Abelian quotients of categories of n-exangles
Abstract
The notion of n-exangulated categories was introduced by Herschend-Liu-Nakaoka, which is a simultaneous generalization of n-exact categories in the sense of Jasso and (n+2)-angulated categories in the sense of Geiss-Kelier-Oppermann. Let (C,E,s) be an n-exangulated category with enough projectives P and M a full subcategory of C containing P. In the present paper, It is proved that a certian quotient category of s-def(M) is abelian. We denoted by S(C) the category of n-exangles, whose object are given by distinguished n-exangles in C. If M=C, we obtain that a certain ideal quotient category S(C)/R2 is equivalent to the category of finitely presented modules mod-(C/[P]). Furthermore, we present the quotient category S(C)/R2 always has an abelian structure when taking n as an even number. The abelian quotient S(C)/R2 admits some nice properties. We describe the projective objects in S(C)/R2 and characterize the simple objects in S(C)/R2 as Auslander-Reiten n-exangle sequences in C.
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