Further results on A-numerical radius inequalities

Abstract

Let A be a bounded linear positive operator on a complex Hilbert space H. Further, let BA(H) denote the set of all bounded linear operators on H whose A-adjoint exists, and A signify a diagonal operator matrix with diagonal entries are A. Very recently, several A-numerical radius inequalities of 2× 2 operator matrices were established by Feki and Sahoo [arXiv:2006.09312; 2020] and Bhunia et al. [Linear Multilinear Algebra (2020), DOI: 10.1080/03081087.2020.1781037], assuming the conditions "N(A) is invariant under different operators in BA(H)" and "A is strictly positive", respectively. In this paper, we prove a few new A-numerical radius inequalities for 2× 2 and n× n operator matrices. We also provide some new proofs of the existing results by relaxing different sufficient conditions like "N(A) is invariant under different operators" and "A is strictly positive". Our proofs show the importance of the theory of the Moore-Penrose inverse of a bounded linear operator in this field of study.