Equivariant Iwasawa Theory for Ritter-Weiss Modules and Applications

Abstract

We consider a finite, abelian, CM extension H/F of a totally real number field F, and construct a Zp[[G(H∞/F)]]-module ∇ST(H∞)p, where p>2 is a prime and H∞ is the cyclotomic Zp-extension of H. This is the Iwasawa theoretic analogue of a module introduced by Ritter and Weiss in Ritter-Weiss and studied further by Dasgupta and Kakde in Dasgupta-Kakde. Our main result states that the Zp[[G(H∞/F]]--module ∇ST(H∞)p is of projective dimension 1, is quadratically presented, and that its Fitting ideal is principal, generated by an equivariant p-adic L-function ST(H∞/F). As a first application, we compute the Fitting ideal of an arithmetically interesting Zp[[G(H∞/F)]]--module XST,-, which is a variant of the classical unramified Iwasawa module X (the Galois group of the maximal abelian, unramified, pro-p extension of H∞), extending earlier results of Greither-Kataoka-Kurihara Greither-Kataoka-Kurihara. These are all instances of what is now called an Equivariant Main Conjecture in the Iwasawa theory of totally real number fields, and refine the classical main conjecture, proved by Wiles in wiles. As a final application, we give a short, Iwasawa theoretic proof of the minus p-part of the far-reaching Equivariant Tamagawa Number Conjecture for the Artin motive hH/F, for all primes p>2, a result also obtained, independently and with different (Euler system) methods, by Bullack-Burns-Daoud-Seo Bullach-Burns-Daoud-Seo and Dasgupta-Kakde-Silliman Dasgupta-Kakde-Silliman-ETNC.

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