Kazim Buyukboduk
Published 2008-08-19, updated 2011-03-30Version 2
In this paper, we construct (many) Kolyvagin systems out of Stickelberger elements, utilizing ideas borrowed from our previous work on Kolyvagin systems of Rubin-Stark elements. We show how to apply this construction to prove results on the odd parts of the ideal class groups of CM fields which are abelian over a totally real field, and deduce the main conjecture of Iwasawa theory for totally real fields (for totally odd characters). Although the main results of this paper have already been established by Wiles, our approach provides another example (which slightly differs from the case of Stark elements) on how to study Kolyvagin systems of core rank r > 1 (in the sense of Mazur and Rubin). Also, by making use of the 'rigidity' of the collection of Kolyvagin systems, we establish a link between the Stickelberger elements and the Rubin-Stark elements.
Comments: 45 pages, to appear in Nagoya Math. Journal. May slightly differ from the final form
Cyclotomic fields are generated by cyclotomic Hecke {\it L}-values of totally real fields, II
Notes on the dual of the ideal class groups of CM-fields
Non-commutative $L$-functions for $p$-adic representations over totally real fields
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