Codimension of subspaces of \(L_ p(\mu)\) for \(p<1\) (Q2266413)
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scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Codimension of subspaces of \(L_ p(\mu)\) for \(p<1\) |
scientific article |
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Codimension of subspaces of \(L_ p(\mu)\) for \(p<1\) (English)
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1984
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Applying spaces \(L_ p(\mu)\), \(p<1\), with finite and atomless measure \(\mu\), the following conjecture is disproved: ''every infinitely dimensional F-space X contains a subspace Y such that dim X/Y\(={\mathfrak c}''\).
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dimension of an F-space
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0.9236061
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0.90418524
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0.8993644
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0.8940662
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