A simple proof of the Crowell-Murasugi theorem
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Publication:6614587
DOI10.2140/AGT.2024.24.2779zbMATH Open1548.57015MaRDI QIDQ6614587
Publication date: 7 October 2024
Published in: Algebraic \& Geometric Topology (Search for Journal in Brave)
Alexander polynomialplumbingSeifert surfacefiber surfacealternating knotalternating linkMurasugi sumhomogeneous linkknot genuslink genus3-genusde-plumbingSeifert's algorithm
Cites Work
- Title not available (Why is that?)
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- Homogeneous links, Seifert surfaces, digraphs and the reduced Alexander polynomial
- On the genus of the alternating knot. I
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- The Conway polynomial
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- How to construct all fibered knots and links
- Alternating links and definite surfaces
- On the stable equivalence of open books in three-manifolds
- An elementary proof that all spanning surfaces of a link are tube-equivalent
- The Murasugi sum is a natural geometric operation
- Jones polynomials and classical conjectures in knot theory. II
- Homogeneous Links
- On the topological invariance of Murasugi special components of an alternating link
- ESSENTIAL STATE SURFACES FOR KNOTS AND LINKS
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