Convexity properties and inequalities for a generalized gamma function.
Krasniqi, Valmir, Shabani, Armend Sh. (2010)
Applied Mathematics E-Notes [electronic only]
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Displaying similar documents to “On the Hadamard's inequality for log-convex functions on the coordinates.”
Convexity properties and inequalities for a generalized gamma function.
More about Hermite-Hadamard inequalities, Cauchy's means, and superquadracity.
Abramovich, S., Farid, G., Pečarić, J. (2010)
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Wieland, Ben, Godbole, Anant P. (2001)
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A concise proof for properties of three functions involving the exponential function.
Zhang, Shi-Qin, Guo, Bai-Ni, Qi, Feng (2009)
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Convexity of weighted Stolarsky means.
Witkowski, Alfred (2006)
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The Hermite-Hadamard type inequality of GA-convex functions and its application.
Zhang, Xiao-Ming, Chu, Yu-Ming, Zhang, Xiao-Hui (2010)
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Noor, Muhammad Aslam (2007)
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On logarithmic convexity for power sums and related results. II.
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Generalization of Stolarsky type means.
Pečarić, J., Roqia, G. (2010)
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An optimal double inequality for means.
Qian, Wei-Mao, Zheng, Ning-Guo (2010)
Journal of Inequalities and Applications [electronic only]
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The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means.
Xia, Wei-Feng, Chu, Yu-Ming, Wang, Gen-Di (2010)
Abstract and Applied Analysis
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On generalized Moser-Trudinger inequalities without boundary condition
Robert Černý (2012)
Czechoslovak Mathematical Journal
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We give a version of the Moser-Trudinger inequality without boundary condition for Orlicz-Sobolev spaces embedded into exponential and multiple exponential spaces. We also derive the Concentration-Compactness Alternative for this inequality. As an application of our Concentration-Compactness Alternative we prove that a functional with the sub-critical growth attains its maximum.