Sharp inequalities for the numerical radius of Hilbert space operators and operator matrices

Abstract

We present new upper and lower bounds for the numerical radius of a bounded linear operator defined on a complex Hilbert space, which improve on the existing bounds. Among many other inequalities proved in this article, we show that for a non-zero bounded linear operator T on a Hilbert space H, w(T)≥ \|T\|2+m(T2)2\|T\|, where w(T) is the numerical radius of T and m(T2) is the Crawford number of T2. This substantially improves on the existing inequality w(T)≥ \|T\|2 . We also obtain some upper and lower bounds for the numerical radius of operator matrices and illustrate with numerical examples that these bounds are better than the existing bounds.