Euclidean operator radius and numerical radius inequalities

Abstract

Let T be a bounded linear operator on a complex Hilbert space H. We obtain various lower and upper bounds for the numerical radius of T by developing the Euclidean operator radius bounds of a pair of operators, which are stronger than the existing ones. In particular, we develop an inequality that improves on the inequality w(T) ≥ 12 \|T\|+14 |\|Re(T)\|-12 \|T\| | + 14 | \|Im(T)\|-12 \|T\| |. Various equality conditions of the existing numerical radius inequalities are also provided. Further, we study the numerical radius inequalities of 2× 2 off-diagonal operator matrices. Applying the numerical radius bounds of operator matrices, we develop the upper bounds of w(T) by using t-Aluthge transform. In particular, we improve the well known inequality w(T) ≤ 12 \|T\|+ 12 w(T), where T=|T|1/2U|T|1/2 is the Aluthge transform of T and T=U|T| is the polar decomposition of T.