Finite generation of iterated wreath products

Abstract

Let (Gn,Xn) be a sequence of finite transitive permutation groups with uniformly bounded number of generators. We prove that the infinitely iterated permutational wreath product ... G2 G1 is topologically finitely generated if and only if the profinite abelian group Πn≥ 1 Gn/G'n is topologically finitely generated. As a corollary, for a finite transitive group G the minimal number of generators of the wreath power G... G G (n times) is bounded if G is perfect, and grows linearly if G is non-perfect. As a by-product we construct a finitely generated branch group, which has maximal subgroups of infinite index, answering [2,Question 14].