Search results for "Star product"

showing 9 items of 9 documents

Closedness of Star Products and Cohomologies

1994

We first review the introduction of star products in connection with deformations of Poisson brackets and the various cohomologies that are related to them. Then we concentrate on what we have called “closed star products” and their relations with cyclic cohomology and index theorems. Finally we shall explain how quantum groups, especially in their recent topological form, are in essence examples of star products.

PhysicsPure mathematicsPoisson bracketMathematics::K-Theory and HomologyStar productQuantum groupCyclic homologyAstrophysics::Solar and Stellar AstrophysicsStar (graph theory)Hopf algebraAstrophysics::Galaxy AstrophysicsSymplectic manifoldConnection (mathematics)
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Analytic vectors, anomalies and star representations

1989

It is hinted that anomalies are not really anomalous since (at least in characteristic examples) they can be related to a lack of common analytic vectors for the Hamiltonian and the observables. We reanalyze the notions of analytic vectors and of local representations of Lie algebras in this light, and show how the notion of preferred observables introduced in the deformation (star product) approach to quantization may help give an anomaly-free formulation to physical problems. Finally, some remarks are made concerning the applicability of these considerations to field theory, especially in two dimensions.

Algebrasymbols.namesakeTheoretical physicsQuantization (physics)Star productLie algebrasymbolsComplex systemStatistical and Nonlinear PhysicsObservableHamiltonian (quantum mechanics)Mathematical PhysicsMathematicsLetters in Mathematical Physics
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A Comparison between Star Products on Regular Orbits of Compact Lie Groups

2001

In this paper an algebraic star product and differential one defined on a regular coadjoint orbit of a compact semisimple group are compared. It is proven that there is an injective algebra homomorphism between the algebra of polynomials with the algebraic star product and the algebra of differential functions with the differential star product structure.

High Energy Physics - TheoryAlgebra homomorphismPure mathematicsGroup (mathematics)Structure (category theory)FOS: Physical sciencesGeneral Physics and AstronomyLie groupFísicaStatistical and Nonlinear PhysicsAstrophysics::Cosmology and Extragalactic AstrophysicsStar (graph theory)High Energy Physics - Theory (hep-th)Star productMathematics - Quantum AlgebraFOS: MathematicsQuantum Algebra (math.QA)Astrophysics::Solar and Stellar AstrophysicsAstrophysics::Earth and Planetary AstrophysicsOrbit (control theory)Mathematical PhysicsDifferential (mathematics)Astrophysics::Galaxy AstrophysicsMathematics
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Application of the star-product method to the angular momentum quantization

1992

We define a *-product on ℝ3 and solve the polarization equation f*C=0 where C is the Casimir of the coadjoint representation of SO(3). We compute the action of SO(3) on the space of solutions. We then examine the case of non-zero eigenvalues of C, in order to find finite-dimensional representations of SO(3). Finally, we compute \(\sqrt C *\sqrt C \) as an asymptotic series of C. This gives an explanation of the use of the star square root of C in a paper by Bayen et al. instead of its natural square root.

Casimir effectAngular momentumQuantization (physics)Coadjoint representationSquare rootStar productStatistical and Nonlinear PhysicsGeometryAsymptotic expansionMathematical PhysicsEigenvalues and eigenvectorsMathematicsMathematical physicsLetters in Mathematical Physics
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Quantum Groups, Star Products and Cyclic Cohomology

1993

After some historical remarks, we start with a rapid overview of the star-product theory (deformation of algebras of functions on phase space) and its applications to deformation-quantization. We then concentrate on Poisson-Lie groups and their “quantization”, give a star-product realization of quantum groups and discuss uniqueness and the rigidity as bialgebra of a universal model for the quantum SL(2) groups. In the last part we develop the notion of closed star-product (for which a trace can be defined on the algebra), show that it is classified by cyclic cohomology, permits to define a character and that there always exists one; finally we show that the pseudodifferential calculus on a …

AlgebraStar productPhase spaceCyclic homologyUniquenessRiemannian manifoldQuantumAtiyah–Singer index theoremMathematicsBialgebra
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A star product on the spherical harmonics

1996

We explicitly define a star product on the spherical harmonics using the Moyal star product on ℝ6, and a polarization equation allowing its restriction on S2.

Mathematical analysisZonal spherical harmonicsA* search algorithmSpherical harmonicsStatistical and Nonlinear PhysicsAstrophysics::Cosmology and Extragalactic AstrophysicsPolarization (waves)law.inventionStar productlawSpin-weighted spherical harmonicsAstrophysics::Solar and Stellar AstrophysicsVector spherical harmonicsAstrophysics::Earth and Planetary AstrophysicsAstrophysics::Galaxy AstrophysicsMathematical PhysicsMathematicsSolid harmonicsLetters in Mathematical Physics
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Algebraic and Differential Star Products on Regular Orbits of Compact Lie Groups

2000

In this paper we study a family of algebraic deformations of regular coadjoint orbits of compact semisimple Lie groups with the Kirillov Poisson bracket. The deformations are restrictions of deformations on the dual of the Lie algebra. We prove that there are non isomorphic deformations in the family. The star products are not differential, unlike the star products considered in other approaches. We make a comparison with the differential star product canonically defined by Kontsevich's map.

High Energy Physics - TheoryGeneral MathematicsSimple Lie groupLie groupFOS: Physical sciencesRepresentation theoryLie Grups deAlgebraPoisson bracketCompact groupHigh Energy Physics - Theory (hep-th)Star productMathematics::Quantum AlgebraMathematics - Quantum AlgebraLie algebraFOS: MathematicsQuantum Algebra (math.QA)Astrophysics::Earth and Planetary AstrophysicsÀlgebraDifferential (mathematics)Mathematics
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Deformation Quantization by Moyal Star-Product and Stratonovich Chaos

2012

We make a deformation quantization by Moyal star-product on a space of functions endowed with the normalized Wick product and where Stratonovich chaos are well defined.

Stratonovich chaoswhite noise analysisMoyal productQuantization (signal processing)lcsh:MathematicsDeformation (meteorology)Space (mathematics)Connes algebralcsh:QA1-939CHAOS (operating system)Mathematics::ProbabilityStar productMathematics - Quantum AlgebraMoyal productMathematics::Mathematical PhysicsGeometry and TopologyWick productMathematical PhysicsAnalysisMoyal bracketMathematics - ProbabilityMathematical physicsMathematics
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A star product in lattice gauge theory

1993

Abstract We consider a variant of the cup product of simplicial cochains and its applications in discrete formulations of non-abelian gauge theory. The standard geometrical ingredients in the continuum theory all have natural analogues on a simplicial complex when this star product is used to translate the wedge product of differential forms. Although the star product is non-associative, it is graded-commutative, and the coboundary operator acts as a deviation on the star algebra. As such, it is reminiscent of the star product considered in some approaches to closed string field theory, and we discuss applications to the three dimensional non-abelian Chern-Simons theory.

PhysicsNuclear and High Energy PhysicsTheoretical physicsSimplicial complexDifferential formStar productCup productProduct (mathematics)Quantum mechanicsString field theoryExterior algebraGeneral Theoretical PhysicsDirect productPhysics Letters B
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