Classical derived functors as fully faithful embeddings

Abstract

Given associative unital algebras A and B and a complex T of B-A-bi\-modules, we give necessary and sufficient conditions for the total derived functors, A(T,?):(A)(B) and ?BT:(B)(A), to be fully faithful. We also give criteria for these functors to be one of the fully faithful functors appearing in a recollement of derived categories. In the case when T is just a B-A-bimodule, we connect the results with (infinite dimensional) tilting theory and show that some open question on the fully faithfulness of A(T,?) is related to the classical Wakamatsu tilting problem.