Power-saving error terms for the number of D4-quartic extensions over a number field ordered by discriminant

Abstract

We study the asymptotic count of dihedral quartic extensions over a fixed number field with bounded norm of the relative discriminant. The main term of this count (including a summation formula for the constant) can be found in the literature (see Cohen--Diaz y Diaz--Olivier for the statement without proof and see Kl\"uners for a proof), but a power-saving for the error term has not been explicitly determined except in the case that the base field is Q. In this article, we describe the argument for obtaining both the explicit main term and a power-saving error term for the number of D4-quartic extensions over a general base number field ordered by the norms of their relative discriminants. We also give an extensive overview of the history and development of number field asymptotics.