Transitivity in wreath products with symmetric groups

Abstract

It is known that the notion of a transitive subgroup of a permutation group P extends naturally to the subsets of P. We study transitive subsets of the wreath product G Sn, where G is a finite abelian group. This includes the hyperoctahedral group for G=C2. We give structural characterisations of transitive subsets using the character theory of G Sn and interpret such subsets as designs in the conjugacy class association scheme of G Sn. In particular, we prove a generalisation of the Livingstone-Wagner theorem and give explicit constructions of transitive sets. Moreover, we establish connections to orthogonal polynomials, namely the Charlier polynomials, and use them to study codes and designs in Cr Sn. Many of our results extend results about the symmetric group Sn.