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This is a Quantitative Study study.

September 20, 2025Open Access

Watkins’s conjecture for quadratic twists of Elliptic Curves with Prime Power Conductor

Key Points

The conjecture states elliptic curve rank is limited by the 2-adic valuation of its modular degree.
This is satisfied for quadratic twists of curves with a rational point of order 2 and prime power conductor.
A lower bound for the congruence number is established for specific elliptic curves of a certain form.
The findings extend to congruent number elliptic curves, highlighting significant applications in number theory.

Abstract

Watkins’s conjecture asserts that the rank of an elliptic curve is upper bounded by the 2-adic valuation of its modular degree. We show that this conjecture is satisfied when E is any quadratic twist of an elliptic curve with a rational point of order 2 and prime power conductor, in particular, for the congruent number elliptic curves. Furthermore, we give a lower bound for the congruence number for elliptic curves of the form y 2 =x 3 -dx, with d a fourth power free integer.

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Cite This Study

Jerson Caro (Fri,) studied this question.

synapsesocial.com/papers/68d469ce31b076d99fa66c4e https://doi.org/https://doi.org/10.5802/jtnb.1335