| 关于Hardy-Hilbert型积分不等式 |
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| 引用本文: | 彭琳,高明哲.关于Hardy-Hilbert型积分不等式[J].纯粹数学与应用数学,2009,25(3):541-545. |
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| 作者姓名: | 彭琳 高明哲 |
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| 作者单位: | 吉首大学师范学院数学与计算机科学系,湖南,吉首,416000 |
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| 基金项目: | 湖南省教育厅资助科研项目 |
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| 摘 要: | 设1/p=1/q≈1:1且P〉1.通过引入一个适当的积分核函数和参数λ(λ〉-1),创建了一种新型Hardy~Hilbert型积分不等式.证明了其常数因子(p^λ=1+q^λ+1)Г(λ+1)是最佳的,其中Г(x)Г-函数.特别,当p=2时,得到了一种新的Hilbert型积分不等式.作为应用,给出了它的一种等价形式.
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| 关 键 词: | 积分核函数 权函数 Γ-函数 Hardy-Hilbert积分不等式 最佳常数 |
On the Hardy-Hilbert type integral inequality |
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| PENG Lin,GAO Ming-zhe.On the Hardy-Hilbert type integral inequality[J].Pure and Applied Mathematics,2009,25(3):541-545. |
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| Authors: | PENG Lin GAO Ming-zhe |
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| Institution: | PENG Lin,GAO Ming-zhe (Department of Mathematics , Computer Science,Normal College of Jishou University,Jishou 416000,China) |
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| Abstract: | Let 1/p + 1/q = 1 and p 〉 1 . In this paper it is shown that a new Hardy-Hilbert type integral inequality can be established by introducing a proper integral kernel function and a parameter λ (λ 〉 -1). And the constant factor (p^λ+1 + q^λ+1) Г(λ + 1) is proved to be the best possible, where Г (x) is F-function. In particular, for case p = 2, a new Hilbert type integral inequality is obtained. As application, its an equivalent form is given. |
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| Keywords: | integral kernel function weight function F-function Hardy-Hilbert integral inequality the best constant |
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