Abelian quotients arising from extriangulated categories via morphism categories

Abstract

We investigate abelian quotients arising from extriangulated categories via morphism categories, which is a unified treatment for both exact categories and triangulated categories. Let (C,E,s) be an extriangulated category with enough projectives P and M be a full subcategory of C containing P. We show that certain quotient category of s-def(M), the category of s-deflations f:M1→ M2 with M1,M2∈M, is abelian. Our main theorem has two applications. If M=C, we obtain that certain ideal quotient category s-tri(C)/R2 is equivalent to the category of finitely presented modules mod-C/[P], where s-tri(C) is the category of all s-triangles. If M is a rigid subcategory, we show that ML/[M]mod-(M/[P]) and ML/[](mod-(M/[P])op)op, where ML (resp. ) is the full subcategory of C of objects X admitting an s-triangle 0.1pcX[r]&M1[r] & M2@-->[r]& (resp. 0.1pcX[r]&P[r] & M@-->[r]&) with M1, M2∈M (resp. M∈M and P∈P). In particular, we have C/[M]mod-(M/[P]) and C/[](mod-(M/[P])op)op provided that M is a cluster-tilting subcategory.