On the average 2-torsion in class groups and narrow class groups of cubic orders with prescribed shape

Abstract

We study the distribution of 2-torsion in class groups and narrow class groups of cubic fields and cubic orders subject to prescribed shape conditions. The shape of a cubic order in a number field is a natural geometric invariant taking values in the modular surface H/GL2(Z). Fix a subset W of the modular surface with positive hyperbolic measure and boundary of measure zero. Refining the methods of Bhargava and Varma, we prove that among cubic fields with shape in W, the average size of the 2-torsion subgroup of the class group is 5/4 for totally real fields and 3/2 for complex fields, while the average size of the 2-torsion subgroup of the narrow class group for totally real cubic fields is 2. We also obtain analogous results for cubic orders satisfying prescribed local conditions at all primes.