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

Abstract

Let A be a commutative noetherian ring, let a⊂eq 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 a(I) consisting of 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 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 H0(A) is a noetherian ring, and for each i<0, the H0(A)-module Hi(A) is finitely generated. Given an ideal a ⊂eq H0(A), we show that the local cohomology functor Ra associated to a does not increase injective dimension. Dually, the derived a-adic completion functor La does not increase flat dimension.