Search results for "Mixed finite element"

showing 10 items of 25 documents

Mixed finite elements for nonlocal elastic multilayered composite plate refined theories

2020

Abstract A novel mixed finite element formulation for the layerwise analysis of nonlocal multilayered composite plates is presented. The finite elements are formulated starting from the weak form of a set of governing equations for the laminate layers that were deduced via the Reissner Mixed Variational Theorem. The primary variables, namely displacements and out-of-plane stresses, are expressed at layer level as through-the-thickness expansions of suitable selected functions with coefficients approximated by the finite element scheme. The through-the-thickness expansion order is considered as a free parameter. This way, finite elements for different refined higher order plate theories can …

Refined plate theorieQuadrilateralMathematical analysisReissner Mixed Variational Theorem02 engineering and technology021001 nanoscience & nanotechnologyFinite element methodSet (abstract data type)Mixed finite element020303 mechanical engineering & transports0203 mechanical engineeringNonlocal elasticityComposite platePlate theoryCeramics and CompositesOrder (group theory)Settore ING-IND/04 - Costruzioni E Strutture Aerospaziali0210 nano-technologyLaminated compositesCivil and Structural EngineeringFree parameterMathematicsVariable (mathematics)Composite Structures
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Finite element approximation of vector fields given by curl and divergence

1981

In this paper a finite element approximation scheme for the system curl is considered. The use of pointwise approximation of the boundary condition leads to a nonconforming method. The error estimate is proved and numerically tested.

PointwiseCurl (mathematics)Vector operatorApproximation errorGeneral MathematicsMathematical analysisGeneral EngineeringMixed finite element methodComplex lamellar vector fieldMathematicsVector potentialExtended finite element methodMathematical Methods in the Applied Sciences
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Finite element approximations of the wave equation with Dirichlet boundary data defined on a bounded domain in R2

2006

Dirichlet problemsymbols.namesakeDirichlet boundary conditionDirichlet's principleMathematical analysissymbolsMixed finite element methodBoundary value problemDirichlet's energyMixed boundary conditionPoincaré–Steklov operatorMathematics
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Postprocessing of a Finite Element Scheme with Linear Elements

1987

In this contribution we first give a brief survey of postprocessing techniques for accelerating the convergence of finite element schemes for elliptic problems. We also generalize a local superconvergence technique recently analyzed by Křižek and Neittaanmaki ([20]) to a global technique. Finally, we show that it is possible to obtain O(h4) accuracy for the gradient in some cases when only linear elements are used. Numerical tests are presented.

Scheme (mathematics)Convergence (routing)Applied mathematicsNumerical testsMixed finite element methodSuperconvergenceFinite element methodMathematicsExtended finite element method
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On the numerical solution of axisymmetric domain optimization problems by dual finite element method

1994

Shape optimization of an axisymmetric three-dimensional domain with an elliptic boundary value state problem is solved. Since the cost functional is given in terms of the cogradient of the solution, a dual finite element method based on the minimum of complementary energy principle is used. © 1994 John Wiley & Sons, Inc.

Numerical AnalysisFinite element limit analysisApplied MathematicsMathematical analysisMixed finite element methodBoundary knot methodFinite element methodComputational MathematicsMethod of fundamental solutionsShape optimizationAnalysisMathematicsExtended finite element methodFree energy principleNumerical Methods for Partial Differential Equations
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A mixed finite element method for the heat flow problem

1981

A semidiscrete finite element scheme for the approximation of the spatial temperature change field is presented. The method yields a better order of convergence than the conventional use of linear elements.

Computer Networks and CommunicationsFinite element limit analysisApplied MathematicsMathematical analysishp-FEMMixed finite element methodSuperconvergenceBoundary knot methodFinite element methodMathematics::Numerical AnalysisComputational MathematicsSmoothed finite element methodSoftwareMathematicsExtended finite element methodBIT
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Regularization and finite element approximation of the wave equation with Dirichlet boundary data

1990

Mathematical analysisMixed boundary conditionMixed finite element methodDirichlet's energyBoundary knot methodPoincaré–Steklov operatorsymbols.namesakeDirichlet's principleDirichlet boundary conditionsymbolsGeneral Earth and Planetary SciencesBoundary value problemGeneral Environmental ScienceMathematicsBanach Center Publications
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On the finite element approximation for maxwell’s problem in polynomial domains of the plane

1981

The time-harmonic Maxwell boundary value problem in polygonal domains of R2 is considered. The behaviour of the solution in the neighbourhood of nonregular boundary points is given and asymptotic error estimates in L2- and in curl-div-norm for a finite element approximation of the solution are derived

PolynomialApproximation errorApplied MathematicsMathematical analysisBoundary (topology)Mixed finite element methodBoundary value problemBoundary knot methodAnalysisFinite element methodExtended finite element methodMathematicsApplicable Analysis
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The finite element method for fractional non-local thermal energy transfer in non-homogeneous rigid conductors

2015

Abstract In a non-local fractional-order model of thermal energy transport recently introduced by the authors, it is assumed that local and non-local contributions coexist at a given observation scale: while the first is described by the classical Fourier transport law, the second involves couples of adjacent and non-adjacent elementary volumes, and is taken as proportional to the product of the masses of the interacting volumes and their relative temperature, through a material-dependent, distance-decaying power-law function. As a result, a fractional-order heat conduction equation is derived. This paper presents a pertinent finite element method for the solution of the proposed fractional…

PhysicsFinite element methodNumerical Analysisbusiness.industryApplied MathematicsMathematical analysisFinite differenceFinite element method; Fractional calculus; Long-range heat transport; Non-homogeneous conductors; Modeling and Simulation; Numerical Analysis; Applied MathematicsMixed finite element methodFractional calculuFinite element methodFractional calculussymbols.namesakeLong-range heat transportFourier transformModeling and SimulationsymbolsHeat equationNon-homogeneous conductorbusinessSettore ICAR/08 - Scienza Delle CostruzioniNumerical AnalysiThermal energyExtended finite element method
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finite element methods

2017

Two robot patch recovery methods with built-in field equations and boundary conditions superconvergence similarities in standard and mixed finite element methods on the FEM for the Navier-Stokes equations in the domains with corner singularities projections in finite element analysis and application element analysis method and superconvergence quadratic interpolation polynomials in vertices of strongly regular triangulations explicit error bounds for a nonconforming finite element method analysis of the average efficiency of an error estimator on the mesh for difference schemes of higher accuracy for the heat-conduction equation shape design sensitivity formulae approximated by means of a r…

Nonlinear systemMathematical analysisExtrapolationBoundary value problemMixed finite element methodSuperconvergenceGalerkin methodComputer Science::Numerical AnalysisFinite element methodMathematics::Numerical AnalysisMathematicsExtended finite element method
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