\(L\)-sets and property \((SR^*)\) in spaces of compact operators (Q331070)
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scientific article; zbMATH DE number 6643802
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(L\)-sets and property \((SR^*)\) in spaces of compact operators |
scientific article; zbMATH DE number 6643802 |
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\(L\)-sets and property \((SR^*)\) in spaces of compact operators (English)
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26 October 2016
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Let \(X\) be a Banach space. A bounded set \(A \subset X^\ast\) is said to be an \(L\)-set if every weakly null sequence in \(X\) tends to zero uniformly on \(A\). In this paper, the author shows that this is equivalent to, for any weakly compact operator \(T: \ell_1 \rightarrow X\), \(T^\ast(A)\) being a relatively compact set. If a Banach space \(Y\) does not contain a copy of \(\ell_1\), then the same conclusion holds, where \(T: Y \rightarrow X\) is any bounded operator.
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\(L\)-sets
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weakly compact operators
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