Search results for "NUMB"

showing 10 items of 3956 documents

The pure descent statistic on permutations

2017

International audience; We introduce a new statistic based on permutation descents which has a distribution given by the Stirling numbers of the first kind, i.e., with the same distribution as for the number of cycles in permutations. We study this statistic on the sets of permutations avoiding one pattern of length three by giving bivariate generating functions. As a consequence, new classes of permutations enumerated by the Motzkin numbers are obtained. Finally, we deduce results about the popularity of the pure descents in all these restricted sets. (C) 2017 Elsevier B.V. All rights reserved.

[ MATH ] Mathematics [math]Golomb–Dickman constantDistribution (number theory)PermutationStirling numbers of the first kindStirling number0102 computer and information sciences01 natural sciencesTheoretical Computer ScienceCombinatoricsPermutationComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATIONDiscrete Mathematics and CombinatoricsStirling number[MATH]Mathematics [math]0101 mathematicsPatternsStatisticMathematicsDiscrete mathematicsMathematics::Combinatorics010102 general mathematicsDescentParity of a permutationGray Code010201 computation theory & mathematicsRandom permutation statisticsDyck pathPopularity Fixed NumberDiscrete Mathematics
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Surfaces of minimal degree of tame representation type and mutations of Cohen–Macaulay modules

2017

We provide two examples of smooth projective surfaces of tame CM type, by showing that any parameter space of isomorphism classes of indecomposable ACM bundles with fixed rank and determinant on a rational quartic scroll in projective 5-space is either a single point or a projective line. For surfaces of minimal degree and wild CM type, we classify rigid Ulrich bundles as Fibonacci extensions. For the rational normal scrolls S(2,3) and S(3,3), a complete classification of rigid ACM bundles is given in terms of the action of the braid group in three strands.

[ MATH ] Mathematics [math]Pure mathematicsFibonacci numberGeneral MathematicsType (model theory)Rank (differential topology)Commutative Algebra (math.AC)01 natural sciencesMathematics - Algebraic GeometryACM bundlesVarieties of minimal degreeMathematics::Algebraic Geometry0103 physical sciencesFOS: MathematicsMathematics (all)Rings0101 mathematics[MATH]Mathematics [math]Algebraic Geometry (math.AG)MathematicsDiscrete mathematics14F05 13C14 14J60 16G60010102 general mathematicsVarietiesMCM modulesACM bundles; MCM modules; Tame CM type; Ulrich bundles; Varieties of minimal degree; Mathematics (all)Ulrich bundlesMathematics - Commutative AlgebraQuintic functionElliptic curveTame CM typeProjective lineBundles010307 mathematical physicsIsomorphismIndecomposable moduleMSC: 14F05; 13C14; 14J60; 16G60
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The dual and the double of a Hopf algebroid are Hopf algebroids

2017

Let $H$ be a $\times$-bialgebra in the sense of Takeuchi. We show that if $H$ is $\times$-Hopf, and if $H$ fulfills the finiteness condition necessary to define its skew dual $H^\vee$, then the coopposite of the latter is $\times$-Hopf as well. If in addition the coopposite $\times$-bialgebra of $H$ is $\times$-Hopf, then the coopposite of the Drinfeld double of $H$ is $\times$-Hopf, as is the Drinfeld double itself, under an additional finiteness condition.

[ MATH ] Mathematics [math]Pure mathematicsGeneral Computer ScienceDuality (optimization)01 natural sciencesTheoretical Computer ScienceMathematics::Category TheoryMathematics::Quantum AlgebraMathematics - Quantum Algebra0103 physical sciencesFOS: Mathematics[MATH.MATH-RA] Mathematics [math]/Rings and Algebras [math.RA]Quantum Algebra (math.QA)[ MATH.MATH-CT ] Mathematics [math]/Category Theory [math.CT]0101 mathematics[MATH]Mathematics [math]Hopf algebroid[MATH.MATH-CT]Mathematics [math]/Category Theory [math.CT]Mathematics[MATH.MATH-QA] Mathematics [math]/Quantum Algebra [math.QA]Algebra and Number TheoryMSC: 16T99 18D10[ MATH.MATH-QA ] Mathematics [math]/Quantum Algebra [math.QA]010308 nuclear & particles physicsbialgebroid[MATH.MATH-RA]Mathematics [math]/Rings and Algebras [math.RA]010102 general mathematicsMathematics::Rings and AlgebrasSkewMathematics - Rings and Algebras[MATH.MATH-CT] Mathematics [math]/Category Theory [math.CT][ MATH.MATH-RA ] Mathematics [math]/Rings and Algebras [math.RA]Dual (category theory)Rings and Algebras (math.RA)Theory of computation[MATH.MATH-QA]Mathematics [math]/Quantum Algebra [math.QA]duality
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Hom-Lie quadratic and Pinczon Algebras

