Mathematics – Geometric Topology
Scientific paper
2009-09-07
Mathematics
Geometric Topology
16 pages, 9 figures. In version 2, Theorem 4.3 (in version 3) was added. In version 3, Theorem 1.6 was added
Scientific paper
First, we extend Otal's result for the trivial knot to trivial spatial graphs, namely, we show that for any bridge tangle decomposing sphere $S^2$ for a trivial spatial graph $\Gamma$, there exists a 2-sphere $F$ such that $F$ contains $\Gamma$ and $F$ intersects $S^2$ in a single loop. Next, we introduce two invariants for spatial graphs. As a generalization of the bridge number for knots, we define the {\em bridge string number} $bs(\Gamma)$ of a spatial graph $\Gamma$ as the minimal number of $|\Gamma\cap S^2|$ for all bridge tangle decomposing sphere $S^2$. As a spatial version of the representativity for a graph embedded in a surface, we define the {\em representativity} of a non-trivial spatial graph $\Gamma$ as \[ r(\Gamma)=\max_{F\in\mathcal{F}} \min_{D\in\mathcal{D}_F} |\partial D\cap \Gamma|, \] where $\mathcal{F}$ is the set of all closed surfaces containing $\Gamma$ and $\mathcal{D}_F$ is the set of all compressing disks for $F$ in $S^3$. Then we show that for a non-trivial spatial graph $\Gamma$, \[ \displaystyle r(\Gamma)\le \frac{bs(\Gamma)}{2}. \] In particular, if $\Gamma$ is a knot, then $r(\Gamma)\le b(\Gamma)$, where $b(\Gamma)$ denotes the bridge number. This generalizes Schubert's result on torus knots.
Ozawa Makoto
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