Duality properties for quantum groups

Abstract

Some duality properties for induced representations of enveloping algebras involve the character Trad g. We extend them to deformation Hopf algebras Ah of a noetherian Hopf k-algebra A0 satistying ExtiA0(k, A0)=\0\ except for i=d where it is isomorphic to k. These duality properties involve the character of Ah defined by right multiplication on the one dimensional free k[[h]]-module ExtdAh (k[[h]], Ah). In the case of quantized enveloping algebras, this character lifts the character Trad g. We also prove Poincar\'e duality for such deformation Hopf algebras in the case where A0 is of finite homological dimension. We explain the relation of our construction with quantum duality.