非交叉积定理部分内容的证明

Mehran Motiee
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引用次数: 0

摘要

1972 年,阿米瑟给出了非交叉积分代数的第一个例子。他的方法基于两个基本步骤:(1) 如果普分代数 $U(k,n)$ 是 $G$ 交叉积,那么 $k$ 上的每个度数为 $n$ 的分代数都应该是 $G$ 交叉积;(2) $k$ 上有两个分代数,它们的最大子域没有共同的伽罗瓦群。在本注中,我们给出了在 $\chr k\nmid n$ 和 $p^3|n$ 的情况下第二步的简短证明。
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A proof for a part of noncrossed product theorem
The first examples of noncrossed product division algebras were given by Amitsur in 1972. His method is based on two basic steps: (1) If the universal division algebra $U(k,n)$ is a $G$-crossed product then every division algebra of degree $n$ over $k$ should be a $G$-crossed product; (2) There are two division algebras over $k$ whose maximal subfields do not have a common Galois group. In this note, we give a short proof for the second step in the case where $\chr k\nmid n$ and $p^3|n$.
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