On abelian $2$-ramification torsion modules of quadratic fields

TL;DR

This paper investigates the structure and distribution of 2-ramification torsion modules of quadratic fields, providing explicit formulas, density results, and conjectures related to their behavior and connections to class numbers and $L$-functions.

Contribution

It offers explicit 4-rank formulas for $ ext{T}_2$-groups of quadratic fields, density results, and new conjectures inspired by Cohen-Lenstra heuristics and $L$-function distributions.

Findings

Explicit 4-rank formula for $ ext{T}_2(-m)$ with $m>0$

Density results for $ ext{T}_2$-groups of quadratic fields

Distribution conjectures related to $L$-functions and units

Abstract

For a number field $F$ and a prime number $p$, the $\mathbb{Z}_p$-torsion module of the Galois group of the maximal abelian pro-$p$ extension of $F$ unramified outside $p$ over $F$, denoted as $\mathcal{T}_p(F)$, is an important subject in abelian $p$-ramification theory. In this paper we study the group $\mathcal{T}_2(F)=\mathcal{T}_2(m)$ of the quadratic field $F=\mathbb{Q}(\sqrt{ m})$. Firstly, assuming $m>0$, we prove an explicit $4$-rank formula for $\mathcal{T}_2(-m)$. Furthermore, applying this formula, we obtain the $4$-rank density of $\mathcal{T}_2$-groups of imaginary quadratic fields. Secondly, for $l$ an odd prime, we obtain results about the $2$-divisibility of orders of $\mathcal{T}_2(\pm l)$ and $\mathcal{T}_2(\pm 2l)$. In particular we find that $\#\mathcal{T}_2(l)\equiv 2\# \mathcal{T}_2(2l)\equiv h_2(-2l)\bmod{16}$ if $l\equiv 7\bmod{8}$ where $h_2(-2l)$ is the $2$-class number of $\mathbb{Q}(\sqrt{-2l})$. We then obtain density results for $\mathcal{T}_2(\pm l)$ and $\mathcal{T}_2(\pm 2l)$. Finally, based on our density results and numerical data, we propose distribution conjectures about $\mathcal{T}_p(F)$ when $F$ varies over real or imaginary quadratic fields for any prime $p$, and about $\mathcal{T}_2(\pm l)$ and $\mathcal{T}_2(\pm 2 l)$ when $l$ varies, in the spirit of Cohen-Lenstra heuristics. Our conjecture in the $\mathcal{T}_2(l)$ case is closely connected to Shanks-Sime-Washington's speculation on the distributions of the zeros of $2$-adic $L$-functions and to the distributions of the fundamental units.