Invariant generalized ideal classes -- structure theorems for p-class groups in p-extensions
Abstract
We give, in Sections 2 and 3, an english translation of: {\it Classes g\'en\'eralis\'ees invariantes}, J. Math. Soc. Japan, 46, 3 (1994), with some improvements and with notations and definitions in accordance with our book: {\it Class Field Theory: from theory to practice}, SMM, Springer-Verlag, corrected printing 2005. We recall, in Section 4, some structure theorems for finite -modules () obtained in: {\it Sur les -classes d'id\'eaux dans les extensions cycliques relatives de degr\'e premier }, Annales de l'Institut Fourier, 23, 3 (1973). Then we recall the algorithm of local normic computations which allows to obtain the order and (potentially) the structure of a -class group in a cyclic extension of degree . In Section 5, we apply this to the study of the structure of relative -class groups of Abelian extensions of prime to degree, using the Thaine--Ribet--Mazur--Wiles--Kolyvagin "principal theorem", and the notion of "admissible sets of prime numbers" in a cyclic extension of degree , from: {\it Sur la structure des groupes de classes relatives}, Annales de l'Institut Fourier, 43, 1 (1993). In conclusion, we suggest the study, in the same spirit, of some deep invariants attached to the -ramification theory (as dual form of non-ramification theory) and which have become standard in a -adic framework. Since some of these techniques have often been rediscovered, we give a substantial (but certainly incomplete) bibliography which may be used to have a broad view on the subject.
Cite
@article{arxiv.2108.04502,
title = {Invariant generalized ideal classes -- structure theorems for p-class groups in p-extensions},
author = {Georges Gras},
journal= {arXiv preprint arXiv:2108.04502},
year = {2021}
}