Positive Fuss-Catalan numbers and Simple-minded systems in negative Calabi-Yau categories

Abstract

We establish a bijection between d-simple-minded systems (d-SMSs) of (-d)-Calabi-Yau cluster category C-d(H) and silting objects of D b(H) contained in D 0 D 1-d for hereditary algebra H of Dynkin type and d 1. We show that the number of d-SMSs in C-d(H) is the positive Fuss-Catalan number Cd+(W) of the corresponding Weyl group W, by applying this bijection and Buan-Reiten-Thomas' and Zhu's results on Fomin-Reading's generalized cluster complexes. Our results are based on a refined version of silting-t-structure correspondence.