Search results for "REPRESENTATION"

showing 10 items of 1710 documents

Codimensions of algebras and growth functions

2008

Abstract Let A be an algebra over a field F of characteristic zero and let c n ( A ) , n = 1 , 2 , … , be its sequence of codimensions. We prove that if c n ( A ) is exponentially bounded, its exponential growth can be any real number >1. This is achieved by constructing, for any real number α > 1 , an F-algebra A α such that lim n → ∞ c n ( A α ) n exists and equals α. The methods are based on the representation theory of the symmetric group and on properties of infinite Sturmian and periodic words.

Mathematics(all)SequenceGeneral MathematicsZero (complex analysis)polynomial identity codimension growthPI-algebrasCombinatoricsRepresentation theory of the symmetric groupExponential growthBounded functionCodimension growthAlgebra over a fieldMathematicsReal numberAdvances in Mathematics
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Coprime actions and correspondences of Brauer characters

2017

We prove several results giving substantial evidence in support of the conjectural existence of a Glauberman–Isaacs bijection for Brauer characters under a coprime action. We also discuss related bijections for the McKay conjecture.

Mathematics::CombinatoricsConjectureCoprime integersGeneral Mathematics010102 general mathematics01 natural sciencesCombinatoricsMathematics::Group TheoryMathematics::Algebraic GeometryAction (philosophy)0103 physical sciencesBijection010307 mathematical physics0101 mathematicsMathematics::Representation TheoryBijection injection and surjectionMathematicsProceedings of the London Mathematical Society
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Anisotropy and symmetry for elastic properties of laminates reinforced by balanced fabrics

2001

In this article, we present a theoretical study on elastic properties of laminates composed by balanced fabric layers. Using the polar representation method for plane elastic tensors, we first describe some properties of symmetry of a general laminate composed by balanced fabrics and we write the formulas expressing positions of its axes of symmetry. Then, limiting our study to laminates composed of identical plies, we solve two problems of symmetry of the laminate elastic tensors: uncoupling and quasi-homogeneity. We found all the solutions of the uncoupling problem for the case of 3-, 4- and 5-ply laminate and all those of the quasi-homogeneity problem for the case of 4-, 5- and 6-ply lam…

Mathematics::Dynamical SystemsMaterials sciencePlane (geometry)Cauchy stress tensorMarsaglia polar methodLimitingMathematics::Geometric TopologySymmetry (physics)Mechanics of MaterialsCeramics and CompositesPolar coordinate systemComposite materialAnisotropyRepresentation (mathematics)Composites Part A: Applied Science and Manufacturing
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Unbounded C*-seminorms, biweights and *-representations of partial *-algebras: a review

2006

The notion of (unbounded) C*-seminorms plays a relevant role in the representation theory of *-algebras and partial *-algebras. A rather complete analysis of the case of *-algebras has given rise to a series of interesting concepts like that of semifinite C*-seminorm and spectral C*-seminorm that give information on the properties of *-representations of the given *-algebra A and also on the structure of the *-algebra itself, in particular when A is endowed with a locally convex topology. Some of these results extend to partial *-algebras too. The state of the art on this topic is reviewed in this paper, where the possibility of constructing unbounded C*-seminorms from certain families of p…

Mathematics::Functional AnalysisMathematics::Operator Algebraslcsh:MathematicsMathematics::Representation Theorylcsh:QA1-939
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On Almost Nilpotent Varieties of Linear Algebras

2020

A variety \(\mathcal {V}\) is almost nilpotent if it is not nilpotent but all proper subvarieties are nilpotent. Here we present the results obtained in recent years about almost nilpotent varieties and their classification.

Mathematics::Group TheoryNilpotentPure mathematicsVarietiesMathematics::Rings and AlgebrasCodimension growthVariety (universal algebra)Mathematics::Representation TheoryAlmost nilpotentMathematics
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CHEVALLEY COHOMOLOGY FOR KONTSEVICH'S GRAPHS

2005

We introduce the Chevalley cohomology for the graded Lie algebra of polyvector fields on $R^d$. This cohomology occurs naturally in the problem of construction and classification of fomalities on the sapce $ R^d$. Considering only graphs formalities, we define the Chevalley cohomology directly on spaces of graphs. We obtain some simple expressions for the Chevalley coboundary operator and we give examples and applications.

Mathematics::K-Theory and Homology[MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph]Mathematics::Quantum AlgebraMathematics::Rings and Algebras[ MATH.MATH-MP ] Mathematics [math]/Mathematical Physics [math-ph][MATH.MATH-MP] Mathematics [math]/Mathematical Physics [math-ph]Mathematics::Representation TheoryMathematics::Algebraic Topology
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On algebraic supergroups, coadjoint orbits and their deformations

2004

In this paper we study algebraic supergroups and their coadjoint orbits as affine algebraic supervarieties. We find an algebraic deformation quantization of them that can be related to the fuzzy spaces of non-commutative geometry.

Mathematics::Quantum AlgebraFísicaMathematics::Representation TheoryComputer Science::Databases
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Contractions yielding new supersymmetric extensions of the poincaré algebra

1991

Two new Poincare superalgebras are analysed. They are obtained by the Wigner-Inonu contraction from two real forms of the superalgebra OSp(2;4;C) - one describing the N = 2 anti-de-Sitter superalgebra with a non-compact internal symmetry SO(1, 1) and the other corresponding to the de-Sitter superalgebra with internal symmetry SO(2). Both are 19-dimensional self-conjugate extensions of the Konopel'chenko superalgebra. They contain 10 Poincare generators and one generator of internal symmetry in addition to 8 odd generators half of which, however, do not commute with translations.

Mathematics::Rings and AlgebrasStatistical and Nonlinear PhysicsLie superalgebraSupersymmetrySuperalgebraGenerator (circuit theory)Algebrasymbols.namesakeMathematics::Quantum AlgebraPoincaré conjecturesymbolsSupermatrixQuantum field theoryAlgebra over a fieldMathematics::Representation TheoryMathematical PhysicsMathematicsReports on Mathematical Physics
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BMaD – A Boolean Matrix Decomposition Framework

2014

Boolean matrix decomposition is a method to obtain a compressed representation of a matrix with Boolean entries. We present a modular framework that unifies several Boolean matrix decomposition algorithms, and provide methods to evaluate their performance. The main advantages of the framework are its modular approach and hence the flexible combination of the steps of a Boolean matrix decomposition and the capability of handling missing values. The framework is licensed under the GPLv3 and can be downloaded freely at http://projects.informatik.uni-mainz.de/bmad.

Matrix (mathematics)Theoretical computer scienceAnd-inverter graphBoolean circuitDecomposition (computer science)Logical matrixCircuit minimization for Boolean functionsRepresentation (mathematics)Standard Boolean modelMathematics
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Maupassants Erzählung ‚La Petite Roque‘: Verschobene Innensichten vor dem Gattungshintergrund der Cause Célèbre

2017

Interdiscplinary analysis of Maupassant's short story "La Petite Roque" in the context of 19th and early 20th century crime literature (causes célèbres). The article focuses on questions of subjectivity, desire and respresentation.

Maupassant Cause Célèbre literature crime subjectivity representation desire 19th centurySettore L-LIN/03 - Letteratura Francese
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