JIPAM logo: Home Link
 
Home Editors Submissions Reviews Volumes RGMIA About Us
 

   
  Volume 8, Issue 3, Article 88
 
On an Inequality of V. Csiszár and T.F. Móri for Concave Functions of Two Variables
    Authors: Božidar Ivanković, Saichi Izumino, Josip E. Pecaric, Masaru Tominaga,  
    Keywords: Diaz-Metcalf inequality, Hölder's inequality, Hadamard's inequality, Petrović's inequality, Giaccardi's inequality.  
    Date Received: 27/09/06  
    Date Accepted: 21/04/07  
    Subject Codes:

26D15.

  
    Editors: Iosif Pinelis,  
 
    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.

         
       
  Download Screen PDF
  Download Print PDF
  Send this article to a friend
  Print this page
  

      search [advanced search] copyright 2003 terms and conditions login