Search results for "Harmonic polynomial"

showing 6 items of 6 documents

Arbitrarily shaped plates analysis via Line Element-Less Method (LEM)

2018

Abstract An innovative procedure is introduced for the analysis of arbitrarily shaped thin plates with various boundary conditions and under generic transverse loading conditions. Framed into Line Element-less Method, a truly meshfree method, this novel approach yields the solution in terms of the deflection function in a straightforward manner, without resorting to any discretization, neither in the domain nor on the boundary. Specifically, expressing the deflection function through a series expansion in terms of harmonic polynomials, it is shown that the proposed method requires only the evaluation of line integrals along the boundary parametric equation. Further, minimization of appropri…

Arbitrary shapeSettore ING-IND/26 - Teoria Dello Sviluppo Dei Processi ChimiciDiscretizationLine integral02 engineering and technology01 natural sciencesMeshfree method0203 mechanical engineeringDeflection (engineering)Boundary value problem0101 mathematicsParametric equationCivil and Structural EngineeringMathematicsMechanical EngineeringMathematical analysisBuilding and ConstructionFinite element method010101 applied mathematicsAlgebraic equationKirchoff plate020303 mechanical engineering & transportsHarmonic polynomialLine Element-Less MethodSeries expansionSettore ICAR/08 - Scienza Delle Costruzioni
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Line element-less method (LEM) for beam torsion solution (truly no-mesh method)

2008

In this paper a new numerical method for finding approximate solutions of the torsion problem is proposed. The method takes full advantage of the theory of analytic complex function. A new potential function directly in terms of shear stresses is proposed and expanded in the double-ended Laurent series involving harmonic polynomials. A novel element-free weak form procedure, labelled Line Element-Less Method (LEM), has been developed imposing that the square of the net flux across the border is minimum with respect to coefficients expansion. Numerical implementation of the LEM results in systems of linear algebraic equations involving symmetric and positive-definite matrices without resorti…

DiscretizationMechanical EngineeringLaurent seriesLaurent polynomialNumerical analysisComputational MechanicsTorsion (mechanics)GeometryAlgebraic equationLinear algebraApplied mathematicsSettore ICAR/08 - Scienza Delle CostruzioniTorsion Analytic functions Harmonic polynomials shear stress.Analytic functionMathematicsActa Mechanica
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Exact and approximate analytical solutions for nonlocal nanoplates of arbitrary shapes in bending using the line element-less method

2021

AbstractIn this study, an innovative procedure is presented for the analysis of the static behavior of plates at the micro and nano scale, with arbitrary shape and various boundary conditions. In this regard, the well-known Eringen’s nonlocal elasticity theory is used to appropriately model small length scale effects. The proposed mesh-free procedure, namely the Line Element-Less Method (LEM), only requires the evaluation of simple line integrals along the plate boundary parametric equation. Further, variations of appropriately introduced functionals eventually lead to a linear system of algebraic equations in terms of the expansion coefficients of the deflection function. Notably, the prop…

Harmonic polynomials Kirchoff plate Line element-less method Meshfree method Nonlocal elasticityLine elementMechanical EngineeringMathematical analysisLinear systemLine integral02 engineering and technology021001 nanoscience & nanotechnologyCondensed Matter PhysicsAlgebraic equation020303 mechanical engineering & transports0203 mechanical engineeringSettore MAT/05 - Analisi MatematicaMechanics of MaterialsDeflection (engineering)Line (geometry)Settore MAT/03 - GeometriaBoundary value problemSettore ICAR/08 - Scienza Delle Costruzioni0210 nano-technologyParametric equationMathematicsMeccanica
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Innovative straight formulation for plate in bending

2017

In this paper it has been introduced an innovative formulation for evaluating the deflection function of a simply supported plate loaded by uniformly distributed edge moments. Framed into Line Element-less Method, this formulation allows the evaluation of solution in terms of deflection, through few lines of algorithm implemented by Mathematica software without resorting to any discretization neither in the domain nor in the boundary. Interesting savings in terms of time and computational costs are achieved. Results obtained by the proposed method are well contrasted by ones obtained by classical methods and Finite Element Method.

Line Element-less MethodDiscretizationbusiness.industryMechanical EngineeringPlate bendingMathematical analysis02 engineering and technologyStructural engineeringBending of plates01 natural sciencesFinite element methodComputer Science Applications010101 applied mathematicsHarmonic polynomial020303 mechanical engineering & transportsSoftware0203 mechanical engineeringDeflection (engineering)Modeling and SimulationGeneral Materials Science0101 mathematicsbusinessCivil and Structural EngineeringMathematicsComputers & Structures
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Magnetic field uniformity in neutron electric dipole moment experiments

2019

© 2019 American Physical Society. Magnetic-field uniformity is of the utmost importance in experiments to measure the electric dipole moment of the neutron. A general parametrization of the magnetic field in terms of harmonic polynomial modes is proposed, going beyond the linear-gradients approximation. We review the main undesirable effects of nonuniformities: depolarization of ultracold neutrons and Larmor frequency shifts of neutrons and mercury atoms. The theoretical predictions for these effects were verified by dedicated measurements with the single-chamber neutron electric-dipole-moment apparatus installed at the Paul Scherrer Institute. ispartof: Physical Review A vol:99 issue:4 sta…

Physics - Instrumentation and DetectorsNeutron electric dipole momentmercury: atommeasurement methodsFOS: Physical sciencesHarmonic polynomial01 natural sciences7. Clean energyHigh Energy Physics - Experiment010305 fluids & plasmasHigh Energy Physics - Experiment (hep-ex)0103 physical sciences[PHYS.HEXP]Physics [physics]/High Energy Physics - Experiment [hep-ex]NeutronPhysics::Atomic Physics[PHYS.PHYS.PHYS-INS-DET]Physics [physics]/Physics [physics]/Instrumentation and Detectors [physics.ins-det]010306 general physicsNuclear ExperimentFundamental conceptsQCPhysicsLarmor precessionMeasurement methodn: electric momentn: depolarizationmathematical methodsInstrumentation and Detectors (physics.ins-det)Magnetic fieldComputational physicsElectric dipole momentmagnetic field: parametrizationUltracold neutrons
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Fractional viscoelastic beam under torsion

2017

Abstract This paper introduces a study on twisted viscoelastic beams, having considered fractional calculus to capture the viscoelastic behaviour. Further another novelty of this paper is extending a recent numerical approach, labelled line elementless method (LEM), to viscoelastic beams. The latter does not require any discretization neither in the domain nor in the boundary. Some numerical applications have been reported to demonstrate the efficiency and accuracy of the method.

TorsionNumerical AnalysisDiscretizationApplied MathematicsNumerical analysisMathematical analysisTorsion (mechanics)Viscoelasticity02 engineering and technologyFractional calculu01 natural sciencesViscoelasticityFractional calculus010101 applied mathematicsModeling and simulationAnalytic functionHarmonic polynomial020303 mechanical engineering & transports0203 mechanical engineeringModeling and SimulationViscoelastic beam0101 mathematicsNumerical AnalysiMathematicsAnalytic functionCommunications in Nonlinear Science and Numerical Simulation
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