3-Principalization over S3-fields
Abstract
Let p 1\,(mod\,9) be a prime number and ζ3 be a primitive cube root of unity. Then k=Q([3]p,ζ3) is a pure metacyclic field with group Gal(k/Q) S3. In the case that k possesses a 3-class group Ck,3 of type (9,3), the capitulation of 3-ideal classes of k in its unramified cyclic cubic extensions is determined, and conclusions concerning the maximal unramified pro-3-extension k3(∞) of k are drawn.
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