On the self-duality of rings of integers in tame and abelian extensions

Abstract

Let L/K be a tame and Galois extension of number fields with group G. It is well-known that any ambiguous ideal in L is locally free over OKG (of rank one), and so it defines a class in the locally free class group of OKG, where OK denotes the ring of integers of K. In this paper, we shall study the relationship among the classes arising from the ring of integers OL of L, the inverse different DL/K-1 of L/K, and the square root of the inverse different AL/K of L/K (if it exists), in the case that G is abelian. They are naturally related because AL/K2 = DL/K-1 = OL*, and AL/K is special because AL/K = AL/K*, where * denotes dual with respect to the trace of L/K.