地方的去组织化

arXiv - MATH - General Topology Pub Date : 2024-06-18 DOI:arxiv-2406.12486

Igor Arrieta

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引用次数: 0

摘要

2009 年，卡拉梅洛证明了每个拓扑都有一个最大致密子拓扑，其内部逻辑满足德摩根定律（也称中间排除定律）。这一发现意味着每个局部都有一个最大致密的外部断开子局部，称为其德摩根化。在本文中，我们迈出了在局部语境中探索 DeMorganization 的第一步，通过证明 DeMorganization 总是一个拟合子域并提供具体描述，揭示了它的几何性质。本文的主要结果是，对于任何可元化局部（无孤立点），其去组织化都与其布尔化重合。这尤其意味着，任何极端断开的度量局部（无孤立点）都必须是布尔的，从而将拓扑空间的一个著名结果推广到局部环境中。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The DeMorganization of a locale

In 2009, Caramello proved that each topos has a largest dense subtopos whose internal logic satisfies De Morgan law (also known as the law of the weak excluded middle). This finding implies that every locale has a largest dense extremally disconnected sublocale, referred to as its DeMorganization. In this paper, we take the first steps in exploring the DeMorganization in the localic context, shedding light on its geometric nature by showing that it is always a fitted sublocale and by providing a concrete description. The main result of the paper is that for any metrizable locale (without isolated points), its DeMorganization coincides with its Booleanization. This, in particular, implies that any extremally disconnected metric locale (without isolated points) must be Boolean, generalizing a well-known result for topological spaces to the localic setting.

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arXiv - MATH - General Topology

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