Unramified Iwasawa module of Z2-extension of certain quadratic fields with a bounded quotient
Abstract
We consider an infinite family of real quadratic fields k where the discriminant has three distinct odd prime factors, and the prime 2 splits. We show that the unramified Iwasawa module X(k∞) associated with the Z2-extension of k has a bounded quotient. Thus, we also verify Greenberg's conjecture on the vanishing of Iwasawa invariants for such fields and obtain a finer structure for X(k∞).
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