Duality and contravariant functors in the representation theory of artin algebras

Abstract

We know that the model theory of modules leads to a way of obtaining definable categories of modules over a ring R as the kernels of certain functors (R-Mod)opAb rather than of functors R-ModAb which are given by a pp pair. This paper will give various algebraic characterisations of these functors in the case that R is an artin algebra. Suppose that R is an artin algebra. An additive functor G:(R-Mod)opAb preserves inverse limits and G|(R-mod)op:(R-mod)opAb is finitely presented if and only if there is a sequence of natural transformations (-,A)(-,B) G 0 for some A,B∈ R-mod which is exact when evaluated at any left R-module. Any additive functor (R-Mod)opAb with one of these equivalent properties has a definable kernel, and every definable subcategory of R-Mod can be obtained as the kernel of a family of such functors. In the final section a generalised setting is introduced, so that our results apply to more categories than those of the form R-Mod for an artin algebra R. That is, our results are extended to those locally finitely presented K-linear categories whose finitely presented objects form a dualising K-variety, where K is a commutative artinian ring.