On the capitulation problem of some pure metacyclic fields of degree 20

Abstract

Let \,=\, Q([5]n) be a pure quintic field, where n is a positive integer 5th power-free, k0\,=\,Q(ζ5) be the cyclotomic field containing a primitive 5th root of unity ζ5, and k\,=\,Q([5]n,ζ5) the normal closure of . Let k5(1) be the Hilbert 5-class field of k, Ck,5 the 5-ideal classes group of k, and Ck,5(σ) the group of ambiguous classes under the action of Gal(k/k0) = σ. When Ck,5 is of type (5,5) and rank Ck,5(σ)\,=\,1, we study the capitulation problem of the 5-ideal classes of Ck,5 in the six intermediate extensions of k5(1)/k.