Main conjectures for CM fields and a Yager-type theorem for Rubin-Stark elements
Abstract
In this article, we study the p-ordinary Iwasawa theory of the (conjectural) Rubin-Stark elements defined over abelian extensions of a CM field F and develop a rank-g Euler/Kolyvagin system machinery (where 2g is the degree of F), refining and generalizing Perrin-Riou's theory and the author's prior work. This has several important arithmetic consequences: Using the recent results of Hida and Hsieh on the CM main conjectures, we prove a natural extension of a theorem of Yager for the CM field F, where we relate the Rubin-Stark elements to the several-variable Katz p-adic L-function. Furthermore, beyond the cases covered by Hida and Hsieh, we are able to reduce the p-ordinary CM main conjectures to a local statement about the Rubin-Stark elements. We discuss applications of our results in the arithmetic of CM abelian varieties.
Keywords
Cite
@article{arxiv.1303.1404,
title = {Main conjectures for CM fields and a Yager-type theorem for Rubin-Stark elements},
author = {Kazim Buyukboduk},
journal= {arXiv preprint arXiv:1303.1404},
year = {2015}
}
Comments
24 pages, comments are very welcome