On equivariant characteristic ideals of real classes
Abstract
Let p be an odd prime, F/ Q an abelian totally real number field, F∞/F its cyclotomic Zp-extension, G∞ = Gal (F∞ / Q), A = Zp [[G∞]]. We give an explicit description of the equivariant characteristic ideal of H2Iw (F∞, Zp(m)) over A for all odd m ∈ Z by applying M. Witte's formulation of an equivariant main conjecture (or "limit theorem") due to Burns and Greither. This could shed some light on Greenberg's conjecture on the vanishing of the λ-invariant of F∞/F.
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