The generators of 5-class group of some fields of degree 20 over Q

Abstract

Let \,=\, Q([5]n) be a pure quintic field, where n is a positive integer, 5th power-free. Let k0\,=\,Q(ζ5) be the cyclotomic field containing a primitive 5th root of unity ζ5, and k\,=\,(ζ5) be the normal closure of . Let Ck,5 be the 5-component of the class group of k. The purpose of this paper is to determine generators of Ck,5, whenever it is of type (5,5) and the rank of the group of ambiguous classes under the action of Gal(k/k0)\, =\, σ is 1.