Jesse Johnson, Darryl McCullough
Published 2010-11-02, updated 2011-08-25Version 2
For a Heegaard surface F in a closed orientable 3-manifold M, H(M,F) = Diff(M)/Diff(M,F) is the space of Heegaard surfaces equivalent to the Heegaard splitting (M,F). Its path components are the isotopy classes of Heegaard splittings equivalent to (M,F). We describe H(M,F) in terms of Diff(M) and the Goeritz group of (M,F). In particular, for hyperbolic M each path component is a classifying space for the Goeritz group, and when the (Hempel) distance of (M,F) is greater than 3, each path component of H(M,F) is contractible. For splittings of genus 0 or 1, we determine the complete homotopy type (modulo the Smale Conjecture for M in the cases when it is not known).
Comments: Minor rewriting as suggested by referee, no change in mathematical content. To appear in J. Reine Angew. Math
Generating the genus g+1 Goeritz group of a genus g handlebody
The Goeritz groups of $(1,1)$-decompositions
Arc complexes, sphere complexes and Goeritz groups
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