Certain Unramified Metabelian Extensions Using Lemmermeyer Factorizations

Abstract

We study solutions to the Brauer embedding problem with restricted ramification. Suppose G and A are a abelian groups, E is a central extension of G by A, and f:Gal(Q/Q)→ G a continuous homomorphism. We determine conditions on the discriminant of f that are equivalent to the existence of an unramified lift f:Gal(Q/Q)→ E of f. As a consequence of this result, we use conditions on the discriminant of K for K/Q abelian to classify and count unramified nonabelian extensions L/K normal over Q where the (nontrivial) commutator subgroup of Gal(L/Q) is contained in its center. This generalizes a result due to Lemmermeyer, which states that a quadratic field Q(d) has an unramified extension normal over Q with Galois group H8 the quaternion group if and only if the discriminant factors d=d1 d2 d3 as a product of three coprime discriminants, at most one of which is negative, satisfying the following condition on Legendre symbols: \[ (di djpk)=1 \] for \i,j,k\=\1,2,3\ and pi any prime dividing di.