A Group Theoretic Approach to Cyclic Cubic Fields

Let ( k μ ) μ = 1 4 be a quartet of cyclic cubic number fields sharing a common conductor c = p q r divisible by exactly three prime(power)s, p , q , r . For those components of the quartet whose 3-class group Cl 3 ( k μ ) ≃ ( Z / 3 Z ) 2 is elementary bicyclic, the automorphism group M = Gal ( F 3 2 ( k μ ) / k μ ) of the maximal metabelian unramified 3-extension of k μ is determined by conditions for cubic residue symbols between p , q , r and for ambiguous principal ideals in subfields of the common absolute 3-genus field k * of all k μ . With the aid of the relation rank d 2 ( M ) , it is decided whether M coincides with the Galois group G = Gal ( F 3 ∞ ( k μ ) / k μ ) of the maximal unramified pro-3-extension of k μ .