Mark Brittenham, Yo'av Rieck
Published 2006-08-21, updated 2009-03-30Version 2
This paper explores connections between Heegaard genus, minimal surfaces, and pseudo-Anosov monodromies. Fixing a pseudo-Anosov map phi and an integer n, let M_n be the 3-manifold fibered over S^1 with monodromy phi^n. JH Rubinstein showed that for a large enough n every minimal surface of genus at most h in M_n is homotopic into a fiber; as a consequence Rubinstein concludes that every Heegaard surface of genus at most h for M_n is standard, that is, obtained by tubing together two fibers. We prove this result and also discuss related results of Lackenby and Souto.
Comments: This is the version published by Geometry & Topology Monographs on 3 December 2007
Journal: Geom. Topol. Monogr. 12 (2007) 17-33
Incompressible surfaces, hyperbolic volume, Heegaard genus and homology
Degree one maps between small 3-manifolds and Heegaard genus
Rank and genus of 3-manifolds
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