Numerical range and sub-self-adjoint operators
Citation
Bouzenada, S. & Chettouh, R. (2020). Numerical range and sub-self-adjoint operators. TWMS Journal Of Applied And Engineering Mathematics, 10(2), 492-498.Abstract
In this paper, we show that the numerical range of a bounded linear operatör T on a complex Hilbert space is a line segment if and only if there are scalars λ and µ such that T ∗ = λT + µI, and we determine the equation of the straight support of this numerical range in terms of λ and µ. An operator T is called sub-self-adjoint if their numerical range is a line segment. The class of sub-self-adjoint operators contains every self-adjoint operator and contained in the class of normal operators. We show that this class is uniformly closed, invariant under unitary equivalence and invariant under affine transformation. Some properties of the sub-self-adjoint operators and their numerical ranges are investigated.
Source
TWMS Journal Of Applied And Engineering MathematicsVolume
10Issue
2URI
https://hdl.handle.net/11729/2837http://jaem.isikun.edu.tr/web/index.php/archive/105-vol10no2/540
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