A note on singularity categories and triangular matrix algebras

Abstract: Let $\Lambda = \left[\begin{array}{cc} A & 0 \ M & B \end{array}\right] $ be an Artin algebra and $BM_A$ a $B$-$A$-bimodule. We prove that there is a triangle equivalence $D{sg}(\Lambda) \cong D_{sg}(A)\coprod D_{sg}(B)$ between the corresponding singularity categories if $_BM$ is semi-simple and $M_A$ is projective. As a result, we obtain a new method for describing the singularity categories of certain bounded quiver algebras.