Dimension filtration of the bounded Derived category of a Noetherian ring
Abstract
Let A be a Noetherian ring of dimension d and let Db(A) be the bounded derived category of A. Let Dib(A) denote the thick subcategory of Db(A) consisting of complexes X with Hn(X) ≤ i for all n. Set D-1b(A) = 0. Consider the Verdier quotients Ci(A) = Dib(A)/Di-1b(A). We show for i = 0, …, d, Ci(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 Ci(A) has AR-triangles. We also prove that Ci(A) P A/P = i D0b(AP).
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