Search results for "finite type invariant"

showing 5 items of 5 documents

Vassiliev invariants for braids on surfaces

2000

We show that Vassiliev invariants separate braids on a closed oriented surface, and we exhibit an universal Vassiliev invariant for these braids in terms of chord diagrams labeled by elements of the fundamental group of the considered surface.

Surface (mathematics)Fundamental groupLow-dimensional topologyGeneral MathematicsBraid groupGroup Theory (math.GR)braidMathematics::Algebraic TopologyCombinatoricsMathematics - Geometric TopologyMathematics::Group TheoryMathematics::Category TheoryMathematics::Quantum Algebra20F36 (Primary) 57M2757N05 (Secondary)BraidFOS: MathematicssurfaceMathematicsApplied MathematicsGeometric Topology (math.GT)Mathematics::Geometric TopologyFinite type invariantVassiliev Invariantfinite type invariantIsomorphismMathematics - Group TheoryGroup theory
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Finite type invariants of knots in homology 3-spheres with respect to null LP-surgeries

2017

We study a theory of finite type invariants for null-homologous knots in rational homology 3-spheres with respect to null Lagrangian-preserving surgeries. It is an analogue in the setting of the rational homology of the Goussarov-Rozansky theory for knots in integral homology 3-spheres. We give a partial combinatorial description of the graded space associated with our theory and determine some cases when this description is complete. For null-homologous knots in rational homology 3-spheres with a trivial Alexander polynomial, we show that the Kricker lift of the Kontsevich integral and the Lescop equivariant invariant built from integrals in configuration spaces are universal finite type i…

Pure mathematicsAlexander polynomialPrimary: 57M27Homology (mathematics)01 natural sciencesHomology sphereMathematics::Algebraic TopologyMathematics - Geometric TopologyKnot (unit)Mathematics::K-Theory and Homologybeaded Jacobi diagramknot[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]0103 physical sciencesFOS: Mathematics0101 mathematicsInvariant (mathematics)Mathematics::Symplectic Geometry3-manifoldhomology sphereMathematicsBorromean surgerycalculus010102 general mathematicsGeometric Topology (math.GT)Kontsevich integral16. Peace & justiceMathematics::Geometric TopologymanifoldsFinite type invariantnull-move57M27Finite type invariantLagrangian-preserving surgeryEquivariant map010307 mathematical physicsGeometry and Topology3-manifold
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On orderability of fibred knot groups

2003

It is known that knot groups are right-orderable, and that many of them are not bi-orderable. Here we show that certain bred knots in S 3 (or in a homology sphere) do have bi-orderable fundamental group. In particular, this holds for bred knots, such as 41, for which the Alexander polynomial has all roots real and positive. This is an application of the construction of orderings of groups, which are moreover invariant with respect to a certain automorphism.

CombinatoricsAlgebraHOMFLY polynomialKnot invariantGeneral MathematicsSkein relationAlexander polynomialKnot polynomialTricolorabilityMathematics::Geometric TopologyMathematicsKnot theoryFinite type invariantMathematical Proceedings of the Cambridge Philosophical Society
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Some topological invariants for three-dimensional flows

2001

We deal here with vector fields on three manifolds. For a system with a homoclinic orbit to a saddle-focus point, we show that the imaginary part of the complex eigenvalues is a conjugacy invariant. We show also that the ratio of the real part of the complex eigenvalue over the real one is invariant under topological equivalence. For a system with two saddle-focus points and an orbit connecting the one-dimensional invariant manifold of those points, we compute a conjugacy invariant related to the eigenvalues of the vector field at the singularities. (c) 2001 American Institute of Physics.

Invariant polynomialApplied MathematicsMathematical analysisInvariant manifoldGeneral Physics and AstronomyStatistical and Nonlinear PhysicsFinite type invariantConjugacy classHeteroclinic orbitHomoclinic orbitInvariant (mathematics)Mathematical PhysicsCenter manifoldMathematicsChaos: An Interdisciplinary Journal of Nonlinear Science
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KNOTS WITH UNKNOTTING NUMBER ONE AND GENERALISED CASSON INVARIANT

1996

We extend the classical notion of unknotting operation to include operations on rational tangles. We recall the “classical” conditions (on the signature, linking form etc.) for a knot to have integral (respectively rational) unknotting number one. We show that the generalised Casson invariant of the twofold branched cover of the knot gives a further necessary condition. We apply these results to some Montesinos knots and to knots with less than nine crossings.

CombinatoricsAlgebra and Number TheoryKnot (unit)Unknotting numberMathematics::Geometric TopologyCasson invariantMathematicsKnot theoryFinite type invariantJournal of Knot Theory and Its Ramifications
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