1987
DOI: 10.1016/0040-9383(87)90058-9
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Jones polynomials and classical conjectures in knot theory

Abstract: LETL bea tame link in S3 and VL(f) the Jones polynomial of L defined in [Z]. For a projection E of L, c(L) denotes the number of double points in L and c(L) the minimum number of double points among all projections of L. A link projection t is called proper if L does not contain "removable" double points-. like ,<_: or /.+_,. \/;'I In this paper, we will prove some of the outstanding classical conjectures due to P.G. Tait [7]. THEOREM A. (P. G. Tait Conjecture) Two (connected and proper) alternating projection… Show more

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Cited by 297 publications
(107 citation statements)
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“…Kishino [10] Proof By Theorem 1.3, span(D) is not a multiple of four. On the other hand, the span of the f -polynomial of a classical link is a multiple of four [7,13,14]. Thus we have the result.…”
Section: Introductionsupporting
confidence: 49%
See 1 more Smart Citation
“…Kishino [10] Proof By Theorem 1.3, span(D) is not a multiple of four. On the other hand, the span of the f -polynomial of a classical link is a multiple of four [7,13,14]. Thus we have the result.…”
Section: Introductionsupporting
confidence: 49%
“…For a virtual link L represented by a virtual link diagram D, we define the f -polynomial f L (A) of L by f D (A). The span Theorem 1.1 (Kauffman [7], Murasugi [13], Thistlethwaite [14]) Let L be an alternating link represented by a proper alternating connected link diagram D. Then we have span(L) = 4c(D).…”
Section: Introductionmentioning
confidence: 99%
“…From [Thistlethwaite 1987;Kauffman 1987;Murasugi 1987] Theorem 5.1. Let V K (t) = a n t n + a n+1 t n+1 + · · · + a m t m be the Jones polynomial of an alternating knot K and let G = (V, E) be a checkerboard graph of a reduced alternating projection of K .…”
Section: Coefficients Of the Jones Polynomialmentioning
confidence: 99%
“…Theorem 5.13 (see [180,204]). The span of the Jones-Kauffman polynomial for links with connected shadows and n classical crossings is less than or equal to 4n.…”
Section: Theorem 512 the Jones Polynomial Is An Invariant Of Graph-mentioning
confidence: 96%