The Neukirch-Uchida theorem with restricted ramification

Ryoji Shimizu

arXiv:2009.10431·math.NT·December 30, 2021·1 cites

The Neukirch-Uchida theorem with restricted ramification

Ryoji Shimizu

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TL;DR

This paper generalizes the Neukirch-Uchida theorem to certain number fields with restricted ramification, showing that isomorphic Galois groups imply the fields are isomorphic, under specific density conditions.

Contribution

It extends the Neukirch-Uchida theorem to cases with restricted ramification sets having positive Dirichlet density, including recovering the $l$-adic cyclotomic character group-theoretically.

Findings

01

Isomorphic Galois groups imply isomorphic number fields under new conditions.

02

The Dirichlet density condition is crucial for the generalization.

03

The $l$-adic cyclotomic character can be recovered group-theoretically.

Abstract

Let $K$ be a number field and $S$ a set of primes of $K$ . We write $K_{S} / K$ for the maximal extension of $K$ unramified outside $S$ and $G_{K, S}$ for its Galois group. In this paper, we prove the following generalization of the Neukirch-Uchida theorem under some assumptions: "For $i = 1, 2$ , let $K_{i}$ be a number field and $S_{i}$ a set of primes of $K_{i}$ . If $G_{K_{1}, S_{1}}$ and $G_{K_{2}, S_{2}}$ are isomorphic, then $K_{1}$ and $K_{2}$ are isomorphic." Here the main assumption is that the Dirichlet density of $S_{i}$ is not zero for at least one $i$ . A key step of the proof is to recover group-theoretically the $l$ -adic cyclotomic character of an open subgroup of $G_{K, S}$ for some prime number $l$ .

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Historical Studies and Socio-cultural Analysis