Furtherance of Numerical radius inequalities of Hilbert space operators

Abstract

If A,B are bounded linear operators on a complex Hilbert space, then % w(A) ≤ 12( \|A\|+r(|A||A*|)) and w(AB BA)≤ 22\|B\| w2(A)-c2( (A))+c2( (A))2 , eqnarray* w(A) &≤& 12( \|A\|+r(|A||A*|)),\\ w(AB BA)&≤& 22\|B\| w2(A)-c2( (A))+c2( (A))2 , eqnarray* where w(.),\|.\|,c(.) and r(.) are the numerical radius, the operator norm, the Crawford number and the spectral radius respectively, and (A), (A) are the real part, the imaginary part of A respectively. The inequalities obtained here generalize and improve on the existing well known inequalities.