a b s t r a c tWe prove the existence of an m-cluster tilting object in a generalized m-cluster category which is (m+1)-Calabi-Yau and Hom-finite, arising from an (m+2)-Calabi-Yau dg algebra. This is a generalization of the result for the m = 1 case in Amiot's Ph.D. thesis. Our results apply in particular to higher cluster categories associated to Ginzburg dg categories coming from suitable graded quivers with superpotential, and higher cluster categories associated to suitable finite-dimensional algebras of finite global dimension.
We prove the existence of an m-cluster tilting object in a generalized m-cluster category which is (m + 1)-Calabi-Yau and Homfinite, arising from an (m + 2)-Calabi-Yau dg algebra with finite-dimensional homology in degree 0. This is a generalization of the result for the m = 1 case in Amiot's Ph. D. thesis. Our results apply in particular to higher cluster categories associated to suitable finite-dimensional algebras of finite global dimension, and higher cluster categories associated to Ginzburg dg categories coming from suitable graded quivers with superpotential.
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