J. F. Du Plessis, Zurab Janelidze, Bernardus A. Wessels
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引用次数: 0
摘要
在无点拓扑学中,人们通过用一个框架(一个完整的网格,其中 meetdistributes over arbitrary join)来替代它,从而抽象出了拓扑空间的开放子集的正集(poset of open subsets of atopological space)。在本文中,我们提出了对各种空间结构中连通子集的正集进行类似抽象的方法。框架的类似物被称为链锁,它被定义为一个容许其邮件连接的集合,即具有下界的子集。本文的主要结果是完整连接半网格范畴的一个子范畴与链式邮件范畴之间的等价性。
A Primer on Chainmails: Structures for Point-free Connectivity
In point-free topology, one abstracts the poset of open subsets of a
topological space, by replacing it with a frame (a complete lattice, where meet
distributes over arbitrary join). In this paper we propose a similar
abstraction of the posets of connected subsets in various space-like
structures. The analogue of a frame is called a chainmail, which is defined as
a poset admitting joins of its mails, i.e., subsets having a lower bound. The
main result of the paper is an equivalence between a subcategory of the
category of complete join-semilattices and the category of chainmails.
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