Search results for "Bounded inverse theorem"

showing 10 items of 11 documents

Entire Functions of Bounded Type on Fréchet Spaces

1993

We show that holomorphic mappings of bounded type defined on Frechet spaces extend to the bidual. The relationship between holomorphic mappings of bounded type and of uniformly bounded type is discussed and some algebraic and topological properties of the space of all entire mappings of (uniformly) bounded type are proved, for example a holomorphic version of Schauder's theorem.

Discrete mathematicsMathematics::Functional AnalysisMathematics::Complex VariablesGeneral MathematicsBounded functionUniform boundednessBounded deformationInfinite-dimensional holomorphyBounded inverse theoremIdentity theoremExponential typeBounded operatorMathematicsMathematische Nachrichten
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Some characterizations of operators satisfying a-Browder's theorem

2005

Abstract We characterize the bounded linear operators T defined on Banach spaces satisfying a-Browder's theorem, or a-Weyl's theorem, by means of the discontinuity of some maps defined on certain subsets of C . Several other characterizations are given in terms of localized SVEP, as well as by means of the quasi-nilpotent part, the hyper-kernel or the analytic core of λ I − T .

Discrete mathematicsUnbounded operatora-Browder's theoremFredholm theoryPicard–Lindelöf theoremApplied MathematicsEberlein–Šmulian theoremBanach spaceSpectral theoremOperator theorya-Weyl's theoremShift theoremLocal spectral theoryBounded inverse theoremAnalysisMathematicsJournal of Mathematical Analysis and Applications
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Classes of operators satisfying a-Weyl's theorem

2005

In this article Weyl's theorem and a-Weyl's theorem on Banach spaces are related to an important property which has a leading role in local spectral theory: the single-valued extension theory. We show that if T has SVEP then Weyl's theorem and a-Weyl's theorem for T are equivalent, and analogously, if T has SVEP then Weyl's theorem and a-Weyl's theorem for T are equivalent. From this result we deduce that a-Weyl's theorem holds for classes of operators for which the quasi-nilpotent part H0(I T ) is equal to ker (I T ) p for some p2N and every 2C, and for algebraically paranormal operators on Hilbert spaces. We also improve recent results established by Curto and Han, Han and Lee, and Oudghi…

Discrete mathematicsSpectral theoryGeneral MathematicsHilbert spaceBanach spacePropertySpectral theoremFredholm theorysymbols.namesakeKernel (algebra)Bounded functionsymbolsOperatorBounded inverse theoremtheorem holdsMathematics
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Cluster values of holomorphic functions of bounded type

2015

We study the cluster value theorem for Hb(X), the Fréchet algebra of holomorphic functions bounded on bounded sets of X. We also describe the (size of) fibers of the spectrum of Hb(X). Our results are rather complete whenever X has an unconditional shrinking basis and for X = ℓ1. As a byproduct, we obtain results on the spectrum of the algebra of all uniformly continuous holomorphic functions on the ball of ℓ1. Fil: Aron, Richard Martin. Kent State University; Estados Unidos Fil: Carando, Daniel Germán. Consejo Nacional de Investigaciones Científicas y Técnicas. Oficina de Coordinación Administrativa Ciudad Universitaria. Instituto de Investigaciones Matemáticas ; Argentina Fil: Lassalle, S…

Discrete mathematicsSPECTRUMPure mathematicsMatemáticasApplied MathematicsGeneral MathematicsHolomorphic functional calculusHolomorphic functionFIBERBounded deformationBounded mean oscillationMatemática PuraBounded operatorANALYTIC FUNCTIONS OF BOUNDED TYPEBANACH SPACEBergman spaceBounded functionBounded inverse theoremCLUSTER VALUECIENCIAS NATURALES Y EXACTASMathematicsTransactions of the American Mathematical Society
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Weyl type theorems for bounded linear operators on Banach spaces

2011

In 1909 H. Weyl [59] studied the spectra of all compact linear perturbations of a self-adjoint operator defined on a Hilbert space and found that their intersection consisted precisely of those points of the spectrum where are not isolated eigenvalues of nite multiplicity. Later, the property established by Weyl for self-adjoint operators has been observed for several other classes of operators, for instance hyponormal operators on Hilbert spaces, Toeplitz operators,convolution operators on group algebras, and many other classes of operators ned on Banach spaces . In the literature, a bounded linear operator defined on a Banach space which satisfies this property is said to satisfy Weyl's t…

Discrete mathematicsUnbounded operatorWeyl type theoremsSettore MAT/05 - Analisi MatematicaApproximation propertyFinite-rank operatorBanach manifoldOperator theoryInfinite-dimensional holomorphyBounded inverse theoremMathematicsBounded operatorAdvanced Courses of Mathematical Analysis IV
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Bounded Bi-ideals and Linear Recurrence

2013

Bounded bi-ideals are a subclass of uniformly recurrent words. We introduce the notion of completely bounded bi-ideals by imposing a restriction on their generating base sequences. We prove that a bounded bi-ideal is linearly recurrent if and only if it is completely bounded.

