Add to ORKGWe prove that every cusped hyperbolic 3-manifold has a finite cover admitting infinitely many geometric ideal triangulations. Furthermore, every long Dehn filling of one cusp in this cover admits infinitely many geometric ideal triangulations. This cover is constructed in several stages, using results about separability of peripheral subgroups and their double cosets, in addition to a new conjugacy separability theorem that may be of independent interest. The infinite sequence of geometric triangulations is supported in a geometric submanifold associated to one cusp, and can be organized into an infinite trivalent tree of Pachner moves.Mathematic
We give effective bilipschitz bounds on the change in metric between thick parts of a cusped hyperbo...
It is conjectured that every cusped hyperbolic 3-manifold has a decomposition into positive volume i...
24 pages, 15 figures, typos correctedInternational audienceWe introduce a simple algorithm which tra...
Every cusped, finite-volume hyperbolic three-manifold has a canonical decomposition into ideal polyh...
The aim of this paper is to demonstrate that very many Dehn fillings on a cusped hyperbolic 3-manifo...
We introduce a simple algorithm which transforms every four-dimensional cubulation into a cusped fin...
Abstract. We introduce an algorithm which transforms every four-dimensional cubulation into an orien...
AbstractIn this paper, we study the differences between algebraic and geometric solutions of hyperbo...
UnrestrictedWe explicitly construct the unique hyperbolic metric carried by the following three -- d...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
Thesis advisor: Robert MeyerhoffThurston showed that for all but a finite number of Dehn Surgeries o...
We establish a bijective correspondence between the set T(n) of 3-dimensional triangulations with n ...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
It is shown that every non-compact hyperbolic manifold of finite volume has a finite cover admitting...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
We give effective bilipschitz bounds on the change in metric between thick parts of a cusped hyperbo...
It is conjectured that every cusped hyperbolic 3-manifold has a decomposition into positive volume i...
24 pages, 15 figures, typos correctedInternational audienceWe introduce a simple algorithm which tra...
Every cusped, finite-volume hyperbolic three-manifold has a canonical decomposition into ideal polyh...
The aim of this paper is to demonstrate that very many Dehn fillings on a cusped hyperbolic 3-manifo...
We introduce a simple algorithm which transforms every four-dimensional cubulation into a cusped fin...
Abstract. We introduce an algorithm which transforms every four-dimensional cubulation into an orien...
AbstractIn this paper, we study the differences between algebraic and geometric solutions of hyperbo...
UnrestrictedWe explicitly construct the unique hyperbolic metric carried by the following three -- d...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
Thesis advisor: Robert MeyerhoffThurston showed that for all but a finite number of Dehn Surgeries o...
We establish a bijective correspondence between the set T(n) of 3-dimensional triangulations with n ...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
It is shown that every non-compact hyperbolic manifold of finite volume has a finite cover admitting...
none1noOne of the most useful tools for studying hyperbolic 3-manifolds is the technique of ideal tr...
We give effective bilipschitz bounds on the change in metric between thick parts of a cusped hyperbo...
It is conjectured that every cusped hyperbolic 3-manifold has a decomposition into positive volume i...
24 pages, 15 figures, typos correctedInternational audienceWe introduce a simple algorithm which tra...