Search results for "Presentation"

showing 10 items of 2405 documents

Group graded algebras and multiplicities bounded by a constant

2013

AbstractLet G be a finite group and A a G-graded algebra over a field of characteristic zero. When A is a PI-algebra, the graded codimensions of A are exponentially bounded and one can study the corresponding graded cocharacters via the representation theory of products of symmetric groups. Here we characterize in two different ways when the corresponding multiplicities are bounded by a constant.

Discrete mathematicsPure mathematicsFinite groupAlgebra and Number TheoryMathematics::Commutative AlgebraGroup (mathematics)Zero (complex analysis)Polynomial identities Graded algebras cocharactersRepresentation theorySettore MAT/02 - AlgebraSymmetric groupBounded functionAlgebra over a fieldConstant (mathematics)MathematicsJournal of Pure and Applied Algebra
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A Decomposition of Henstock-Kurzweil-Pettis Integrable Multifunctions

2009

We proved in our earlier paper [9] that in case of separable Banach space-valued multifunctions each Henstock-Kurzweil-Pettis integrable multifunction can be represented as a sum of one of its Henstock-Kurzweil-Pettis integrable selectors and a Pettis integrable multifunction. Now, we prove that the same result can be achieved in case of an arbitrary Banach space. Applying the representation theorem we describe the multipliers of the Henstock-Kurzweil-Pettis integrable multifunctions. Then we use this description to obtain a characterization of the Henstock-Kurzweil-Pettis integrability in terms of subadditive operators.

Discrete mathematicsPure mathematicsIntegrable systemRepresentation theoremSubadditivityBanach spaceDecomposition (computer science)Characterization (mathematics)MathematicsSeparable space
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Algebras with involution with linear codimension growth

2006

AbstractWe study the ∗-varieties of associative algebras with involution over a field of characteristic zero which are generated by a finite-dimensional algebra. In this setting we give a list of algebras classifying all such ∗-varieties whose sequence of ∗-codimensions is linearly bounded. Moreover, we exhibit a finite list of algebras to be excluded from the ∗-varieties with such property. As a consequence, we find all possible linearly bounded ∗-codimension sequences.

Discrete mathematicsPure mathematicsJordan algebraAlgebra and Number TheoryNon-associative algebraSubalgebraQuadratic algebra∗-CodimensionsSettore MAT/02 - AlgebraInterior algebra*-polynomial identity T*-ideal *-codimensions.∗-Polynomial identityT∗-idealDivision algebraAlgebra representationNest algebraMathematics
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Finite-dimensional non-associative algebras and codimension growth

2011

AbstractLet A be a (non-necessarily associative) finite-dimensional algebra over a field of characteristic zero. A quantitative estimate of the polynomial identities satisfied by A is achieved through the study of the asymptotics of the sequence of codimensions of A. It is well known that for such an algebra this sequence is exponentially bounded.Here we capture the exponential rate of growth of the sequence of codimensions for several classes of algebras including simple algebras with a special non-degenerate form, finite-dimensional Jordan or alternative algebras and many more. In all cases such rate of growth is integer and is explicitly related to the dimension of a subalgebra of A. One…

Discrete mathematicsPure mathematicsJordan algebraApplied MathematicsJordan algebraNon-associative algebraSubalgebraUniversal enveloping algebraPolynomial identityExponential growthCodimensionsPolynomial identityCodimensionsExponential growthJordan algebraQuadratic algebraAlgebra representationDivision algebraCellular algebraPOLINÔMIOSMathematicsAdvances in Applied Mathematics
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Varieties of almost polynomial growth: classifying their subvarieties

2007

Let G be the infinite dimensional Grassmann algebra over a field F of characteristic zero and UT2 the algebra of 2 x 2 upper triangular matrices over F. The relevance of these algebras in PI-theory relies on the fact that they generate the only two varieties of almost polynomial growth, i.e., they grow exponentially but any proper subvariety grows polynomially. In this paper we completely classify, up to PI-equivalence, the associative algebras A such that A is an element of Var(G) or A is an element of Var(UT2).

Discrete mathematicsPure mathematicsJordan algebraCODIMENSION GROWTHSubvarietyGeneral MathematicsTriangular matrixUniversal enveloping algebraIDENTITIESPI-ALGEBRASAlgebra representationDivision algebraCellular algebraComposition algebraT-IDEALSMathematics
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Matrix algebras of polynomial codimension growth

2007

We study associative algebras with unity of polynomial codimension growth. For any fixed degree $k$ we construct associative algebras whose codimension sequence has the largest and the smallest possible polynomial growth of degree $k$. We also explicitly describe the identities and the exponential generating functions of these algebras.

Discrete mathematicsPure mathematicsJordan algebraGeneral MathematicsNon-associative algebraSubalgebraUniversal enveloping algebraCodimensionMatrix polynomialQuadratic algebraSettore MAT/02 - AlgebraAlgebra representationpolynomial identity codimensions growthMathematics
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The Riesz Representation Theorem and Extension of Vector Valued Additive Measures

2001

Discrete mathematicsPure mathematicsM. Riesz extension theoremRiesz representation theoremKelvin–Stokes theoremRiesz potentialApplied MathematicsBanach spaceExtension (predicate logic)Characterization (mathematics)AnalysisMathematicsJournal of Mathematical Analysis and Applications
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A characterization of the Schur property through the disk algebra

2017

[EN] In this paper we give a new characterization of when a Banach space E has the Schur property in terms of the disk algebra. We prove that E has the Schur property if and only if A(D, E) = A(D,E-w). (C) 2016 Elsevier Inc. All rights reserved.

Discrete mathematicsPure mathematicsMathematics::CombinatoricsBanach spaceApplied Mathematics010102 general mathematicsSchur's lemmaSchur algebra01 natural sciencesSchur's theoremSchur polynomialSchur propertySchur decomposition0103 physical sciencesSchur complement010307 mathematical physics0101 mathematicsDisk algebraMathematics::Representation TheoryMATEMATICA APLICADAAnalysisDisk algebraMathematicsSchur product theorem
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A note on strongly Lie nilpotency

1991

In this note the authors studies strongly Lie nilpotent rings and proves that if a ringR is strongly Lie nilpotent thenR(2), the ideal generated by all commutators, is nilpotent.

Discrete mathematicsPure mathematicsMathematics::Commutative AlgebraGeneral MathematicsSimple Lie groupMathematics::Rings and AlgebrasAdjoint representationCentral seriesMathematics::Group TheoryNilpotentIdeal (ring theory)Algebra over a fieldNilpotent groupMathematics::Representation TheoryMathematicsRendiconti del Circolo Matematico di Palermo
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A general concept of fuzzy connectives, negations and implications based on t-norms and t-conorms

1983

All known connectives 'and'/'or' for fuzzy sets or some classes can be introduced as t-norms/t-conorms, where Ling's representation theorem is used as a basic tool, and which is illustrated by various known and new examples (Section 2). Given a strict negation function and one connective, the other can be constructed, so that the corresponding De Morgan law is valid. In case of given Archimedean connectives, there can be constructed negation functions (Section 3). Given a non-strict Archimedean connective, a negation function and the other connective can be constructed, so that in addition to the De Morgan laws, the excluded middle law and the law of non-contradiction are valid, i.e. the ne…

Discrete mathematicsPure mathematicsRepresentation theoremLogicLaw of excluded middleFuzzy setT-normType (model theory)De Morgan's lawssymbols.namesakeNegationArtificial IntelligencesymbolsComplement (set theory)MathematicsFuzzy Sets and Systems
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