一类新的无界秩椭圆曲线

IF 0.6 4区数学 Q3 MATHEMATICS Moscow Mathematical Journal Pub Date : 2018-09-20 DOI:10.17323/1609-4514-2020-2-343-374

Richard Griffon

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引用次数: 6

摘要

让$\mathbb{F}_q$是奇数特征的有限域，$K=\mathbb{F}_q（t） $。对于与$q$互质的任何整数$d\geq2$，考虑$K$上的椭圆曲线$E_d$，该椭圆曲线由$y^2=x（x^2+t^｛2d｝x-4t ^｛2d｝）$定义。我们证明了Mordell-Will群$E_d（K）$的秩是无界的，因为$d$是变化的。曲线$E_d$满足BSD猜想，因此它的秩等于它的$L$-函数在中心点的消失顺序。我们为$E_d$的$L$-函数提供了一个显式表达式，并用它来研究$d$的消失顺序。

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A New Family of Elliptic Curves with Unbounded Rank

Let $\mathbb{F}_q$ be a finite field of odd characteristic and $K= \mathbb{F}_q(t)$. For any integer $d\geq 2$ coprime to $q$, consider the elliptic curve $E_d$ over $K$ defined by $y^2=x(x^2+t^{2d} x-4t^{2d})$. We show that the rank of the Mordell--Weil group $E_d(K)$ is unbounded as $d$ varies. The curve $E_d$ satisfies the BSD conjecture, so that its rank equals the order of vanishing of its $L$-function at the central point. We provide an explicit expression for the $L$-function of $E_d$, and use it to study this order of vanishing in terms of $d$.

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来源期刊

Moscow Mathematical Journal 数学-数学

CiteScore

1.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Moscow Mathematical Journal (MMJ) is an international quarterly published (paper and electronic) by the Independent University of Moscow and the department of mathematics of the Higher School of Economics, and distributed by the American Mathematical Society. MMJ presents highest quality research and research-expository papers in mathematics from all over the world. Its purpose is to bring together different branches of our science and to achieve the broadest possible outlook on mathematics, characteristic of the Moscow mathematical school in general and of the Independent University of Moscow in particular. An important specific trait of the journal is that it especially encourages research-expository papers, which must contain new important results and include detailed introductions, placing the achievements in the context of other studies and explaining the motivation behind the research. The aim is to make the articles — at least the formulation of the main results and their significance — understandable to a wide mathematical audience rather than to a narrow class of specialists.