Vector bundles on quantum conjugacy classes

Abstract

Let g be a simple complex Lie algebra of a classical type and Uq(g) the corresponding Drinfeld-Jimbo quantum group at q not a root of unity. With every point t of the fixed maximal torus T of an algebraic group G with Lie algebra g we associate an additive category Oq(t) of Uq(g)-modules that is stable under tensor product with finite-dimensional quasi-classical Uq(g)-modules. We prove that Oq(t) is essentially semi-simple and use it to explicitly quantize equivariant vector bundles on the conjugacy class of t.