Non-invertible knots having toroidal Dehn surgery of hitting number four

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概要

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• We show that there exist infinitely many non-invertible, hyperbolic knots that admit toroidal Dehn surgery of hitting number four. The resulting toroidal manifold contains a unique incompressible torus meeting the core of the attached solid torus in four points, but no incompressible torus meeting it less than four points.

• 広島大学の論文
• 2008-11-00

著者

• Teragaito Masakazu

  Department Of Mathematics And Mathematics Education Graduate School Of Educatkon Hiroshima University Higashi-hiroshima 739-8524 Japan

関連論文

• Non-invertible knots having toroidal Dehn surgery of hitting number four
• Twisting symmetry-spins of 2-bridge knots : dedicated to Professor Fujitsugu Hosokawa on his 60th birthday

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