Solution of de Saint Venant flexure-torsion problem for orthotropic beam via LEM (line element-less method)
From MaRDI portal
Publication:388369
DOI10.1016/j.euromechsol.2011.06.003zbMath1278.74190OpenAlexW2012632109MaRDI QIDQ388369
Publication date: 19 December 2013
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.2011.06.003
Related Items
Exact and approximate analytical solutions for nonlocal nanoplates of arbitrary shapes in bending using the line element-less method ⋮ Complex potential by hydrodynamic analogy for the determination of flexure-torsion induced stresses in de Saint Venant beams with boundary singularities ⋮ CVBEM solution for De Saint-Venant orthotropic beams under coupled bending and torsion
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- De Saint-Venant flexure-torsion problem handled by line element-less method (LEM)
- Nonuniform torsion of composite bars of variable thickness by BEM
- Application of the CVBEM to non-uniform St. Venant torsion
- Line element-less method (LEM) for beam torsion solution (truly no-mesh method)
- Saint-Venant solutions for prismatic anisotropic beams
- Warping shear stresses in nonuniform torsion of composite bars by BEM.
- Complex variable boundary element method for torsion of anisotropic bars
- Comparison among three boundary element methods for torsion problems: CPM, CVBEM, LEM
- Torsion and flexure analysis of orthotropic beams by a boundary element model
- A BEM solution to transverse shear loading of composite beams
- Comparison of complex methods for numerical solutions of boundary problems of the Laplace equation
- A BEM solution to transverse shear loading of beams
- Using the complex polynomial method with Mathematica to model problems involving the Laplace and Poisson equations
- An integral equation solution of the torsion problem
- Flexure-torsion behavior of prismatic beams. I - Section properties via power series
- Shear stresses in prismatic beams with arbitrary cross-sections
