An Algebra Associated with a Flag in a Subspace Lattice over a Finite Field and the Quantum Affine Algebra Uq(sl2)

Abstract

In this paper, we introduce an algebra H from a subspace lattice with respect to a fixed flag which contains its incidence algebra as a proper subalgebra. We then establish a relation between the algebra H and the quantum affine algebra Uq1/2(sl2), where q denotes the cardinality of the base field. It is an extension of the well-known relation between the incidence algebra of a subspace lattice and the quantum algebra Uq1/2(sl2). We show that there exists an algebra homomorphism from Uq1/2(sl2) to H and that any irreducible module for H is irreducible as an Uq1/2(sl2)-module.