Search results for "Vector field"

showing 10 items of 164 documents

The origin of in-plane stresses in axially moving orthotropic continua

2016

In this paper, we address the problem of the origin of in-plane stresses in continuous, two-dimensional high-speed webs. In the case of thin, slender webs, a typical modeling approach is the application of a stationary in-plane model, without considering the effects of the in-plane velocity field. However, for high-speed webs this approach is insufficient, because it neglects the coupling between the total material velocity and the deformation experienced by the material. By using a mixed Lagrange–Euler approach in model derivation, the solid continuum problem can be transformed into a solid continuum flow problem. Mass conservation in the flow problem, and the behaviour of free edges in th…

Inertial frame of referenceMaterials scienceaxially moving02 engineering and technologyOrthotropic materialViscoelasticityelastic0203 mechanical engineeringviscoelasticfree edgesorthotropicGeneral Materials Scienceta216Contraction (operator theory)Conservation of massta113one-dimensional040101 forestryta214Applied MathematicsMechanical Engineeringta11104 agricultural and veterinary sciencesMechanicsCondensed Matter PhysicsIn plane020303 mechanical engineering & transportsClassical mechanicstwo-dimensionalMechanics of MaterialsModeling and Simulation0401 agriculture forestry and fisheriesVector fieldAxial symmetryInternational Journal of Solids and Structures
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Rationally integrable vector fields and rational additive group actions

2016

International audience; We characterize rational actions of the additive group on algebraic varieties defined over a field of characteristic zero in terms of a suitable integrability property of their associated velocity vector fields. This extends the classical correspondence between regular actions of the additive group on affine algebraic varieties and the so-called locally nilpotent derivations of their coordinate rings. Our results lead in particular to a complete characterization of regular additive group actions on semi-affine varieties in terms of their associated vector fields. Among other applications, we review properties of the rational counterpart of the Makar-Limanov invariant…

Integrable systemRationally integrable derivationsGeneral Mathematics010102 general mathematics05 social sciencesLocally nilpotentAlgebraic variety01 natural sciencesLocally nilpotent derivations[ MATH.MATH-AG ] Mathematics [math]/Algebraic Geometry [math.AG]AlgebraHomogeneousRational additive group actions0502 economics and businessVector fieldAffine transformation[MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG]050207 economics0101 mathematicsInvariant (mathematics)MSC: 14E07 14L30 14M25 14R20Additive groupMathematics
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Numerical study of the Kerr solution in rotating coordinates

2016

International audience; The Kerr solution in coordinates corotating with the horizon is studied as a testbed for a spacetime with a helical Killing vector in the Ernst picture. The solution is numerically constructed by solving the Ernst equation with a spectral method and a Newton iteration. We discuss convergence of the iteration for several initial iterates and different values of the Kerr parameters.

Kerr metricReduced wave-equationFOS: Physical sciencesGeneral Relativity and Quantum Cosmology (gr-qc)01 natural sciencesGeneral Relativity and Quantum CosmologyBinary-systemsRelativitysymbols.namesakeKilling vector fieldGeneral Relativity and Quantum CosmologyTheory of relativity0103 physical sciencesBoundary-conditionsBoundary value problemSpectral method010306 general physicsNewton's method[ SDU.ASTR ] Sciences of the Universe [physics]/Astrophysics [astro-ph]Physics[PHYS]Physics [physics][ PHYS ] Physics [physics]Spacetime[SDU.ASTR]Sciences of the Universe [physics]/Astrophysics [astro-ph]010308 nuclear & particles physicsClassical mechanicsIterated function[SDU]Sciences of the Universe [physics]symbolsSpectral method[ SDU ] Sciences of the Universe [physics]
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A novel boundary element formulation for anisotropic fracture mechanics

2019

Abstract A novel boundary element formulation for two-dimensional fracture mechanics is presented in this work. The formulation is based on the derivation of a supplementary boundary integral equation to be used in combination with the classic displacement boundary integral equation to solve anisotropic fracture mechanics problems via a single-region approach. The formulation is built starting from the observation that the displacement field for an anisotropic domain can be represented as the superposition of a vector field, whose components satisfy a suitably defined anisotropic Laplace equation, and the gradient of the Airy stress function. The supplementary boundary integral equation is …

