On the distribution of shapes of sextic pure number fields

Abstract

The shape of a number field K of degree n is defined as the equivalence class of the lattice of integers with respect to linear operations that are composites of rotations, reflections, and positive scalar dilations. The shape is a point in the space of shapes Sn-1, which is the double quotient GLn-1(Z) GLn-1(R) / GOn-1(R). We investigate the distribution of shapes of pure sextic number fields K=Q([6]m), ordered by absolute discriminant. Such fields are partitioned into 20 distinct Types determined by local conditions at 2 and 3, and an explicit integral basis is given in each case. For each Type, the shape of K admits an explicit description in terms of shape parameters. Fixing the sign of m and a Type, we prove that the corresponding shapes are equidistributed along a translated torus orbit in the space of shapes. The limiting distribution is given by an explicit measure expressed as the product of a continuous measure and a discrete measure.