Intermediate categories for proper abelian subcategories

Abstract

Let A be an extension closed proper abelian subcategory of a triangulated category T, with no negative 1 and 2 extensions. From this, two functors from AA to A can be constructed giving a snake lemma mirroring that of homology without needing a t-structure. We generalize the concept of intermediate categories, which originates from a paper by Enomoto and Saito, to the setting of proper abelian subcategories and show that under certain assumptions this collection is in bijection with torsion-free classes in A.

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