1971
DOI: 10.1007/bf02566836
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On periodic knots

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Cited by 107 publications
(84 citation statements)
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“…As in [4], K 1 and K have the same Alexander polynomial, so in particular, the same determinant. 42 and 10 125 , the congruence modulo 4 is violated, so that, as remarked on several other places, the signature works as well.) Remark 4.6.…”
Section: As S(p Q)mentioning
confidence: 69%
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“…As in [4], K 1 and K have the same Alexander polynomial, so in particular, the same determinant. 42 and 10 125 , the congruence modulo 4 is violated, so that, as remarked on several other places, the signature works as well.) Remark 4.6.…”
Section: As S(p Q)mentioning
confidence: 69%
“…Whenever ∆(−1) < 0, we have σ ≡ 2 mod 4, so in particular σ = 0, and the knot cannot be achiral. This argument applies for example (but not only) for the knot 9 42 . Note that the normalization ∆(1/t) = ∆(t) implies ∆(1) ≡ ∆(−1) mod 4, so that if ∆(1) = 1, the property ∆(−1) < 0 is also equivalent to det(…”
Section: Detecting Chirality With the Determinantmentioning
confidence: 85%
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“…One of an important concern of knot theory is to find the relationship between periodic links and their factor links, see [17,18]. In 2011, the authors expressed the Seifert matrix of a periodic link which is presented as the closure of a 4-tangle with some extra restrictions, in terms of the Seifert matrix of quotient link in [2].…”
Section: Proposition 1 ([6])mentioning
confidence: 99%
“…i) The Alexander polynomial of a periodic knot (see Section 2 for precise definitions and statements) satisfies the so-called Murasugi conditions [21]. These conditions can be explicitly computed and have been used to test periods of knots [4].…”
Section: Introductionmentioning
confidence: 99%