Quotient categories with exact structure from (n+2)-rigid subcategories in extriangulated categories

Abstract

In this work we introduce the notion of higher E-extension groups for an extriangulated category C and study the quotients Xn+1/[X] and Xn+1/[X] when X is an (n+2)-rigid subcategory of C. We also prove (under mild conditions) that each one is equivalent to a suitable subcategory of the category of functors of the stable category of Xn and the co-stable category of Xn, respectively. Moreover, it can be induced an exact structure through these equivalences and we analyze when such quotients are weakly idempotent complete, Krull-Schmidt or abelian. The above discussion is also considered in the particular case of an (n+2)-cluster tilting subcategory of C since in this case we know that Xn+1=C=Xn+1. Finally, by considering the category of conflations of a exact category, we show that it is possible to get an abelian category from these quotients.