The Auslander-Gruson-Jensen Recollement

Abstract

For any ring R, the Auslander-Gruson-Jensen functor is the exact contravariant functor DA:fp(Mod(R),Ab)(mod(Rop),Ab) sending representable functors (X,0.05cm\ \ 0.1cm ) to tensor functors X0.05cm\ \ 0.1cm . We show that this functor admits a fully faithful left adjoint DL and a fully faithful right adjoint DR. The left adjoint DL\:(mod(Rop),Ab) fp(Mod(R),Ab) induces an equivalence of categories fp(Mod(R),Ab)\F\ |\ DA F=0\(mod(Rop),Ab)op where \F \ |\ DA F=0\ is the Serre subcategory of fp(Mod(R),Ab) consisting of all functors F arising from pure exact sequences. As a result, the functor DA is seen to be a Serre localization functor. The right adjoint DR:(mod(Rop),Ab) fp(Mod(R),Ab) together with DA restricts to the well known Auslander-Gruson-Jensen duality.