Search results for "Commutator"

showing 10 items of 37 documents

Do metric independent classical actions lead to topological field theories?

1991

Abstract We investigate the quantum theory of non-abelian BF -systems (gauge theories with the classical metric independent action ∫ tr BF A ). The fact that due to a complicated (on-shell reducible) gauge structure the quantum action of these theories does not differ only by a BRST commutator from the classical action, and that moreover the BRST operator turns out to be metric dependent, renders the standard arguments for metric independence inapplicable. We establish the topological nature of these models and argue that in gauge theories the information on gauge invariance is contained entirely in the metric independent part of the BRST operator. We make some general remarks on the relati…

PhysicsHigh Energy Physics::TheoryNuclear and High Energy PhysicsCommutatorQuantum gauge theoryOperator (physics)Metric (mathematics)Structure (category theory)Gauge theoryTopologyBRST quantizationGauge fixingPhysics Letters B

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On the Leibniz bracket, the Schouten bracket and the Laplacian

2003

International audience; The Leibniz bracket of an operator on a (graded) algebra is defined and some of its properties are studied. A basic theorem relating the Leibniz bracket of the commutator of two operators to the Leibniz bracket of them is obtained. Under some natural conditions, the Leibniz bracket gives rise to a (graded) Lie algebra structure. In particular, those algebras generated by the Leibniz bracket of the divergence and the Laplacian operators on the exterior algebra are considered, and the expression of the Laplacian for the product of two functions is generalized for arbitrary exterior forms.

PhysicsPure mathematicsCommutatorMathematics::History and OverviewMathematics::Rings and AlgebrasStructure (category theory)FOS: Physical sciencesStatistical and Nonlinear PhysicsGeneral Relativity and Quantum Cosmology (gr-qc)General Relativity and Quantum CosmologyOperator (computer programming)Bracket (mathematics)Nonlinear Sciences::Exactly Solvable and Integrable SystemsProduct (mathematics)Mathematics::Quantum AlgebraLie algebra[PHYS.ASTR]Physics [physics]/Astrophysics [astro-ph]Laplace operatorExterior algebraMathematics::Symplectic GeometryMathematical Physics

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A Characterization of the Class of Finite Groups with Nilpotent Derived Subgroup

2002

The class of all finite groups with nilpotent commutator subgroup is characterized as the largest subgroup-closed saturated formation 𝔉 for which the 𝔉-residual of a group generated by two 𝔉-subnormal subgroups is the subgroup generated by their 𝔉–residuals.

Normal subgroupDiscrete mathematicsMathematics::Group TheoryPure mathematicsMaximal subgroupGeneral MathematicsCommutator subgroupOmega and agemo subgroupNilpotent groupCharacteristic subgroupCentral seriesFitting subgroupMathematicsMathematische Nachrichten

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Commutators, C0-semigroups and resolvent estimates

2004

Abstract We study the existence and the continuity properties of the boundary values on the real axis of the resolvent of a self-adjoint operator H in the framework of the conjugate operator method initiated by Mourre. We allow the conjugate operator A to be the generator of a C 0 -semigroup (finer estimates require A to be maximal symmetric) and we consider situations where the first commutator [ H ,i A ] is not comparable to H . The applications include the spectral theory of zero mass quantum field models.

Spectral theoryC0- semigroupsSemigroupOperator (physics)Mathematical analysisSpectrum (functional analysis)Commutator (electric)Resolvent formalismMourre estimatelaw.inventionResolvent estimateslawHermitian adjointPositive commutatorsBoundary values of resolvent familiesConjugate operatorVirial theoremAnalysisMathematicsResolventJournal of Functional Analysis

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Additivity of the Equationally-Defined Commutator and Relatively Congruence-Distributive Subquasivarieties

2015

Pure mathematicsDistributive propertylawAdditive functionSemiprimeCongruence (manifolds)Commutator (electric)Mathematicslaw.invention

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On the spectrum of linear combinations of two projections inC*-algebras

2010

In this note, we study the spectrum and give estimations for the spectral radius of linear combinations of two projections in C*-algebras. We also study the commutator of two projections.

CombinatoricsCommutatorAlgebra and Number TheorySpectral radiusSpectrum (functional analysis)IdempotenceLinear combinationProjection (linear algebra)MathematicsLinear and Multilinear Algebra

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The action of a compact Lie group on nilpotent Lie algebras of type {{n,2}}

2015

Abstract We classify finite-dimensional real nilpotent Lie algebras with 2-dimensional central commutator ideals admitting a Lie group of automorphisms isomorphic to SO 2 ⁢ ( ℝ ) ${{\mathrm{SO}}_{2}(\mathbb{R})}$ . This is the first step to extend the class of nilpotent Lie algebras 𝔥 ${{\mathfrak{h}}}$ of type { n , 2 } ${\{n,2\}}$ to solvable Lie algebras in which 𝔥 ${{\mathfrak{h}}}$ has codimension one.

pair of alternating formsPure mathematicsClass (set theory)General MathematicsGroup Theory (math.GR)010103 numerical & computational mathematicsType (model theory)01 natural sciencesMathematics::Group TheoryTermészettudományokLie algebraFOS: MathematicsMatematika- és számítástudományok0101 mathematicsNilpotent Lie algebraMathematicsCommutatorApplied Mathematics010102 general mathematicsLie groupCodimensionAutomorphismNilpotent17B05 17B30 15A63&nbspSettore MAT/03 - GeometriaMathematics - Group TheoryForum Mathematicum

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Character sums and double cosets

2008

Abstract If G is a p-solvable finite group, P is a self-normalizing Sylow p-subgroup of G with derived subgroup P ′ , and Ψ is the sum of all the irreducible characters of G of degree not divisible by p, then we prove that the integer Ψ ( P ′ z P ′ ) is divisible by | P | for all z ∈ G . This answers a question of J. Alperin.

Discrete mathematicsFinite groupAlgebra and Number TheoryDegree (graph theory)Character theorySylow theoremsCommutator subgroupFinite groupsCombinatoricsCharacter (mathematics)IntegerDouble cosetsCosetCharacter theoryMcKay conjectureMathematicsJournal of Algebra

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A characteristic subgroup and kernels of Brauer characters

2005

If G is finite group and P is a Sylow p-subgroup of G, we prove that there is a unique largest normal subgroup L of G such that L ⋂ P = L ⋂ NG (P). If G is p-solvable, then L is the intersection of the kernels of the irreducible Brauer characters of G of degree not divisible by p.

Normal subgroupCombinatoricsMaximal subgroupTorsion subgroupBrauer's theorem on induced charactersGeneral MathematicsSylow theoremsCommutator subgroupCharacteristic subgroupFitting subgroupMathematicsBulletin of the Australian Mathematical Society

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The Equationally-Defined Commutator in Quasivarieties Generated by Two-Element Algebras

2018

The notion of the equationally-defined commutator was introduced and thoroughly investigated in (Czelakowski, 2015). In this work the properties of the equationally-defined commutator in quasivarieties generated by two-element algebras are examined. It is proved: If a quasivariety Q is generated by a finite set of two-element algebras, then the equationally-defined commutator of Q is additive (Theorem 3.1) Moreover it satisfies the associativity law (Theorem 3.6). The second result is strengthened if the quasivariety is generated by a single two-element algebra 2: If Q = SP(2), then the equationally-defined commutator of Q universally validates one of the following laws: [x,y] = x^y or [x,y…

quasivarietycongruencecommutator equationconsequence operationthe equationally-defined commutator

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