Higher Auslander-Reiten sequences and t-structures

Abstract

Let R be an artin algebra and C an additive subcategory of mod(R). We construct a t-structure on the homotopy category K-(C) whose heart HC is a natural domain for higher Auslander-Reiten (AR) theory. The abelian categories Hmod(R) (which is the natural domain for classical AR theory) and HC interact via various functors. If C is functorially finite then HC is a quotient category of Hmod(R). We illustrate the theory with two examples: Iyama developed a higher AR theory when C is a maximal n-orthogonal subcategory, see I. In this case we show that the simple objects of HC correspond to Iyama's higher AR sequences and derive his higher AR duality from the existence of a Serre functor on the derived category Db(HC). The category O of a complex semi-simple Lie algebra g fits into higher AR theory by considering R to be the coinvariant algebra of the Weyl group of g.