New realization of cyclotomic q-Schur algebras I

Abstract

We introduce a Lie algebra gQ(m) and an associative algebra Uq,Q(m) associated with the Cartan data of glm which is separated into r parts with respect to m=(m1, …, mr) such that m1+ … + mr =m. We show that the Lie algebra gQ (m) is a filtered deformation of the current Lie algebra of glm, and we can regard the algebra Uq, Q(m) as a "q-analogue" of U(gQ(m)). Then, we realize a cyclotomic q-Schur algebra as a quotient algebra of Uq, Q(m) under a certain mild condition. We also study the representation theory for gQ(m) and Uq,Q(m), and we apply them to the representations of the cyclotomic q-Schur algebras.