Totally acyclic complexes over noetherian schemes |
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Authors: | Daniel Murfet Shokrollah Salarian |
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Institution: | aHausdorff Center for Mathematics, University of Bonn, Germany;bDepartment of Mathematics, University of Isfahan, P.O. Box 81746-73441, Isfahan, Iran |
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Abstract: | We define a notion of total acyclicity for complexes of flat quasi-coherent sheaves on a semi-separated noetherian scheme, and study these complexes using the pure derived category of flat quasi-coherent sheaves. We prove that a scheme is Gorenstein if and only if every acyclic complex of flat quasi-coherent sheaves is totally acyclic. Our formalism also removes the need for a dualising complex in several known results for rings, including Jørgensen's proof of the existence of Gorenstein projective precovers. |
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Keywords: | Triangulated category Gorenstein homological algebra Gorenstein projective precover Noetherian scheme Tate cohomology Totally acyclic complex |
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