Knot polynomials and generalized mutation

The motivation for this work was to construct a nontrivial knot with trivial Jones polynomial. Although that open problem has not yielded, the methods are useful for other problems in the theory of knot polynomials. The subject of the present paper is a generalization of Conway's mutation of kn...

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Bibliographic Details
Published inTopology and its applications Vol. 32; no. 3; pp. 237 - 249
Main Authors Anstee, R.P., Przytycki, J.H., Rolfsen, D.
Format Journal Article
LanguageEnglish
Published Elsevier B.V 01.08.1989
Subjects
Jones polynomial
knot
link
link polynomial
mutant
signature
skein
link polynomial
skein
signature
link
knot
mutant
Jones polynomial
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ISSN0166-8641
1879-3207
DOI10.1016/0166-8641(89)90031-X

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Summary:The motivation for this work was to construct a nontrivial knot with trivial Jones polynomial. Although that open problem has not yielded, the methods are useful for other problems in the theory of knot polynomials. The subject of the present paper is a generalization of Conway's mutation of knots and links. Instead of flipping a 2-strand tangle, one flips a many-string tangle to produce a generalized mutant. In the presence of rotational symmetry in that tangle, the result is called a “rotant”. We show that if a rotant is sufficiently simple, then its Jones polynomial agrees with that of the original link. As an application, this provides a method of generating many examples of links with the same Jones polynomial, but different Alexander polynomials. Various other knot polynomials, as well as signature, are also invariant under such moves, if one imposes more stringent conditions upon the symmetries. Applications are also given to polynomials of satellites and symmetric knots.
ISSN:0166-8641
1879-3207
DOI:10.1016/0166-8641(89)90031-X