Improvements of Some Numerical radius inequalities

Abstract

In this work, we improve and refine some numerical radius inequalities. In particular, for all Hilbert space operators T, the celebrated Kittaneh inequality reads: align* 14\| T*T + TT*\| w2 (T ) 12\| T*T + TT*\|. align* In this work we provide some important refinements for the upper bound of the Kittaned inequality. Indeed, we establish align* w2 (T ) 12\| T*T + TT*\| - 14 ∈f \| x \| = 1 ( | T |x,x - | T* |x,x )2, align* which also refined and improved as align* w2 (T ) 12\| T*T + TT*\| - 12 ∈f \| x \| = 1 ( | T |x,x - | T* |x,x )2, align* and align* w2 (T ) 12 \|T*T+TT* \| -12 ∈f \| x \| = 1 ( | T |2 x,x 12 - | T* |2 x,x 12)2, align* with third improvement align* w2 ( T ) 14 \| | T | + | T* | \|2 - 14 ∈f \| x \| = 1 ( | T | x,x - | T* | x,x )2. align* Other general related results are also considered.