SVEP and local spectral radius formula for unbounded operators

Pietro Aiena; Camillo Trapani; Salvatore Triolo

doi:10.2298/fil1402263a

SVEP and local spectral radius formula for unbounded operators

Filomat ◽

10.2298/fil1402263a ◽

2014 ◽

Vol 28 (2) ◽

pp. 263-273 ◽

Cited By ~ 3

Author(s):

Pietro Aiena ◽

Camillo Trapani ◽

Salvatore Triolo

Keyword(s):

Spectral Radius ◽

Unbounded Operator ◽

Sufficient Conditions ◽

Extension Property ◽

Unbounded Operators ◽

Single Valued Extension Property ◽

Local Spectral Radius ◽

Spectral Radius Formula

In this paper we study the localized single valued extension property for an unbounded operator T. Moreover, we provide sufficient conditions for which the formula of the local spectral radius holds for these operators.

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Biquasitriangularity and spectral continuity

Glasgow Mathematical Journal ◽

10.1017/s0017089500005966 ◽

1985 ◽

Vol 26 (2) ◽

pp. 177-180 ◽

Cited By ~ 2

Author(s):

Ridgley Lange

Keyword(s):

Hilbert Space ◽

Sufficient Conditions ◽

Invariant Subspaces ◽

Extension Property ◽

Point Of View ◽

Single Valued Extension Property ◽

Continuity Theorem ◽

Spectral Continuity ◽

Necessary And Sufficient ◽

Continuity Of The Spectrum

In [6] Conway and Morrell characterized those operators on Hilbert space that are points of continuity of the spectrum. They also gave necessary and sufficient conditions that a biquasitriangular operator be a point of spectral continuity. Our point of view in this note is slightly different. Given a point T of spectral continuity, we ask what can then be inferred. Several of our results deal with invariant subspaces. We also give some conditions characterizing a biquasitriangular point of spectral continuity (Theorem 3). One of these is that the operator and its adjoint both have the single-valued extension property.

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Property $(w)$ of upper triangular operator Matrices

Tamkang Journal of Mathematics ◽

10.5556/j.tkjm.51.2020.2256 ◽

2020 ◽

Vol 51 (2) ◽

pp. 81-99

Author(s):

Mohammad M.H Rashid

Keyword(s):

Hilbert Spaces ◽

Sufficient Conditions ◽

Extension Property ◽

Operator Matrices ◽

Single Valued Extension Property ◽

Triangular Operator ◽

Upper Triangular Operator Matrices ◽

Necessary And Sufficient ◽

The Relationship ◽

Number Of Authors

Let $M_C=\begin{pmatrix} A & C \\ 0 & B \\ \end{pmatrix}\in\LB(\x,\y)$ be be an upper triangulate Banach spaceoperator. The relationship between the spectra of $M_C$ and $M_0,$ and theirvarious distinguished parts, has been studied by a large number of authors inthe recent past. This paper brings forth the important role played by SVEP,the {\it single-valued extension property,} in the study of some of these relations. In this work, we prove necessary and sufficient conditions of implication of the type $M_0$ satisfies property $(w)$ $\Leftrightarrow$ $M_C$ satisfies property $(w)$ to hold. Moreover, we explore certain conditions on $T\in\LB(\hh)$ and $S\in\LB(\K)$ so that the direct sum $T\oplus S$ obeys property $(w)$, where $\hh$ and $\K$ are Hilbert spaces.

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Local spectral radius formula for operators in Banach spaces

Czechoslovak Mathematical Journal ◽

10.21136/cmj.1988.102268 ◽

1988 ◽

Vol 38 (4) ◽

pp. 726-729 ◽

Cited By ~ 3

Author(s):

Vladimír Müller

Keyword(s):

Banach Spaces ◽

Spectral Radius ◽

Local Spectral Radius ◽

Spectral Radius Formula

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Browder and Weyl spectra of upper triangular operator matrices

Filomat ◽

10.2298/fil1002111d ◽

2010 ◽

Vol 24 (2) ◽

pp. 111-130 ◽

Cited By ~ 7

Author(s):

B.P. Duggal

Keyword(s):

