Weighted \(\alpha \beta \)-statistical convergence of Kantorovich-Mittag-Leffler operators (Q2826333)
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scientific article; zbMATH DE number 6639555
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Weighted \(\alpha \beta \)-statistical convergence of Kantorovich-Mittag-Leffler operators |
scientific article; zbMATH DE number 6639555 |
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14 October 2016
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Kantorovich-Mittag-Leffler operators
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Szász-Mirakjan operators
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\(\alpha \beta \)-statistical convergence
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\(\lambda \)-statistical convergence
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statistical convergence
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lacunary statistical convergence
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Lipschitz class functionals
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Bernoulli numbers
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Weighted \(\alpha \beta \)-statistical convergence of Kantorovich-Mittag-Leffler operators (English)
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The authors study the approximation properties of the integral version of Mittag-Leffler operators. In the approximation they mainly use the concept of the weighted statistical convergence, which is a weaker convergence than the usual convergence. They also compute the rates of convergence in Lipschitz-type spaces.
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