关于数字域上双曲曲线的前1外伽罗瓦表示法的核

Pub Date : 2015-07-01 DOI:10.18910/57635
Yuichiro Hoshi
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引用次数: 3

摘要

本文讨论了双曲曲线在数域上的前- 1外伽罗瓦表示的核所对应的伽罗瓦扩展与双曲曲线的l-中点之间的关系。特别地,我们证明了对于某双曲曲线,所考虑的伽罗瓦扩展是由双曲曲线的l-适中点的坐标产生的。这可以看作是一个类似的事实,即对应于与阿贝尔变体相关的l进伽罗瓦表示的核的伽罗瓦扩展是由l-幂阶阿贝尔变体的扭转点的坐标生成的。此外,我们还讨论了本文的论点在费马方程研究中的一个应用。
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On the kernels of the pro-l outer Galois representations associated to hyperbolic curves over number fields
In the present paper, we discuss the relationship between the Galois extension corresponding to the kernel of the pro-l outer Galois representation associated to a hyperbolic curve over a number eld and l-moderate points of the hyperbolic curve. In particular, we prove that, for a certain hyperbolic curve, the Galois extension under consideration is generated by the coordinates of the l-moderate points of the hyperbolic curve. This may be regarded as an analogue of the fact that the Galois extension corresponding to the kernel of the l-adic Galois representation associated to an abelian variety is generated by the coordinates of the torsion points of the abelian variety of l-power order. Moreover, we discuss an application of the argument of the present paper to the study of the Fermat equation.
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