Non-barrelled dense \(\beta \varphi\) subspaces (Q1910064)
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scientific article; zbMATH DE number 861825
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Non-barrelled dense \(\beta \varphi\) subspaces |
scientific article; zbMATH DE number 861825 |
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Non-barrelled dense \(\beta \varphi\) subspaces (English)
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8 February 1998
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Let \(\varphi\) be the space of eventually zero sequences. A sequence space \(S\) with its strong topology \(\beta(S,\varphi)\) is called a \(\beta\varphi\) space. The familiar Banach sequence spaces are \(\beta\varphi\) spaces. Each barrelled subspace of a \(\beta\varphi\) space is \(\beta\varphi\). A question is to know when does the converse hold? The purpose of the paper is to prove that the sequence spaces \(\ell^1\) and \(\ell^\infty\) admit non-barrelled dense \(\beta\varphi\) subspaces. In contrast, every subspace of \(c_0\) or \(\ell^p\) \((1<p<\infty)\) is barrelled.
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sequence space
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strong topology
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\(\beta\varphi\) space
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Banach sequence spaces
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barrelled subspace
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