On the structure and stability of ranks of 2-class groups in cyclotomic Z2-extensions of certain real quadratic fields

Abstract

For a real quadratic field K= Q(d) with discriminant DK having four distinct prime factors, we study the structure of the 2-class group A(K1) of the first layer K1 = Q(2,d) of the cyclotomic Z2-extension of K. With some suitably convenient assumptions on the rank and the order of A(K1), we characterize K for which the 2-class group A(K) is isomorphic to Z/2Z Z/2Z. We infer that the 2-ranks of the class groups in each layer stabilizes by virtue of a result of Fukuda. This also provides an alternate way to establish that the Iwasawa μ-invariant of K vanishes. In some cases, we also provide sufficient conditions on the constituent prime factors of DK that imply A(K) Z/2Z Z/2Z, A(K1) Z/2Z Z/4Z and A(K) Z/2Z Z/2Z Z/2Z, where K = Q(2d). This extends some results obtained by Mizusawa.