Search results for "Artin group"

showing 10 items of 23 documents

The HOMFLY-PT polynomials of sublinks and the Yokonuma–Hecke algebras

2016

We describe completely the link invariants constructed using Markov traces on the Yokonuma-Hecke algebras in terms of the linking matrix and the HOMFLYPT polynomials of sublinks.

MSC: Primary 57M27: Invariants of knots and 3-manifolds Secondary 20C08: Hecke algebras and their representations 20F36: Braid groups; Artin groups 57M25: Knots and links in $S^3$Pure mathematicsMarkov chainGeneral Mathematics010102 general mathematicsYokonuma-Hecke algebrasGeometric Topology (math.GT)Linking numbers01 natural sciencesMathematics::Geometric TopologyMatrix (mathematics)Mathematics - Geometric TopologyMarkov tracesMathematics::Quantum Algebra[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]0103 physical sciencesMathematics - Quantum AlgebraFOS: MathematicsQuantum Algebra (math.QA)010307 mathematical physics0101 mathematicsRepresentation Theory (math.RT)Link (knot theory)Mathematics - Representation TheoryMathematics
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Artin monoids inject in their groups

2001

We prove that the natural homomorphism from an Artin monoid to its associated Artin group is always injective

MonoidPure mathematics[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]General Mathematics20F36Group Theory (math.GR)01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]Mathematics::Group TheoryMathematics::Category Theory0103 physical sciencesArtin L-functionFOS: Mathematics0101 mathematics[MATH.MATH-GR] Mathematics [math]/Group Theory [math.GR]MathematicsDiscrete mathematicsNon-abelian class field theoryMathematics::Rings and Algebras010102 general mathematicsGalois moduleInjective functionArtin groupHomomorphism010307 mathematical physicsMathematics - Group TheoryGroup theory
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Presentations for the punctured mapping class groups in terms of Artin groups

1999

Consider an oriented compact surface F of positive genus, possibly with boundary, and a finite set P of punctures in the interior of F, and define the punctured mapping class group of F relatively to P to be the group of isotopy classes of orientation-preserving homeomorphisms h: F-->F which pointwise fix the boundary of F and such that h(P) = P. In this paper, we calculate presentations for all punctured mapping class groups. More precisely, we show that these groups are isomorphic with quotients of Artin groups by some relations involving fundamental elements of parabolic subgroups.

Pointwise20F38Class (set theory)presentationsGroup (mathematics)20F36Boundary (topology)Geometric Topology (math.GT)mapping class groupsSurface (topology)Mathematics::Geometric TopologyMapping class groupCombinatoricsMathematics - Geometric TopologyArtin groupsGenus (mathematics)FOS: MathematicsIsotopyGeometry and Topology57N0557N05 20F36 20F38MathematicsAlgebraic & Geometric Topology
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Lectures on Artin Groups and the $$K(\pi ,1)$$ Conjecture

2014

This paper consists of the notes of a mini-course (3 lectures) on Artin groups that focuses on a central question of the subject, the \(K(\pi ,1)\) conjecture.

Pure mathematicsConjectureCoxeter groupPiArtin groupSubject (documents)Mathematics
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Boundary quotients and ideals of Toeplitz C∗-algebras of Artin groups

2006

We study the quotients of the Toeplitz C*-algebra of a quasi-lattice ordered group (G,P), which we view as crossed products by a partial actions of G on closed invariant subsets of a totally disconnected compact Hausdorff space, the Nica spectrum of (G,P). Our original motivation and our main examples are drawn from right-angled Artin groups, but many of our results are valid for more general quasi-lattice ordered groups. We show that the Nica spectrum has a unique minimal closed invariant subset, which we call the boundary spectrum, and we define the boundary quotient to be the crossed product of the corresponding restricted partial action. The main technical tools used are the results of …

Pure mathematicsCovariant isometric representation01 natural sciencesToeplitz algebraCrossed productTotally disconnected space0103 physical sciencesFOS: MathematicsQuasi-lattice order0101 mathematicsInvariant (mathematics)Operator Algebras (math.OA)Artin groupQuotientMathematicsDiscrete mathematicsMathematics::Operator Algebras46L55010102 general mathematicsAmenable groupMathematics - Operator AlgebrasHausdorff spaceLength functionArtin group010307 mathematical physicsAnalysisJournal of Functional Analysis
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Artin groups of spherical type up to isomorphism

2003

AbstractWe prove that two Artin groups of spherical type are isomorphic if and only if their defining Coxeter graphs are the same.

