Inductive methods for counting number fields

Abstract

We give a new method for counting extensions of a number field asymptotically by discriminant, which we employ to prove many new cases of Malle's Conjecture and counterexamples to Malle's Conjecture. We consider families of extensions whose Galois closure is a fixed permutation group G. Our method relies on having asymptotic counts for T-extensions for some normal subgroup T of G, uniform bounds for the number of such T-extensions, and possibly weak bounds on the asymptotic number of G/T-extensions. However, we do not require that most T-extensions of a G/T-extension are G-extensions. Our new results use T either abelian or S3m, though our framework is general.