Dimension filtration of the bounded Derived category of a Noetherian ring

Abstract: Let $A$ be a Noetherian ring of dimension $d$ and let $\mathcal{D}^b(A)$ be the bounded derived category of $A$. Let $\mathcal{D}i^b(A)$ denote the thick subcategory of $\mathcal{D}^b(A)$ consisting of complexes $\mathbf{X}\bullet$ with $\dim H^n(\mathbf{X}_\bullet) \leq i$ for all $n$. Set $\mathcal{D}{-1}^b(A) = 0$. Consider the Verdier quotients $\mathcal{C}_i(A) = \mathcal{D}_i^b(A)/\mathcal{D}{i-1}^b(A)$. We show for $i = 0, \ldots, d$, $\mathcal{C}i(A)$ is a Krull-Remak-Schmidt triangulated category with a bounded $t$-structure. We identify its heart. We also prove that if $A$ is regular then $\mathcal{C}_i(A)$ has AR-triangles. We also prove that $$ \mathcal{C}_i(A) \cong \bigoplus{\stackrel{P}{\dim A/P = i}} \mathcal{D}_0^b(A_P). $$