Topics
orientableBuilding
International audienceWe completely classify the topological and geometric structures of some series of closed connected orientable 3-manifolds introduced by Kim and Kostrikin in [20, 21] as quotient spaces of certain polyhedral 3-cells by pairwise identifications of their boundary faces. Then we study further classes of closed orientable 3-manifolds arising from similar polyhedral schemata, and describe their topological properties
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
AbstractThe problem of classifying, up to isometry, the orientable 3-manifolds that arise by identif...
We obtain a new combinatorial description of all closed connected 3-manifolds from handlebodies and ...
International audienceWe completely classify the topological and geometric structures of some series...
In this note, we review some recent results concerning the topology and geometry of closed connecte...
We study the topology and geometry of some series of closed connected orientable 3-manifolds constru...
Kim and Kostrikin constructed in Sbornik Math. 188 (1997) a tessellation on the boundary of a poly...
We construct an infinite family of closed connected orientable 3-manifolds by pairwise identificatio...
We construct infinite families of closed connected orientable 3-manifolds obtained from certain tri...
We study some series of finite presentations of groups and fibered closed 3-manifolds obtained by si...
We present several results on the classification of the topological and geometrical structures of cl...
We study a family of closed connected orientable 3-manifolds (which are examples of tetrahedron mani...
AbstractWe prove that there is an algorithm which determines whether or not a given 2-polyhedron can...
We study the topological structure and the homeomorphism problem for closed 3-manifolds M(n, k) obta...
In this paper we prove that every closed, connected and orientable 3-manifold of genus g can be obta...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
AbstractThe problem of classifying, up to isometry, the orientable 3-manifolds that arise by identif...
We obtain a new combinatorial description of all closed connected 3-manifolds from handlebodies and ...
International audienceWe completely classify the topological and geometric structures of some series...
In this note, we review some recent results concerning the topology and geometry of closed connecte...
We study the topology and geometry of some series of closed connected orientable 3-manifolds constru...
Kim and Kostrikin constructed in Sbornik Math. 188 (1997) a tessellation on the boundary of a poly...
We construct an infinite family of closed connected orientable 3-manifolds by pairwise identificatio...
We construct infinite families of closed connected orientable 3-manifolds obtained from certain tri...
We study some series of finite presentations of groups and fibered closed 3-manifolds obtained by si...
We present several results on the classification of the topological and geometrical structures of cl...
We study a family of closed connected orientable 3-manifolds (which are examples of tetrahedron mani...
AbstractWe prove that there is an algorithm which determines whether or not a given 2-polyhedron can...
We study the topological structure and the homeomorphism problem for closed 3-manifolds M(n, k) obta...
In this paper we prove that every closed, connected and orientable 3-manifold of genus g can be obta...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
AbstractThe problem of classifying, up to isometry, the orientable 3-manifolds that arise by identif...
We obtain a new combinatorial description of all closed connected 3-manifolds from handlebodies and ...
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