# Homological dimensions of local (co)homology over commutative DG-rings

**Authors:** Liran Shaul

arXiv: 1702.01107 · 2019-08-15

## TL;DR

This paper extends classical results on injective modules and flat modules over commutative noetherian rings to the setting of commutative noetherian DG-rings, showing that certain derived functors preserve homological dimensions.

## Contribution

It generalizes the invariance of injective and flat dimensions under local cohomology and completion functors to the context of commutative noetherian DG-rings.

## Key findings

- Local cohomology functor does not increase injective dimension.
- Derived completion functor does not increase flat dimension.
- Results extend classical module theory to DG-ring setting.

## Abstract

Let $A$ be a commutative noetherian ring, let $\mathfrak{a}\subseteq A$ be an ideal, and let $I$ be an injective $A$-module. A basic result in the structure theory of injective modules states that the $A$-module $\Gamma_{\mathfrak{a}}(I)$ consisting of $\mathfrak{a}$-torsion elements is also an injective $A$-module. Recently, de Jong proved a dual result: If $F$ is a flat $A$-module, then the $\mathfrak{a}$-adic completion of $F$ is also a flat $A$-module. In this paper we generalize these facts to commutative noetherian DG-rings: let $A$ be a commutative non-positive DG-ring such that $\mathrm{H}^0(A)$ is a noetherian ring, and for each $i<0$, the $\mathrm{H}^0(A)$-module $\mathrm{H}^i(A)$ is finitely generated. Given an ideal $\bar{\mathfrak{a}} \subseteq \mathrm{H}^0(A)$, we show that the local cohomology functor $\mathrm{R}\Gamma_{\bar{\mathfrak{a}}}$ associated to $\bar{\mathfrak{a}}$ does not increase injective dimension. Dually, the derived $\bar{\mathfrak{a}}$-adic completion functor $\mathrm{L}\Lambda_{\bar{\mathfrak{a}}}$ does not increase flat dimension.

## Full text

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## References

13 references — full list in the complete paper: https://tomesphere.com/paper/1702.01107/full.md

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Source: https://tomesphere.com/paper/1702.01107