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Further results on $\mathbb{A}$-numerical radius inequalities

Functional Analysis 2025-08-04 v2

Abstract

Let AA be a bounded linear positive operator on a complex Hilbert space H.\mathcal{H}. Further, let BA(H)\mathcal{B}_A\mathcal{(H)} denote the set of all bounded linear operators on H\mathcal{H} whose AA-adjoint exists, and A\mathbb{A} signify a diagonal operator matrix with diagonal entries are A.A. Very recently, several AA-numerical radius inequalities of 2×22\times 2 operator matrices were established by Feki and Sahoo [arXiv:2006.09312; 2020] and Bhunia {\it et al.} [Linear Multilinear Algebra (2020), DOI: 10.1080/03081087.2020.1781037], assuming the conditions "N(A)\mathcal{N}(A)^\perp is invariant under different operators in BA(H)\mathcal{B}_A(\mathcal{H})" and "AA is strictly positive", respectively. In this paper, we prove a few new A\mathbb{A}-numerical radius inequalities for 2×22\times 2 and n×nn\times n operator matrices. We also provide some new proofs of the existing results by relaxing different sufficient conditions like "N(A)\mathcal{N}(A)^\perp is invariant under different operators" and "AA 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.

Keywords

Cite

@article{arxiv.2007.04804,
  title  = {Further results on $\mathbb{A}$-numerical radius inequalities},
  author = {Nirmal Chandra Rout and Debasisha Mishra},
  journal= {arXiv preprint arXiv:2007.04804},
  year   = {2025}
}

Comments

arXiv admin note: text overlap with arXiv:2007.03512

R2 v1 2026-06-23T16:59:05.986Z