On Bounds and Diophantine Properties of Elliptic Curves

arXiv - MATH - General Mathematics Pub Date : 2024-06-30 DOI:arxiv-2407.09558
Navvye Anand
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Abstract

Mordell equations are celebrated equations within number theory and are named after Louis Mordell, an American-born British mathematician, known for his pioneering research in number theory. In this paper, we discover all Mordell equations of the form $y^2 = x^3 + k$, where $k \in \mathbb Z$, with exactly $|k|$ integral solutions. We also discover explicit bounds for Mordell equations, parameterized families of elliptic curves and twists on elliptic curves. Using the connection between Mordell curves and binary cubic forms, we improve the lower bound for the number of integral solutions of a Mordell curve by looking at a pair of curves with unusually high rank.
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论椭圆曲线的边界和 Diophantine 特性
莫德尔方程是数论中的著名方程,以美国出生的英国数学家路易斯-莫德尔(Louis Mordell)的名字命名。在本文中,我们发现了所有形式为 $y^2 = x^3 + k$(其中 $k \in \mathbb Z$)的莫德尔方程,它们都有精确的$|k|$积分解。我们还发现了莫德尔方程、椭圆曲线的参数化族和椭圆曲线的扭转的明确边界。利用莫德尔曲线与二元三次方形式之间的联系,我们通过观察一对具有异常高阶的曲线,改进了莫德尔曲线积分解数的下界。
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arXiv - MATH - General Mathematics
arXiv - MATH - General Mathematics
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