若干2次虚循环域的类群

Pub Date : 2022-05-13 DOI:10.2969/jmsj/86438643

H. Ichimura, Hiroki Sumida-Takahashi

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引用次数: 1

摘要

设p是奇质数2e+1是2除以p - 1的最大幂。当0≤n≤e时，设kn为导体p的实循环场，次数为2n。对于某个虚二次域L0，令Ln = L0kn。当0≤n≤e−1时，设Fn为虚数(2,2)扩展Ln+1/kn的虚二次次扩展，且Fn≤Ln。研究了虚循环域Fn的理想类群的2部分的伽罗瓦模结构。这推广了rsamdei和Reichardt在n = 0情况下的经典结果。

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On the class groups of certain imaginary cyclic fields of 2-power degree

Let p be an odd prime number and 2e+1 be the highest power of 2 dividing p − 1. For 0 ≤ n ≤ e, let kn be the real cyclic field of conductor p and degree 2n. For a certain imaginary quadratic field L0, we put Ln = L0kn. For 0 ≤ n ≤ e − 1, let Fn be the imaginary quadratic subextension of the imaginary (2, 2)-extension Ln+1/kn with Fn ̸= Ln. We study the Galois module structure of the 2-part of the ideal class group of the imaginary cyclic field Fn. This generalizes a classical result of Rédei and Reichardt for the case n = 0.

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