雷默循环五元场的常积分基

The Ramanujan Journal Pub Date : 2024-07-05 DOI:10.1007/s11139-024-00875-w

Yu Hashimoto, Miho Aoki

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引用次数: 0

摘要

让 \(K_n\) 是由 Emma Lehmer 的参数多项式的一个根生成的驯化环五元场。我们仅通过多项式的根给出 \(K_n\) 的所有常积分基，这是对 Lehmer 在 \(n^4+5n^3+15n^2+25n+25\) 是素数情况下的工作，以及 Spearman-Willliams 在 \(n^4+5n^3+15n^2+25n+25\) 是平方自由情况下的工作的推广。

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Normal integral bases of Lehmer’s cyclic quintic fields

Let \(K_n\) be a tamely ramified cyclic quintic field generated by a root of Emma Lehmer’s parametric polynomial. We give all normal integral bases for \(K_n\) only by the roots of the polynomial, which is a generalization of the work of Lehmer in the case that \(n^4+5n^3+15n^2+25n+25\) is prime number, and Spearman–Willliams in the case that \(n^4+5n^3+15n^2+25n+25\) is square free.

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The Ramanujan Journal

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