Iwasawa theory of Rubin-Stark units and class group
Abstract
Let K be a totally real number field of degree r=[K:Q] and let p be an odd rational prime. Let K∞ denote the cyclotomic Zp-extension of K and let L∞ be a finite extension of K∞, abelian over K. In this article, we extend results of Kazim109 relating characteristic ideal of the -quotient of the projective limit of the ideal class groups to the -quotient of the projective limit of the r-th exterior power of units modulo Rubin-Stark units, in the non semi-simple case, for some Qp-irreductible characters of Gal(L∞/K∞).
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