The universal minimal space of the homeomorphism group of a \(h\)-homogeneous space (Q2906454)
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scientific article; zbMATH DE number 6077499
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The universal minimal space of the homeomorphism group of a \(h\)-homogeneous space |
scientific article; zbMATH DE number 6077499 |
Statements
5 September 2012
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universal minimal space
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\(h\)-homogeneous
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homogeneous Boolean algebra
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maximal chains
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Cantor sets
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dual Ramsey theorem
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corona
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remainder
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Parovicenko space
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collapsing algebra
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The universal minimal space of the homeomorphism group of a \(h\)-homogeneous space (English)
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A compact zero-dimensional space is called \(h\)-homogeneous if all nonempty clopen subsets are homeomorphic. Equivalently, \(X\) is the Stone space of a homogeneous Boolean algebra. Most topologically homogeneous zero-dimensional compact spaces are \(h\)-homogeneous, but not all. In this interesting paper, the authors show that the universal minimal flow of the homeomorphism group of an \(h\)-homogeneous compact space is the compact space of maximal chains of nonempty closed subsets of \(X\). This space was introduced by Uspenskij. Several known results are consequences of the main result in this paper.NEWLINENEWLINEFor the entire collection see [Zbl 1237.37004].
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