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Locally finitely presented Grothendieck categories and the pure semisimplicity conjecture

Part of: General theory of categories and functors Abelian categories Representation theory of rings and algebras Modules, bimodules and ideals

Published online by Cambridge University Press:  09 January 2025

Ziba Fazelpour  and
Alireza Nasr-Isfahani Open the ORCID record for Alireza Nasr-Isfahani [Opens in a new window]
Ziba Fazelpour
Affiliation:
School of Mathematics, Institute for Research in Fundamental Sciences (IPM), P.O. Box: 19395-5746, Tehran, Iran e-mail: [email protected]
Alireza Nasr-Isfahani*
Affiliation:
Department of Pure Mathematics, Faculty of Mathematics and Statistics, University of Isfahan, P.O. Box: 81746-73441, Isfahan, Iran and School of Mathematics, Institute for Research in Fundamental Sciences (IPM), P.O. Box: 19395-5746, Tehran, Iran
*
e-mail: [email protected] [email protected]
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Abstract

In this paper, we investigate locally finitely presented pure semisimple (hereditary) Grothendieck categories. We show that every locally finitely presented pure semisimple (resp., hereditary) Grothendieck category $\mathscr {A}$ is equivalent to the category of left modules over a left pure semisimple (resp., left hereditary) ring when $\mathrm {Mod}(\mathrm {fp}(\mathscr {A}))$ is a QF-3 category, and every representable functor in $\mathrm {Mod}(\mathrm {fp}(\mathscr {A}))$ has finitely generated essential socle. In fact, we show that there exists a bijection between Morita equivalence classes of left pure semisimple (resp., left hereditary) rings $\Lambda $ and equivalence classes of locally finitely presented pure semisimple (resp., hereditary) Grothendieck categories $\mathscr {A}$ that $\mathrm {Mod}(\mathrm {fp}(\mathscr {A}))$ is a QF-3 category, and every representable functor in $\mathrm {Mod}(\mathrm {fp}(\mathscr {A}))$ has finitely generated essential socle. To prove this result, we study left pure semisimple rings by using Auslander’s ideas. We show that there exists, up to equivalence, a bijection between the class of left pure semisimple rings and the class of rings with nice homological properties. These results extend the Auslander and Ringel–Tachikawa correspondence to the class of left pure semisimple rings. As a consequence, we give several equivalent statements to the pure semisimplicity conjecture.

Keywords

Locally finitely presented categoryGrothendieck categorypure semisimple category

MSC classification

Primary: 18A25: Functor categories, comma categories 18E10: Exact categories, abelian categories 16D70: Structure and classification (except as in ), direct sum decomposition, cancellation 16G60: Representation type (finite, tame, wild, etc.)
Type
Article
Information
Canadian Journal of Mathematics , First View , pp. 1 - 27
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Copyright
© The Author(s), 2025. Published by Cambridge University Press on behalf of Canadian Mathematical Society

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Footnotes

The research of the first author was in part supported by a grant from IPM. Also, the research of the second author was in part supported by a grant from IPM (No. 1403160416). The work of the second author is based upon research funded by Iran National Science Foundation (INSF) under project No. 4001480.

Dedicated to the memory of Daniel Simson

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