Ding injective envelopes in the category of complexes

Abstract

A complex X is called Ding injective if there exists an exact sequence of injective complexes … → E1 → E0 → E-1 → … such that X = Ker(E0 → E-1), and the sequence remains exact when the functor Hom(A,-) is applied to it, for any FP-injective complex A. We prove that, over any ring R, a complex is Ding injective if and only if it is a complex of Ding injective modules. We use this to show that the class of Ding injective complexes is enveloping over any ring.