Shear locking in one-dimensional finite element methods
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Publication:2280239
DOI10.1016/j.euromechsol.2019.103871zbMath1473.74131OpenAlexW2978210466MaRDI QIDQ2280239
Publication date: 18 December 2019
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.2019.103871
Rods (beams, columns, shafts, arches, rings, etc.) (74K10) Finite element methods applied to problems in solid mechanics (74S05)
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Uses Software
Cites Work
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- Avoiding shear locking for the Timoshenko beam problem via isogeometric collocation methods
- A new locking-free formulation for planar, shear deformable, linear and quadratic beam finite elements based on the absolute nodal coordinate formulation
- A new locking-free shear deformable finite element based on absolute nodal coordinates
- A geometrically exact beam element based on the absolute nodal coordinate formulation
- Locking effects in the finite element approximation of elasticity problems
- Mixed finite element methods - reduced and selective integration techniques: a unification of concepts
- A justification of nonlinear properly invariant plate theories
- Definition of the slopes and the finite element absolute nodal coordinate formulation
- Moving least-square reproducing kernel methods. I: Methodology and convergence
- Meshless methods: An overview and recent developments
- A note on enhanced strain methods for large deformations
- On locking-free shear deformable beam finite elements
- On the stability of mixed finite elements in large strain analysis of incompressible solids
- A new line DOF triangular element for analysis of thick and thin plates
- From the Euler-Bernoulli beam to the Timoshenko one through a sequence of Reddy-type shear deformable beam models of increasing order
- A displacement-free formulation for the Timoshenko beam problem and a corresponding isogeometric collocation approach
- Locking alleviation in the large displacement analysis of beam elements: the strain split method
- Explanation and elimination of shear locking and membrane locking with field consistence approach
- The finite element method in structural mechanics. Principles and practice of design of field-consistent element for structural and solid mechanics
- Analysis of shear flexible beams, using the meshless local Petrov‐Galerkin method, based on a locking‐free formulation
- Displacement/pressure mixed interpolation in the method of finite spheres
- A 3D Shear Deformable Finite Element Based on the Absolute Nodal Coordinate Formulation
- Localmaximum-entropy approximation schemes: a seamless bridge between finite elements and meshfree methods
- Mixed models and reduced/selective integration displacement models for nonlinear analysis of curved beams
- Finite Elements Based Upon Mindlin Plate Theory With Particular Reference to the Four-Node Bilinear Isoparametric Element
- A simple quadrilateral shell element
- An improved two-node timoshenko beam finite element
- Development of shear locking-free shell elements using an enhanced assumed strain formulation
- hp-Clouds in Mindlin's thick plate model
- Remarks on the stability of enhanced strain elements in finite elasticity and elastoplasticity
- Volumetric locking in the element free Galerkin method
- Kriging-Based Timoshenko Beam Elements with the Discrete Shear Gap Technique
- Reduced integration technique in general analysis of plates and shells
- A new twelve DOF quadrilateral element for analysis of thick and thin plates.
