A numerical analysis of Saint-Venant torsion in strain-gradient bars
From MaRDI portal
Publication:1788387
DOI10.1016/j.euromechsol.2018.02.001zbMath1406.74240OpenAlexW2792403248MaRDI QIDQ1788387
Publication date: 8 October 2018
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.2018.02.001
Rods (beams, columns, shafts, arches, rings, etc.) (74K10) Saint-Venant's principle (74G50) Finite element methods applied to problems in solid mechanics (74S05)
Related Items (5)
Torsional static and vibration analysis of functionally graded nanotube with bi-Helmholtz kernel based stress-driven nonlocal integral model ⋮ A finite element implementation of the stress gradient theory ⋮ The torsional centre position of stocky beams with arbitrary noncircular cross-sectional shapes and with arbitrary elastic material properties ⋮ Analysis for the strain gradient theory of porous thermoelasticity ⋮ Meshfree Approach for the Torsional Analysis of Non-Circular Orthotropic and Functionally Graded Sections
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A new microstructure-dependent Saint-Venant torsion model based on a modified couple stress theory
- On the accuracy of shell models for torsional buckling of carbon nanotubes
- Nonsingular stress and strain fields of dislocations and disclinations in first strain gradient elasticity
- Isogeometric analysis of 2D gradient elasticity
- A new finite element method for strain gradient theories and applications to fracture analyses
- A continuum mechanics nonlinear postbuckling analysis for single-walled carbon nanotubes under torque
- Mixed isoparametric elements for Saint-Venant torsion
- Mixed finite element formulations of strain-gradient elasticity problems
- Experiments and theory in strain gradient elasticity.
- On chiral effects in strain gradient elasticity
- Application of gradient elasticity to armchair carbon nanotubes: size effects and constitutive parameters assessment
- Finite element analysis of plane strain solids in strain-gradient elasticity
- On the gradient strain elasticity theory of plates
- Generalization of strain-gradient theory to finite elastic deformation for isotropic materials
- On first strain-gradient theories in linear elasticity
- Micro-structure in linear elasticity
- Classical and Generalized Models of Elastic Rods
- An accurate finite element formulation for linear elastic torsion calculations
- Shear stresses in prismatic beams with arbitrary cross-sections
- An automatic mesh generation scheme for plane and curved surfaces by ‘isoparametric’ co‐ordinates
This page was built for publication: A numerical analysis of Saint-Venant torsion in strain-gradient bars
