Ideal Class Groups, Some Computations

The object of this note is to discuss the properties of some polynomials on a . countable set of indeterminates attached to any finite group which generalize the Ž Eulerian functions of a group defined by P. Hall 1936, Quart. J. Math. 7, . 134᎐151 . In particular, I will define some classes of finit

We prove that any finite abelian group is the ideal class group of the ring of S-integers of some global field of given characteristic. ## 1999 Academic Press Nous prouvons que tout groupe abe lien fini est groupe des classes d'ide aux de l'anneau des S-entiers d'un corps global de caracte ristiqu

We prove that there are only finitely many CM-fields N with cyclic ideal class groups of 2-power orders such that the complex conjugation is the square of some automorphism of N. Since their actual determination would be too difficult, we only content ourselves with the determination of the nonquadr

We describe in detail the implementation of an algorithm which computes the class group and the unit group of a general number field, and solves the principal ideal problem. The basic ideas of this algorithm are due to J. Buchmann. New ideas are the use of LLL-reduction of an ideal in a given direct

For a totally real field of prime power conductor, we determine the Fitting ideal over the Galois group ring of the ideal class group and of the narrow ideal class group. 1998 Academic Press ## 1. Introduction In this paper we prove a structure result on the ideal class group and on the narrow id