d-Auslander-Reiten sequences in subcategories

Abstract

Let be a finite dimensional algebra over a field k. Kleiner described the Auslander-Reiten sequences in a precovering extension closed subcategory X⊂eq mod . If X∈X is an indecomposable such that Ext1(X,X)≠ 0 and ζ X is the unique indecomposable direct summand of the X-cover g:Y→ DTrX such that Ext1(X,ζ X)≠ 0, then there is an Auslander-Reiten sequence in X of the form align* ε: 0→ ζ X→ X'→ X→ 0. align* Moreover, when End (X) modulo the morphisms factoring through a projective is a division ring, Kleiner proved that each non-split short exact sequence of the form align* δ: 0→ Y→ Y'η X→ 0 align* is such that η is right almost split in X, and the pushout of δ along g gives an Auslander-Reiten sequence in mod ending at X. In this paper, we give higher dimensional generalisations of this. Let d≥ 1 be an integer. A d-cluster tilting subcategory F⊂eq mod plays the role of a higher mod . Such an F is a d-abelian category, where kernels and cokernels are replaced by complexes of d objects and short exact sequences by complexes of d+2 objects. We give higher versions of the above results for an additive "d-extension closed" subcategory X of F.