About: Stone duality

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dbo:abstract	In mathematics, there is an ample supply of categorical dualities between certain categories of topological spaces and categories of partially ordered sets. Today, these dualities are usually collected under the label Stone duality, since they form a natural generalization of Stone's representation theorem for Boolean algebras. These concepts are named in honor of Marshall Stone. Stone-type dualities also provide the foundation for pointless topology and are exploited in theoretical computer science for the study of formal semantics. This article gives pointers to special cases of Stone duality and explains a very general instance thereof in detail. (en) ストーンの双対性定理（ストーンのそうついせいていり）とは数学における定理で、（非常に弱いある種の制限を満たす）位相空間がある種の性質を満たす束と自然に対応づけられる事を意味し、この対応づけをストーン双対性(Stone duality)という。位相空間論は点集合論に基づいて通常定式化されるが、ストーン双対性により位相空間は束と対応づけられるので、この双対性は点集合論の代わりに束論に基いて位相空間論を定式化（ポイントレス位相空間論（pointless topology））できる事を意味する。この為本稿ではポイントレス位相空間論についても述べる。ストーンの双対性定理はストーンの表現定理の一般化でもある。 (ja)
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rdfs:comment	ストーンの双対性定理（ストーンのそうついせいていり）とは数学における定理で、（非常に弱いある種の制限を満たす）位相空間がある種の性質を満たす束と自然に対応づけられる事を意味し、この対応づけをストーン双対性(Stone duality)という。位相空間論は点集合論に基づいて通常定式化されるが、ストーン双対性により位相空間は束と対応づけられるので、この双対性は点集合論の代わりに束論に基いて位相空間論を定式化（ポイントレス位相空間論（pointless topology））できる事を意味する。この為本稿ではポイントレス位相空間論についても述べる。ストーンの双対性定理はストーンの表現定理の一般化でもある。 (ja) In mathematics, there is an ample supply of categorical dualities between certain categories of topological spaces and categories of partially ordered sets. Today, these dualities are usually collected under the label Stone duality, since they form a natural generalization of Stone's representation theorem for Boolean algebras. These concepts are named in honor of Marshall Stone. Stone-type dualities also provide the foundation for pointless topology and are exploited in theoretical computer science for the study of formal semantics. (en)
rdfs:label	ストーン双対性 (ja) Stone duality (en)
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