Pure mathematics[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]20F36Group Theory (math.GR)01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]Mathematics::Group Theory0103 physical sciencesArtin L-functionFOS: Mathematics0101 mathematicsMathematics::Representation Theory[MATH.MATH-GR] Mathematics [math]/Group Theory [math.GR]MathematicsDiscrete mathematicsGroup isomorphismAlgebra and Number TheoryNon-abelian class field theory010102 general mathematicsCoxeter groupConductorArtin group010307 mathematical physicsArtin reciprocity lawIsomorphismMathematics - Group TheoryJournal of Algebra
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Coxeter on People and Polytopes

2004

H. S. M. Coxeter, known to his friends as Donald, was not only a remarkable mathematician. He also enriched our historical understanding of how classical geometry helped inspire what has sometimes been called the nineteenth-century’s non-Euclidean revolution (Fig. 35.1). Coxeter was no revolutionary, and the non-Euclidean revolution was already part of history by the time he arrived on the scene. What he did experience was the dramatic aftershock in physics. Countless popular and semi-popular books were written during the early 1920s expounding the new theory of space and time propounded in Einstein’s general theory of relativity. General relativity and subsequent efforts to unite gravitati…

SpacetimeGeneral relativityGeneral MathematicsCoxeter groupArt historyPhysics::History of Physicssymbols.namesakeHistory and Philosophy of ScienceDifferential geometryCoxeter complexsymbolsArtin groupEinsteinCoxeter elementThe Mathematical Intelligencer
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Automorphisms and abstract commensurators of 2-dimensional Artin groups

2004

In this paper we consider the class of 2-dimensional Artin groups with connected, large type, triangle-free defining graphs (type CLTTF). We classify these groups up to isomorphism, and describe a generating set for the automorphism group of each such Artin group. In the case where the defining graph has no separating edge or vertex we show that the Artin group is not abstractly commensurable to any other CLTTF Artin group. If, moreover, the defining graph satisfies a further `vertex rigidity' condition, then the abstract commensurator group of the Artin group is isomorphic to its automorphism group and generated by inner automorphisms, graph automorphisms (induced from automorphisms of the…

Vertex (graph theory)20F67CommensuratorCoxeter groupCoxeter group20F36InverseGroup Theory (math.GR)Automorphism2–dimensional Artin group20F36 20F55 20F65 20F67CombinatoricsMathematics::Group Theorytriangle freeGenerating set of a groupFOS: Mathematicscommensurator groupArtin groupGeometry and TopologyIsomorphism20F5520F65graph automorphismsMathematics - Group TheoryMathematics
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IRREDUCIBLE COXETER GROUPS

2004

We prove that a non-spherical irreducible Coxeter group is (directly) indecomposable and that an indefinite irreducible Coxeter group is strongly indecomposable in the sense that all its finite index subgroups are (directly) indecomposable. Let W be a Coxeter group. Write W = WX1 × ⋯ × WXb × WZ3, where WX1, … , WXb are non-spherical irreducible Coxeter groups and WZ3 is a finite one. By a classical result, known as the Krull–Remak–Schmidt theorem, the group WZ3 has a decomposition WZ3 = H1 × ⋯ × Hq as a direct product of indecomposable groups, which is unique up to a central automorphism and a permutation of the factors. Now, W = WX1 × ⋯ × WXb × H1 × ⋯ × Hq is a decomposition of W as a dir…

[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]General MathematicsGroup Theory (math.GR)0102 computer and information sciencesPoint group01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]CombinatoricsMathematics::Group TheoryFOS: Mathematics0101 mathematicsLongest element of a Coxeter groupMathematics::Representation Theory[MATH.MATH-GR] Mathematics [math]/Group Theory [math.GR]MathematicsMathematics::CombinatoricsCoxeter notationMathematics::Rings and Algebras010102 general mathematicsCoxeter group010201 computation theory & mathematicsCoxeter complexArtin group20F55Indecomposable moduleMathematics - Group TheoryCoxeter elementInternational Journal of Algebra and Computation
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Quasi-isometrically embedded subgroups of braid and diffeomorphism groups

2005

We show that a large class of right-angled Artin groups (in particular, those with planar complementary defining graph) can be embedded quasi-isometrically in pure braid groups and in the group of area preserving diffeomorphisms of the disk fixing the boundary (with respect to the $L^2$-norm metric); this extends results of Benaim and Gambaudo who gave quasi-isometric embeddings of $F\_n$ and $\Z^n$ for all $n>0$. As a consequence we are also able to embed a variety of Gromov hyperbolic groups quasi-isometrically in pure braid groups and in the diffeomorphism group of the disk. Examples include hyperbolic surface groups, some HNN-extensions of these along cyclic subgroups and the fundame…

[ MATH.MATH-GT ] Mathematics [math]/Geometric Topology [math.GT]Fundamental group[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]Hyperbolic groupGeneral MathematicsBraid group20F36braid groupGroup Theory (math.GR)01 natural sciencesRelatively hyperbolic group[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]right-angled Artin groupCombinatoricssymbols.namesakeMathematics - Geometric TopologyMathematics::Group Theory05C25hyperbolic group[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]0103 physical sciencesBraidFOS: Mathematics0101 mathematicsMathematicsApplied Mathematics010102 general mathematicsGeometric Topology (math.GT)Braid theoryMathematics::Geometric TopologyPlanar graphsymbols010307 mathematical physicsDiffeomorphismMathematics - Group Theory20F36; 05C25
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