Elliptic Curves of Type y2=x3−3pqx Having Ranks Zero and One

IF 0.5 Q3 MATHEMATICS
R. Mina, J. B. Bacani
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引用次数: 0

Abstract

The group of rational points on an elliptic curve over Q is always a finitely generated Abelian group, hence isomorphic to Zr×G with G a finite Abelian group. Here, r is the rank of the elliptic curve. In this paper, we determine sufficient conditions that need to be set on the prime numbers p and q so that the elliptic curve E:y2=x3−3pqx over Q would possess a rank zero or one. Specifically, we verify that if distinct primes p and q satisfy the congruence p≡q≡5(mod24), then E has rank zero. Furthermore, if p≡5(mod12) is considered instead of a modulus of 24, then E has rank zero or one. Lastly, for primes of the form p=24k+17 and q=24ℓ+5, where 9k+3ℓ+7 is a perfect square, we show that E has rank one.
y2=x3−3pqx型具有秩为零和一的椭圆曲线
Q上椭圆曲线上的有理点群始终是有限生成的阿贝尔群,因此同构于Zr×G,其中G是有限阿贝尔群。这里,r是椭圆曲线的秩。在本文中,我们确定了需要在素数p和q上设置的充分条件,使得q上的椭圆曲线E:y2=x3−3pqx具有秩0或1。具体地,我们验证了如果不同素数p和q满足同余p Select q Select 5(mod24),则E的秩为零。此外,如果考虑p≠5(mod12)而不是24的模,则E的秩为零或一。最后,对于形式为p=24k+17和q=24的素数ℓ+5,其中9k+3ℓ+7是一个完美的正方形,我们证明了E的秩为一。
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来源期刊
CiteScore
1.10
自引率
20.00%
发文量
0
期刊介绍: The Research Bulletin of Institute for Mathematical Research (MathDigest) publishes light expository articles on mathematical sciences and research abstracts. It is published twice yearly by the Institute for Mathematical Research, Universiti Putra Malaysia. MathDigest is targeted at mathematically informed general readers on research of interest to the Institute. Articles are sought by invitation to the members, visitors and friends of the Institute. MathDigest also includes abstracts of thesis by postgraduate students of the Institute.
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