Cluster Structures in 2-Calabi-Yau Triangulated Categories of Dynkin Type with Maximal Rigid Objects

In this paper, we consider two kinds of 2-Calabi-Yau triangulated categories with finitely many indecomposable objects up to isomorphisms, called An,t =D^b(KA(2t+1)(n+1)-3)/τ^t(n+1)-1[1], where n,t ≥ 1, and Dn,t = Db(KD2t(n+1))/τ^(n+1)φ^n, where n,t ≥ 1, and φ is induced by an automorphism of D2t(n+...

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Bibliographic Details
Published in:Acta mathematica Sinica. English series 2017-12, Vol.33 (12), p.1693-1704
Main Author: Chang, Hui Min
Format: Article
Language:English
Subjects:
Automorphisms
Categories
Clusters
Isomorphism
Mathematical analysis
Mathematics
Mathematics and Statistics
Visualization
三角
不可分解
刚性
子范畴
物体
簇合物
集群结构
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Summary:In this paper, we consider two kinds of 2-Calabi-Yau triangulated categories with finitely many indecomposable objects up to isomorphisms, called An,t =D^b(KA(2t+1)(n+1)-3)/τ^t(n+1)-1[1], where n,t ≥ 1, and Dn,t = Db(KD2t(n+1))/τ^(n+1)φ^n, where n,t ≥ 1, and φ is induced by an automorphism of D2t(n+1) of order 2. Except the categories An,1, they all contain non-zero maximal rigid objects which are not cluster tilting. An,1 contain cluster tilting objects. We define the cluster complex of An,t (resp. Dn,t) by using the geometric description of cluster categories of type A (resp. type D). We show that there is an isomorphism from the cluster complex of An,t (resp. Dn,t) to the cluster complex of root system of type Bn. In particular, the maximal rigid objects are isomorphic to clusters. This yields a result proved recently by Buan-Palu-Reiten: Let RAn,t, resp. RDn,t, be the full subcategory of An,t, resp. Dn,t, generated by the rigid objects. Then RAn,t≈RAn,1 and TDn,t≈TAn,1 as additive categories, for all t 〉 1.
ISSN:1439-8516
1439-7617
DOI:10.1007/s10114-017-6504-9