Xavier-François Roblot, Alfred Weiss
Published 2009-04-24Version 1
Recently Ritter and Weiss introduced an equivariant "main conjecture" than generalizes and refines the Main Conjecture of Iwasawa theory. In this paper, we show that, for the prime 2 and a dihedral extension of order 8 over Q, this conjecture is equivalent to a congruence condition on the coefficients of a power series with 2-adic integral coefficients constructed using the 2-adic L-series associated to the extension. We then verify that this congruence condition holds for the first coefficients in a large number of examples.
Iwasawa theory of Rubin-Stark units and class group
Iwasawa theory for ${\rm GL}_2\times{\rm GL}_2$ and diagonal cycles
Iwasawa theory of Heegner cycles, I. Rank over the Iwasawa algebra
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