On the capitulation problem of some pure metacyclic fields of degree 20 II
Abstract
Let n be a 5th power-free naturel number and k0\,=\,Q(ζ5) be the cyclotomic field generated by a primitive 5th root of unity ζ5. Then k\,=\,Q([5]n,ζ5) is a pure metacyclic field of absolute degree 20. In the case that k possesses a 5-class group Ck,5 of type (5,5) and all the classes are ambiguous under the action of Gal(k/k0), the capitulation of 5-ideal classes of k in its unramified cyclic quintic extensions is determined.
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