De Vries幂与邻近Specker代数

IF 0.6 4区 数学 Q3 MATHEMATICS
G. Bezhanishvili, L. Carai, P. J. Morandi, B. Olberding
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引用次数: 1

摘要

通过de Vries对偶性,紧化Hausdorff空间的范畴\(\textsf {KHaus}\)与de Vries代数的范畴\(\textsf {DeV}\)对偶等价。对于\(\textsf {KHaus}\)也有类似的对偶性,其中de Vries代数被邻近的Baer-Specker代数所取代。将完全有序域的布尔幂的概念推广到德弗里斯幂的概念,描述了与邻近Baer-Specker代数中的每个紧化Hausdorff空间相关联的函子。由此可知\(\textsf {DeV}\)等价于邻近Baer-Specker代数的范畴\(\text {\textsf{PBSp}}\)。等价是通过\(\textsf {KHaus}\)获得的,因此不是自由选择的。本文给出了这个等价的直接代数证明,它是与选择无关的。为了做到这一点,我们给出了完全有序域的德弗里斯幂的另一种自由选择的描述。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

De Vries Powers and Proximity Specker Algebras

De Vries Powers and Proximity Specker Algebras

By de Vries duality, the category \(\textsf {KHaus}\) of compact Hausdorff spaces is dually equivalent to the category \(\textsf {DeV}\) of de Vries algebras. There is a similar duality for \(\textsf {KHaus}\), where de Vries algebras are replaced by proximity Baer-Specker algebras. The functor associating with each compact Hausdorff space a proximity Baer-Specker algebra is described by generalizing the notion of a boolean power of a totally ordered domain to that of a de Vries power. It follows that \(\textsf {DeV}\) is equivalent to the category \(\text {\textsf{PBSp}}\) of proximity Baer-Specker algebras. The equivalence is obtained by passing through \(\textsf {KHaus}\), and hence is not choice-free. In this paper we give a direct algebraic proof of this equivalence, which is choice-independent. To do so, we give an alternate choice-free description of de Vries powers of a totally ordered domain.

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来源期刊
CiteScore
1.30
自引率
16.70%
发文量
29
审稿时长
>12 weeks
期刊介绍: Applied Categorical Structures focuses on applications of results, techniques and ideas from category theory to mathematics, physics and computer science. These include the study of topological and algebraic categories, representation theory, algebraic geometry, homological and homotopical algebra, derived and triangulated categories, categorification of (geometric) invariants, categorical investigations in mathematical physics, higher category theory and applications, categorical investigations in functional analysis, in continuous order theory and in theoretical computer science. In addition, the journal also follows the development of emerging fields in which the application of categorical methods proves to be relevant. Applied Categorical Structures publishes both carefully refereed research papers and survey papers. It promotes communication and increases the dissemination of new results and ideas among mathematicians and computer scientists who use categorical methods in their research.
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