Families of Non-Galois Quartic Fields

Focusing on a particular case, we will show that one can explicitly determine the quartic fields \(\mathbf{K}\) that have ideal class groups of exponent \(\leqslant 2\), provided that \(\mathbf{K} / \mathbf{Q}\) is not normal, provided that \(\mathbf{K}\) is a quadratic extension of a fixed imaginar

Let L be a field which is a Galois extension of the field K with Galois w x group G. Greither and Pareigis GP87 showed that for many G there exist K-Hopf algebras H other than the group ring KG which make L into an Ž H-Hopf Galois extension of K or a Galois H \*-object in the sense of w x. Chase and

Two-parametric quartic Thue equations are completely solved for sufficiently large values of the parameters. Exceptional units are computed in related quartic number fields. The method depends heavily on A. Baker's theory of linear forms in logarithms and symbolic computation in MAPLE.

Introduction 0.2. Notations and conventions 1. Definitions and commutati¨e algebra 1.1. Some types of rings 1.2. Completed tensor products 1.3. Lifting fields to characteristic zero 2. An equi¨alence of categories 2.1. The characteristic p case Ž . 2.2. The characteristic zero case Version 1 Ž . 2.3