Laplace's equationFracture mechanicApplied MathematicsMechanical EngineeringMathematical analysisBoundary (topology)Fracture mechanicsCondensed Matter PhysicsCivil EngineeringDisplacement (vector)Superposition principleAiry functionDisplacement fieldFracture mechanicsMechanical Engineering & TransportsGeneral Materials ScienceVector fieldSettore ING-IND/04 - Costruzioni E Strutture AerospazialiDual Boundary Element MethodIntegral equationsIntegral equationAnisotropic elasticityMathematicsTheoretical and Applied Fracture Mechanics
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Non-London electrodynamics in a multiband London model : anisotropy-induced nonlocalities and multiple magnetic field penetration lengths

2018

The London model describes strongly type-2 superconductors as massive vector field theories, where the magnetic field decays exponentially at the length scale of the London penetration length. This also holds for isotropic multi-band extensions, where the presence of multiple bands merely renormalises the London penetration length. We show that, by contrast, the magnetic properties of anisotropic multi-band London models are not this simple, and the anisotropy leads to the inter-band phase differences becoming coupled to the magnetic field. This results in the magnetic field in such systems having N+1 penetration lengths, where N is the number of field components or bands. That is, in a giv…

Length scaleSuperconductivityPhysicsCondensed matter physicsta114suprajohtavuusCondensed Matter - SuperconductivitysuperconductivityvorticesFOS: Physical sciencespenetration depthPenetration (firestop)magnetic fieldsmagneettikentät01 natural sciences010305 fluids & plasmasMagnetic fieldSuperconductivity (cond-mat.supr-con)Penetration lengthQuantum electrodynamicsCondensed Matter::Superconductivity0103 physical sciencesVector field010306 general physicsAnisotropyPhysical Review B
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Invariant varieties of discontinuous vector fields

2004

We study the geometric qualitative behaviour of a class of discontinuous vector fields in four dimensions around typical singularities. We are mainly interested in giving the conditions under which there exist one-parameter families of periodic orbits (a result that can be seen as one analogous to the Lyapunov centre theorem). The focus is on certain discontinuous systems having some symmetric properties. We also present an algorithm which detects and computes periodic orbits.

Lyapunov functionApplied MathematicsMathematical analysisGeneral Physics and AstronomyStatistical and Nonlinear PhysicsDiscontinuous systemssymbols.namesakeSingularitysymbolsPeriodic orbitsGravitational singularityVector fieldInvariant (mathematics)Mathematical PhysicsMathematicsNonlinearity
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A new general relativistic magnetohydrodynamics code for dynamical spacetimes

2008

We present a new numerical code which solves the general relativistic magneto-hydrodynamics (GRMHD) equations coupled to the Einstein equations for the evolution of a dynamical spacetime within the conformally-flat approximation. This code has been developed with the main objective of studying astrophysical scenarios in which both, high magnetic fields and strong gravitational fields appear, such as the magneto-rotational collapse of stellar cores, the collapsar model of GRBs, and the evolution of neutron stars. The code is based on an existing and thoroughly tested purely hydrodynamics code and on its extension to accommodate weakly magnetized fluids (passive magnetic field approximation).…

Magnetohydrodynamics (MHD)Astrophysics::High Energy Astrophysical PhenomenaFOS: Physical sciencesConformal mapAstrophysicsGeneral Relativity and Quantum Cosmology (gr-qc)AstrophysicsGeneral Relativity and Quantum CosmologyRelativityGravitational fieldUNESCO::ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia::GravitaciónPhysicsnumerical [Methods]SpacetimeSolenoidal vector fieldGravitation; Hydrodynamics; Magnetohydrodynamics (MHD); Methods : numerical; Relativity; Stars : supernovae : generalsupernovae : general [Stars]Astrophysics (astro-ph)Astronomy and Astrophysics:ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia::Gravitación [UNESCO]Magnetic fieldNeutron starClassical mechanicsSpace and Planetary ScienceHydrodynamicsCircular symmetryMagnetohydrodynamicsUNESCO::ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia::EstrellasGravitation:ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia::Estrellas [UNESCO]
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When Geometry Constrains Vision: Systematic Misperceptions within Geometrical Configurations.

