On the rank of the 2-class group of Q(p, q,-1)
Abstract
Let d be a square-free integer, k=Q( d,\,i) and i=-1. Let k1(2) be the Hilbert 2-class field of k, k2(2) be the Hilbert 2-class field of k1(2) and G=Gal(k2(2)/k) be the Galois group of k2(2)/k. Our goal is to give necessary and sufficient conditions to have G metacyclic in the case where d=pq, with p and q are primes such that p 1 8 and q 5 8 or p 1 8 and q 3 4.
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