Masakazu Teragaito scite author profile

Let $K$ be a hyperbolic knot in the 3-sphere. If $r$-surgery on $K$ yields a lens space, then we show that the order of the fundamental group of the lens space is at most $12g-7$, where $g$ is the genus of $K$. If we specialize to genus one case, it will be proved that no lens space can be obtained from genus one, hyperbolic knots by Dehn surgery. Therefore, together with known facts, we have that a genus one knot $K$ admits Dehn surgery yielding a lens space if and only if $K$ is the trefoil.Comment: 20 pages, 6 figure

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A Seifert Fibered Manifold with Infinitely Many Knot-Surgery Descriptions

Teragaito

2010

International Mathematics Research Notices

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Distance between toroidal surgeries on hyperbolic knots in the 3-sphere

Teragaito

2005

Trans. Amer. Math. Soc.

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Abstract. For a hyperbolic knot in the 3-sphere, at most finitely many Dehn surgeries yield non-hyperbolic 3-manifolds. As a typical case of such an exceptional surgery, a toroidal surgery is one that yields a closed 3-manifold containing an incompressible torus. The slope corresponding to a toroidal surgery, called a toroidal slope, is known to be integral or half-integral. We show that the distance between two integral toroidal slopes for a hyperbolic knot, except the figure-eight knot, is at most four.

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Crosscap numbers of 2-bridge knots

Hirasawa

Teragaito

2006

Topology

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Crosscap numbers of torus knots

Teragaito¹

2004

Topology and its Applications

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