1. On the ρ-operator radii.
- Author
-
Kittaneh, Fuad and Zamani, Ali
- Subjects
- *
VECTOR spaces , *HILBERT space , *POSITIVE operators , *RADIUS (Geometry) - Abstract
Let 0 < ρ ≤ 2 and w ρ (X) be the operator radius of a bounded linear Hilbert space operator X. In this paper we present characterizations of operators satisfying w ρ (X) ≤ 1. We also give an expression for the ρ -radii based on the numerical radius of a certain 2 × 2 block matrix. This enables us to investigate the properties of the operator radii w ρ (⋅). In particular, we obtain lower and upper bounds for the operator radii. In addition, we define a norm on Hilbert space operators, which generalizes the operator radii and prove some basic properties of this norm. Our results extend or improve some theorems due to Ando [4] , Bhatia–Jain [9] and Kittaneh [19]. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF