A new formulation and 0-implementation of dynamically consistent gradient elasticity
From MaRDI portal
Publication:3588011
DOI10.1002/nme.2017zbMath1194.74016OpenAlexW2131709126MaRDI QIDQ3588011
Terry Bennett, Harm Askes, Elias C. Aifantis
Publication date: 10 September 2010
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/nme.2017
Related Items
Axisymmetric couple stress elasticity and its finite element formulation with penalty terms, Study of wave propagation in nanowires with surface effects by using a high-order continuum theory, Damage regularisation with inertia gradients, Nonlocal elasticity of Klein-Gordon type: fundamentals and wave propagation, Internal inertia gradient effect on two mode magneto‐elastic wave propagation, A general framework for softening regularisation based on gradient elasticity, A generalized integro-differential theory of nonlocal elasticity of \(n\)-Helmholtz type. II: Boundary-value problems in the one-dimensional case, Elasticity theories with higher-order gradients of inertia and stiffness for the modelling of wave dispersion in laminates, The gauge theory of dislocations: a nonuniformly moving screw dislocation, Operator Splits and Multiscale Methods in Computational Dynamics, Aspects of bifurcation in an isotropic elastic continuum with orthotropic inelastic interface, On the C 1 continuous discretization of non-linear gradient elasticity: A comparison of NEM and FEM based on Bernstein-Bézier patches, On scale invariance in anisotropic plasticity, gradient plasticity and gradient elasticity, Review and Critique of the Stress Gradient Elasticity Theories of Eringen and Aifantis, C 1 Discretizations for the Application to Gradient Elasticity, An advanced boundary element method for solving 2D and 3D static problems in Mindlin's strain-gradient theory of elasticity, Finite element modelling of wave dispersion with dynamically consistent gradient elasticity, Mono-scale and multi-scale formulations of gradient-enriched dynamic piezomagnetics, Computationally efficient higher-order three-scale method for nonlocal gradient elasticity problems of heterogeneous structures with multiple spatial scales
Cites Work
