Search results for "Mathematics::Commutative Algebra"

showing 10 items of 90 documents

Polynomial identities on superalgebras: Classifying linear growth

2006

Abstract We classify, up to PI-equivalence, the superalgebras over a field of characteristic zero whose sequence of codimensions is linearly bounded. As a consequence we determine the linear functions describing the graded codimensions of a superalgebra.

Discrete mathematicsPolynomialPure mathematicsSequenceAlgebra and Number TheoryMathematics::Commutative AlgebraMathematics::Rings and AlgebrasZero (complex analysis)Field (mathematics)graded polynomial identity T_2-ideal graded codimensionsSuperalgebraSettore MAT/02 - AlgebraMathematics::Quantum AlgebraBounded functionMathematics::Representation TheoryLinear growthMathematicsJournal of Pure and Applied Algebra

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Codimension and colength sequences of algebras and growth phenomena

2015

We consider non necessarily associative algebras over a field of characteristic zero and their polynomial identities. Here we describe some of the results obtained in recent years on the sequence of codimensions and the sequence of colengths of an algebra.

Discrete mathematicsPolynomialPure mathematicsSequenceMathematics::Commutative AlgebraGeneral Mathematics010102 general mathematicsZero (complex analysis)Field (mathematics)Codimension01 natural sciences010101 applied mathematicsSettore MAT/02 - AlgebraComputational Theory and Mathematics0101 mathematicsStatistics Probability and UncertaintyVariety (universal algebra)Algebra over a fieldPolynomial identities Variety Almost nilpotent Codimension.Associative propertyMathematicsSão Paulo Journal of Mathematical Sciences

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On algebras of polynomial codimension growth

2016

Let A be an associative algebra over a field F of characteristic zero and let $$c_n(A), n=1, 2, \ldots $$ , be the sequence of codimensions of A. It is well-known that $$c_n(A), n=1, 2, \ldots $$ , cannot have intermediate growth, i.e., either is polynomially bounded or grows exponentially. Here we present some results on algebras whose sequence of codimensions is polynomially bounded.

Discrete mathematicsPolynomialSequenceMathematics::Commutative AlgebraGeneral Mathematics010102 general mathematicsZero (complex analysis)Field (mathematics)Codimension01 natural sciencesSettore MAT/02 - AlgebraComputational Theory and MathematicsBounded function0103 physical sciencesAssociative algebraPolynomial identities Codimensions Codimension growth010307 mathematical physics0101 mathematicsStatistics Probability and UncertaintyMathematicsSão Paulo Journal of Mathematical Sciences

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Identities of PI-Algebras Graded by a Finite Abelian Group

2011

We consider associative PI-algebras over an algebraically closed field of zero characteristic graded by a finite abelian group G. It is proved that in this case the ideal of graded identities of a G-graded finitely generated PI-algebra coincides with the ideal of graded identities of some finite dimensional G-graded algebra. This implies that the ideal of G-graded identities of any (not necessary finitely generated) G-graded PI-algebra coincides with the ideal of G-graded identities of the Grassmann envelope of a finite dimensional (G × ℤ2)-graded algebra, and is finitely generated as GT-ideal. Similar results take place for ideals of identities with automorphisms.

Discrete mathematicsPure mathematicsAlgebra and Number TheoryMathematics::Commutative AlgebraMathematics::Rings and AlgebrasGraded ringElementary abelian groupGraded Lie algebraFiltered algebraDifferential graded algebraIdeal (ring theory)Abelian groupAlgebraically closed fieldMathematicsCommunications in Algebra

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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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Linear quotients of Artinian Weak Lefschetz algebras

2013

Abstract We study the Hilbert function and the graded Betti numbers for “generic” linear quotients of Artinian standard graded algebras, especially in the case of Weak Lefschetz algebras. Moreover, we investigate a particular property of Weak Lefschetz algebras, the Betti Weak Lefschetz Property, which makes possible to completely determine the graded Betti numbers of a generic linear quotient of such algebras.

Discrete mathematicsPure mathematicsHilbert series and Hilbert polynomialAlgebra and Number TheoryProperty (philosophy)Mathematics::Commutative AlgebraBetti numberBetti Weak Lefschetz PropertyMathematics::Rings and AlgebrasArtinian algebraLinear quotientWeak Lefschetz Propertysymbols.namesakeQuotientWeak Lefschetz; Artinian algebra; QuotientsymbolsWeak Lefschetz Property Artinian algebra Linear quotientLefschetz fixed-point theoremWeak LefschetzMathematics::Symplectic GeometryQuotientMathematics

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Multialternating graded polynomials and growth of polynomial identities

2012

Let G be a finite group and A a finite dimensional G-graded algebra over a field of characteristic zero. When A is simple as a G-graded algebra, by mean of Regev central polynomials we construct multialternating graded polynomials of arbitrarily large degree non vanishing on A. As a consequence we compute the exponential rate of growth of the sequence of graded codimensions of an arbitrary G-graded algebra satisfying an ordinary polynomial identity. In particular we show it is an integer. The result was proviously known in case G is abelian.

Discrete mathematicsPure mathematicsHilbert series and Hilbert polynomialMathematics::Commutative AlgebraApplied MathematicsGeneral MathematicsMathematics::Rings and AlgebrasGraded ringMathematics - Rings and AlgebrasGraded Lie algebramultialternating polynomialFiltered algebrasymbols.namesakeReciprocal polynomialRings and Algebras (math.RA)Differential graded algebraFactorization of polynomialssymbolsFOS: MathematicsElementary symmetric polynomial16R50 16P90 16R10 16W50Mathematics

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Geometric properties of involutive distributions on graded manifolds

1997

AbstractA proof of the relative version of Frobenius theorem for a graded submersion, which includes a very short proof of the standard graded Frobenius theorem is given. Involutive distributions are then used to characterize split graded manifolds over an orientable base, and split graded manifolds whose Batchelor bundle has a trivial direct summand. Applications to graded Lie groups are given.

Discrete mathematicsPure mathematicsMathematics(all)Mathematics::Commutative AlgebraGeneral MathematicsMathematics::Rings and AlgebrasLie groupGraded Lie algebrasymbols.namesakeDifferential graded algebraBundlesymbolsMathematics::Differential GeometryFrobenius theorem (differential topology)MathematicsIndagationes Mathematicae

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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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Identities of *-superalgebras and almost polynomial growth

2015

We study the growth of the codimensions of a *-superalgebra over a field of characteristic zero. We classify the ideals of identities of finite dimensional algebras whose corresponding codimensions are of almost polynomial growth. It turns out that these are the ideals of identities of two algebras with distinct involutions and gradings. Along the way, we also classify the finite dimensional simple *-superalgebras over an algebraically closed field of characteristic zero.

Discrete mathematicsPure mathematicsPolynomialAlgebra and Number TheoryMathematics::Commutative Algebraalmost polynomial growthgraded involution010102 general mathematicsZero (complex analysis)Field (mathematics)010103 numerical & computational mathematics01 natural sciencesMatrix polynomialSquare-free polynomialSimple (abstract algebra)polynomial identity0101 mathematicsAlgebraically closed fieldCharacteristic polynomialMathematics

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