Another realization of the category of modules over the small quantum group

Abstract

Let g be a semi-simple simply-connected Lie algebra and let U be the corresponding quantum group with divided powers, where is an even order root of unity. Let in addition u⊂ U be the corresponding "small" quantum group. In this paper we establish the following relation between the categories of representations of U and u: We show that the category of u-modules is naturally equivalent to the category of U-modules, which have a Hecke eigen-property with respect to representations lifted by means of the quantum Frobenius map U U( g), where g is the Langlands dual Lie algebra. This description allows to express the regular linkage class in the category u-mod in terms of perverse sheaves on the affine flag variety with a Hecke eigen-property. Moreover, it can serve as a basis to the program to understand the connection between the category u-mod and the category of representations of the corresponding affine algebra at the critical level.

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