Pages that link to "Item:Q1421364"

The following pages link to Experiments and theory in strain gradient elasticity. (Q1421364):

Displaying 50 items.

• On wave dispersion of rotating viscoelastic nanobeam based on general nonlocal elasticity in thermal environment (Q6062781) (← links)
• A size-dependent quasi-3D model for bending and buckling of porous functionally graded curved nanobeam (Q6063680) (← links)
• Flexural responses of nanobeams with coupled effects of nonlocality and surface energy (Q6064485) (← links)
• Higher order couple stress theory of plates and shells (Q6064488) (← links)
• Torsional frequency analyses of microtubules with end attachments (Q6065028) (← links)
• A unified beam theory with strain gradient effect and the von Kármán nonlinearity (Q6065066) (← links)
• On modeling of a thickness‐shear vibrating quartz crystal plate attached with micro‐beams immersed in liquid with considering couple stress effects (Q6065103) (← links)
• Strain gradient viscoelasticity theory of polymer networks (Q6072191) (← links)
• An analytical model for predicting equivalent elastic moduli of micro/nano-honeycombs with nonlocal effects (Q6072700) (← links)
• Bending and wave propagation analysis of axially functionally graded beams based on a reformulated strain gradient elasticity theory (Q6084636) (← links)
• Application of the modified Fourier series method and the genetic algorithm for calibration of small‐scale parameters in the nonlocal strain gradient nanobeams (Q6088894) (← links)
• Eight‐node hexahedral elements for gradient elasticity analysis (Q6089248) (← links)
• Mixed finite elements based on superconvergent patch recovery for strain gradient theory (Q6097598) (← links)
• A simplified deformation gradient theory and its experimental verification (Q6098721) (← links)
• Periodic motion of microscale cantilevered fluid-conveying pipes with symmetric breaking on the cross-Section (Q6100028) (← links)
• Mathematical modeling and methods of analysis of generalized functionally gradient porous nanobeams and nanoplates subjected to temperature field (Q6100123) (← links)
• Size estimates for nanoplates (Q6101031) (← links)
• An unified formulation of strong non-local elasticity with fractional order calculus (Q6113576) (← links)
• On the nonlocal bending problem with fractional hereditariness (Q6113577) (← links)
• Size effect and geometrically nonlinear effect on thermal post-buckling of micro-beams: a new theoretical analysis (Q6113634) (← links)
• The nonlocal elasticity theory for geometrically nonlinear vibrations of double-layer nanoplate systems in magnetic field (Q6116339) (← links)
• Periodic wave propagation in nonlocal beams resting on a bilinear foundation (Q6119887) (← links)
• Analytical solutions of static bending of curved Timoshenko microbeams using Eringen's two‐phase local/nonlocal integral model (Q6121486) (← links)
• Concurrent cross-scale and multi-material optimization considering interface strain gradient (Q6121698) (← links)
• A nonlocal strain gradient model for buckling analysis of laminated composite nanoplates using CLPT and TSDT (Q6124651) (← links)
• On the strain gradient effects on buckling of the partially covered laminated microbeam (Q6135652) (← links)
• A new high-order deformation theory and solution procedure based on homogenized strain energy density (Q6139937) (← links)
• The models of gradient mechanics and singularly perturbed boundary value problems (Q6140460) (← links)
• Nonlinear wave propagation analysis in Timoshenko nano-beams considering nonlocal and strain gradient effects (Q6143164) (← links)
• Implementation of Legendre wavelet method for the size dependent bending analysis of nano beam resonator under nonlocal strain gradient theory (Q6144180) (← links)
• Strong unique continuation and global regularity estimates for nanoplates (Q6145629) (← links)
• Theoretical analysis for static bending of circular Euler–Bernoulli beam using local and Eringen's nonlocal integral mixed model (Q6145914) (← links)
• Vibrations and buckling of orthotropic small‐scale plates with complex shape based on modified couple stress theory (Q6149417) (← links)
• Variational formulation and differential quadrature finite element for freely vibrating strain gradient Kirchhoff plates (Q6149548) (← links)
• Granular micromechanics‐based identification of isotropic strain gradient parameters for elastic geometrically nonlinear deformations (Q6149745) (← links)
• On dynamic pull‐in instability of electrostatically actuated multilayer nanoresonators: A semi‐analytical solution (Q6153285) (← links)
• Nonlinear analysis of piezoelectric multilayered micro-diaphragm based on modified strain gradient theory (Q6157710) (← links)
• Analysis of the magneto-thermoelastic vibrations of rotating Euler-Bernoulli nanobeams using the nonlocal elasticity model (Q6159985) (← links)
• Kinematically exact formulation of large deformations of gradient elastic beams (Q6159986) (← links)
• Bending analysis of functionally graded nanobeams based on stress-driven nonlocal model incorporating surface energy effects (Q6160043) (← links)
• Stabilization of a microbeam model with distributed disturbance (Q6160836) (← links)
• Indentation of a free beam resting on an elastic substrate with an internal lengthscale (Q6162937) (← links)
• On simplified deformation gradient theory of modified gradient elastic Kirchhoff-Love plate (Q6163031) (← links)
• Size-dependent thermal bending of bilayer microbeam based on modified couple stress theory and Timoshenko beam theory (Q6163043) (← links)
• Random vibrations of stress-driven nonlocal beams with external damping (Q6173246) (← links)
• Nonclassical linear theories of continuum mechanics (Q6175382) (← links)
• A new eigenvalue problem solver for thermo‐mechanical vibration of Timoshenko nanobeams by an innovative nonlocal finite element method (Q6180370) (← links)
• A modified strain gradient beam constraint model (Q6180558) (← links)
• Prediction of nonlocal elasticity parameters using high-throughput molecular dynamics simulations and machine learning (Q6181394) (← links)
• Dynamic analysis of 2DFGM porous nanobeams under moving load with surface stress and microstructure effects using Ritz method (Q6181751) (← links)