English

$3$-Selmer group, ideal class groups and cube sum problem

Number Theory 2025-01-22 v2

Abstract

Consider a Mordell curve Ea:y2=x3+aE_a:y^2=x^3+a with aZa \in \mathbb Z. These curves have a rational 33-isogeny, say φ\varphi. We give an upper and a lower bound on the rank of the φ\varphi-Selmer group of EaE_a over Q(ζ3)\mathbb Q(\zeta_3) in terms of the 33-part of the ideal class group of certain quadratic extension of Q(ζ3)\mathbb Q(\zeta_3). Using our bounds on the Selmer groups, we prove some cases of the rational cube sum problem. Further, using these bounds, we give explicit families of the Mordell curves to show that for a positive proportion of EaE_a, Sel3(Ea/Q)=0{\rm Sel}^3(E_{a}/\mathbb Q)=0 (respectively Sel3(Ea/Q){\rm Sel}^3(E_{a}/\mathbb Q) has F3\mathbb F_3-rank 11).

Keywords

Cite

@article{arxiv.2207.12487,
  title  = {$3$-Selmer group, ideal class groups and cube sum problem},
  author = {Somnath Jha and Dipramit Majumdar and Pratiksha Shingavekar},
  journal= {arXiv preprint arXiv:2207.12487},
  year   = {2025}
}
R2 v1 2026-06-25T01:13:11.777Z