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Incompressible surfaces in link complements | Ying-Qing Wu
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1 Nov 2000 | Subject: | Geometric Topology MSC-class: 57M25 | math.GT | Abstract: | We generalize a theorem of Finkelstein and Moriah and show that if a link $L$ has a $2n$-plat projection satisfying certain conditions, then its complement contains some closed essential surfaces. In most cases these surfaces remain essential after any totally nontrivial surgery on $L$. | Source: | arXiv, math.GT/0011006 | Services: | Forum | Review | PDF | Favorites |
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