Generalized Heegaard splittings and the disk complex
Abstract
Let be an orientable, irreducible -manifold and a weakly reducible, unstabilized Heegaard splitting of of genus at least three. In this article, we define an equivalent relation on the set of the generalized Heegaard splittings obtained by weak reductions and find special subsets of the disk complex named by the "equivalent clusters", where we can find a canonical function from the set of equivalent clusters to the set of the equivalent classes for the relation . As an application, we prove that if is topologically minimal and the topological index of is at least three, then there is a -simplex in formed by two weak reducing pairs such that the equivalent classes of the generalized Heegaard splittings obtained by weak reductions along the weak reducing pairs for the relation are different. In the last section, we prove is a bijection if the genus of is three. Using it, we prove there is a canonical function from the set of components of to the set of the isotopy classes of the generalized Heegaard splittings obtained by weak reductions and describe what is.
Keywords
Cite
@article{arxiv.1607.00532,
title = {Generalized Heegaard splittings and the disk complex},
author = {Jungsoo Kim},
journal= {arXiv preprint arXiv:1607.00532},
year = {2023}
}
Comments
40 pages, 5 figures, This article is the generalization of the authour's previous article arXiv:1412.2228 to arbitrarily high genus cases