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arxiv: 0907.2080 · v6 · submitted 2009-07-13 · 🧮 math.CT

General heart construction on a triangulated category (I): unifying t-structures and cluster tilting subcategories

classification 🧮 math.CT
keywords categoryabelianclustercotorsionpairstructuretiltingtriangulated
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In the paper of Keller and Reiten, it was shown that the quotient of a triangulated category (with some conditions) by a cluster tilting subcategory becomes an abelian category. After that, Koenig and Zhu showed in detail, how the abelian structure is given on this quotient category, in a more abstract setting. On the other hand, as is well known since 1980s, the heart of any $t$-structure is abelian. We unify these two construction by using the notion of a cotorsion pair. To any cotorsion pair in a triangulated category, we can naturally associate an abelian category, which gives back each of the above two abelian categories, when the cotorsion pair comes from a cluster tilting subcategory, or is a $t$-structure, respectively.

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