Functorially finite hearts, simple-minded systems in negative cluster categories, and noncrossing partitions

Abstract

Let Q be an acyclic quiver and w ≥ 1 be an integer. Let C-w (k Q) be the (-w)-cluster category of k Q. We show that there is a bijection between simple-minded collections in Db (k Q) lying in a fundamental domain of C-w (k Q) and w-simple-minded systems in C-w (k Q). This generalises the same result of Iyama-Jin in the case that Q is Dynkin. A key step in our proof is the observation that the heart H of a bounded t-structure in a Hom-finite, Krull-Schmidt, k-linear saturated triangulated category D is functorially finite in D if and only if H has enough injectives and enough projectives. We then establish a bijection between w-simple-minded systems in C-w (k Q) and positive w-noncrossing partitions of the corresponding Weyl group WQ.