JIPAM

A Minkowski-Type Inequality for the Schatten Norm  
 
  Authors: Markus Sigg,  
  Keywords: Schatten class, Schatten norm, Norm inequality, Minkowski inequality, Triangle inequality, Powers of operators, Schatten-Minkowski constant.  
  Date Received: 16/07/04  
  Date Accepted: 29/06/05  
  Subject Codes:

47A30, 47B10

 
  Editors: Frank Hansen,  
 
  Abstract:

Let $ F$ be a Schatten $ p$-operator and $ R,S$ positive operators. We show that the inequality $ vert{F (R+S)^frac1cvert _p}^{hspace{-4.75pt}c} le { vert FR^frac1cvert _p}^{hspace{-4.75pt}c} + {vert FS^frac1cvert _p}^{hspace{-4.75pt}c}$ for the Schatten $ p$-norm $ vertcdot vert _p$ is true for $ p ge c = 1$ and for $ p ge c = 2$, conjecture it to be true for $ p ge c in [1,2]$, give counterexamples for the other cases, and present a numerical study for $ 2 times 2$ matrices. Furthermore, we have a look at a generalisation of the inequality which involves an additional factor $ sigma(c,p)$. ;



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=560