Dualities and equivalences of the category of relative Cohen-Macaulay modules

TL;DR

This paper develops the theory of relative Cohen-Macaulay modules over commutative Noetherian rings, establishing dualities and equivalences that extend local algebra results to a global setting.

Contribution

It introduces the concepts of a-relative dualizing and big Cohen-Macaulay modules, and extends duality and Foxby equivalence to the global context.

Findings

Established global duality for Cohen-Macaulay modules

Analyzed behavior of relative Cohen-Macaulay modules under Foxby equivalence

Extended local algebra dualities to non-local rings

Abstract

In this paper, we establish the global analogues of some dualities and equivalences in local algebra by developing the theory of relative Cohen-Macaulay modules. Let R be a commutative Noetherian ring (not necessarily local) with identity and a a proper ideal of R. The notions of a-relative dualizing modules and a-relative big Cohen-Macaulay modules are introduced. With the help of a-relative dualizing modules, we establish the global analogue of the duality on the subcategory of Cohen-Macaulay modules in local algebra. Lastly, we investigate the behavior of the subcategory of a-relative Cohen-Macaulay modules and a-relative generalized Cohen-Macaulay modules under Foxby equivalence.