Add to ORKGWe define integral measures of complexity for Heegaard splittings based on the graph dual to the curve complex and on the pants complex defined by Hatcher and Thurston. As the Heegaard splitting is stabilized, the sequence of complexities turns out to converge to a non-trivial limit depending only on the manifold. We then use a similar method to compare different manifolds, defining a distance which converges under stabilization to an integer related to Dehn surgeries between the two manifolds
Abstract. In a previous paper [4] we introduced a notion of “genericity ” for countable sets of curv...
We deal with Matveev complexity of compact orientable 3-manifolds represented via Heegaard diagrams....
We study complexities of 3-manifolds defined from triangulations, Heegaard splittings, and surgery p...
We define integral measures of complexity for Heegaard splittings based on the graph dual t...
We define integral measures of complexity for Heegaard splittings based on the graph dual to the cur...
We define integral measures of complexity for Heegaard splittings based on the graph dual to the cur...
The complexity of a Heegaard splitting is the minimal intersection number of two essential simple cl...
AbstractJ. Hempel [J. Hempel, 3-manifolds as viewed from the curve complex, Topology 40 (3) (2001) 6...
Given a Heegaard splitting and an incompressible surface S and a Heegaard splitting of an irreducibl...
A Heegaard splitting (S; V1, V 2) for a closed 3-manifold M is a representation M = V1 ∪S V2 w...
J Hempel [Topology, 2001] showed that the set of distances of the Heegaard splittings (S,V, hn(V)) i...
AbstractWe define fat train tracks and use them to give a combinatorial criterion for the Hempel dis...
AbstractA Heegaard diagram for a 3-manifold is regarded as a pair of simplexes in the complex of cur...
AbstractLet ∪F W be a Heegaard splitting of a closed, connected, orientable 3-manifold M with genus ...
Abstract. Kevin Hartshorn showed that if a three-dimensional manifold M admits a Heegaard surface Σ ...
Abstract. In a previous paper [4] we introduced a notion of “genericity ” for countable sets of curv...
We deal with Matveev complexity of compact orientable 3-manifolds represented via Heegaard diagrams....
We study complexities of 3-manifolds defined from triangulations, Heegaard splittings, and surgery p...
We define integral measures of complexity for Heegaard splittings based on the graph dual t...
We define integral measures of complexity for Heegaard splittings based on the graph dual to the cur...
We define integral measures of complexity for Heegaard splittings based on the graph dual to the cur...
The complexity of a Heegaard splitting is the minimal intersection number of two essential simple cl...
AbstractJ. Hempel [J. Hempel, 3-manifolds as viewed from the curve complex, Topology 40 (3) (2001) 6...
Given a Heegaard splitting and an incompressible surface S and a Heegaard splitting of an irreducibl...
A Heegaard splitting (S; V1, V 2) for a closed 3-manifold M is a representation M = V1 ∪S V2 w...
J Hempel [Topology, 2001] showed that the set of distances of the Heegaard splittings (S,V, hn(V)) i...
AbstractWe define fat train tracks and use them to give a combinatorial criterion for the Hempel dis...
AbstractA Heegaard diagram for a 3-manifold is regarded as a pair of simplexes in the complex of cur...
AbstractLet ∪F W be a Heegaard splitting of a closed, connected, orientable 3-manifold M with genus ...
Abstract. Kevin Hartshorn showed that if a three-dimensional manifold M admits a Heegaard surface Σ ...
Abstract. In a previous paper [4] we introduced a notion of “genericity ” for countable sets of curv...
We deal with Matveev complexity of compact orientable 3-manifolds represented via Heegaard diagrams....
We study complexities of 3-manifolds defined from triangulations, Heegaard splittings, and surgery p...