Some bounds for the A-numerical radius of certain 2 × 2 operator matrices

Abstract

For a given bounded positive (semidefinite) linear operator A on a complex Hilbert space (H, · · ), we consider the semi-Hilbertian space (H, · ·A ) where x yA := Ax y for every x, y∈H. The A-numerical radius of an A-bounded operator T on H is given by align* ωA(T) = \| Tx xA|\,; \,\,x∈ H, \, x xA= 1\. align* Our aim in this paper is to derive several A-numerical radius inequalities for 2× 2 operator matrices whose entries are A-bounded operators, where A=diag(A,A).