Abstract
It is Thurston’s result that for a hyperbolic knot K in S3, almost all Dehn fillings on its complement result in hyperbolic 3-manifolds except some exceptional cases. So almost all produced 3-manifolds have the same geometry. It is known that its complement in S3, denoted by E(K), admits a Heegaard splitting. Then it is expected that there is a similar result on Heegaard distance for Dehn fillings. In this paper, Dehn fillings on genus two Heegaard splittings are studied. More precisely, we prove that if the distance of a given genus two Heegaard splitting of E(K) is at least 3, then for any two degenerating slopes on ∂E(K), there is a universal bound of their distance in the curve complex of ∂E(K).
| Original language | English |
|---|---|
| Pages (from-to) | 1099-1108 |
| Number of pages | 10 |
| Journal | Science China Mathematics |
| Volume | 61 |
| Issue number | 6 |
| DOIs | |
| State | Published - 1 Jun 2018 |
Keywords
- Dehn filling
- Heegaard distance
- curve complex
- hyperbolic knot