Search results for "Lie Algebra"

showing 10 items of 134 documents

COMPLEX STRUCTURES ON INDECOMPOSABLE 6-DIMENSIONAL NILPOTENT REAL LIE ALGEBRAS

2007

We compute all complex structures on indecomposable 6-dimensional real Lie algebras and their equivalence classes. We also give for each of them a global holomorphic chart on the connected simply connected Lie group associated to the real Lie algebra and write down the multiplication in that chart.

General MathematicsSimple Lie groupReal formMathematics - Rings and Algebras17B30Killing formAffine Lie algebraLie conformal algebraGraded Lie algebraAlgebra53C15Adjoint representation of a Lie algebraRepresentation of a Lie groupRings and Algebras (math.RA)FOS: Mathematics17B30;53C15MathematicsInternational Journal of Algebra and Computation
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Un nouvel invariant des algèbres de Lie et des super-algèbres de Lie quadratiques

2011

In this thesis, we defind a new invariant of quadratic Lie algebras and quadratic Lie superalgebras and give a complete study and classification of singular quadratic Lie algebras and singular quadratic Lie superalgebras, i.e. those for which the invariant does not vanish. The classification is related to adjoint orbits of Lie algebras o(m) and sp(2n). Also, we give an isomorphic characterization of 2-step nilpotent quadratic Lie algebras and quasi-singular quadratic Lie superalgebras for the purpose of completeness. We study pseudo-Euclidean Jordan algebras obtained as double extensions of a quadratic vector space by a one-dimensional algebra and 2-step nilpotent pseudo-Euclidean Jordan al…

Generalized double extensionInvariantPseudo-Eucliean Jordan algebras[ MATH.MATH-GM ] Mathematics [math]/General Mathematics [math.GM]Lie algebra sp(2n)Pas de mot clé en français[MATH.MATH-GM] Mathematics [math]/General Mathematics [math.GM]Symmetric Novikov algebrasSolvable Lie algebrasDouble extensionsQuadratic Lie algebras[MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM]Adjoint orbitsT*-extension2-step nilpotentJordan-admissibleQuadratic Lie superalgebrasLie algebra o(m)
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Topological Hopf Algebras, Quantum Groups and Deformation Quantization

2019

After a presentation of the context and a brief reminder of deformation quantization, we indicate how the introduction of natural topological vector space topologi es on Hopf algebras associated with Poisson Lie groups, Lie bialgebras and their doubles explains their dualities a nd provides a comprehensive framework. Relations with deformation quantization and applications to the deformation quantization of symmetric spaces are described.

Geometric quantizationTopological algebra010308 nuclear & particles physicsCanonical quantizationQuantum group010102 general mathematicsTopologyHopf algebra01 natural sciencesRepresentation theoryLie conformal algebraAdjoint representation of a Lie algebra0103 physical sciences0101 mathematicsMathematics
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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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Cohomology of Filippov algebras and an analogue of Whitehead's lemma

2009

We show that two cohomological properties of semisimple Lie algebras also hold for Filippov (n-Lie) algebras, namely, that semisimple n-Lie algebras do not admit non-trivial central extensions and that they are rigid i.e., cannot be deformed in Gerstenhaber sense. This result is the analogue of Whitehead's Lemma for Filippov algebras. A few comments about the n-Leibniz algebras case are made at the end.

High Energy Physics - TheoryHistoryLemma (mathematics)Pure mathematicsMathematics::Dynamical SystemsMathematics::Rings and AlgebrasFOS: Physical sciencesMathematical Physics (math-ph)Mathematics - Rings and AlgebrasMathematics::Algebraic TopologyCohomologyComputer Science ApplicationsEducationHigh Energy Physics - Theory (hep-th)Rings and Algebras (math.RA)Mathematics::K-Theory and HomologyWhitehead's lemmaMathematics::Quantum AlgebraLie algebraFOS: MathematicsMathematical PhysicsMathematicsJournal of Physics: Conference Series
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Topics on n-ary algebras

2011

We describe the basic properties of two n-ary algebras, the Generalized Lie Algebras (GLAs) and, particularly, the Filippov (or n-Lie) algebras (FAs), and comment on their n-ary Poisson counterparts, the Generalized Poisson (GP) and Nambu-Poisson (N-P) structures. We describe the Filippov algebra cohomology relevant for the central extensions and infinitesimal deformations of FAs. It is seen that semisimple FAs do not admit central extensions and, moreover, that they are rigid. This extends the familiar Whitehead's lemma to all $n\geq 2$ FAs, n=2 being the standard Lie algebra case. When the n-bracket of the FAs is no longer required to be fully skewsymmetric one is led to the n-Leibniz (or…

