[1] |
HONG Yong, WU Chunyang, CHEN Qiang.
Matching Parameter Conditions for the Best Hilbert-Type Integral Inequality with a Class of Non-homogeneous Kernels
[J]. Journal of Jilin University Science Edition, 2021, 59(2): 207-212.
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[2] |
LIU Qiong.
HilbertType Integral Inequality Related to Some SpecialFunctions and Its Operator Expressions with Norm#br#
[J]. Journal of Jilin University Science Edition, 2018, 56(6): 1359-1365.
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[3] |
SUN Wenbing.
Generalized Harmonically s-Convex Functions andHadamard Type Inequalities on Fractal Sets#br#
[J]. Journal of Jilin University Science Edition, 2018, 56(6): 1366-1372.
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[4] |
HONG Yong, WEN Yamin.
Necessary and Sufficient Condition for a Class of HilbertType IntegralInequality with a Nonhomogeneous Kernel and Its Application
[J]. Journal of Jilin University Science Edition, 2018, 56(2): 227-232.
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[5] |
YANG Bicheng, CHEN Qiang.
Equivalent Conditions of Existence of a Class of Reverse HardyType Integral Inequalities with Nonhomogeneous Kernel
[J]. Journal of Jilin University Science Edition, 2017, 55(04): 804-808.
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[6] |
SUN Wenbing.
HadamardType Inequalities with Mapping Derivatives Being sConvex Functions and under Fractional Integrals
[J]. Journal of Jilin University Science Edition, 2017, 55(04): 809-814.
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[7] |
GU Zhaohui, YANG Bicheng.
A HilbertType Integral Inequality in Whole PlaneRelated to Gamma Function of Best Constant Factor
[J]. Journal of Jilin University Science Edition, 2017, 55(03): 513-518.
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[8] |
HONG Yong.
Structural Characteristics and Applications of Hilbert’s TypeIntegral Inequalities with Homogenous Kernel
[J]. Journal of Jilin University Science Edition, 2017, 55(02): 189-194.
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[9] |
LIU Qiong.
A Multi-parameters HilbertType IntegralInequality Related to Extended Zeta Function
[J]. Journal of Jilin University Science Edition, 2016, 54(06): 1294-1299.
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[10] |
HONG Yong.
Multiple HilbertType Integral Inequalities withHomogeneous Kernel and Some Functions
[J]. Journal of Jilin University Science Edition, 2016, 54(03): 408-401.
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[11] |
HONG Yong.
A New Hilbert’s Type Integral Inequality with a Quasihomogeneous Kernel
[J]. Journal of Jilin University Science Edition, 2015, 53(02): 177-182.
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[12] |
HU Youjing, JI Yongqiang.
The Compact Timelike Submanifolds in the de Sitter Space
[J]. Journal of Jilin University Science Edition, 2014, 52(05): 895-901.
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[13] |
YANG Bicheng, CHEN Qiang.
A HilbertType Integral Inequality Related to the Riemann Zeta Function
[J]. Journal of Jilin University Science Edition, 2014, 52(05): 869-872.
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[14] |
ZHANG Pan, ZHANG Liang, SONG Weidong.
Inequalities of Chen Type for Lagrangian Submanifolds ofa Class of Indefinite Complex Space Form
[J]. Journal of Jilin University Science Edition, 2014, 52(03): 439-444.
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[15] |
HONG Yong.
A New Hilbert’s Type Integral Inequality withKernel of Transferable Variable Function
[J]. Journal of Jilin University Science Edition, 2014, 52(01): 7-11.
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