[HTML][HTML] Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - Journal of Algebra, 2023 - Elsevier
We show that Krause's recollement exists for any locally coherent Grothendieck category
whose derived category is compactly generated. As a source of such categories, we …
whose derived category is compactly generated. As a source of such categories, we …
[PDF][PDF] Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - web2023.math.cas.cz
We show that Krause's recollement exists for any locally coherent Grothendieck category
such that its derived category is compactly generated. As a source of such categories, we …
such that its derived category is compactly generated. As a source of such categories, we …
Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - arXiv preprint arXiv:2109.13853, 2021 - arxiv.org
We show that Krause's recollement exists for any locally coherent Grothendieck category
such that its derived category is compactly generated. As a source of such categories, we …
such that its derived category is compactly generated. As a source of such categories, we …
Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - JOURNAL OF ALGEBRA, 2023 - research.unipd.it
We show that Krause's recollement exists for any locally coherent Grothendieck category
such that its derived category is compactly generated. As a source of such categories, we …
such that its derived category is compactly generated. As a source of such categories, we …
[PDF][PDF] Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - webadmin.math.cas.cz
We show that Krause's recollement exists for any locally coherent Grothendieck category
such that its derived category is compactly generated. As a source of such categories, we …
such that its derived category is compactly generated. As a source of such categories, we …
Singular equivalences to locally coherent hearts of commutative noetherian rings
M Hrbek, S Pavon - arXiv e-prints, 2021 - ui.adsabs.harvard.edu
We show that Krause's recollement exists for any locally coherent Grothendieck category
such that its derived category is compactly generated. As a source of such categories, we …
such that its derived category is compactly generated. As a source of such categories, we …