Inequalities for unified integral operators via strongly \((\alpha ,h\text{-}m)\)-convexity (Q2046630)
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scientific article; zbMATH DE number 7385307
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Inequalities for unified integral operators via strongly \((\alpha ,h\text{-}m)\)-convexity |
scientific article; zbMATH DE number 7385307 |
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Inequalities for unified integral operators via strongly \((\alpha ,h\text{-}m)\)-convexity (English)
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25 August 2021
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The authors introduce a new definition of strongly \((\alpha, h\text{-}m)\)-convex function and use it to derive and prove the unified integral operators involving different kinds of convex functions. The results obtained yield refinements and generalizations of some fractional integral inequalities in the literature.
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fractional integral inequalities
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strongly \((\alpha, h\text{-}m)\)-convex function
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generalized fractional integral operators
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0.96852887
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0.9459068
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0.91530967
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