Quasi-compact group schemes, Hopf sheaves, and their representations

Abstract

We explore the notion of representation of an affine extension of an abelian variety -- such an extension is a faithfully flat affine morphism of -group schemes q:G A, where A is an abelian variety. We characterize the categories that arise as the category of representations of an affine extension q:G A, generalizing the classical results of Tannaka Duality established for affine -group schemes (that is, when A=Spec()). We also prove the existence of a contravariant equivalence between the category of affine extensions of a given A and the category of faithful commutative Hopf sheaves on A, generalizing in this manner the well-known op-equivalence between affine group schemes and commutative Hopf algebras. If Hq is the Hopf sheaf on A associated to q, the category of representations of q is equivalent to the category of Hq-comodules.