2019
DOI: 10.4153/s0008439519000468
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Linear Independence of Logarithms of Cyclotomic Numbers and a Conjecture of Livingston

Abstract: In 1965, A. Livingston conjectured the $\overline{\mathbb{Q}}$-linear independence of logarithms of values of the sine function at rational arguments. In 2016, S. Pathak disproved the conjecture. In this article, we give a new proof of Livingston’s conjecture using some fundamental trigonometric identities. Moreover, we show that a stronger version of her theorem is true. In fact, we modify this conjecture by introducing a co-primality condition, and in that case we provide the necessary and sufficient conditi… Show more

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Cited by 5 publications
(5 citation statements)
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“…As a corollary of Theorem 1.13, we show that when 𝑞 ≡ 2(mod 4) and 𝑞∕2 satisfy none of the conditions given in Proposition 2. 3 Finally, as a corollary of the above theorem we have the following theorem: Theorem 1.15. Let 𝑞 > 1 be an integer as in Theorem 1.14.…”
Section: Then the Dimension Of 𝑉 γ (𝑞) Is 𝜙(𝑞)mentioning
confidence: 87%
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“…As a corollary of Theorem 1.13, we show that when 𝑞 ≡ 2(mod 4) and 𝑞∕2 satisfy none of the conditions given in Proposition 2. 3 Finally, as a corollary of the above theorem we have the following theorem: Theorem 1.15. Let 𝑞 > 1 be an integer as in Theorem 1.14.…”
Section: Then the Dimension Of 𝑉 γ (𝑞) Is 𝜙(𝑞)mentioning
confidence: 87%
“…The next propositions are of great use as these extend the idea of multiplicative independence of cyclotomic units in Proposition 2.3 for the case when 𝑞 ≡ 2 (mod 4) (for a proof see[3]). …”
mentioning
confidence: 88%
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