A high-precision co-rotational formulation of 3D beam elements for dynamic analysis of flexible multibody systems
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Publication:2175266
DOI10.1016/j.cma.2019.112701zbMath1441.74279OpenAlexW2986453926WikidataQ126867093 ScholiaQ126867093MaRDI QIDQ2175266
Gang Wang, Jinshuai Xu, Zhao-Hui Qi
Publication date: 29 April 2020
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cma.2019.112701
Rods (beams, columns, shafts, arches, rings, etc.) (74K10) Finite element methods applied to problems in solid mechanics (74S05) Dynamics of multibody systems (70E55)
Related Items (4)
Analytical mechanics methods in finite element analysis of multibody elastic system ⋮ A <scp>two‐dimensional</scp> corotational curved beam element for dynamic analysis of curved viscoelastic beams with large deformations and rotations ⋮ The direct force correction based framework for general co-rotational analysis ⋮ An implicit asynchronous variational integrator for flexible multibody dynamics
Cites Work
- Unnamed Item
- A consistent 3D corotational beam element for nonlinear dynamic analysis of flexible structures
- Integration of absolute nodal elements into multibody system
- Efficient formulation for dynamics of corotational 2D beams
- A unified formulation of small-strain corotational finite elements. I: Theory
- A co-rotational formulation for 3D beam element using vectorial rotational variables
- A frame-invariant scheme for the geometrically exact beam using rotation vector parametrization
- Simulation of a viscoelastic flexible multibody system using absolute nodal coordinate and fractional derivative methods
- A modified corotational framework for triangular shell elements
- A finite strain beam formulation. The three-dimensional dynamic problem. I
- A three-dimensional finite-strain rod model. II. Computational aspects
- On the dynamics in space of rods undergoing large motions - A geometrically exact approach
- Dynamics of 3-D co-rotational beams
- Finite rotation analysis and consistent linearization using projectors
- Co-rotational beam elements with warping effects in instability problems
- Flexible multibody dynamics: Review of past and recent developments
- Definition of the slopes and the finite element absolute nodal coordinate formulation
- On the choice of finite rotation parameters
- A unified co-rotational framework for solids, shells and beams
- Constrained dynamics of geometrically exact beams
- On rigid components and joint constraints in nonlinear dynamics of flexible multibody systems employing 3D geometrically exact beam model
- Modelling of flexible bodies with minimal coordinates by means of the corotational formulation
- A study on the instability problem for 3D frames
- Geometrically exact 3D beam theory: Implementation of a strain-invariant finite element for statics and dynamics
- A consistent co-rotational finite element formulation for geometrically nonlinear dynamic analysis of 3-D beams
- Rotation vector and its complement parameterization for singularity-free corotational shell element formulations
- Dynamic contact model of shell for multibody system applications
- A consistent co-rotational formulation for nonlinear, three-dimensional, beam-elements
- Total Lagrangian Reissner's geometrically exact beam element without singularities
- A beam finite element non-linear theory with finite rotations
- Dynamic analysis of planar flexible beams with finite rotations by using inertial and rotating frames
- Computational aspects of vector‐like parametrization of three‐dimensional finite rotations
- On the Parametrization of the Three-Dimensional Rotation Group
- Dynamics of Multibody Systems
- Dynamic response and instability of frame structures
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