Add to ORKGWe study the topological structure of the closed orientable 3-manifolds obtained by Dehn surgeries along certain links, first considered by Takahashi. The interest about such manifolds arises from the fact that they include well-known families of 3-manifolds, previously studied by several authors, as the Fibonacci manifolds, the Fractional Fibonacci manifolds, and the Sieradski manifolds, respectively. Our main results states that the Takahashi manifolds are 2-fold coverings of the 3-sphere branched along the closures of specified 3-string braids. We also describe many of the above-mentioned manifolds as n-folds cyclic branched coverings of the 3-sphere
This paper is a set of notes concerning the following related topics in 3-manifold topology: n-stran...
In this paper, a representation of closed 3-manifolds as branched coverings of the 3-sphere, proved ...
AbstractIt is well known that every closed orientable three-manifold is given as a three-fold branch...
We study the topological structure of the closed orientable 3-manifolds obtained by Dehn surgeries a...
We consider orientable closed 3-manifolds obtained by Dehn surgery with rational coefficients along ...
We consider orientable closed connected 3-manifolds obtained by Dehn surgeries with rational coeffic...
In this note, we review some recent results concerning the topology and geometry of closed connecte...
We present several results on the classification of the topological and geometrical structures of cl...
We consider orientable closed connected 3-manifolds obtained by performing Dehn surgery on the compo...
We study the topological structure and the homeomorphism problem for closed 3-manifolds M(n, k) obta...
Many three dimensional manifolds are two-fold branched covers of the three dimen-sional sphere. Howe...
We study a family of closed connected orientable 3-manifolds obtained by Dehn surgeries with rationa...
We consider groups with cyclic presentations which arise as fundamental groups of a family of closed...
AbstractWe consider manifolds obtained by Dehn surgery on closed pure 3-braids in S3, and show that ...
AbstractThe construction of 3-manifolds via Dehn surgery on links in S3 is an important technique in...
This paper is a set of notes concerning the following related topics in 3-manifold topology: n-stran...
In this paper, a representation of closed 3-manifolds as branched coverings of the 3-sphere, proved ...
AbstractIt is well known that every closed orientable three-manifold is given as a three-fold branch...
We study the topological structure of the closed orientable 3-manifolds obtained by Dehn surgeries a...
We consider orientable closed 3-manifolds obtained by Dehn surgery with rational coefficients along ...
We consider orientable closed connected 3-manifolds obtained by Dehn surgeries with rational coeffic...
In this note, we review some recent results concerning the topology and geometry of closed connecte...
We present several results on the classification of the topological and geometrical structures of cl...
We consider orientable closed connected 3-manifolds obtained by performing Dehn surgery on the compo...
We study the topological structure and the homeomorphism problem for closed 3-manifolds M(n, k) obta...
Many three dimensional manifolds are two-fold branched covers of the three dimen-sional sphere. Howe...
We study a family of closed connected orientable 3-manifolds obtained by Dehn surgeries with rationa...
We consider groups with cyclic presentations which arise as fundamental groups of a family of closed...
AbstractWe consider manifolds obtained by Dehn surgery on closed pure 3-braids in S3, and show that ...
AbstractThe construction of 3-manifolds via Dehn surgery on links in S3 is an important technique in...
This paper is a set of notes concerning the following related topics in 3-manifold topology: n-stran...
In this paper, a representation of closed 3-manifolds as branched coverings of the 3-sphere, proved ...
AbstractIt is well known that every closed orientable three-manifold is given as a three-fold branch...