Search results for "spectrum"

showing 10 items of 2043 documents

A Unifying Approach to Weyl Type Theorems for Banach Space Operators

2013

Weyl type theorems have been proved for a considerably large number of classes of operators. In this paper, by introducing the class of quasi totally hereditarily normaloid operators, we obtain a theoretical and general framework from which Weyl type theorems may be promptly established for many of these classes of operators. This framework also entails Weyl type theorems for perturbations f(T + K), where K is algebraic and commutes with T, and f is an analytic function, defined on an open neighborhood of the spectrum of T + K, such that f is non constant on each of the components of its domain.

Discrete mathematicsClass (set theory)Algebra and Number TheorySpectrum (functional analysis)Banach spaceType (model theory)Domain (mathematical analysis)Weyl type theoremsSettore MAT/05 - Analisi MatematicaAlgebraic numberConstant (mathematics)AnalysisMathematicsAnalytic functionIntegral Equations and Operator Theory
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Factorization of homomorphisms through H∞(D)

2003

AbstractWeakly compact homomorphisms between (URM) algebras with connected maximal ideal space are shown to factor through H∞(D) by means of composition operators and to be strongly nuclear. The spectrum of such homomorphisms is also described. Strongly nuclear composition operators between algebras of bounded analytic functions are characterized. The path connected components of the space of endomorphisms on H∞(D) in the uniform operator topology are determined.

Discrete mathematicsConnected spacePure mathematicsEndomorphismCompact spaceComposition operatorBounded functionApplied MathematicsSpectrum (functional analysis)Maximal idealOperator theoryAnalysisMathematicsJournal of Mathematical Analysis and Applications
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Single-valued extension property at the points of the approximate point spectrum

2003

Abstract A localized version of the single-valued extension property is studied at the points which are not limit points of the approximate point spectrum, as well as of the surjectivity spectrum. In particular, we shall characterize the single-valued extension property at a point λ o ∈ C in the case that λoI−T is of Kato type. From this characterizations we shall deduce several results on cluster points of some distinguished parts of the spectrum.

Discrete mathematicsFredholm theoryFredholm operatorApplied MathematicsSpectrum (functional analysis)Banach spaceExtension (predicate logic)Type (model theory)Fredholm theorySingle valued extension propertysymbols.namesakeLimit pointsymbolsPoint (geometry)AnalysisMathematicsJournal of Mathematical Analysis and Applications
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Homomorphisms and composition operators on algebras of analytic functions of bounded type

2005

Abstract Let U and V be convex and balanced open subsets of the Banach spaces X and Y, respectively. In this paper we study the following question: given two Frechet algebras of holomorphic functions of bounded type on U and V, respectively, that are algebra isomorphic, can we deduce that X and Y (or X * and Y * ) are isomorphic? We prove that if X * or Y * has the approximation property and H wu ( U ) and H wu ( V ) are topologically algebra isomorphic, then X * and Y * are isomorphic (the converse being true when U and V are the whole space). We get analogous results for H b ( U ) and H b ( V ) , giving conditions under which an algebra isomorphism between H b ( X ) and H b ( Y ) is equiv…

Discrete mathematicsMathematics(all)Approximation propertyGeneral MathematicsSpectrum (functional analysis)Holomorphic functionStructure (category theory)Banach spaceHomomorphismsBounded typePolynomialsCombinatoricsBanach spacesHolomorphic functionsHomomorphismIsomorphismMathematicsAdvances in Mathematics
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Boundaries for algebras of analytic functions on function module Banach spaces

2013

We consider the uniform algebra of continuous and bounded functions that are analytic on the interior of the closed unit ball of a complex Banach function module X. We focus on norming subsets of , i.e., boundaries, for such algebra. In particular, if X is a dual complex Banach space whose centralizer is infinite-dimensional, then the intersection of all closed boundaries is empty. This also holds in case that X is an -sum of infinitely many Banach spaces and further, the torus is a boundary.

Discrete mathematicsMathematics::Functional AnalysisGeneral MathematicsUniform algebraSpectrum (functional analysis)Interpolation spaceFinite-rank operatorBanach manifoldInfinite-dimensional holomorphyC0-semigroupLp spaceMathematicsMathematische Nachrichten
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A Riemann manifold structure of the spectra of weighted algebras of holomorphic functions

2009

[EN] In this paper we give general conditions on a countable family V of weights on an unbounded open set U in a complex Banach space X such that the weighted space HV (U) of holomorphic functions on U has a Frechet algebra structure. For such weights it is shown that the spectrum of HV(U) has a natural analytic manifold structure when X is a symmetrically regular Banach space, and in particular when X = C-n. (C) 2009 Elsevier Ltd. All rights reserved.

Discrete mathematicsMathematics::Functional AnalysisPure mathematicsFréchet algebraWeighted space of holomorphic functionsHolomorphic functional calculusInfinite-dimensional vector functionSpectrum (functional analysis)Holomorphic functionFrechet algebraBanach manifoldAnalytic manifold structureAnalytic manifoldBergman spaceSymmetrically regular Banach spaceGeometry and TopologyMATEMATICA APLICADAWeighted spaceMathematicsTopology
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Property (R) under perturbations

2012

Property (R) holds for a bounded linear operator $${T \in L(X)}$$ , defined on a complex infinite dimensional Banach space X, if the isolated points of the spectrum of T which are eigenvalues of finite multiplicity are exactly those points λ of the approximate point spectrum for which λI − T is upper semi-Browder. In this paper we consider the permanence of this property under quasi nilpotent, Riesz, or algebraic perturbations commuting with T.

Discrete mathematicsProperty (R)Mathematics::Functional AnalysisPure mathematicsGeneral MathematicsWeyl's theoremSpectrum (functional analysis)Banach spaceMultiplicity (mathematics)Bounded operatorNilpotentSettore MAT/05 - Analisi MatematicaPoint (geometry)Algebraic numberEigenvalues and eigenvectorsMathematics
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On the boundary spectrum of dominatedC o-Semigroups

1989

Discrete mathematicsPure mathematicsAlgebra and Number TheoryDominance (ethology)Banach latticeSpectrum (functional analysis)Boundary (topology)Algebra over a fieldMathematicsSemigroup Forum
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Gleason Parts and Weakly Compact Homomorphismsbetween Uniform Banach Algebras

1999

If points in nontrivial Gleason parts of a uniform Banach algebra have unique representing measures, then the weak and the norm topology coincide on the spectrum. We derive from this several consequences about weakly compact homomorphisms and discuss the case of other uniform Banach algebras arising in complex infinite dimensional analysis.

Discrete mathematicsPure mathematicsApproximation propertyGeneral MathematicsBanach algebraSpectrum (functional analysis)HomomorphismBanach manifoldTopology (chemistry)Analytic functionMathematicsMonatshefte f�r Mathematik
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The Fine Spectre of Some Cesàro Generalized Operators Defined onℓp(p> 1)

2004

Abstract The aim of the paper is the study of the fine spectre for a class of Cesaro generalized operators, Rhaly operators, when those operators are defined on the spaces lp, p > 1.

Discrete mathematicsPure mathematicsClass (set theory)Spectrum (functional analysis)General MedicineSpectral theoremOperator theoryEigenvalues and eigenvectorsMathematicsJournal of Dynamical Systems and Geometric Theories
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