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Unbounded derived categories of small and big modules: Is the natural functor fully faithful?

Consider the obvious functor from the unbounded derived category of all finitely generated modules over a left noetherian ring $R$ to the unbounded derived category of all modules. We answer the natural question whether this functor defines an equivalence onto the full subcategory of complexes wit...

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Published in:	arXiv.org 2021-03
Main Authors:	Positselski, Leonid, Schnürer, Olaf M
Format:	Article
Language:	English
Subjects:	Equivalence Homology Modules
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description	Consider the obvious functor from the unbounded derived category of all finitely generated modules over a left noetherian ring $R$ to the unbounded derived category of all modules. We answer the natural question whether this functor defines an equivalence onto the full subcategory of complexes with finitely generated cohomology modules in two special cases. If $R$ is a quasi-Frobenius ring of infinite global dimension, then this functor is not full. If $R$ has finite left global dimension, this functor is an equivalence. We also prove variants of the latter assertion for left coherent rings, for noetherian schemes and for locally noetherian Grothendieck categories.
doi_str_mv	10.48550/arxiv.2003.11261
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subjects	Equivalence Homology Modules
title	Unbounded derived categories of small and big modules: Is the natural functor fully faithful?
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