Unknotting tunnels and Seifert surfaces
arXiv:math/0010212
Abstract
Let $K$ be a knot with an unknotting tunnel $γ$ and suppose that $K$ is not a 2-bridge knot. There is an invariant $Ï= p/q \in \mathbb{Q}/2 \mathbb{Z}$, $p$ odd, defined for the pair $(K, γ)$. The invariant $Ï$ has interesting geometric properties: It is often straightforward to calculate; e. g. for $K$ a torus knot and $γ$ an annulus-spanning arc, $Ï(K, γ) = 1$. Although $Ï$ is defined abstractly, it is naturally revealed when $K \cup γ$ is put in thin position. If $Ï\neq 1$ then there is a minimal genus Seifert surface $F$ for $K$ such that the tunnel $γ$ can be slid and isotoped to lie on $F$. One consequence: if $Ï(K, γ) \neq 1$ then $genus(K) > 1$. This confirms a conjecture of Goda and Teragaito for pairs $(K, γ)$ with $Ï(K, γ) \neq 1$.
29 pages, 20 figures