On the relative Galois module structure of rings of integers in tame extensions

Abstract

Let F be a number field with ring of integers OF and let G be a finite group. We describe an approach to the study of the set of realisable classes in the locally free class group Cl(OFG) of OFG that involves applying the work of the second-named author in the context of relative algebraic K theory. When G is of odd order, we show (subject to certain conditions) that the set of realisable classes is a subgroup of Cl(OFG). This may be viewed as being a partial analogue of a classical theorem of Shafarevich on the inverse Galois problem for soluble groups in the setting of Galois module theory.