en] We introduce and study a novel uniformization metric model for the
quasi-Fuchsian space QF(S) of a closed oriented surface S, defined through a
class of C-valued bilinear forms on S, called Bers metrics, which coincide with
hyperbolic Riemannian metrics along the Fuchsian locus. By employing this
approach, we present a new model of the holomorphic tangent bundle of QF(S)
that extends the metric model for Teichm\"uller space defined by Berger and
Ebin, and give an integral representation of the Goldman symplectic form and of
the holomorphic extension of the Weil-Petersson metric to QF(S), with a new
proof of its existence and non-degeneracy. We also determine new bounds for the
Schwarzian of Bers projective structures extending Kraus estimate. Lastly, we
use this formalism to give alternative proofs to several classic results in
quasi-Fuchsian theory.
Disciplines :
Mathematics
Author, co-author :
EL EMAM, Christian ; University of Luxembourg > Faculty of Science, Technology and Medicine (FSTM) > Department of Mathematics (DMATH)
Language :
English
Title :
A metric uniformization model for the Quasi-Fuchsian space
