Add to ORKGVarious authors have previously established explicit lower bounds on the volume of hyperbolic orbifolds of dimension three and of hyperbolic manifolds of any dimension. A hyperbolic n-orbifold is a quotient of hyperbolic n-space by a discrete group Gamma of isometries of Hn . In pursuit of volume bounds for hyperbolic orbifolds, the presence of torsion elements in the group Gamma raise challenges that cannot be handled purely by the techniques developed in the manifold case. We will establish lower bounds on the volume of hyperbolic orbifolds that depend on dimension and the maximum order of the elliptic elements of Gamma. We also discuss progress in refining this result as well as applications.Ph.D.MathematicsPure SciencesUniversity of M...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
The computer programs SnapPea by Weeks and Geo by Casson have proven to be powerful tools in the stu...
This thesis is concerned with hyperbolic 3-orbifolds of small volume. An n-orbifold is a space which...
We will provide bounds on both the Betti numbers and the torsion part of the homology of hyperbolic ...
This book is an exposition of the theoretical foundations of hyperbolic manifolds. It is intended to...
Abstract. This paper proves lower bounds on the volume of a hyperbolic 3–orbifold whose singular loc...
In the present note we shall give geometric descriptions of the orientable hyperbolic 3-orbifolds o...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
Under mild topological restrictions, we obtain new linear upper bounds for the dimension of the mod ...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
Abstract. A spherical point of a Kleinian group ¡ is a point of H3 that is stabilized by a spherical...
AbstractFor n-dimensional hyperbolic manifolds of finite volume with m ⩾ 1 cusps a new lower volume ...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
The computer programs SnapPea by Weeks and Geo by Casson have proven to be powerful tools in the stu...
This thesis is concerned with hyperbolic 3-orbifolds of small volume. An n-orbifold is a space which...
We will provide bounds on both the Betti numbers and the torsion part of the homology of hyperbolic ...
This book is an exposition of the theoretical foundations of hyperbolic manifolds. It is intended to...
Abstract. This paper proves lower bounds on the volume of a hyperbolic 3–orbifold whose singular loc...
In the present note we shall give geometric descriptions of the orientable hyperbolic 3-orbifolds o...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
Under mild topological restrictions, we obtain new linear upper bounds for the dimension of the mod ...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
International audienceWe prove an extension of Milnor-Wood inequalities to a geometric situation. We...
Abstract. A spherical point of a Kleinian group ¡ is a point of H3 that is stabilized by a spherical...
AbstractFor n-dimensional hyperbolic manifolds of finite volume with m ⩾ 1 cusps a new lower volume ...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
In this paper, for each finite group G, we construct the first explicit examples of non-compact comp...
The computer programs SnapPea by Weeks and Geo by Casson have proven to be powerful tools in the stu...