Auslander-Reiten (d+2)-angles in subcategories and a (d+2)-angulated generalisation of a theorem by Br\"uning

Abstract

Let be a finite dimensional algebra over an algebraically closed field k and assume gldim\,≤ d, for some fixed positive integer d. For d=1, Br\"uning proved that there is a bijection between the wide subcategories of the abelian category mod\, and those of the triangulated category Db(mod). Moreover, for a suitable triangulated category M, Jrgensen gave a description of Auslander-Reiten triangles in the extension closed subcategories of M. In this paper, we generalise these results for d-abelian and (d+2)-angulated categories, where kernels and cokernels are replaced by complexes of d+1 objects and triangles are replaced by complexes of d+2 objects. The categories are obtained as follows: if F⊂eq mod is a d-cluster tilting subcategory, consider F:=add \idF i∈Z \⊂eq Db(mod). Then F is d-abelian and plays the role of a higher mod\, having for higher derived category the (d+2)-angulated category F.