Dehn filling and the knot group I: Realization Property

Abstract

Each r-Dehn filling of the exterior E(K) of a knot K in S3 produces a 3-manifold K(r), and induces an epimorphism from the knot group G(K) = π1(E(K)) to π1(K(r)), which trivializes elements in its kernel. To each element g ∈ G(K), consider all the non-trivial Dehn fillings and assign SK(g) = \ r ∈ Q r-Dehn filling trivializes\ g \ ⊂ Q. Which subsets of Q can occur as SK(g)? Property P concerns this question and gives a fundamental result which asserts that the emptyset can be realized by SK(μ) for the meridian μ of K. Suppose that K is a hyperbolic knot. Then SK(g) is known to be finite for all non-trivial elements g ∈ G(K). We prove that generically, for instance, if K has no exceptional surgery, then any finite (possibly empty) family of slopes R = \ r1, . . . , rn \ can be realized by SK(g) for some element g ∈ G(K). Furthermore, there are infinitely many, mutually non-conjugate such elements, each of which is not conjugate to any power of g. We also provide an example showing that the above realization property does not hold unconditionally.