Search results for " symmetric"

showing 10 items of 78 documents

Fourier series for elliptic integrals and some generalizations via hypergeometric series

2008

Fourier series are derived for generalizations of the three canonical Legendre incomplete elliptic integrals using a hypergeometric series approach. The Fourier series for the incomplete Epstein–Hubbell integrals are obtained as special cases of the generalization of the Legendre integrals of the first and second kinds. The Fourier series for the integrals of the first and second kinds, and those for the Epstein–Hubbell integrals, were obtained recently using a different approach, but the series obtained for the generalization of the incomplete integral of the third kind is new. All cases of the integral of the third kind are given, with the modulus and the parameter being complex variables…

Carlson symmetric formBasic hypergeometric seriesPure mathematicsLegendre formAppell seriesBilateral hypergeometric seriesApplied MathematicsMathematical analysisConjugate Fourier seriesGeneralized hypergeometric functionFourier seriesAnalysisMathematicsIntegral Transforms and Special Functions
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Indefinite integrals of incomplete elliptic integrals from Jacobi elliptic functions

2017

Integration formulas are derived for the three canonical Legendre elliptic integrals. These formulas are obtained from the differential equations satified by these elliptic integrals when the indep...

Carlson symmetric formPure mathematicsQuarter periodApplied Mathematics010102 general mathematicsMathematical analysisElliptic function010103 numerical & computational mathematics01 natural sciencesJacobi elliptic functionsLegendre formArithmetic–geometric meanElliptic rational functionsElliptic integral0101 mathematicsAnalysisMathematicsIntegral Transforms and Special Functions
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Indefinite integrals involving the Jacobi Zeta and Heuman Lambda functions

2017

ABSTRACTJacobian elliptic functions are used to obtain formulas for deriving indefinite integrals for the Jacobi Zeta function and Heuman's Lambda function. Only sample results are presented, mostly obtained from powers of the twelve Glaisher elliptic functions. However, this sample includes all such integrals in the literature, together with many new integrals. The method used is based on the differential equations obeyed by these functions when the independent variable is the argument u of elliptic function theory. The same method was used recently, in a companion paper, to derive similar integrals for the three canonical incomplete elliptic integrals.

Carlson symmetric formPure mathematicsQuarter periodApplied Mathematics010102 general mathematicsMathematical analysisElliptic functionTrigonometric integral010103 numerical & computational mathematics01 natural sciencesJacobi elliptic functionsLegendre formElliptic rational functionsElliptic integral0101 mathematicsAnalysisMathematicsIntegral Transforms and Special Functions
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Degrees of irreducible characters of the symmetric group and exponential growth

2015

We consider sequences of degrees of ordinary irreducible S n S_n - characters. We assume that the corresponding Young diagrams have rows and columns bounded by some linear function of n n with leading coefficient less than one. We show that any such sequence has at least exponential growth and we compute an explicit bound.

CharacterPower sum symmetric polynomialGeneral MathematicsApplied MathematicsMathematicsofComputing_GENERALComplete homogeneous symmetric polynomialExponential polynomialExponential growthCombinatoricsRepresentation theory of the symmetric groupSymmetric groupElementary symmetric polynomialMathematics (all)Ring of symmetric functionsCharacter groupSymmetric groupMathematics
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Perturbations of symmetric elliptic Hamiltonians of degree four

2006

AbstractIn this paper four-parameter unfoldings Xλ of symmetric elliptic Hamiltonians of degree four are studied. We prove that in a compact region of the period annulus of X0 the displacement function of Xλ is sign equivalent to its principal part, which is given by a family induced by a Chebychev system; and we describe the bifurcation diagram of Xλ in a full neighborhood of the origin in the parameter space, where at most two limit cycles can exist for the corresponding systems.

Chebychev propertyDegree (graph theory)Applied MathematicsMathematical analysisBifurcation diagramAnnulus (mathematics)Unfolding symmetric Hamiltonian systemsParameter spaceBifurcation diagramMelnikov functionsunfolding symmetric Hamiltonian systems; Melnikov functions; Chebychev property; Bifurcation diagramDisplacement functionPrincipal partLimit (mathematics)AnalysisSign (mathematics)MathematicsJournal of Differential Equations
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Computing with Rational Symmetric Functions and Applications to Invariant Theory and PI-algebras

2012

The research of the first named author was partially supported by INdAM. The research of the second, third, and fourth named authors was partially supported by Grant for Bilateral Scientific Cooperation between Bulgaria and Ukraine. The research of the fifth named author was partially supported by NSF Grant DMS-1016086.

Classical Invariant Theory05A15 05E05 05E10 13A50 15A72 16R10 16R30 20G05MacMahon Partition AnalysisHilbert SeriesRational symmetric functions classical invariant theory algebras with polynomial identity cocharacter sequenceMathematics - Rings and AlgebrasCommutative Algebra (math.AC)Mathematics - Commutative AlgebraRational Symmetric FunctionsAlgebras with Polynomial IdentitySettore MAT/02 - AlgebraRings and Algebras (math.RA)Noncommutative Invariant TheoryFOS: MathematicsCocharacter SequenceMathematics - CombinatoricsCombinatorics (math.CO)
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Automorphisms of the integral group ring of the hyperoctahedral group

1990

The purpose of this paper is to verify a conjecture of Zassenhaus [3] for hyperoctahedral groups by proving that every normalized automorphism () of ZG can be written in the form () = Tu 0 I where I is an automorphism of ZG obtained by extending an automorphism of G linearly to ZG and u is a unit of (JJG. A similar result was proved for symmetric groups by Peterson in [2]; the reader should consult [3] or the survey [4] for other results of this kind. 1989

CombinatoricsAlgebra and Number TheoryMatrix groupSymmetric groupAutomorphisms of the symmetric and alternating groupsOuter automorphism groupAlternating groupHyperoctahedral groupTopologyAutomorphismMathematicsGroup ringCommunications in Algebra
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Invariant ordering of surface groups and 3-manifolds which fibre over $S^1$

2006

CombinatoricsDicyclic groupGeneral MathematicsInvariant (mathematics)Point groups in two dimensionsCovering groups of the alternating and symmetric groupsMathematicsNon-abelian groupMathematical Proceedings of the Cambridge Philosophical Society
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Central idempotents and units in rational group algebras of alternating groups

1998

Let ℚAn be the group algebra of the alternating group over the rationals. By exploiting the theory of Young tableaux, we give an explicit description of the minimal central idempotents of ℚAn. As an application we construct finitely many generators for a subgroup of finite index in the centre of the group of units of ℚAn.

CombinatoricsRational numberSymmetric groupGeneral MathematicsRational groupGenerating set of a groupYoung tableauAlternating groupGroup algebraCovering groups of the alternating and symmetric groupsMathematics
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On permutations of class sums of alternating groups

1997

We prove a result concerning the class sums of the alternating group An; as a consequence we deduce that if θ is a normalized automorphism of the integral group ring then there exists such that is the identity on , where Sn:is the symmetric group and is the center of

Combinatoricsp-groupAlgebra and Number TheoryInner automorphismSymmetric groupOuter automorphism groupAlternating groupPermutation groupDihedral group of order 6Covering groups of the alternating and symmetric groupsMathematicsCommunications in Algebra
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