The left heart and exact hull of an additive regular category
Journal article, Peer reviewed
Published version
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https://hdl.handle.net/11250/3120897Utgivelsesdato
2023Metadata
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- Institutt for matematiske fag [2550]
- Publikasjoner fra CRIStin - NTNU [38655]
Sammendrag
However, there are natural examples of categories in functional analysis which are not quasi-abelian, but merely one-sided quasi-abelian or even weaker. Examples are the category of LB-spaces or the category of complete Hausdorff locally convex spaces. In this paper, we consider additive regular categories as a generalization of quasi-abelian categories that covers the aforementioned examples. Additive regular categories can be characterized as those subcategories of abelian categories which are closed under subobjects.
As for quasi-abelian categories, we show that such an ambient abelian category of an additive regular category E can be found as the heart of a t-structure on the bounded derived category D b (E), or as the localization of the category of monomorphisms of E. In our proof of this last construction, we formulate and prove a version of Auslander's formula for additive regular categories.
Whereas a quasi-abelian category is an exact category in a natural way, an additive regular category has a natural one-sided exact structure. Such a one-sided exact category can be 2-universally embedded into its exact hull. We show that the exact hull of an additive regular category is again an additive regular category.