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JIPAM
| On an Inequality of V. Csiszár and T.F. Móri for Concave Functions of Two Variables |
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Authors: |
Boidar Ivanković, Saichi Izumino, Josip E. Pecaric, Masaru Tominaga, |
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Keywords:
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Diaz-Metcalf inequality, Hölder's inequality, Hadamard's inequality, Petrović's inequality, Giaccardi's inequality. |
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Date Received:
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27/09/06 |
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Date Accepted:
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21/04/07 |
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Subject Codes: |
26D15.
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Editors: |
Iosif Pinelis, |
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Abstract: |
V. Csiszár and T.F. Móri gave an extension of Diaz-Metcalf's inequality for concave functions. In this paper, we show its restatement. As its applications we first give a reverse inequality of Hölder's inequality. Next we consider two variable versions of Hadamard, Petrović and Giaccardi inequalities.;
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This article was printed from JIPAM
http://jipam.vu.edu.au
The URL for this article is:
http://jipam.vu.edu.au/article.php?sid=889
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