Search results for "Mathematics::Symplectic Geometry"

showing 10 items of 184 documents

Topological Hamiltonian as an exact tool for topological invariants

2012

We propose the concept of `topological Hamiltonian' for topological insulators and superconductors in interacting systems. The eigenvalues of topological Hamiltonian are significantly different from the physical energy spectra, but we show that topological Hamiltonian contains the information of gapless surface states, therefore it is an exact tool for topological invariants.

PhysicsSuperconductivityHigh Energy Physics - TheoryStrongly Correlated Electrons (cond-mat.str-el)FOS: Physical sciencesCondensed Matter PhysicsTopology01 natural sciences010305 fluids & plasmassymbols.namesakeCondensed Matter - Strongly Correlated ElectronsGapless playbackHigh Energy Physics - Theory (hep-th)Topological insulator0103 physical sciencessymbolsTopological invariantsGeneral Materials Science010306 general physicsHamiltonian (quantum mechanics)Mathematics::Symplectic GeometryEigenvalues and eigenvectorsJournal of Physics Condensed Matter
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A closer look at mirrors and quotients of Calabi-Yau threefolds

2016

Let X be the toric variety (P1)4 associated with its four-dimensional polytope 1. Denote by X˜ the resolution of the singular Fano variety Xo associated with the dual polytope 1o. Generically, anticanonical sections Y of X and anticanonical sections Y˜ of X˜ are mirror partners in the sense of Batyrev. Our main result is the following: the Hodge-theoretic mirror of the quotient Z associated to a maximal admissible pair (Y, G) in X is not a quotient Z˜ associated to an admissible pair in X˜ . Nevertheless, it is possible to construct a mirror orbifold for Z by means of a quotient of a suitable Y˜. Its crepant resolution is a Calabi-Yau threefold with Hodge numbers (8, 4). Instead, if we star…

Pure mathematics010308 nuclear & particles physics010102 general mathematicsToric varietyPolytopeFano varietymirror symmetry01 natural sciencesTheoretical Computer ScienceMathematics::Algebraic GeometryMathematics (miscellaneous)0103 physical sciencesCalabi-YauCrepant resolutionCalabi–Yau manifoldMirror Symmetry Calabi-Yau QuotientsSettore MAT/03 - Geometria0101 mathematicsMathematics::Symplectic GeometryQuotientOrbifoldMAT/03 - GEOMETRIAMathematicsResolution (algebra)
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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 symplectically rigid local systems of rank four and Calabi–Yau operators

2013

AbstractWe classify all Sp4(C)-rigid, quasi-unipotent local systems and show that all of them have geometric origin. Furthermore, we investigate which of those having a maximal unipotent element are induced by fourth order Calabi–Yau operators. Via this approach, we reconstruct all known Calabi–Yau operators inducing an Sp4(C)-rigid monodromy tuple and obtain closed formulae for special solutions of them.

Pure mathematicsAlgebra and Number TheoryHadamard productRank (linear algebra)Geometric originUnipotentOperator theoryConvolutionConvolutionAlgebraComputational MathematicsMathematics::Algebraic GeometryMonodromyRigidityCalabi–Yau operatorsCalabi–Yau manifoldHadamard productMathematics::Differential GeometryTupleMathematics::Symplectic GeometryMathematicsJournal of Symbolic Computation
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KNOTS AND LINKS IN INTEGRABLE HAMILTONIAN SYSTEMS

1998

The main purpose of this paper is to prove that Bott integrable Hamiltonian flows and non-singular Morse-Smale flows are closely related. As a consequence, we obtain a classification of the knots and links formed by periodic orbits of Bott integrable Hamiltonians on the 3-sphere and on the solid torus. We also show that most of Fomenko's theory on the topology of the energy levels of Bott integrable Hamiltonians can be derived from Morgan's results on 3-manifolds that admit non-singular Morse-Smale flows.

Pure mathematicsAlgebra and Number TheoryIntegrable systemMathematical analysisMathematics::Algebraic TopologyMathematics::Geometric TopologyHamiltonian systemsymbols.namesakeMathematics::K-Theory and HomologySolid torussymbolsPeriodic orbitsHamiltonian (quantum mechanics)Mathematics::Symplectic GeometryMathematicsJournal of Knot Theory and Its Ramifications
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Manifolds and Smooth Mappings

2020

This is a preparatory chapter giving the necessary standard background on smooth and complex manifolds and maps.

Pure mathematicsAstrophysics::Instrumentation and Methods for AstrophysicsMathematics::Differential GeometryMathematics::Symplectic GeometryMathematics
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Equivariant cohomology, Fock space and loop groups

2006

Equivariant de Rham cohomology is extended to the infinite-dimensional setting of a loop subgroup acting on a loop group, using Hida supersymmetric Fock space for the Weil algebra and Malliavin test forms on the loop group. The Mathai–Quillen isomorphism (in the BRST formalism of Kalkman) is defined so that the equivalence of various models of the equivariant de Rham cohomology can be established.

Pure mathematicsChern–Weil homomorphismGroup cohomologyMathematical analysisGeneral Physics and AstronomyStatistical and Nonlinear PhysicsWeil algebraMathematics::Algebraic TopologyCohomologyMathematics::K-Theory and HomologyLoop groupDe Rham cohomologyEquivariant mapEquivariant cohomologyMathematics::Symplectic GeometryMathematical PhysicsMathematicsJournal of Physics A: Mathematical and General
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Local Gromov-Witten invariants are log invariants

2019

We prove a simple equivalence between the virtual count of rational curves in the total space of an anti-nef line bundle and the virtual count of rational curves maximally tangent to a smooth section of the dual line bundle. We conjecture a generalization to direct sums of line bundles.

Pure mathematicsConjectureGeneral Mathematics010102 general mathematicsTangent01 natural sciencesMathematics - Algebraic GeometryMathematics::Algebraic Geometry14N35 14D06 53D45Line bundle0103 physical sciencesFOS: Mathematics010307 mathematical physics0101 mathematicsEquivalence (formal languages)QAAlgebraic Geometry (math.AG)Mathematics::Symplectic GeometryMathematics
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Conformal Dehn surgery and the shape of Maskit’s embedding

2004

We study the geometric limits of sequences of loxodromic cyclic groups which arise from conformal Dehn surgery. The results are applied to obtain an asymptotic description of the shape of the main cusp of the Maskit embedding of the Teichmüller space of once-punctured tori.

Pure mathematicsDehn surgeryEmbeddingConformal mapGeometry and TopologyTopologyMathematics::Symplectic GeometryMathematics::Geometric TopologyMathematicsConformal Geometry and Dynamics of the American Mathematical Society
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Star calculus on Jacobi manifolds

2002

Abstract We study the Gerstenhaber bracket on differential forms induced by the two main examples of Jacobi manifolds: contact manifolds and l.c.s. manifolds. Moreover, we obtain explicit expressions of the generating operators and the derivations on the algebra of multivector fields. We define star operators for contact manifolds and l.c.s. manifolds and we study some of its properties.

Pure mathematicsDifferential formStar operatorMathematical analysisContact manifoldMathematics::Geometric TopologyGerstenhaber algebraConnected sumManifoldComputational Theory and MathematicsRicci-flat manifoldDifferential topologyGraded Poisson bracketsMathematics::Differential GeometryGeometry and TopologyLocally conformal symplectic manifoldLie algebroidMathematics::Symplectic GeometryHyperkähler manifoldAnalysisMathematicsSymplectic geometryPoisson algebraDifferential Geometry and its Applications
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