Functorially finite hearts, simple-minded systems in negative cluster categories, and noncrossing partitions
Peer reviewed, Journal article
Published version
Permanent lenke
https://hdl.handle.net/11250/3058761Utgivelsesdato
2022Metadata
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Originalversjon
Simoes, R. C., Pauksztello, D., & Ploog, D. (2022). Functorially finite hearts, simple-minded systems in negative cluster categories, and noncrossing partitions. Compositio Mathematica, 158(1), 211-243. 10.1112/S0010437X21007648Sammendrag
Let Q be an acyclic quiver and w 1 be an integer. Let C−w(kQ) be the (−w)-cluster category of kQ. We show that there is a bijection between simple-minded collections in Db(kQ) lying in a fundamental domain of C−w(kQ) and w-simple-minded systems in C−w(kQ). 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(kQ) and positive w-noncrossing partitions of the corresponding Weyl group WQ.