Mixed Lagrangian formulation for size-dependent couple stress elastodynamic response
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Publication:683576
DOI10.1007/s00707-016-1644-zzbMath1394.74004OpenAlexW2466149178MaRDI QIDQ683576
Guoqiang Deng, Gary F. Dargush
Publication date: 8 February 2018
Published in: Acta Mechanica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00707-016-1644-z
Related Items
Mixed convolved Lagrange multiplier variational formulation for size-dependent elastodynamic couple stress response, Extended framework of Hamilton's principle for thermoelastic continua, Penalty \(\mathrm{C}^0 8\)-node quadrilateral and 20-node hexahedral elements for consistent couple stress elasticity based on the unsymmetric finite element method, Non-conforming Trefftz finite element implementation of orthotropic Kirchhoff plate model based on consistent couple stress theory, Size-dependent couple stress natural frequency analysis via a displacement-based variational method for two- and three-dimensional problems, Variational principles and finite element Bloch analysis in couple stress elastodynamics, Two- and three-dimensional size-dependent couple stress response using a displacement-based variational method
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Cites Work
- Variational methods in irreversible thermoelasticity: theoretical developments and minimum principles for the discrete form
- Variational formulation of a modified couple stress theory and its application to a simple shear problem
- Elastic materials with couple-stresses
- A new view on boundary conditions in the grioli-Koiter-Mindlin-toupin indeterminate couple stress model
- Size-dependent piezoelectricity: a 2D finite element formulation for electric field-mean curvature coupling in dielectrics
- Finite element Lagrange multiplier formulation for size-dependent skew-symmetric couple-stress planar elasticity
- Effects of couple-stresses in linear elasticity
- Micro-structure in linear elasticity
- Boundary element formulation for plane problems in couple stress elasticity
- Discrete calculus of variations
- On a Variational Theorem in Elasticity
- ON THE BOUNDS OF EIGENVALUES
- Strain gradient theory with couple stress for crystalline solids
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