Completion and torsion over commutative DG rings

Abstract

Let CDGcont be the category whose objects are pairs (A,a), where A is a commutative DG-algebra and a⊂eq H0(A) is a finitely generated ideal, and whose morphisms f:(A,a) (B,b) are morphisms of DG-algebras A B, such that (H0(f)(a)) ⊂eq b. Letting Ho(CDGcont) be its homotopy category, obtained by inverting adic quasi-isomorphisms, we construct a functor L:Ho(CDGcont) Ho(CDGcont) which takes a pair (A,a) into its non-abelian derived a-adic completion. We show that this operation has, in a derived sense, the usual properties of adic completion of commutative rings, and that if A = H0(A) is an ordinary noetherian ring, this operation coincides with ordinary adic completion. As an application, following a question of Buchweitz and Flenner, we show that if is a commutative ring, and A is a commutative -algebra which is a-adically complete with respect to a finitely generated ideal a⊂eq A, then the derived Hochschild cohomology modules ExtnAL A (A,A) and the derived complete Hochschild cohomology modules ExtnAL A (A,A) coincide, without assuming any finiteness or noetherian conditions on , A or on the map A.