Generalized characters of the generalized symmetric group

Abstract

We prove that (Zk Sn × Zk Sn-1, diag (Zk Sn-1) ) is a symmetric Gelfand pair, where Zk Sn is the wreath product of the cyclic group Zk with the symmetric group Sn. The proof is based on the study of the Zk Sn-1-conjugacy classes of Zk Sn. We define the generalized characters of Zk Sn using the zonal spherical functions of (Zk Sn × Zk Sn-1, diag (Zk Sn-1) ). We show that these generalized characters have properties similar to usual characters. A Murnaghan-Nakayama rule for the generalized characters of the hyperoctahedral group is presented. The generalized characters of the symmetric group were first studied by Strahov in [7].

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