关于扭转域上阿贝尔变型的本质扭转有限性

Pub Date : 2023-05-30 DOI:10.1017/nmj.2023.19

Jeff Achter, Lian Duan, Xiyuan Wang

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引用次数: 0

摘要

经典的modelell - weil定理表明，在数域K上的阿贝尔变量A只有有限个K-有理数扭转点。通过Ribet的结果，即使在分环扩展$K^{\ mathm {cyc}}=K{\mathbb Q}^{\ mathm {ab}}$上，扭转的有限性仍然成立。在本文中，我们考虑了一个阿贝尔变体A的扭转点在无限代数扩展$K_B$上的有限性，该扩展是由相邻的一个阿贝尔变体b的所有扭转点的坐标得到的。假设Mumford-Tate猜想，直到基域K的有限扩展为止，我们给出了关于Mumford-Tate群的$A(K_B)_{\ mathm tors}$的有限性的一个充分必要条件。当两个阿贝尔变体的维数都不超过3，或者它们都有复乘法时，我们给出一个完整的答案。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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ON THE ESSENTIAL TORSION FINITENESS OF ABELIAN VARIETIES OVER TORSION FIELDS

The classical Mordell–Weil theorem implies that an abelian variety A over a number field K has only finitely many K-rational torsion points. This finitude of torsion still holds even over the cyclotomic extension $K^{\mathrm {cyc}}=K{\mathbb Q}^{\mathrm {ab}}$ by a result of Ribet. In this article, we consider the finiteness of torsion points of an abelian variety A over the infinite algebraic extension $K_B$ obtained by adjoining the coordinates of all torsion points of an abelian variety B. Assuming the Mumford–Tate conjecture, and up to a finite extension of the base field K, we give a necessary and sufficient condition for the finiteness of $A(K_B)_{\mathrm tors}$ in terms of Mumford–Tate groups. We give a complete answer when both abelian varieties have dimension at most 3, or when both have complex multiplication.

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