English

Sporadic Cubic Torsion

Number Theory 2024-06-04 v2 Algebraic Geometry

Abstract

Let KK be a number field, and let E/KE/K be an elliptic curve over KK. The Mordell--Weil theorem asserts that the KK-rational points E(K)E(K) of EE 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)E(K) for KK a cubic number field. To do so, we determine the cubic points on the modular curves X1(N)X_1(N) for N=21,22,24,25,26,28,30,32,33,35,36,39,45,65,121.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 NN for which J0(N)J_0(N) (resp., J1(N)J_1(N), resp., J1(2,2N)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 J1(N)(Q)J_1(N)(\mathbb{Q}) is generated by Gal(Qˉ/Q)\text{Gal}(\bar{\mathbb{Q}}/\mathbb{Q})-orbits of cusps of X1(N)QˉX_1(N)_{\bar{\mathbb{Q}}} for N55N\leq 55, N54N \neq 54.

Keywords

Cite

@article{arxiv.2007.13929,
  title  = {Sporadic Cubic Torsion},
  author = {Maarten Derickx and Anastassia Etropolski and Mark van Hoeij and Jackson S. Morrow and David Zureick-Brown},
  journal= {arXiv preprint arXiv:2007.13929},
  year   = {2024}
}

Comments

24 pages. v2: we corrected an error in Theorem 3.1

R2 v1 2026-06-23T17:27:02.831Z