Principal factors and lattice minima

Abstract

Let k=Q([3]d,ζ3), where d>1 is a cube-free positive integer, k0=Q(ζ3) be the cyclotomic field containing a primitive cube root of unity ζ3, and G=Gal(k/k0). The possible prime factorizations of d in our main result [2, Thm. 1.1] give rise to new phenomena concerning the chain =(θi)i∈Z of lattice minima in the underlying pure cubic subfield L=Q([3]d) of k. The aims of the present work are to give criteria for the occurrence of generators of primitive ambiguous principal ideals (α)∈PkG/Pk0 among the lattice minima =(θi)i∈Z of the underlying pure cubic field L=Q([3]d), and to explain exceptional behavior of the chain for certain radicands d with impact on determining the principal factorization type of L and k by means of Voronoi's algorithm.