The Ariki--Koike algebras and Rogers--Ramanujan type partitions

Abstract

In 2000, Ariki and Mathas showed that the simple modules of the Ariki--Koike algebras HC,q;Q1,…, Qm(G(m, 1, n)) (when the parameters are roots of unity and q≠ 1) are labeled by the so-called Kleshchev multipartitions. This together with Ariki's categorification theorem enabled Ariki and Mathas to obtain the generating function for the number of Kleshchev multipartitions by making use of the Weyl--Kac character formula. In this paper, we revisit this generating function for the q=-1 case. This q=-1 case is particularly interesting, for the corresponding Kleshchev multipartitions have a very close connection to generalized Rogers--Ramanujan type partitions when Q1=·s=Qa=-1 and Qa+1=·s =Qm =1. Based on this connection, we provide an analytic proof of the result of Ariki and Mathas for q=Q1=·s Qa=-1 and Qa+1=·s =Qm =1. Our second objective is to investigate simple modules of the Ariki--Koike algebra in a fixed block. It is known that these simple modules in a fixed block are labeled by the Kleshchev multiparitions with a fixed partition residue statistic. This partition statistic is also studied in the works of Berkovich, Garvan, and Uncu. Employing their results, we provide two bivariate generating function identities when m=2.