English

Morimoto's Conjecture for m-small knots

Geometric Topology 2007-05-23 v1

Abstract

Let XX be the exterior of connected sum of knots and XiX_i the exteriors of the individual knots. In \cite{morimoto1} Morimoto conjectured (originally for n=2n=2) that g(X)<σi=1ng(Xi)g(X) < \sigma_{i=1}^n g(X_i) if and only if there exists a so-called \em primitive meridian \em in the exterior of the connected sum of a proper subset of the knots. For m-small knots we prove this conjecture and bound the possible degeneration of the Heegaard genus (this bound was previously achieved by Morimoto under a weak assumption \cite{morimoto2}): σi=1ng(Xi)(n1)g(X)σi=1ng(Xi).\sigma_{i=1}^n g(X_i) - (n-1) \leq g(X) \leq \sigma_{i=1}^n g(X_i).

Cite

@article{arxiv.math/0212349,
  title  = {Morimoto's Conjecture for m-small knots},
  author = {Tsuyoshi Kobayashi and Yo'av Rieck},
  journal= {arXiv preprint arXiv:math/0212349},
  year   = {2007}
}

Comments

17 pages; to appear in the proceedings of the conference "Musubime no topology (Topology of knots) V" held at Waseda University, 16-19 December, 2002