AbstractWe obtain an infinite family of hyperbolic knots in a solid torus which admit half-integral, toroidal and annular surgeries. Among this family we find a knot with two toroidal and annular surgeries; one is integral and the other is half-integral, and their distance is 5. This example realizes the maximal distance between annular surgery slopes and toroidal ones, and that between annular surgery slopes
Abstract. For a hyperbolic knot K in S3, at most finitely many Dehn surgeries yield non-hyperbolic 3...
Myers shows that every compact, connected, orientable 3--manifold with no 2--sphere boundary compone...
Baker showed that 1 0 of the 1 2 classes of Berge knots are obtained by surgery on the min...
AbstractWe obtain an infinite family of hyperbolic knots in a solid torus which admit half-integral,...
For a hyperbolic knot K in S3, a toroidal surgery is Dehn surgery which yields a 3-manifold containi...
For a hyperbolic knot K in S3, a toroidal surgery is Dehn surgery which yields a 3-manifold containi...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
AbstractThe exceptional Dehn filling conjecture of the second author concerning the relationship bet...
AbstractIn this paper, we prove that for any positive even integer m, there exists a hyperbolic knot...
AbstractIf two surgeries on a hyperbolic knot produce a reducible manifold and a toroidal manifold, ...
In this paper we give an upper bound for the slopes yielding an incompressible torus by surgery on a...
The exceptional Dehn filling conjecture of the second author concerning the relationship between exc...
Abstract. For a hyperbolic knot K in S3, at most finitely many Dehn surg-eries yield non-hyperbolic ...
Abstract. For a hyperbolic knot K in S3, at most finitely many Dehn surgeries yield non-hyperbolic 3...
Myers shows that every compact, connected, orientable 3--manifold with no 2--sphere boundary compone...
Baker showed that 1 0 of the 1 2 classes of Berge knots are obtained by surgery on the min...
AbstractWe obtain an infinite family of hyperbolic knots in a solid torus which admit half-integral,...
For a hyperbolic knot K in S3, a toroidal surgery is Dehn surgery which yields a 3-manifold containi...
For a hyperbolic knot K in S3, a toroidal surgery is Dehn surgery which yields a 3-manifold containi...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
For a hyperbolic knot K in S3, a toroidal surgery on K is integral or half-integral. In the previous...
AbstractThe exceptional Dehn filling conjecture of the second author concerning the relationship bet...
AbstractIn this paper, we prove that for any positive even integer m, there exists a hyperbolic knot...
AbstractIf two surgeries on a hyperbolic knot produce a reducible manifold and a toroidal manifold, ...
In this paper we give an upper bound for the slopes yielding an incompressible torus by surgery on a...
The exceptional Dehn filling conjecture of the second author concerning the relationship between exc...
Abstract. For a hyperbolic knot K in S3, at most finitely many Dehn surg-eries yield non-hyperbolic ...
Abstract. For a hyperbolic knot K in S3, at most finitely many Dehn surgeries yield non-hyperbolic 3...
Myers shows that every compact, connected, orientable 3--manifold with no 2--sphere boundary compone...
Baker showed that 1 0 of the 1 2 classes of Berge knots are obtained by surgery on the min...
DOI
Add to ORKG