Alessia Cattabriga, Michele Mulazzani, Andrei Vesnin
Published 2009-01-15Version 1
We deal with Matveev complexity of compact orientable 3-manifolds represented via Heegaard diagrams. This lead us to the definition of modified Heegaard complexity of Heegaard diagrams and of manifolds. We define a class of manifolds which are generalizations of Dunwoody manifolds, including cyclic branched coverings of two-bridge knots and links, torus knots, some pretzel knots, and some theta-graphs. Using modified Heegaard complexity, we obtain upper bounds for their Matveev complexity, which linearly depend on the order of the covering. Moreover, using homology arguments due to Matveev and Pervova we obtain lower bounds.
Comments: 19 pages, 5 figures; accepted for publication on Journal of the Korean Mathematical Society
Heegaard diagrams and surgery descriptions for twisted face-pairing 3-manifolds
A complexity of compact 3-manifold via immersed surfaces
The complexity of orientable graph manifolds
![QR code for arXiv:0901.2288 [math.GT]](http://oss.arxitics.com/images/favicon.svg)