The imaginary case of the nonabelian Cohen--Lenstra heuristics

Abstract

For a finite group , we study the distribution of the Galois group G\#(K) of the maximal unramified extension of K that is split completely at ∞ and has degree prime to || and Char(K), as K varies over imaginary -extensions of Q or Fq(t). In the function field case, we compute the moments of the distribution of G\#(K) by counting points on Hurwitz stacks. In order to understand the probability of the distribution, we prove that G\#(K) admits presentations of a specific form, then use this presentation to build random groups to simulate the behavior of G\#(K), and make the conjecture to predict the distribution using the probability measures of these random groups. Our results provide the imaginary analog of the work of Wood, Zureick-Brown, and the first author on the nonabelian Cohen--Lenstra heuristics.