Unbounded ladders induced by Gorenstein algebras
arXiv:1601.06558
Abstract
The derived category of a Gorenstein triangular matrix algebra $A$ admits an unbounded ladder, which is of period $3$ if $A = T_2(B)$. Also, a left recollement of triangulated categories with Serre functors sits in a ladder of period $1$; as an application, the singularity category of $A$ admits a ladder of period $1$.
This paper has been withdrawn by the authors due to an error in the proof of Lemma 2.5