2017

ABSTRACTPresenting the structure equation of a hom-Lie algebra 𝔤, as the vanishing of the self commutator of a coderivation of some associative comultiplication, we define up to homotopy hom-Lie algebras, which yields the general hom-Lie algebra cohomology with value in a module. If the hom-Lie algebra is quadratic, using the Pinczon bracket on skew symmetric multilinear forms on 𝔤, we express this theory in the space of forms. If the hom-Lie algebra is symmetric, it is possible to associate to each module a quadratic hom-Lie algebra and describe the cohomology with value in the module.

[ MATH ] Mathematics [math]Universal enveloping algebra01 natural sciencesCohomologyFiltered algebraQuadratic algebraMathematics::Category Theory0103 physical sciences[MATH]Mathematics [math]0101 mathematicsMSC: 17A45 17B56 17D99 55N20ComputingMilieux_MISCELLANEOUSMathematicsSymmetric algebraAlgebra and Number TheoryQuadratic algebrasMathematics::Rings and Algebras010102 general mathematicsUp to homotopy algebras16. Peace & justiceLie conformal algebraHom-Lie algebrasAlgebraDivision algebraAlgebra representationPhysics::Accelerator PhysicsCellular algebra010307 mathematical physics
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A simple algorithm for finding short sigma-definite representatives

2010

We describe a new algorithm which for each braid returns a quasi-geodesic sigma-definite word representative, defined as a braid word in which the generator sigma_i with maximal index i appears either only positively or only negatively.

[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]Braid groupbraid monoids20F3620M0506F05Group Theory (math.GR)02 engineering and technology01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]Mathematics::Group TheoryMathematics::Category TheoryMathematics::Quantum AlgebraFOS: MathematicsBraidBraid group0101 mathematicsSIMPLE algorithmMathematicsDiscrete mathematicsGenerator (computer programming)algorithmAlgebra and Number Theory010102 general mathematicsSigmaComputer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing)021001 nanoscience & nanotechnologyMathematics::Geometric Topologybraid orderingIndex (publishing)0210 nano-technologyMathematics - Group TheoryWord (computer architecture)Journal of Algebra
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On the classification of Kim and Kostrikin manifolds

2006

International audience; We completely classify the topological and geometric structures of some series of closed connected orientable 3-manifolds introduced by Kim and Kostrikin in [20, 21] as quotient spaces of certain polyhedral 3-cells by pairwise identifications of their boundary faces. Then we study further classes of closed orientable 3-manifolds arising from similar polyhedral schemata, and describe their topological properties.

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]3-manifolds; group presentations; spines; orbifolds; polyhedral schemata; branched coveringsAlgebra and Number TheorySeries (mathematics)010102 general mathematicsBoundary (topology)spines0102 computer and information sciences01 natural sciencesgroup presentations3-manifoldsCombinatoricspolyhedral schemata010201 computation theory & mathematics[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]Pairwise comparisonorbifoldsbranched coverings0101 mathematicsQuotient[MATH.MATH-GT] Mathematics [math]/Geometric Topology [math.GT]Mathematics
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THE HOMOLOGY OF DIGRAPHS AS A GENERALIZATION OF HOCHSCHILD HOMOLOGY

2010

J. Przytycki has established a connection between the Hochschild homology of an algebra $A$ and the chromatic graph homology of a polygon graph with coefficients in $A$. In general the chromatic graph homology is not defined in the case where the coefficient ring is a non-commutative algebra. In this paper we define a new homology theory for directed graphs which takes coefficients in an arbitrary $A-A$ bimodule, for $A$ possibly non-commutative, which on polygons agrees with Hochschild homology through a range of dimensions.

