We improve and extend to the non-orientable case a recent result of Kar\ue1ba\u161, Mali\u10dk\ufd and Nedela concerning the classification of all orientable prime 3-manifolds of Heegaard genus two, triangulated with at most 42 coloured tetrahedra
We characterize combinatorial representations of minimal 3-manifolds by means of edge-coloured graph...
AbstractWe prove that each closed connected 3-manifold admits particular crystallizations with nice ...
AbstractIn his paper ‘Tetrahedron manifolds and space forms’, Molnar describes an infinite class of ...
We improve and extend to the non-orientable case a recent result of Karábaš, Maličký and Nedela conc...
AbstractWe improve and extend to the non-orientable case a recent result of Karábaš, Maličký and Ned...
The present paper follows the computational approach to 3-manifold classification via edge-coloured ...
AbstractWe give a simple alternative proof of the representation theorem of all genus two 3-manifold...
CRYSTALLIZATION CATALOGUES is a collection of algorithmic procedures, which can be used to construc...
The present paper adopts a computational approach to the study of nonorientable 3-manifolds: in fact...
Drawing together techniques from combinatorics and computer science, we improve the census algorithm...
Combinatorial topology makes unlimited use of refinements. These refinements translate into an unlim...
We present the census of all non-orientable, closed, connected 3-manifolds admitting a rigid crystal...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
The understanding and classification of (compact) 3-dimensional manifolds (without boundary) is with...
We introduce a representation of compact 3-manifolds without spherical boundary components via (regu...
We characterize combinatorial representations of minimal 3-manifolds by means of edge-coloured graph...
AbstractWe prove that each closed connected 3-manifold admits particular crystallizations with nice ...
AbstractIn his paper ‘Tetrahedron manifolds and space forms’, Molnar describes an infinite class of ...
We improve and extend to the non-orientable case a recent result of Karábaš, Maličký and Nedela conc...
AbstractWe improve and extend to the non-orientable case a recent result of Karábaš, Maličký and Ned...
The present paper follows the computational approach to 3-manifold classification via edge-coloured ...
AbstractWe give a simple alternative proof of the representation theorem of all genus two 3-manifold...
CRYSTALLIZATION CATALOGUES is a collection of algorithmic procedures, which can be used to construc...
The present paper adopts a computational approach to the study of nonorientable 3-manifolds: in fact...
Drawing together techniques from combinatorics and computer science, we improve the census algorithm...
Combinatorial topology makes unlimited use of refinements. These refinements translate into an unlim...
We present the census of all non-orientable, closed, connected 3-manifolds admitting a rigid crystal...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
The understanding and classification of (compact) 3-dimensional manifolds (without boundary) is with...
We introduce a representation of compact 3-manifolds without spherical boundary components via (regu...
We characterize combinatorial representations of minimal 3-manifolds by means of edge-coloured graph...
AbstractWe prove that each closed connected 3-manifold admits particular crystallizations with nice ...
AbstractIn his paper ‘Tetrahedron manifolds and space forms’, Molnar describes an infinite class of ...
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