Finite Gelfand pairs and cracking points of the symmetric groups

Abstract

Let be a finite group. Consider the wreath product Gn := n Sn and the subgroup Kn := n × Sn⊂eq Gn, where Sn is the symmetric group and n is the diagonal subgroup of n. For certain values of n (which depend on the group ), the pair (Gn, Kn) is a Gelfand pair. It is not known for all finite groups which values of n result in Gelfand pairs. Building off the work of Benson--Ratcliff, we obtain a result which simplifies the computation of multiplicities of irreducible representations in certain tensor product representations, then apply this result to show that for = Sk, \ k ≥ 5, (Gn,Kn) is a Gelfand pair exactly when n = 1,2.