Litcius/Paper detail

The Cohen-Macaulay property in derived commutative algebra

Liran Shaul

2020Transactions of the American Mathematical Society14 citationsDOIOpen Access PDF

Abstract

By extending some basic results of Grothendieck and Foxby about local cohomology to commutative DG-rings, we prove new amplitude inequalities about finite DG-modules of finite injective dimension over commutative local DG-rings, complementing results of Jørgensen and resolving a recent conjecture of Minamoto. When these inequalities are equalities, we arrive at the notion of a local-Cohen-Macaulay DG-ring. We make a detailed study of this notion, showing that much of the classical theory of Cohen-Macaulay rings and modules can be generalized to the derived setting, and that there are many natural examples of local-Cohen-Macaulay DG-rings. In particular, local Gorenstein DG-rings are local-Cohen-Macaulay. Our work is in a non-positive cohomological situation, allowing the Cohen-Macaulay condition to be introduced to derived algebraic geometry, but we also discuss extensions of it to non-negative DG-rings, which could lead to the concept of Cohen-Macaulayness in topology.

Topics & Concepts

MathematicsCommutative propertyInjective functionPure mathematicsLocal cohomologyConjectureCommutative algebraProperty (philosophy)Algebra over a fieldDimension (graph theory)CohomologyAlgebraic numberAlgebraic geometryLocal ringAlgebraic structureCommutative ringGlobal dimensionConnection (principal bundle)Algebraic topologyType (biology)Discrete mathematicsHomological algebraCommutative Algebra and Its ApplicationsAlgebraic structures and combinatorial modelsHomotopy and Cohomology in Algebraic Topology