Marc Lackenby
Published 2001-09-09, updated 2003-01-09Version 2
The main theorem of this paper is a generalisation of well known results about Dehn surgery to the case of attaching handlebodies to a simple 3-manifold. The existence of a finite set of `exceptional' curves on the boundary of the 3-manifold is established. Provided none of these curves is attached to the boundary of a disc in a handlebody, the resulting manifold is shown to be word hyperbolic and `hyperbolike'. We then give constructions of gluing maps satisfying this condition. These take the form of an arbitrary gluing map composed with powers of a suitable homeomorphism of the boundary of the handlebodies.
Comments: Published by Geometry and Topology at http://www.maths.warwick.ac.uk/gt/GTVol6/paper26.abs.html
Journal: Geom. Topol. 6(2002) 889-904
Systoles and Dehn surgery for hyperbolic 3-manifolds
Immersed surfaces and Dehn surgery
Dehn surgery on knots of wrapping number 2
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