Some numerical radius inequalities for semi-Hilbert space operators

Abstract

Let A be a positive bounded linear operator acting on a complex Hilbert space (H, · · ). Let ωA(T) and \|T\|A denote the A-numerical radius and the A-operator seminorm of an operator T acting on the semi-Hilbertian space (H, · ·A) respectively, where x yA := Ax y for all x, y∈H. In this paper, we show that equation*m1 14\|TA T+TTA\|A ωA2(T) 12\|TA T+TTA\|A. equation* Here TA is denoted to be a distinguished A-adjoint operator of T. Moreover, a considerable improvement of the above inequalities is proved. This allows to compute the A-numerical radius of the operator matrix pmatrix I&T \\ 0&-I pmatrix where A= diag(A,A). In addition, several A-numerical radius inequalities for semi-Hilbertian space operators are also established.