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PDF Availablehttps://doi.org/10.2140/agt.2018.18.1
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Cite Journal: Algebraic & Geometric Topology |  Publication Date: Jan 10, 2018 |
 Citations: 4 |
In the paper we prove the conjecture by Alexander Zupan that $w(K) \geqslant n^2w(J)$ where w denote the width and $K$ and $J$ are satellite knot and its companion with winding number $n$. Also we proved that for satellite knot with braid pattern, the equality holds.
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