Search results for "Stress resultants"

showing 9 items of 9 documents

Interaction between Longitudinal Shear and Transverse Bending in Prestressed Concrete Box Girders

2017

In box girder bridges, the quantity and distribution of reinforcement to be put in concrete elements of sections can be evaluated only by considering the deformation of the cross section in addition to the longitudinal analysis of the static scheme, establishing the entire state of stress of box sections. This leads to a need to evaluate the interaction between internal forces obtained by the global analysis and the ones obtained by the local analysis of the cross sections. The frame effect implies the elastic deformation of slabs and webs, whereas eccentrically applied loads lead to cross-section distortion with the loss of the box shape. Hence, the reinforcement is strongly influenced by …

EngineeringTransverse bendingBox girders bridges0211 other engineering and technologies020101 civil engineering02 engineering and technologyPlasticity0201 civil engineeringlaw.inventionPrestressed concreteInteraction domainslawGirder021105 building & constructionReinforcementCivil and Structural Engineeringbusiness.industryBox girders bridges; Interaction domains; Prestressed concrete; Shear; Thin-walled section; Transverse bending; Web; Civil and Structural Engineering; Building and ConstructionShearBox girderBuilding and ConstructionStructural engineeringWebSettore ICAR/09 - Tecnica Delle CostruzioniThin-walled sectionStress resultantsBending momentPrestressed concreteDeformation (engineering)businessJournal of Bridge Engineering
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Size effects on the plastic collapse limit load of thin foils in bending and thin wires in torsion

2011

Abstract Following a previous paper by the author [Strain gradient plasticity, strengthening effects and plastic limit analysis, Int. J. Solids Struct. 47 (2010) 100–112], a nonconventional plastic limit analysis for a particular class of micron scale structures as, typically, thin foils in bending and thin wires in torsion, is here addressed. An idealized rigid-perfectly plastic material is considered, which is featured by a strengthening potential degree-one homogeneous function of the effective plastic strain and its spatial gradient. The nonlocal (gradient) nature of the material resides in the inherent strengthening law, whereby the yield strength is related to the effective plastic st…

Materials sciencebusiness.industryMechanical EngineeringGeneral Physics and AstronomyTorsion (mechanics)MechanicsStructural engineeringPlasticitySingularityMechanics of MaterialsPlastic bendingStress resultantsPure bendingLimit loadGeneral Materials ScienceBoundary value problembusinessEuropean Journal of Mechanics - A/Solids
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On the dynamics of non-local fractional viscoelastic beams under stochastic agencies

2018

Abstract Non-local viscoelasticity is a subject of great interest in the context of non-local theories. In a recent study, the authors have proposed a non-local fractional beam model where non-local effects are represented as viscoelastic long-range volume forces and moments, exchanged by non-adjacent beam segments depending on their relative motion, while local effects are modelled by elastic classical stress resultants. Long-range interactions have been given a fractional constitutive law, involving the Caputo's fractional derivative. This paper introduces a comprehensive numerical approach to calculate the stochastic response of the non-local fractional beam model under Gaussian white no…

Materials scienceDiscretization02 engineering and technologyWhite noiseIndustrial and Manufacturing Engineering0203 mechanical engineeringFractional viscoelasticityComposite materialImpulse responseNon local Timoshenko beamMechanical EngineeringMathematical analysisEquations of motionWhite noise021001 nanoscience & nanotechnologyPhysics::History of PhysicsNon local Timoshenko beam; Fractional viscoelasticity; White noise; State variable expansionFractional calculusNumerical integration020303 mechanical engineering & transportsMechanics of MaterialsStress resultantsFrequency domainCeramics and CompositesState variable expansionSettore ICAR/08 - Scienza Delle CostruzioniFractional viscoelasticity Non local Timoshenko beam State variable expansion White noise0210 nano-technologyNon local Timoshenko beam Fractional viscoelasticity White noise State variable expansionComposites Part B: Engineering
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From the Euler–Bernoulli beam to the Timoshenko one through a sequence of Reddy-type shear deformable beam models of increasing order

2015

Abstract A sequence of elastic Reddy-type shear deformable beams of increasing (odd) order is envisioned, which starts with the Euler–Bernoulli beam (first order) and terminates with the Timoshenko beam (infinite order). The kinematics of the generic beam, including the warping mode of the cross sections, is specified in terms of three deformation variables (two curvatures, one shear angle), work-conjugate of as many stress resultants (two bending moments, one shear force). The principle of virtual power is used to determine the (static) equilibrium equations and the boundary conditions. The equations relating the bending moments and shear force to the curvatures and shear angle are also re…

Timoshenko beam theoryDifferential equationMechanical EngineeringMathematical analysisShear forceGeneral Physics and AstronomyClassical mechanicsMechanics of MaterialsStress resultantsShear stressBending momentGeneral Materials ScienceShear and moment diagramBeam (structure)MathematicsEuropean Journal of Mechanics - A/Solids
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Non-local stiffness and damping models for shear-deformable beams

