Abstract $\ell$-adic $1$-motives and Tate's class

TL;DR

This paper links new $ ext{ extlangle} ext{ell} ext{ extgreater}$-adic Iwasawa modules, constructed as realizations of abstract $ ext{ extlangle} ext{ell} ext{ extgreater}$-adic 1-motives, to Tate's canonical class and provides explicit $ ext{ extlangle} ext{ell} extgreater}$-adic Tate sequences for Galois CM extensions, advancing Iwasawa and Tamagawa number conjectures.

Contribution

It establishes explicit $ ext{ extlangle} ext{ell} extgreater}$-adic Tate sequences linked to new Iwasawa modules, aiding proofs of the Equivariant Tamagawa Number Conjecture for Artin motives.

Findings

Constructed explicit $ ext{ extlangle} ext{ell} extgreater}$-adic Tate sequences for Galois CM extensions.

Linked new Iwasawa modules to Tate's canonical class.

Supported the proof of the minus part of the Equivariant Tamagawa Number Conjecture.

Abstract

In a previous paper we constructed a new class of Iwasawa modules as $\ell$--adic realizations of what we called abstract $\ell$--adic $1$--motives in the number field setting. We proved in loc. cit. that the new Iwasawa modules satisfy an equivariant main conjecture. In this paper we link the new modules to the $\ell$--adified Tate canonical class, defined by Tate in 1960 and give an explicit construction of (the minus part of) $\ell$--adic Tate sequences for any Galois CM extension $K/k$ of an arbitrary totally real number field $k$. These explicit constructions are significant and useful in their own right but also due to their applications (via our previous results on the Equivariant Main Conjecture in Iwasawa theory) to a proof of the minus part of the far reaching Equivariant Tamagawa Number Conjecture for the Artin motive associated to the Galois extension $K/k$.