Modified Ariki-Koike algebra and Yokounuma-Hecke like relations

Abstract

We find new presentations of the modified Ariki-Koike algebra (known also as Shoji's algebra) Hn,r over an integral domain R associated with a set of parameters q,u1,…,ur in R. It turns out that the algebra Hn,r has a set of generators t1,…,tn and g1,… gn-1 subject to a set of defining relations similar to the relations of Yokonuma-Hecke algebra. We also obtain a presentation of Hn,r which is independent to the choice of u1,… ur. Hence the algebras associated with the parameters q, u1,… ur and q, u'1,… u'r are isomorphic even in the case that (u1,… ur) and (u'1,… u'r) are different. As applications of the presentations, we find an explicit trace form on the algebra Hn,r which is symmetrising provided the parameters u1,…, ur are invertible in R. We also show that the symmetric group S(r) acts on the algebra Hn,r, and find a basis and a set of generators of the fixed subalgebra Hn,r S(r).