Sporadic Cubic Torsion

TL;DR

This paper classifies the possible torsion subgroups of elliptic curves over cubic number fields by analyzing cubic points on specific modular curves and examining the ranks of associated Jacobians.

Contribution

It completes the classification of torsion subgroups over cubic fields and determines the cubic points on key modular curves, extending previous results.

Findings

Classified all torsion subgroups over cubic fields.

Determined cubic points on modular curves for specific levels.

Provided evidence supporting a generalized conjecture on torsion points.

Abstract

Let $K$ be a number field, and let $E/K$ be an elliptic curve over $K$. The Mordell--Weil theorem asserts that the $K$-rational points $E(K)$ of $E$ form a finitely generated abelian group. In this work, we complete the classification of the finite groups which appear as the torsion subgroup of $E(K)$ for $K$ a cubic number field. To do so, we determine the cubic points on the modular curves $X_1(N)$ for \[N = 21, 22, 24, 25, 26, 28, 30, 32, 33, 35, 36, 39, 45, 65, 121.\] As part of our analysis, we determine the complete list of $N$ for which $J_0(N)$ (resp., $J_1(N)$, resp., $J_1(2,2N)$) has rank 0. We also provide evidence to a generalized version of a conjecture of Conrad, Edixhoven, and Stein by proving that the torsion on $J_1(N)(\mathbb{Q})$ is generated by $\text{Gal}(\bar{\mathbb{Q}}/\mathbb{Q})$-orbits of cusps of $X_1(N)_{\bar{\mathbb{Q}}}$ for $N\leq 55$, $N \neq 54$.