Research Article

General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology

Volume: 8 Number: 2 July 1, 2025
Christophe Chesneau *
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Communications in Advanced Mathematical Sciences Cover Communications in Advanced Mathematical Sciences
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General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology

Abstract

This article establishes new general two- and three-dimensional integral inequalities. The first result involves four functions: two main functions defined on the positive real line and two auxiliary functions defined on the unit interval. As a significant contribution, the upper bound obtained is quite simple; it is expressed only as the product of the unweighted integral norms of these functions. The main ingredient of the proof is an original change of variables methodology. The article also presents a three-dimensional extension of this result. This higher-dimensional version uses a similar structure but with nine functions: three main functions defined on the positive real line and six auxiliary functions defined on the unit interval. It retains the simplicity and sharpness of the upper bound. Both results open up new directions for applications in analysis. This claim is supported by various examples, including some based on power, logarithmic, trigonometric, and exponential functions, as well as some secondary but still general integral inequalities.

Keywords

Change of variables, Gamma function, Hardy-Hilbert-type integral inequalities, Three-dimensional integral inequalities, Two-dimensional integral inequalities

References

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  4. [4] D. Bainov, P. Simeonov, Integral Inequalities and Applications, Mathematics and Its Applications, Vol. 57. Kluwer Academic, Dordrecht, 1992.
  5. [5] B. C. Yang, Hilbert-Type Integral Inequalities, Bentham Science Publishers, The United Arab Emirates, 2009.
  6. [6] Z. T. Xie, Z. Zeng, Y. F. Sun, A new Hilbert-type inequality with the homogeneous kernel of degree -2, Adv. Appl. Math. Sci., 12 (2013), 391-401.
  7. [7] V. Adiyasuren, T. Batbold, M. Krnić, Hilbert-type inequalities involving differential operators, the best constants and applications, Math. Inequal. Appl., 18 (2015), 111-124. https://doi.org/10.7153/mia-18-07
  8. [8] C. Chesneau, Some four-parameter trigonometric generalizations of the Hilbert integral inequality, Asia Math., 8 (2024), 45-59. https://doi.org/10.5281/zenodo.13949386
  9. [9] C. Chesneau, Study of two three-parameter non-homogeneous variants of the Hilbert integral inequality, Lobachevskii J. Math., 45 (2024), 4931-4953. https://doi.org/10.1134/S1995080224605526
  10. [10] Q. Chen, B. C. Yang, A survey on the study of Hilbert-type inequalities, J. Inequal. Appl., 2015 (2015), 1-29. https://doi.org/10.1186/s13660-015-0829-7

Details

Primary Language

English

Subjects

Applied Mathematics (Other)

Journal Section

Research Article

Authors

Early Pub Date

June 28, 2025

Publication Date

July 1, 2025

Submission Date

April 10, 2025

Acceptance Date

June 27, 2025

Published in Issue

Year 2025 Volume: 8 Number: 2

DOI

https://doi.org/10.33434/cams.1673361

IZ

https://izlik.org/JA83JL82GF

Cite

RIS / Bibtex
APA
Chesneau, C. (2025). General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology. Communications in Advanced Mathematical Sciences, 8(2), 100-116. https://doi.org/10.33434/cams.1673361
AMA
1.Chesneau C. General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology. Communications in Advanced Mathematical Sciences. 2025;8(2):100-116. doi:10.33434/cams.1673361
Chicago
Chesneau, Christophe. 2025. “General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology”. Communications in Advanced Mathematical Sciences 8 (2): 100-116. https://doi.org/10.33434/cams.1673361.
EndNote
Chesneau C (July 1, 2025) General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology. Communications in Advanced Mathematical Sciences 8 2 100–116.
IEEE
[1]C. Chesneau, “General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology”, Communications in Advanced Mathematical Sciences, vol. 8, no. 2, pp. 100–116, July 2025, doi: 10.33434/cams.1673361.
ISNAD
Chesneau, Christophe. “General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology”. Communications in Advanced Mathematical Sciences 8/2 (July 1, 2025): 100-116. https://doi.org/10.33434/cams.1673361.
JAMA
1.Chesneau C. General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology. Communications in Advanced Mathematical Sciences. 2025;8:100–116.
MLA
Chesneau, Christophe. “General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology”. Communications in Advanced Mathematical Sciences, vol. 8, no. 2, July 2025, pp. 100-16, doi:10.33434/cams.1673361.
Vancouver
1.Christophe Chesneau. General Two- and Three-Dimensional Integral Inequalities Based a Change of Variables Methodology. Communications in Advanced Mathematical Sciences. 2025 Jul. 1;8(2):100-16. doi:10.33434/cams.1673361

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