Statistics of the First Galois Cohomology Group: A Refinement of Malle's Conjecture

Abstract

Malle proposed a conjecture for counting the number of G-extensions L/K with discriminant bounded above by X, denoted N(K,G;X), where G is a fixed transitive subgroup G⊂ Sn and X tends towards infinity. We introduce a refinement of Malle's conjecture, if G is a group with a nontrivial Galois action then we consider the set of crossed homomorphisms in Z1(K,G) (or equivalently 1-coclasses in H1(K,G)) with bounded discriminant. This has a natural interpretation given by counting G-extensions F/L for some fixed L and prescribed extension class F/L/K. If T is an abelian group with any Galois action, we compute the asymptotic growth rate of this refined counting function for Z1(K,T) (and equivalently for H1(K,T)) and show that it is a natural generalization of Malle's conjecture. The proof technique is in essence an application of a theorem of Wiles on generalized Selmer groups, and additionally gives the asymptotic main term when restricted to certain local behaviors. As a consequence, whenever the inverse Galois problem is solved for G⊂ Sn over K and G has an abelian normal subgroup T G we prove a nontrivial lower bound for N(K,G;X) given by a nonzero power of X times a power of X. For many groups, including many solvable groups, these are the first known nontrivial lower bounds. These bounds prove Malle's predicted lower bounds for a large family of groups, and for an infinite subfamily they generalize Kl\"uners' counter example to Malle's conjecture and verify the corrected lower bounds predicted by T\"urkelli.