Yoneda extensions of abelian quotient categories

Abstract

Let A be a essentially small abelian category and C be a Serre subcategory of A. Consider the quotient functor q:A→ A/C. For an object A∈ A and a non-negative integer k we investigate when the natural map qX,Ai: ExtiA(X,A)→ ExtiA/C(q(X),q(A)) is invertible for every X∈ A and every i∈\0,1,·s,k\. In the end we give an application of the main theorem.