Capitulation in the absolutely abelian extensions of some number fields II

Abstract

We study the capitulation of 2-ideal classes of an infinite family of imaginary biquadratic number fields consisting of fields k =Q(pq1q2, i), where i=-1 and q1 q2-p-1 4 are different primes. For each of the three quadratic extensions K/k inside the absolute genus field k(*) of k, we compute the capitulation kernel of K/k. Then we deduce that each strongly ambiguous class of k/Q(i) capitulates already in k(*).