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]57M15 16E40 05C20Homology (mathematics)[ MATH.MATH-CO ] Mathematics [math]/Combinatorics [math.CO]Mathematics::Algebraic Topology01 natural sciencesCombinatoricsMathematics - Geometric TopologyMathematics::K-Theory and Homology[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT][MATH.MATH-CO]Mathematics [math]/Combinatorics [math.CO][ MATH.MATH-KT ] Mathematics [math]/K-Theory and Homology [math.KT]0103 physical sciencesFOS: MathematicsMathematics - CombinatoricsChromatic scale0101 mathematicsMathematics::Symplectic GeometryMathematicsAlgebra and Number TheoryHochschild homologyApplied Mathematics010102 general mathematicsGeometric Topology (math.GT)K-Theory and Homology (math.KT)Directed graphMathematics::Geometric TopologyGraphMathematics - K-Theory and HomologyPolygon[MATH.MATH-KT]Mathematics [math]/K-Theory and Homology [math.KT]BimoduleCombinatorics (math.CO)010307 mathematical physicsJournal of Algebra and Its Applications
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HOMFLY-PT skein module of singular links in the three-sphere

2012

For a ring R, we denote by [Formula: see text] the free R-module spanned by the isotopy classes of singular links in 𝕊3. Given two invertible elements x, t ∈ R, the HOMFLY-PT skein module of singular links in 𝕊3 (relative to the triple (R, t, x)) is the quotient of [Formula: see text] by local relations, called skein relations, that involve t and x. We compute the HOMFLY-PT skein module of singular links for any R such that (t-1 - t + x) and (t-1 - t - x) are invertible. In particular, we deduce the Conway skein module of singular links.

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]HOMFFLY-PT skein modulePure mathematics01 natural scienceslaw.inventionMathematics - Geometric TopologylawMathematics::Quantum Algebra[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]0103 physical sciencessingular knot singular linkFOS: Mathematics0101 mathematicsQuotientMathematicsRing (mathematics)Algebra and Number TheorySkein010102 general mathematicsSkein relationGeometric Topology (math.GT)Mathematics::Geometric TopologyInvertible matrix57M25Isotopy010307 mathematical physics
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Compressed Drinfeld associators

2004

Drinfeld associator is a key tool in computing the Kontsevich integral of knots. A Drinfeld associator is a series in two non-commuting variables, satisfying highly complicated algebraic equations - hexagon and pentagon. The logarithm of a Drinfeld associator lives in the Lie algbera L generated by the symbols a,b,c modulo [a,b]=[b,c]=[c,a]. The main result is a description of compressed associators that satisfy the compressed pentagon and hexagon in the quotient L/[[L,L],[L,L]]. The key ingredient is an explicit form of Campbell-Baker-Hausdorff formula in the case when all commutators commute.

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]Hexagon equationPure mathematicsCampbell–Baker–Hausdorff formulaKnotLie algebraModuloCompressed Vassiliev invariantsPentagon equation01 natural sciencessymbols.namesakeMathematics - Geometric TopologyChord diagramsExtended Bernoulli numbers[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]Mathematics::Quantum Algebra0103 physical sciencesLie algebraMathematics - Quantum AlgebraFOS: MathematicsQuantum Algebra (math.QA)0101 mathematicsAlgebraic numberBernoulli numberQuotientMathematics[MATH.MATH-GT] Mathematics [math]/Geometric Topology [math.GT]Zeta functionDiscrete mathematics[MATH.MATH-QA] Mathematics [math]/Quantum Algebra [math.QA]Algebra and Number TheoryVassiliev invariants[ MATH.MATH-QA ] Mathematics [math]/Quantum Algebra [math.QA]Drinfeld associator57M25 57M27 11B68 17B01010102 general mathematicsAssociatorQuantum algebraGeometric Topology (math.GT)Kontsevich integralRiemann zeta functionsymbols[MATH.MATH-QA]Mathematics [math]/Quantum Algebra [math.QA]Compressed associator010307 mathematical physicsBernoulli numbers
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Birman's conjecture for singular braids on closed surfaces

2003

Let M be a closed oriented surface of genus g≥1, let Bn(M) be the braid group of M on n strings, and let SBn(M) be the corresponding singular braid monoid. Our purpose in this paper is to prove that the desingularization map η : SBn(M)→ℤ[Bn(M)], introduced in the definition of the Vassiliev invariants (for braids on surfaces), is injective.

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]MonoidPure mathematics[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]Braid group20F36Group Theory (math.GR)01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]Mathematics - Geometric TopologyMathematics::Group Theory[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]Mathematics::Category TheoryMathematics::Quantum AlgebraGenus (mathematics)0103 physical sciencesFOS: MathematicsBraid0101 mathematicsMathematics[MATH.MATH-GT] Mathematics [math]/Geometric Topology [math.GT][MATH.MATH-GR] Mathematics [math]/Group Theory [math.GR]Algebra and Number TheoryConjecture010102 general mathematicsGeometric Topology (math.GT)20F36;57M27Braid theorySurface (topology)Mathematics::Geometric TopologyInjective function57M27010307 mathematical physicsMathematics - Group Theory
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