Ayako Ido
Published 2010-02-16, updated 2010-05-20Version 2
Let $P, Q$ be Heegaard surfaces of a closed orientable 3-manifold. In this paper, we introduce a method for giving an upper bound of Hempel distance of $P$ by using the Reeb graph derived from a certain horizontal arc in the ambient space $[0,1]\times[0,1]$ of the Rubinstein-Scharlemann graphic derived from $P$ and $Q$. This is a refinement of a part of Johnson's arguments used for determining stable genera required for flipping high distance Heegaard splittings.
Comments: 17 pages, 22 figures
On keen Heegaard splittings
On Representation of the Reeb Graph as a Sub-Complex of Manifold
On Reeb graphs induced from smooth functions on 3-dimensional closed orientable manifolds with finite singular values
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