High Energy Physics - TheoryHistoryPure mathematicsAnticommutativityAlgebraic structureInfinitesimalFOS: Physical sciencesEducationQuantitative Biology::Subcellular ProcessesMathematics::K-Theory and HomologySimple (abstract algebra)Mathematics - Quantum AlgebraLie algebraFOS: MathematicsQuantum Algebra (math.QA)Mathematical PhysicsMathematicsLemma (mathematics)Quantitative Biology::Molecular NetworksMathematics::Rings and AlgebrasMathematical Physics (math-ph)Mathematics - Rings and AlgebrasCohomologyComputer Science ApplicationsBracket (mathematics)High Energy Physics - Theory (hep-th)Rings and Algebras (math.RA)Journal of Physics: Conference Series
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Mapping the geometry of the F(4) group.

2007

In this paper we present a construction of the compact form of the exceptional Lie group F4 by exponentiating the corresponding Lie algebra f4. We realize F4 as the automorphisms group of the exceptional Jordan algebra, whose elements are 3 x 3 hermitian matrices with octonionic entries. We use a parametrization which generalizes the Euler angles for SU(2) and is based on the fibration of F4 via a Spin(9) subgroup as a fiber. This technique allows us to determine an explicit expression for the Haar invariant measure on the F4 group manifold. Apart from shedding light on the structure of F4 and its coset manifold OP2=F4/Spin(9), the octonionic projective plane, these results are a prerequisi…

High Energy Physics - TheoryJordan algebraGroup (mathematics)General MathematicsGeneral Physics and AstronomyLie groupFOS: Physical sciencesGeometryMathematical Physics (math-ph)AutomorphismHigh Energy Physics - Theory (hep-th)22E70Lie algebraCoset22E46Projective planeSpecial unitary groupMathematical PhysicsMathematics22E46; 22E70
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The Schouten - Nijenhuis bracket, cohomology and generalized Poisson structures

1996

Newly introduced generalized Poisson structures based on suitable skew-symmetric contravariant tensors of even order are discussed in terms of the Schouten-Nijenhuis bracket. The associated `Jacobi identities' are expressed as conditions on these tensors, the cohomological contents of which is given. In particular, we determine the linear generalized Poisson structures which can be constructed on the dual spaces of simple Lie algebras.

High Energy Physics - TheoryMathematics - Differential GeometryPhysicsPure mathematicsSchouten–Nijenhuis bracketFOS: Physical sciencesGeneral Physics and AstronomyOrder (ring theory)Statistical and Nonlinear PhysicsPoisson distributionCohomologysymbols.namesakeBracket (mathematics)High Energy Physics - Theory (hep-th)Differential Geometry (math.DG)Simple (abstract algebra)Mathematics - Quantum AlgebraLie algebraFOS: MathematicssymbolsCovariance and contravariance of vectorsQuantum Algebra (math.QA)Mathematics::Symplectic GeometryMathematical PhysicsJournal of Physics A: Mathematical and General
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Algebra Structures on Hom(C,L)

1999

info:eu-repo/semantics/published

High Energy Physics - TheoryNon-associative algebraFOS: Physical sciencesUniversal enveloping algebra01 natural sciencesGraded Lie algebraMathematics::K-Theory and HomologyMathematics::Category TheoryMathematics::Quantum Algebra0103 physical sciencesMathematics - Quantum AlgebraFOS: MathematicsQuantum Algebra (math.QA)0101 mathematicsMathematicsAlgebra and Number TheoryQuantum groupPhysique010102 general mathematicsSubalgebraMathematics::Rings and AlgebrasLie conformal algebraAlgebraLie coalgebraHigh Energy Physics - Theory (hep-th)Algebra representation010307 mathematical physics
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Hidden supersymmetries in supersymmetric quantum mechanics

2001

We discuss the appearance of additional, hidden supersymmetries for simple 0+1 $Ad(G)$-invariant supersymmetric models and analyse some geometrical mechanisms that lead to them. It is shown that their existence depends crucially on the availability of odd order invariant skewsymmetric tensors on the (generic) compact Lie algebra $\cal G$, and hence on the cohomology properties of the Lie algebra considered.

High Energy Physics - TheoryPhysicsNuclear and High Energy PhysicsTheoretical physicsHigh Energy Physics - Theory (hep-th)Simple (abstract algebra)Lie algebraCompact Lie algebraFOS: Physical sciencesOrder (ring theory)Supersymmetric quantum mechanicsInvariant (mathematics)CohomologyNuclear Physics B
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