2013

This paper presents the dynamics of a non-local Timoshenko beam. The key assumption involves modeling non-local effects as long-range volume forces and moments mutually exerted by non-adjacent beam segments, that contribute to the equilibrium of any beam segment along with the classical local stress resultants. Elastic and viscous long-range volume forces/moments are endowed in the model. They are built as linearly depending on the product of the volumes of the interacting beam segments and on generalized measures of their relative motion, based on the pure deformation modes of the beam. Attenuation functions governing the space decay of the non-local effects are introduced. Numerical resul…

PhysicsTimoshenko beam theoryNon-local elasticityMechanical EngineeringAttenuationRelative motionGeneral Physics and AstronomyStiffnessMechanicsNon localTimoshenko beamNon-local dampingLong-range interactionClassical mechanicsShear (geology)Mechanics of MaterialsStress resultantsmedicineGeneral Materials Sciencemedicine.symptomSettore ICAR/08 - Scienza Delle CostruzioniBeam (structure)European Journal of Mechanics - A/Solids
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Finite element method for a nonlocal Timoshenko beam model

2014

A finite element method is presented for a nonlocal Timoshenko beam model recently proposed by the authors. The model relies on the key idea that nonlocal effects consist of long-range volume forces and moments exchanged by non-adjacent beam segments, which contribute to the equilibrium of a beam segment along with the classical local stress resultants. The long-range volume forces/moments are linearly depending on the product of the volumes of the interacting beam segments, and their relative motion measured in terms of the pure beam deformation modes, through appropriate attenuation functions governing the spatial decay of nonlocal effects. In this paper, the beam model is reformulated wi…

Timoshenko beam theoryFinite element methodApplied MathematicsGeneral EngineeringStiffnessPure deformation modeComputer Graphics and Computer-Aided DesignFinite element methodLong-range interactionClassical mechanicsVariational formulationBending stiffnessStress resultantsNonlocal Timoshenko beammedicineDirect stiffness methodmedicine.symptomAnalysisBeam (structure)Stiffness matrixMathematics
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Variational formulations and extra boundary conditions within stress gradient elasticity theory with extensions to beam and plate models

2016

Abstract The principle of minimum total potential energy and the primary principle of virtual power for stress gradient elasticity are presented as kinematic type constructs dual of analogous static type principles from the literature (Polizzotto, 2014; Polizzotto, 2015a). The extra gradient-induced boundary conditions are formulated as “boundary congruence conditions” on the microstructure’s deformation relative to the continuum, which ultimately require that the normal derivative of the stresses must vanish at the boundary surface. Two forms of the governing PDEs for the relevant boundary-value problem are presented and their computational aspects are discussed. The Timoshenko beam and th…

Timoshenko beam theoryApplied MathematicsMechanical EngineeringMathematical analysis02 engineering and technologyKinematicsElasticity (physics)Directional derivative021001 nanoscience & nanotechnologyCondensed Matter PhysicsPotential energy020303 mechanical engineering & transports0203 mechanical engineeringMechanics of MaterialsModeling and SimulationStress resultantsPlate theoryGeneral Materials ScienceBoundary value problem0210 nano-technologyMathematicsInternational Journal of Solids and Structures
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Finite-Element Formulation of a Nonlocal Hereditary Fractional-Order Timoshenko Beam

2017

AbstractA mechanically-based nonlocal Timoshenko beam model, recently proposed by the authors, hinges on the assumption that nonlocal effects can be modeled as elastic long-range volume forces and moments mutually exerted by nonadjacent beam segments, which contribute to the equilibrium of any beam segment along with the classical local stress resultants. Long-range volume forces/moments linearly depend on the product of the volumes of the interacting beam segments, and on pure deformation modes of the beam, through attenuation functions governing the space decay of nonlocal effects. This paper investigates the response of this nonlocal beam model when viscoelastic long-range interactions a…

Timoshenko beam theoryPhysicsDiscretizationMechanical EngineeringNonlocal viscoelasticityEquations of motion02 engineering and technologyFractional calculu021001 nanoscience & nanotechnologyTimoshenko beamFinite element methodViscoelasticityFractional calculusNonlocal dampingLong-range interaction020303 mechanical engineering & transportsClassical mechanics0203 mechanical engineeringMechanics of MaterialsStress resultantsSettore ICAR/08 - Scienza Delle Costruzioni0210 nano-technologyBeam (structure)Journal of Engineering Mechanics
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Mechanically Based Nonlocal Euler-Bernoulli Beam Model

2014

AbstractThis paper presents a nonlocal Euler-Bernoulli beam model. It is assumed that the equilibrium of a beam segment is attained because of the classical local stress resultants, along with long-range volume forces and moments exchanged by the beam segment with all the nonadjacent beam segments. Elastic long-range volume forces/moments are considered, built as linearly depending on the product of the volumes of the interacting beam segments and on generalized measures of their relative motion, based on the pure deformation modes of the beam. Attenuation functions governing the space decay of the nonlocal effects are introduced. The motion equations are derived in an integro-differential …

PhysicsDeformation (mechanics)Mechanical EngineeringAttenuationEquations of motionSpace (mathematics)VibrationLong-range interactionClassical mechanicsNonlocal elasticityEuler-Bernoulli beamStress resultantsPhysics::Accelerator PhysicsFree vibrationsSettore ICAR/08 - Scienza Delle CostruzioniStaticsStaticBeam (structure)
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