Classification of localizing subcategories along t-structures
Abstract
We study the interplay between localizing subcategories in a stable ∞-category C with t-structure (C≥ 0, C≤ 0), the prestable ∞-category C≥ 0 and the abelian category C. We prove that weak localizing subcategories of C are in bijection with the localizing subcategories of C where object-containment can be checked on the heart. This generalizes similar known correspondences for noetherian rings and bounded t-structures. We also prove that this restricts to a bijection between localizing subcategories of C, and localizing subcategories of C that are kernels of t-exact functors -- lifting Lurie's correspondence between localizing subcategories in C≥ 0 and C to the stable category C.
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