3-rank of ambiguous class groups of cubic Kummer extensions

Abstract

Let k=k0([3]d) be a cubic Kummer extension of k0=Q(ζ3) with d>1 a cube-free integer and ζ3 a primitive third root of unity. Denote by Ck,3(σ) the 3-group of ambiguous classes of the extension k/k0 with relative group G=Gal(k/k0)=σ. The aims of this paper are to characterize all extensions k/k0 with cyclic 3-group of ambiguous classes Ck,3(σ) of order 3, to investigate the multiplicity m(f) of the conductors f of these abelian extensions k/k0, and to classify the fields k according to the cohomology of their unit groups Ek as Galois modules over G. The techniques employed for reaching these goals are relative 3-genus fields, Hilbert norm residue symbols, quadratic 3-ring class groups modulo f, the Herbrand quotient of Ek, and central orthogonal idempotents. All theoretical achievements are underpinned by extensive computational results.