Exactness of limits and colimits in abelian categories revisited

Abstract

Let be a small category and A be a -co-complete (resp. -complete) abelian category. It is a well-known fact that the category Fun(,A) of functors of in A is an abelian category, and that the functor colim(-):Fun(,A)→A (resp. lim(-):Fun(,A)→A) is left (resp. right) adjoint to :A→Fun(,A), where is the associated constant diagram functor. In this paper we will show that the functor colim(-) (resp. lim(-)) is exact if and only if the pair of functors (colim(-),) (resp. (,lim(-))) is Ext-adjoint. As an application of our findings, we will give new proofs of known results on the exactness of limits and colimits in abelian categories.