Sufficient Conditions ◽

Extension Property ◽

Weyl’S Theorem ◽

Single Valued Extension Property ◽

Browder’S Theorem ◽

Subject Classifications ◽

Triangular Operator ◽

Upper Triangular Operator Matrices ◽

Mathematics Subject Classifications ◽

Necessary And Sufficient

Let MC = (A/0 C/B) ( B(X ( X ) be an upper triangulat Banach space operator. The relationship between the spectra of MC and M0, and their various distinguished parts, has been studied by a large number of authors in the recent past. This paper brings forth the important role played by SVEP, the single-valued extension property, in the study of some of these relations. Operators MC and M0 satisfying Browder's, or a-Browder's, theorem are characterized, and we prove necessary and sufficient conditions for implications of the type 'M0 satisfies a-Browder's (or a-Weyl's) theorem ( MC satisfies a-Browder's (resp., a-Weyl's) theorem' to hold. 2010 Mathematics Subject Classifications. Primary 47B47, 47A10, 47A11. .

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Local spectral radius formulas for a class of unbounded operators on Banach spaces

Journal of Operator Theory ◽

10.7900/jot.2011jan18.1914 ◽

2013 ◽

Vol 69 (2) ◽

pp. 435-461 ◽

Cited By ~ 1

Author(s):

Nils Byrial Andersen ◽

Marcel de Jeu

Keyword(s):

Banach Spaces ◽

Spectral Radius ◽

Unbounded Operators ◽

Local Spectral Radius

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Universal notions characterizing spectral decompositions

Glasgow Mathematical Journal ◽

10.1017/s0017089500008594 ◽

1992 ◽

Vol 34 (1) ◽

pp. 109-116

Author(s):

Ridgley Lange ◽

Shengwang Wang

Keyword(s):

Banach Space ◽

Linear Manifold ◽

Sufficient Conditions ◽

Extension Property ◽

Complex Banach Space ◽

Single Valued Extension Property ◽

Closed Set ◽

Bounded Linear ◽

Image Position ◽

Decomposable Operator

In this note we characterize certain types of spectral decomposition in terms of “universal” notions valid for any operator on a Banach space. To be precise, let X be a complex Banach space and let T be a bounded linear operator on X. If F is a closed set in the plane C, let X(T, F) consist of all y ∈ X satisfying thes identitywhere f:C\F → X is analytic. It is then easy to see that X(T, F) is a T-invariant linear manifold in X. Moreover, if y ∈ X thenis a compact subset of the spectrum σ(T). Our aim is to give necessary and sufficient conditions for a decomposable or strongly decomposable operator in terms of X(T, F) and γ(y, T). Recall that T is decomposable if whenever G1G2 are open and cover C there exist T-invariant closed linear manifolds M1, M2 with X= M1 + M2 and σ(T | M1) ⊂ Gi(i = 1,2) (equivalently, σ(T | Mi)⊂ Ḡi, see [4, p. 57]). In this case, X(T, F) is norm closed if Fis closed and each y in X has a unique maximally defined local resolvent satisfying (1.1) on C\Fy; Fy is called the local spectrum σ(y, T) and coincides with γ(y, T). Hence T has the single valued extension property (SVEP); i.e., zero is the only analytic function f:V → X satisfying (z − T)f(z) = 0 on V. If T is decomposable and the restriction T | X(T, F) is also decomposable for each closed F, then T is called strongly decomposable. We point out that Albrecht [2] has shown by example that not every decomposable operator is strongly decomposable, while Eschmeier [6]has given a simpler construction to show that this phenomenon occurs even in Hilbert space.

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The local spectral radius of a nonnegative orbit of compact linear operators

Mathematica Slovaca ◽

10.1515/ms-2015-0172 ◽

2016 ◽

Vol 66 (3) ◽

Author(s):

Mihály Pituk

Keyword(s):

Banach Space ◽

Spectral Radius ◽

Additional Assumption ◽

Real Banach Space ◽

Linear Operators ◽

Partial Ordering ◽

Positive Eigenvector ◽

Local Spectral Radius

AbstractWe consider orbits of compact linear operators in a real Banach space which are nonnegative with respect to the partial ordering induced by a given cone. The main result shows that under a mild additional assumption the local spectral radius of a nonnegative orbit is an eigenvalue of the operator with a positive eigenvector.

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