Counting number fields whose Galois group is a wreath product of symmetric groups

Abstract

Let K be a number field and k≥ 2 be an integer. Let (n1,n2, …, nk) be a vector with entries ni∈ Z≥ 2. Given a number field extension L/K, we denote by L the Galois closure of L over K. We prove asymptotic lower bounds for the number of number field extensions L/K with [L:K]=Πi=1k ni, such that Gal(L/K) is isomorphic to the iterated wreath product of symmetric groups Sn1 Sn2 … Snk. Here, the number fields L are ordered according to discriminant |L|:=|NormK/Q (L/K)|. The results in this paper are motivated by Malle's conjecture. When n1=n2=… =nk, these wreath products arise naturally in the study of arboreal Galois representations associated to rational functions over K. We prove our results by developing Galois theoretic techniques that have their origins in the study of dynamical systems.