Topological properties of path connected components in spaces of weighted composition operators into \(L^{1}\) (Q491363)
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scientific article; zbMATH DE number 6475259
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Topological properties of path connected components in spaces of weighted composition operators into \(L^{1}\) |
scientific article; zbMATH DE number 6475259 |
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Topological properties of path connected components in spaces of weighted composition operators into \(L^{1}\) (English)
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25 August 2015
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The paper studies weighted composition operators from \(L^\infty,H^\infty\), and the disk algebra into \(L^\infty\). It is shown that the topological structures for the connected components of such operators are all the same in the three cases.
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weighted composition operator
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Lebesgue space
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space of bounded analytic functions
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disk algebra
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essential norm
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path connected component
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topological structure
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0.9454243
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0.94442725
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0.9315124
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0.92056304
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0.91980064
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0.9184884
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0.91311914
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0.91082036
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