Moments of unramified 2-group extensions of quadratic fields

Abstract

Let f(K) be the number of unramified extensions L/K of a quadratic number field K with Gal(L/K)=H and Gal(L/Q)=G where G is a central extension of F2n by F2. We find a function g(K) such that f/g has finite moments and a distribution on its values. We show this distribution is a point mass when H is non-abelian and the Cohen-Lenstra distribution when H is abelian, despite the fact that the set of values of f/g do not form a discrete set. We prove an explicit formula for f as well as a refined counting function with local conditions. We also determine correlations of such counting functions for different groups G. Lastly we formulate a conjecture about moments and correlations for any pair of 2-groups (G,H).