Nonabelian Cohen-Lenstra Moments

Abstract

In this paper we give a conjecture for the average number of unramified G-extensions of a quadratic field for any finite group G. The Cohen-Lenstra heuristics are the specialization of our conjecture to the case that G is abelian of odd order. We prove a theorem towards the function field analog of our conjecture, and give additional motivations for the conjecture including the construction of a lifting invariant for the unramified G-extensions that takes the same number of values as the predicted average and an argument using the Malle-Bhargava principle. We note that for even |G|, corrections for the roots of unity in Q are required, which can not be seen when G is abelian.