Title: | Cotorsion pairs in comma categories (English) |
Author: | Yuan, Yuan |
Author: | He, Jian |
Author: | Wu, Dejun |
Language: | English |
Journal: | Czechoslovak Mathematical Journal |
ISSN: | 0011-4642 (print) |
ISSN: | 1572-9141 (online) |
Volume: | 74 |
Issue: | 3 |
Year: | 2024 |
Pages: | 715-734 |
Summary lang: | English |
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Category: | math |
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Summary: | Let $\mathcal {A}$ and $\mathcal {B}$ be abelian categories with enough projective and injective objects, and $T \colon \mathcal {A}\rightarrow \mathcal {B}$ a left exact additive functor. Then one has a comma category $(\mathopen {\mathcal {B} \downarrow T})$. It is shown that if $T \colon \mathcal {A}\rightarrow \mathcal {B}$ is $\mathcal {X}$-exact, then $(^\bot \mathcal {X}, \mathcal {X})$ is a (hereditary) cotorsion pair in $\mathcal {A}$ and $(^\bot \mathcal {Y}, \mathcal {Y})$) is a (hereditary) cotorsion pair in $\mathcal {B}$ if and only if $\bigl (\binom {^\bot \mathcal {X}}{^\bot \mathcal {Y}} \bigr ), \langle {\bf h}(\mathcal {X}, \mathcal {Y})\rangle )$ is a (hereditary) cotorsion pair in $(\mathopen {\mathcal {B}\downarrow T})$ and $\mathcal {X}$ and $\mathcal {Y}$ are closed under extensions. Furthermore, we characterize when special preenveloping classes in abelian categories $\mathcal {A}$ and $\mathcal {B}$ can induce special preenveloping classes in $(\mathopen {\mathcal {B}\downarrow T})$. (English) |
Keyword: | comma category |
Keyword: | cocompatible functor |
Keyword: | cotorsion pair |
MSC: | 16E30 |
MSC: | 18A25 |
MSC: | 18G25 |
DOI: | 10.21136/CMJ.2024.0420-23 |
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Date available: | 2024-10-03T12:34:29Z |
Last updated: | 2024-10-04 |
Stable URL: | http://hdl.handle.net/10338.dmlcz/152577 |
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