A-numerical radius inequalities for semi-Hilbertian space operators

Abstract

Let A be a positive bounded operator on a Hilbert space (H, ·, · ). The semi-inner product x, yA := Ax, y, x, y∈H induces a semi-norm \|·\|A on H. Let \|T\|A and wA(T) denote the A-operator semi-norm and the A-numerical radius of an operator T in semi-Hilbertian space (H, \|·\|A), respectively. In this paper, we prove the following characterization of wA(T) align* wA(T) = α2 + β2 = 1 \|α T + TA2 + β T - TA2i\|A, align* where TA is a distinguished A-adjoint operator of T. We then apply it to find upper and lower bounds for wA(T). In particular, we show that align* 12\|T\|A ≤ \1 - ||2AT, 22\wA(T)≤ wA(T), align* where ||AT denotes the A-cosine of angle of T. Some upper bounds for the A-numerical radius of commutators, anticommutators, and products of semi-Hilbertian space operators are also given.