Add to ORKGA Schottky group in PSL(2, C) induces an open hyperbolic handlebody and its ideal boundary is a closed orientable surface S whose genus is equal to the rank of the Schottky group. This boundary surface is equipped with a (complex) projective structure and its holonomy representation is an epimorphism from pi_1(S) to the Schottky group. We will show that an arbitrary projective structure with the same holonomy representation is obtained by (2 pi-)grafting the basic structure described above
We study complex hyperbolic disc bundles over closed orientable surfaces that arise from discrete an...
This dissertation is a study of the representations of a knot or link group in PSL(2,cal C). We dete...
AbstractGiven a compact connected Riemann surface X equipped with an antiholomorphic involution τ, w...
A Schottky group in PSL(2, C) induces an open hyperbolic handlebody and its ideal boundary ...
In this thesis we study the holonomies of complex projective structures on surfaces. In a first part...
Dans cette thèse, on étudie les holonomies des structures projectives complexes sur les surfaces. Da...
This thesis examines the relationship between branched hyperbolic structures on surfaces and represe...
We prove that if S is a closed compact surface of genus g≥2, and if ρ:π1(S)→PSL(2,ℂ) is a quasi-Fuch...
We study a class of continuous deformations of branched complex projective structures on closed surf...
The aim of this paper is to determine the topology of the variety of representations of the fundamen...
We consider the problem of describing the projective imbeddings of a compact, complex, projective, f...
In this note, we classify the projective flat manifolds whose holonomy group is either a cyclic grou...
Let S be a closed oriented topological surface and let Γ be its fundamental group. The Teichmüller ...
The set of complex projective structures on a compact Riemann sur-face X is parameterized by the vec...
Abstract. We prove that any non-Fuchsian representation ρ of a sur-face group into PSL(2,R) is the h...
We study complex hyperbolic disc bundles over closed orientable surfaces that arise from discrete an...
This dissertation is a study of the representations of a knot or link group in PSL(2,cal C). We dete...
AbstractGiven a compact connected Riemann surface X equipped with an antiholomorphic involution τ, w...
A Schottky group in PSL(2, C) induces an open hyperbolic handlebody and its ideal boundary ...
In this thesis we study the holonomies of complex projective structures on surfaces. In a first part...
Dans cette thèse, on étudie les holonomies des structures projectives complexes sur les surfaces. Da...
This thesis examines the relationship between branched hyperbolic structures on surfaces and represe...
We prove that if S is a closed compact surface of genus g≥2, and if ρ:π1(S)→PSL(2,ℂ) is a quasi-Fuch...
We study a class of continuous deformations of branched complex projective structures on closed surf...
The aim of this paper is to determine the topology of the variety of representations of the fundamen...
We consider the problem of describing the projective imbeddings of a compact, complex, projective, f...
In this note, we classify the projective flat manifolds whose holonomy group is either a cyclic grou...
Let S be a closed oriented topological surface and let Γ be its fundamental group. The Teichmüller ...
The set of complex projective structures on a compact Riemann sur-face X is parameterized by the vec...
Abstract. We prove that any non-Fuchsian representation ρ of a sur-face group into PSL(2,R) is the h...
We study complex hyperbolic disc bundles over closed orientable surfaces that arise from discrete an...
This dissertation is a study of the representations of a knot or link group in PSL(2,cal C). We dete...
AbstractGiven a compact connected Riemann surface X equipped with an antiholomorphic involution τ, w...