Localization for quantum groups at a root of unity
Abstract
In the paper BK we defined categories of equivariant quantum Oq-modules and Dq-modules on the quantum flag variety of G. We proved that the Beilinson-Bernstein localization theorem holds at a generic q. Here we prove that a derived version of this theorem holds at the root of unity case. Namely, the global section functor gives a derived equivalence between category of Uq-modules and Dq-modules on the quantum flag variety. For this we first prove that Dq is an Azumaya algebra over an open subset ofthe cotangent bundle T X of the classical (char 0) flag variety X. This way we get a derived equivalence between representations of Uq and certain OT X-modules. In the paper BMR similar results were obtained for a Lie algebra p in char p. Hence, representations of p and of Uq (when q is a p'th root of unity) are related via the cotangent bundles T X in char 0 and in char p, respectively.
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