Smallness in topology

IF 0.6 4区 数学 Q3 MATHEMATICS Quaestiones Mathematicae Pub Date : 2023-11-01 DOI:10.2989/16073606.2023.2247720
Jiří Adámek, Miroslav Hušek, Jiří Rosický, Walter Tholen
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引用次数: 1

Abstract

AbstractQuillen’s notion of small object and the Gabriel-Ulmer notion of finitely presentable or generated object are fundamental in homotopy theory and categorical algebra. Do these notions always lead to rather uninteresting classes of objects in categories of topological spaces, such as all finite discrete spaces, or just the empty space, as the examples and remarks in the existing literature may suggest?This article demonstrates that the establishment of full characterizations of these notions (and some natural variations thereof) in many familiar categories of spaces can be quite challenging and may lead to unexpected surprises. In fact, we show that there are significant differences in this regard even amongst the categories defined by the standard separation axioms, with the T1-separation condition standing out. The findings about these specific categories lead us to insights also when considering rather arbitrary full reflective subcategories of the category of all topological spaces.Mathematics Subject Classification (2020): 18F6054B3054D10Key words: Finitely presentable objectfinitely generated objectfinitely small objectdirected colimitHausdorff spaceT0-spaceT1-spacecompact space
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拓扑的小
【摘要】quillen的小对象概念和Gabriel-Ulmer的有限可呈现或生成对象概念是同伦理论和范畴代数的基础。这些概念是否总是导致拓扑空间类别中相当无趣的对象类别,例如所有有限离散空间,或者只是空白空间,正如现有文献中的例子和评论所暗示的那样?本文表明,在许多熟悉的空间类别中建立这些概念(及其一些自然变化)的完整特征可能相当具有挑战性,并可能导致意想不到的惊喜。事实上,我们表明,即使在标准分离公理定义的类别中,在这方面也存在显着差异,其中t1分离条件尤为突出。关于这些特定类别的发现也使我们在考虑所有拓扑空间的类别的相当任意的全反射子类别时获得了见解。数学学科分类(2020):18f6054b3054d10关键词:有限可呈现对象;有限生成对象;有限小对象
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来源期刊
Quaestiones Mathematicae
Quaestiones Mathematicae 数学-数学
CiteScore
1.70
自引率
0.00%
发文量
121
审稿时长
>12 weeks
期刊介绍: Quaestiones Mathematicae is devoted to research articles from a wide range of mathematical areas. Longer expository papers of exceptional quality are also considered. Published in English, the journal receives contributions from authors around the globe and serves as an important reference source for anyone interested in mathematics.
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