Characteristic subsurfaces and Dehn filling

Boyer, Steve; Culler, Marc; Shalen, Peter; Zhang, Xingru

doi:10.1090/S0002-9947-04-03576-7

Characteristic subsurfaces and Dehn filling
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by Steve Boyer, Marc Culler, Peter B. Shalen and Xingru Zhang PDF

Trans. Amer. Math. Soc. 357 (2005), 2389-2444 Request permission

Abstract:

Let $M$ be a simple knot manifold. Using the characteristic submanifold theory and the combinatorics of graphs in surfaces, we develop a method for bounding the distance between the boundary slope of an essential surface in $M$ which is not a fiber or a semi-fiber, and the boundary slope of a certain type of singular surface. Applications include bounds on the distances between exceptional Dehn surgery slopes. It is shown that if the fundamental group of $M(\alpha )$ has no non-abelian free subgroup, and if $M(\beta )$ is a reducible manifold which is not homeomorphic to $S^1 \times S^2$ or $P^3 \# P^3$, then $\Delta (\alpha , \beta )\le 5$. Under the same condition on $M(\beta )$, it is shown that if $M(\alpha )$ is Seifert fibered, then $\Delta (\alpha , \beta )\le 6$. Moreover, in the latter situation, character variety techniques are used to characterize the topological types of $M(\alpha )$ and $M(\beta )$ in case the bound of $6$ is attained.

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