半因子实二次阶

Pub Date : 2024-03-12 DOI:10.1007/s00013-024-01969-z

Paul Pollack

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引用次数: 0

摘要

回想一下，当 D 是原子且每个等式 \(\pi _1\cdots \pi _k = \rho _1 \cdots \rho _\ell \)，且所有 \(\pi _i\) 和 \(\rho _j\) 在 D 中不可还原时，D 就是一个半因子域（HFD），这意味着 \(k=\ell \)。我们解释了为攻克阿尔丁的原始根猜想而引入的技术如何应用于理解实二次数域中阶的半因子性。特别是，我们证明了：（a）有无限多的实二次阶是半因子域；（b）在广义黎曼假设下，\({\mathbb {Q}}(\sqrt{2})\) 包含无限多的 HFD 阶。

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Half-factorial real quadratic orders

Recall that D is a half-factorial domain (HFD) when D is atomic and every equation \(\pi _1\cdots \pi _k = \rho _1 \cdots \rho _\ell \), with all \(\pi _i\) and \(\rho _j\) irreducible in D, implies \(k=\ell \). We explain how techniques introduced to attack Artin’s primitive root conjecture can be applied to understand half-factoriality of orders in real quadratic number fields. In particular, we prove that (a) there are infinitely many real quadratic orders that are half-factorial domains, and (b) under the generalized Riemann hypothesis, \({\mathbb {Q}}(\sqrt{2})\) contains infinitely many HFD orders.

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