Spatial arbitrarily curved microbeams with the modified couple stress theory: formulation of equations of motion
From MaRDI portal
Publication:2063440
DOI10.1016/J.EUROMECHSOL.2021.104475OpenAlexW3216457118MaRDI QIDQ2063440
Kaiyu Zhou, Tinh Quoc Bui, Duy Vo, Jaroon Rungamornrat
Publication date: 11 January 2022
Published in: European Journal of Mechanics. A. Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.euromechsol.2021.104475
principle of virtual workdeformation measureTimoshenko-Ehrenfest beamcross-sectional stress resultant
Related Items (3)
On invariance of spatial isogeometric Timoshenko-Ehrenfest beam formulations for static analysis ⋮ Dynamic behavior of nanoplate on viscoelastic foundation based on spatial-temporal fractional order viscoelasticity and thermoelasticity ⋮ Moving load excited dynamics of multi-layered imperfect microplates based on various micromechanical models
Cites Work
- Unnamed Item
- Microstructure-dependent couple stress theories of functionally graded beams
- Investigation of the size effects in Timoshenko beams based on the couple stress theory
- The size-dependent natural frequency of Bernoulli-Euler micro-beams
- Dynamic analysis of an embedded microbeam carrying a moving microparticle based on the modified couple stress theory
- A nonlinear Timoshenko beam formulation based on the modified couple stress theory
- Nonlinear non-classical microscale beams: static bending, postbuckling and free vibration
- A microstructure-dependent Timoshenko beam model based on a modified couple stress theory
- Isogeometric analysis for non-classical Bernoulli-Euler beam model incorporating microstructure and surface energy effects
- Finite element formulation of spatially curved and twisted rods
- Elastic materials with couple-stresses
- Mixed finite element methods for elastic rods of arbitrary geometry
- Experiments and theory in strain gradient elasticity.
- Size-dependent vibration analysis of three-dimensional cylindrical microbeams based on modified couple stress theory: a unified treatment
- A size-dependent model for coupled 3D deformations of nonlinear microbridges
- Free flexural vibration of geometrically imperfect functionally graded microbeams
- On size-dependent Timoshenko beam element based on modified couple stress theory
- Nonlinear modeling and size-dependent vibration analysis of curved microtubes conveying fluid based on modified couple stress theory
- Wave propagation characteristics of a twisted micro scale beam
- Couple stress based strain gradient theory for elasticity
- Linear static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam
- Chaotic dynamics of the size-dependent non-linear micro-beam model
- Dynamic and static isogeometric analysis for laminated Timoshenko curved microbeams
- A new Timoshenko beam model incorporating microstructure and surface energy effects
- Rotation-free isogeometric analysis of an arbitrarily curved plane Bernoulli-Euler beam
- A review on the mechanics of functionally graded nanoscale and microscale structures
- A new Bernoulli-Euler beam model incorporating microstructure and surface energy effects
- Effects of couple-stresses in linear elasticity
- Micro-structure in linear elasticity
- A NONLOCAL CURVED BEAM MODEL BASED ON A MODIFIED COUPLE STRESS THEORY
- A new isogeometric Timoshenko beam model incorporating microstructures and surface energy effects
This page was built for publication: Spatial arbitrarily curved microbeams with the modified couple stress theory: formulation of equations of motion
