Karin M. Jacobsen, Peter Jorgensen
Published 2018-12-12Version 1
Let $\mathscr T$ be a $2$-Calabi--Yau triangulated category, $T$ a cluster tilting object with endomorphism algebra $\Gamma$. Consider the functor $\mathscr T( T,- ) : \mathscr T \rightarrow \mod \Gamma$. It induces a bijection from the isomorphism classes of cluster tilting objects to the isomorphism classes of support $\tau$-tilting pairs. This is due to Adachi, Iyama, and Reiten. The notion of $( d+2 )$-angulated categories is a higher analogue of triangulated categories. We show a higher analogue of the above result, based on the notion of maximal $\tau_d$-rigid pairs.
$d$-abelian quotients of $(d+2)$-angulated categories
Derived dimension via τ-tilting theory
Endomorphism algebras of maximal rigid objects in cluster tubes
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