Systems of imprimitivity for wreath products

Abstract

Let G be an irreducible imprimitive subgroup of GLn(F), where F is a field. Any system of imprimitivity for G can be refined to a nonrefinable system of imprimitivity, and we consider the question of when such a refinement is unique. Examples show that G can have many nonrefinable systems of imprimitivity, and even the number of components is not uniquely determined. We consider the case where G is the wreath product of an irreducible primitive H ≤ GLd(F) and transitive K ≤ Sk, where n = dk. We show that G has a unique nonrefinable system of imprimitivity, except in the following special case: d = 1, n = k is even, |H| = 2, and K is a transitive subgroup of C2 Sn/2. As a simple application, we prove results about inclusions between wreath product subgroups.