Constructive Pointfree Topology Eliminates Non-constructive Representation Theorems from Riesz Space Theory

Bas Spitters

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Constructive Pointfree Topology Eliminates Non-constructive Representation Theorems from Riesz Space Theory

机译：构造性无点拓扑消除了Riesz空间理论中的非构造表示定理

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摘要

In Riesz space theory it is good practice to avoid representation theorems which depend on the axiom of choice. Here we present a general methodology to do this using pointfree topology. To illustrate the technique we show that Archimedean almost f-algebras are commutative. The proof is obtained relatively straightforward from the proof by Buskes and van Rooij by using the pointfree Stone-Yosida representation theorem by Coquand and Spitters.

机译：在Riesz空间理论中，优良作法是避免依赖选择公理的表示定理。在这里，我们介绍了一种使用无点拓扑进行此操作的通用方法。为了说明该技术，我们显示了阿基米德近似f代数是可交换的。通过使用Coquand和Spitters的无点Stone-Yosida表示定理，可以从Buskes和van Rooij的证明获得相对简单的证明。

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来源
《Order》 |2010年第2期|P.225-233|共9页
作者
Bas Spitters;
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作者单位

Computer Science, Radboud University of Nijmegen, Nijmegen, The Netherlands;

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收录信息美国《科学引文索引》(SCI);
原文格式 PDF
正文语种 eng
中图分类
关键词
formal topology; axiom of choice; riesz space; constructive analysis;

机译：形式拓扑选择公理里斯空间建设性分析;

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专利

1. Constructive Pointfree Topology Eliminates Non-constructive Representation Theorems from Riesz Space Theory [J] . Bas Spitters Order . 2010,第2期

机译：构造性无点拓扑消除了Riesz空间理论中的非构造表示定理
2. CONSTRUCTIVE DOMAIN THEORY AS A BRANCH OF INTUITIONISTIC POINTFREE TOPOLOGY [J] . Sambin G., Virgili P., Valentini S. Theoretical computer science . 1996,第2期

机译：构造域理论作为直觉无点拓扑学的一个分支
3. The extensional realizability model of continuous functionals and three weakly non-constructive classical theorems [J] . DagNormann Logical Methods in Computer Science . 2015,第1期

机译：连续泛函的可扩展可实现性模型和三个弱非构造经典定理
4. Generalized Orthogonal Decomposition Theorem and Riesz Representation Theorem Based on Generalized Duality Mappings [C] . Xing-hua Zhu, Jian-zhong Xiao International conference on application of mathematics and physics;AMP2010 . 2010

机译：基于广义对偶映射的广义正交分解定理和Riesz表示定理
5. Generalization of Riesz Representation theorem with sigma topology. [D] . Mohandass, Girija. 1993

机译：带有sigma拓扑的Riesz表示定理的推广。
6. Are we ever aware of concepts? A critical question for the Global Neuronal Workspace Integrated Information and Attended Intermediate-Level Representation theories of consciousness [O] . David Kemmerer 2015

机译：我们是否了解过概念？全球神经元工作空间综合信息和意识的中级表征理论的一个关键问题
7. Constructive Pointfree Topology Eliminates Non-constructive Representation Theorems from Riesz Space Theory [O] . Bas Spitters 2010

机译：构造性无点拓扑消除了Riesz空间理论中的非构造表示定理

Constructive Pointfree Topology Eliminates Non-constructive Representation Theorems from Riesz Space Theory

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