Add to ORKGWe construct a family of hyperbolic 3-manifolds whose fundamental groups admit a cyclic presentation. We prove that all these manifolds are cyclic branched coverings of S^3 over the knot 5_2 and we compute their homology groups. Moreover, we show that the cyclic presentations correspond to spines of the manifolds
As a consequence of a general result about finite group actions on 3-manifolds, we show that a hyper...
We study two families of closed orientable three-dimensional manifolds, which are defined as cyclic ...
We collect several results on the determination of hyperbolic knots by means of their cyclic branche...
We construct a family of hyperbolic 3-manifolds whose fundamental groups admit a cyclic presentation...
We consider groups with cyclic presentations which arise as fundamental groups of a family of closed...
We give sufficient conditions for a π-hyperbolic knot to be determined, up to homeomorphism in S3, b...
This is a survey of results and open problems on compact connected 3-manifolds which admit spines co...
AbstractWe give sufficient conditions for a π-hyperbolic knot to be determined, up to homeomorphism ...
We prove that the n-fold cyclic coverings of the 3-sphere branched over the torus knots K(p,q), p > ...
A classical theorem of Hurewitz says that the isometry group of a closed 2-dimensional hyperbolic ma...
44 pages, 1 figure, this is a new version of the paper "Hyperelliptic rotations in finite groups act...
AbstractTwo of the main methods for the construction of closed orientable 3-manifolds, and in partic...
AbstractWe study two families of closed orientable three-dimensional manifolds, which are defined as...
We collect several results on the determination of hyperbolic knots by means of their cyclic branche...
As a consequence of a general result about finite group actions on 3-manifolds, we show that a hype...
As a consequence of a general result about finite group actions on 3-manifolds, we show that a hyper...
We study two families of closed orientable three-dimensional manifolds, which are defined as cyclic ...
We collect several results on the determination of hyperbolic knots by means of their cyclic branche...
We construct a family of hyperbolic 3-manifolds whose fundamental groups admit a cyclic presentation...
We consider groups with cyclic presentations which arise as fundamental groups of a family of closed...
We give sufficient conditions for a π-hyperbolic knot to be determined, up to homeomorphism in S3, b...
This is a survey of results and open problems on compact connected 3-manifolds which admit spines co...
AbstractWe give sufficient conditions for a π-hyperbolic knot to be determined, up to homeomorphism ...
We prove that the n-fold cyclic coverings of the 3-sphere branched over the torus knots K(p,q), p > ...
A classical theorem of Hurewitz says that the isometry group of a closed 2-dimensional hyperbolic ma...
44 pages, 1 figure, this is a new version of the paper "Hyperelliptic rotations in finite groups act...
AbstractTwo of the main methods for the construction of closed orientable 3-manifolds, and in partic...
AbstractWe study two families of closed orientable three-dimensional manifolds, which are defined as...
We collect several results on the determination of hyperbolic knots by means of their cyclic branche...
As a consequence of a general result about finite group actions on 3-manifolds, we show that a hype...
As a consequence of a general result about finite group actions on 3-manifolds, we show that a hyper...
We study two families of closed orientable three-dimensional manifolds, which are defined as cyclic ...
We collect several results on the determination of hyperbolic knots by means of their cyclic branche...