2016

International audience; How accurate are we in reproducing a point within a simple shape? This is the empirical question we addressed in this work. Participants were presented with a tiny disk embedded in an empty circle (Experiment 1 and 3) or in a square (Experiment 2). Shortly afterwards the disk vanished and they had to reproduce the previously seen disk position within the empty shape by means of the mouse cursor, as accurately as possible. Several loci inside each shape were tested. We found that the space delimited by a circle and by a square is not homogeneous and the observed distortion appears to be consistent across observers and specific for the two tested shapes. However, a com…

MaleEye MovementsVisionPhysiologyVisual SystemVector SpacesSensory PhysiologySocial Scienceslcsh:Medicine[ SCCO.PSYC ] Cognitive science/Psychology050109 social psychologyGeometrySquare (algebra)SymmetryForm perceptionMedicine and Health SciencesPsychologyAttentionlcsh:ScienceMathematicsMultidisciplinaryExperimental Design05 social sciencesSensory SystemsPattern Recognition VisualResearch Design[ SCCO.NEUR ] Cognitive science/Neuroscience[SCCO.PSYC]Cognitive science/PsychologyPhysical SciencesSensory PerceptionFemaleResearch ArticleAdultGeometryResearch and Analysis Methods050105 experimental psychologyYoung AdultPosition (vector)DistortionHumans0501 psychology and cognitive sciencesPoint (geometry)Vision Ocularshape perception perceptual center perceptual force vector field perceptual distortion visual mislocalization Gestalt eye movements[SCCO.NEUR]Cognitive science/Neurosciencelcsh:RCognitive PsychologyBiology and Life SciencesNull (physics)Form PerceptionAlgebraRadiiLinear AlgebraSpace PerceptionContour lineLinear ModelsCognitive Sciencelcsh:QSymmetry (geometry)MathematicsPhotic StimulationNeurosciencePLoS ONE
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Grafted polymer layers under shear: A Monte Carlo simulation

1993

Endgrafted polymers at surfaces exposed to a shear flow are modeled by a nonequilibrium Monte Carlo method where the jump rate of effective monomers to neighboring lattice sites against the flow direction is smaller than in the flow direction, assuming that this difference in jump rates is proportional to the local velocity of the flowing fluid. In the dilute case of isolated chains, the velocity profile is assumed linearly increasing with the distance from the surface, while for the case of polymer brushes the screening of the velocity field is calculated using a parabolic density profile for the brush whose height is determined self‐consistently. Linear dimensions of isolated chains are o…

Materials scienceMonte Carlo methodGeneral Physics and AstronomyNon-equilibrium thermodynamicsFlory–Huggins solution theoryMolecular physicsPhysics::Fluid DynamicsCondensed Matter::Soft Condensed MatterClassical mechanicsShear (geology)PerpendicularVector fieldShear velocityPhysical and Theoretical ChemistryShear flowThe Journal of Chemical Physics
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X-ray Tomography of One-forms with Partial Data

2021

If the integrals of a one-form over all lines meeting a small open set vanish and the form is closed in this set, then the one-form is exact in the whole Euclidean space. We obtain a unique continuation result for the normal operator of the X-ray transform of one-forms, and this leads to one of our two proofs of the partial data result. Our proofs apply to compactly supported covector-valued distributions.

Mathematics - Differential Geometry46F12 44A12 58A10Open set01 natural sciencesinversio-ongelmatintegraaliyhtälötSet (abstract data type)vector field tomographytomografiaFOS: MathematicsNormal operator0101 mathematicsMathematicsx-ray tomographyinverse problemsEuclidean spaceApplied MathematicsMathematical analysisInverse problemunique continuationnormal operatorFunctional Analysis (math.FA)Mathematics - Functional Analysis010101 applied mathematicsComputational MathematicsDifferential Geometry (math.DG)röntgenkuvausTomographyfunktionaalianalyysiAnalysisSIAM Journal on Mathematical Analysis
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