Search results for "Weyl"

showing 10 items of 69 documents

Weyl-Type Theorems on Banach Spaces Under Compact Perturbations

2018

In this paper, we study Browder-type and Weyl-type theorems for operators $$T+K$$ defined on a Banach space X, where K is (a non necessarily commuting) compact operator on X. In the last part, the theory is exemplified in the case of isometries, analytic Toeplitz operators, semi-shift operators, and weighted right shifts.

Mathematics::Functional AnalysisPure mathematicsGeneral Mathematics010102 general mathematicsBrowder-type theorems and Weyl-type theoremBanach spaceType (model theory)Compact operator01 natural sciencesToeplitz matrix010101 applied mathematicslocalized SVEPSettore MAT/05 - Analisi MatematicaMathematics (all)0101 mathematicsMathematics
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Some Remarks on the Spectral Properties of Toeplitz Operators

2019

In this paper, we study some local spectral properties of Toeplitz operators $$T_\phi $$ defined on Hardy spaces, as the localized single-valued extension property and the property of being hereditarily polaroid.

Mathematics::Functional AnalysisPure mathematicsProperty (philosophy)Weyl-type theoremslocalized single-valued extension propertyGeneral MathematicsSpectral propertiesExtension (predicate logic)Hardy spaceToeplitz matrixsymbols.namesakeToeplitz operatorSettore MAT/05 - Analisi MatematicasymbolsMathematicsMediterranean Journal of Mathematics
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Mixed topology ring states for Hall effect and orbital magnetism in skyrmions of Weyl semimetals

2020

Skyrmion lattices as a novel type of chiral spin states are attracting increasing attention, owing to their peculiar properties stemming from real-space topological properties. At the same time, the properties of magnetic Weyl semimetals with complex $k$-space topology are moving into the focus of research in spintronics. We consider the Hall transport properties and orbital magnetism of skyrmion lattices imprinted in topological semimetals, by employing a minimal model of a 2D mixed Weyl semimetal which, as a function of the magnetization direction, exhibits two Chern insulator phases separated by a Weyl state for an an in-plane magnetization direction. We find that while the orbital magne…

PhysicsCondensed Matter - Mesoscale and Nanoscale PhysicsMagnetismSkyrmionWeyl semimetalFOS: Physical sciences02 engineering and technology021001 nanoscience & nanotechnologyTopologyCondensed Matter::Mesoscopic Systems and Quantum Hall Effect01 natural sciencesMagnetizationMAJORANAFerromagnetismHall effect0103 physical sciencesMesoscale and Nanoscale Physics (cond-mat.mes-hall)ddc:530010306 general physics0210 nano-technologyOrbital magnetizationPhysical Review B
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A covariant determination of the Weyl canonical frames in Petrov type I spacetimes

1997

A covariant algorithm is given to obtain principal 2-forms, Debever null directions and canonical frames associated with Petrov type I Weyl tensors. The relationship between these Weyl elements is explained, and their explicit expressions depending on Weyl invariants are obtained. These results are used to determine a cosmological observer in type I universes, and their usefulness in spacetime intrinsic characterization is shown.

PhysicsGeneral Relativity and Quantum Cosmologysymbols.namesakePhysics and Astronomy (miscellaneous)SpacetimeNull (mathematics)symbolsWeyl transformationCovariant transformationCharacterization (mathematics)Type (model theory)Observer (physics)Mathematical physicsClassical and Quantum Gravity
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Running Newton Constant, Improved Gravitational Actions, and Galaxy Rotation Curves

2004

A renormalization group (RG) improvement of the Einstein-Hilbert action is performed which promotes Newton's constant and the cosmological constant to scalar functions on spacetime. They arise from solutions of an exact RG equation by means of a ``cutoff identification'' which associates RG scales to the points of spacetime. The resulting modified Einstein equations for spherically symmetric, static spacetimes are derived and analyzed in detail. The modifications of the Newtonian limit due to the RG evolution are obtained for the general case. As an application, the viability of a scenario is investigated where strong quantum effects in the infrared cause Newton's constant to grow at large …

PhysicsHigh Energy Physics - TheoryNuclear and High Energy PhysicsAstrophysics (astro-ph)Dark matterFOS: Physical sciencesGeneral Relativity and Quantum Cosmology (gr-qc)Cosmological constantNewtonian limitAstrophysicsGeneral Relativity and Quantum CosmologyGravitationsymbols.namesakeGeneral Relativity and Quantum CosmologyClassical mechanicsHigh Energy Physics - Theory (hep-th)Einstein field equationssymbolsSchwarzschild metricWeyl transformationGalaxy rotation curveMathematical physics
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On the hamiltonian approach to commutator anomalies in (3+1) dimensions

