A classification of nullity classes in the derived category of a ring
Abstract
For a commutative Noetherian ring R with finite Krull dimension, we study the nullity classes in Dcfg(R), the full triangulated subcategory Dcfg(R) of the derived category D(R) consisting of objects which can be represented by cofibrant objects with each degree finitely generated. In the light of perversity functions over the prime spectrum Spec R, we prove that there is a complete invariant of nullity classes thus that of aisles (or equivalently, t-structures) in Dcfg(R).
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