Non-congruent numbers with arbitrarily many prime factors congruent to 3 modulo 8
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Publication:676761
DOI10.3792/pjaa.72.168zbMath0877.11014OpenAlexW2072954447MaRDI QIDQ676761
Publication date: 7 July 1997
Published in: Proceedings of the Japan Academy. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3792/pjaa.72.168
Related Items (16)
Some new families of non-congruent numbers ⋮ Families of even noncongruent numbers with arbitrarily many pairs of prime factors ⋮ Families of non-congruent numbers with odd prime factors of the form \(8k + 3\) ⋮ Families of non-$\theta $-congruent numbers with arbitrarily many prime factors ⋮ New series of odd non-congruent numbers ⋮ An extension theorem for generating new families of non-congruent numbers ⋮ On second 2-descent and non-congruent numbers ⋮ On the extension of even families of non-congruent numbers ⋮ Families of even non-congruent numbers with prime factors in each odd congruence class modulo eight ⋮ The non-congruent numbers via Monsky’s formula ⋮ Infinitely many hyperelliptic curves with exactly two rational points ⋮ A note on the Selmer group of the elliptic curve \(y^ 2=x^ 3+Dx\). ⋮ Families of non-congruent numbers with arbitrarily many prime factors ⋮ Adaptation of Monsky matrices for 𝜃-congruent numbers ⋮ 2-Selmer groups and the Birch-Swinnerton-Dyer conjecture for the congruent number curves ⋮ Unnamed Item
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