Tables of pure quintic fields

Abstract

By making use of our generalization of Barrucand and Cohn's theory of principal factorizations in pure cubic fields Q([3]D) and their Galois closures Q(ζ3,[3]D) with 3 possible types to pure quintic fields L=Q([5]D) and their pure metacyclic normal fields N=Q(ζ5,[5]D) with 13 possible types, we compile an extensive database with arithmetical invariants of the 900 pairwise non-isomorphic fields N having normalized radicands in the range 2 D<103. Our classification is based on the Galois cohomology of the unit group UN, viewed as a module over the automorphism group Gal(N/K) of N over the cyclotomic field K=Q(ζ5), by employing theorems of Hasse and Iwasawa on the Herbrand quotient of the unit norm index (UK:NN/K(UN)) by the number \#(PN/K / PK) of primitive ambiguous principal ideals, which can be interpreted as principal factors of the different DN/K. The precise structure of the F5-vector space of differential principal factors is expressed in terms of norm kernels and central orthogonal idempotents. A connection with integral representation theory is established via class number relations by Parry and Walter involving the index of subfield units (UN:U0). The statistical distribution of the 13 principal factorization types and their refined splitting into similarity classes with representative prototypes is discussed thoroughly.