English

Hecke reciprocity and class groups

Number Theory 2025-08-06 v2

Abstract

We compute the average size of ClF[2]\mathrm{Cl}_F[2] in the family of cubic fields F=Q(n3)F = \mathbb{Q}(\sqrt[3]{n}). Specifically, as FF varies over the subfamily of wildly (resp. tamely) ramified fields Q(n3)\mathbb{Q}(\sqrt[3]{n}), the average size of ClF[2]\mathrm{Cl}_F[2] is 3/23/2 (resp. 22). This tame/wild dichotomy is not accounted for by the class group heuristics in the literature. Analogously, when the extensions F=K(n3)F = K(\sqrt[3]{n}) of K=Q(3)K = \mathbb{Q}(\sqrt{-3}) are ordered by the norm of nOKn \in \mathcal{O}_K, we show that the average size of ClF[2]\mathrm{Cl}_F[2] is 3/23/2, as is predicted by the Cohen--Martinet heuristics for C3C_3-extensions of KK. Underlying our proofs is a reciprocity law for the relative class groups ClF/K[2]\mathrm{Cl}_{F/K}[2] of odd degree extensions of number fields F/KF/K. This leads us to propose class group heuristics for families of KK-extensions with a fixed Galois KK-group that explains the aberrant behavior in the family Q(n3)\mathbb{Q}(\sqrt[3]{n}) and predicts similar behavior in other special families. The other main ingredient is the work of Alp\"oge--Bhargava--Shnidman on the number of integral G(Q)G(\mathbb{Q})-orbits in a GG-invariant quadric with bounded invariants.

Keywords

Cite

@article{arxiv.2506.13749,
  title  = {Hecke reciprocity and class groups},
  author = {Ari Shnidman and Artane Siad},
  journal= {arXiv preprint arXiv:2506.13749},
  year   = {2025}
}

Comments

28 pages plus appendix. Fixed minor inaccuracy in introduction and other small changes

R2 v1 2026-07-01T03:20:12.703Z