1989
DOI: 10.1090/s0002-9947-1989-0992598-x
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Braids, link polynomials and a new algebra

Abstract: Abstract.A class function on the braid group is derived from the Kauffman link invariant. This function is used to construct representations of the braid groups depending on 2 parameters. The decomposition of the corresponding algebras into irreducible components is given and it is shown how they are related to Jones' algebras and to Brauer's centralizer algebras.In [J,3] Vaughan Jones announced the discovery of a new polynomial invariant of knots and links, which bore many similarities to the classical Alexa… Show more

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Cited by 366 publications
(583 citation statements)
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“…We need that the quantum dimensions λ , with |λ| = n − 1 are not zero. This result follows from [7,Theorem 3.7], and will also be proved, by considering the specializations corresponding to Brauer algebras in the next section. …”
Section: Idempotents In Birman-murakami-wenzl Algebrasmentioning
confidence: 53%
See 2 more Smart Citations
“…We need that the quantum dimensions λ , with |λ| = n − 1 are not zero. This result follows from [7,Theorem 3.7], and will also be proved, by considering the specializations corresponding to Brauer algebras in the next section. …”
Section: Idempotents In Birman-murakami-wenzl Algebrasmentioning
confidence: 53%
“…The algebra K n = End K (n) is isomorphic to the Birman-Murakami-Wenzl algebra which is the quotient of the braid group algebra k[B n ] by the Kauffman skein relations [7,13]. For a proof of the above isomorphism, see [12] or [17].…”
Section: 2mentioning
confidence: 99%
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“…The following result is implicit in the proof of [34,Section 5,6]. The author is indebted to Professor Kashiwara for pointing this out to him.…”
Section: Lemma 48 With the Above Notations We Have Thatmentioning
confidence: 85%
“…In practice it seems that if the relations are powerful enough to calculate the value of a labelled planar diagram with no boundary points, then we can calculate the entire structure just from these relations. The BMW planar algebras [BW89,Mur87] are generated by an element satisfying the Yang-Baxter equation or equivalently the type III Reidemeister move. The evaluation of labeled diagrams with no boundary points is known as the Kauffman polynomial, see [Kau90].…”
Section: Introductionmentioning
confidence: 99%