CombinatoricsCombinatorics on wordsMathematics::Commutative AlgebraBounded setBounded functionBase (topology)Bounded inverse theoremBounded operatorMathematics2013 15th International Symposium on Symbolic and Numeric Algorithms for Scientific Computing
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Variations on Weyl's theorem

2006

AbstractIn this note we study the property (w), a variant of Weyl's theorem introduced by Rakočević, by means of the localized single-valued extension property (SVEP). We establish for a bounded linear operator defined on a Banach space several sufficient and necessary conditions for which property (w) holds. We also relate this property with Weyl's theorem and with another variant of it, a-Weyl's theorem. We show that Weyl's theorem, a-Weyl's theorem and property (w) for T (respectively T*) coincide whenever T* (respectively T) satisfies SVEP. As a consequence of these results, we obtain that several classes of commonly considered operators have property (w).

Intersection theoremDiscrete mathematicsWeyl's theoremsPure mathematicsPicard–Lindelöf theoremProperty (w)Applied MathematicsLeast-upper-bound propertyBanach spaceLocalized SVEPBounded operatorDanskin's theoremBrowder's theoremsMathematics::Representation TheoryBrouwer fixed-point theoremBounded inverse theoremAnalysisMathematicsJournal of Mathematical Analysis and Applications
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Generalized Browder’s Theorem and SVEP

2007

A bounded operator \(T \in L(X), X\) a Banach space, is said to verify generalized Browder’s theorem if the set of all spectral points that do not belong to the B-Weyl’s spectrum coincides with the set of all poles of the resolvent of T, while T is said to verify generalized Weyl’s theorem if the set of all spectral points that do not belong to the B-Weyl spectrum coincides with the set of all isolated points of the spectrum which are eigenvalues. In this article we characterize the bounded linear operators T satisfying generalized Browder’s theorem, or generalized Weyl’s theorem, by means of localized SVEP, as well as by means of the quasi-nilpotent part H0(λI − T) as λ belongs to certain …

Unbounded operatorDiscrete mathematicsPure mathematicsGeneral MathematicsSpectrum (functional analysis)Banach spaceBounded operatorSettore MAT/05 - Analisi MatematicaBounded functionSVEP Fredholm theory generalized Weyl’s theorem and generalized Browder’s theoremMathematics::Representation TheoryBounded inverse theoremEigenvalues and eigenvectorsResolventMathematicsMediterranean Journal of Mathematics
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Property (w) and perturbations

2007

A bounded linear operator T ∈ L(X) defined on a Banach space X satisfies property (w), a variant of Weyl’s theorem, if the complement in the approximate point spectrum σa(T ) of the Weyl essential approximate spectrum σwa(T ) coincides with the set of all isolated points of the spectrum which are eigenvalues of finite multiplicity. In this note, we study the stability of property (w), for a bounded operator T acting on a Banach space, under perturbations by finite rank operators, by nilpotent operator and quasi-nilpotent operators commuting with T .

Discrete mathematicsPure mathematicsApproximation propertyLocalized SVEP Weyl's theorems Browder's theorems PropertyApplied MathematicsBanach spaceFinite-rank operatorCompact operatorStrictly singular operatorBounded operatorSettore MAT/05 - Analisi MatematicaBounded inverse theoremC0-semigroupAnalysisMathematics
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Restricted Uniform Boundedness in Banach Spaces

2009

Precise conditions for a subset A of a Banach space X are known in order that pointwise bounded on A sequences of bounded linear functionals on X are uniformly bounded. In this paper, we study such conditions under the extra assumption that the functionals belong to a given linear subspace &#915 of X *. When &#915 = X *, these conditions are known to be the same ones assuring a bounded linear operator into X , having A in its image, to be onto. We prove that, for A , deciding uniform boundedness of sequences in &#915 is the same property as deciding surjectivity for certain classes of operators. Keywords: Uniform boundedness; thick set; boundedness deciding set Quaestiones Mathematicae 32(2…

Discrete mathematicsMathematics (miscellaneous)Bounded setUniform boundedness principleBounded functionBanach spaceUniform boundednessFinite-rank operatorBounded inverse theoremBounded operatorMathematicsQuaestiones Mathematicae
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