Affine functors and duality

Abstract

A functor of sets X over the category of K-commutative algebras is said to be an affine functor if its functor of functions, A X, is reflexive and X= A X. We prove that affine functors are equal to a direct limit of affine schemes and that affine schemes, formal schemes, the completion of affine schemes along a closed subscheme, etc., are affine functors. Endowing an affine functor X with a functor of monoids structure is equivalent to endowing A X with a functor of bialgebras structure. If G is an affine functor of monoids, then A G* is the enveloping functor of algebras of G and the category of G-modules is equivalent to the category of A G*-modules. Applications of these results include Cartier duality, neutral Tannakian duality for affine group schemes, the equivalence between formal groups and Lie algebras in characteristic zero, etc.