On the Galois module structure of the square root of the inverse different in abelian extensions
Abstract
Let K be a number field with ring of integers OK and G a finite group of odd order. If Kh is a weakly ramified G-Galois K-algebra, then its square root Ah of the inverse different is a locally free OKG-module and hence determines a class in the locally free class group Cl(OKG) of OKG. We show that for G abelian and under suitable assumptions, the set of all such classes is a subgroup of Cl(OKG).
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