\(\mathcal{I}\)-convergence of sequences of subspaces in an inner product space (Q6599499)
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scientific article; zbMATH DE number 7908007
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(\mathcal{I}\)-convergence of sequences of subspaces in an inner product space |
scientific article; zbMATH DE number 7908007 |
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\(\mathcal{I}\)-convergence of sequences of subspaces in an inner product space (English)
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6 September 2024
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The authors introduce the concept of \(\mathcal{I}\)-convergence of sequences of \(k\)-dimensional subspaces of an inner product space, where \(\mathcal{I}\) is an ideal of subsets of \(\mathbb N\), the set of all natural numbers, and \( k \in \mathbb N\). They prove some properties of this convergence. Finally, they summarize their results as several equivalent characterizations of \(\mathcal{I}\)-convergence of a sequence of \(k\)-dimensional subspaces of an inner product space.
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ideal
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filter
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\(\mathcal{I}\)-convergence
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inner product space
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\(n\)-norm
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