Non-commutative Geometry of Homogenized Quantum sl(2,C)

Abstract

This paper examines the relationship between certain non-commutative analogues of projective 3-space, P3, and the quantized enveloping algebras Uq(sl2). The relationship is mediated by certain non-commutative graded algebras S, one for each q ∈ C×, having a degree-two central element c such that S[c-1]0 Uq(sl2). The non-commutative analogues of P3 are the spaces Projnc(S). We show how the points, fat points, lines, and quadrics, in Projnc(S), and their incidence relations, correspond to finite dimensional irreducible representations of Uq(sl2), Verma modules, annihilators of Verma modules, and homomorphisms between them.