Studying links via closed braids IV: composite links and split links.
Joan S. Birman, W.W. Menasco (1990)
Inventiones mathematicae
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Displaying similar documents to “Are Borromean Links So Rare?”
Studying links via closed braids IV: composite links and split links.
The classification of partially symmetric 3-braid links
Alexander Stoimenov (2015)
Open Mathematics
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We classify 3-braid links which are amphicheiral as unoriented links, including a new proof of Birman- Menasco’s result for the (orientedly) amphicheiral 3-braid links. Then we classify the partially invertible 3-braid links.
Visual Mathematics: A missing link in a Split Culture
Denes Nagy (1999)
Visual Mathematics
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Skein relations for Milnor's -invariants.
Polyak, Michael (2005)
Algebraic & Geometric Topology
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Vassiliev Invariants of Doodles, Ornaments, Etc.
Alexander B. Merkov (1999)
Publications de l'Institut Mathématique
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Invariants of -type links via an extension of the Kauffman bracket.
Kulish, P.P., Nikitin, A.M. (2000)
Zapiski Nauchnykh Seminarov POMI
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Brunnian links are determined by their complements.
Mangum, Brian, Stanford, Theodore (2001)
Algebraic & Geometric Topology
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Some New Invariants of Links.
Sadayoshi Kojima, Masyuki Yamasaki (1979)
Inventiones mathematicae
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Geometry of links.
Jablan, Slavik V. (1999)
Novi Sad Journal of Mathematics
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Brunnian links
Paul Gartside, Sina Greenwood (2007)
Fundamenta Mathematicae
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A Brunnian link is a set of n linked loops such that every proper sublink is trivial. Simple Brunnian links have a natural algebraic representation. This is used to determine the form, length and number of minimal simple Brunnian links. Braids are used to investigate when two algebraic words represent equivalent simple Brunnian links that differ only in the arrangement of the component loops.
Link concordance invariants and homotopy theory.
T.D. Cochran (1987)
Inventiones mathematicae
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