On A-numerical radius inequalities for 2 × 2 operator matrices

Abstract

Let (H, . , . ) be a complex Hilbert space and A be a positive bounded linear operator on it. Let wA(T) be the A-numerical radius and \|T\|A be the A-operator seminorm of an operator T acting on the semi-Hilbertian space (H, .,.A), where x, yA:= Ax, y for all x,y∈ H. In this article, we establish several upper and lower bounds for B-numerical radius of 2× 2 operator matrices, where B=bmatrix A & 0 0 & A bmatrix. Further, we prove some refinements of earlier A-numerical radius inequalities for operators.