Hardy’s inequality and its descendants: a probability approach
Article Properties
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DOI (url)
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Publication Date2021/01/01
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Indian UGC (journal)
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Refrences64
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Chris A. J. Klaassen University of Amsterdam, The Netherlands
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Jon A. Wellner University of Washington, United States of America
Cite
Klaassen, Chris A. J., and Jon A. Wellner. “Hardy’s Inequality and Its Descendants: A Probability Approach”. Electronic Journal of Probability, vol. 26, no. none, 2021, https://doi.org/10.1214/21-ejp711.
Klaassen, C. A. J., & Wellner, J. A. (2021). Hardy’s inequality and its descendants: a probability approach. Electronic Journal of Probability, 26(none). https://doi.org/10.1214/21-ejp711
Klaassen, Chris A. J., and Jon A. Wellner. “Hardy’s Inequality and Its Descendants: A Probability Approach”. Electronic Journal of Probability 26, no. none (2021). https://doi.org/10.1214/21-ejp711.
Klaassen CAJ, Wellner JA. Hardy’s inequality and its descendants: a probability approach. Electronic Journal of Probability. 2021;26(none).
Journal Categories
Science
Mathematics
Science
Mathematics
Probabilities
Mathematical statistics
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Refrences
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
Discrete Hardy-type Inequalities | Advanced Nonlinear Studies |
| 14 | 2015 |
| The optimal constant in generalized Hardy's inequality | Mathematical Inequalities & Applications |
| 3 | 2020 |
| 10.1090/conm/080/999013 | ||||
| The reverse Hardy inequality with measures | Mathematical Inequalities & Applications |
| 4 | 2008 |
| A Proof of Hardy's Convergence Theorem | Journal of the London Mathematical Society |
| 6 | 1928 |