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A New Hilbert-type Integral Inequality with Some Parameters and Its Reverse
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  • Journal title : Kyungpook mathematical journal
  • Volume 48, Issue 1,  2008, pp.93-100
  • Publisher : Department of Mathematics, Kyungpook National University
  • DOI : 10.5666/KMJ.2008.48.1.093
 Title & Authors
A New Hilbert-type Integral Inequality with Some Parameters and Its Reverse
Xie, Zitian; Yang, Bicheng;
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 Abstract
In this paper, by introducing some parameters and estimating the weight function, we give a new Hilbert-type integral inequality with a best constant factor. The equivalent inequality and the reverse forms are considered.
 Keywords
Hilbert-type integral inequality;weight function;Hlder`s inequality;equivalent inequality;reverse form;
 Language
English
 Cited by
1.
The Hilbert-Type Integral Inequality with the System Kernel of-λ Degree Homogeneous Form,;;

Kyungpook mathematical journal, 2010. vol.50. 2, pp.297-306 crossref(new window)
2.
A New Hilbert-type Inequality with the Integral in Whole Plane,;;

Kyungpook mathematical journal, 2012. vol.52. 3, pp.291-298 crossref(new window)
1.
A New Hilbert-type Inequality with the Integral in Whole Plane, Kyungpook mathematical journal, 2012, 52, 3, 291  crossref(new windwow)
2.
On the Hilbert Type Integral Inequalities with Some Parameters and Its Reverse, Kyungpook mathematical journal, 2009, 49, 4, 623  crossref(new windwow)
 References
1.
G. H. Hardy, J. E.Littlewood and G. P´olya, Inequalities, Cambridge University Press, Cambridge, 1952.

2.
G. H. Hardy, Note on a theorem of Hilbert concerning series of positive terms, Proceedings London Math. Soc., Records of Proc. XLV-XLIV, 23(2)(1925).

3.
D. S. Mintrinovic, J. E. Pecaric and A. M. Fink, Inequalities involving functions and their integrals and Derivertives, Kluwer Academic Publishers, Boston, 1991.

4.
Bicheng Yang, On Hardy-Hilbert's integral inequality, J. Math. Anal. Appl., 261(2001), 295-306. crossref(new window)

5.
Bicheng Yang, On the extended Hilbert's integral inequality, Journal of Inequalities in Pure and Applied Mathmatics, 5(4)(2004), Article 96.

6.
Bicheng Yang, Ilko Bnaetic, Mario Krnic and Josip Pecaric, Generalization of Hilbert and Hardy-Hilbert integral inequalities, Mathematical Inequalities and Applications, Mathematical Inequalities and Applications, 8(2)(2005), 259-272.

7.
Jichang Kang, Applied Inequalities, Shangdong Science and Technology Press, Jinan, 2004.