A $p$-adic approach to rational points on curves

IF 2 3区 数学 Q1 MATHEMATICS
B. Poonen
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引用次数: 2

Abstract

In 1922, Mordell conjectured the striking statement that for a polynomial equation $f(x,y)=0$, if the topology of the set of complex number solutions is complicated enough, then the set of rational number solutions is finite. This was proved by Faltings in 1983, and again by a different method by Vojta in 1991, but neither proof provided a way to provably find all the rational solutions, so the search for other proofs has continued. Recently, Lawrence and Venkatesh found a third proof, relying on variation in families of $p$-adic Galois representations; this is the subject of the present exposition.
曲线上有理点的$p$adic方法
1922年,莫德尔提出了一个惊人的命题:对于多项式方程$f(x,y)=0$,如果复数解集的拓扑足够复杂,则有理数解集是有限的。1983年Faltings证明了这一点,1991年Vojta又用另一种方法证明了这一点,但这两种证明都没有提供一种可证明地找到所有有理解的方法,因此寻找其他证明的工作仍在继续。最近,Lawrence和Venkatesh发现了第三个证明,依赖于$p$进伽罗瓦表示族的变异;这就是本文的主题。
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来源期刊
CiteScore
2.90
自引率
0.00%
发文量
27
审稿时长
>12 weeks
期刊介绍: The Bulletin publishes expository articles on contemporary mathematical research, written in a way that gives insight to mathematicians who may not be experts in the particular topic. The Bulletin also publishes reviews of selected books in mathematics and short articles in the Mathematical Perspectives section, both by invitation only.
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