Development of inequality and characterization of equality conditions for the numerical radius

Abstract

Let A be a bounded linear operator on a complex Hilbert space and (A) ( (A) ) denote the real part (imaginary part) of A. Among other refinements of the lower bounds for the numerical radius of A, we prove that eqnarray* w(A)&≥ &12 \|A \| + 12 \|(A)\|-\|(A)\|,\,\,and\\ w2(A)&≥& 14 \|A*A+AA* \| + 12 \|(A)\|2-\|(A)\|2 , eqnarray* where w(A) is the numerical radius of the operator A. We study the equality conditions for w(A)=12\|A*A+AA*\| and prove that w(A)=12\|A*A+AA*\| if and only if the numerical range of A is a circular disk with center at the origin and radius 12\|A*A+AA*\| . We also obtain upper bounds for the numerical radius of commutators of operators which improve on the existing ones.