n-Exact categories arising from (n+2)-angulated categories

Abstract

Let F be an (n+2)-angulated Krull-Schmidt category and A ⊂ F an n-extension closed, additive and full subcategory with HomF(n A, A) = 0. Then A naturally carries the structure of an n-exact category in the sense of Jasso, arising from short (n+2)-angles in F with objects in A and there is a binatural and bilinear isomorphism YExtn(A,EA)(An+1,A0) HomF(An+1, n A0) for A0, An+1 ∈ A. For n = 1 this has been shown by Dyer and we generalize this result to the case n > 1. On the journey to this result, we also develop a technique for harvesting information from the higher octahedral axiom (N4*) as defined by Bergh and Thaule. Additionally, we show that the axiom (F3) for pre-(n+2)-angulated categories, introduced by Geiss, Keller and Oppermann and stating that a commutative square can be extended to a morphism of (n+2)-angles, implies a stronger version of itself.