Lifting to relative cluster tilting objects in $2n$-Calabi–Yau $(n+2)$-angulated categories

Panyue Zhou; Xingjia Zhou

doi:10.4064/cm8178-7-2020

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Lifting to relative cluster tilting objects in $2n$-Calabi–Yau $(n+2)$-angulated categories

Volume 165 / 2021

Panyue Zhou, Xingjia Zhou Colloquium Mathematicum 165 (2021), 163-169 MSC: Primary 18G80; Secondary 16D90. DOI: 10.4064/cm8178-7-2020 Published online: 21 December 2020

Abstract

We show that a generalized tilting module over the endomorphism algebra of an Oppermann–Thomas cluster tilting object in a $2n$-Calabi–Yau $(n+2)$-angulated category lifts to a relative cluster tilting object in this category. As an application, this generalizes a recent work of Fu and Liu for triangulated categories.

Authors

Panyue ZhouCollege of Mathematics
Hunan Institute of Science and Technology
414006 Yueyang, Hunan
People’s Republic of China
e-mail
Xingjia ZhouCollege of Mathematics
Hunan Institute of Science and Technology
414006 Yueyang, Hunan
People’s Republic of China
e-mail

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Publishing house / Journals and Serials / Colloquium Mathematicum / Online First articles

Colloquium Mathematicum

Lifting to relative cluster tilting objects in $2n$-Calabi–Yau $(n+2)$-angulated categories

Volume 165 / 2021

Abstract

Authors

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