1990

Abstract The quantization of Weyl fermions in the presence of an external nonabelian vector potential is discussed in the case of spacetime dimension (3+1). The hamiltonian approach is used, in the temporal gauge A 0 = 0. In particular, it is explicitly shown how one can lift the action of (an extension of) the group of gauge transformations to the bundle of Fock spaces parametrized by smooth vector potentials.

PhysicsNuclear and High Energy PhysicsWeyl groupSpacetimeHigh Energy Physics::LatticeBRST quantizationFock spacesymbols.namesakeHamiltonian lattice gauge theoryQuantum mechanicsLie algebrasymbolsHamiltonian (quantum mechanics)Mathematical physicsVector potentialPhysics Letters B
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Type I vacuum solutions with aligned Papapetrou fields: an intrinsic characterization

2003

We show that Petrov type I vacuum solutions admitting a Killing vector whose Papapetrou field is aligned with a principal bivector of the Weyl tensor are the Kasner and Taub metrics, their counterpart with timelike orbits and their associated windmill-like solutions, as well as the Petrov homogeneous vacuum solution. We recover all these metrics by using an integration method based on an invariant classification which allows us to characterize every solution. In this way we obtain an intrinsic and explicit algorithm to identify them.

PhysicsWeyl tensorFOS: Physical sciencesStatistical and Nonlinear PhysicsGeneral Relativity and Quantum Cosmology (gr-qc)General Relativity and Quantum CosmologyKilling vector fieldsymbols.namesakeGeneral Relativity and Quantum CosmologyHomogeneoussymbolsInvariant (mathematics)BivectorMathematical PhysicsMathematical physics
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Covariant determination of the Weyl tensor geometry

2001

We give a covariant and deductive algorithm to determine, for every Petrov type, the geometric elements associated with the Weyl tensor: principal and other characteristic 2-forms, Debever null directions and canonical frames. We show the usefulness of these results by applying them in giving the explicit characterization of two families of metrics: static type I spacetimes and type III metrics with a hypersurface-orthogonal Killing vector. PACS numbers: 0240M, 0420C

PhysicsWeyl tensorGeneral Relativity and Quantum CosmologyKilling vector fieldPure mathematicssymbols.namesakePhysics and Astronomy (miscellaneous)Null (mathematics)symbolsCovariant transformationType (model theory)Characterization (mathematics)Classical and Quantum Gravity
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General Relativistic Dynamics of Irrotational Dust: Cosmological Implications

1994

The non--linear dynamics of cosmological perturbations of an irrotational collisionless fluid is analyzed within General Relativity. Relativistic and Newtonian solutions are compared, stressing the different role of boundary conditions in the two theories. Cosmological implications of relativistic effects, already present at second order in perturbation theory, are studied and the dynamical role of the magnetic part of the Weyl tensor is elucidated.

PhysicsWeyl tensorGeneral relativityAstrophysics (astro-ph)Relativistic dynamicsFOS: Physical sciencesGeneral Physics and AstronomyEnergy–momentum relationAstrophysicsCenter of mass (relativistic)symbols.namesakeGeneral Relativity and Quantum CosmologyClassical mechanicssymbolsRelativistic mechanicsRelativistic quantum chemistryRelativistic speed
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On the invariant symmetries of the D-metrics

2007

We analyze the symmetries and other invariant qualities of the $\mathcal{D}$-metrics (type D aligned Einstein Maxwell solutions with cosmological constant whose Debever null principal directions determine shear-free geodesic null congruences). We recover some properties and deduce new ones about their isometry group and about their quadratic first integrals of the geodesic equation, and we analyze when these invariant symmetries characterize the family of metrics. We show that the subfamily of the Kerr-NUT solutions are those admitting a Papapetrou field aligned with the Weyl tensor.

PhysicsWeyl tensorGeodesicNull (mathematics)Statistical and Nonlinear PhysicsCosmological constantType (model theory)General Relativity and Quantum Cosmologysymbols.namesakeHomogeneous spacesymbolsInvariant (mathematics)Isometry groupMathematical PhysicsMathematical physicsJournal of Mathematical Physics
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