A three-parameter logarithmic generalization of the Hilbert integral inequality
Keywords:
Hilbert integral inequality, Cauchy-Schwarz inequality, logarithmic inequalityAbstract
In this paper, we establish a new generalized form of the Hilbert integral inequality involving three
adjustable parameters and a logarithmic term. We prove that the resulting constant factor is sharp and best possible. Furthermore, we derive related forms of Hilbert-type integral inequalities, including those based on sharp lower bounds of the logarithmic function.
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Published
2025-06-16
How to Cite
chesneau, christophe. (2025). A three-parameter logarithmic generalization of the Hilbert integral inequality. Journal of Mathematical Analysis and Modeling, 6(1), 68–81. https://doi.org/10.48185/jmam.v6i1.1283
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Copyright (c) 1970 christophe chesneau
This work is licensed under a Creative Commons Attribution 4.0 International License.
