Further Inequalities for the Numerical Radius of Hilbert Space Operators
Abstract
In this article, we present some new inequalities for numerical radius of Hilbert space operators via convex functions. Our results generalize and improve earlier results by El-Haddad and Kittaneh. Among several results, we show that if A∈ B( H ) and r 2, then \[wr( A ) \| A \|r-\| x \|=1∈f \,\| | | A |-w( A ) |r2x \|2\] where w( · ) and \| · \| denote the numerical radius and usual operator norm, respectively.
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