On a conjecture of M. J. Dunwoody (Q2731594)
From MaRDI portal
 | This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: On a conjecture of M. J. Dunwoody |
scientific article; zbMATH DE number 1626162
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On a conjecture of M. J. Dunwoody |
scientific article; zbMATH DE number 1626162 |
Statements
2 October 2002
0 references
colored graphs
0 references
crystallizations
0 references
Heegaard splittings
0 references
symmetric Heegaard splittings
0 references
cyclic branched coverings
0 references
knots
0 references
Alexander polynomial
0 references
cyclically presented groups
0 references
spines
0 references
hyperbolic 3-manifolds
0 references
On a conjecture of M. J. Dunwoody (English)
0 references
The authors prove that any closed orientable 3-manifold represented by a symmetric Heegaard diagram is homeomorphic to a cyclic covering of the 3-sphere branched over a certain knot (or link), which was conjectured by M. Dunwoody in 1995. To do that they establish connections between three combinatorial representations of closed orientable 3-manifolds: Heegaard diagrams, branched coverings and crystallizations. As a consequence they describe some classes of knots and they classify the geometric structure of their cyclic branched coverings. A table showing a partial output of a computer program which generates cyclic presentations for fundamental groups of the cyclic branched coverings of 3-bridge knots up to nine crossings is given.
0 references
