Mean convergence theorem for multidimensional arrays of random elements in Banach spaces (Q937474)
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scientific article; zbMATH DE number 5312402
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Mean convergence theorem for multidimensional arrays of random elements in Banach spaces |
scientific article; zbMATH DE number 5312402 |
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Mean convergence theorem for multidimensional arrays of random elements in Banach spaces (English)
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15 August 2008
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Summary: For a \(d\)-dimensional array of random elements \(\{V_{n},n\in \mathbb Z_{+}^{d}\}\) in a real separable stable type \(p\) \((1\leq p<2)\) Banach space, a mean convergence theorem is established. Moreover, the conditions for the convergence in mean of order \(p\) are shown to completely characterize stable-type \(p\) Banach spaces.
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0.9353793
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0.93357944
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0.92807764
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0.9262322
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