Localization theorems for approximable triangulated categories

Approximable triangulated categories, as introduced and developed by Neeman, provide a solid framework for studying localization sequences within triangulated categories. In our paper, we demonstrate that a recollement of approximable triangulated categories, given certain mild conditions, induces short exact sequences of both triangulated subcategories and Verdier quotient categories. Specifically, in the case of a recollement of locally Hom-finite noetherian approximable triangulated categories, we find that this induces a short exact sequence of the bounded closures of compact objects within these categories. Furthermore, if the recollement extends one step downwards, it yields a short exact sequence of the singularity categories of these triangulated categories, offering a generalization of the localization sequence established by Jin-Yang-Zhou for the singularity categories of finite-dimensional algebras. We also present applications of these results within the derived categories of finite-dimensional algebras, DG algebras, and schemes.
Comment: 20 pages. Correct some minor errors. Comments are welcome