Descent and generation for noncommutative coherent algebras over schemes

Our work investigates a form of descent, in the fppf and h topologies, for generation of triangulated categories obtained from noncommutative coherent algebras over schemes. In addition, also the behaviour of generation with respect to the derived pushforward of proper morphisms is studied. This all...

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Bibliographic Details
Published in:arXiv.org 2024-10
Main Authors: De Deyn, Timothy, Lank, Pat, Kabeer, Manali Rahul
Format: Article
Language:English
Subjects:
Categories
Sheaves
Tensors
Topology
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Summary:Our work investigates a form of descent, in the fppf and h topologies, for generation of triangulated categories obtained from noncommutative coherent algebras over schemes. In addition, also the behaviour of generation with respect to the derived pushforward of proper morphisms is studied. This allows us to exhibit many new examples where the associated bounded derived categories of coherent sheaves admit strong generators. We achieve our main results by combining Matthew's concept of descendability with Stevenson's tensor actions on triangulated categories, allowing us to generalize statements regarding generation into the noncommutative setting. In particular, we establish a noncommutative generalization of Aoki's result to Azumaya algebras over quasi-excellent schemes. Moreover, as a byproduct of the tensor action, we extend Olander's result on countable Rouquier dimension to the noncommutative setting for Azumaya algebras over derived splinters, and we extend a result of Ballard-Iyengar-Lank-Mukhopadhyay-Pollitz regarding strong generation for schemes of prime characteristic to the case of Azumaya algebras.
ISSN:2331-8422