The Blocks of theq-Schur Algebra

In [8], Scopes verified the Donovan conjecture for blocks of the finite symmetric groups. Her main theorem ( 1.3 below) was proved by finding a sufficient condition for Morita equivalence between two blocks of the same weight. Since there is a close connection between representations of the symmetri

We introduce an analogue of the q-Schur algebra associated to Coxeter systems ôf type A . We give two constructions of this algebra. The first construction ny 1 realizes the algebra as a certain endomorphism algebra arising from an affine Ĥecke algebra of type A , where n G r. This generalizes the

We study the properties of the surjective homomorphism, defined by Beilinson, Lusztig, and MacPherson, from the quantized enveloping algebra of gl to the n Ž . q-Schur algebra, S n, r . In particular, we find an expression for the preimage of q Ž . an arbitrary element of S n, r under this map and a

Schur algebra is a subalgebra of the group algebra RG associated to a partition of G, where G is a finite group and R is a commutative ring. For two classes of Schur algebras we study the relationship between indecomposable modules over the Schur algebra and over RG, but we discuss this problem in a

Bounded an unbounded Hilbert space V -Representations of the q-deformed Lie algebra of the group of plan motions are studied for different choices of involutions. Integrable (``well-behaved'') representations of the corresponding V -algebras are defined and described up to unitary equivalence. In th