Aaron Abrams, Saul Schleimer
Published 2003-06-03, updated 2004-12-25Version 2
J Hempel [Topology, 2001] showed that the set of distances of the Heegaard splittings (S,V, h^n(V)) is unbounded, as long as the stable and unstable laminations of h avoid the closure of V in PML(S). Here h is a pseudo-Anosov homeomorphism of a surface S while V is the set of isotopy classes of simple closed curves in S bounding essential disks in a fixed handlebody. With the same hypothesis we show the distance of the splitting (S,V, h^n(V)) grows linearly with n, answering a question of A Casson. In addition we prove the converse of Hempel's theorem. Our method is to study the action of h on the curve complex associated to S. We rely heavily on the result, due to H Masur and Y Minsky [Invent. Math. 1999], that the curve complex is Gromov hyperbolic.
Comments: Published by Geometry and Topology at http://www.maths.warwick.ac.uk/gt/GTVol9/paper2.abs.html
Journal: Geom. Topol. 9(2005) 95-119
From Heegaard splittings to trisections; porting 3-dimensional ideas to dimension 4
The end of the curve complex
The curves not carried
![QR code for arXiv:math/0306071 [math.GT]](http://oss.arxitics.com/images/favicon.svg)