Jesse Johnson
Published 2009-10-27Version 1
We show that if the Hempel distance of a Heegaard splitting is larger than three then the mapping class group of the Heegaard splitting is isomorphic to a subgroup of the mapping class group of the ambient 3-manifold. This implies that given two handlebody sets in the curve complex for a surface that are distance at least four apart, the group of automorphisms of the curve complex that preserve both handlebody sets is finite.
Comments: 9 pages, 1 figure
Homology of the curve complex and the Steinberg module of the mapping class group
A note on the curve complex of the 3-holed projective plane
$L^2$-torsion invariants and the Magnus representation of the mapping class group
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