Fitting Ideals of Projective Limits of Modules over Non-Noetherian Iwasawa Algebras

Abstract

In grku1, Greither and Kurihara proved a theorem about the commutativity of projective limits and Fitting ideals for modules over the classical equivariant Iwasawa algebra ΛG=Zp[G][[T]], where G is a finite, abelian group and Zp is the ring of p--adic integers, for some prime p. In this paper, we generalize their result first to the Noetherian Iwasawa algebras O[[T1, T2, …, Tn]] and, most importantly, to non-Noetherian algebras O[[T1, T2, …, Tn, …]] of countably many generators, with more general rings of coefficients O. The latter generalization is motivated by the recent work of Bley--Popescu on the Geometric Equivariant Iwasawa Conjecture for function fields, as well as by the emerging Iwasawa theory of Taelman class--modules associated to Drinfeld modules, where the Iwasawa algebras are not Noetherian, of the type described above. A sample application of our results to non--Noetherian geometric Iwasawa theory is given in Appendix B. Further number theoretic applications will be given in an upcoming paper.