Block numerical range and estimable total decompositions of normal operators

AbstractThis paper is concerned with the numerical range and some related properties of the operator Δ/ S: T → AT – TB(T∈S), where A, B are (bounded linear) operators on the normed linear spaces X and Y. respectively, and S is a linear subspace of the space ℒ (Y, X) of all operators from Y to X. S is assumed to contain all finite operators, to be invariant under Δ, and to be suitably normed (not necessarily with the operator norm). Then the algebra numerical range of Δ/ S is equal to the difference of the algebra numerical ranges of A and B. When X = Y and S = ℒ (X), Δ is Hermitian (resp. normal) in ℒ (ℒ(X)) if and only if A–λ and B–λ are Hermitian (resp. normal) in ℒ(X)for some scalar λ;if X: = H is a Hilbert space and if S is a C *-algebra or a minimal norm ideal in ℒ(H)then any Hermitian (resp. normal) operator in S is of the form Δ/ S for some Hermitian (resp. normal) operators A and B. AT = TB implies A*T = TB* are hyponormal operators on the Hilbert spaces H1 and H2, respectively, and T is a Hilbert-Schmidt operator from H2 to H1.

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Joint numerical ranges for unbounded normal operators

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091500022665 ◽

1985 ◽

Vol 28 (2) ◽

pp. 225-232 ◽

Cited By ~ 3

Author(s):

Huang Danrun

Keyword(s):

Unbounded Operator ◽

Operator Algebras ◽

Numerical Range ◽

Bounded Operators ◽

Unbounded Operators ◽

Joint Spectrum ◽

Normal Operators ◽

Intimate Relations ◽

Joint Numerical Range

For bounded operators, the theory of the joint numerical range has been developed by various authors [1,2,3,4,5]. Especially, the properties of commuting normal n-tuples are discussed in detail. Our purpose here is to show that many results in the above references still hold in the case of unbounded normal operators (see Theorem 2.3, Corrollary 3.5, Theorem 4.1, Theorem 4.2). Besides, the operator algebras are closely related to the theory of joint spectrum and joint numerical ranges in the boundedcase (cf. [1,3]). How about unbounded operators? It seems that one must consider unbounded operator algebras. Some work has been done in this direction for the joint spectrum of unbounded normal operators [9]. In the last section of this paper, we provide some intimate relations between the joint numerical range and the unbounded operator algebras for unbounded normal operators.

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On The Class of (K-N)* Quasi-N-Normal Operators on Hilbert Space

Iraqi Journal of Science ◽

10.24996/ijs.2017.58.4b.20 ◽

2017 ◽

Vol 58 (4B) ◽

Keyword(s):

Hilbert Space ◽

Normal Operators

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A new method for approximation of closed convex subsets of B(H)

Filomat ◽

10.2298/fil1719005i ◽

2017 ◽

Vol 31 (19) ◽

pp. 6005-6013

Author(s):

Mahdi Iranmanesh ◽

Fatemeh Soleimany

Keyword(s):

Best Approximation ◽

Numerical Range ◽

New Method ◽

C Algebra ◽

Convex Subsets

In this paper we use the concept of numerical range to characterize best approximation points in closed convex subsets of B(H): Finally by using this method we give also a useful characterization of best approximation in closed convex subsets of a C*-algebra A.

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A note on normal operators

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100003728 ◽

1963 ◽

Vol 59 (4) ◽

pp. 727-729 ◽

Cited By ~ 17

Author(s):

S. J. Bernau ◽

F. Smithies

Keyword(s):

Hilbert Space ◽

Linear Operator ◽

Adjoint Operator ◽

Spectral Theorem ◽

Unitary Operators ◽

Unitary Space ◽

Bounded Linear ◽

Finite Dimensional ◽

Normal Operators ◽

Finite Dimensional Case

We recall that a bounded linear operator T in a Hilbert space or finite-dimensional unitary space is said to be normal if T commutes with its adjoint operator T*, i.e. TT* = T*T. Most of the proofs given in the literature for the spectral theorem for normal operators, even in the finite-dimensional case, appeal to the corresponding results for Hermitian or unitary operators.

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Continuity of submatrices and Ritz sets associated to a point in the numerical range

Linear Algebra and its Applications ◽

10.1016/j.laa.2021.03.031 ◽

2021 ◽

Vol 624 ◽

pp. 1-13

Author(s):

Kennett L. Dela Rosa ◽

Hugo J. Woerdeman

Keyword(s):

Numerical Range

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Semi-normal operators on uniformly smooth Banach spaces

Glasgow Mathematical Journal ◽

10.1017/s0017089500009356 ◽

1990 ◽

Vol 32 (3) ◽

pp. 273-276 ◽

Cited By ~ 1

Author(s):

Muneo Chō

Keyword(s):

Banach Space ◽

Linear Functional ◽

Dual Space ◽

Complex Banach Space ◽

Linear Operators ◽

Bounded Linear ◽

Uniformly Smooth ◽

Normal Operators ◽

Uniformly Smooth Banach Spaces ◽

The Relationship

In this paper we shall examine the relationship between the numerical ranges and the spectra for semi-normal operators on uniformly smooth spaces.Let X be a complex Banach space. We denote by X* the dual space of X and by B(X) the space of all bounded linear operators on X. A linear functional F on B(X) is called state if ∥F∥ = F(I) = 1. When x ε X with ∥x∥ = 1, we denoteD(x) = {f ε X*:∥f∥ = f(x) = l}.

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a-Numerical range on $$C^*$$-algebras

Positivity ◽

10.1007/s11117-021-00825-6 ◽

2021 ◽

Author(s):

Abdellatif Bourhim ◽

Mohamed Mabrouk

Keyword(s):

Numerical Range ◽

C Algebras

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