Certain Unramified Metabelian Extensions Using Lemmermeyer Factorizations
Abstract
We study solutions to the Brauer embedding problem with restricted ramification. Suppose and are a abelian groups, is a central extension of by , and a continuous homomorphism. We determine conditions on the discriminant of that are equivalent to the existence of an unramified lift of . As a consequence of this result, we use conditions on the discriminant of for abelian to classify and count unramified nonabelian extensions normal over where the (nontrivial) commutator subgroup of is contained in its center. This generalizes a result due to Lemmermeyer, which states that a quadratic field has an unramified extension normal over with Galois group the quaternion group if and only if the discriminant factors as a product of three coprime discriminants, at most one of which is negative, satisfying the following condition on Legendre symbols: for and any prime dividing .
Cite
@article{arxiv.1710.00900,
title = {Certain Unramified Metabelian Extensions Using Lemmermeyer Factorizations},
author = {Brandon Alberts},
journal= {arXiv preprint arXiv:1710.00900},
year = {2017}
}