arXiv:math/0701766 Abstract

arXiv:math/0701766 [math.GT]Abstract References Reviews Resources

Knots with g(E(K)) = 2 and g(E(K#K#K)) = 6 and Morimoto's Conjecture

Published 2007-01-26, updated 2007-03-13Version 3

We show that there exist knots K in S^3 with g(E(K))=2 and g(E(K#K#K))=6. Together with Theorem~1.5 of [1], this proves existence of counterexamples to Morimoto's Conjecture (Conjecture 1.5 of [2]). This is a special case of arxiv.org/abs/math.GT/0701765 [1] Tsuyoshi Kobayashi and Yo'av Rieck. On the growth rate of the tunnel number of knots. J. Reine Angew. Math., 592:63--78, 2006. [2] Kanji Morimoto. On the super additivity of tunnel number of knots.Math. Ann., 317(3):489--508, 2000.

Comments: 6 pages. Final version

Categories: math.GT

Subjects: 57M99

Keywords: morimotos conjecture, tunnel number, kanji morimoto, special case, reine angew

Related articles: Most relevant | Search more

arXiv:1507.03317 [math.GT] (Published 2015-07-13)

The spectrum of the growth rate of the tunnel number is infinite

Kenneth L. Baker, Tsuyoshi Kobayashi, Yo'av Rieck

arXiv:1506.03916 [math.GT] (Published 2015-06-12)

The growth rate of the tunnel number of m-small knots

Tsuyoshi Kobayashi, Yo'av Rieck

arXiv:math/0701765 [math.GT] (Published 2007-01-26, updated 2007-01-28)