On the realizable classes of the square root of the inverse different in the unitary class group

Abstract

Let K be a number field with ring of integers OK and let G be a finite abelian group of odd order. Given a G-Galois K-algebra Kh, let Ah denote its square root of the inverse different, which exists by Hilbert's formula. If Kh/K is weakly ramified, then the pair (Ah,Trh) is locally G-isometric to (OKG,tK) and hence defines a class in the unitary class group UCl(OKG) of OKG. Here Trh denotes the trace of Kh/K and tK the symmetric bilinear form on OKG for which tK(s,t)=δst for all s,t∈ G. We study the collection of all such classes and show that a subset of them is in fact a subgroup of UCl(OKG).