数学季刊 ›› 2007, Vol. 22 ›› Issue (1): 68-74.

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Hardy-Hilbert型积分不等式的一个改进及其应用 

  

  1. 1.Department of Mathematics and Computer Science,Jishou University,Jishou 416000,China; 2.Department of Mathematics and Computer Science,Normal College,Jishou University,Jishou 416000,China
  • 收稿日期:2003-11-21 出版日期:2007-03-30 发布日期:2023-11-13
  • 作者简介:HE Le-ping(1965-),male,native of Loudi,Hunan,an associate professor of Jishou University, engages in real function theory and ordinary differential equations.

An Improvement of the Hardy-Hilbert Type Integral Inequalities and an Application

  1. 1.Department of Mathematics and Computer Science,Jishou University,Jishou 416000,China; 2.Department of Mathematics and Computer Science,Normal College,Jishou University,Jishou 416000,China
  • Received:2003-11-21 Online:2007-03-30 Published:2023-11-13
  • About author:HE Le-ping(1965-),male,native of Loudi,Hunan,an associate professor of Jishou University, engages in real function theory and ordinary differential equations.

摘要: In this paper,it is shown that Hardy-Hilbert’s integral inequality with parameter is improved by means of a sharpening of Holder’s inequality.A new inequality is established as follows: ... , where R=(Sp(F, h)-Sq(G, h))2,m=min{1/p,1/q}.As application;an extension of Hardy-Littlewood’s inequality is given. 

关键词: Hardy-Hilbert's , type , inequality, Hardy-Littlewood's , inequality, Holder's , in- equality, beta , function

Abstract: In this paper,it is shown that Hardy-Hilbert’s integral inequality with parameter is improved by means of a sharpening of Holder’s inequality.A new inequality is established as follows: ... , where R=(Sp(F, h)-Sq(G, h))2,m=min{1/p,1/q}.As application;an extension of Hardy-Littlewood’s inequality is given. 

Key words: Hardy-Hilbert's , type , inequality, Hardy-Littlewood's , inequality, Holder's , in- equality, beta , function

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