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Main Author: Positselski, Leonid
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2310.16773
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author Positselski, Leonid
author_facet Positselski, Leonid
contents Let $κ$ be a regular cardinal, $λ<κ$ be a smaller infinite cardinal, and $\mathsf K$ be a $κ$-accessible category where colimits of $λ$-indexed chains exist. We show that various category-theoretic constructions applied to $\mathsf K$, such as the inserter and the equifier, produce $κ$-accessible categories $\mathsf E$ again, and the most obvious expected description of the full subcategory of $κ$-presentable objects in $\mathsf E$ in terms of $κ$-presentable objects in $\mathsf K$ holds true. In particular, if $\mathsf C$ is a $κ$-small category, then the category of functors $\mathsf C\rightarrow\mathsf K$ is $κ$-accessible, and its $κ$-presentable objects are precisely all the functors from $\mathsf C$ to the $κ$-presentable objects of $\mathsf K$. We proceed to discuss the preservation of $κ$-accessibility by conical pseudolimits, lax and oplax limits, and weighted pseudolimits. The results of this paper go back to an unpublished 1977 preprint of Ulmer. Our motivation comes from the theory of flat modules and flat quasi-coherent sheaves.
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institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Notes on limits of accessible categories
Positselski, Leonid
Category Theory
Rings and Algebras
Let $κ$ be a regular cardinal, $λ<κ$ be a smaller infinite cardinal, and $\mathsf K$ be a $κ$-accessible category where colimits of $λ$-indexed chains exist. We show that various category-theoretic constructions applied to $\mathsf K$, such as the inserter and the equifier, produce $κ$-accessible categories $\mathsf E$ again, and the most obvious expected description of the full subcategory of $κ$-presentable objects in $\mathsf E$ in terms of $κ$-presentable objects in $\mathsf K$ holds true. In particular, if $\mathsf C$ is a $κ$-small category, then the category of functors $\mathsf C\rightarrow\mathsf K$ is $κ$-accessible, and its $κ$-presentable objects are precisely all the functors from $\mathsf C$ to the $κ$-presentable objects of $\mathsf K$. We proceed to discuss the preservation of $κ$-accessibility by conical pseudolimits, lax and oplax limits, and weighted pseudolimits. The results of this paper go back to an unpublished 1977 preprint of Ulmer. Our motivation comes from the theory of flat modules and flat quasi-coherent sheaves.
title Notes on limits of accessible categories
topic Category Theory
Rings and Algebras
url https://arxiv.org/abs/2310.16773