Development of a 4-node hybrid stress tetrahedral element using a node-based smoothed finite element method
From MaRDI portal
Publication:6558797
DOI10.1002/nme.5717zbMath1548.74781MaRDI QIDQ6558797
Publication date: 21 June 2024
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
Finite element methods applied to problems in solid mechanics (74S05) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30)
Related Items (2)
Rotation-free triangular shell element using node-based smoothed finite element method ⋮ A 3-node \(\mathcal{C}^0\) triangular element for the modified couple stress theory based on the smoothed finite element method
Cites Work
- Unnamed Item
- Unnamed Item
- A smoothed finite element method for mechanics problems
- A triangular membrane element with rotational degrees of freedom
- Membrane triangles with corner drilling freedoms. I: The EFF element
- Membrane triangles with corner drilling freedoms. II: The ANDES element
- Membrane triangles with corner drilling freedoms. III: Implementation and performance evaluation
- A study of optimal membrane triangles with drilling freedoms.
- Displacement and equilibrium models in the finite element method by B. Fraeijs de Veubeke, Chapter 9, Pages 145–197 of Stress Analysis, Edited by O. C. Zienkiewicz and G. S. Holister, Published by John Wiley & Sons, 1965
- A LINEARLY CONFORMING RADIAL POINT INTERPOLATION METHOD FOR SOLID MECHANICS PROBLEMS
- Stabilized conforming nodal integration in the natural-element method
- Rational approach for assumed stress finite elements
- A compatible triangular element including vertex rotations for plane elasticity analysis
- Generalized nodes and high-performance elements
- A face-based smoothed finite element method (FS-FEM) for 3D linear and geometrically non-linear solid mechanics problems using 4-node tetrahedral elements
- Upper bound solution to elasticity problems: A unique property of the linearly conforming point interpolation method (LC-PIM)
- Parametrized multifield variational principles in elasticity: I. Mixed functionals
- Solid elements with rotational degrees of freedom: Part II—tetrahedron elements
- A non-conforming element for stress analysis
- Node-based uniform strain elements for three-node triangular and four-node tetrahedral meshes
- Hybrid stress tetrahedral elements with Allman's rotational D.O.F.s
- A plane hybrid element with rotational d.o.f. and adjustable stiffness
- A class of mixed assumed strain methods and the method of incompatible modes
- A LINEARLY CONFORMING POINT INTERPOLATION METHOD (LC-PIM) FOR 2D SOLID MECHANICS PROBLEMS
This page was built for publication: Development of a 4-node hybrid stress tetrahedral element using a node-based smoothed finite element method
