Exceptional cycles in triangular matrix algebras (2201.10996v1)

Abstract: An exceptional cycle in a triangulated category with Serre functor is a generalization of a spherical object. Suppose that $A$ and $B$ are Gorenstein algebras, given a perfect exceptional $n$-cycle $E_$ in $K^b(A\mbox{-}{\rm proj})$ and a perfect exceptional $m$-cycle $F_$ in $K^b(B\mbox{-}{\rm proj})$, we construct an $A$-$B$-bimodule $N$, and prove the product $E_\boxtimes F_$ is an exceptional $(n+m-1)$-cycle in $K^b(\Lambda\mbox{-}{\rm proj})$, where $\Lambda=\begin{pmatrix}A & N\ 0 & B \end{pmatrix}$. Using this construction, one gets many new exceptional cycles which is unknown before for certain class of algebras.